@prefix rdf: . @prefix dbr: . @prefix yago: . dbr:Apollonius_of_Perga rdf:type yago:WikicatAncientGreekMathematicians , yago:Physicist110428004 , yago:PhysicalEntity100001930 , yago:WikicatGreekMathematicians , yago:Wikicat3rd-centuryBCPeople , yago:CausalAgent100007347 , yago:Object100002684 , yago:WikicatGeometers , yago:Geometer110128016 . @prefix dbo: . dbr:Apollonius_of_Perga rdf:type dbo:Scientist , yago:Whole100003553 , yago:YagoLegalActor , yago:YagoLegalActorGeo , yago:LivingThing100004258 , yago:Organism100004475 , yago:Scientist110560637 . @prefix owl: . dbr:Apollonius_of_Perga rdf:type owl:Thing , yago:Mathematician110301261 , yago:Wikicat2nd-centuryBCPeople , yago:WikicatAncientMathematicians , yago:WikicatAncientGreekAstronomers , yago:Astronomer109818343 , yago:Person100007846 . @prefix rdfs: . dbr:Apollonius_of_Perga rdfs:label "Apol\u00B7loni de Perge"@ca , "Apolonio de Perge"@es , "Apolonio de Pergo"@eo , "\u0410\u043F\u043E\u043B\u043B\u043E\u043D\u0456\u0439 \u041F\u0435\u0440\u0437\u044C\u043A\u0438\u0439"@uk , "Apoll\u00F3nios z Pergy"@cs , "Apollonio di Perga"@it , "Apollonius of Perga"@en , "Apol\u00F4nio de Perga"@pt , "\u963F\u6CE2\u7F57\u5C3C\u5965\u65AF"@zh , "Apoloniusz z Pergi"@pl , "Apollonios de Perga"@fr , "Apolonio Pergakoa"@eu , "\u0391\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u03BF \u03A0\u03B5\u03C1\u03B3\u03B1\u03AF\u03BF\u03C2"@el , "\u0623\u0628\u0644\u0648\u0646\u064A\u0648\u0633 \u0627\u0644\u0628\u0631\u063A\u0627\u0648\u064A"@ar , "Apollonius dari Perga"@in , "\u0410\u043F\u043E\u043B\u043B\u043E\u043D\u0438\u0439 \u041F\u0435\u0440\u0433\u0441\u043A\u0438\u0439"@ru , "\uD398\uB974\uAC8C\uC758 \uC544\uD3F4\uB85C\uB2C8\uC624\uC2A4"@ko , "Apollonios von Perge"@de , "Apollonius van Perga"@nl , "\u30DA\u30EB\u30AC\u306E\u30A2\u30DD\u30ED\u30CB\u30A6\u30B9"@ja , "Apollonios fr\u00E5n Perga"@sv ; rdfs:comment "Apoloniusz z Pergi (stgr. \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u1F41 \u03A0\u03B5\u03C1\u03B3\u03B1\u1FD6\u03BF\u03C2, Apollonios hoe Pergaios; ur. ok. 260 p.n.e., zm. ok. 190 p.n.e.) \u2013 starogrecki uczony: matematyk i astronom, znany z bada\u0144 nad geometri\u0105 krzywych p\u0142askich."@pl , "Apolonio Pergakoa (antzinako grezieraz: \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2; Perga, K.a. 262-K.a. 190 inguru) greziar geometrialari bat izan zen, izeneko bere lanagatik ospetsua izan zena. Apolonio izan zen elipse, parabola eta hiperbola izena eman ziena hala ezagutzen diren irudiei. Berari ematen zaizkio, baita ere, orbita eszentrikoen hipotesia edo epizikloen teoria, planeten irudizko mugimendua eta Ilargiaren abiadura aldagarria azaltzeko."@eu , "\u0410\u043F\u043E\u043B\u043B\u043E\u043D\u0456\u0439 \u0437 \u041F\u0435\u0440\u0433\u0438 \u0430\u0431\u043E \u0410\u043F\u043E\u043B\u043B\u043E\u043D\u0456\u0439 \u041F\u0435\u0440\u0437\u044C\u043A\u0438\u0439 (\u0433\u0440\u0435\u0446. \u0391\u03BD\u03BF\u03BB\u03BB\u03C9\u03BD\u03B9\u03BF\u03C2 \u03BF \u03A0\u03B5\u03C1\u03B3\u03B1\u03B9\u03BF\u03C2; 262 \u0434\u043E \u043D. \u0435. \u2014 190 \u0434\u043E \u043D. \u0435.) \u2014 \u0434\u0430\u0432\u043D\u044C\u043E\u0433\u0440\u0435\u0446\u044C\u043A\u0438\u0439 \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u043A, \u043E\u0434\u0438\u043D \u0437 \u043F\u0440\u0435\u0434\u0441\u0442\u0430\u0432\u043D\u0438\u043A\u0456\u0432 \u0430\u043B\u0435\u043A\u0441\u0430\u043D\u0434\u0440\u0456\u0439\u0441\u044C\u043A\u043E\u0457 \u0448\u043A\u043E\u043B\u0438. \u0420\u0430\u0437\u043E\u043C \u0437 \u0415\u0432\u043A\u043B\u0456\u0434\u043E\u043C \u0442\u0430 \u0410\u0440\u0445\u0456\u043C\u0435\u0434\u043E\u043C \u0432\u0432\u0430\u0436\u0430\u0432\u0441\u044F \u043E\u0434\u043D\u0438\u043C \u0437 \u0442\u0440\u044C\u043E\u0445 \u043D\u0430\u0439\u0432\u0438\u0434\u0430\u0442\u043D\u0456\u0448\u0438\u0445 \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u043A\u0456\u0432 \u0430\u043D\u0442\u0438\u0447\u043D\u043E\u0441\u0442\u0456."@uk , "Apollonio di Perga (in greco antico: \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u1F41 \u03A0\u03B5\u03C1\u03B3\u03B1\u1FD6\u03BF\u03C2, Apoll\u1E53nios ho Perga\u00EEos; in latino: Apollonius Pergaeus; Perga, 262 a.C. \u2013 Alessandria d'Egitto, 190 a.C.) \u00E8 stato un matematico e astronomo greco antico, famoso per le sue opere sulle sezioni coniche e l'introduzione, in astronomia, degli epicicli e deferenti. Fu attivo tra la fine del III e l'inizio del II secolo a.C., ma le scarse testimonianze sulla sua vita rendono impossibile una migliore datazione e date specifiche (come quelle in , 151) devono essere intese solo in senso puramente speculativo."@it , "Apollonios von Perge (lateinisch Apollonius Pergaeus; * ca. 265 v. Chr. in Perge; \u2020 ca. 190 v. Chr. in Alexandria) war ein antiker griechischer Mathematiker, bekannt f\u00FCr sein Buch \u00FCber Kegelschnitte. In der Astronomie trug er zur Theorie der Mond- und Planetenbewegung bei, die sp\u00E4ter Ptolem\u00E4us in sein Lehrbuch \u00FCbernahm."@de , "Apolonio de Perge o Perga (en griego \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2) (Perge, c. 262 a, C, - Alejandr\u00EDa, c. 190 a. C.)\u200B fue un matem\u00E1tico y astr\u00F3nomo griego famoso por su obra Sobre las secciones c\u00F3nicas. \u00C9l fue quien dio el nombre de elipse, par\u00E1bola e hip\u00E9rbola, a las figuras que conocemos. Logr\u00F3 solucionar la ecuaci\u00F3n general de segundo grado por medio de la geometr\u00EDa c\u00F3nica.\u200B Tambi\u00E9n se le atribuye la hip\u00F3tesis de las \u00F3rbitas exc\u00E9ntricas o teor\u00EDa de los epiciclos para intentar explicar el movimiento aparente de los planetas y de la velocidad variable de la Luna."