@prefix dbo: .
@prefix dbr: .
dbr:Vesica_piscis dbo:wikiPageWikiLink dbr:Circular_segment .
dbr:Pulteney_Bridge dbo:wikiPageWikiLink dbr:Circular_segment .
dbo:wikiPageWikiLink dbr:Circular_segment .
dbr:Mishnat_ha-Middot dbo:wikiPageWikiLink dbr:Circular_segment .
@prefix foaf: .
@prefix wikipedia-en: .
wikipedia-en:Circular_segment foaf:primaryTopic dbr:Circular_segment .
dbo:wikiPageWikiLink dbr:Circular_segment .
@prefix rdf: .
@prefix yago: .
dbr:Circular_segment rdf:type yago:Shape100027807 ,
dbo:Settlement ,
yago:Shape105064037 ,
yago:SpatialProperty105062748 ,
yago:Abstraction100002137 ,
yago:PlaneFigure113863186 ,
yago:Attribute100024264 ,
yago:Figure113862780 ,
yago:Property104916342 ,
yago:WikicatCircles ,
yago:Circle113873502 ,
yago:ConicSection113872975 ,
yago:Ellipse113878306 ,
yago:WikicatGeometricShapes .
@prefix rdfs: .
dbr:Circular_segment rdfs:label "Segmento circolare"@it ,
"Cirkla segmento"@eo ,
"Segment circular"@ca ,
"Odcinek ko\u0142a"@pl ,
"\u0421\u0435\u0433\u043C\u0435\u043D\u0442 (\u0433\u0435\u043E\u043C\u0435\u0442\u0440\u0456\u044F)"@uk ,
"\u5F13\u5F62"@ja ,
"\u0642\u0637\u0639\u0629 \u062F\u0627\u0626\u0631\u064A\u0629"@ar ,
"\u0421\u0435\u0433\u043C\u0435\u043D\u0442 (\u0433\u0435\u043E\u043C\u0435\u0442\u0440\u0438\u044F)"@ru ,
"Kruhov\u00E1 \u00FAse\u010D"@cs ,
"Cirkelsegment"@nl ,
"\uD65C\uAF34"@ko ,
"Segmento circular"@es ,
"Segmento circular"@pt ,
"Segment circulaire"@fr ,
"\u5F13\u5F62"@zh ,
"Kreissegment"@de ,
"Circular segment"@en ;
rdfs:comment "\uD65C\uAF34(circular segment)\uC774\uB780 \uC6D0 \uC704\uC758 \uC784\uC758\uC758 \uB450 \uC810\uC744 \uC774\uC740 \uC120\uBD84\uC778 \uD604(chord)\uACFC \uAC19\uC740 \uB450 \uC810\uC744 \uC5F0\uACB0\uD558\uB294 \uD638(\u5F27, arc)\uB85C \uC774\uB8E8\uC5B4\uC9C4 \uB3C4\uD615\uC774\uB2E4. \uD65C\uAF34\uC5D0\uC11C \uB450 \uC810\uC744 \uC774\uC740 \uC9C1\uC120\uC774 \uC9C0\uB984\uC774\uBA74 \uBC18\uC6D0\uC774 \uB41C\uB2E4. \uC810 A\uC640 \uC810B \uADF8\uB9AC\uACE0 \uC810 X\uAC00 \uC6D0 \uC704\uC5D0 \uB193\uC5EC \uC788\uC73C\uBA74 \uC6D0\uD638(arc) \uC704\uC5D0\uC11C \uC5B4\uB5A4 \uC120\uC774 \uB9CC\uB098\uB290\uB0D0\uC5D0 \uB530\uB77C \uD65C\uAF34 \uB610\uB294 \uBD80\uCC44\uAF34\uC774 \uB41C\uB2E4. \uC120\uBD84 BX \uB610\uB294 \uC120\uBD84 AB\uAC00 \uD638 \uC704\uC5D0\uC11C \uB9CC\uB098\uBA74 \uD65C\uAF34\uC774, \uC6D0\uC758 \uC911\uC2EC M\uC744 \uC9C0\uB098\uB294 \uCD5C\uB2E8\uAC70\uB9AC \uC120\uBD84 AM \uB610\uB294 \uC120\uBD84 BM\uC744 \uC810X\uC640 \uD638(arc) \uC704\uC5D0\uC11C \uC5F0\uACB0\uD558\uBA74 \uBCF4\uB2E4 \uD070 \uBD80\uCC44\uAF34 AMX \uB610\uB294 \uBCF4\uB2E4 \uC791\uC740 \uBD80\uCC44\uAF34 BMX\uAC00 \uB41C\uB2E4."@ko ,
