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Super Times Pay Super Spin Poker is the merging of two games by International Game Technology. Super Times Pay was developed Leading Edge Design (LED) and Super Spin by Action Gaming. IGT has combined the two games into an all-encompassing Super Times Pay Super Spin Poker machine. Pay tables may vary. Return to main page. You can find Super Times Pay Poker at the following Harrah's casinos. Click on your favorite casino below to play this game, which can be found at that location. Pay tables may vary. Bally's Atlantic City. Bally's Las Vegas. Bill's Gamblin Hall. $20 dollar free play. Double up or bust. In a four hour session 49.01% and in an eight hour session 24.02%. The odds of not getting a royal in 7,200 of spin poker is higher. Live22 demo. The total expected value for the game minus the royal (but including the cash back) is 98.123%, giving an expected loss of $168.96. I believe this number should hold for spin poker, too.
Thread Rating:
Game: 99.82%
Cash back is worth: 0.0283% = $5 / [(500/17)*60]
Total return: 100.103%
Bet per spin $1.25
Hands per hour: 800 * 9 lines = $7,200
Expected win per hour: $9.30 = 1.25*7200*0.103%
I will give an example below, but it is not valid for spin poker since you are playing 9 hands at a time with the same starting cards, and therefore the outcome of these hands are highly correlated to each other.
A Royal has a 1 in 40,390.5475 chance.
Therefore, the odds of not getting a royal in a 7,200 hand session is 83.67%. In a two hour session it would be 70.01%. In a four hour session 49.01% and in an eight hour session 24.02%. The odds of not getting a royal in 7,200 of spin poker is higher.
The total expected value for the game minus the royal (but including the cash back) is 98.123%, giving an expected loss of $168.96. I believe this number should hold for spin poker, too.
Also worth mentioning is that nearly 2% of the above return is due to the 4,000 coin Royal Flush payoff. So you may want to examine the probability of not hitting a royal in your session, if you are playing a 'short session', as well as the expected value without the royal. I would define a 'short session' as about 17 hours or less using a 5% chance of no royal for the session threshold).
I will give an example below, but it is not valid for spin poker since you are playing 9 hands at a time with the same starting cards, and therefore the outcome of these hands are highly correlated to each other.
A Royal has a 1 in 40,390.5475 chance.
Therefore, the odds of not getting a royal in a 7,200 hand session is 83.67%. In a two hour session it would be 70.01%. In a four hour session 49.01% and in an eight hour session 24.02%. The odds of not getting a royal in 7,200 of spin poker is higher.
The total expected value for the game minus the royal (but including the cash back) is 98.123%, giving an expected loss of $168.96. I believe this number should hold for spin poker, too.
I don't think this is the right way to look at it. Sure, you probably won't hit a royal today--but expected return is the sum of all possible occurences. Saying that your real return is 98% because you won't hit a royal is equivalent to saying that your return is 1000% if you DO hit a royal. In either case, the error is in focusing on the (drum roll, please) SHORT TERM. Video poker wouldn't be worth playing at all if it wasn't for the royal, and part and parcel of that is accepting the fact that today, you probably won't hit a royal, and you probably will lose.
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Maybe I'm missing something, but isn't just simply this:
Game: 99.82%
Cash back is worth: 0.0283% = $5 / [(500/17)*60]
Total return: 100.103%
Bet per spin $1.25
Hands per hour: 800 * 9 lines = $7,200
Expected win per hour: $9.30 = 1.25*7200*0.103%
We came up with about the same figures but we were hoping someone might validate it for us. It took three days before a royal came in and we missed it at the time and only noticed it by the credits on the meter. Also being that this is spin poker and only one deck is used, we thought it might distort some of the numbers as opposed to the same game being played on say a 9 play machine with 9 seperate decks.
My understanding is that the fact that it is spin poker does not affect the expected returns of any given hand. However, it does affect the probability of hitting a royal in a session because each of the 9 hands you are playing are not independent. In other words, the variance is different than regular play but the expected value is the same.
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I don't think this is the right way to look at it. Sure, you probably won't hit a royal today--but expected return is the sum of all possible occurences. Saying that your real return is 98% because you won't hit a royal is equivalent to saying that your return is 1000% if you DO hit a royal. In either case, the error is in focusing on the (drum roll, please) SHORT TERM. Video poker wouldn't be worth playing at all if it wasn't for the royal, and part and parcel of that is accepting the fact that today, you probably won't hit a royal, and you probably will lose.
You touched on the point I was trying to make. Short term advantage play video poker is dangerous because there is a high probability you will end with a loss due to the weighting of the royal.
Also, it is useful to look at an expected value in the way I presented because it gives a picture of how the variance of the game can affect your results. You should never examine expected value in a vacuum, it should always be considered along with the variance. A good example is to imagine a game that cost $1 to play, returns $1 50% of the time and $1 billion dollars with probably 1 in 2 billion. The expected value is $1, but if you remove the $1 billion unlikely prize, you get an expected value of only $0.50, which is the expceted value you can expect to achieve in your lifetime of playing this game (and this is because of the very high variance of about 500 million $).
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