Video Poker Royal Flush 2000
2021年11月16日Register here: http://gg.gg/wwd4z
*Video Poker Royal Flush 2000
*Royal Flush Poker Game Free
*Radica Video Poker Royal Flush 2000
*Video Poker Royal Flush Odds
*RADICA - DRAW POKER ROYAL FLUSH 2000 ELECTRONIC HANDHELD GAME (1994) by Radica. 3.6 out of 5 stars 2 ratings. Available from these sellers. Make sure this fits by entering your model number. Video Draw Poker Game Automatic Scorekeeping 2000 Point Royal Flush Ages 8+ New & Used (3) from $20.74 + $5.02 Shipping.
*1st Video Poker Game where you control your destiny by selecting one of 47 card backs to find your missing 5th card to a Royal Flush, Straight Flush or Flush. All other games have already selected the next card. In Destiny Video Poker, your missing card is not predetermined and you alone have control over the outcome.
*If the player opts to chase the royal then the other two cards will be dealt immediatly from the remaining 49 cards in the deck. As an incentive to chase the royal a straight shall pay 10 and a flush shall pay 12 in chase the royal mode. A dealt royal shall pay 2000, as opposed to the usual 800 per coin bet based.
The conclusion one can draw is that in order to be advantageous in video poker a player should better bet the maximum number of coins, which in most cases is 5 coins.Otherwise, they will not receive the most competitive payout for a Royal Flush. If a player cannot afford to bet the maximum number of coins for a particular game, they may consider lowering the denomination; from betting quarters.sockobuwI’m trying to evaluate a multi-line play I did this week and can’t seem to find the frequency that you are dealt 4 to the royal. Any guidance here would be appreciated.prozemaLet’s deal the cards one at a time.
5 royal cards x 4 Suits = 20 royal cards in the deck.
You need 1 of them from the first 52.
20/52.
depending on what suit you got, there are 4 royal cards left of the of the remaining 51 cards in the deck.
4/51.
Of the remaining 50 cards, you need one of the other 3 royal cards.
3/50.
49 cards left, two left to make the royal.
2/49.
Now it get’s weird. You need to miss the last card.
There is 1 hit and and 47 misses left in the deck.
47/48.
Multiply..
(20/52)(4/51)(3/50)(2/49)(47/48) = probability
1/probability = frequency
I’m coming up with 13,824.26
Somebody double check me please. I’m drinking beer.DogHand
Tommy glenn carmichael. I’m trying to evaluate a multi-line play I did this week and can’t seem to find the frequency that you are dealt 4 to the royal. Any guidance here would be appreciated. Video Poker Royal Flush 2000
sockobuw,
The probability of a dealt Royal Flush is this:
(20/52)*(4/51)*(3/50)*(2/49)*(1/48) = 4*5!*47!/52! = 1.539077E-6, or 1 in 649740 deals.
So, the probability of being dealt 4 to a Royal Flush is this:
(20/52)*(4/51)*(3/50)*(2/49)*(47/48) = 4*5!*47!*47/52! = 0.0000723366, or 1 in 13824.255.. deals.
In other words, being dealt 4 to a RF is exactly 47 times more likely than being dealt a RF.
Royal Flush Poker Game FreeHope this helps!
Dog HandprozemaLooks like we can close the book on this one.drrockThanks for this post from:
You guys are off by a factor of 5. Each of you assumed that the last card drawn must be the non-royal card. In fact, the first card could have been the non-royal card, or it could have been the 2nd card or it could have been the third or 4th. So, you could add 4 more terms to your calculations that multiply to the same fraction as your first term and this would get to the correct answer.
Rather than worry about the order, we can just look at combinations. There are 940 combinations that include exactly 4 royal cards. You have 20 sets of 4 RF holds, AKQJ, AKQT, AKJT, AQJT, or KQJT of each of the 4 suits. And each of these can be matched with one of the 47 cards that do not complete that particular royal.
20 x 47 = 940.
940 / 2598960 = 0.00036168 or 1 in 2764.85106 hands.
So four to the royal is dealt 235 (or 47 x 5) times more often than a dealt royal.
If you look at software like Wolf VP or Video Poker for Winners that shows strategy, you will generally find only 936 occurrences when 4 to the Royal is held in non-wild games. That is because KQJT9 of each suit makes a straight flush, which is generally worth more than holding just KQJT (after discarding the suited 9). When KQJT9 is worth less than 4 to a royal like it is in Deuces Wild, this would not be the case. And, on the other side, 4 to the Royal with a Deuce being dealt would reduce the number of times holding only 4 to the royal since a Royal Flush with Deuces is often worth more.
So, depending on what the original poster wants to do with the information, if we subtract out the 4 instances of KQJT9, the numbers of 4 to the Royal held in most non-wild games would be
936 / 2598960 = 0.00036014 or 1 in 2776.66667 hands.