"En geometr\u00EDa, un segmento circular (o segmento de un c\u00EDrculo) es la porci\u00F3n de un c\u00EDrculo limitada por una cuerda y el arco correspondiente. Sea R el radio del c\u00EDrculo, \u03B8 el \u00E1ngulo central, c la longitud de la cuerda, s la longitud del arco, h la altura del segmento circular (sagita) , y d la altura de la porci\u00F3n triangular (apotema). \n* El radio de tu c\u00EDrculoes \n* La longitud del arco es , donde est\u00E1 en radianes. \n* La longitud de la cuerda es \n* La altura es \n* El \u00E1ngulo es"@es ,
"Em geometria, um segmento circular (tamb\u00E9m segmento de c\u00EDrculo) \u00E9 uma \u00E1rea de um c\u00EDrculo informalmente definido como uma \u00E1rea que \u00E9 \"cortada\" do resto do c\u00EDrculo por uma reta secante ou uma corda. O segmento circular constitui a parte entre a secante e um arco, excluindo o centro do c\u00EDrculo."@pt ,
"In geometria, un segmento circolare \u00E8 una porzione di cerchio delimitata da una secante (o corda). La corda o secante definisce due segmenti circolari, uno dei quali \u00E8 contrassegnato in verde nell'illustrazione, mentre l'altro \u00E8 in bianco."@it ,
"\u0421\u0435\u0433\u043C\u0435\u043D\u0442 \u2014 \u043F\u043B\u043E\u0441\u043A\u0430 \u0444\u0456\u0433\u0443\u0440\u0430, \u043E\u0431\u043C\u0435\u0436\u0435\u043D\u0430 \u043A\u0440\u0438\u0432\u043E\u044E \u0442\u0430 \u0457\u0457 \u0445\u043E\u0440\u0434\u043E\u044E. \u041A\u0440\u0443\u0433\u043E\u0432\u0438\u0439 \u0441\u0435\u0433\u043C\u0435\u043D\u0442 \u2014 \u0446\u0435 \u0447\u0430\u0441\u0442\u0438\u043D\u0430 \u043A\u0440\u0443\u0433\u0430, \u043E\u0431\u043C\u0435\u0436\u0435\u043D\u0430 \u0434\u0443\u0433\u043E\u044E \u043A\u043E\u043B\u0430 \u0442\u0430 \u0457\u0457 \u0445\u043E\u0440\u0434\u043E\u044E \u0430\u0431\u043E \u0441\u0456\u0447\u043D\u043E\u044E."@uk ,
"\u0421\u0435\u0433\u043C\u0435\u043D\u0442 \u043F\u043B\u043E\u0441\u043A\u043E\u0439 \u043A\u0440\u0438\u0432\u043E\u0439 \u2014 \u043F\u043B\u043E\u0441\u043A\u0430\u044F (\u043E\u0431\u044B\u0447\u043D\u043E \u0432\u044B\u043F\u0443\u043A\u043B\u0430\u044F) \u0444\u0438\u0433\u0443\u0440\u0430, \u0437\u0430\u043A\u043B\u044E\u0447\u0451\u043D\u043D\u0430\u044F \u043C\u0435\u0436\u0434\u0443 \u043A\u0440\u0438\u0432\u043E\u0439 \u0438 \u0435\u0451 \u0445\u043E\u0440\u0434\u043E\u0439. \u041D\u0430\u0438\u0431\u043E\u043B\u0435\u0435 \u043F\u0440\u043E\u0441\u0442\u043E\u0439 \u0438 \u0440\u0430\u0441\u043F\u0440\u043E\u0441\u0442\u0440\u0430\u043D\u0451\u043D\u043D\u044B\u0439 \u043F\u0440\u0438\u043C\u0435\u0440 \u0441\u0435\u0433\u043C\u0435\u043D\u0442\u0430 \u043F\u043B\u043E\u0441\u043A\u043E\u0439 \u043A\u0440\u0438\u0432\u043E\u0439: \u0441\u0435\u0433\u043C\u0435\u043D\u0442 \u043A\u0440\u0443\u0433\u0430."@ru ,
