House Advantage Slot Machines
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- House Advantage Slot Machines
- Slot Machines For Home Entertainment
- House Advantage Slot Machines Jackpots
- List Of Casino Slot Machines
The gaming industry is big business in the U.S., contributing an estimated US$240 billion to the economy each year, while generating $38 billion in tax revenues and supporting 17 million jobs.
What people may not realize is that slot machines, video poker machines and other electronic gaming devices make up the bulk of all that economic activity. At casinos in Iowa and South Dakota, for example, such devices have contributed up to 89 percent of annual gaming revenue.
I read on another Vegas Board recently that the house edge on penny slots was 12.5%,$1 slots the edge is 6.6% and on $25 slots it comes right down to 3%. First time I had seen this-normally you see printed the average slot house edge for the Strip,Downtown etc,which usually is around the 8/9% average mark (lower for Downtown). So there I am this last May,quite happily putting my money in the. In poker, it’s called a bad beat; you have a great hand, and still lose. But overall, if you play these machines the way you should, more money will flow from the machine than you put in. The advantage slot machine is similar to progressive slot machines in the sense that something builds. It’s not a jackpot dollar amount, though. The advantage slot machine is similar to progressive slot machines in the sense that something builds. It’s not a jackpot dollar amount, though. Instead, something else builds. It could be coins, hats, gems, fruit or even firecrackers.
Spinning-reel slots in particular are profit juggernauts for most casinos, outperforming table games like blackjack, video poker machines and other forms of gambling.
What about slot machines makes them such reliable money makers? In part, it has something to do with casinos’ ability to hide their true price from even the savviest of gamblers.
The price of a slot
An important economic theory holds that when the price of something goes up, demand for it tends to fall.
But that depends on price transparency, which exists for most of the day-to-day purchases we make. That is, other than visits to the doctor’s office and possibly the auto mechanic, we know the price of most products and services before we decide to pay for them.
Slots may be even worse than the doctor’s office, in that most of us will never know the true price of our wagers. Which means the law of supply and demand breaks down.
Casino operators usually think of price in terms of what is known as the average or expected house advantage on each bet placed by players. Basically, it’s the long-term edge that is built into the game. For an individual player, his or her limited interaction with the game will result in a “price” that looks a lot different.
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For example, consider a game with a 10 percent house advantage – which is fairly typical. This means that over the long run, the game will return 10 percent of all wagers it accepts to the casino that owns it. So if it accepts $1 million in wagers over 2 million spins, it would be expected to pay out $900,000, resulting in a casino gain of $100,000. Thus from the management’s perspective, the “price” it charges is the 10 percent it expects to collect from gamblers over time.
Individual players, however, will likely define price as the cost of the spin. For example, if a player bets $1, spins the reels and receives no payout, that’ll be the price – not 10 cents.
So who is correct? Both, in a way. While the game has certainly collected $1 from the player, management knows that eventually 90 cents of that will be dispensed to other players.
A player could never know this, however, given he will only be playing for an hour or two, during which he may hope a large payout will make up for his many losses and then some. And at this rate of play it could take years of playing a single slot machine for the casino’s long-term advantage to become evident.
Short-term vs. long-term
This difference in price perspective is rooted in the gap between the short-term view of the players and the long-term view of management. This is one of the lessons I’ve learned in my more than three decades in the gambling industry analyzing the performance of casino games and as a researcher studying them.
Let’s consider George, who just got his paycheck and heads to the casino with $80 to spend over an hour on a Tuesday night. There are basically three outcomes: He loses everything, hits a considerable jackpot and wins big, or makes or loses a little but manages to walk away before the odds turn decidedly against him.
Of course, the first outcome is far more common than the other two – it has to be for the casino to maintain its house advantage. The funds to pay big jackpots come from frequent losers (who get wiped out). Without all these losers, there can be no big winners – which is why so many people play in the first place.
Specifically, the sum of all the individual losses is used to fund the big jackpots. Therefore, to provide enticing jackpots, many players must lose all of their Tuesday night bankroll.
What is less obvious to many is that the long-term experience rarely occurs at the player level. That is, players rarely lose their $80 in a uniform manner (that is, a rate of 10 percent per spin). If this were the typical slot experience, it would be predictably disappointing. But it would make it very easy for a player to identify the price he’s paying.
