Édouard Lucas (nonfiction): Difference between revisions

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In 1875, Lucas posed a challenge to prove that the only solution of the Diophantine equation known as the cannonball problem, since it can be visualized as the problem of taking a square arrangement of cannonballs on the ground and building a square pyramid out of them. It was not until 1918 that a proof (using elliptic functions) was found for this remarkable fact, which has relevance to the bosonic string theory in 26 dimensions. More recently, elementary proofs have been published.
In 1875, Lucas posed a challenge to prove that the only solution of the Diophantine equation known as the cannonball problem, since it can be visualized as the problem of taking a square arrangement of cannonballs on the ground and building a square pyramid out of them. It was not until 1918 that a proof (using elliptic functions) was found for this remarkable fact, which has relevance to the bosonic string theory in 26 dimensions. More recently, elementary proofs have been published.


He devised methods for testing the primality of numbers. In 1857, at age 15, Lucas began testing the primality of 2127 − 1 by hand, using Lucas sequences. In 1876, after 19 years of testing, he finally proved that 2127 − 1 was prime; this would remain the largest known Mersenne prime for three-quarters of a century. This may stand forever as the largest prime number proven by hand. Later Derrick Henry Lehmer refined Lucas's primality tests and obtained the Lucas–Lehmer primality test.
He devised methods for testing the primality of numbers. In 1857, at age 15, Lucas began testing the primality of 2127 − 1 by hand, using Lucas sequences. In 1876, after 19 years of testing, he finally proved that 2127 − 1 was prime; this would remain the largest known Mersenne prime for three-quarters of a century. This may stand forever as the largest prime number proven by hand. Later [[Derrick Henry Lehmer (nonfiction)|Derrick Henry Lehmer]] refined Lucas's primality tests and obtained the Lucas–Lehmer primality test.


He worked on the development of the umbral calculus.
He worked on the development of the [[Umbral calculus (nonfiction)|umbral calculus]].


Lucas was also interested in recreational mathematics. He found an elegant binary solution to the Baguenaudier puzzle. He also invented the Tower of Hanoi puzzle, which he marketed under the nickname N. Claus de Siam, an anagram of Lucas d'Amiens, and published for the first time a description of the Dots and Boxes game in 1889.
Lucas was also interested in recreational mathematics. He found an elegant binary solution to the Baguenaudier puzzle. He also invented the Tower of Hanoi puzzle, which he marketed under the nickname N. Claus de Siam, an anagram of Lucas d'Amiens, and published for the first time a description of the Dots and Boxes game in 1889.
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== Nonfiction cross-reference ==
== Nonfiction cross-reference ==


* [[Derrick Henry Lehmer (nonfiction)]]
* [[Mathematician (nonfiction)]]
* [[Mathematician (nonfiction)]]
* [[Mathematics (nonfiction)]]
* [[Mathematics (nonfiction)]]
* [[Umbral calculus (nonfiction)]]


External links:
External links:
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* [https://en.wikipedia.org/wiki/%C3%89douard_Lucas Édouard Lucas] @ Wikipedia
* [https://en.wikipedia.org/wiki/%C3%89douard_Lucas Édouard Lucas] @ Wikipedia


Attribution:


[[Category:Nonfiction (nonfiction)]]
[[Category:Nonfiction (nonfiction)]]
[[Category:Mathematicians (nonfiction)]]
[[Category:Mathematicians (nonfiction)]]
[[Category:People (nonfiction)]]
[[Category:People (nonfiction)]]
[[Category:Photographs (nonfiction)]]
[[Category:Portraits (nonfiction)]]

Latest revision as of 07:36, 3 October 2018

Édouard Lucas.

François Édouard Anatole Lucas (French pronunciation: ​[fʁɑ̃swa edwaʁ anatɔl lykɑ]; 4 April 1842 – 3 October 1891) was a French mathematician. Lucas is known for his study of the Fibonacci sequence. The related Lucas sequences and Lucas numbers are named after him.

Lucas was educated at the École Normale Supérieure. He worked in the Paris observatory and later became a professor of mathematics in Paris. In the meantime he served in the army.

In 1875, Lucas posed a challenge to prove that the only solution of the Diophantine equation known as the cannonball problem, since it can be visualized as the problem of taking a square arrangement of cannonballs on the ground and building a square pyramid out of them. It was not until 1918 that a proof (using elliptic functions) was found for this remarkable fact, which has relevance to the bosonic string theory in 26 dimensions. More recently, elementary proofs have been published.

He devised methods for testing the primality of numbers. In 1857, at age 15, Lucas began testing the primality of 2127 − 1 by hand, using Lucas sequences. In 1876, after 19 years of testing, he finally proved that 2127 − 1 was prime; this would remain the largest known Mersenne prime for three-quarters of a century. This may stand forever as the largest prime number proven by hand. Later Derrick Henry Lehmer refined Lucas's primality tests and obtained the Lucas–Lehmer primality test.

He worked on the development of the umbral calculus.

Lucas was also interested in recreational mathematics. He found an elegant binary solution to the Baguenaudier puzzle. He also invented the Tower of Hanoi puzzle, which he marketed under the nickname N. Claus de Siam, an anagram of Lucas d'Amiens, and published for the first time a description of the Dots and Boxes game in 1889.

Lucas died in unusual circumstances. At the banquet of the annual congress of the Association française pour l'avancement des sciences, a waiter dropped some crockery and a piece of broken plate cut Lucas on the cheek. He died a few days later of a severe skin inflammation probably caused by septicemia. He was only 49 years old.

Works:

  • Recherches Sur Plusieurs Ouvrages De Léonard De Pise Et Sur Diverses Questions D’Arithmétique Supérieure (1877)
  • Théorie des nombres, Tome Premier (1891)
  • Récréations mathématiques (1894)
  • L'arithmétique amusante (1895)

Known for:

  • Lucas prime
  • Lucas sequence
  • Lucas's theorem
  • Tower of Hanoi

In the News

Fiction cross-reference

Nonfiction cross-reference

External links: