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The tangram () is a
dissection puzzle A dissection puzzle, also called a transformation puzzle or ''Richter Puzzle'', is a tiling puzzle where a set of pieces can be assembled in different ways to produce two or more distinct geometric shapes. The creation of new dissection puzzles ...
consisting of seven flat polygons, called ''tans'', which are put together to form shapes. The objective is to replicate a pattern (given only an outline) generally found in a puzzle book using all seven pieces without overlap. Alternatively the ''tans'' can be used to create original minimalist designs that are either appreciated for their inherent aesthetic merits or as the basis for challenging others to replicate its outline. It is reputed to have been invented in
China China, officially the People's Republic of China (PRC), is a country in East Asia. It is the world's most populous country, with a population exceeding 1.4 billion, slightly ahead of India. China spans the equivalent of five time zones and ...
sometime around the late 18th century and then carried over to
America The United States of America (U.S.A. or USA), commonly known as the United States (U.S. or US) or America, is a country primarily located in North America. It consists of 50 states, a federal district, five major unincorporated territorie ...
and
Europe Europe is a large peninsula conventionally considered a continent in its own right because of its great physical size and the weight of its history and traditions. Europe is also considered a Continent#Subcontinents, subcontinent of Eurasia ...
by trading ships shortly after. It became very popular in Europe for a time, and then again during
World War I World War I (28 July 1914 11 November 1918), often abbreviated as WWI, was one of the deadliest global conflicts in history. Belligerents included much of Europe, the Russian Empire, the United States, and the Ottoman Empire, with fightin ...
. It is one of the most widely recognized dissection puzzles in the world and has been used for various purposes including amusement, art, and education.


Etymology

The origin of the word 'tangram' is unclear. One conjecture holds that it is a compound of the Greek element '-gram' derived from ''γράμμα'' ('written character, letter, that which is drawn') with the 'tan-' element being variously conjectured to be Chinese ''t'an'' 'to extend' or Cantonese ''t'ang'' 'Chinese'. Alternatively, the word may be derivative of the archaic English 'tangram' meaning "an odd, intricately contrived thing". In either case, the first known use of the word is believed to be found in the 1848 book ''Geometrical Puzzle for the Young'' by mathematician and future Harvard University president Thomas Hill who likely coined the term in the same work. Hill vigorously promoted the word in numerous articles advocating for the puzzle's use in education and in 1864 it received official recognition in the English language when it was included in Noah Webster's ''American Dictionary''.