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Raising the price
Ultimately, the casino is selling excitement, which is comprised of hope and variance. Even though a slot may have a modest house advantage from management’s perspective, such as 4 percent, it can and often does win all of George’s Tuesday night bankroll in short order.
This is primarily due to the variance in the slot machine’s pay table – which lists all the winning symbol combinations and the number of credits awarded for each one. While the pay table is visible to the player, the probability of producing each winning symbol combination remains hidden. Of course, these probabilities are a critical determinant of the house advantage – that is, the long-term price of the wager.
This rare ability to hide the price of a good or service offers an opportunity for casino management to raise the price without notifying the players – if they can get away with it.
Casino managers are under tremendous pressure to maximize their all-important slot revenue, but they do not want to kill the golden goose by raising the “price” too much. If players are able to detect these concealed price increases simply by playing the games, then they may choose to play at another casino.
This terrifies casino operators, as it is difficult and expensive to recover from perceptions of a high-priced slot product.
Getting away with it
Consequently, many operators resist increasing the house advantages of their slot machines, believing that players can detect these price shocks.
Our new research, however, has found that increases in the casino advantage have produced significant gains in revenue with no signs of detection even by savvy players. In multiple comparisons of two otherwise identical reel games, the high-priced games produced significantly greater revenue for the casino. These findings were confirmed in a second study.
House Advantage Slot Machines
Further analysis revealed no evidence of play migration from the high-priced games, despite the fact their low-priced counterparts were located a mere 3 feet away.
Importantly, these results occurred in spite of the egregious economic disincentive to play the high-priced games. That is, the visible pay tables were identical on both the high- and low-priced games, within each of the two-game pairings. The only difference was the concealed probabilities of each payout.
Armed with this knowledge, management may be more willing to increase prices. And for price-sensitive gamblers, reel slot machines may become something to avoid.
Introduction
The house edge is defined as the ratio of the average loss to the initial bet. In some games the beginning wager is not necessarily the ending wager. For example in blackjack, let it ride, and Caribbean stud poker, the player may increase their bet when the odds favor doing so. In these cases the additional money wagered is not figured into the denominator for the purpose of determining the house edge, thus increasing the measure of risk. For games like Ultimate Texas Hold 'Em and Crazy 4 Poker, where there are two required initial wagers, the house edge is based on one of them only. House edge figures are based on optimal or near-optimal player strategy.
The table below shows the house edge of most popular casino games and bets.
Casino Game House Edge
Game | Bet/Rules | House Edge | Standard Deviation |
---|---|---|---|
Baccarat | Banker | 1.06% | 0.93 |
Player | 1.24% | 0.95 | |
Tie | 14.36% | 2.64 | |
Big Six | $1 | 11.11% | 0.99 |
$2 | 16.67% | 1.34 | |
$5 | 22.22% | 2.02 | |
$10 | 18.52% | 2.88 | |
$20 | 22.22% | 3.97 | |
Joker/Logo | 24.07% | 5.35 | |
Bonus Six | No insurance | 10.42% | 5.79 |
With insurance | 23.83% | 6.51 | |
Blackjacka | Liberal Vegas rules | 0.28% | 1.15 |
Caribbean Stud Poker | 5.22% | 2.24 | |
Casino War | Go to war on ties | 2.88% | 1.05 |
Surrender on ties | 3.70% | 0.94 | |
Bet on tie | 18.65% | 8.32 | |
Catch a Wave | 0.50% | d | |
Craps | Pass/Come | 1.41% | 1.00 |
Don't pass/don't come | 1.36% | 0.99 | |
Odds — 4 or 10 | 0.00% | 1.41 | |
Odds — 5 or 9 | 0.00% | 1.22 | |
