Abstract:
A dice game is disclosed. A method of playing a dice game is also disclosed. The dice game includes three to five similarly colored dice, and a game table. The game table has a game board displaying representations of all the possible single roll dice combinations for three to five dice, and the payout odds for each of the possible single roll dice combinations.

Description:
FIELD OF THE INVENTION 
     The present invention is directed to a dice game and a method of playing a dice game. 
     BACKGROUND OF THE INVENTION 
     Dice games have been around for many years. Popular dice games include, but are not limited to, “craps”, baccarat, YAHTZEE™, and others. 
     Known dice games have one or more shortcomings. Most known dice games are either too complicated for players to understand and/or fail to provide enough excitement to keep a player&#39;s interest. 
     What is needed in the art is a simple dice game, which generates and maintains a player&#39;s interest, provides hours of enjoyment, and provides the potential for an exceptional reward for a winning roll of the dice. 
     SUMMARY OF THE INVENTION 
     The present invention addresses some of the difficulties and problems discussed above by the discovery of an improved dice game, which is simple to learn and play. The dice game provides a potential winner for every roll of the dice. The dice game also provides substantial rewards for winning rolls, which generates and maintains player interest in the game. 
     Accordingly, the present invention is directed to a new dice game. The present invention is further directed to a method of playing the new dice game. 
    
    
     These and other features and advantages of the present invention will become apparent after a review of the following detailed description of the disclosed embodiments and the appended claims. 
     BRIEF DESCRIPTION OF THE FIGURES 
     FIG. 1 depicts an exemplary table design for a dice game using 3 dice; 
     FIG. 2 depicts an exemplary table design for a dice game using 4 dice; 
     FIG. 3 depicts an exemplary table design for a dice game using 5 dice; and 
     FIG. 4 depicts an exemplary roll history display for a dice game using 5 dice. 
    
