Patent Application
20180082608
(NOT APPLICABLE)
The invention relates to a system or set of polyhedral gaming devices (commonly known as dice) that include non-traditional number series and combinations of numbers that optimize reinforcement of certain mathematical operations, specifically certain operations associated with more “difficult to learn” number operation combinations or so-called “fact families.”
On traditional dice often used in gaming, ordinal numbers generally include number sets ranging from 1 to the highest number possible given the sides on the solid, with some variations and number repeating on certain designs (e.g., numbers 1-6 appearing twice on a twelve sided die, or numbers 0-9 appearing twice on a twenty-sided die). These designs uniformly produce equally distributed results of combinations of the numbers depicted.
When rolling a common pair of 6-sided dice, rolls that include the number 1 or 2 on at least one side of one of the dice occur over 55% of the time. For young children or other players who have basic number operational math skills, these rolls are extremely simple to add to another number produced on the accompanying die. Such dice are limited in their efficiency in teaching harder to learn sums and products. Consequently, these dice, as well as all other ordinal dice, are limited in their educational value.
There are distinct but varying patterns in the deficiencies of otherwise highly accomplished high school students routinely display on the math sections of standardized timed tests such as the SAT and ACT. Many of these deficiencies can be traced to a failure to commit certain harder to learn “math facts” (certain single digit sums and products) to long-term memory (sometimes commonly interchanged with the concept of achieving “math fact fluency”). Although there are general patterns to the observed deficiencies, there is a significant amount of variation when it comes to the gaps individual students display.
Tests of elementary school age children of varying ages were conducted to observe learning trends and understand more effective ways to develop “math fact fluency.” Understanding that the difficulties students displayed in subtraction and division operations could invariably be traced to a lack of mastery of addition and multiplication math facts, observations were made on understanding the relative success and ease in which both younger elementary and high school students learned and retained math fact fluency and what math facts were persistently problematic for the groups.
After making these observations, the dice system of the described embodiments was developed that could be used in a wide variety of game applications that would target the persistent hurdles young elementary students face in achieving math fact fluency, many of which are likely to face continued challenges throughout their early education and beyond.
Although the dice system would desirably target the broad array of challenges all students face, preferred designs would be able to adapt to the unique needs of an individual student by effectively and progressively eliminating dice combinations (and their associated math operations in game play) of previously mastered material.
The dice system of the described embodiments has been developed to be used in original games and game play that allow for adaptive use of different combinations of the dice to encourage mastery of specific math operations, depending on the educational skill level of the player. Moreover, this dice system is designed to continually challenge players to increase math proficiency in material typically associated with academic curriculum that spans several years, and its adaptable design is uniquely responsive to the varying ways young children successfully learn, progress through, and master math operations of increasing complexity and achieve so-called “math fact fluency.”
According to the described embodiments, a set of polyhedral game pieces includes number combinations that are universally harder to master (compare addition flash cards that include combinations such as 5+8, or 4+7, versus 5+1 or 2+2, or multiplication flash cards that include number combinations such as 8×6 or 6×7, versus 5×10 or 2×4). In this dice game/system, each dice roll will encourage and build recognition of harder number combinations and will be used in games that can be played with originally developed game content, or incorporated into other games.
In an exemplary embodiment, a set of polyhedral game pieces is suited for reinforcing certain mathematical operations. Each of the polyhedral game pieces includes a plurality of sides, each of which contains a number. The polyhedral game pieces may be configured to eliminate occurrences of level one fact families when rolled. The polyhedral game pieces may be further configured to reduce occurrences of level two fact families when rolled in various combinations. In some embodiments, the polyhedral game pieces may be configured to eliminate occurrences of the level one fact families when rolled by excluding numbers 1, 2 and 10. The polyhedral game pieces may be configured to reduce occurrences of the level two fact families by limiting a number of sides including numbers 3 and 9. The polyhedral game pieces may be configured to eliminate occurrences of the level one fact families when rolled by excluding numbers 1, 2, 5 and 10. The configuration of the polyhedral game pieces may be customizable based on desired specific areas of emphasis.