"Ein Kreissegment (auch Kreisabschnitt) ist in der Geometrie eine Teilfl\u00E4che einer Kreisfl\u00E4che, die von einem Kreisbogen und einer Kreissehne begrenzt wird (im Gegensatz zum von einem Kreisbogen und zwei Kreisradien begrenzten \u201EKreissektor/Kreisausschnitt\u201C)."@de ,
"Een cirkelsegment is een deel van het cirkeloppervlak ingesloten door een cirkelboog en de koorde tussen de eindpunten van die cirkelboog."@nl ,
"\u5713\u4E0A\u7684\u4E00\u689D\u5F26\u628A\u5713\u5206\u5272\u6210\u5169\u90E8\u5206\uFF0C\u6240\u5F97\u7684\u5169\u90E8\u5206\u90FD\u7A31\u70BA\u5F13\u5F62\uFF0C\u56E0\u5B83\u5011\u7684\u5F62\u72C0\u4F3C\u5F13\u800C\u5F97\u540D\u3002\u5176\u4E2D\u9762\u7A4D\u6BD4\u8F03\u5927\u7684\u90E8\u5206\u7A31\u70BA\u512A\u5F13\u5F62\uFF0C\u800C\u53E6\u4E00\u90E8\u5206\u5247\u7A31\u70BA\u52A3\u5F13\u5F62\u3002 \u5F13\u5F62\u662F\u4E00\u500B\u975E\u6B63\u5F0F\u7528\u8A9E\u3002\u5982\u6C92\u6709\u7279\u5225\u6307\u660E\uFF0C\u5F13\u5F62\u901A\u5E38\u6307\u7684\u662F\u52A0\u4E0A\u5F26\u5F8C\u9762\u7A4D\u4E0D\u5305\u542B\u5713\u5FC3\u7684\u90A3\u4E00\u90E8\u5206\uFF08\u5373\u52A3\u5F13\u5F62\uFF09\u3002"@zh ,
"Un segment circular o segment d'un cercle \u00E9s en geometria la porci\u00F3 d'un cercle limitada per una corda i l'arc corresponent."@ca ,
"Kruhov\u00E1 \u00FAse\u010D je \u010D\u00E1st kruhu vymezen\u00E1 t\u011Btivou a kruhov\u00FDm obloukem vznikl\u00E1 rozd\u011Blen\u00EDm kruhu se\u010Dnou. Ka\u017Ed\u00E1 \u00FAse\u010D je p\u0159\u00EDslu\u0161n\u00E1 st\u0159edov\u00E9mu \u00FAhlu \u03B1, kter\u00FD m\u016F\u017Ee b\u00FDt konvexn\u00ED (0\u00B0 < \u03B1 < 180\u00B0), konk\u00E1vn\u00ED (180\u00B0 < \u03B1 < 360\u00B0), nebo p\u0159\u00EDm\u00FD (\u03B1 = 180\u00B0; polokruh)."@cs ,
"En g\u00E9om\u00E9trie, un segment circulaire est une partie d'un disque intuitivement d\u00E9finie comme un domaine qui est \u00AB coup\u00E9 \u00BB du reste du disque par une corde (droite s\u00E9cante). Le segment circulaire constitue donc la partie entre la droite s\u00E9cante et un arc. Soient (voir figure) : \n* le rayon du cercle ; \n* l'angle en radians du secteur circulaire ; \n* la longueur de l'arc ; \n* la longueur de la corde ; \n* la hauteur du segment ; \n* la hauteur de la portion triangulaire. Alors : . L'aire du triangle vaut : , du fait des formules de l'angle double. Finalement, on trouve :."@fr ,
"En geometrio, cirkla segmento a\u016D iam simple segmento estas parto de disko (ebena figuro limigita per cirklo) limigita per \u011Diaj \u0125ordo kaj arko. \u011Ci povas esti ricevita per fortran\u0109o de la cetera parto de la disko per rekto. Estu R radiuso de la cirklo, \u03B8 la centra angulo de segmento en radianoj,c longo de la \u0125ordo,s longo de la arko,h alto de la segmento - distanco inter mezpunkto de la arko kaj la \u0125ordo. Tiam: \n* La arka longo estas s = R\u03B8 \n* La areo de la segmento estas \n* La \u0125orda longo estas \n* La alto estas"@eo ,