Odds — 6 or 8 | 0.00% | 1.10 | |
Field (2:1 on 12) | 5.56% | 1.08 | |
Field (3:1 on 12) | 2.78% | 1.14 | |
Any craps | 11.11% | 2.51 | |
Big 6,8 | 9.09% | 1.00 | |
Hard 4,10 | 11.11% | 2.51 | |
Hard 6,8 | 9.09% | 2.87 | |
Place 6,8 | 1.52% | 1.08 | |
Place 5,9 | 4.00% | 1.18 | |
Place 4,10 | 6.67% | 1.32 | |
Place (to lose) 4,10 | 3.03% | 0.69 | |
2, 12, & all hard hops | 13.89% | 5.09 | |
3, 11, & all easy hops | 11.11% | 3.66 | |
Any seven | 16.67% | 1.86 | |
Crazy 4 Poker | Ante | 3.42%* | 3.13* |
Double Down Stud | 2.67% | 2.97 | |
Heads Up Hold 'Em | Blind pay table #1 (500-50-10-8-5) | 2.36% | 4.56 |
Keno | 25%-29% | 1.30-46.04 | |
Let it Ride | 3.51% | 5.17 | |
Pai Gowc | 1.50% | 0.75 | |
Pai Gow Pokerc | 1.46% | 0.75 | |
Pick ’em Poker | 0% - 10% | 3.87 | |
Red Dog | Six decks | 2.80% | 1.60 |
Roulette | Single Zero | 2.70% | e |
Double Zero | 5.26% | e | |
Sic-Bo | 2.78%-33.33% | e | |
Slot Machines | 2%-15%f | 8.74g | |
Spanish 21 | Dealer hits soft 17 | 0.76% | d |
Dealer stands on soft 17 | 0.40% | d | |
Super Fun 21 | 0.94% | d | |
Three Card Poker | Pairplus | 7.28% | 2.85 |
Ante & play | 3.37% | 1.64 | |
Ultimate Texas Hold 'Em | Ante | 2.19% | 4.94 |
Video Poker | Jacks or Better (Full Pay) | 0.46% | 4.42 |
Wild Hold ’em Fold ’em | 6.86% | d |
Notes
a | Liberal Vegas Strip rules: Dealer stands on soft 17, player may double on any two cards, player may double after splitting, resplit aces, late surrender. |
b | Las Vegas single deck rules are dealer hits on soft 17, player may double on any two cards, player may not double after splitting, one card to split aces, no surrender. |
c | Assuming player plays the house way, playing one on one against dealer, and half of bets made are as banker. |
d | Yet to be determined. |
e | Standard deviation depends on bet made. |
f | Slot machine range is based on available returns from a major manufacturer |
g | Slot machine standard deviation based on just one machine. While this can vary, the standard deviation on slot machines are very high. |
Guide to House Edge
The reason that the house edge is relative to the original wager, not the average wager, is that it makes it easier for the player to estimate how much they will lose. For example if a player knows the house edge in blackjack is 0.6% he can assume that for every $10 wager original wager he makes he will lose 6 cents on the average. Most players are not going to know how much their average wager will be in games like blackjack relative to the original wager, thus any statistic based on the average wager would be difficult to apply to real life questions.
The conventional definition can be helpful for players determine how much it will cost them to play, given the information they already know. However the statistic is very biased as a measure of risk. In Caribbean stud poker, for example, the house edge is 5.22%, which is close to that of double zero roulette at 5.26%. However the ratio of average money lost to average money wagered in Caribbean stud is only 2.56%. The player only looking at the house edge may be indifferent between roulette and Caribbean stud poker, based only the house edge. If one wants to compare one game against another I believe it is better to look at the ratio of money lost to money wagered, which would show Caribbean stud poker to be a much better gamble than roulette.
Many other sources do not count ties in the house edge calculation, especially for the Don’t Pass bet in craps and the banker and player bets in baccarat. The rationale is that if a bet isn’t resolved then it should be ignored. I personally opt to include ties although I respect the other definition.
Element of Risk
For purposes of comparing one game to another I would like to propose a different measurement of risk, which I call the 'element of risk.' This measurement is defined as the average loss divided by total money bet. For bets in which the initial bet is always the final bet there would be no difference between this statistic and the house edge. Bets in which there is a difference are listed below.