Have a Happy Thanksgiving! And hope you get dealt 4 to the Royal a little more than expected!RSI was gonna say getting dealt 4 to the royal cycle being 13k seems way too damn high. And no way is a dealt royal 47x harder than 4 to the royal. I’m going with Dr. Rock’s answers.tringlomanedrrock is correct.
For the longest time I did this incorrectly because I didn’t take KQJT9 suited out.7craps
Lindsay bingo. You guys are off by a factor of 5. Each of you assumed that the last card drawn must be the non-royal card. agree
in other words, their answers were assuming a specific order of the deal.
the order here (in video poker Q) does not matter at all.
ExceL: ((combin(4,1)*combin(5,4)*combin(47,1))-4)/combin(52,5) =
936/2598960, about 1 in 2776.666667
in words
(4Suits choose 1 * 5RoyalCards choose 4 * 47 other cards choose 1)-4 / 52total cards choose 5
the -4 is for KQJT9 SF as others pointed out but that still includes 4 to the Royal
not subtracting those one should get
940/2598960, about 1 in 2764.851064
I only play about 500 VP hands per week (includes free play) and get 4ttR, on average, 3 times a week
50% of the time 3 times each session played. Many others complain they get the same hand over and over and never hit the Royal.
I never hit the Royal that way in last 3 years of play here in Nevada. NEVER.
go figure..winsome johnny (not Win some johnny)billryanThanks for this post from:
Radica Video Poker Royal Flush 2000When I played exactly 1,000 hands per session, I’d get four to a royal about once every other session so less than 1 in 2,000. I’d call it around
once in about 1500.
Strangely, most of my Royals have come from holding three, not four cards, but the number of three hold hands occurs far more often.prozema
agree
in other words, their answers were assuming a specific order of the deal.
the order here (in video poker Q) does not matter at all.
ExceL: ((combin(4,1)*combin(5,4)*combin(47,1))-4)/combin(52,5) =
936/2598960, about 1 in 2776.666667
in words
(4Suits choose 1 * 5RoyalCards choose 4 * 47 other cards choose 1)-4 / 52total cards choose 5
the -4 is for KQJT9 SF as others pointed out but that still includes 4 to the Royal
not subtracting those one should get
940/2598960, about 1 in 2764.851064
I only play about 500 VP hands per week (includes free play) and get 4ttR, on average, 3 times a week
50% of the time 3 times each session played. Many others complain they get the same hand over and over and never hit the Royal.
Nlh poker. I never hit the Royal that way in last 3 years of play here in Nevada. NEVER.
go figure..
Video Poker Royal Flush OddsVery helpful. Thanks for helping me figure out the error I made.
*Page 1 of 2
Register here: http://gg.gg/wwd4z
https://diarynote.indered.space
*Video Poker Royal Flush 2000
*Royal Flush Poker Game Free
*Radica Video Poker Royal Flush 2000
*Video Poker Royal Flush Odds
*RADICA - DRAW POKER ROYAL FLUSH 2000 ELECTRONIC HANDHELD GAME (1994) by Radica. 3.6 out of 5 stars 2 ratings. Available from these sellers. Make sure this fits by entering your model number. Video Draw Poker Game Automatic Scorekeeping 2000 Point Royal Flush Ages 8+ New & Used (3) from $20.74 + $5.02 Shipping.
*1st Video Poker Game where you control your destiny by selecting one of 47 card backs to find your missing 5th card to a Royal Flush, Straight Flush or Flush. All other games have already selected the next card. In Destiny Video Poker, your missing card is not predetermined and you alone have control over the outcome.
*If the player opts to chase the royal then the other two cards will be dealt immediatly from the remaining 49 cards in the deck. As an incentive to chase the royal a straight shall pay 10 and a flush shall pay 12 in chase the royal mode. A dealt royal shall pay 2000, as opposed to the usual 800 per coin bet based.
The conclusion one can draw is that in order to be advantageous in video poker a player should better bet the maximum number of coins, which in most cases is 5 coins.Otherwise, they will not receive the most competitive payout for a Royal Flush. If a player cannot afford to bet the maximum number of coins for a particular game, they may consider lowering the denomination; from betting quarters.sockobuwI’m trying to evaluate a multi-line play I did this week and can’t seem to find the frequency that you are dealt 4 to the royal. Any guidance here would be appreciated.prozemaLet’s deal the cards one at a time.
5 royal cards x 4 Suits = 20 royal cards in the deck.
You need 1 of them from the first 52.
20/52.
depending on what suit you got, there are 4 royal cards left of the of the remaining 51 cards in the deck.
4/51.
Of the remaining 50 cards, you need one of the other 3 royal cards.
3/50.
49 cards left, two left to make the royal.
2/49.
Now it get’s weird. You need to miss the last card.
There is 1 hit and and 47 misses left in the deck.
47/48.
Multiply..