@es , "\u30DA\u30EB\u30AC\u306E\u30A2\u30DD\u30ED\u30CB\u30A6\u30B9\uFF08\u53E4\u5E0C: \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2, \u7F85: Apollonius Pergaeus, \u82F1: Apollonius of Perga\u3001\u7D00\u5143\u524D262\u5E74\u9803 - \u7D00\u5143\u524D190\u5E74\u9803\uFF09\u306F\u3001\u53E4\u4EE3\u30AE\u30EA\u30B7\u30A2\u306E\u6570\u5B66\u8005\u30FB\u5929\u6587\u5B66\u8005\u3067\u3042\u308B\u3002\u5C0F\u30A2\u30B8\u30A2\u306E\u753A\u30DA\u30EB\u30AC\u306B\u751F\u307E\u308C\u305F\u3002\u30E0\u30BB\u30A4\u30AA\u30F3\u3067\u6559\u80B2\u3092\u3046\u3051\u3001\u30A2\u30EC\u30AD\u30B5\u30F3\u30C9\u30EA\u30A2\u3067\u30D7\u30C8\u30EC\u30DE\u30A4\u30AA\u30B93\u4E16\u304A\u3088\u3073\u30D7\u30C8\u30EC\u30DE\u30A4\u30AA\u30B94\u4E16\u306E\u6642\u4EE3\u306B\u6D3B\u8E8D\u3057\u305F\u3002\u73FE\u30C8\u30EB\u30B3\u306E\u30DA\u30EB\u30AC\u30E2\u30F3\u3067\u3057\u3070\u3089\u304F\u66AE\u3089\u3057\u305F\u3068\u3055\u308C\u308B\u3002\u30A2\u30EC\u30AD\u30B5\u30F3\u30C9\u30EA\u30A2\u3067\u6CA1\u3057\u305F\u3002"@ja , "Apollonios de Perga ou Apollonius de Perge (en grec ancien \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u1F41 \u03A0\u03B5\u03C1\u03B3\u03B1\u1FD6\u03BF\u03C2 / Apoll\u1ED1nios o Perga\u00EDos), n\u00E9 dans la seconde moiti\u00E9 du IIIe si\u00E8cle av. J.-C. (probablement autour de 240 av. J.-C.), disparu au d\u00E9but du IIe si\u00E8cle av. J.-C. est un g\u00E9om\u00E8tre et astronome grec. Il serait originaire de Perg\u00E9 (ou Perga, ou encore Perg\u00E8 actuelle Aksu en Turquie), mais a v\u00E9cu \u00E0 Alexandrie. Il est consid\u00E9r\u00E9 comme l'une des grandes figures des math\u00E9matiques hell\u00E9nistiques."@fr , "Apollonius of Perga (Greek: \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u1F41 \u03A0\u03B5\u03C1\u03B3\u03B1\u1FD6\u03BF\u03C2, translit. Apoll\u1E53nios ho Perga\u00EEos; Latin: Apollonius Pergaeus; c.\u2009240 BCE/BC \u2013 c.\u2009190 BCE/BC) was an Ancient Greek geometer and astronomer known for his work on conic sections. Beginning from the contributions of Euclid and Archimedes on the topic, he brought them to the state prior to the invention of analytic geometry. His definitions of the terms ellipse, parabola, and hyperbola are the ones in use today. Gottfried Wilhelm Leibniz stated \u201CHe who understands Archimedes and Apollonius will admire less the achievements of the foremost men of later times.\u201D"@en , "Apoll\u00F3nios z Pergy (\u0159ecky \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u1F41 \u03A0\u03B5\u03C1\u03B3\u03B1\u1FD6\u03BF\u03C2) byl starov\u011Bk\u00FD \u0159eck\u00FD geometr, matematik a astronom ze 3.-2. stolet\u00ED p\u0159. n. l. Byl t\u00E9\u017E zv\u00E1n \"Velk\u00FD geometr\". Byl Archim\u00E9dov\u00FDm sou\u010Dasn\u00EDkem, ale sp\u00ED\u0161e s n\u00EDm polemizoval. Vydal se jinou cestou ne\u017E on, nav\u00E1zal na Eukleida a eleatskou \u0161kolu."@cs , "Apol\u00B7loni de Perge o Apollonius Pergaeus (en grec: \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2) (al voltant de 262 aC - al voltant 190 aC) va ser un ge\u00F2metra grec fam\u00F3s per la seva obra Sobre les seccions c\u00F2niques. Va ser Apol\u00B7loni qui va donar els noms d'el\u00B7lipse, par\u00E0bola i hip\u00E8rbola a les figures que coneixem avui."@ca , "\u039F \u0391\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u03BF \u03A0\u03B5\u03C1\u03B3\u03B1\u03AF\u03BF\u03C2 (\u03AE \u03A0\u03B5\u03C1\u03B3\u03B5\u03CD\u03C2) \u03C5\u03C0\u03AE\u03C1\u03BE\u03B5 \u03AD\u03BD\u03B1\u03C2 \u03B1\u03C0\u03CC \u03C4\u03BF\u03C5\u03C2 \u03BC\u03B5\u03B3\u03B1\u03BB\u03CD\u03C4\u03B5\u03C1\u03BF\u03C5\u03C2 \u0388\u03BB\u03BB\u03B7\u03BD\u03B5\u03C2 \u03BC\u03B1\u03B8\u03B7\u03BC\u03B1\u03C4\u03B9\u03BA\u03BF\u03CD\u03C2 \u2013 \u03B3\u03B5\u03C9\u03BC\u03AD\u03C4\u03C1\u03B5\u03C2 \u03BA\u03B1\u03B9 \u03B1\u03C3\u03C4\u03C1\u03BF\u03BD\u03CC\u03BC\u03BF\u03C5\u03C2 \u03C4\u03B7\u03C2 \u03B1\u03BB\u03B5\u03BE\u03B1\u03BD\u03B4\u03C1\u03B9\u03BD\u03AE\u03C2 \u03B5\u03C0\u03BF\u03C7\u03AE\u03C2. \u0393\u03B5\u03BD\u03BD\u03AE\u03B8\u03B7\u03BA\u03B5 \u03C0\u03B5\u03C1\u03AF \u03C4\u03BF 260 \u03C0.\u03A7. (\u03AE \u03C3\u03CD\u03BC\u03C6\u03C9\u03BD\u03B1 \u03BC\u03B5 \u03AC\u03BB\u03BB\u03BF\u03C5\u03C2 \u03BC\u03B5\u03BB\u03B5\u03C4\u03B7\u03C4\u03AD\u03C2 \u03C0\u03B5\u03C1\u03AF \u03C4\u03BF 246 \u03BC\u03B5 221 \u03C0.\u03A7.), \u03C3\u03C4\u03B7\u03BD \u03A0\u03AD\u03C1\u03B3\u03B7 \u03C4\u03B7\u03C2 \u03A0\u03B1\u03BC\u03C6\u03C5\u03BB\u03AF\u03B1\u03C2, \u03BC\u03B9\u03B1 \u03C0\u03CC\u03BB\u03B7 \u03BA\u03BF\u03BD\u03C4\u03AC \u03C3\u03C4\u03B7\u03BD \u0391\u03C4\u03C4\u03AC\u03BB\u03B5\u03B9\u03B1 \u03C4\u03B7\u03C2 \u039C. \u0391\u03C3\u03AF\u03B1\u03C2. \u03A3\u03C0\u03BF\u03CD\u03B4\u03B1\u03C3\u03B5 \u03BA\u03B1\u03B9 \u03B4\u03AF\u03B4\u03B1\u03BE\u03B5 \u03C3\u03C4\u03B7\u03BD \u0391\u03BB\u03B5\u03BE\u03AC\u03BD\u03B4\u03C1\u03B5\u03B9\u03B1 \u03BA\u03BF\u03BD\u03C4\u03AC \u03C3\u03C4\u03BF\u03C5\u03C2 \u03C3\u03C5\u03BD\u03B5\u03C7\u03B9\u03C3\u03C4\u03AD\u03C2 \u03C4\u03BF\u03C5 \u0395\u03C5\u03BA\u03BB\u03B5\u03AF\u03B4\u03B7 \u03BA\u03B1\u03B9 \u03C3\u03C5\u03BD\u03AD\u03B3\u03C1\u03B1\u03C8\u03B5 \u03B3\u03CD\u03C1\u03C9 \u03C3\u03C4\u03B1 21 \u03AD\u03C1\u03B3\u03B1 \u03BC\u03B1\u03B8\u03B7\u03BC\u03B1\u03C4\u03B9\u03BA\u03CE\u03BD, \u03B3\u03B5\u03C9\u03BC\u03B5\u03C4\u03C1\u03AF\u03B1\u03C2, \u03B1\u03C3\u03C4\u03C1\u03BF\u03BD\u03BF\u03BC\u03AF\u03B1\u03C2 \u03BA\u03B1\u03B9 \u03BC\u03B7\u03C7\u03B1\u03BD\u03B9\u03BA\u03AE\u03C2, \u03C0\u03BF\u03C5 \u03C7\u03C9\u03C1\u03AF\u03B6\u03BF\u03BD\u03C4\u03B1\u03BD \u03C3\u03B5 \u03C5\u03C0\u03BF\u03BA\u03B1\u03C4\u03B7\u03B3\u03BF\u03C1\u03AF\u03B5\u03C2 \u03C4\u03CC\u03BC\u03C9\u03BD \u03B5\u03BA \u03C4\u03C9\u03BD \u03BF\u03C0\u03BF\u03AF\u03C9\u03BD \u03B4\u03B9\u03B1\u03C3\u03CE\u03B8\u03B7\u03BA\u03B1\u03BD \u03BC\u03CC\u03BD\u03BF \u03C4\u03AD\u03C3\u03C3\u03B5\u03C1\u03B1 \u03BC\u03B5 \u03B3\u03BD\u03C9\u03C3\u03C4\u03CC\u03C4\u03B5\u03C1\u03BF \u03B5\u03BE\u2019 \u03B1\u03C5\u03C4\u03CE\u03BD \u03C4\u03BF \u03AD\u03C1\u03B3\u03BF \u00AB\u039A\u03C9\u03BD\u03B9\u03BA\u03AC\u00BB \u03C4\u03BF \u03BF\u03C0\u03BF\u03AF\u03BF \u03B1\u03C0\u03BF\u03C4\u03B5\u03BB\u03B5\u03AF\u03C4\u03B1\u03B9 \u03B1\u03C0\u03CC 8 \u03B2\u03B9\u03B2\u03BB\u03AF\u03B1."