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Dazzling Dice
Introduction

Dazzling Dice is an exciting game of luck you can play at online casinos powered by advanced software. The objective is to roll 25 poker dice, arranged in a grid of five rows and five columns, aiming to create winning poker hands across 12 different pay lines. Wager Gaming Technology Players select a betting amount, which can vary between 25 cents and $25, and decide on 1 to 12 pay lines to activate.
Rules
- This game utilizes poker dice, which feature a 9, 10, jack, queen, king, and ace on their six sides.
- A total of 25 poker dice will be rolled and displayed in a five by five grid.
- There are a total of 12 different pay lines that traverse the grid, consisting of five vertical lines, five horizontal lines, and two diagonal lines.
- Winnings are determined based on the poker hand values for each of the active pay lines, following a specific payout table. All prizes are calculated on a 'for one' basis.
- The accompanying table details the number of ways to achieve each outcome, the probabilities involved, and the expected returns, with the bottom right cell indicating a return rate of 93.36%.
Pay Table
Hand | Pays |
---|---|
Five of a kind | 100 |
High straight | 10 |
Low straight | 8 |
Four of a kind | 6 |
Full house | 4 |
Three of a kind | 2 |
Loser | 0 |
Analysis
The same casinos offering this game are likely to provide a similar option that employs only five dice and boasts a more favorable payout table with returns of 97.99%. Why would you settle for a 93.4% return when a 98.0% return is available?
Return Table
Hand | Pays | Permutations | Probability | Return | |
---|---|---|---|---|---|
Five of a kind | 100 | 6 | 0.000772 | 0.077160 | |
High straight | 10 | 120 | 0.015432 | 0.154321 | |
Low straight | 8 | 120 | 0.015432 | 0.123457 | |
Four of a kind | 6 | 150 | 0.019290 | 0.115741 | |
Full house | 4 | 300 | 0.038580 | 0.154321 | |
Three of a kind | 2 | 1,200 | 0.154321 | 0.308642 | |
Loser | 0 | 5,880 | 0.756173 | 0.000000 | |
Total | 7,776 | 1.000000 | 0.933642 |
Strategy
Since this information is brief, let's delve into how to determine the number of possible arrangements for each winning hand. Poker Dice Five of a Kind: There are 6 possible combinations, one for each die face.
Math Lesson
High Straight: There is only one configuration for a high straight: A-K-Q-J-10. Nevertheless, the number of arrangements for these five unique dice is (5) = 6×5×4×3×2 = 120. Hence, you have 1×120=120 possible permutations.
- Low Straight: A low straight consists of K-Q-J-10-9. It shares the same odds as a high straight.
- Four of a Kind: There are 6 face options for the four matching dice, and 5 for the fifth distinct die. The single die can occupy one of five positions. Therefore, the total permutations for this hand amount to 6×5×5=150. factorial Full House: There are 6 choices for the three matching dice and 5 for the pair. The pair can take on (5,2)=10 different placements among the five dice. This results in a total of 6×5×10=300 permutations.
- Three of a Kind: There are 6 options for the three matching dice, with combin(5,2)=10 methods to select the two distinct dice. There are combin(5,3)=10 possible locations for the three matching dice, and factorial(2) ways to arrange the two distinct dice in the remaining positions. Thus, the total permutations are 6×10×10×2=1200.
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