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- Wizard Of Odds Video Poker Hand Analyzer
- Wizard Of Odds Video Poker Pay Tables
- VpFREE2 caters to the serious video poker player. Our members are video poker pros, advantage players, and casual gamblers alike. It is not easy to beat the casino. But it starts by refusing to play bad games. If EV of the video poker game you play doesn't matter to you, then this is not the site for you.
- The wizard is helped by four gaming experts: JB, Heather, Brandon James and Dustin Jermalowicz. Each of them is an expert in their own right. Instruction Manuals. Wizard of Odds has the rules for every game he has reviewed. Texas Hold’em, for instance, is one of the most popular variations of poker. To help players understand how to play it.
Video Poker instruction from casino author/expert Steve Bourie that teaches you the details on how video poker machines work and how to be a long-term winner. VIDEO POKER STRATEGY. So far in this guide you have learned how video poker started and grew. You have learned the basics of video poker play including return, house edge, and variance. You have learned about how randomness actually works while playing at the casino.You now know how to. This is part two of a two-part video where Mike Shackleford, also known as the 'Wizard of Odds' gives his top 10 list of mistakes that video poker players make. Topics covered include: over-tipping on jackpots; not paying attention to promotions; leaving a game in a high state; leaving credits in the machine; and playing a defective machine.
What is Video Poker
The Wizard of Odds video poker is an animated version of table poker games. In the 80s, the machines were spread throughout land-based casinos for players who did not have the money or knowledge to play the table games. The Internet created a new way to utilize the technology behind video machines.
Video poker is similar to slots because you place your wager in a machine. Several of the games are draw poker allowing you to change your cards without an additional wager. Stud poker also allows you to change cards to form your hand.
With the random number generator, it is considered better to play video poker than table games for those who want a better advantage against the house. Many, not all, video machines let you select if you will play one or multiple decks. One deck of cards, 54, helps you strategize your game versus multiple decks that you cannot estimate what may be provided in a hand. Table games added more decks to prevent card-counting from happening.
Types of Machines
Wizard of Odds video poker is offered in Deuces Wild, Queens High, Stud Variations, Jacks or Better, Tens of Betters, Bonus, Double Bonus, and Joker’s Wild. Like it sounds, each game has a specific difference like the twos being wild to finish a hand or the need for tens or better to win the hand.
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Strategy for Video Poker
- Select the coin you want to spend on the game.
- The amount you wager determines the return.
- Create a strategy for the rule variation of the Wizard of Odds video poker machine. For example, if you are playing jacks or better, you would want to keep any jacks you get in the hand. You can then elect to get rid of cards that are not better than jacks.
- Once you get your cards switched the dealer will reveal his cards, and the winner will be determined.
In video poker, you do not raise the machine. There are bonus options. You can decide to play for bonus winnings if you win the first hand. After each round, the deck reshuffles automatically, and your old cards are taken away to prevent card counting with the machine or an unfair house advantage. The Wizard of Odds video poker is fun for those who want to play against a machine and win, but you cannot bluff like you would at the table.
I read about the Reversible Royal game with the 105.22% return in your article at Wizard of Vegas. That return assumes optimal strategy, including for card order. What is the return if I assuming an average royal win? How about if I use ordinary 6-5 Bonus Poker strategy, which is the base pay table?
Assuming no strategy deviations, 1 in 60 royals will be sequential. The reversible royal jackpot pays 161,556 for 1. Any other royal pays 800 for 1. The average royal win is thus (1/60)*161,556 + (59/60)*800 + 17,396 for 1.
Wizard Of Odds Video Poker Hand Analyzer
If we assuming all royals pay 17,396 and play optimal strategy based on that royal win, then the return drops to 103.56%.
If we play standard 6-5 Bonus Poker strategy, which is the base pay table, then the return drops further to 101.97%.
Consider the unit square with coordinates (0,0), (1,0), (1,1), (0,1). Line A goes from (0,0) to (1,1). Line B goes from (1,0) to 0.5,1). What is the radius of the circle tangent to lines A, B, and the bottom of the circle?
This puzzle appeared in the October 2020 edition of the Mensa Bulletin.
The answer is (1+sqrt(2)+sqrt(5)+sqrt(50))/12 = apx. 0.248000646617418.
