EuleroĮ19: De progressionibus transcendentibus seu quarum termini generales algebraice dari nequeuntĮ20: De summatione innumerabilium progressionumĮ21: Quomodo data quacunque curva inveniri oporteat aliam quae cum data quodammodo iuncta ad tautochronismum producendum sit idoneaĮ22: De communicatione motus in collisione corporumĮ23: De curvis rectificabilibus algebraicis atque traiectoriis reciprocis algebraicisĮ24: Solutio singularis casus circa tautochronismumĮ25: Methodus generalis summandi progressionesĮ26: Observationes de theoremate quodam Fermatiano aliisque ad numeros primos spectantibusĮ27: Problematis isoperimetrici in latissimo sensu accepti solutio generalisĮ28: Specimen de constructione aequationum differentialium sine indeterminatarum separationeĮ29: De solutione problematum diophanteorum per numeros integrosĮ30: De formis radicum aequationum cuiusque ordinis coniectatioĮ31: Constructio aequationis differentialis ax n dx = dy + y 2 dxĮ34: Dissertatio de igne in qua ejus natura et proprietates explicanturĮ35: Einleitung zur Rechen-Kunst zum Gebrauch des Gymnasii bey der Kayserlichen Academie der Wissenschafften in St. Further information on Euler and 18th century science can be found on our Historical and Biographical Resources page.Į1: Constructio linearum isochronarum in medio quocunque resistenteĮ3: Methodus inveniendi traiectorias reciprocas algebraicasĮ4: Meditationes super problemate nautico, quod illustrissima regia Parisiensis Academia Scientiarum proposuitĮ5: Problematis traiectoriarum reciprocarum solutioĮ6: Dissertatio de novo quodam curvarum tautochronarum genereĮ7: Tentamen explicationis phaenomenorum aerisĮ8: Solutio problematis de invenienda curva, quam format lamina utcunque elastica in singulis punctis a potentiis quibuscunque sollicitataĮ9: De linea brevissima in superficie quacunque duo quaelibet puncta iungenteĮ10: Nova methodus innumerabiles aequationes differentiales secundi gradus reducendi ad aequationes differentiales primi gradusĮ11: Constructio aequationum quarundam differentialium, quae indeterminatarum separationem non admittuntĮ12: De innumerabilibus curvis tautochronis in vacuoĮ13: Curva tautochrona in fluido resistentiam faciente secundum quadrata celeritatumĮ14: Solutio problematis astronomici ex datis tribus stellae fixae altitudinibus et temporum differentiis invenire elevationem poli et declinationem stellae. To read more on Euler and his work, check out the Euler Archive's historical information section, as well as Ed Sandifer's How Euler Did It column. If you have completed a translation project, please consider submitting it to the journal Euleriana. If you are contemplating a particular translation project, please contact Erik Tou ( or Chris Goff ( using "Euler Translation Notice" as your subject heading. Since roughly 80% of Euler's works were published in Latin, translation into modern languages is crucial in order to understand his contributions to science and mathematics. Each of these was assigned a number, from E1 to E866, which is now referred to as the "Eneström number." Most historical scholars today use Eneström numbers to identify Euler's writings quickly.Įuler Translation. He enumerated 866 distinct works, including books, journal articles, and some letters he deemed to be especially important. In 1913, Swedish mathematician Gustaf Eneström completed a comprehensive survey of Euler's works.
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