Recreational mathematics

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Recreational mathematics is mathematics carried out for recreation (entertainment) rather than as a strictly research-and-application-based professional activity or as a part of a student's formal education. Although it is not necessarily limited to being an endeavor for amateurs, many topics in this field require no knowledge of advanced mathematics. Recreational mathematics involves mathematical puzzles and games, often appealing to children and untrained adults and inspiring their further study of the subject.[1]

The Mathematical Association of America (MAA) includes recreational mathematics as one of its seventeen Special Interest Groups, commenting:

Recreational mathematics is not easily defined because it is more than mathematics done as a diversion or playing games that involve mathematics. Recreational mathematics is inspired by deep ideas that are hidden in puzzles, games, and other forms of play. The aim of the SIGMAA on Recreational Mathematics (SIGMAA-Rec) is to bring together enthusiasts and researchers in the myriad of topics that fall under recreational math. We will share results and ideas from our work, show that real, deep mathematics is there awaiting those who look, and welcome those who wish to become involved in this branch of mathematics.[2]

Mathematical competitions (such as those sponsored by mathematical associations) are also categorized under recreational mathematics.

Topics

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Some of the more well-known topics in recreational mathematics are Rubik's Cubes, magic squares, fractals, logic puzzles and mathematical chess problems, but this area of mathematics includes the aesthetics and culture of mathematics, peculiar or amusing stories and coincidences about mathematics, and the personal lives of mathematicians.

Mathematical games

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Mathematical games are multiplayer games whose rules, strategies, and outcomes can be studied and explained using mathematics. The players of the game may not need to use explicit mathematics in order to play mathematical games. For example, Mancala is studied in the mathematical field of combinatorial game theory, but no mathematics is necessary in order to play it.

Mathematical puzzles

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Mathematical puzzles require mathematics in order to solve them. They have specific rules, as do multiplayer games, but mathematical puzzles do not usually involve competition between two or more players. Instead, in order to solve such a puzzle, the solver must find a solution that satisfies the given conditions.

Logic puzzles and classical ciphers are common examples of mathematical puzzles. Cellular automata and fractals are also considered mathematical puzzles, even though the solver only interacts with them by providing a set of initial conditions.

As they often include or require game-like features or thinking, mathematical puzzles are sometimes also called mathematical games.

Mathemagics

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Magic tricks based on mathematical principles can produce self-working but surprising effects. For instance, a mathemagician might use the combinatorial properties of a deck of playing cards to guess a volunteer's selected card, or Hamming codes to identify whether a volunteer is lying.[3]

Other activities

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Other curiosities and pastimes of non-trivial mathematical interest include:

Online blogs, podcasts, and YouTube channels

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There are many blogs and audio or video series devoted to recreational mathematics. Among the notable are the following:

Publications

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People

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Prominent practitioners and advocates of recreational mathematics have included professional and amateur mathematicians:

Full name Last name Born Died Nationality Description
Lewis Carroll (Charles Dodgson) Carroll 1832 1898 English Mathematician, puzzlist and Anglican deacon best known as the author of Alice in Wonderland and Through the Looking-Glass.
Sam Loyd Loyd 1841 1911 American Chess problem composer and author, described as "America's greatest puzzlist" by Martin Gardner.[4]
Henry Dudeney Dudeney 1857 1930 English Civil servant described as England's "greatest puzzlist".[5]
Yakov Perelman Perelman 1882 1942 Russian Author of many popular science and mathematics books, including Mathematics Can Be Fun.
D. R. Kaprekar Kaprekar 1905 1986 Indian Discovered several results in number theory, described several classes of natural numbers including the Kaprekar, harshad and self numbers, and discovered the Kaprekar's constant
Martin Gardner Gardner 1914 2010 American Popular mathematics and science writer; author of Mathematical Games, a long-running Scientific American column.
Raymond Smullyan Smullyan 1919 2017 American Logician; author of many logic puzzle books including "To Mock a Mockingbird".
Joseph Madachy Madachy 1927 2014 American Long-time editor of Journal of Recreational Mathematics, author of Mathematics on Vacation.
Solomon W. Golomb   Golomb 1932 2016 American Mathematician and engineer, best known as the inventor of polyominoes.
John Horton Conway   Conway 1937 2020 English Mathematician and inventor of Conway's Game of Life, co-author of Winning Ways, an analysis of many mathematical games.
Noboyuki Yoshigahara   Yoshigahara 1936 2004 Japanese Japan's most celebrated inventor, collector, solver, and communicator of puzzles.
Lee Sallows Sallows 1944 English Invented geomagic squares, golygons, and self-enumerating sentences.

See also

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References

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  1. ^ Kulkarni, D. Enjoying Math: Learning Problem Solving With KenKen Puzzles Archived 2013-08-01 at the Wayback Machine, a textbook for teaching with KenKen Puzzles.
  2. ^ Special Interest Groups of the MAA Mathematical Association of America
  3. ^ Teixeira, Ricardo (2020). Mathemagics: A Magical Journey through Advanced Mathematics. USA: World Scientific. ISBN 9789811214509.
  4. ^ Loyd, Sam (1959). Mathematical Puzzles of Sam Loyd (selected and edited by Martin Gardner), Dover Publications Inc., p. xi, ISBN 0-486-20498-7
  5. ^ Newing, Angela (1994), "Henry Ernest Dudeney: Britain's Greatest Puzzlist", in Guy, Richard K.; Woodrow, Robert E. (eds.), The Lighter Side of Mathematics: Proceedings of the Eugène Strens Memorial Conference on Recreational Mathematics and Its History, Cambridge University Press, pp. 294–301, ISBN 9780883855164.

Further reading

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