History


Origins

Despite its relatively recent emergence in the West, there is a much older tradition of dissection amusements in China which likely played a role in its inspiration. In particular, the modular banquet tables of the Song dynasty bear an uncanny resemblance to the playing pieces of the Tangram and there were books dedicated to arranging them together to form pleasing patterns. Several Chinese sources broadly report a well-known Song dynasty polymath Huang Bosi 黄伯思 who developed a form of entertainment for his dinner guests based on creative arrangements of six small tables called 宴几 or 燕几(''feast tables'' or ''swallow tables'' respectively). One diagram shows these as oblong rectangles, and other reports suggest a seventh table being added later, perhaps by a later inventor. According to Western sources, however, the tangram's historical Chinese inventor is unknown except through the pen name Yang-cho-chu-shih (Dim-witted (?) recluse, recluse = 处士). It is believed that the puzzle was originally introduced in a book titled ''Ch'i chi'iao t'u'' which was already being reported as lost in 1815 by Shan-chiao in his book ''New Figures of the Tangram''. Nevertheless, it is generally reputed that the puzzle's origins would have been around 20 years earlier than this. The prominent third-century mathematician
Liu Hui Liu Hui () was a Chinese mathematician who published a commentary in 263 CE on ''Jiu Zhang Suan Shu (The Nine Chapters on the Mathematical Art).'' He was a descendant of the Marquis of Zixiang of the Eastern Han dynasty and lived in the state o ...
made use of construction proofs in his works and some bear a striking resemblance to the subsequently developed Banquet tables which in turn seem to anticipate the Tangram. While there is no reason to suspect that tangrams were used in the proof of the
Pythagorean theorem In mathematics, the Pythagorean theorem or Pythagoras' theorem is a fundamental relation in Euclidean geometry between the three sides of a right triangle. It states that the area of the square whose side is the hypotenuse (the side opposite t ...
, as is sometimes reported, it is likely that this style of geometric reasoning went on to exert an influence on Chinese cultural life that lead directly to the puzzle. The early years of attempting to date the Tangram were confused by the popular but fraudulently written history by famed puzzle maker
Samuel Loyd Samuel Loyd (January 30, 1841 – April 10, 1911), was an American chess player, chess composer, puzzle author, and recreational mathematician. Loyd was born in Philadelphia but raised in New York City. As a chess composer, he authored a num ...
in his 1908 ''The Eighth Book Of Tan''. This work contains many whimsical features that aroused both interest and suspicion amongst contemporary scholars who attempted to verify the account. By 1910 it was clear that it was a hoax. A letter dated from this year from the
Oxford Dictionary Oxford dictionary may refer to any dictionary published by Oxford University Press, particularly: Historical dictionaries * ''Oxford English Dictionary'' (''OED'') * ''Shorter Oxford English Dictionary'', abridgement of the ''OED'' Single-volume d ...
editor Sir James Murray on behalf of a number of Chinese scholars to the prominent puzzlist
Henry Dudeney Henry Ernest Dudeney (10 April 1857 – 23 April 1930) was an English author and mathematician who specialised in logic puzzles and mathematical games. He is known as one of the country's foremost creators of mathematical puzzles. Early life ...
reads "The result has been to show that the man Tan, the god Tan, and the Book of Tan are entirely unknown to Chinese literature, history or tradition." Along with its many strange details ''The Eighth Book of Tan's'' date of creation for the puzzle of 4000 years in antiquity had to be regarded as entirely baseless and false.


Reaching the Western world (1815–1820s)

The earliest extant tangram was given to the Philadelphia shipping magnate and congressman Francis Waln in 1802 but it was not until over a decade later that Western audiences, at large, would be exposed to the puzzle. In 1815, American Captain M. Donnaldson was given a pair of author Sang-Hsia-koi's books on the subject (one problem and one solution book) when his ship, ''Trader'' docked there. They were then brought with the ship to Philadelphia, in February 1816. The first tangram book to be published in America was based on the pair brought by Donnaldson. The puzzle eventually reached England, where it became very fashionable. The craze quickly spread to other European countries. This was mostly due to a pair of British tangram books, ''The Fashionable Chinese Puzzle'', and the accompanying solution book, ''Key''. Soon, tangram sets were being exported in great number from China, made of various materials, from glass, to wood, to tortoise shell. Many of these unusual and exquisite tangram sets made their way to
Denmark ) , song = ( en, "King Christian stood by the lofty mast") , song_type = National and royal anthem , image_map = EU-Denmark.svg , map_caption = , subdivision_type = Sovereign state , subdivision_name = Danish Realm, Kingdom of Denmark ...
. Danish interest in tangrams skyrocketed around 1818, when two books on the puzzle were published, to much enthusiasm. The first of these was ''Mandarinen'' (About the Chinese Game). This was written by a student at
Copenhagen University The University of Copenhagen ( da, Københavns Universitet, KU) is a prestigious public research university in Copenhagen, Denmark. Founded in 1479, the University of Copenhagen is the second-oldest university in Scandinavia after Uppsala Unive ...
, which was a non-fictional work about the history and popularity of tangrams. The second, ''Det nye chinesiske Gaadespil'' (The new Chinese Puzzle Game), consisted of 339 puzzles copied from ''The Eighth Book of Tan'', as well as one original. One contributing factor in the popularity of the game in Europe was that although the
Catholic Church The Catholic Church, also known as the Roman Catholic Church, is the largest Christian church, with 1.3 billion baptized Catholics worldwide . It is among the world's oldest and largest international institutions, and has played a ...
forbade many forms of recreation on the sabbath, they made no objection to puzzle games such as the tangram.