@el , "\u0623\u0628\u0644\u0648\u0646\u064A\u0648\u0633 \u0627\u0644\u0628\u0631\u063A\u0627\u0648\u064A (\u0628\u0627\u0644\u064A\u0648\u0646\u0627\u0646\u064A\u0629:\u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2) (\u0648\u0644\u062F \u0641\u064A \u0627\u0644\u0639\u0627\u0645 262 \u0642.\u0645 \u0641\u064A \u0628\u064A\u0631\u063A\u060C \u0648\u062A\u0648\u0641\u064A \u0641\u064A 190 \u0642.\u0645 \u0641\u064A \u0627\u0644\u0625\u0633\u0643\u0646\u062F\u0631\u064A\u0629) \u0643\u0627\u0646 \u0641\u0644\u0643\u064A \u0648\u0645\u0647\u0646\u062F\u0633 \u0648\u0639\u0627\u0644\u0645 \u0631\u064A\u0627\u0636\u064A\u0627\u062A \u064A\u0648\u0646\u0627\u0646\u064A. \u0645\u0634\u0647\u0648\u0631 \u0644\u0623\u0639\u0645\u0627\u0644\u0647 \u0641\u064A \u0645\u062C\u0627\u0644 \u0627\u0644\u0642\u0637\u0639 \u0627\u0644\u0645\u062E\u0631\u0648\u0637\u064A\u0629. \u062A\u0623\u062B\u0631 \u0628\u0647 \u0627\u0644\u0643\u062B\u064A\u0631 \u0645\u0646 \u0627\u0644\u0639\u0644\u0645\u0627\u0621 \u0645\u062B\u0644 \u0628\u0637\u0644\u064A\u0645\u0648\u0633\u060C \u060C \u0627\u0633\u062D\u0642 \u0646\u064A\u0648\u062A\u0646\u060C \u0648\u0631\u064A\u0646\u064A\u0647 \u062F\u064A\u0643\u0627\u0631\u062A. \u0623\u0628\u0648\u0644\u0648\u0646\u064A\u0648\u0633 \u0647\u0648 \u0627\u0644\u0630\u064A \u0623\u0639\u0637\u0649 \u0627\u0644\u0642\u0637\u0648\u0639 \u0627\u0644\u0645\u062E\u0631\u0648\u0637\u064A\u0629 \u0627\u0644\u0623\u0633\u0645\u0627\u0621: (\u0627\u0644\u0642\u0637\u0639 \u0627\u0644\u0646\u0627\u0642\u0635\u060C \u0627\u0644\u0642\u0637\u0639 \u0627\u0644\u0645\u0643\u0627\u0641\u0626\u060C \u0648\u0627\u0644\u0642\u0637\u0639 \u0627\u0644\u0632\u0627\u0626\u062F) \u0627\u0644\u062A\u064A \u0646\u0639\u0631\u0641\u0647\u0627 \u0627\u0644\u0622\u0646. \u0643\u0627\u0646\u062A \u0631\u062D\u0644\u0627\u062A \u0623\u0628\u0648\u0644\u0648\u0646\u064A\u0648\u0633 \u0625\u0644\u0649 \u0622\u0633\u064A\u0627 \u0627\u0644\u0635\u063A\u0631\u0649 \u0648\u0633\u0648\u0631\u064A\u0627 \u0648\u0639\u0627\u0634 \u0644\u0648\u0642\u062A \u0642\u0635\u064A\u0631 \u0641\u064A \u0628\u064A\u0631\u063A\u0627\u0645\u0648\u0646."@ar , "Apollonios van Perga (Oudgrieks: \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u1F41 \u03A0\u03B5\u03C1\u03B3\u03B1\u1FD6\u03BF\u03C2; Latijn: Apollonius Pergaeus)( Perge, ca. 262 v.Chr.\u2013 Alexandri\u00EB, 190 v.Chr.) was een meetkundige en astronoom uit het oude Griekenland, die bekend is vanwege zijn werk over kegelsneden. Apollonios zou een leerling van de volgelingen van Euclides zijn geweest."@nl , "\u0410\u043F\u043E\u043B\u043B\u043E\u0301\u043D\u0438\u0439 \u041F\u0435\u0440\u0433\u0441\u043A\u0438\u0439 (\u0434\u0440.-\u0433\u0440\u0435\u0447. \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u1F41 \u03A0\u03B5\u03C1\u03B3\u03B1\u1FD6\u03BF\u03C2, \u041F\u0435\u0440\u0433\u0435, 262 \u0434\u043E \u043D. \u044D. \u2014 190 \u0434\u043E \u043D. \u044D.) \u2014 \u0434\u0440\u0435\u0432\u043D\u0435\u0433\u0440\u0435\u0447\u0435\u0441\u043A\u0438\u0439 \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u043A, \u043E\u0434\u0438\u043D \u0438\u0437 \u0442\u0440\u0451\u0445 (\u043D\u0430\u0440\u044F\u0434\u0443 \u0441 \u0415\u0432\u043A\u043B\u0438\u0434\u043E\u043C \u0438 \u0410\u0440\u0445\u0438\u043C\u0435\u0434\u043E\u043C) \u0432\u0435\u043B\u0438\u043A\u0438\u0445 \u0433\u0435\u043E\u043C\u0435\u0442\u0440\u043E\u0432 \u0430\u043D\u0442\u0438\u0447\u043D\u043E\u0441\u0442\u0438, \u0436\u0438\u0432\u0448\u0438\u0445 \u0432 III \u0432\u0435\u043A\u0435 \u0434\u043E \u043D. \u044D."@ru , "Apol\u00F4nio de Perga (portugu\u00EAs brasileiro) ou Apol\u00F3nio de Perga (portugu\u00EAs europeu) (Perge, 262 a.C. \u2014 194 a.C.) foi um matem\u00E1tico e astr\u00F4nomo grego da escola alexandrina (c. 261 a.C.), chamado de o Grande Ge\u00F4metra. Viveu em Alexandria, \u00C9feso e Perge."@pt , "\uC544\uD3F4\uB85C\uB2C8\uC624\uC2A4(\uACE0\uB300 \uADF8\uB9AC\uC2A4\uC5B4: \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2, \uAE30\uC6D0\uC804 262\uB144~\uAE30\uC6D0\uC804 190\uB144, Apollonius of Perga)\uB294 \uACE0\uB300 \uADF8\uB9AC\uC2A4\uC758 \uC218\uD559\uC790\uC774\uB2E4. \uC18C\uC544\uC2DC\uC544\uC758 \uD398\uB974\uAC8C\uC5D0\uC11C \uCD9C\uC0DD\uD558\uC600\uC73C\uBA70 \uC54C\uB809\uC0B0\uB4DC\uB9AC\uC544\uC5D0\uC11C \uACF5\uBD80\uD558\uC600\uB2E4. \uC5D0\uC6B0\uD074\uB808\uC774\uB370\uC2A4\u00B7\uC544\uB974\uD0A4\uBA54\uB370\uC2A4\uC640 \uD568\uAED8 \uADF8\uB9AC\uC2A4\uC758 3\uB300 \uC218\uD559\uC790\uB85C \uBD88\uB9B0\uB2E4. \uC6D0\uBFD4 \uACE1\uC120\uC758 \uC131\uC9C8\uACFC \uC751\uC6A9\uC758 \uB300\uBD80\uBD84\uC774 \uADF8\uC5D0 \uC758\uD558\uC5EC \uC54C\uB824\uC84C\uB2E4. \uC800\uC11C\uB85C <\uC6D0\uBFD4 \uACE1\uC120\uB860>\uC774 \uC788\uB2E4."@ko , "Apolonio de Pergo (\u0109irka\u016D 262 a.Kr.-190 a.Kr.) estis Greka geometriisto kaj astronomo. Li estas fama pro siaj verkoj pri konusa sekcio. Ni ankora\u016D uzas en la matematiko liajn esprimojn elipso, parabolo kaj hiperbolo. Li anka\u016D pristudis la \u015Dajnajn movi\u011Dojn de la planedoj kaj la \u015Dajnan varia\u0135on en la rapideco de la luno. En 1710 Edmond Halley publikigis la tuton, kun rekonstruo pri la oka libro, en la Greka kun Latina traduko. Lia laboro estis tre influa je pli postaj matematikistoj kiel , Johano Keplero, Descartes kaj Newton."