Samuel Loyd (January 30, 1841 – April 10, 1911[1]) was an American chess player, chess composer, puzzle author, and recreational mathematician. Loyd was born in Philadelphia but raised in New York City.

Sam Loyd
Born
Samuel Loyd

(1841-01-30)January 30, 1841
Philadelphia, United States
DiedApril 11, 1911(1911-04-11) (aged 70)
Known for
  • Chess
  • puzzles
  • mathematical games

As a chess composer, he authored a number of chess problems, often with interesting themes. At his peak, Loyd was one of the best chess players in the US, and he was ranked 15th in the world, according to chessmetrics.com.

He played in the strong Paris 1867 chess tournament (won by Ignatz von Kolisch) with little success, placing near the bottom of the field.

Following his death, his book Cyclopedia of 5000 Puzzles[2] was published (1914) by his son, Samuel Loyd Jr.[3][4] His son, named after his father, dropped the "Jr" from his name and started publishing reprints of his father's puzzles.[4] Loyd (senior) was inducted into the US Chess Hall of Fame in 1987.[5]

Reputation

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Loyd is widely acknowledged as one of America's great puzzle writers and popularizers, often mentioned as the greatest. Martin Gardner featured Loyd in his August 1957 Mathematical Games column in Scientific American and called him "America's greatest puzzler". In 1898, The Strand dubbed him "the prince of puzzlers". As a chess problemist, his composing style is distinguished by wit and humour.

He is also known for lies and self-promotion, however, and he has been criticized on these grounds—Martin Gardner's assessment continues "but also obviously a hustler". Canadian puzzler Mel Stover called Loyd "an old reprobate", and Matthew Costello called him "puzzledom's greatest celebrity... popularizer, genius", but also a "huckster" and "fast-talking snake oil salesman".[6]

He collaborated with puzzler Henry Dudeney for a while, but Dudeney broke off the correspondence and accused Loyd of stealing his puzzles and publishing them under his own name. Dudeney despised Loyd so intensely that he equated him with the devil.[7]

Loyd claimed from 1891 until his death in 1911 that he invented the fifteen tiles in the box and one space puzzle.[8] This is false, as Loyd had nothing to do with the invention or popularity of the puzzle, and the craze was in the early 1880s, not the early 1870s.[9] The craze had ended by July 1880 and Loyd's first article on the subject was not published until 1896.[9] Loyd first claimed in 1891 that he had invented the puzzle, and he continued to do so until his death.[9] The actual inventor was Noyes Chapman, who applied for a patent in March 1880.[9]

An enthusiast of Tangram puzzles, Loyd popularized them with The Eighth Book Of Tan, a book of seven hundred unique Tangram designs and a fanciful history of the origin of the Tangram, claiming that the puzzle was invented 4,000 years ago by a god named Tan. This was presented as true and has been described as "Sam Loyd's Most Successful Hoax".[8]

Chess problems

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Excelsior problem

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"Excelsior"
abcdefgh
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Mate in 5, 2nd prize, Paris Tourney, 1867. See "Excelsior" for the solution.

One of his best-known chess problems is the following, called "Excelsior" by Loyd after the poem[10] by Henry Wadsworth Longfellow. White is to move and checkmate Black in five moves against any defense:

Loyd bet a friend that he could not pick a piece that didn't give mate in the main line, and when it was published in 1861 it was with the stipulation that White mates with "the least likely piece or pawn".

Steinitz Gambit problem

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"Steinitz Gambit"
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Mate in 3 moves. First Prize, Checkmate Novelty Tourney, 1903

One of the most famous chess problems by Loyd. He wrote on this problem: "The originality of the problem is due to the White King being placed in absolute safety, and yet coming out on a reckless career, with no immediate threat and in the face of innumerable checks."[11]

Charles XII problem

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abcdefgh
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This problem was originally published in 1859. The story involves a chess incident during the siege of Charles XII of Sweden by the Turks at Bender in 1713. "Charles beguiled this period by means of drills and chess, and used frequently to play with his minister, Christian Albert Grosthusen, some of the contests being mentioned by Voltaire. One day while so engaged, the game had been played to this stage, and Charles (White) had just announced checkmate in three."

1. Rxg3 Bxg3
2. Nf3 Bxh2
3. g4#
abcdefgh
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"Scarcely had he uttered the words, when a (Turkish) bullet, shattering the window, dashed the White knight off of the board in fragments. Grothusen started violently, but Charles, with utmost coolness, begged him to put back the other knight and work out the mate, observing that it was pretty enough. But another glance at the board made Charles smile. We do not need the knight. I can give it to you and still mate in four!"