    
     DETAILED DESCRIPTION OF THE INVENTION 
     To promote an understanding of the principles of the present invention, descriptions of specific embodiments of the invention follow and specific language is used to describe the specific embodiments. It will nevertheless be understood that no limitation of the scope of the invention is intended by the use of specific language. Alterations, further modifications, and such further applications of the principles of the present invention discussed are contemplated as would normally occur to one ordinarily skilled in the art to which the invention pertains. 
     The present invention is directed to a dice game, which provides a high degree of excitement to one or more players, as well as, the potential for pay-outs as much as 6,000 to 1. The dice game of the present invention is simple to learn and play, unlike some popular dice games. Further, the dice game provides one or more potential winners for every roll of the dice. 
     The dice game of the present invention may be played in a casino similar to the game of “craps” or may be played at home in the form of a board game, such as MONOPOLY™. In other embodiments of the present invention, the dice game may be played on an electronic device, such as a video poker machine, a hand-held device similar to a GAME-BOY™ device, or any other electronic game. 
     Various aspects of the present invention are further described below. 
     I. Components of the Dice Game 
     The dice game of the present invention comprises one or more of the following components. 
     A. Dice 
     The dice game of the present invention may comprise from three to five dice. The dice used in the present invention may be any standard dice having six sides, and a number of markings on each side to designate a number from 1 to 6. The markings on each side of the die may be spots, dots, hearts, or any other marking. 
     The dice may be of any shape, size, and color. Desirably, the dice have a substantially cubed shape and a size such that up to five dice may be held in a player&#39;s hand. The color of the dice may be any color. In one embodiment of the present invention, a variety of colors may be made available to a player, so that the player can use his or her “lucky” color. Typically, the dice have an ivory color and black dots on each side of the dice. 
     Although conventional dice are desired in the present invention, specialty dice may also be used. Such dice may have numbers or other types of symbols on each surface of the die. Examples of numbers or symbols include, but are not limited to, English numbers, Roman numerals, and casino symbols (i.e., one to six logos or trademarks of a casino on each side of a die). 
     B. Dice Game Table 
     In one embodiment of the present invention, the dice game may be played on a game table similar to a craps table. Exemplary game tables of the present invention may have a table design such as shown in FIGS. 1-3. 
     FIG. 1 depicts a table design suitable for use in the dice game of the present invention, wherein three dice are used to play the game. As shown in FIG. 1, game table  10  comprises an upper section  11  and a lower section  12  separated by horizontal line  13 . Game table  10  also comprises two substantially similar halves  14  and  15  separated by vertical line  16 . Left half  14  and right half  15  are substantially similar to one another, almost mirror images of one another, except for the “3 Dice Big Wheel” circle  114 , which is bisected by line  16 . 
     Upper section  11  displays possible rolls (i.e., combinations of the three dice) in the dice game, while lower section  12  displays some of the “pay-out odds” for a winning roll. As used herein, the term “pay-out odds” is used to describe a ratio of (a) the amount of reward paid to a player for a winning roll to (b) a given bet. For example, if the pay-out odds are “175 to 1” and a player&#39;s bet is $ 1.00, the amount of the reward paid to the player for a winning roll is $175.00. 
     Within upper section  11 , individual bets (not shown) may be placed in one or more of the following areas corresponding to a given bet: the “Any Pair” rectangle  111 ; the “Straight” rectangle  112 ; the “Baby Wheel” circle  113  for any 3-of-a-kind bet; and one or more pie sections of the “3 Dice Big Wheel” circle  114  for a specific 3-of-a-kind bet, such as 3 “1&#39;s” as shown in pie section  115  within “3 Dice Big Wheel” circle  114 . Bets on individual numbers may be placed on individual numbers 4-17 within rectangle  116 . For example, a wager that the 3-dice combination will total the number 8 is placed on the “8” square  117  positioned within rectangle  116 . A bet that the 3-dice combination will total any one of the numbers “4,” “7,” “10,” “13,” or “16” may be placed in rectangle  118  positioned adjacent to rectangle  116 . A bet that the 3-dice combination will total a number ranging from 7 to 10 may be placed anywhere within area  119 , which encompasses the area marked “$$ 7 to 10 $$” as shown within upper section  11  of game table  10 . 
     Lower section  12  of game table  10  provides a player with a view of the pay-out odds for a given bet. For example, as shown in line  121 , the pay-out odds for a winning bet on a specific 3-of-a-kind bet is 175 to 1. As shown in line  122 , the pay-out odds for a winning bet that the 3-dice combination totals the number 10 or 11 is 5 to 1. As can be seen in rectangle  118  described above, the pay-out odds for a winning bet that the 3-dice combination totals any one of “4,” “7,” “10,” “13,” or “16” is 1.5 to 1. 
     FIG. 2 displays an exemplary game table  20  for use in playing the dice game of the present invention wherein the dice game comprises four dice. Game table  20  comprises an upper section  21  and a lower section  22  separated by horizontal line  23 . Game table  20  also comprises two substantially similar halves  24  and  25  separated by vertical line  26 . Left half  24  and right half  25  are substantially similar to one another, almost mirror images of one another, except for the “4 Dice Big Wheel” circle  215 , which is bisected by vertical line  26 . Upper section  21  of FIG. 2 displays possible rolls (i.e., combinations of the four dice) in the dice game, while lower section  22  displays some of the “pay-out odds” for a winning roll. 
     Within upper section  21 , individual bets (not shown) may be placed in one or more of the following areas corresponding to a given bet: the “Any Pair” rectangle  211 ; the “Straight” rectangle  212 ; the “Any 3-of-a-kind” rectangle  213 ; the “Baby Wheel” circle  214  for any 4-of-a-kind bet; and one or more pie sections of the “4 Dice Big Wheel” circle  215  for a specific 4-of-a-kind bet, such as 4 “6&#39;s” as shown in pie section  220  within “4 Dice Big Wheel” circle  215 . Bets on individual numbers may be placed on individual numbers 5-23 within rectangle  216 . For example, a wager that the 4-dice combination will total the number 12 will be placed on the “12” square  217  positioned within rectangle  216 . A bet that the 4-dice combination will total any one of the numbers “5,” “8,” “11,” “14,” “17,” “20,” or “23” may be placed in rectangle  218  positioned adjacent to rectangle  216 . A bet that the 4-dice combination will total a number ranging from 6 to 13 may be placed anywhere within rectangle  219 , which encompasses the area marked “$$ 6 to 13 $$” as shown within upper section  21  of game table  20 . 
     Lower section  22  of game table  20  provides a player with a view of the pay-out odds for a given bet in the 4 dice game. For example, as shown in line  221 , the pay-out odds for a winning bet on a specific 4-of-a-kind bet is 1000 to 1. As shown in line  222 , the pay-out odds for a winning bet that the 4-dice combination totals the number 10 or 18 is 12 to 1. As can be seen in rectangle  218  described above, the pay-out odds for a winning bet that the 4-dice combination totals any one of “5,” “8,” “11,” “14,” “17,” “20,” or “23” is 1.5 to 1. 
     FIG. 3 displays an exemplary game table  30  for use in playing the dice game of the present invention wherein the dice game comprises five dice. Game table  30  comprises an upper section  31  and a lower section  32  separated by horizontal line  33 . Game table  30  also comprises two substantially similar halves  34  and  35  separated by vertical line  36 . Left half  34  and right half  35  are substantially similar to one another, almost mirror images of one another, except for the “5 Dice Big Wheel” circle  317 , which is bisected by vertical line  36 . Upper section  31  of FIG. 3 displays possible rolls (i.e., combinations of the five dice) in the dice game, while lower Section  32  displays some of the “pay-out odds” for a winning roll. 
     Within upper section  31 , individual bets (not shown) may be placed in one or more of the following areas corresponding to a given bet: the “Any 2 Pair” rectangle  311 ; the “Straight” rectangle  312 ; the “Any 3-of-a-kind” rectangle  313 ; the “Full House” rectangle  314 ; the “Any 4-of-a-kind” rectangle  315 ; the “Baby Wheel” circle  316  for any 5-of-a-kind bet; and one or more pie sections of the “5 Dice Big Wheel” circle  317  for a specific 5-of-a-kind bet, such as 5 “6&#39;s” as shown in pie section  328  within “5 Dice Big Wheel” circle  317 . Bets on individual numbers may be placed on individual numbers 6-29 within rectangle  316 . For example, a wager that the 5-dice combination will total the number 17 will be placed on the “17” square  319  positioned within rectangle  318 . A bet that the 5-dice combination will total any one of the numbers “6,” “9,” “12,” “15,” “18,” “21,” “24,” or “27” may be placed in rectangle  320  positioned adjacent to rectangle  318 . 
     Lower section  32  of game table  30  provides a player with a view of the pay-out odds for a given bet in the 5 dice game. For example, as shown in line  322 , the pay-out odds for a winning bet on a “Full House” bet is 20 to 1. As shown in line  323 , the pay-out odds for a winning bet that the 5-dice combination totals the number 17 or 18 is 5 to 1. As can be seen in rectangle  320  described above, the pay-out odds for a winning bet that the 5-dice combination totals any one of “6,” “9,” “12,” “15,” “18,” “21,” “24,” or “27” is 1.5 to 1. 
