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- Diophantine_quintuple abstract "In mathematics, a diophantine m-tuple is a set of m positive integers such that is a perfect square for any .Diophantus himself found the set of rationals which has the property that each is a rational square. More recently, sets of six positive rationals have been found.The first diophantine quadruple was found by Fermat: . It was proved in 1969 by Baker and Davenport that a fifth positive integer cannot be added to this set.However, Euler was able to extend this set by adding the rational number.No (integer) diophantine quintuples are known, and it is an open problem whether any exist. Dujella has shown that at most a finite number of diophantine quintuples exist.".
- Diophantine_quintuple wikiPageExternalLink dtuples.html.
- Diophantine_quintuple wikiPageID "39321538".
- Diophantine_quintuple wikiPageRevisionID "591017336".
- Diophantine_quintuple subject Category:Number_theory.
- Diophantine_quintuple comment "In mathematics, a diophantine m-tuple is a set of m positive integers such that is a perfect square for any .Diophantus himself found the set of rationals which has the property that each is a rational square. More recently, sets of six positive rationals have been found.The first diophantine quadruple was found by Fermat: .".
- Diophantine_quintuple label "Diophantine quintuple".
- Diophantine_quintuple sameAs m.0v39w8q.
- Diophantine_quintuple sameAs Q17119394.
- Diophantine_quintuple sameAs Q17119394.
- Diophantine_quintuple wasDerivedFrom Diophantine_quintuple?oldid=591017336.
- Diophantine_quintuple isPrimaryTopicOf Diophantine_quintuple.