1. hxg3 Be3
2. Rg4 Bg5
3. Rh4+ Bxh4
4. g4#
abcdefgh
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Who would believe it, he had scarcely spoken when another bullet flew across the room, and the pawn at h2 shared the fate of the knight. Grothusen turned pale. "You have our good friends the Turks with you," said the king unconcerned, "it can scarcely be expected that I should contend against such odds; but let me see if I can dispense with that pawn. I have it!" he shouted with a laugh, "I have great pleasure in informing you that there is undoubtedly a mate in 5."

1. Rb7 Be3
2. Rb1 Bg5
3. Rh1+ Bh4
4. Rh2 gxh2
5. g4#
abcdefgh
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In 1900, Friedrich Amelung pointed out that in the original position, if the first bullet had struck the rook instead of the knight, Charles would still have a mate in six.

1. Nf3 Be1
2. Nxe1 Kh4
3. h3 Kh5
4. Nd3 Kh4
5. Nf4 h5
6. Ng6#
abcdefgh
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In 2003, ChessBase posted a fifth variation, attributed to Brian Stewart. After the first bullet took out the knight, if the second had removed the g-pawn rather than the h-pawn, Charles would be able to mate in ten.

1. hxg3 Be1
2. Rg4 Bxg3
3. Rxg3 Kh4
4. Kf4 h5
5. Rg2 Kh3
6. Kf3 h4
7. Rg4 Kh2
8. Rxh4+ Kg1
9. Rh3 Kf1
10. Rh1#

Puzzles

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Sam Loyd's trick donkeys problem

Trick Donkeys problem

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One of Loyd's notable puzzles was the "Trick Donkeys". It was based on a similar puzzle involving dogs published in 1857. In the problem, the solver must cut the drawing along the dotted lines and rearrange the three pieces so that the riders appear to be riding the donkeys.

Vanishing puzzles

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Interactive SVG of The Disappearing Bicyclist – in the SVG file, move the pointer to rotate the disc

A vanishing puzzle is a mechanical optical illusion showing different numbers of a certain object when parts of the puzzle are moved around.[12]

Loyd patented rotary vanishing puzzles in 1896 and published versions named Get Off the Earth, Teddy and the Lion and The Disappearing Bicyclist (pictured). Each had a circular card connected to a cardboard backdrop with a pin, letting it rotate.[13][14][15] In the Disappearing Bicyclist, when the disc is rotated such that the arrow points to A, 13 boys can be seen. When rotated so that the arrow points to B, only 12 boys appear.[16]

Vanishing area puzzle

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chessboard paradox

A square with a side length of 8 units ("chessboard") is dissected into four pieces, which can be assembled into a 5x13 rectangle. Since the area of the square is 64 units but the area of the rectangle is 65 units, this seems paradoxical at first. However, it is just an optical illusion as the pieces don't fit exactly to form a rectangle, but leave a small barely visible gap along the diagonal. This puzzle is also known as the Chessboard paradox or paradox of Loyd and Schlömilch.

Back from the Klondike

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A modern rendering of the "Back from the Klondike" puzzle

This is one of Sam Loyd's most famous puzzles, first printed in the New York Journal and Advertiser, April 24, 1898 (as far as available evidence indicates). Loyd's original instructions were to:

Start from that heart in the center and go three steps in a straight line in any one of the eight directions, north, south, east or west, or on the bias, as the ladies say, northeast, northwest, southeast or southwest. When you have gone three steps in a straight line, you will reach a square with a number on it, which indicates the second day's journey, as many steps as it tells, in a straight line in any of the eight directions. From this new point when reached, march on again according to the number indicated, and continue on, following the requirements of the numbers reached, until you come upon a square with a number which will carry you just one step beyond the border, when you are supposed to be out of the woods and can holler all you want, as you will have solved the puzzle.

Works by Sam Loyd

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  • Sam Loyd's Book of Tangram Puzzles (ISBN 0-486-22011-7)
  • Mathematical Puzzles of Sam Loyd (ISBN 0-486-20498-7): selected and edited by Martin Gardner
  • More Mathematical Puzzles of Sam Loyd (ISBN 0-486-20709-9): selected and edited by Martin Gardner
  • The Puzzle King: Sam Loyd's Chess Problems and Selected Mathematical Puzzles (ISBN 1-886846-05-7): edited by Sid Pickard
  • Sam Loyd's Cyclopedia of 5000 Puzzles, Tricks and Conundrums with Answers ISBN 0-923891-78-1 – Complete 1914 book (public domain) scanned
  • The 8th Book of Tan (1903).