     In one embodiment of the present invention, a portion of the game table may provide an area suitable for rolling the dice. For example, a wall having a height of approximately 2.54 cm. (1 in.) up to about 25.4 cm. (10 in.) may be positioned along horizontal line  13  (see FIG. 1) to allow players positioned along lower section  12  to roll the dice in the pay-out odds area within lower section  12  of game table  10 . It should be noted that the game table of FIG. 1 is used as an example, and a wall could be used on any game table. Desirably, the wall is a made of a transparent material, such as glass of plastic, to allow players to view the game table through the transparent wall. 
     The wall along horizontal line  13  may move vertically from a “down” position inside the game table to an “up” position, wherein a portion of the transparent wall is above the upper surface of the game table, depending on the stage of the game. For example, while players are placing bets, the transparent wall may be positioned in a “down” position inside the game table. Once all bets are made final (i.e., prior to the roll of the dice), the wall may be moved to an “up” position to provide a dice-rolling area on one side of the transparent wall. The position of the wall may be electronically controlled by a casino employee managing the dice game. 
     In a further embodiment of the present invention, at least a portion of the game table is depressed so as to provide a “pit-like” area for rolling the dice. In one example of this embodiment, the depressed area may encompass the entire lower section  12  of game table  10  or a smaller portion of lower section  12 , such as the area containing the pay-out odds. 
     C. Roll History Display 
     The dice game may further comprise a display, which provides a roll history for a given table (e.g., a display of the last ten rolls of a given table). An exemplary roll history display is shown in FIG.  4 . Roll history display  40  may comprise a first column  41 , which indicates the last rolls of the dice. As shown in column  41 , the last roll of the dice was the number  17 , which was preceded by the number  20 . The roll history display  40  may provide any number of previous rolls of the dice. Desirably, roll history display  40  displays at least eight previous rolls of the dice. 
     Roll history display  40  may also comprise columns  42 , which provide special roll outcomes corresponding to a given combination of dice. The individual squares contained in columns  42  within roll history display  40  may light up to indicate when a special combination of dice is rolled. For example, in row  43 , if the dice, which total the number 17, comprise two 4s and three 3s, the full house square  44  lights up or displays a color different from the other blocks in row  43  within columns  42 . In some cases, more than one block may light up on a given roll of the dice. For example, in row  45  if the five dice totaling 24 are four 5s and one 4, the following blocks will light up: “Any 2 Pair,” “3-of-a-kind,” and “Any 4-of-a-kind.” In addition, roll history display  40  may further comprise column  46 , which indicates whether or not there was one or more winners for a given roll. The individual squares contained in column  46  may light up or display a special color to indicate when a given past roll resulted in one or more winners. 
     Roll history display  40 , as shown in FIG. 4, is specifically designed for a five-dice game; however, it should be understood that roll history displays may vary depending on the number of dice used. Roll history display  40  may have a design, shape and size, which may vary depending on a number of factors including, but not limited to, the available space for the roll history display, the number of previous rolls displayed on the roll history display, and the size of the lettering on the roll history display. The roll history display  40  may be positioned at any location within the view of the players. One possible location for the roll history display  40  is above the casino operator (not shown), who assists the players in placing bets. In one embodiment of the present invention, the roll history display  40  is placed above the casino operator, wherein the casino operator is positioned adjacent to the “5-Dice Big Wheel” (or the “3-Dice Big Wheel” in FIG. 1 or the “4-Dice Big Wheel” in FIG. 2) while the players are positioned along an opposite portion of the game table, such as lower section  32 , which displays the pay-out odds to the players (i.e., along lower section  32  shown in FIG. 3 for a five-dice game). 
     D. Dice Game Board 
     In a further embodiment of the present invention, the dice game may be played on a game board. The game board may have a board design such as shown in FIGS. 1-3. The game board may be made of conventional game board materials including, but not limited to, cardboard, paper, plastic film, and ink. The game board may be of any desired size and shape. Desirably, the game board has an oval shape, such as shown in FIGS. 1-3. 
     In one embodiment of the present invention, the game board has an oval shape and an overall length of from about 61 cm. (24 in.) to about 152 cm. (60 in.), and an overall width of from about 30 cm. (12 in.) to about 122 cm. (48 in.). 
     E. Dice Pit 
     In a further embodiment of the present invention, the dice board game may comprise a “dice pit” separate from, connected to, or attachable to the game board. The “dice pit” may be a “pan-like” container having a lower surface and a wall along an outer perimeter of the lower surface. The “dice pit” may be used to contain and control the dice during a roll of the dice. The “dice pit” enables control of the dice during the step of rolling the dice to prevent placed bets from being unintentionally moved during the dice rolling step. 
     The “dice pit” may have any dimensions and shape. Typically, the dice pit has a square, rectangular or circular shape and a lower surface dimension ranging from about 15 cm. (6 in.) to about 60 cm. (24 in.) and a wall height of up to about 7.6 cm. (3 in.). 
     F. Electronic Dice Game 
     In yet a further embodiment of the present invention, the dice game may be played on an electronic device. Suitable electronic devices include, but are not limited to, a video poker type machine, a handheld electronic device such as a GAME-BOY™, a NINTENDO™ type device for use with a conventional television, and a personal computer. 
     On each of the possible electronic devices, a display may be made available to the player, wherein at least a portion of the display contains a table design, such as shown in FIGS. 1-3. A number of mechanical devices may be used to interact with the table design on the electronic display. Suitable mechanical devices include, but are not limited to, buttons (e.g., on a video poker type machine); a cursor ball, such as found on some video poker type machines for positioning a cursor on the electronic display; a touch-screen (e.g., on a video poker type machine); a keyboard; a mouse for positioning a cursor on a personal computer video display; a touch-pad for positioning a cursor on a personal computer video display; or a microphone for use with voice recognition software (i.e., for inputting audio commands to the electronic device). 
     The electronic dice game may be present on a software program, which is installed onto an electronic device such as a NINTENDO™ type device, or may be in the form of an electronic disk, which may be inserted into a hand-held electronic device such as a GAME-BOY™ type electronic device or a personal computer. 
     G. Money or Reward 
     The dice game of the present invention may also comprise a reward for rolling a winning roll of the dice. The reward for rolling a winning roll may be in the form of actual money, imitation (i.e., play or fake) money, or tokens representing actual or fake money. In the dice table game of the present invention, the game may be played in a casino, wherein actual currency is bet by a player and paid out by the casino for winning bets. Typically, casino “chips” are used to represent actual money on the game table, although cash may also be used. In the dice board game, actual money may be used; however, other forms of reward may also be used, such as imitation or fake money, such as found in games like MONOPOLY™. 
     In the electronic version of the dice game, the reward for a winning bet may be in the form of tokens, as in the case of video poker type machines, or points, as in the case of handheld electronic devices or personal computers. 
     H. Miscellaneous Articles 
     The dice game of the present invention may also comprise one or more miscellaneous components including, but not limited to, a dice cup for shaking the dice prior to rolling the dice, a bucket for containing tokens, etc. 
     II. Method of Playing the Dice Game 
     The present invention is further directed to a method of playing a dice game using from 3 to 5 dice. The method may comprise one or more steps including, but not limited to, choosing a possible roll combination, designating a bet amount, associating the bet amount with the possible roll combination, and initiating a roll of the dice. The method may vary slightly depending on whether the method involves a game table, a game board, or an electronic device as described above. 
     The method of playing the dice game of the present invention may also comprise establishing pay-out odds for a winning roll of dice, as well as other steps. The method of playing the dice game of the present invention may also comprise one or more steps as described below. 
     A. Establishing Pay-out Odds 
     In one embodiment of the present invention, the method comprises establishing pay-out odds for each roll of the dice. A number of factors may be taken into consideration when establishing pay-out odds. Such factors include, but are not limited to, the probability of a given roll using a given number of dice, desired return to the player, a desired profit for the house (i.e., the casino), specific rules of the game, and any combination thereof. 
     One factor for determining the pay-out odds of a given roll may be the probability of a given roll using a set number of dice. Table 1 below provides the probability of rolling a given number or combination of numbers using from two to five dice. 
     