"\u521D\u7B49\u5E7E\u4F55\u5B66\u306B\u304A\u3051\u308B\u5F13\u5F62\uFF08\u3086\u307F\u304C\u305F\u3001\u82F1: circular segment (\u8A18\u53F7: \u2313\uFF09\u306F\u3001\u5186\u677F\u304B\u3089\u5272\u7DDA\u307E\u305F\u306F\u5F26\u306B\u3088\u3063\u3066\u6B8B\u308A\u306E\u90E8\u5206\u304B\u3089\u300C\u5207\u308A\u53D6\u3089\u308C\u308B\u300D\u90E8\u5206\u3092\u8A00\u3046\u3002\u3088\u308A\u53B3\u5BC6\u306B\u306F\u3001\u5186\u306E\uFF08\u4E2D\u5FC3\u89D2\u304C180\u00B0\u672A\u6E80\u306E\u5F27\uFF09\u3068\u305D\u306E\u5186\u5F27\u306E\u4E21\u7AEF\u70B9\u3092\u7D50\u3076\u5F26\u3067\u56F2\u307E\u308C\u305F\u4E8C\u6B21\u5143\u306E\u9818\u57DF\u3092\u5F13\u5F62\u3068\u3044\u3046\u3002"@ja ,
"In geometry, a circular segment (symbol: \u2313), also known as a disk segment, is a region of a disk which is \"cut off\" from the rest of the disk by a secant or a chord. More formally, a circular segment is a region of two-dimensional space that is bounded by a circular arc (of less than \u03C0 radians by convention) and by the circular chord connecting the endpoints of the arc."@en ,
"Odcinek ko\u0142a \u2013 figura geometryczna, cz\u0119\u015B\u0107 ko\u0142a ograniczona ci\u0119ciw\u0105 wyznaczaj\u0105c\u0105 k\u0105t \u015Brodkowy okr\u0119gu oraz \u0142ukiem okr\u0119gu ograniczonym przez ramiona tego k\u0105ta. Parametry odcinka ko\u0142a: d\u0142ugo\u015B\u0107 ci\u0119ciwy i wysoko\u015B\u0107 (strza\u0142ka \u0142uku) powi\u0105zane s\u0105 ze sob\u0105 wzorem gdzie jest promieniem ko\u0142a."@pl ,
"\u0641\u064A \u0627\u0644\u0647\u0646\u062F\u0633\u0629 \u0627\u0644\u0631\u064A\u0627\u0636\u064A\u0629\u060C \u0627\u0644\u0642\u0637\u0639\u0629 \u0627\u0644\u062F\u0627\u0626\u0631\u064A\u0629 \u0647\u064A \u062C\u0632\u0621 \u0645\u0646 \u0627\u0644\u062F\u0627\u0626\u0631\u0629 \u064A\u0641\u0635\u0644\u0647\u0627 \u0639\u0646 \u0628\u0642\u064A\u0629 \u0627\u0644\u062F\u0627\u0626\u0631\u0629 \u0645\u0633\u062A\u0642\u064A\u0645 \u0642\u0627\u0637\u0639 \u0623\u0648 \u0648\u062A\u0631. \u062A\u0643\u0648\u0646 \u0627\u0644\u0642\u0637\u0639\u0629 \u0627\u0644\u062F\u0627\u0626\u0631\u064A\u0629 \u0647\u064A \u0627\u0644\u0645\u0633\u0627\u062D\u0629 \u0628\u064A\u0646 \u0627\u0644\u0648\u062A\u0631 \u0648\u0642\u0648\u0633 \u0627\u0644\u062F\u0627\u0626\u0631\u0629 \u0628\u062F\u0648\u0646 \u0645\u0631\u0643\u0632 \u0627\u0644\u062F\u0627\u0626\u0631\u0629."@ar ;
foaf:depiction .
@prefix dcterms: .
@prefix dbc: .