Works about Sam Loyd

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Sam Loyd Award

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The Association for Games & Puzzles International (previously the Association of Game & Puzzle Collectors, and prior to 1999, the American Game Collectors Association, AGCA), gives the Sam Loyd Award for promoting interest in mechanical puzzles through design, development, or manufacture. The following individuals have won it:[17][18]

References

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  1. ^ Harry Golombek, Golombek's Encyclopedia of Chess, 1977, ISBN 0-517-53146-1
  2. ^ Sam Loyd's Cyclopedia of 5000 Puzzles, Tricks and Conundrums with Answers ISBN 0-923891-78-1
  3. ^ Loyd, Sam (1914). Cyclopedia of Puzzles. New York: Lamb Publishing Company. Retrieved December 14, 2017 – via Internet Archive.
  4. ^ a b Gardner, Martin (1959). "Chapter 9: Sam Loyd: America's Greatest Puzzlist". Mathematical puzzles & diversions. New York, N.Y.: Simon and Schuster. p. 84.
  5. ^ "Sam Loyd". World Chess Hall of Fame. Archived from the original on April 4, 2017.
  6. ^ Costello, Matthew J. (September 16, 1996), The Greatest Puzzles of All Time, Courier Dover Publications, p. 45 (Sam Loyd and the Vanishing Puzzle), ISBN 978-0-486-29225-0
  7. ^ Alex Bellos, Alex's Adventures in Numberland (2010)
  8. ^ a b "Sam Loydʼs Most Successful Hoax" (PDF). December 6, 2013.
  9. ^ a b c d The 15 Puzzle (ISBN 1-890980-15-3): by Jerry Slocum and Dic Sonneveld
  10. ^ "RPO -- Henry Wadsworth Longfellow : Excelsior". rpo.library.utoronto.ca. Archived from the original on April 30, 2008. Retrieved August 9, 2022.
  11. ^ a b White, Alain C. (1962) [Orig pub. 1913, Whitehead and Miller]. Sam Loyd and His Chess Problems. Dover Publications. p. 125. hdl:2027/hvd.hn4zf9. ISBN 0-486-20928-8.
  12. ^ The Guardian, Vanishing Leprechaun, Disappearing Dwarf and Swinging Sixties Pin-up Girls – puzzles in pictures
  13. ^ Townsend, Charles Barry (2003). The Curious Book of Mind-boggling Teasers, Tricks, Puzzles & Games. Sterling Publishing Company. ISBN 9781402702143.
  14. ^ "Puzzles of Yore".
  15. ^ "The Disappearing Bicyclist: A Chess Champion's Vintage Puzzle to Tickle Your Brain". February 23, 2012.
  16. ^ "Image Collections Online - "The Disappearing Bicyclist!"".
  17. ^ "Association Awards". Association for Games & Puzzles International. Archived from the original on June 23, 2021. Retrieved August 2, 2022.
  18. ^ "Home Page". Association of Game and Puzzle Collectors. Archived from the original on August 23, 2000. Retrieved August 2, 2022. Association of Game and Puzzle Collectors formerly American Game Collectors Association
  19. ^ Foshee, Gary (December 5, 2001). "The Eng Coin Vise". In Wolfe, David; Rodgers, Tom (eds.). Puzzlers' Tribute: A Feast for the Mind. CRC Press. ISBN 978-1-4398-6410-4.
  20. ^ Derbyshire, John (June 2010). "Gary Foshee 2010 Gathering for Gardner question". John Derbyshire. Retrieved August 2, 2022.
  21. ^ Juul, Jesper (June 8, 2010). "Tuesday Changes Everything (a Mathematical Puzzle)". The Ludologist. Retrieved August 2, 2022.
  22. ^ "Transparent Lock". Neil's Puzzle Building Blog. September 2, 2015. Retrieved August 2, 2022.
  23. ^ "Metal Puzzles". Khuong An Nguyen. Retrieved August 2, 2022.
  24. ^ Foshee, Gary. Take-Apart - Lunatic Lock. Puzzle World by John Rausch. Retrieved August 2, 2022.
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Chess

Interactive puzzle