       
         
               
             
               
               
               
             
               
               
               
               
               
             
           
               
                 TABLE 1 
               
             
             
               
                   
               
               
                 Probability of a Given Roll Using From 2 To 5 Dice 
               
             
          
           
               
                   
                 Number of Dice 
                   
               
             
          
           
               
                 Roll 
                 2 Dice 
                 3 Dice 
                 4 Dice 
                 5 Dice 
               
               
                   
               
               
                  2 
                 1/36 
                   
                   
                   
               
               
                  3 
                 2/36 
                  1/216 
               
               
                  4 
                 3/36 
                  3/216 
                  1/1296 
               
               
                  5 
                 4/36 
                  6/216 
                  4/1296 
                  1/7776 
               
               
                  6 
                 5/36 
                 10/216 
                  10/1296 
                  5/7776 
               
               
                  7 
                 6/36 
                 15/216 
                  20/1296 
                  15/7776 
               
               
                  8 
                 5/36 
                 21/216 
                  35/1296 
                  35/7776 
               
               
                  9 
                 4/36 
                 25/216 
                  56/1296 
                  70/7776 
               
               
                 10 
                 3/36 
                 27/216 
                  80/1296 
                 126/7776 
               
               
                 11 
                 2/36 
                 27/216 
                 104/1296 
                 205/7776 
               
               
                 12 
                 1/36 
                 25/216 
                 125/1296 
                 305/7776 
               
               
                 13 
                   
                 21/216 
                 140/1296 
                 420/7776 
               
               
                 14 
                   
                 15/216 
                 146/1296 
                 540/7776 
               
               
                 15 
                   
                 10/216 
                 140/1296 
                 651/7776 
               
               
                 16 
                   
                  6/216 
                 125/1296 
                 735/7776 
               
               
                 17 
                   
                  3/216 
                 104/1296 
                 780/7776 
               
               
                 18 
                   
                  1/216 
                  80/1296 
                 780/7776 
               
               
                 19 
                   
                   
                  56/1296 
                 735/7776 
               
               
                 20 
                   
                   
                  35/1296 
                 651/7776 
               
               
                 21 
                   
                   
                  20/1296 
                 540/7776 
               
               
                 22 
                   
                   
                  10/1296 
                 420/7776 
               
               
                 23 
                   
                   
                  4/1296 
                 305/7776 
               
               
                 24 
                   
                   
                  1/1296 
                 205/7776 
               
               
                 25 
                   
                   
                   
                 126/7776 
               
               
                 26 
                   
                   
                   
                  70/7776 
               
               
                 27 
                   
                   
                   
                  35/7776 
               
               
                 28 
                   
                   
                   
                  15/7776 
               
               
                 29 
                   
                   
                   
                  5/7776 
               
               
                 30 
                   
                   
                   
                  1/7776 
               
               
                 Pair 
                 6/36 
                 96/216 
                 936/1296 
                 7056/7776  
               
               
                 2 Pair 
                   
                   
                  96/1296 
                 2256/7776  
               
               
                 Straight 
                 10/36  
                 24/216 
                  72/1296 
                 240/7776 
               
               
                 3 of a 
                   
                  6/216 
                 126/1296 
                 1656/7776  
               
               
                 Kind 
               
               
                 4 of a 
                   
                   
                  6/1296 
                 156/7776 
               
               
                 Kind 
                   
               
               
                 5 of a 
                   
                   
                   
                  6/7776 
               
               
                 Kind 
                   
               
               
                 Full 
                   
                   
                   
                 306/7776 
               
               
                 House 
               
               
                   
               
             
          
         
       
     
     As shown in Table 1, the probability of rolling a “2” (i.e., the total of all dice equals “2” when using two dice) is 1/36, while the probability of rolling a “7” using two dice is 6/36. As the number of dice increases, the number of possible combinations also increases. As shown in Table 1, there are 7,776 possible roll combinations using five dice. The probability of rolling five ones for a total dice combination of “5” is 1/7776. 
     In one desired embodiment, the method of the present invention takes into account the probability of a given roll in determining the pay-out odds for the given roll. Desirably, the pay-out odds for a given roll are less than the inverse probability of having the given roll. For example, the probability of rolling a “30” using five dice is 1/7776. Desirably, the pay-out odds for rolling a “30” is less than 7776 to 1. A number of methods may be used to determine pay-out odds for a given roll. One suitable method is described below. 
     One method of determining suitable pay-out odds for winning rolls is by using the formula below:        p   =       y        (     x   -   w     )       w                            
     wherein: 
     p represents the pay-out odds multiple; 
     y represents the desired yield to the player; 
     x represents the total number of possible combinations for a given number of dice; and 
     w represents the number of winning bets per x rolls of the dice. 
     For example, in a five dice game, x is equal to 7776. If one desires the yield to the player to be 80% (i.e., y=0.80), the pay-out odds multiple for rolling the number “10,” is calculated by:        p   =       y        (     x   -   w     )       w             p   =         (   0.80   )     [       (   7776   )     -     (   126   )           (   126   )               p   =   48.57                          
     to result in pay-out odds of “48.57 to 1” for a winning roll of the number 10 in a 5 dice game. Typically, pay-out odds are rounding to a whole number, so a suitable result might be “48 to 1” or even “45 to 1.” 
     In the example above, by setting the pay-out odds of “48 to 1” for a winning bet of “10” in a 5 dice game, the yield to the player is theoretically $0.80 for each dollar that the player plays. Further, the amount of money for the house (i.e., the casino) is equal to $0.20 for each dollar that the player plays. By adjusting the yield, y, in the formula above, the amount of money for the house (i.e., the casino) may be adjusted as desired. 
     Tables 2-4 below provide payment odds for a given roll in a three-dice game, four-dice game, and five-dice game, respectively, to yield a desired return to a player (and a desired return to the house) using the desired formula above. 
     
       
         
               
             
               
               
               
             
               
               
               
               
               
               
               
               
             
               
               
               
               
               
               
               
               
             
           
               
                 TABLE 2 
               
             
             
               
                   
               
               
                 Payment Odds for a Given Roll in a Three-Dice Game 
               
               
                 To Yield a Desired Return to a Player 
               
             
          
           
               
                   
                 # 
                   
               
               
                   
                 Rolls 
               
               
                   
                 Per 
               
               
                   
                 216 
                 Payment Odds To Yield Below Return To Player 
               
             
          
           
               
                 Roll 
                 Rolls 
                 .65 
                 .70 
                 .75 
                 .80 
                 .85 
                 .90 
               
               
                   
               
             
          
           
               
                  3 
                 1 
                 139.75 
                 150.50 
                 161.25 
                 172.00 
                 182.75 
                 193.50 
               
               
                  4 
                 3 
                 46.15 
                 49.70 
                 53.25 
                 56.80 
                 60.35 
                 63.90 
               
               
                  5 
                 6 
                 22.75 
                 24.50 
                 26.25 
                 28.00 
                 29.75 
                 31.50 
               
               
                  6 
                 10 
                 13.39 
                 14.42 
                 15.45 
                 16.48 
                 17.51 
                 18.54 
               
               
                  7 
                 15 
                 8.71 
                 9.38 
                 10.05 
                 10.72 
                 11.39 
                 12.06 
               
               
                  8 
                 21 
                 6.04 
                 6.50 
                 6.96 
                 7.43 
                 7.89 
                 8.36 
               
               
                  9 
                 25 
                 4.97 
                 5.35 
                 5.73 
                 6.11 
                 6.49 
                 6.88 
               
               
                 10 
                 27 
                 4.55 
                 4.90 
                 5.25 
                 5.60 
                 5.95 
                 6.30 
               
               
                 11 
                 27 
                 4.55 
                 4.90 
                 5.25 
                 5.60 
                 5.95 
                 6.30 
               
               
                 12 
                 25 
                 4.97 
                 5.35 
                 5.73 
                 6.11 
                 6.49 
                 6.88 
               