In some embodiments, the set of polyhedral game pieces includes two 12-sided dice each with numbers 3, 4, 5, 6, 7 and 8 each occurring on two of the plurality of sides, respectively. Alternatively or additionally, the set of polyhedral game pieces may include two 12-sided dice each with numbers 4, 5, 6, 7, 8 and 9 each occurring on two of the plurality of sides, respectively. Alternatively or additionally, the set of polyhedral game pieces may include two 12-sided dice each with numbers 3, 4, 6, 7, 8 and 9 each occurring on two of the plurality of sides, respectively. In some embodiments, the set includes multiple sets of 12-sided dice pairs, where each of the dice pairs may be configured differently. Each of the dice pairs may also be color coded.
In some embodiments, the set of polyhedral game pieces includes two six-sided dice each with numbers 3, 4, 5, 6, 7 and 8 each occurring on one of the plurality of sides, respectively. Alternatively or additionally, the set may include two six-sided dice each with numbers 4, 5, 6, 7, 8 and 9 each occurring on one of the plurality of sides, respectively. Alternatively or additionally, the set may include two six-sided dice each with numbers 3, 4, 6, 7, 8 and 9 each occurring on one of the plurality of sides, respectively.
The set of polyhedral game pieces may include two 12-sided dice, where one of the 12-sided dice includes numbers 3, 4, 5, 6, 7 and 8 each occurring on two of the plurality of sides, respectively, and the other of the 12-sided dice includes numbers 4, 5, 6, 7, 8 and 9 each occurring on two of the plurality of sides, respectively.
In another exemplary embodiment, a set of polyhedral game pieces is suited for reinforcing certain mathematical operations. Each of the polyhedral game pieces includes a plurality of sides, each of which contains a number. First certain specific numbers are excluded from the polyhedral game pieces to thereby reduce or eliminate occurrences of level one fact families when rolled. Second certain specific numbers, different from the first certain specific numbers, may be limited to thereby deemphasize occurrences of level two fact families when rolled.
In yet another exemplary embodiment, the numbers on the polyhedral game pieces are selected such that the polyhedral game pieces are configured to eliminate occurrences of level one fact families when rolled and to deemphasize level two fact families when rolled.
These and other aspects and advantages will be described in detail with reference to the accompanying drawings, in which:
With reference to the drawings, the dice system of the described embodiments exclude numbers associated with so-called easy to learn “fact families” such as 1, 2, and 10, and can deemphasize (from a probabilistic play perspective) or eliminate certain so-called medium level difficulty “fact family” numbers (for example, numbers 3 and 9 when focusing on mastery of harder to learn addition operations, or the number 5 when focusing on mastery of hard to learn multiplication operations). For purposes of the present description, the easy to learn “fact families” are deemed “level one fact families” and exclude at least the numbers 1 and 2, or the numbers 1, 2 and 10, or the numbers 1, 2, 5 and 10. The excluded number sets may additionally exclude the number 11 and/or the number 12 in some variations. The medium level fact families are deemed “level two fact families” and include the numbers 3 and 9 for game play aimed at teaching mastery of addition fact families, and the number 5 when used in game play emphasizing the mastery of multiplication fact fluency. Under certain constructions, the dice can be configured during play to emphasize a level two fact family number with the same probability of occurrence as any other individual die face number, reduce the probability of occurrence of the number, or eliminate the probability of occurrence all together, depending on the skill level of individual players.