(20/52)(4/51)(3/50)(2/49)(47/48) = probability
1/probability = frequency
I’m coming up with 13,824.26
Somebody double check me please. I’m drinking beer.DogHand
Tommy glenn carmichael. I’m trying to evaluate a multi-line play I did this week and can’t seem to find the frequency that you are dealt 4 to the royal. Any guidance here would be appreciated. Video Poker Royal Flush 2000
sockobuw,
The probability of a dealt Royal Flush is this:
(20/52)*(4/51)*(3/50)*(2/49)*(1/48) = 4*5!*47!/52! = 1.539077E-6, or 1 in 649740 deals.
So, the probability of being dealt 4 to a Royal Flush is this:
(20/52)*(4/51)*(3/50)*(2/49)*(47/48) = 4*5!*47!*47/52! = 0.0000723366, or 1 in 13824.255.. deals.
In other words, being dealt 4 to a RF is exactly 47 times more likely than being dealt a RF.
Royal Flush Poker Game FreeHope this helps!
Dog HandprozemaLooks like we can close the book on this one.drrockThanks for this post from:
You guys are off by a factor of 5. Each of you assumed that the last card drawn must be the non-royal card. In fact, the first card could have been the non-royal card, or it could have been the 2nd card or it could have been the third or 4th. So, you could add 4 more terms to your calculations that multiply to the same fraction as your first term and this would get to the correct answer.
Rather than worry about the order, we can just look at combinations. There are 940 combinations that include exactly 4 royal cards. You have 20 sets of 4 RF holds, AKQJ, AKQT, AKJT, AQJT, or KQJT of each of the 4 suits. And each of these can be matched with one of the 47 cards that do not complete that particular royal.
20 x 47 = 940.
940 / 2598960 = 0.00036168 or 1 in 2764.85106 hands.
So four to the royal is dealt 235 (or 47 x 5) times more often than a dealt royal.
If you look at software like Wolf VP or Video Poker for Winners that shows strategy, you will generally find only 936 occurrences when 4 to the Royal is held in non-wild games. That is because KQJT9 of each suit makes a straight flush, which is generally worth more than holding just KQJT (after discarding the suited 9). When KQJT9 is worth less than 4 to a royal like it is in Deuces Wild, this would not be the case. And, on the other side, 4 to the Royal with a Deuce being dealt would reduce the number of times holding only 4 to the royal since a Royal Flush with Deuces is often worth more.
So, depending on what the original poster wants to do with the information, if we subtract out the 4 instances of KQJT9, the numbers of 4 to the Royal held in most non-wild games would be
936 / 2598960 = 0.00036014 or 1 in 2776.66667 hands.
Have a Happy Thanksgiving! And hope you get dealt 4 to the Royal a little more than expected!RSI was gonna say getting dealt 4 to the royal cycle being 13k seems way too damn high. And no way is a dealt royal 47x harder than 4 to the royal. I’m going with Dr. Rock’s answers.tringlomanedrrock is correct.
For the longest time I did this incorrectly because I didn’t take KQJT9 suited out.7craps
Lindsay bingo. You guys are off by a factor of 5. Each of you assumed that the last card drawn must be the non-royal card. agree
in other words, their answers were assuming a specific order of the deal.
the order here (in video poker Q) does not matter at all.
ExceL: ((combin(4,1)*combin(5,4)*combin(47,1))-4)/combin(52,5) =
936/2598960, about 1 in 2776.666667
in words
(4Suits choose 1 * 5RoyalCards choose 4 * 47 other cards choose 1)-4 / 52total cards choose 5
the -4 is for KQJT9 SF as others pointed out but that still includes 4 to the Royal
not subtracting those one should get
940/2598960, about 1 in 2764.851064
I only play about 500 VP hands per week (includes free play) and get 4ttR, on average, 3 times a week
50% of the time 3 times each session played. Many others complain they get the same hand over and over and never hit the Royal.
I never hit the Royal that way in last 3 years of play here in Nevada. NEVER.
go figure..winsome johnny (not Win some johnny)billryanThanks for this post from:
Radica Video Poker Royal Flush 2000When I played exactly 1,000 hands per session, I’d get four to a royal about once every other session so less than 1 in 2,000. I’d call it around
once in about 1500.
Strangely, most of my Royals have come from holding three, not four cards, but the number of three hold hands occurs far more often.prozema
agree
in other words, their answers were assuming a specific order of the deal.
the order here (in video poker Q) does not matter at all.
ExceL: ((combin(4,1)*combin(5,4)*combin(47,1))-4)/combin(52,5) =
936/2598960, about 1 in 2776.666667
in words
(4Suits choose 1 * 5RoyalCards choose 4 * 47 other cards choose 1)-4 / 52total cards choose 5
the -4 is for KQJT9 SF as others pointed out but that still includes 4 to the Royal
not subtracting those one should get
940/2598960, about 1 in 2764.851064
I only play about 500 VP hands per week (includes free play) and get 4ttR, on average, 3 times a week
50% of the time 3 times each session played. Many others complain they get the same hand over and over and never hit the Royal.
Nlh poker. I never hit the Royal that way in last 3 years of play here in Nevada. NEVER.
go figure..
Video Poker Royal Flush OddsVery helpful. Thanks for helping me figure out the error I made.
*Page 1 of 2
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