               
                 13 
                 21 
                 6.04 
                 6.50 
                 6.96 
                 7.43 
                 7.89 
                 8.36 
               
               
                 14 
                 15 
                 8.71 
                 9.38 
                 10.05 
                 10.72 
                 11.39 
                 12.06 
               
               
                 15 
                 10 
                 13.39 
                 14.42 
                 15.45 
                 16.48 
                 17.51 
                 18.54 
               
               
                 16 
                 6 
                 22.77 
                 24.50 
                 26.25 
                 28.00 
                 29.75 
                 31.50 
               
               
                 17 
                 3 
                 46.15 
                 49.70 
                 53.25 
                 56.80 
                 60.35 
                 63.90 
               
               
                 18 
                 1 
                 139.75 
                 150.50 
                 161.25 
                 172.00 
                 182.75 
                 193.50 
               
               
                 Pair 
                 96 
                 .81 
                 .88 
                 .94 
                 1.00 
                 1.06 
                 1.13 
               
               
                 Straight 
                 24 
                 5.20 
                 5.60 
                 6.00 
                 6.40 
                 6.80 
                 7.20 
               
               
                 3 of a 
                 6 
                 22.75 
                 24.50 
                 26.25 
                 28.00 
                 29.75 
                 31.50 
               
               
                 Kind 
               
               
                 Specific 
                 1 
                 139.75 
                 150.50 
                 161.25 
                 172.00 
                 182.75 
                 193.50 
               
               
                 3 of a 
               
               
                 Kind 
               
               
                 3-6 or 
                 20 
                 6.37 
                 6.86 
                 7.35 
                 7.84 
                 8.33 
                 8.82 
               
               
                 15-18 
               
               
                 3-7 or 
                 70 
                 1.36 
                 1.46 
                 1.56 
                 1.67 
                 1.77 
                 1.88 
               
               
                 14-18 
               
               
                 8 &amp; 9, 
                 92 
                 .88 
                 .94 
                 1.01 
                 1.08 
                 1.15 
                 1.21 
               
               
                 12 &amp; 13 
               
               
                 10 &amp; 11 
                 54 
                 1.95 
                 2.10 
                 2.25 
                 2.40 
                 2.55 
                 2.70 
               
               
                 5 &amp; 6, 
                 32 
                 3.74 
                 4.03 
                 4.31 
                 4.60 
                 4.89 
                 5.18 
               
               
                 15 &amp; 16 
               
               
                 7-10 or 
                 88 
                 .95 
                 1.02 
                 1.09 
                 1.16 
                 1.24 
                 1.31 
               
               
                 11-14 
               
               
                   
               
             
          
         
       
     
     
       
         
               
             
               
               
               
             
               
               
               
               
               
               
               
               
             
               
               
               
               
               
               
               
               
             
           
               
                 TABLE 3 
               
             
             
               
                   
               
               
                 Payment Odds for a Given Roll in a Four-Dice Game 
               
               
                 To Yield a Desired Return to a Player 
               
             
          
           
               
                   
                 # 
                   
               
               
                   
                 Rolls 
               
               
                   
                 Per 
               
               
                   
                 1296 
                 Payment Odds To Yield Below Return To Player 
               
             
          
           
               
                 Roll 
                 Rolls 
                 .65 
                 .70 
                 .75 
                 .80 
                 .85 
                 .90 
               
               
                   
               
             
          
           
               
                  4 
                 1 
                 841.75 
                 906.50 
                 971.25 
                 1036.00 
                 1100.75 
                 1165.50 
               
               
                  5 
                 4 
                 209.95 
                 226.10 
                 242.25 
                 258.40 
                 274.55 
                 290.70 
               
               
                  6 
                 10 
                 83.59 
                 90.02 
                 96.45 
                 102.88 
                 109.31 
                 115.74 
               
               
                  7 
                 20 
                 41.47 
                 44.66 
                 47.85 
                 51.04 
                 54.23 
                 57.42 
               
               
                  8 
                 35 
                 23.42 
                 25.22 
                 27.02 
                 28.82 
                 30.62 
                 32.43 
               
               
                  9 
                 56 
                 14.39 
                 15.50 
                 16.61 
                 17.71 
                 18.82 
                 19.93 
               
               
                 10 
                 80 
                 9.88 
                 10.64 
                 11.40 
                 12.16 
                 12.92 
                 13.68 
               
               
                 11 
                 104 
                 7.45 
                 8.02 
                 8.60 
                 9.17 
                 9.74 
                 10.32 
               
               
                 12 
                 125 
                 6.09 
                 6.56 
                 7.03 
                 7.49 
                 7.96 
                 8.43 
               
               
                 13 
                 140 
                 5.37 
                 5.78 
                 6.19 
                 6.61 
                 7.02 
                 7.43 
               
               
                 14 
                 146 
                 5.12 
                 5.51 
                 5.91 
                 6.30 
                 6.70 
                 7.09 
               
               
                 15 
                 140 
                 5.37 
                 5.78 
                 6.19 
                 6.61 
                 7.02 
                 7.43 
               
               
                 16 
                 125 
                 6.09 
                 6.56 
                 7.03 
                 7.49 
                 7.96 
                 8.43 
               
               
                 17 
                 104 
                 7.45 
                 8.02 
                 8.60 
                 9.17 
                 9.74 
                 10.32 
               
               
                 18 
                 80 
                 9.88 
                 10.64 
                 11.40 
                 12.16 
                 12.92 
                 13.68 
               
               
                 19 
                 56 
                 14.39 
                 15.50 
                 16.61 
                 17.71 
                 18.82 
                 19.93 
               
               
                 20 
                 35 
                 23.42 
                 25.22 
                 27.02 
                 28.82 
                 30.62 
                 32.43 
               
               
                 21 
                 20 
                 41.47 
                 44.66 
                 47.85 
                 51.04 
                 54.23 
                 57.42 
               
               
                 22 
                 10 
                 83.59 
                 90.02 
                 96.45 
                 102.88 
                 109.31 
                 115.74 
               
               
                 23 
                 4 
                 209.95 
                 226.10 
                 242.25 
                 258.40 
                 274.55 
                 290.70 
               
               
                 24 
                 1 
                 841.75 
                 906.50 
                 971.25 
                 1036.00 
                 1100.75 
                 1165.50 
               
               
                 Pair 
                 936 
                 .25 
                 .27 
                 .29 
                 .31 
                 .33 
                 .35 
               
               
                 2 Pair 
                 96 
                 8.13 
                 8.75 
                 9.38 
                 10.00 
                 10.63 
                 11.25 
               
               
                 Straight 
                 72 
                 11.05 
                 11.90 
                 12.75 
                 13.60 
                 14.45 
                 15.30 
               