dbr:Circular_segment dcterms:subject dbc:Circles ;
dbo:abstract "\u0421\u0435\u0433\u043C\u0435\u043D\u0442 \u2014 \u043F\u043B\u043E\u0441\u043A\u0430 \u0444\u0456\u0433\u0443\u0440\u0430, \u043E\u0431\u043C\u0435\u0436\u0435\u043D\u0430 \u043A\u0440\u0438\u0432\u043E\u044E \u0442\u0430 \u0457\u0457 \u0445\u043E\u0440\u0434\u043E\u044E. \u041A\u0440\u0443\u0433\u043E\u0432\u0438\u0439 \u0441\u0435\u0433\u043C\u0435\u043D\u0442 \u2014 \u0446\u0435 \u0447\u0430\u0441\u0442\u0438\u043D\u0430 \u043A\u0440\u0443\u0433\u0430, \u043E\u0431\u043C\u0435\u0436\u0435\u043D\u0430 \u0434\u0443\u0433\u043E\u044E \u043A\u043E\u043B\u0430 \u0442\u0430 \u0457\u0457 \u0445\u043E\u0440\u0434\u043E\u044E \u0430\u0431\u043E \u0441\u0456\u0447\u043D\u043E\u044E."@uk ,
"\u0641\u064A \u0627\u0644\u0647\u0646\u062F\u0633\u0629 \u0627\u0644\u0631\u064A\u0627\u0636\u064A\u0629\u060C \u0627\u0644\u0642\u0637\u0639\u0629 \u0627\u0644\u062F\u0627\u0626\u0631\u064A\u0629 \u0647\u064A \u062C\u0632\u0621 \u0645\u0646 \u0627\u0644\u062F\u0627\u0626\u0631\u0629 \u064A\u0641\u0635\u0644\u0647\u0627 \u0639\u0646 \u0628\u0642\u064A\u0629 \u0627\u0644\u062F\u0627\u0626\u0631\u0629 \u0645\u0633\u062A\u0642\u064A\u0645 \u0642\u0627\u0637\u0639 \u0623\u0648 \u0648\u062A\u0631. \u062A\u0643\u0648\u0646 \u0627\u0644\u0642\u0637\u0639\u0629 \u0627\u0644\u062F\u0627\u0626\u0631\u064A\u0629 \u0647\u064A \u0627\u0644\u0645\u0633\u0627\u062D\u0629 \u0628\u064A\u0646 \u0627\u0644\u0648\u062A\u0631 \u0648\u0642\u0648\u0633 \u0627\u0644\u062F\u0627\u0626\u0631\u0629 \u0628\u062F\u0648\u0646 \u0645\u0631\u0643\u0632 \u0627\u0644\u062F\u0627\u0626\u0631\u0629."@ar ,
"Ein Kreissegment (auch Kreisabschnitt) ist in der Geometrie eine Teilfl\u00E4che einer Kreisfl\u00E4che, die von einem Kreisbogen und einer Kreissehne begrenzt wird (im Gegensatz zum von einem Kreisbogen und zwei Kreisradien begrenzten \u201EKreissektor/Kreisausschnitt\u201C)."@de ,
"Een cirkelsegment is een deel van het cirkeloppervlak ingesloten door een cirkelboog en de koorde tussen de eindpunten van die cirkelboog."@nl ,
"\uD65C\uAF34(circular segment)\uC774\uB780 \uC6D0 \uC704\uC758 \uC784\uC758\uC758 \uB450 \uC810\uC744 \uC774\uC740 \uC120\uBD84\uC778 \uD604(chord)\uACFC \uAC19\uC740 \uB450 \uC810\uC744 \uC5F0\uACB0\uD558\uB294 \uD638(\u5F27, arc)\uB85C \uC774\uB8E8\uC5B4\uC9C4 \uB3C4\uD615\uC774\uB2E4. \uD65C\uAF34\uC5D0\uC11C \uB450 \uC810\uC744 \uC774\uC740 \uC9C1\uC120\uC774 \uC9C0\uB984\uC774\uBA74 \uBC18\uC6D0\uC774 \uB41C\uB2E4. \uC810 A\uC640 \uC810B \uADF8\uB9AC\uACE0 \uC810 X\uAC00 \uC6D0 \uC704\uC5D0 \uB193\uC5EC \uC788\uC73C\uBA74 \uC6D0\uD638(arc) \uC704\uC5D0\uC11C \uC5B4\uB5A4 \uC120\uC774 \uB9CC\uB098\uB290\uB0D0\uC5D0 \uB530\uB77C \uD65C\uAF34 \uB610\uB294 \uBD80\uCC44\uAF34\uC774 \uB41C\uB2E4. \uC120\uBD84 BX \uB610\uB294 \uC120\uBD84 AB\uAC00 \uD638 \uC704\uC5D0\uC11C \uB9CC\uB098\uBA74 \uD65C\uAF34\uC774, \uC6D0\uC758 \uC911\uC2EC M\uC744 \uC9C0\uB098\uB294 \uCD5C\uB2E8\uAC70\uB9AC \uC120\uBD84 AM \uB610\uB294 \uC120\uBD84 BM\uC744 \uC810X\uC640 \uD638(arc) \uC704\uC5D0\uC11C \uC5F0\uACB0\uD558\uBA74 \uBCF4\uB2E4 \uD070 \uBD80\uCC44\uAF34 AMX \uB610\uB294 \uBCF4\uB2E4 \uC791\uC740 \uBD80\uCC44\uAF34 BMX\uAC00 \uB41C\uB2E4."@ko ,
"Un segment circular o segment d'un cercle \u00E9s en geometria la porci\u00F3 d'un cercle limitada per una corda i l'arc corresponent."@ca ,