@eo , "\u963F\u6CE2\u7F57\u5C3C\u5965\u65AF\uFF08\u53E4\u5E0C\u814A\u8BED\uFF1A\uFF0C\u82F1\u8A9E\uFF1AApollonius of Perga\uFF0C\u524D262\u5E74\uFF0D\u524D190\u5E74\uFF09\uFF0C\u53C8\u8BD1\u4E3A\u963F\u6CE2\u7F57\u5C3C\u4E4C\u65AF\uFF0C\u963F\u6CE2\u7F57\u5C3C\u7B49\uFF0C\u53E4\u5E0C\u814A\u6570\u5B66\u5BB6\uFF0C\u5929\u6587\u5B66\u5BB6\u3002\u8457\u6709\u300A\u300B\u516B\u5377\uFF0C\u300A\u300B\uFF08\u1F18\u03C0\u03B1\u03C6\u03B1\u03AF\uFF09\uFF0C\u7B49\u7B49\u3002"@zh , "Apollonius dari Perga (bahasa Yunani: \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2) (sekitar 262 SM\u2013sekitar 190 SM) adalah seorang ahli geometri dan astronom Yunani yang dikenal karena karyanya mengenai irisan kerucut. Metodologi dan terminologinya yang inovatif, khususnya dalam bidang kerucut, memengaruhi banyak sarjana sesudahnya termasuk Ptolemaeus, , Isaac Newton, dan Ren\u00E9 Descartes. Adalah Apollonius yang memberi nama elips, parabola, dan hiperbola, seperti yang kita kenal sekarang. Hipotesis mengenai eksentrisitas orbit, atau , untuk menjelaskan pergerakan teramati dari planet-planet dan perubahan kecepatan Bulan, dipertautkan pada namanya. Teorema Apollonius mendemonstrasikan bahwa dua model tersebut adalah ekuivalen di bawah parameter-parameter yang sesuai. Ptolemaeus menggambarkan teori ini dalam Almagest XII.1. "@in , "Apollonios fr\u00E5n Perga var en grekisk matematiker och astronom, fr\u00E5n Perga i Pamfylien, f\u00F6dd 262 f.Kr., d\u00F6d 190 f.Kr."@sv . @prefix foaf: . dbr:Apollonius_of_Perga foaf:depiction , , , , , . @prefix dcterms: . @prefix dbc: . dbr:Apollonius_of_Perga dcterms:subject dbc:Pamphylians , dbc:Ancient_Greek_geometers , dbc:History_of_geometry , , , dbc:Ancient_Greek_inventors , , dbc:Ancient_Greek_astronomers , ; dbo:wikiPageID 257242 ; dbo:wikiPageRevisionID 1118538443 ; dbo:wikiPageWikiLink , dbr:Conical_surface , dbr:Woepke , dbr:Adrianus_Romanus , , , , dbr:Cartesian_coordinate_system , dbr:Royal_Norfolk_Regiment , dbr:Stringfellow_Barr , , dbr:Tangents , dbr:Linguistic_reconstruction , , dbr:Tangent_point , , dbr:Exponentiation , dbr:University_of_Virginia , , dbr:Attalus_II_Philadelphus , dbr:Edward_Bernard , dbr:Federico_Commandino , dbr:United_States_Naval_Academy , dbr:Extensionality , dbr:Ivor_Bulmer-Thomas , dbr:The_Sand_Reckoner , dbr:Diadochi , dbr:Eumenes_II , dbr:John_Adams , dbr:Orbital_eccentricity , dbr:Moon , dbr:Shape , dbr:Hypsicles , dbr:Pythagoras , dbr:Analytic_geometry , , dbr:Robert_Simson , dbr:Pythagorean_Theorem , dbr:Regular_grid , dbr:Centroid , , dbr:Willebrord_Snell , dbr:Pappus_of_Alexandria , dbr:Dodecahedron , dbc:Pamphylians , , dbr:Acta_Eruditorum , dbr:Henry_Burchard_Fine , dbc:Ancient_Greek_geometers , , dbr:Anatolia , dbr:Jacobus_Golius , dbr:Angle , dbr:Radius_of_curvature , , , dbr:Ordinate , dbr:Aristotle , dbr:Ephesus , dbr:Etymology , , , dbr:Evolute , dbr:Eutocius_of_Ascalon , dbr:Roshdi_Rashed , dbr:Euclid , dbc:History_of_geometry , dbr:Almagest , dbr:Radius , dbr:Persian_Empire , dbr:Alexander_the_Great , dbr:Renaissance , dbr:Ellipse , dbr:Problem_of_Apollonius , dbr:Gottfried_Wilhelm_Leibniz , dbr:Hellenistic_Period , dbr:Great_Books , , , , dbr:Circle , dbr:Scott_Buchanan , , dbr:Quadratic_functions , dbr:Kingdom_of_Pergamon , dbr:University_of_Chicago , dbr:Geometric_algebra , dbr:Circles_of_Apollonius , dbr:Perpendicular , , , dbr:Coordinates , dbr:Edmond_Halley , dbr:Aleppo , , , , dbr:Loeb_Classical_Library , dbr:Curve , dbr:Apollonius_point , , , dbr:New_Latin , , dbr:Boston_Public_Library , dbr:Bodleian_Library , dbr:Abscissa , , dbr:Philonides_of_Laodicea , dbr:Leiden , dbr:Conjugate_diameters , dbr:Pamphylia , dbr:Aberdeen , dbr:Cone , dbr:Asymptotes , dbr:Logos , dbr:Henry_Aldrich , dbr:Ptolemy_III_Euergetes , dbr:Line_segment , , dbr:Greek_geometric_algebra , dbr:Mathematics , dbr:Ptolemaic_dynasty , , , dbr:Apollonian_circles , dbr:Apollonian_gasket , dbr:Apollonian_network , dbr:Conic_sections , dbr:Bisection , dbr:Perga , , , dbr:Ancient_Greek_units_of_measurement , dbr:Parabola , dbr:Icosahedron , , dbr:Hyperbola , , , dbr:Geometer , , dbr:Teubner , dbr:Museum , , dbr:Seleucid_Empire , dbr:Pi , dbr:Great_Books_of_the_Western_World , dbr:Ancient_Greece , , , , dbr:Astronomer , dbr:Diameter , dbr:Linear_equation , dbc:Ancient_Greek_inventors , dbr:Dictionary_of_Scientific_Biography , dbr:Solid_geometry , dbr:Lycaeum , , dbr:Menaechmus , , , , dbr:Neusis_construction , dbc:Ancient_Greek_astronomers , , dbr:Center_of_curvature , dbr:Middle_Ages , , dbr:Planet , dbr:Deferent_and_epicycle , , dbr:Attalid_dynasty , dbr:Parchment , dbr:Archimedes , , dbr:Parts-per_notation , dbr:Philip_II_of_Macedon , , dbr:Basilides_of_Tyre , dbr:Serenus_of_Antinouplis , ; dbo:wikiPageExternalLink . @prefix ns9: . dbr:Apollonius_of_Perga dbo:wikiPageExternalLink ns9:dielehrevondenk01zeutgoog , . @prefix ns10: . dbr:Apollonius_of_Perga dbo:wikiPageExternalLink ns10:can-you-really-derive-conic-formulae-from-a-cone , , , . @prefix ns11: . dbr:Apollonius_of_Perga dbo:wikiPageExternalLink ns11:Apollonius-of-Perga , , , , , , , ns9:treatiseonconic00heatgoog , ns9:selectionsillust02bulmuoft , ; owl:sameAs , . @prefix ns12: . dbr:Apollonius_of_Perga owl:sameAs ns12:p06939766X , , , , , , . @prefix dbpedia-pl: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-pl:Apoloniusz_z_Pergi . @prefix dbpedia-la: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-la:Apollonius_Pergaeus , , , , , , , , , , . @prefix ns15: . dbr:Apollonius_of_Perga owl:sameAs ns15:Apollonius_o_Perga , . @prefix dbpedia-eu: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-eu:Apolonio_Pergakoa . @prefix dbpedia-ro: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-ro:Apoloniu_din_Perga , . @prefix dbpedia-es: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-es:Apolonio_de_Perge , , , . @prefix ns19: . dbr:Apollonius_of_Perga owl:sameAs ns19:Apollonios_de_Perga . @prefix dbpedia-it: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-it:Apollonio_di_Perga . @prefix ns21: . dbr:Apollonius_of_Perga owl:sameAs ns21:Apolonio_de_Perge , . @prefix yago-res: . dbr:Apollonius_of_Perga owl:sameAs yago-res:Apollonius_of_Perga , , , . @prefix dbpedia-war: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-war:Apolonio_han_Perga , . @prefix dbpedia-de: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-de:Apollonios_von_Perge . @prefix dbpedia-id: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-id:Apollonius_dari_Perga . @prefix dbpedia-no: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-no:Apollonios_fra_Perge . @prefix dbpedia-ku: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-ku:Apolonios , , . @prefix dbpedia-gl: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-gl:Apolonio_de_Perge . @prefix dbpedia-sl: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-sl:Apolonij , , , . @prefix dbpedia-hr: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-hr:Apolonije_iz_Perge , , . @prefix dbpedia-da: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-da:Apollonius . @prefix dbpedia-fi: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-fi:Apollonios_Pergalainen . @prefix dbpedia-eo: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-eo:Apolonio_de_Pergo , . @prefix ns34: . dbr:Apollonius_of_Perga owl:sameAs ns34:Apollonius_ti_Perga , , , , , , , . @prefix ns35: . dbr:Apollonius_of_Perga owl:sameAs ns35:kRJ3 . @prefix dbpedia-fr: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-fr:Apollonios_de_Perga , . @prefix dbpedia-et: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-et:Apollonios_Pergest , , . @prefix ns38: . dbr:Apollonius_of_Perga owl:sameAs ns38:Apolloniy_pergayos . @prefix dbpedia-sh: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-sh:Apolonije_iz_Pergama , , , . @prefix dbpedia-nl: . dbr:Apollonius_of_Perga owl:sameAs dbpedia-nl:Apollonius_van_Perga , . @prefix wikidata: . dbr:Apollonius_of_Perga owl:sameAs wikidata:Q180109 , . @prefix dbp: . @prefix dbt: . dbr:Apollonius_of_Perga dbp:wikiPageUsesTemplate dbt:MacTutor_Biography , dbt:Pi , , dbt:Greek_astronomy , dbt:Blockquote , dbt:Cite_web , dbt:Cite_thesis , dbt:Cite_encyclopedia , dbt:Cite_book , dbt:Circa , dbt:Greek_mathematics , dbt:Math , dbt:Short_description , dbt:Commons_category , dbt:Sfn , dbt:Lang-grc-gre , dbt:Authority_control , dbt:Main , dbt:EB1911 , dbt:Further , dbt:Reflist , dbt:Frac , dbt:Refend , dbt:Refbegin , dbt:Div_col , dbt:Div_col_end ; dbo:thumbnail ; dbp:first "Thomas Little"@en ; dbp:last "Heath"@en ; dbp:pages 186 ; dbp:volume 2 ; dbp:wstitle "Apollonius of Perga"@en ; dbo:abstract "Apollonios de Perga ou Apollonius de Perge (en grec ancien \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u1F41 \u03A0\u03B5\u03C1\u03B3\u03B1\u1FD6\u03BF\u03C2 / Apoll\u1ED1nios o Perga\u00EDos), n\u00E9 dans la seconde moiti\u00E9 du IIIe si\u00E8cle av. J.-C. (probablement autour de 240 av. J.-C.), disparu au d\u00E9but du IIe si\u00E8cle av. J.-C. est un g\u00E9om\u00E8tre et astronome grec. Il serait originaire de Perg\u00E9 (ou Perga, ou encore Perg\u00E8 actuelle Aksu en Turquie), mais a v\u00E9cu \u00E0 Alexandrie. Il est consid\u00E9r\u00E9 comme l'une des grandes figures des math\u00E9matiques hell\u00E9nistiques."@fr , "\u039F \u0391\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u03BF \u03A0\u03B5\u03C1\u03B3\u03B1\u03AF\u03BF\u03C2 (\u03AE \u03A0\u03B5\u03C1\u03B3\u03B5\u03CD\u03C2) \u03C5\u03C0\u03AE\u03C1\u03BE\u03B5 \u03AD\u03BD\u03B1\u03C2 \u03B1\u03C0\u03CC \u03C4\u03BF\u03C5\u03C2 \u03BC\u03B5\u03B3\u03B1\u03BB\u03CD\u03C4\u03B5\u03C1\u03BF\u03C5\u03C2 \u0388\u03BB\u03BB\u03B7\u03BD\u03B5\u03C2 \u03BC\u03B1\u03B8\u03B7\u03BC\u03B1\u03C4\u03B9\u03BA\u03BF\u03CD\u03C2 \u2013 \u03B3\u03B5\u03C9\u03BC\u03AD\u03C4\u03C1\u03B5\u03C2 \u03BA\u03B1\u03B9 \u03B1\u03C3\u03C4\u03C1\u03BF\u03BD\u03CC\u03BC\u03BF\u03C5\u03C2 \u03C4\u03B7\u03C2 \u03B1\u03BB\u03B5\u03BE\u03B1\u03BD\u03B4\u03C1\u03B9\u03BD\u03AE\u03C2 \u03B5\u03C0\u03BF\u03C7\u03AE\u03C2. \u0393\u03B5\u03BD\u03BD\u03AE\u03B8\u03B7\u03BA\u03B5 \u03C0\u03B5\u03C1\u03AF \u03C4\u03BF 260 \u03C0.\u03A7. (\u03AE \u03C3\u03CD\u03BC\u03C6\u03C9\u03BD\u03B1 \u03BC\u03B5 \u03AC\u03BB\u03BB\u03BF\u03C5\u03C2 \u03BC\u03B5\u03BB\u03B5\u03C4\u03B7\u03C4\u03AD\u03C2 \u03C0\u03B5\u03C1\u03AF \u03C4\u03BF 246 \u03BC\u03B5 221 \u03C0.\u03A7.), \u03C3\u03C4\u03B7\u03BD \u03A0\u03AD\u03C1\u03B3\u03B7 \u03C4\u03B7\u03C2 \u03A0\u03B1\u03BC\u03C6\u03C5\u03BB\u03AF\u03B1\u03C2, \u03BC\u03B9\u03B1 \u03C0\u03CC\u03BB\u03B7 \u03BA\u03BF\u03BD\u03C4\u03AC \u03C3\u03C4\u03B7\u03BD \u0391\u03C4\u03C4\u03AC\u03BB\u03B5\u03B9\u03B1 \u03C4\u03B7\u03C2 \u039C. \u0391\u03C3\u03AF\u03B1\u03C2. \u03A3\u03C0\u03BF\u03CD\u03B4\u03B1\u03C3\u03B5 \u03BA\u03B1\u03B9 \u03B4\u03AF\u03B4\u03B1\u03BE\u03B5 \u03C3\u03C4\u03B7\u03BD \u0391\u03BB\u03B5\u03BE\u03AC\u03BD\u03B4\u03C1\u03B5\u03B9\u03B1 \u03BA\u03BF\u03BD\u03C4\u03AC \u03C3\u03C4\u03BF\u03C5\u03C2 \u03C3\u03C5\u03BD\u03B5\u03C7\u03B9\u03C3\u03C4\u03AD\u03C2 \u03C4\u03BF\u03C5 \u0395\u03C5\u03BA\u03BB\u03B5\u03AF\u03B4\u03B7 \u03BA\u03B1\u03B9 \u03C3\u03C5\u03BD\u03AD\u03B3\u03C1\u03B1\u03C8\u03B5 \u03B3\u03CD\u03C1\u03C9 \u03C3\u03C4\u03B1 21 \u03AD\u03C1\u03B3\u03B1 \u03BC\u03B1\u03B8\u03B7\u03BC\u03B1\u03C4\u03B9\u03BA\u03CE\u03BD, \u03B3\u03B5\u03C9\u03BC\u03B5\u03C4\u03C1\u03AF\u03B1\u03C2, \u03B1\u03C3\u03C4\u03C1\u03BF\u03BD\u03BF\u03BC\u03AF\u03B1\u03C2 \u03BA\u03B1\u03B9 \u03BC\u03B7\u03C7\u03B1\u03BD\u03B9\u03BA\u03AE\u03C2, \u03C0\u03BF\u03C5 \u03C7\u03C9\u03C1\u03AF\u03B6\u03BF\u03BD\u03C4\u03B1\u03BD \u03C3\u03B5 \u03C5\u03C0\u03BF\u03BA\u03B1\u03C4\u03B7\u03B3\u03BF\u03C1\u03AF\u03B5\u03C2 \u03C4\u03CC\u03BC\u03C9\u03BD \u03B5\u03BA \u03C4\u03C9\u03BD \u03BF\u03C0\u03BF\u03AF\u03C9\u03BD \u03B4\u03B9\u03B1\u03C3\u03CE\u03B8\u03B7\u03BA\u03B1\u03BD \u03BC\u03CC\u03BD\u03BF \u03C4\u03AD\u03C3\u03C3\u03B5\u03C1\u03B1 \u03BC\u03B5 \u03B3\u03BD\u03C9\u03C3\u03C4\u03CC\u03C4\u03B5\u03C1\u03BF \u03B5\u03BE\u2019 \u03B1\u03C5\u03C4\u03CE\u03BD \u03C4\u03BF \u03AD\u03C1\u03B3\u03BF 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\u03B3\u03B9\u03B1 \u03C4\u03BF \u03AD\u03C1\u03B3\u03BF \u03C4\u03BF\u03C5, \u03C4\u03CC\u03C3\u03BF\u03BD \u03CE\u03C3\u03C4\u03B5 \u03C4\u03CC\u03BB\u03BC\u03B7\u03C3\u03B5 \u03BD\u03B1 \u03B1\u03C3\u03BA\u03AE\u03C3\u03B5\u03B9 \u03BA\u03C1\u03B9\u03C4\u03B9\u03BA\u03AE \u03C3\u03B5 \u03AD\u03C1\u03B3\u03B1 \u03C4\u03BF\u03C5 \u0395\u03C5\u03BA\u03BB\u03B5\u03AF\u03B4\u03B7 \u03BA\u03B1\u03B9 \u03B5\u03BD\u03AF\u03BF\u03C4\u03B5 \u03BD\u03B1 \u03C0\u03C1\u03BF\u03C4\u03B5\u03AF\u03BD\u03B5\u03B9 \u03C1\u03B9\u03B6\u03B9\u03BA\u03AD\u03C2 \u03C4\u03C1\u03BF\u03C0\u03BF\u03C0\u03BF\u03B9\u03AE\u03C3\u03B5\u03B9\u03C2 \u03C3\u03B5 \u03BC\u03B5\u03C1\u03B9\u03BA\u03AC \u03C3\u03B7\u03BC\u03B1\u03BD\u03C4\u03B9\u03BA\u03AC \u03C4\u03BC\u03AE\u03BC\u03B1\u03C4\u03B1 \u03C4\u03C9\u03BD \u03B5\u03C5\u03BA\u03BB\u03B5\u03AF\u03B4\u03B5\u03B9\u03C9\u03BD \u00AB\u03A3\u03C4\u03BF\u03B9\u03C7\u03B5\u03AF\u03C9\u03BD\u00BB. \u039F 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\u0391\u03C0\u03BF\u03BB\u03BB\u03C9\u03BD\u03AF\u03BF\u03C5 \u03BA\u03B1\u03B9 \u03AD\u03C0\u03B5\u03B9\u03C4\u03B1 \u03B5\u03C0\u03BF\u03C7\u03AE \u03BA\u03B1\u03B8\u03B9\u03B5\u03C1\u03CE\u03B8\u03B7\u03BA\u03B1\u03BD \u03BF\u03B9 \u03BD\u03B5\u03CC\u03C4\u03B5\u03C1\u03B5\u03C2 \u03BF\u03C1\u03BF\u03BB\u03BF\u03B3\u03AF\u03B5\u03C2 \u00AB\u03C0\u03B1\u03C1\u03B1\u03B2\u03BF\u03BB\u03AE\u00BB, \u00AB\u03AD\u03BB\u03BB\u03B5\u03B9\u03C8\u03B7\u00BB, \u00AB\u03C5\u03C0\u03B5\u03C1\u03B2\u03BF\u03BB\u03AE\u00BB."@el , "Apoll\u00F3nios z Pergy (\u0159ecky \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u1F41 \u03A0\u03B5\u03C1\u03B3\u03B1\u1FD6\u03BF\u03C2) byl starov\u011Bk\u00FD \u0159eck\u00FD geometr, matematik a astronom ze 3.-2. stolet\u00ED p\u0159. n. l. Byl t\u00E9\u017E zv\u00E1n \"Velk\u00FD geometr\". Byl Archim\u00E9dov\u00FDm sou\u010Dasn\u00EDkem, ale sp\u00ED\u0161e s n\u00EDm polemizoval. Vydal se jinou cestou ne\u017E on, nav\u00E1zal na Eukleida a eleatskou \u0161kolu."@cs , "\u963F\u6CE2\u7F57\u5C3C\u5965\u65AF\uFF08\u53E4\u5E0C\u814A\u8BED\uFF1A\uFF0C\u82F1\u8A9E\uFF1AApollonius of Perga\uFF0C\u524D262\u5E74\uFF0D\u524D190\u5E74\uFF09\uFF0C\u53C8\u8BD1\u4E3A\u963F\u6CE2\u7F57\u5C3C\u4E4C\u65AF\uFF0C\u963F\u6CE2\u7F57\u5C3C\u7B49\uFF0C\u53E4\u5E0C\u814A\u6570\u5B66\u5BB6\uFF0C\u5929\u6587\u5B66\u5BB6\u3002\u8457\u6709\u300A\u300B\u516B\u5377\uFF0C\u300A\u300B\uFF08\u1F18\u03C0\u03B1\u03C6\u03B1\u03AF\uFF09\uFF0C\u7B49\u7B49\u3002"@zh , "\uC544\uD3F4\uB85C\uB2C8\uC624\uC2A4(\uACE0\uB300 \uADF8\uB9AC\uC2A4\uC5B4: \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2, \uAE30\uC6D0\uC804 262\uB144~\uAE30\uC6D0\uC804 190\uB144, Apollonius of Perga)\uB294 \uACE0\uB300 \uADF8\uB9AC\uC2A4\uC758 \uC218\uD559\uC790\uC774\uB2E4. \uC18C\uC544\uC2DC\uC544\uC758 \uD398\uB974\uAC8C\uC5D0\uC11C \uCD9C\uC0DD\uD558\uC600\uC73C\uBA70 \uC54C\uB809\uC0B0\uB4DC\uB9AC\uC544\uC5D0\uC11C \uACF5\uBD80\uD558\uC600\uB2E4. \uC5D0\uC6B0\uD074\uB808\uC774\uB370\uC2A4\u00B7\uC544\uB974\uD0A4\uBA54\uB370\uC2A4\uC640 \uD568\uAED8 \uADF8\uB9AC\uC2A4\uC758 3\uB300 \uC218\uD559\uC790\uB85C \uBD88\uB9B0\uB2E4. \uC6D0\uBFD4 \uACE1\uC120\uC758 \uC131\uC9C8\uACFC \uC751\uC6A9\uC758 \uB300\uBD80\uBD84\uC774 \uADF8\uC5D0 \uC758\uD558\uC5EC \uC54C\uB824\uC84C\uB2E4. \uC800\uC11C\uB85C <\uC6D0\uBFD4 \uACE1\uC120\uB860>\uC774 \uC788\uB2E4."@ko , "\u0623\u0628\u0644\u0648\u0646\u064A\u0648\u0633 \u0627\u0644\u0628\u0631\u063A\u0627\u0648\u064A (\u0628\u0627\u0644\u064A\u0648\u0646\u0627\u0646\u064A\u0629:\u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2) (\u0648\u0644\u062F \u0641\u064A \u0627\u0644\u0639\u0627\u0645 262 \u0642.\u0645 \u0641\u064A \u0628\u064A\u0631\u063A\u060C \u0648\u062A\u0648\u0641\u064A \u0641\u064A 190 \u0642.\u0645 \u0641\u064A \u0627\u0644\u0625\u0633\u0643\u0646\u062F\u0631\u064A\u0629) \u0643\u0627\u0646 \u0641\u0644\u0643\u064A \u0648\u0645\u0647\u0646\u062F\u0633 \u0648\u0639\u0627\u0644\u0645 \u0631\u064A\u0627\u0636\u064A\u0627\u062A \u064A\u0648\u0646\u0627\u0646\u064A. \u0645\u0634\u0647\u0648\u0631 \u0644\u0623\u0639\u0645\u0627\u0644\u0647 \u0641\u064A \u0645\u062C\u0627\u0644 \u0627\u0644\u0642\u0637\u0639 \u0627\u0644\u0645\u062E\u0631\u0648\u0637\u064A\u0629. \u062A\u0623\u062B\u0631 \u0628\u0647 \u0627\u0644\u0643\u062B\u064A\u0631 \u0645\u0646 \u0627\u0644\u0639\u0644\u0645\u0627\u0621 \u0645\u062B\u0644 \u0628\u0637\u0644\u064A\u0645\u0648\u0633\u060C \u060C \u0627\u0633\u062D\u0642 \u0646\u064A\u0648\u062A\u0646\u060C \u0648\u0631\u064A\u0646\u064A\u0647 \u062F\u064A\u0643\u0627\u0631\u062A. \u0623\u0628\u0648\u0644\u0648\u0646\u064A\u0648\u0633 \u0647\u0648 \u0627\u0644\u0630\u064A \u0623\u0639\u0637\u0649 \u0627\u0644\u0642\u0637\u0648\u0639 \u0627\u0644\u0645\u062E\u0631\u0648\u0637\u064A\u0629 \u0627\u0644\u0623\u0633\u0645\u0627\u0621: (\u0627\u0644\u0642\u0637\u0639 \u0627\u0644\u0646\u0627\u0642\u0635\u060C \u0627\u0644\u0642\u0637\u0639 \u0627\u0644\u0645\u0643\u0627\u0641\u0626\u060C \u0648\u0627\u0644\u0642\u0637\u0639 \u0627\u0644\u0632\u0627\u0626\u062F) \u0627\u0644\u062A\u064A \u0646\u0639\u0631\u0641\u0647\u0627 \u0627\u0644\u0622\u0646. \u0643\u0627\u0646\u062A \u0631\u062D\u0644\u0627\u062A \u0623\u0628\u0648\u0644\u0648\u0646\u064A\u0648\u0633 \u0625\u0644\u0649 \u0622\u0633\u064A\u0627 \u0627\u0644\u0635\u063A\u0631\u0649 \u0648\u0633\u0648\u0631\u064A\u0627 \u0648\u0639\u0627\u0634 \u0644\u0648\u0642\u062A \u0642\u0635\u064A\u0631 \u0641\u064A \u0628\u064A\u0631\u063A\u0627\u0645\u0648\u0646."