Second craze in Germany (1891–1920s)

Tangrams were first introduced to the German public by industrialist
Friedrich Adolf Richter F. Ad. Richter & Cie was founded and owned by Friedrich Adolf Richter. This German manufacturer produced many products, including pharmaceuticals, music boxes, gramophones, and Anchor Stone building sets. He established his main factory in Rudolst ...
around 1891. The sets were made out of stone or false
earthenware Earthenware is glazed or unglazed nonvitreous pottery that has normally been fired below . Basic earthenware, often called terracotta, absorbs liquids such as water. However, earthenware can be made impervious to liquids by coating it with a ce ...
, and marketed under the name "The Anchor Puzzle". More internationally, the First World War saw a great resurgence of interest in tangrams, on the homefront and trenches of both sides. During this time, it occasionally went under the name of "The
Sphinx A sphinx ( , grc, σφίγξ , Boeotian: , plural sphinxes or sphinges) is a mythical creature with the head of a human, the body of a lion, and the wings of a falcon. In Greek tradition, the sphinx has the head of a woman, the haunches of ...
" an alternative title for the "Anchor Puzzle" sets.


Paradoxes

A tangram
paradox A paradox is a logically self-contradictory statement or a statement that runs contrary to one's expectation. It is a statement that, despite apparently valid reasoning from true premises, leads to a seemingly self-contradictory or a logically u ...
is a dissection fallacy: Two figures composed with the same set of pieces, one of which seems to be a proper subset of the other.Tangram Paradox
by Barile, Margherita, From MathWorld – A Wolfram Web Resource, created by Eric W. Weisstein.
One famous paradox is that of the two
monk A monk (, from el, μοναχός, ''monachos'', "single, solitary" via Latin ) is a person who practices religious asceticism by monastic living, either alone or with any number of other monks. A monk may be a person who decides to dedica ...
s, attributed to
Dudeney Dudeney is a surname. Notable people with the surname include: * Alice Dudeney (1866–1945), English writer, wife of Henry *Henry Dudeney (1857–1930), English writer and mathematician **Dudeney number In number theory, a Dudeney number in a giv ...
, which consists of two similar shapes, one with and the other missing a foot. In reality, the area of the foot is compensated for in the second figure by a subtly larger body. The two-monks paradox – two similar shapes but one missing a foot: The Magic Dice Cup tangram paradox – from Sam Loyd's book ''The 8th Book of Tan'' (1903). Each of these cups was composed using the same seven geometric shapes. But the first cup is whole, and the others contain vacancies of different sizes. (Notice that the one on the left is slightly shorter than the other two. The one in the middle is ever-so-slightly wider than the one on the right, and the one on the left is narrower still.) Clipped square tangram paradox – from Loyd's book ''The Eighth Book of Tan'' (1903):


Number of configurations

Over 6500 different tangram problems have been created from 19th century texts alone, and the current number is ever-growing. Fu Traing Wang and Chuan-Chin Hsiung proved in 1942 that there are only thirteen
convex Convex or convexity may refer to: Science and technology * Convex lens, in optics Mathematics * Convex set, containing the whole line segment that joins points ** Convex polygon, a polygon which encloses a convex set of points ** Convex polytope ...
tangram configurations (config segment drawn between any two points on the configuration's edge always pass through the configuration's interior, i.e., configurations with no recesses in the outline).


