Britanyalı matematikçiler
- en.wikipedia.org Louis J. MordellLouis J. Mordell. 19 languages. ... From Wikipedia, the free encyclopedia. American-born British mathematician (1888-1972). Louis Mordell.
- bookofproofs.github.io history/19th-century/…Mordell is best known for his investigations of equations of the form of $y^2=x^3+k$ which had been studied by Fermat. Mathematical Profile (Excerpt)
- http://geometry.net detail/scientists/mordell_louis.htmlLouis Joel Mordell. Born: 28 Jan 1888 in Philadelphia, Pennsylvania, USA Died: 12 March 1972 in Cambridge, Cambridgeshire, England.
- thecharacterquotes.com author/Louis J. MordellLouis J. Mordell. Louis J. Mordell quotes: Share. Tweet.
- mathshistory.st-andrews.ac.uk DNB/Mordell.htmlMordell, Louis Joel (1888-1972), mathematician, was born on 28 January 1888 in Philadelphia, Pennsylvania, the third in the family of eight children (four...
- inspiringquotes.us author/7930-louis-j-mordellOne may be an expert geologist, but he does not find the golden nuggets that the ignorant miner does.” - - Louis J. Mordell.
- quotlr.com author/louis-j-mordellOne may be an expert geologist, but he does not find the golden nuggets that the ignorant miner does. — Louis J. Mordell.
- archiveshub.jisc.ac.uk search/archives/950286bc-…Name of Creator. Mordell, Louis Joel (1888-1972) mathematician. ... Preferred citation: St John's College Library, Papers of Louis Joel Mordell.
- myquotes.co authors/17991/Best 5 quotes of Louis J. Mordell on MyQuotes. ... Louis J. Mordell. Copy text. I am the world's worst good bridge player.
- zbmath.org authors/mordell.louis-joelmordell.louis-joel Recent zbMATH articles by "Mordell, Louis Joel". Published as: Mordell, L. J.; Mordell, Louis Joel. External Links
- eksisozluk.com louis-joel-mordell--5284032louis joel mordell.Bulunamadı: j
- list-quotes.com authors/louis-j-mordell/Explore popular quotes and sayings by an American mathematician Louis J. Mordell.
- semanticscholar.org paper/Louis-Joel-Mordell,-…This article examines the research of Louis J. Mordell on the Diophantine equation $$y^2-k=x^3$$ as it appeared in one of his first papers, published in 1914.