@ar , "Apolonio Pergakoa (antzinako grezieraz: \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2; Perga, K.a. 262-K.a. 190 inguru) greziar geometrialari bat izan zen, izeneko bere lanagatik ospetsua izan zena. Apolonio izan zen elipse, parabola eta hiperbola izena eman ziena hala ezagutzen diren irudiei. Berari ematen zaizkio, baita ere, orbita eszentrikoen hipotesia edo epizikloen teoria, planeten irudizko mugimendua eta Ilargiaren abiadura aldagarria azaltzeko. Geometriari buruzko bere lan zabalak sekzio konikoei eta kurba lauei buruz eta hauen azaleren koadraturari buruzkoak dira. Bere lan guztia zortzi liburutan bildu zuen eta Geometrialari Handi ezizenarekin ezagutua izan zen. bezala ezagutzen den emandako hiru zirkuluren zirkunferentzia tangenteak aurkitzearen problema proposatu eta ebatzi zuen. Gaur egun galduta dagoen bere Tangentziak edo Loturak lanean, agertzen da, Pappus Alexandriakoari esker ezagutzen dena."@eu , "\u0410\u043F\u043E\u043B\u043B\u043E\u043D\u0456\u0439 \u0437 \u041F\u0435\u0440\u0433\u0438 \u0430\u0431\u043E \u0410\u043F\u043E\u043B\u043B\u043E\u043D\u0456\u0439 \u041F\u0435\u0440\u0437\u044C\u043A\u0438\u0439 (\u0433\u0440\u0435\u0446. \u0391\u03BD\u03BF\u03BB\u03BB\u03C9\u03BD\u03B9\u03BF\u03C2 \u03BF \u03A0\u03B5\u03C1\u03B3\u03B1\u03B9\u03BF\u03C2; 262 \u0434\u043E \u043D. \u0435. \u2014 190 \u0434\u043E \u043D. \u0435.) \u2014 \u0434\u0430\u0432\u043D\u044C\u043E\u0433\u0440\u0435\u0446\u044C\u043A\u0438\u0439 \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u043A, \u043E\u0434\u0438\u043D \u0437 \u043F\u0440\u0435\u0434\u0441\u0442\u0430\u0432\u043D\u0438\u043A\u0456\u0432 \u0430\u043B\u0435\u043A\u0441\u0430\u043D\u0434\u0440\u0456\u0439\u0441\u044C\u043A\u043E\u0457 \u0448\u043A\u043E\u043B\u0438. \u0420\u0430\u0437\u043E\u043C \u0437 \u0415\u0432\u043A\u043B\u0456\u0434\u043E\u043C \u0442\u0430 \u0410\u0440\u0445\u0456\u043C\u0435\u0434\u043E\u043C \u0432\u0432\u0430\u0436\u0430\u0432\u0441\u044F \u043E\u0434\u043D\u0438\u043C \u0437 \u0442\u0440\u044C\u043E\u0445 \u043D\u0430\u0439\u0432\u0438\u0434\u0430\u0442\u043D\u0456\u0448\u0438\u0445 \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u043A\u0456\u0432 \u0430\u043D\u0442\u0438\u0447\u043D\u043E\u0441\u0442\u0456."@uk , "Apollonius dari Perga (bahasa Yunani: \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2) (sekitar 262 SM\u2013sekitar 190 SM) adalah seorang ahli geometri dan astronom Yunani yang dikenal karena karyanya mengenai irisan kerucut. Metodologi dan terminologinya yang inovatif, khususnya dalam bidang kerucut, memengaruhi banyak sarjana sesudahnya termasuk Ptolemaeus, , Isaac Newton, dan Ren\u00E9 Descartes. Adalah Apollonius yang memberi nama elips, parabola, dan hiperbola, seperti yang kita kenal sekarang. Hipotesis mengenai eksentrisitas orbit, atau , untuk menjelaskan pergerakan teramati dari planet-planet dan perubahan kecepatan Bulan, dipertautkan pada namanya. Teorema Apollonius mendemonstrasikan bahwa dua model tersebut adalah ekuivalen di bawah parameter-parameter yang sesuai. Ptolemaeus menggambarkan teori ini dalam Almagest XII.1. di Bulan dinamai untuk menghormati jasanya. \n* l \n* b \n* s"@in , "Apol\u00B7loni de Perge o Apollonius Pergaeus (en grec: \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2) (al voltant de 262 aC - al voltant 190 aC) va ser un ge\u00F2metra grec fam\u00F3s per la seva obra Sobre les seccions c\u00F2niques. Va ser Apol\u00B7loni qui va donar els noms d'el\u00B7lipse, par\u00E0bola i hip\u00E8rbola a les figures que coneixem avui."@ca , "Apollonio di Perga (in greco antico: \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u1F41 \u03A0\u03B5\u03C1\u03B3\u03B1\u1FD6\u03BF\u03C2, Apoll\u1E53nios ho Perga\u00EEos; in latino: Apollonius Pergaeus; Perga, 262 a.C. \u2013 Alessandria d'Egitto, 190 a.C.) \u00E8 stato un matematico e astronomo greco antico, famoso per le sue opere sulle sezioni coniche e l'introduzione, in astronomia, degli epicicli e deferenti. Fu attivo tra la fine del III e l'inizio del II secolo a.C., ma le scarse testimonianze sulla sua vita rendono impossibile una migliore datazione e date specifiche (come quelle in , 151) devono essere intese solo in senso puramente speculativo. Fu Apollonio, inoltre, che diede alla ellisse, alla parabola e alla iperbole i nomi con i quali da allora queste curve sono identificate."@it , "Apollonios van Perga (Oudgrieks: \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u1F41 \u03A0\u03B5\u03C1\u03B3\u03B1\u1FD6\u03BF\u03C2; Latijn: Apollonius Pergaeus)( Perge, ca. 262 v.Chr.\u2013 Alexandri\u00EB, 190 v.Chr.) was een meetkundige en astronoom uit het oude Griekenland, die bekend is vanwege zijn werk over kegelsneden. Apollonios zou een leerling van de volgelingen van Euclides zijn geweest."@nl , "Apoloniusz z Pergi (stgr. \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u1F41 \u03A0\u03B5\u03C1\u03B3\u03B1\u1FD6\u03BF\u03C2, Apollonios hoe Pergaios; ur. ok. 260 p.n.e., zm. ok. 190 p.n.e.) \u2013 starogrecki uczony: matematyk i astronom, znany z bada\u0144 nad geometri\u0105 krzywych p\u0142askich."@pl , "Apol\u00F4nio de Perga (portugu\u00EAs brasileiro) ou Apol\u00F3nio de Perga (portugu\u00EAs europeu) (Perge, 262 a.C. \u2014 194 a.C.) foi um matem\u00E1tico e astr\u00F4nomo grego da escola alexandrina (c. 261 a.C.), chamado de o Grande Ge\u00F4metra. Viveu em Alexandria, \u00C9feso e Perge."@pt , "\u0410\u043F\u043E\u043B\u043B\u043E\u0301\u043D\u0438\u0439 \u041F\u0435\u0440\u0433\u0441\u043A\u0438\u0439 (\u0434\u0440.