Pieces

Choosing a unit of measurement so that the seven pieces can be assembled to form a square of side one unit and having area one square unit, the seven pieces are: * 2 large right triangles (hypotenuse 1, sides , area ) * 1 medium right triangle (hypotenuse , sides , area ) * 2 small right triangles (hypotenuse , sides , area ) * 1
square In Euclidean geometry, a square is a regular quadrilateral, which means that it has four equal sides and four equal angles (90-degree angles, π/2 radian angles, or right angles). It can also be defined as a rectangle with two equal-length adj ...
(sides , area ) * 1
parallelogram In Euclidean geometry, a parallelogram is a simple (non- self-intersecting) quadrilateral with two pairs of parallel sides. The opposite or facing sides of a parallelogram are of equal length and the opposite angles of a parallelogram are of equa ...
(sides of and , height of , area ) Of these seven pieces, the parallelogram is unique in that it has no
reflection symmetry In mathematics, reflection symmetry, line symmetry, mirror symmetry, or mirror-image symmetry is symmetry with respect to a reflection. That is, a figure which does not change upon undergoing a reflection has reflectional symmetry. In 2D ther ...
but only
rotational symmetry Rotational symmetry, also known as radial symmetry in geometry, is the property a shape has when it looks the same after some rotation by a partial turn. An object's degree of rotational symmetry is the number of distinct orientations in which i ...
, and so its
mirror image A mirror image (in a plane mirror) is a reflected duplication of an object that appears almost identical, but is reversed in the direction perpendicular to the mirror surface. As an optical effect it results from reflection off from substances ...
can be obtained only by flipping it over. Thus, it is the only piece that may need to be flipped when forming certain shapes.


See also

*
Egg of Columbus (tangram puzzle) The Egg of Columbus (''Ei des Columbus'' in German) is a puzzle consisting of a flat egg-like shape divided into 9 or 10 pieces by straight cuts. The goal of the puzzle is to rearrange the pieces so as to form other specific shapes, as in a tangr ...
*
Mathematical puzzle Mathematical puzzles make up an integral part of recreational mathematics. They have specific rules, but they do not usually involve competition between two or more players. Instead, to solve such a puzzle, the solver must find a solution that sati ...
*
Ostomachion ''Ostomachion'', also known as ''loculus Archimedius'' (Archimedes' box in Latin) and also as ''syntomachion'', is a mathematical treatise attributed to Archimedes. This work has survived fragmentarily in an Arabic version and a copy, the ''A ...
*
Tiling puzzle Tiling puzzles are puzzles involving two-dimensional packing problems in which a number of flat shapes have to be assembled into a larger given shape without overlaps (and often without gaps). Some tiling puzzles ask you to dissect a given ...


References

;Sources * *


Further reading

* Anno, Mitsumasa. ''Anno's Math Games'' (three volumes). New York: Philomel Books, 1987. (v. 1), (v. 2), (v. 3). * Botermans, Jack, et al. ''The World of Games: Their Origins and History, How to Play Them, and How to Make Them'' (translation of ''Wereld vol spelletjes''). New York: Facts on File, 1989. . * Dudeney, H. E. ''Amusements in Mathematics''. New York: Dover Publications, 1958. *
Gardner, Martin Martin Gardner (October 21, 1914May 22, 2010) was an American popular mathematics and popular science writer with interests also encompassing scientific skepticism, micromagic, philosophy, religion, and literatureespecially the writings of Lewis ...
. "Mathematical Games—on the Fanciful History and the Creative Challenges of the Puzzle Game of Tangrams", ''Scientific American'' Aug. 1974, p. 98–103. * Gardner, Martin. "More on Tangrams", ''Scientific American'' Sep. 1974, p. 187–191. * Gardner, Martin. ''The 2nd Scientific American Book of Mathematical Puzzles and Diversions''. New York: Simon & Schuster, 1961. . * Loyd, Sam. ''Sam Loyd's Book of Tangram Puzzles (The 8th Book of Tan Part I)''. Mineola, New York: Dover Publications, 1968. * Slocum, Jerry, et al. ''Puzzles of Old and New: How to Make and Solve Them''. De Meern, Netherlands: Plenary Publications International (Europe); Amsterdam, Netherlands: ADM International; Seattle: Distributed by University of Washington Press, 1986. .


External links


Past & Future: The Roots of Tangram and Its Developments


by puzzle designer G. Sarcone {{Authority control Tiling puzzles Chinese games Recreational mathematics Mathematical manipulatives Single-player games Geometric dissection Chinese ancient games Chinese inventions Polyforms 19th-century fads and trends