Element of Risk
Game | Bet | House Edge | Element of Risk |
---|---|---|---|
Blackjack | Atlantic City rules | 0.43% | 0.38% |
Bonus 6 | No insurance | 10.42% | 5.41% |
Bonus 6 | With insurance | 23.83% | 6.42% |
Caribbean Stud Poker | 5.22% | 2.56% | |
Casino War | Go to war on ties | 2.88% | 2.68% |
Crazy 4 Poker | Standard rules | 3.42%* | 1.09% |
Heads Up Hold 'Em | Pay Table #1 (500-50-10-8-5) | 2.36% | 0.64% |
Double Down Stud | 2.67% | 2.13% | |
Let it Ride | 3.51% | 2.85% | |
Spanish 21 | Dealer hits soft 17 | 0.76% | 0.65% |
Spanish 21 | Dealer stands on soft 17 | 0.40% | 0.30% |
Three Card Poker | Ante & play | 3.37% | 2.01% |
Ultimate Texas Hold 'Em | 2.19%* | 0.53% | |
Wild Hold ’em Fold ’em | 6.86% | 3.23% |
Standard Deviation
The standard deviation is a measure of how volatile your bankroll will be playing a given game. This statistic is commonly used to calculate the probability that the end result of a session of a defined number of bets will be within certain bounds.
The standard deviation of the final result over n bets is the product of the standard deviation for one bet (see table) and the square root of the number of initial bets made in the session. This assumes that all bets made are of equal size. The probability that the session outcome will be within one standard deviation is 68.26%. The probability that the session outcome will be within two standard deviations is 95.46%. The probability that the session outcome will be within three standard deviations is 99.74%. The following table shows the probability that a session outcome will come within various numbers of standard deviations.
I realize that this explanation may not make much sense to someone who is not well versed in the basics of statistics. If this is the case I would recommend enriching yourself with a good introductory statistics book.
Standard Deviation
Number | Probability |
---|---|
0.25 | 0.1974 |
0.50 | 0.3830 |
0.75 | 0.5468 |
1.00 | 0.6826 |
1.25 | 0.7888 |
1.50 | 0.8664 |
1.75 | 0.9198 |
2.00 | 0.9546 |
2.25 | 0.9756 |
2.50 | 0.9876 |
2.75 | 0.9940 |
3.00 | 0.9974 |
3.25 | 0.9988 |
3.50 | 0.9996 |
3.75 | 0.9998 |
Hold
Although I do not mention hold percentages on my site the term is worth defining because it comes up a lot. The hold percentage is the ratio of chips the casino keeps to the total chips sold. This is generally measured over an entire shift. For example if blackjack table x takes in $1000 in the drop box and of the $1000 in chips sold the table keeps $300 of them (players walked away with the other $700) then the game's hold is 30%. If every player loses their entire purchase of chips then the hold will be 100%. It is possible for the hold to exceed 100% if players carry to the table chips purchased at another table. A mathematician alone can not determine the hold because it depends on how long the player will sit at the table and the same money circulates back and forth. There is a lot of confusion between the house edge and hold, especially among casino personnel.
Hands per Hour, House Edge for Comp Purposes
The following table shows the average hands per hour and the house edge for comp purposes various games. The house edge figures are higher than those above, because the above figures assume optimal strategy, and those below reflect player errors and average type of bet made. This table was given to me anonymously by an executive with a major Strip casino and is used for rating players.
Hands per Hour and Average House Edge
Games | Hands/Hour | House Edge |
---|---|---|
Baccarat | 72 | 1.2% |
Blackjack | 70 | 0.75% |
Big Six | 10 | 15.53% |
Craps | 48 | 1.58% |
Car. Stud | 50 | 1.46% |
Let It Ride | 52 | 2.4% |
Mini-Baccarat | 72 | 1.2% |
Midi-Baccarat | 72 | 1.2% |
Pai Gow | 30 | 1.65% |
Pai Pow Poker | 34 | 1.96% |
Roulette | 38 | 5.26% |
Single 0 Roulette | 35 | 2.59% |
Casino War | 65 | 2.87% |
Spanish 21 | 75 | 2.2% |
Sic Bo | 45 | 8% |
3 Way Action | 70 | 2.2% |
Footnotes
Slot Machines For Home Entertainment
* — House edge based on Ante bet only as opposed to all mandatory wagers (for example the Blind in Ultimate Texas Hold 'Em and the Super Bonus in Crazy 4 Poker.
Translation
House Advantage Slot Machines Jackpots
A Spanish translation of this page is available at www.eldropbox.com.
List Of Casino Slot Machines
Written by: Michael Shackleford