"\u0421\u0435\u0433\u043C\u0435\u043D\u0442 \u043F\u043B\u043E\u0441\u043A\u043E\u0439 \u043A\u0440\u0438\u0432\u043E\u0439 \u2014 \u043F\u043B\u043E\u0441\u043A\u0430\u044F (\u043E\u0431\u044B\u0447\u043D\u043E \u0432\u044B\u043F\u0443\u043A\u043B\u0430\u044F) \u0444\u0438\u0433\u0443\u0440\u0430, \u0437\u0430\u043A\u043B\u044E\u0447\u0451\u043D\u043D\u0430\u044F \u043C\u0435\u0436\u0434\u0443 \u043A\u0440\u0438\u0432\u043E\u0439 \u0438 \u0435\u0451 \u0445\u043E\u0440\u0434\u043E\u0439. \u041D\u0430\u0438\u0431\u043E\u043B\u0435\u0435 \u043F\u0440\u043E\u0441\u0442\u043E\u0439 \u0438 \u0440\u0430\u0441\u043F\u0440\u043E\u0441\u0442\u0440\u0430\u043D\u0451\u043D\u043D\u044B\u0439 \u043F\u0440\u0438\u043C\u0435\u0440 \u0441\u0435\u0433\u043C\u0435\u043D\u0442\u0430 \u043F\u043B\u043E\u0441\u043A\u043E\u0439 \u043A\u0440\u0438\u0432\u043E\u0439: \u0441\u0435\u0433\u043C\u0435\u043D\u0442 \u043A\u0440\u0443\u0433\u0430."@ru ,
"Odcinek ko\u0142a \u2013 figura geometryczna, cz\u0119\u015B\u0107 ko\u0142a ograniczona ci\u0119ciw\u0105 wyznaczaj\u0105c\u0105 k\u0105t \u015Brodkowy okr\u0119gu oraz \u0142ukiem okr\u0119gu ograniczonym przez ramiona tego k\u0105ta. Parametry odcinka ko\u0142a: d\u0142ugo\u015B\u0107 ci\u0119ciwy i wysoko\u015B\u0107 (strza\u0142ka \u0142uku) powi\u0105zane s\u0105 ze sob\u0105 wzorem gdzie jest promieniem ko\u0142a."@pl ,
"\u5713\u4E0A\u7684\u4E00\u689D\u5F26\u628A\u5713\u5206\u5272\u6210\u5169\u90E8\u5206\uFF0C\u6240\u5F97\u7684\u5169\u90E8\u5206\u90FD\u7A31\u70BA\u5F13\u5F62\uFF0C\u56E0\u5B83\u5011\u7684\u5F62\u72C0\u4F3C\u5F13\u800C\u5F97\u540D\u3002\u5176\u4E2D\u9762\u7A4D\u6BD4\u8F03\u5927\u7684\u90E8\u5206\u7A31\u70BA\u512A\u5F13\u5F62\uFF0C\u800C\u53E6\u4E00\u90E8\u5206\u5247\u7A31\u70BA\u52A3\u5F13\u5F62\u3002 \u5F13\u5F62\u662F\u4E00\u500B\u975E\u6B63\u5F0F\u7528\u8A9E\u3002\u5982\u6C92\u6709\u7279\u5225\u6307\u660E\uFF0C\u5F13\u5F62\u901A\u5E38\u6307\u7684\u662F\u52A0\u4E0A\u5F26\u5F8C\u9762\u7A4D\u4E0D\u5305\u542B\u5713\u5FC3\u7684\u90A3\u4E00\u90E8\u5206\uFF08\u5373\u52A3\u5F13\u5F62\uFF09\u3002"@zh ,
"En g\u00E9om\u00E9trie, un segment circulaire est une partie d'un disque intuitivement d\u00E9finie comme un domaine qui est \u00AB coup\u00E9 \u00BB du reste du disque par une corde (droite s\u00E9cante). Le segment circulaire constitue donc la partie entre la droite s\u00E9cante et un arc. Soient (voir figure) : \n* le rayon du cercle ; \n* l'angle en radians du secteur circulaire ; \n* la longueur de l'arc ; \n* la longueur de la corde ; \n* la hauteur du segment ; \n* la hauteur de la portion triangulaire. Alors : \n* la longueur de l'arc est ; \n* la longueur de la corde est ; \n* la hauteur de la portion triangulaire est ; \n* la hauteur (ou fl\u00E8che) est ; \n* l'aire est .D\u00E9monstration de la formule de l'aire L'aire totale de la portion de disque vaut . Elle peut \u00E9galement s'exprimer comme la somme de deux aires : celle, , du segment circulaire (en vert) et celle, , du triangle constituant l'autre partie. On a donc : . L'aire du triangle vaut : , du fait des formules de l'angle double. Finalement, on trouve :."@fr ,