Here is my solution (PDF).
This problem is asked and discussed in my forum at Wizard of Vegas.
What is the probability of getting a Yahtzee if that is the only category you have left on the card?
For the benefit of the readers not familiar with Yahtzee, the question is asking what is the probability of getting a five of a kind in three rolls of five dice. After each roll, you must choose which dice to hold onto and which dice to re-roll.
Here are the possible outcomes after the first roll or any roll where the player rolls 4 or 5 dice.
Wizard Of Odds Video Poker Pay Tables
- Five of a kind = 6*(1/6)^5 = 0.000772
- Four of a kind = (1/6)^3*(5/6)*4 = 0.015432
- Three of a kind = (1/6)^2*(5/6)^2*COMBIN(4,2) = 0.115741
- Two of a kind = 4*(1/6)*(5/6)^3 = 0.385802
- One of a kind = 6*5!/6^5 = 0.092593
Here are the probabilities after holding a pair.
- Five of a kind =(1/6)^3 = 0.004630
- Four of a kind = 3*(1/6)^2*(5/6) = 0.069444
- Three of a kind = 3*(1/6)*(5/6)^2+5*(1/6)^3 = 0.370370
- Two of a kind = (5/6)^3-5*(1/6)^3 = 0.555555
Here are the probabilities after holding a three of a kind:
- Five of a kind =(1/6)^3 = 0.002778
- Four of a kind = 2*(1/6)*(5/6) = 0.27778
- Three of a kind = (5/6)^2 = 0.694444
Here are the probabilities after holding a four of a kind:
- Five of a kind =1/6 = 0.166667
- Four of a kind = 5/6 = 0.83333
With those probabilities of advancement, here are the probabilities of each state after the second roll:
- Five of a kind = 0.000772 + 0.015432*0.166667 + 0.115741*0.002778 + 0.385802*0.004630 + 0.092593* 0.000772 = 0.012631
- Four of a kind = 0.015432*0.166667 + 0.115741*0.27778 + 0.115741*0.27778 = 0.116970
- Three of a kind = 0.115741*0.694444 + 0.385802*0.370370 + 0.092593*0.115741 = 0.409022
- Two of a kind = 0.385802*0.555555 + 0.092593*0.385802 = 0.450103
- One of a kind = 0.092593 * 0.092593 = 0.008573
Using the same probabilities of advancement, here is the probability of a Yahtzee after the third roll:
Five of a kind = 0.012631 + 0.116970*(1/6) + 0.409022*(1/6)^2 + 0.450103*(1/6)^3 + 0.008573*(1/6)^4 = 0.046029.
Tap baseball cheats without survey. For those of you who prefer matrix algebra, there is the transition matrix:
0.092593 | 0.694444 | 0.192901 | 0.019290 | 0.000772 |
0.000000 | 0.555556 | 0.370370 | 0.069444 | 0.004630 |
0.000000 | 0.000000 | 0.694444 | 0.277778 | 0.027778 |
0.000000 | 0.000000 | 0.000000 | 0.833333 | 0.166667 |
0.000000 | 0.000000 | 0.000000 | 0.000000 | 1.000000 |
If the matrix above is M, then the state after three rolls will be M3, as follows:
0.000794 | 0.256011 | 0.452402 | 0.244765 | 0.046029 |
0.000000 | 0.171468 | 0.435814 | 0.316144 | 0.076575 |
0.000000 | 0.000000 | 0.334898 | 0.487611 | 0.177491 |
0.000000 | 0.000000 | 0.000000 | 0.578704 | 0.421296 |
0.000000 | 0.000000 | 0.000000 | 0.000000 | 1.000000 |
The probability of having a Yahtzee after three rolls can be found in the cell in the upper right corner.
After watching through The Queen's Gambit, I noticed none of the games on the show ended in a draw. I thought chess at high levels had lots of draws. For grandmaster-level chess, what percentage of games end in a draw?
According to the article Has the number of draws in chess increased? at ChessBase.com, author Qiyu Zhou states that in 78,468 rated games between players rated games of 2600 or over (it takes 2500 to be a grandmaster), the following are the results:
- Black wins: 18.0%
- White wins: 28.9%
- Draw: 53.1%