               
                 3 of a 
                 126 
                 6.04 
                 6.50 
                 6.96 
                 7.43 
                 7.89 
                 8.36 
               
               
                 Kind 
               
               
                 4 of a 
                 6 
                 139.75 
                 150.50 
                 161.25 
                 172.00 
                 182.75 
                 193.50 
               
               
                 Kind 
               
               
                 Specific 
                 1 
                 841.75 
                 906.50 
                 971.25 
                 1036.00 
                 1100.75 
                 1165.50 
               
               
                 4 of a 
               
               
                 Kind 
               
               
                 4-6 or 
                 15 
                 55.51 
                 59.78 
                 64.05 
                 68.32 
                 72.59 
                 76.86 
               
               
                 22-24 
               
               
                 4-6 and 
                 30 
                 27.43 
                 29.54 
                 31.65 
                 33.76 
                 35.87 
                 37.98 
               
               
                 22-24 
               
               
                 6-13 or 
                 570 
                 .83 
                 .89 
                 .96 
                 1.02 
                 1.08 
                 1.15 
               
               
                 15-22 
               
               
                 9-12 or 
                 365 
                 1.66 
                 1.79 
                 1.91 
                 2.04 
                 2.17 
                 2.30 
               
               
                 16-19 
               
               
                 4-10 or 
                 206 
                 3.44 
                 3.70 
                 3.97 
                 4.23 
                 4.50 
                 4.76 
               
               
                 18-24 
               
               
                 10 &amp; 11 
                 184 
                 3.93 
                 4.23 
                 4.53 
                 4.84 
                 5.14 
                 5.44 
               
               
                 or 
               
               
                 17 &amp; 18 
               
               
                 8-11 or 
                 275 
                 2.41 
                 2.60 
                 2.79 
                 2.97 
                 3.16 
                 3.34 
               
               
                 17-20 
               
               
                   
               
             
          
         
       
     
     
       
         
               
             
               
               
               
             
               
               
               
               
               
               
               
               
             
               
               
               
               
               
               
               
               
             
           
               
                 TABLE 4 
               
             
             
               
                   
               
               
                 Payment Odds for a Given Roll in a Five-Dice Game 
               
               
                 To Yield a Desired Return to a Player 
               
             
          
           
               
                   
                 # 
                   
               
               
                   
                 Rolls 
               
               
                   
                 Per 
               
               
                   
                 7776 
                 Payment Odds To Yield Below Return To Player 
               
             
          
           
               
                 Roll 
                 Rolls 
                 .65 
                 .70 
                 75 
                 80 
                 .85 
                 .90 
               
               
                   
               
             
          
           
               
                  5 
                 1 
                 5053.75 
                 5442.50 
                 5831.25 
                 6220.04 
                 6608.75 
                 6997.51 
               
               
                  6 
                 5 
                 1010.23 
                 1087.94 
                 1165.65 
                 1243.36 
                 1321.07 
                 1398.78 
               
               
                  7 
                 15 
                 336.31 
                 362.18 
                 388.05 
                 413.92 
                 439.79 
                 465.66 
               
               
                  8 
                 35 
                 143.76 
                 154.82 
                 165.88 
                 176.94 
                 188.00 
                 199.05 
               
               
                  9 
                 70 
                 71.56 
                 77.06 
                 82.56 
                 88.07 
                 93.57 
                 99.08 
               
               
                 10 
                 126 
                 39.46 
                 42.50 
                 45.54 
                 48.57 
                 51.61 
                 54.64 
               
               
                 11 
                 205 
                 24.01 
                 25.85 
                 27.70 
                 29.55 
                 31.39 
                 33.24 
               
               
                 12 
                 305 
                 15.92 
                 17.15 
                 18.37 
                 19.60 
                 20.82 
                 22.05 
               
               
                 13 
                 420 
                 11.38 
                 12.26 
                 13.14 
                 14.01 
                 14.89 
                 15.76 
               
               
                 14 
                 540 
                 8.71 
                 9.38 
                 10.05 
                 10.72 
                 11.39 
                 12.06 
               
               
                 15 
                 651 
                 7.11 
                 7.66 
                 8.21 
                 8.76 
                 9.30 
                 9.85 
               
               
                 16 
                 735 
                 6.23 
                 6.71 
                 7.19 
                 7.66 
                 8.14 
                 8.62 
               
               
                 17 
                 780 
                 5.83 
                 6.28 
                 6.73 
                 7.18 
                 7.62 
                 8.07 
               
               
                 18 
                 780 
                 5.83 
                 6.28 
                 6.73 
                 7.18 
                 7.62 
                 8.07 
               
               
                 19 
                 735 
                 6.23 
                 6.71 
                 7.19 
                 7.66 
                 8.14 
                 8.62 
               
               
                 20 
                 651 
                 7.11 
                 7.66 
                 8.21 
                 8.76 
                 9.30 
                 9.85 
               
               
                 21 
                 540 
                 8.71 
                 9.38 
                 10.05 
                 10.72 
                 11.39 
                 12.06 
               
               
                 22 
                 420 
                 11.38 
                 12.26 
                 13.14 
                 14.01 
                 14.89 
                 15.76 
               
               
                 23 
                 305 
                 15.92 
                 17.15 
                 18.37 
                 19.60 
                 20.82 
                 22.05 
               
               
                 24 
                 205 
                 24.01 
                 25.85 
                 27.70 
                 29.55 
                 31.39 
                 33.24 
               
               
                 25 
                 126 
                 39.46 
                 42.50 
                 45.54 
                 48.57 
                 51.61 
                 54.64 
               
               
                 26 
                 70 
                 71.56 
                 77.06 
                 82.56 
                 88.07 
                 93.57 
                 99.08 
               
               
                 27 
                 35 
                 143.76 
                 154.82 
                 165.88 
                 176.94 
                 188.00 
                 199.05 
               
               
                 28 
                 15 
                 336.31 
                 362.18 
                 388.05 
                 413.92 
                 439.79 
                 465.66 
               
               
                 29 
                 5 
                 1010.23 
                 1097.94 
                 1165.65 
                 1243.36 
                 1321.07 
                 1398.78 
               
               
                 30 
                 1 
                 5053.75 
                 5442.50 
                 5831.25 
                 6220.04 
                 6608.75 
                 6997.51 
               
               
                 Pair 
                 7056 
                 .067 
                 .072 
                 .077 
                 .082 
                 .088 
                 .093 
               
               
                 2 Pair 
                 2256 
                 1.59 
                 1.71 
                 1.84 
                 1.96 
                 2.08 
                 2.20 
               
               
                 Straight 
                 240 
                 20.41 
                 21.98 
                 23.55 
                 25.12 
                 26.69 
                 28.26 
               
               
                 3 of a 
                 1656 
                 2.40 
                 2.59 
                 2.77 
                 2.96 
                 3.14 
                 3.33 
               