"\u521D\u7B49\u5E7E\u4F55\u5B66\u306B\u304A\u3051\u308B\u5F13\u5F62\uFF08\u3086\u307F\u304C\u305F\u3001\u82F1: circular segment (\u8A18\u53F7: \u2313\uFF09\u306F\u3001\u5186\u677F\u304B\u3089\u5272\u7DDA\u307E\u305F\u306F\u5F26\u306B\u3088\u3063\u3066\u6B8B\u308A\u306E\u90E8\u5206\u304B\u3089\u300C\u5207\u308A\u53D6\u3089\u308C\u308B\u300D\u90E8\u5206\u3092\u8A00\u3046\u3002\u3088\u308A\u53B3\u5BC6\u306B\u306F\u3001\u5186\u306E\uFF08\u4E2D\u5FC3\u89D2\u304C180\u00B0\u672A\u6E80\u306E\u5F27\uFF09\u3068\u305D\u306E\u5186\u5F27\u306E\u4E21\u7AEF\u70B9\u3092\u7D50\u3076\u5F26\u3067\u56F2\u307E\u308C\u305F\u4E8C\u6B21\u5143\u306E\u9818\u57DF\u3092\u5F13\u5F62\u3068\u3044\u3046\u3002"@ja ,
"Em geometria, um segmento circular (tamb\u00E9m segmento de c\u00EDrculo) \u00E9 uma \u00E1rea de um c\u00EDrculo informalmente definido como uma \u00E1rea que \u00E9 \"cortada\" do resto do c\u00EDrculo por uma reta secante ou uma corda. O segmento circular constitui a parte entre a secante e um arco, excluindo o centro do c\u00EDrculo."@pt ,
"In geometria, un segmento circolare \u00E8 una porzione di cerchio delimitata da una secante (o corda). La corda o secante definisce due segmenti circolari, uno dei quali \u00E8 contrassegnato in verde nell'illustrazione, mentre l'altro \u00E8 in bianco."@it ,
"En geometr\u00EDa, un segmento circular (o segmento de un c\u00EDrculo) es la porci\u00F3n de un c\u00EDrculo limitada por una cuerda y el arco correspondiente. Sea R el radio del c\u00EDrculo, \u03B8 el \u00E1ngulo central, c la longitud de la cuerda, s la longitud del arco, h la altura del segmento circular (sagita) , y d la altura de la porci\u00F3n triangular (apotema). \n* El radio de tu c\u00EDrculoes \n* La longitud del arco es , donde est\u00E1 en radianes. \n* La longitud de la cuerda es \n* La altura es \n* El \u00E1ngulo es"@es ,
"Kruhov\u00E1 \u00FAse\u010D je \u010D\u00E1st kruhu vymezen\u00E1 t\u011Btivou a kruhov\u00FDm obloukem vznikl\u00E1 rozd\u011Blen\u00EDm kruhu se\u010Dnou. Ka\u017Ed\u00E1 \u00FAse\u010D je p\u0159\u00EDslu\u0161n\u00E1 st\u0159edov\u00E9mu \u00FAhlu \u03B1, kter\u00FD m\u016F\u017Ee b\u00FDt konvexn\u00ED (0\u00B0 < \u03B1 < 180\u00B0), konk\u00E1vn\u00ED (180\u00B0 < \u03B1 < 360\u00B0), nebo p\u0159\u00EDm\u00FD (\u03B1 = 180\u00B0; polokruh)."@cs ,
"In geometry, a circular segment (symbol: \u2313), also known as a disk segment, is a region of a disk which is \"cut off\" from the rest of the disk by a secant or a chord. More formally, a circular segment is a region of two-dimensional space that is bounded by a circular arc (of less than \u03C0 radians by convention) and by the circular chord connecting the endpoints of the arc."@en ,
"En geometrio, cirkla segmento a\u016D iam simple segmento estas parto de disko (ebena figuro limigita per cirklo) limigita per \u011Diaj \u0125ordo kaj arko. \u011Ci povas esti ricevita per fortran\u0109o de la cetera parto de la disko per rekto. Estu R radiuso de la cirklo, \u03B8 la centra angulo de segmento en radianoj,c longo de la \u0125ordo,s longo de la arko,h alto de la segmento - distanco inter mezpunkto de la arko kaj la \u0125ordo. Tiam: \n* La arka longo estas s = R\u03B8 \n* La areo de la segmento estas \n* La \u0125orda longo estas \n* La alto estas"@eo ;
dbo:wikiPageWikiLink dbr:Spherical_cap ,
dbr:Arc_length ,
,
dbr:Apothem ,
dbr:Geometry ,
dbr:Transcendental_function ,
dbc:Circles ,
dbr:Height ,
dbr:Secant_line ,
dbr:Circular_sector ,
,
dbr:Radian ,
dbr:Circular_arc ,
dbr:Two-dimensional_space ,
dbr:Radius ,
,
dbr:Area ,
dbr:Circular_chord ,
dbr:Chord_length ,
.