Due to the multiple die construct of the dice system, game play can be adapted to the specific areas of emphasis that would benefit a particular child the most. For example, a child who has already learned how to add sums involving the number 9 more efficiently than the number 3 can adapt sum and number tally games that are played with the dice to exclude dice with 9s (e.g., a “Mean 11” die set 100 as shown in
A preferred dice design will include common 12-sided and/or 6-sided polyhedral solids. With continued reference to the drawings, each of the polyhedral game pieces includes a plurality of sides 102, each of which contains a number 104. As described above, with the use of non-conventional numbering, the game pieces are configured to eliminate occurrences of the level one fact families when rolled. Similarly, the game pieces may be further configured to reduce or eliminate occurrences of the level two fact families when rolled, by interchanging dice from the respective sets to vary the probabilities of occurrence as desired or directed in game play. The game pieces may be customizable based on desired specific areas of emphasis. In some embodiments, the numbers 104 on the sides 102 of the polyhedral game pieces may be selected such that the polyhedral game pieces are configured to eliminate the occurrences of level one fact families when rolled and also to deemphasize the level two fact families when rolled. For example, first certain specific numbers may be excluded from the game pieces to thereby reduce or eliminate the occurrences of the level one fact families when rolled; and second certain specific numbers, different from the first certain specific numbers, may be limited (e.g., appearing only once on a 12-sided die, or by using a die or dice from different sets in pairs or collective dice pools during play) to thereby vary the occurrences of the level two fact families when rolled.
In some embodiments, the “starter” or “base” set of dice will include 12-sided polyhedral solids that include two 12-sided dice 100 with the number set 3, 4, 5, 6, 7 and 8 as shown in
Another set of two 12-sided dice 110 of similar physical construction may include the number set 4, 5, 6, 7, 8 and 9 as shown in
In some embodiments, the dice may be color coded. For example, the Mean 11 dice 100 shown in
With reference to
From many perspectives, 12-sided dice demonstrate more control when rolling, making speed dice games more enjoyable.
Each side on all dice will have a roughly equal chance of occurring on rolls. In an alternative construction, a size of the sides or polyhedral weighting may vary to avoid or reduce the occurrences of “level one fact families” or “level two fact families” when rolled. The system/dice may include any distribution of the aforementioned numbers on similar die or dice sets. The dice may include Arabic or other recognized numeral representations, as well as symbols that would depict the desired numbers displayed (such as dots or “pips” with the associated number of dots or “pips” appearing on the face, polygon shapes with the corresponding number of sides and corners, dots or “pips” in patterns, or other markings that clearly denote the desired numbers).
In some embodiments, with reference to
Exemplary Games: Although the dice will be applicable to countless game variations, it is contemplated that each initial dice set may include a set of game rules for certain base games that can be played alone, without inclusion in a larger or more elaborate game (like a board game, table-top game, or role-playing game). As would be appreciated by those of ordinary skill in the art, these “base games” and their concepts could, however, be incorporated into such elaborate games, or the dice could be used in new or similar ways.
Exemplary Base Game 1: Lucky 11 Vs. Mean 13:
(Basic Level Game that Optimizes Learning of Addition of Harder to Learn Single Digit Sums, Number Sense, Probability Distribution)
One player rolls a Mean 11 Dice Set, hoping for a sum of 11; the other player rolls a Mean 13 Dice Set, trying for a sum of 13. First player to hit their number wins. Multiple rounds can be played to determine a best-of-series winner; the loser of a previous round rolls first in the next round.
Exemplary Base Game 2: Add Two, Takeaway Blue:
(Basic to Intermediate Level Game that Optimizes Addition and Subtraction of Harder Sums/Differences, Number Sense, Larger Number Addition and Tallying)
Players roll a Mean 13 Dice Set and one Mean 11 Die, adding the two Mean 13 dice and subtracting the Mean 11 die. Players alternate turns and the first to 100 (or more) wins.
