Matches in DBpedia 2014 for { <http://dbpedia.org/resource/Fermat's_Last_Theorem> ?p ?o. }
Showing items 1 to 47 of
47
with 100 items per page.
- Fermat's_Last_Theorem abstract "In number theory, Fermat's Last Theorem (sometimes called Fermat's conjecture, especially in older texts) states that no three positive integers a, b, and c can satisfy the equation an + bn = cn for any integer value of n greater than two.This theorem was first conjectured by Pierre de Fermat in 1637, famously in the margin of a copy of Arithmetica where he claimed he had a proof that was too large to fit in the margin. The first successful proof was released in 1994 by Andrew Wiles, and formally published in 1995, after 358 years of effort by countless mathematicians. The unsolved problem stimulated the development of algebraic number theory in the 19th century and the proof of the modularity theorem in the 20th century. It is among the most famous theorems in the history of mathematics and prior to its proof it was in the Guinness Book of World Records for "most difficult mathematical problems".".
- Fermat's_Last_Theorem thumbnail Diophantus-II-8-Fermat.jpg?width=300.
- Fermat's_Last_Theorem wikiPageExternalLink flt.
- Fermat's_Last_Theorem wikiPageExternalLink kleiner.pdf.
- Fermat's_Last_Theorem wikiPageExternalLink ribet.pdf.
- Fermat's_Last_Theorem wikiPageExternalLink Fermat's_last_theorem.html.
- Fermat's_Last_Theorem wikiPageExternalLink BealFermatPythagorasTriplets.htm.
- Fermat's_Last_Theorem wikiPageID "19021953".
- Fermat's_Last_Theorem wikiPageRevisionID "606200114".
- Fermat's_Last_Theorem hasPhotoCollection Fermat's_Last_Theorem.
- Fermat's_Last_Theorem id "p/f110070".
- Fermat's_Last_Theorem title "Fermat's Last Theorem".
- Fermat's_Last_Theorem title "Fermat's last theorem".
- Fermat's_Last_Theorem urlname "FermatsLastTheorem".
- Fermat's_Last_Theorem subject Category:Articles_with_inconsistent_citation_formats.
- Fermat's_Last_Theorem subject Category:Fermat's_Last_Theorem.
- Fermat's_Last_Theorem comment "In number theory, Fermat's Last Theorem (sometimes called Fermat's conjecture, especially in older texts) states that no three positive integers a, b, and c can satisfy the equation an + bn = cn for any integer value of n greater than two.This theorem was first conjectured by Pierre de Fermat in 1637, famously in the margin of a copy of Arithmetica where he claimed he had a proof that was too large to fit in the margin.".
- Fermat's_Last_Theorem label "Dernier théorème de Fermat".
- Fermat's_Last_Theorem label "Fermat's Last Theorem".
- Fermat's_Last_Theorem label "Großer fermatscher Satz".
- Fermat's_Last_Theorem label "Laatste stelling van Fermat".
- Fermat's_Last_Theorem label "Ultimo teorema di Fermat".
- Fermat's_Last_Theorem label "Wielkie twierdzenie Fermata".
- Fermat's_Last_Theorem label "Último teorema de Fermat".
- Fermat's_Last_Theorem label "Último teorema de Fermat".
- Fermat's_Last_Theorem label "Великая теорема Ферма".
- Fermat's_Last_Theorem label "مبرهنة فيرما الأخيرة".
- Fermat's_Last_Theorem label "フェルマーの最終定理".
- Fermat's_Last_Theorem label "费马大定理".
- Fermat's_Last_Theorem sameAs Velká_Fermatova_věta.
- Fermat's_Last_Theorem sameAs Großer_fermatscher_Satz.
- Fermat's_Last_Theorem sameAs Τελευταίο_θεώρημα_του_Φερμά.
- Fermat's_Last_Theorem sameAs Último_teorema_de_Fermat.
- Fermat's_Last_Theorem sameAs Dernier_théorème_de_Fermat.
- Fermat's_Last_Theorem sameAs Teorema_Terakhir_Fermat.
- Fermat's_Last_Theorem sameAs Ultimo_teorema_di_Fermat.
- Fermat's_Last_Theorem sameAs フェルマーの最終定理.
- Fermat's_Last_Theorem sameAs 페르마의_마지막_정리.
- Fermat's_Last_Theorem sameAs Laatste_stelling_van_Fermat.
- Fermat's_Last_Theorem sameAs Wielkie_twierdzenie_Fermata.
- Fermat's_Last_Theorem sameAs Último_teorema_de_Fermat.
- Fermat's_Last_Theorem sameAs m.0dks5.
- Fermat's_Last_Theorem sameAs Q132469.
- Fermat's_Last_Theorem sameAs Q132469.
- Fermat's_Last_Theorem wasDerivedFrom Fermat's_Last_Theorem?oldid=606200114.
- Fermat's_Last_Theorem depiction Diophantus-II-8-Fermat.jpg.
- Fermat's_Last_Theorem isPrimaryTopicOf Fermat's_Last_Theorem.