@prefix dbp: .
@prefix dbt: .
dbr:Circular_segment dbp:wikiPageUsesTemplate dbt:Reflist ,
dbt:Math ,
dbt:MathWorld ,
dbt:Short_description ,
dbt:Clarify ;
dbo:thumbnail ;
dbo:wikiPageRevisionID 1120544474 ;
dbo:wikiPageExternalLink ,
.
@prefix xsd: .
dbr:Circular_segment dbo:wikiPageLength "5372"^^xsd:nonNegativeInteger ;
dbo:wikiPageID 404049 ;
dbp:title "Circular segment"@en .
@prefix owl: .
@prefix dbpedia-eo: .
dbr:Circular_segment owl:sameAs dbpedia-eo:Cirkla_segmento ,
,
.
@prefix dbpedia-da: .
dbr:Circular_segment owl:sameAs dbpedia-da:Cirkelafsnit .
@prefix dbpedia-de: .
dbr:Circular_segment owl:sameAs dbpedia-de:Kreissegment ,
,
,
,
.
@prefix dbpedia-pt: .
dbr:Circular_segment owl:sameAs dbpedia-pt:Segmento_circular ,
,
.
@prefix dbpedia-nl: .
dbr:Circular_segment owl:sameAs dbpedia-nl:Cirkelsegment .
@prefix yago-res: .
dbr:Circular_segment owl:sameAs yago-res:Circular_segment ,
.
@prefix dbpedia-fr: .
dbr:Circular_segment owl:sameAs dbpedia-fr:Segment_circulaire .
@prefix wikidata: .
dbr:Circular_segment owl:sameAs wikidata:Q783081 ,
,
,
.
@prefix dbpedia-ca: .
dbr:Circular_segment owl:sameAs dbpedia-ca:Segment_circular .
@prefix dbpedia-nn: .
dbr:Circular_segment owl:sameAs dbpedia-nn:Sirkelsegment ,
,
dbr:Circular_segment .
@prefix dbpedia-no: .
dbr:Circular_segment owl:sameAs dbpedia-no:Sirkelsegment ,
,
.
@prefix dbpedia-it: .
dbr:Circular_segment owl:sameAs dbpedia-it:Segmento_circolare ,
.
@prefix dbpedia-az: .
dbr:Circular_segment owl:sameAs dbpedia-az:Seqment .
@prefix dbpedia-es: .
dbr:Circular_segment owl:sameAs dbpedia-es:Segmento_circular ,
,
,
.
@prefix dbpedia-ro: .
dbr:Circular_segment owl:sameAs dbpedia-ro:Segment_de_cerc ,
.
@prefix gold: .
dbr:Circular_segment gold:hypernym dbr:Region .
@prefix prov: .
dbr:Circular_segment prov:wasDerivedFrom ;
foaf:isPrimaryTopicOf wikipedia-en:Circular_segment ;
dbp:urlname "CircularSegment"@en ;
dbp:date "December 2021"@en ;
dbp:reason "A diagram with these numbers would be a good addition to the example"@en .
dbr:Anji_Bridge dbo:wikiPageWikiLink dbr:Circular_segment .
dbr:List_of_centroids dbo:wikiPageWikiLink dbr:Circular_segment .
dbr:Tricarina dbo:wikiPageWikiLink dbr:Circular_segment .
dbr:Potez_24 dbo:wikiPageWikiLink dbr:Circular_segment .
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dbr:Over_Bridge dbo:wikiPageWikiLink dbr:Circular_segment .
dbr:Disk_segment dbo:wikiPageWikiLink dbr:Circular_segment ;
dbo:wikiPageRedirects dbr:Circular_segment .
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dbr:Circle_segment dbo:wikiPageWikiLink dbr:Circular_segment ;
dbo:wikiPageRedirects dbr:Circular_segment .