Exemplary Base Game 3: Double Done 151:
(Basic to Intermediate Level Game that Optimizes Addition of Harder Sums, Larger Number Addition, Multiples of 25, Number Sense, Probability Distribution)
A strategy game where players alternate turns rolling one Mean 11 die and one Mean 13 die (referred to as a “Mean 12” die set), adding the dice and tallying consecutive rolls (like many games, this game can also be played with different dice combinations depending on the learning needs of the player). The first player to total of 151 (or more) wins. A player can roll as many times as he or she wants on any turn, but double number rolls (e.g. 7 and 7) can wipe-out a player's total tally to zero and end the player's turn. Players can choose to freeze their running tally immediately after reaching an amount equal to or above any increment/multiple of 25 (i.e. 25, 50, 75, 100, 125, 150) by relinquishing their turn. This ensures any future wipe-outs only go back to the multiple 25/increment number where the player froze. After freezing at any number, the player's next turn starts at the tally achieved before freezing (not necessarily the increment of 25). Also, when a player starts from zero, he or she must keep rolling until reaching a tally of at least 25 (first opportunity to freeze), and a player cannot freeze at the same number he or she froze at the turn before (must get to at least one increment of 25 higher).
Exemplary Base Game 4: Score 24!:
(Intermediate Game that Optimizes Addition of Harder Sums, Number Sense, Larger Number Addition, Probability Distribution, Pre-Algebra Skills)
Players alternate rolling four dice (Mean 11 and Mean 13 sets) in an attempt to get a sum of 24. Players can re-roll any number of dice—up to four times—and keep any die/dice results after any roll. All die faces must be added. Earn points as follows:
24 on 1 roll: 5 points
24 on 2 rolls: 4 points
24 on 3 rolls: 3 points
24 on 4 rolls: 2 points
Score of 23 or 25 (any number of rolls up to 4): 1 point (player relinquishes turn after taking this point if all four rolls not taken)
Score of 24 with 4 sixes (any number of rolls up to 4): 6 points
Failure to achieve an above result: 0 points
First player to a tally of 24 (or more) points from roll scores wins.
Exemplary Base Game 5: Prime Time:
(Advanced Game that Promotes Mastery of Harder to Learn Addition, Subtraction, Multiplication, Larger Number Addition, Number Sense, Probability, Prime Number Recognition)
This advanced game for older players also uses four dice (selected die sets could utilize Multi-dice for players who have mastered times tables involving 5s). The object is to get the highest prime number result (for prime numbers between 1-100) by performing addition, subtraction, multiplication or division using each of the numbers taken from a player's final roll results (each number is only used once-see scoring example below). All four dice are rolled on the first roll, and a player can choose to roll any number of dice on up to three more rolls, or keep any or all die result(s) after any roll before that. Players can use the 1-100 prime number chart to target certain numbers while calculating possibilities on the given die faces. Players alternate turns and tally consecutive prime number results after each turn. The first player to tally 1,000 wins. Final roll totals equaling a prime number between 1-10 (2, 3, 5 and 7) earns a total of 10 points for the round. All other prime numbers achieved are worth their face value. Use timers between rolls for more advanced players or to quicken play. Use the prime number table to help with targeting numbers.
Scoring example: final die face numbers 5, 6, 8 and 9 could equal a maximum score of 83 by multiplying 8 and 9 (equals 72) and adding 6 plus 5 (equals 11), for a final prime result of 83. A player could also score other prime numbers with these results, but can only credit one result to his or her tally.
Playsheets, Gamebooks, and other games: The dice system is also usable in a number of original games and playsheets specifically designed to emphasize varying levels of math skills, through the use of various unique combinations of the dice in the base pack.
While the invention has been described in connection with what is presently considered to be the most practical and preferred embodiments, it is to be understood that the invention is not to be limited to the disclosed embodiments, but on the contrary, is intended to cover various modifications and equivalent arrangements included within the spirit and scope of the appended claims.
This application claims the benefit of U.S. Provisional Patent Application No. 62/398,218, filed Sep. 22, 2016, the entire content of which is herein incorporated by reference.
| Number | Date | Country | |
|---|---|---|---|
| 62398218 | Sep 2016 | US |