               
                 Kind 
               
               
                 4 of a 
                 156 
                 31.75 
                 34.19 
                 36.64 
                 39.08 
                 41.52 
                 43.96 
               
               
                 Kind 
               
               
                 Full 
                 306 
                 15.87 
                 17.09 
                 18.31 
                 19.53 
                 20.75 
                 21.97 
               
               
                 House 
               
               
                 Any 5 
                 6 
                 841.75 
                 906.50 
                 971.25 
                 1036.00 
                 1100.75 
                 1165.50 
               
               
                 of a 
               
               
                 Kind 
               
               
                 Specific 
                 1 
                 5053.75 
                 5442.50 
                 5831.25 
                 6220.04 
                 6608.75 
                 6997.51 
               
               
                 5 of 
               
               
                 a Kind 
               
               
                 12-17 
                 3431 
                 .823 
                 .89 
                 .95 
                 1.01 
                 1.08 
                 1.14 
               
               
                 or 
               
               
                 18-23 
               
               
                 16-19 
                 3030 
                 1.01 
                 1.10 
                 1.18 
                 1.25 
                 1.33 
                 1.41 
               
               
                 5-11 &amp; 
                 914 
                 4.88 
                 5.26 
                 5.63 
                 6.01 
                 6.38 
                 6.76 
               
               
                 24-30 
               
               
                 10-14 
                 3192 
                 .93 
                 1.01 
                 1.08 
                 1.15 
                 1.22 
                 1.29 
               
               
                 &amp; 
               
               
                 21-25 
               
               
                 15 &amp; 20 
                 1302 
                 3.23 
                 3.48 
                 3.73 
                 3.98 
                 4.23 
                 4.48 
               
               
                 5, 7, 9, 
                 2142 
                 1.71 
                 1.84 
                 1.97 
                 2.10 
                 2.24 
                 2.37 
               
               
                 11, 13, 
               
               
                 15, 17, 
               
               
                 - or - 
               
               
                 20, 22, 
               
               
                 24, 26, 
               
               
                 28, 30  
               
               
                 10-14 
                 1596 
                 2.52 
                 2.71 
                 2.90 
                 3.10 
                 3.29 
                 3.49 
               
               
                 or 
               
               
                 21-25 
               
               
                 13-15 
                 1611 
                 2.49 
                 2.68 
                 2.87 
                 3.06 
                 3.25 
                 3.44 
               
               
                 or 
               
               
                 20-22 
               
               
                 11-15 
                 2121 
                 1.73 
                 1.87 
                 2.00 
                 2.13 
                 2.27 
                 2.40 
               
               
                 or 
               
               
                 20-24 
               
               
                 13-16 
                 2346 
                 1.50 
                 1.62 
                 1.74 
                 1.85 
                 1.97 
                 2.08 
               
               
                 or 
               
               
                 19-22 
               
               
                  5-16 
                 3108 
                 .98 
                 1.05 
                 1.13 
                 1.20 
                 1.28 
                 1.35 
               
               
                 or 
               
               
                 19-30 
               
               
                   
               
             
          
         
       
     