-\u0433\u0440\u0435\u0447. \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u1F41 \u03A0\u03B5\u03C1\u03B3\u03B1\u1FD6\u03BF\u03C2, \u041F\u0435\u0440\u0433\u0435, 262 \u0434\u043E \u043D. \u044D. \u2014 190 \u0434\u043E \u043D. \u044D.) \u2014 \u0434\u0440\u0435\u0432\u043D\u0435\u0433\u0440\u0435\u0447\u0435\u0441\u043A\u0438\u0439 \u043C\u0430\u0442\u0435\u043C\u0430\u0442\u0438\u043A, \u043E\u0434\u0438\u043D \u0438\u0437 \u0442\u0440\u0451\u0445 (\u043D\u0430\u0440\u044F\u0434\u0443 \u0441 \u0415\u0432\u043A\u043B\u0438\u0434\u043E\u043C \u0438 \u0410\u0440\u0445\u0438\u043C\u0435\u0434\u043E\u043C) \u0432\u0435\u043B\u0438\u043A\u0438\u0445 \u0433\u0435\u043E\u043C\u0435\u0442\u0440\u043E\u0432 \u0430\u043D\u0442\u0438\u0447\u043D\u043E\u0441\u0442\u0438, \u0436\u0438\u0432\u0448\u0438\u0445 \u0432 III \u0432\u0435\u043A\u0435 \u0434\u043E \u043D. \u044D."@ru , "Apollonios fr\u00E5n Perga var en grekisk matematiker och astronom, fr\u00E5n Perga i Pamfylien, f\u00F6dd 262 f.Kr., d\u00F6d 190 f.Kr."@sv , "Apollonios von Perge (lateinisch Apollonius Pergaeus; * ca. 265 v. Chr. in Perge; \u2020 ca. 190 v. Chr. in Alexandria) war ein antiker griechischer Mathematiker, bekannt f\u00FCr sein Buch \u00FCber Kegelschnitte. In der Astronomie trug er zur Theorie der Mond- und Planetenbewegung bei, die sp\u00E4ter Ptolem\u00E4us in sein Lehrbuch \u00FCbernahm."@de , "\u30DA\u30EB\u30AC\u306E\u30A2\u30DD\u30ED\u30CB\u30A6\u30B9\uFF08\u53E4\u5E0C: \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2, \u7F85: Apollonius Pergaeus, \u82F1: Apollonius of Perga\u3001\u7D00\u5143\u524D262\u5E74\u9803 - \u7D00\u5143\u524D190\u5E74\u9803\uFF09\u306F\u3001\u53E4\u4EE3\u30AE\u30EA\u30B7\u30A2\u306E\u6570\u5B66\u8005\u30FB\u5929\u6587\u5B66\u8005\u3067\u3042\u308B\u3002\u5C0F\u30A2\u30B8\u30A2\u306E\u753A\u30DA\u30EB\u30AC\u306B\u751F\u307E\u308C\u305F\u3002\u30E0\u30BB\u30A4\u30AA\u30F3\u3067\u6559\u80B2\u3092\u3046\u3051\u3001\u30A2\u30EC\u30AD\u30B5\u30F3\u30C9\u30EA\u30A2\u3067\u30D7\u30C8\u30EC\u30DE\u30A4\u30AA\u30B93\u4E16\u304A\u3088\u3073\u30D7\u30C8\u30EC\u30DE\u30A4\u30AA\u30B94\u4E16\u306E\u6642\u4EE3\u306B\u6D3B\u8E8D\u3057\u305F\u3002\u73FE\u30C8\u30EB\u30B3\u306E\u30DA\u30EB\u30AC\u30E2\u30F3\u3067\u3057\u3070\u3089\u304F\u66AE\u3089\u3057\u305F\u3068\u3055\u308C\u308B\u3002\u30A2\u30EC\u30AD\u30B5\u30F3\u30C9\u30EA\u30A2\u3067\u6CA1\u3057\u305F\u3002"@ja , "Apolonio de Pergo (\u0109irka\u016D 262 a.Kr.-190 a.Kr.) estis Greka geometriisto kaj astronomo. Li estas fama pro siaj verkoj pri konusa sekcio. Ni ankora\u016D uzas en la matematiko liajn esprimojn elipso, parabolo kaj hiperbolo. Li anka\u016D pristudis la \u015Dajnajn movi\u011Dojn de la planedoj kaj la \u015Dajnan varia\u0135on en la rapideco de la luno. Lia verko pri konusoj, Greke \"Konika\", (225 a.Kr.), konsistas el ok libroj kaj estas unu el la plej gravaj de la antikva geometrio. La unuaj kvar libroj konservi\u011Dis en la Greka, kun komentoj de E\u016Dtokio. Pri la kvina, sesa kaj sepa libroj ni posedas ankora\u016D tradukon en la araba de , reviziitan de . La oka libro perdi\u011Dis. En 1710 Edmond Halley publikigis la tuton, kun rekonstruo pri la oka libro, en la Greka kun Latina traduko. Lia laboro estis tre influa je pli postaj matematikistoj kiel , Johano Keplero, Descartes kaj Newton."@eo , "Apollonius of Perga (Greek: \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2 \u1F41 \u03A0\u03B5\u03C1\u03B3\u03B1\u1FD6\u03BF\u03C2, translit. Apoll\u1E53nios ho Perga\u00EEos; Latin: Apollonius Pergaeus; c.\u2009240 BCE/BC \u2013 c.\u2009190 BCE/BC) was an Ancient Greek geometer and astronomer known for his work on conic sections. Beginning from the contributions of Euclid and Archimedes on the topic, he brought them to the state prior to the invention of analytic geometry. His definitions of the terms ellipse, parabola, and hyperbola are the ones in use today. Gottfried Wilhelm Leibniz stated \u201CHe who understands Archimedes and Apollonius will admire less the achievements of the foremost men of later times.\u201D Apollonius worked on numerous other topics, including astronomy. Most of this work has not survived, where exceptions are typically fragments referenced by other authors like Pappus of Alexandria. His hypothesis of eccentric orbits to explain the apparently aberrant motion of the planets, commonly believed until the Middle Ages, was superseded during the Renaissance. The Apollonius crater on the Moon is named in his honor."@en , "Apolonio de Perge o Perga (en griego \u1F08\u03C0\u03BF\u03BB\u03BB\u03CE\u03BD\u03B9\u03BF\u03C2) (Perge, c. 262 a, C, - Alejandr\u00EDa, c. 190 a. C.)\u200B fue un matem\u00E1tico y astr\u00F3nomo griego famoso por su obra Sobre las secciones c\u00F3nicas. \u00C9l fue quien dio el nombre de elipse, par\u00E1bola e hip\u00E9rbola, a las figuras que conocemos. Logr\u00F3 solucionar la ecuaci\u00F3n general de segundo grado por medio de la geometr\u00EDa c\u00F3nica.\u200B Tambi\u00E9n se le atribuye la hip\u00F3tesis de las \u00F3rbitas exc\u00E9ntricas o teor\u00EDa de los epiciclos para intentar explicar el movimiento aparente de los planetas y de la velocidad variable de la Luna. Sus extensos trabajos sobre geometr\u00EDa tratan de las secciones c\u00F3nicas y de las curvas planas y la cuadratura de sus \u00E1reas.\u200B Recopil\u00F3 su obra en ocho libros y fue conocido con el sobrenombre de El Gran Ge\u00F3metra.\u200B"@es ; dbp:authorLink "Thomas Little Heath"@en . @prefix gold: . dbr:Apollonius_of_Perga gold:hypernym dbr:Geometer . @prefix schema: . dbr:Apollonius_of_Perga schema:sameAs . @prefix prov: . dbr:Apollonius_of_Perga prov:wasDerivedFrom . @prefix xsd: . dbr:Apollonius_of_Perga dbo:wikiPageLength "77677"^^xsd:nonNegativeInteger . @prefix wikipedia-en: . dbr:Apollonius_of_Perga foaf:isPrimaryTopicOf wikipedia-en:Apollonius_of_Perga .