     B. The Casino Dice Game 
     As described above, the dice game of the present invention may be played using a set of dice and a game table as shown in FIGS. 1-3. In this embodiment of the present invention, the method of playing the dice game comprises one or more of the following steps: (1) designating a roller of the dice; (2) placing one or more bets on one or more possible outcomes of the dice roll; (3) rolling the dice; (4) removing losing bets from the game table; and (5) paying one or more winning bets based on pay-out odds for the given bet. 
     In the step of designating a particular roller of the dice, the step may be eliminated when only one player is playing the game. When more than one player is playing the game, a player may roll the dice one or more times at his or her choosing, and then forward the dice clockwise to the next player. Desirably, each player is given the option to roll the dice at least once in order to maintain interest in the game. However, in some cases, a player may choose not to roll the dice, and may pass on his or her opportunity to roll the dice. 
     In one desired embodiment of the present invention, each player is given the opportunity to roll the dice if he or she chooses. Each player may roll the dice up to a predetermined number of times and then passes the dice to the next roller to provide each player with an opportunity to roll the dice. Desirably, each player rolls the dice three times and then passes the dice to the next roller. 
     The step of placing a bet typically involves a request to a casino employee to place a given amount on a location of the game table as described in FIGS. 1-3. In most cases, the game table is of such a size that it is difficult for a given player to reach all of the locations on the table. Further, it is desirable for the betting locations to be positioned outside of arm&#39;s reach of the players in order to eliminate the possibility of a player manipulating a given bet during or after the roll of the dice. One possible player position is along an outer perimeter of a game table, for example, along lower section  32  (see FIG. 3) so that players can read the odds and interact with the casino employee. Desirably, the casino employee is positioned on an opposite side of the game table, such as a position adjacent to the “5-Dice Big Wheel”  317  in FIG.  3 . 
     Prior to placing a bet, a player may refer to the roll history display, when present, to observe a roll history for the game table. Roll history displays have been described above. 
     One or more bets may be played by each player, and one or more players may place a bet on the same outcome. When two or more players place a bet on the same outcome, the casino employee in charge of the game table positions the bets relative to the position of the players to one another. For example, if players A, B and C all place $5 bets on the number “8” (rectangle  117  in FIG. 1) and players A, B and C are positioned along lower section  12  of game table  10 , then the casino table operator will position the bets of the players A, B and C along the lower side of rectangle  117  closest to horizontal line  13  on table  10 . 
     The method of playing the dice game in this particular embodiment may further include a step prior to rolling the dice, wherein the casino table operator give each player the option to change his or her bet or the amount of the bet prior to rolling the dice. Once the casino table operator has given each player this option and changes, if any, have been made to the bets, the casino table operator typically announces that all bets are final, and requests that the roller proceed to roll the dice. 
     Typically, a player with a winning bet is paid based on the pay-out odds of the bet using casino tokens (chips), which may range in value from $0.50 up to $10,000. A player with a winning bet keep his or her original bet and is paid an amount of winnings based on the pay-out odds of the bet. Once a player has finished playing the dice game, the player may cash in any casino chips to obtain the desired currency. 
     C. Method of Playing the Board Game 
     The method of playing the dice game of the present invention may also include a game board as described above. In this embodiment of the present invention, the method of playing may include one or more of the method steps described above in regard to the casino table game and/or one or more additional steps. In the board game method, one player or observer is designated to be the casino or “banker.” The banker controls the collection and pay-out of money for a given bet or series of bets. 
     Any process may be used to determine the first roller of the dice. Suitable methods include, but are not limited to, having each player roll the dice wherein the roller of the highest number is designated the first roller of the dice to start the board game. Desirably, each player takes his or her turn rolling the dice. The dice are passed clockwise from player to player giving each player an opportunity to roll the dice. 
     In one embodiment of the present invention, players may start the board game with a designated amount of money to be used on making one or more bets per roll of the dice. If a player runs out of money, the player is out of the game. The first player to reach a designated amount of money or the last player to remain in the game is declared the winner of the board game. 
     Money used in this embodiment may be imitation money, such as found in a MONOPOLY™ game. Denominations of bills can range from $1 up to $10,000. 
     The method of playing the board game may include a step wherein the banker or spectator asks each player if they want to modify, or make additional bets. At some point after bets are modified, the banker or spectator declares that all bets are final, and asks the current roller to roll the dice. 
     D. Method of Playing the Electronic Version of the Dice Game 
     As explained above, the dice game of the present invention may also be played on an electronic device. In addition to the one or more method steps described above with regard to the table dice game and the board dice game, the method of playing the electronic version of the dice game may contain one or more additional steps. Suitable additional steps in the electronic version of the dice game may include, but are not limited to, inputting one or more coins or tokens into the electronic device; canceling a given bet by using one of more mechanical devices as described above (i.e., button, touch screen, etc.); selecting a roll outcome using one or more mechanical devices as described above; verifying a given selected roll outcome by responding to a prompt from the electronic device; and rolling the dice by initiating a roll through one or more mechanical devices as described above. 
     The step of inputting coins or tokens into the electronic device may allow a player to deposit multiple coins for storage in a player account, so that the player may make multiple bets in series with one or another after depositing coins into the account. As a player places a bet, the amount of the bet is subtracted from the players account. If the player wins the bet, the original bet amount and an amount of winnings based on the pay-out odds for the winning bet are automatically paid to the player. The winnings paid out to the player may be paid directly to the player in the form of coins or tokens, or the amount of winnings may be deposited directly into the player&#39;s account for future use. 
     The step of placing a bet on the electronic device may entail pushing a button, moving a cursor over the display screen to a particular location for placing a bet (i.e., on a table design as shown in FIGS.  1 - 3 ), or simply touching the display screen. Throughout the process of placing a bet and determining an amount of the bet, the electronic device may provide prompts to the player to confirm or verify a particular bet. 
     In one embodiment of the present invention, the step of rolling the dice involves simply pushing a button. Desirably, the display screen displays the following components: a table design showing one or more bets made by the player or players; a display, which shows the dice rolling and ultimately stopping on a roll combination; and the balance in a player&#39;s account. The electronic device may be programmed to provide light and/or sound for winning bets and/or losing bets. 
     III. Special Rules That May Be Used For Dice Game 
     The dice game of the present invention may include one or more special rules depending on the number of dice rolled. The following rules described below may be used to play the game, but are not required. 
     A. Three-Dice Game Rules 
     Some special rules for the 3 dice game may include, but are not limited to: 
     (1) If player A bets on a pair, no player bets on 3-of-a-kind, and 3-of-a-kind is rolled, player A wins the pair bet; and 
     (2) If player A bets on a pair, and player B bets on 3-of-a-kind, and 3-of-a-kind is rolled, player B wins on the 3-of-a-kind bet, and player A wins the pair bet. 
     B. Four-Dice Game Rules 
     Some special rules for the 4 dice game may include, but are not limited to: 
     (1) If player A bets on a pair, no player bets on 2 pair, 3-of-a-kind, or 4-of-a-kind, and one of 2 pair, 3-of-a-kind, or 4-of-a-kind is rolled, player A wins the pair bet; 
     (2) If player A bets on a pair, and player B bets on any one of 2 pair, 3-of-a-kind, or 4-of-a-kind, and one of 2 pair, 3-of-a-kind, or 4-of-a-kind is rolled, player B wins on the 2 pair, 3-of-a-kind, or 4-of-a-kind bet, and player A wins the pair bet; 
     (3) If player A bets on 2 pair, no player bets on 4-of-a-kind, and 4-of-a-kind is rolled, player A wins the 2 pair bet; 
     (4) If player A bets on 2 pair, and player B bets on 4-of-a-kind, and 4-of-a-kind is rolled, player B wins on the 4-of-a-kind bet, and player A wins the pair bet; 
     (5) If player A bets on 3-of-a-kind, no player bets on 4-of-a-kind, and 4-of-a-kind is rolled, player A wins the 3-of-a-kind bet; and 
     (6) If player A bets on 3-of-a-kind, and player B bets on 4-of-a-kind, and 4-of-a-kind is rolled, player B wins on the 4-of-a-kind bet, and player A wins the 3-of-a-kind bet. 
     C. Five Dice Game Rules 
     Some special rules for the 5 dice game may include, but are not limited to: 
     (1) If player A bets on 2 pair, no player bets on a full house, 4-of-a-kind, or 5-of-a-kind, and a full house, 4-of-a-kind, or 5-of-a-kind is rolled, player A wins the 2-pair bet; 
     (2) If player A bets on 2 pair, and player B bets on a full house, 4-of-a-kind, or 5-of-a-kind, and a full house, 4-of-a-kind, or 5-of-a-kind is rolled, player B wins on the a full house, 4-of-a-kind, or 5-of-a-kind bet, and player A wins the 2-pair bet; 
     (3) If player A bets on 3-of-a-kind, no player bets on a full house, 4-of-a-kind, or 5-of-a-kind, and a full house, 4-of-a-kind, or 5-of-a-kind is rolled, player A wins the 3-of-a-kind bet; 
     (4) If player A bets on 3-of-a-kind, and player B bets on any one of a full house, 4-of-a-kind, or 5-of-a-kind, and a full house, 4-of-a-kind, or 5-of-a-kind is rolled, player B wins on the full house, 4-of-a-kind, or 5-of-a-kind bet, and player A win the 3-of-a-kind bet; 
     (5) If player A bets on a full house, no player bets on 5-of-a-kind, and a 5-of-a-kind is rolled, player A wins the full house bet; 
     (6) If player A bets on a full house, and player B bets on 5-of-a-kind, and 5-of-a-kind is rolled, player B wins on the 5-of-a-kind bet, and player A wins the full house bet; 
     (7) If player A bets on 4-of-a-kind, no player bets on 5-of-a-kind, and a 5-of-a-kind is rolled, player A wins the 4-of-a-kind bet; and 
     (8) If player A bets on 4-of-a-kind, and player B bets on 5-of-a-kind, and 5-of-a-kind is rolled, player B wins on the 5-of-a-kind bet, and player A wins the 4-of-a-kind bet. 
     While the specification has been described in detail with respect to specific embodiments thereof, it will be appreciated that those skilled in the art, upon attaining an understanding of the foregoing, may readily conceive of alterations to, variations of, and equivalents to these embodiments. Accordingly, the scope of the present invention should be assessed as that of the appended claims and any equivalents thereto.