@prefix rdf: . @prefix dbr: . @prefix dbo: . dbr:Isosceles_triangle rdf:type dbo:Place . @prefix rdfs: . dbr:Isosceles_triangle rdfs:label "Hiruki isoszele"@eu , "Triangle isoc\u00E8le"@fr , "Isosceles triangle"@en , "\u0399\u03C3\u03BF\u03C3\u03BA\u03B5\u03BB\u03AD\u03C2 \u03C4\u03C1\u03AF\u03B3\u03C9\u03BD\u03BF"@el , "\u0645\u062B\u0644\u062B \u0645\u062A\u0633\u0627\u0648\u064A \u0627\u0644\u0633\u0627\u0642\u064A\u0646"@ar , "Tri\u00E1ngulo is\u00F3sceles"@es , "\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62"@ja , "Tr\u00F3jk\u0105t r\u00F3wnoramienny"@pl , "Tri\u00E2ngulo is\u00F3sceles"@pt , "\uC774\uB4F1\uBCC0 \uC0BC\uAC01\uD615"@ko , "Segitiga sama kaki"@in , "\u0420\u0430\u0432\u043D\u043E\u0431\u0435\u0434\u0440\u0435\u043D\u043D\u044B\u0439 \u0442\u0440\u0435\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A"@ru , "Triangle is\u00F2sceles"@ca , "Gelijkbenige driehoek"@nl , "Gleichschenkliges Dreieck"@de , "\u0420\u0456\u0432\u043D\u043E\u0431\u0435\u0434\u0440\u0435\u043D\u0438\u0439 \u0442\u0440\u0438\u043A\u0443\u0442\u043D\u0438\u043A"@uk , "Triangolo isoscele"@it , "\u7B49\u8170\u4E09\u89D2\u5F62"@zh , "Rovnoramenn\u00FD troj\u00FAheln\u00EDk"@cs , "Izocela triangulo"@eo ; rdfs:comment "\u0420\u0430\u0432\u043D\u043E\u0431\u0435\u0434\u0440\u0435\u043D\u043D\u044B\u0439 \u0442\u0440\u0435\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A \u2014 \u0442\u0440\u0435\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A, \u0432 \u043A\u043E\u0442\u043E\u0440\u043E\u043C \u0434\u0432\u0435 \u0441\u0442\u043E\u0440\u043E\u043D\u044B \u0440\u0430\u0432\u043D\u044B \u043C\u0435\u0436\u0434\u0443 \u0441\u043E\u0431\u043E\u0439 \u043F\u043E \u0434\u043B\u0438\u043D\u0435. \u0411\u043E\u043A\u043E\u0432\u044B\u043C\u0438 \u043D\u0430\u0437\u044B\u0432\u0430\u044E\u0442\u0441\u044F \u0440\u0430\u0432\u043D\u044B\u0435 \u0441\u0442\u043E\u0440\u043E\u043D\u044B, \u0430 \u043F\u043E\u0441\u043B\u0435\u0434\u043D\u044F\u044F \u043D\u0435\u0440\u0430\u0432\u043D\u0430\u044F \u0438\u043C \u0441\u0442\u043E\u0440\u043E\u043D\u0430 \u2014 \u043E\u0441\u043D\u043E\u0432\u0430\u043D\u0438\u0435\u043C. \u041F\u043E \u043E\u043F\u0440\u0435\u0434\u0435\u043B\u0435\u043D\u0438\u044E, \u043A\u0430\u0436\u0434\u044B\u0439 \u043F\u0440\u0430\u0432\u0438\u043B\u044C\u043D\u044B\u0439 \u0442\u0440\u0435\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A \u0442\u0430\u043A\u0436\u0435 \u044F\u0432\u043B\u044F\u0435\u0442\u0441\u044F \u0440\u0430\u0432\u043D\u043E\u0431\u0435\u0434\u0440\u0435\u043D\u043D\u044B\u043C, \u043D\u043E \u043E\u0431\u0440\u0430\u0442\u043D\u043E\u0435 \u0443\u0442\u0432\u0435\u0440\u0436\u0434\u0435\u043D\u0438\u0435 \u043D\u0435\u0432\u0435\u0440\u043D\u043E."@ru , "En geometr\u00EDa, un tri\u00E1ngulo is\u00F3sceles es un tri\u00E1ngulo que tiene, al menos, dos lados de igual longitud. Al \u00E1ngulo formado por los lados de igual longitud se le denomina \u00E1ngulo en el v\u00E9rtice y al lado opuesto a \u00E9l, lado base.\u200B"@es , "En g\u00E9om\u00E9trie, un triangle isoc\u00E8le est un triangle ayant au moins deux c\u00F4t\u00E9s de m\u00EAme longueur. Plus pr\u00E9cis\u00E9ment, un triangle ABC est dit isoc\u00E8le en A lorsque les longueurs AB et AC sont \u00E9gales. A est alors le sommet principal du triangle et [BC] sa base. Dans un triangle isoc\u00E8le, les angles adjacents \u00E0 la base sont \u00E9gaux. Un triangle \u00E9quilat\u00E9ral est un cas particulier de triangle isoc\u00E8le, ayant ses trois c\u00F4t\u00E9s de m\u00EAme longueur."@fr , "Un triangle \u00E9s is\u00F2sceles quan t\u00E9 dos costats de la mateixa longitud. Segons com sigui el m\u00E9s gran dels seus tres angles, els triangles is\u00F2sceles poden ser acutangles, rectangles o obtusangles. Si es pren com a base el costat diferent dels altres dos, aleshores l'altura el divideix en dos triangles rectangles. Si el triangle original, a m\u00E9s de ser is\u00F2sceles, \u00E9s rectangle, aleshores els dos triangles que se n'obtenen s\u00F3n tamb\u00E9 is\u00F2sceles i rectangles. Tots els triangles is\u00F2sceles rectangles s\u00F3n semblants, amb un angle recte, de noranta graus, i dos angles aguts de quaranta-cinc graus."@ca , "\u0399\u03C3\u03BF\u03C3\u03BA\u03B5\u03BB\u03AD\u03C2 \u03C4\u03C1\u03AF\u03B3\u03C9\u03BD\u03BF \u03C3\u03C4\u03B7 \u03B3\u03B5\u03C9\u03BC\u03B5\u03C4\u03C1\u03AF\u03B1 \u03B5\u03AF\u03BD\u03B1\u03B9 \u03AD\u03BD\u03B1 \u03C4\u03C1\u03AF\u03B3\u03C9\u03BD\u03BF \u03C4\u03BF\u03C5 \u03BF\u03C0\u03BF\u03AF\u03BF\u03C5 \u03B4\u03CD\u03BF \u03C0\u03BB\u03B5\u03C5\u03C1\u03AD\u03C2 \u03B5\u03AF\u03BD\u03B1\u03B9 \u03AF\u03C3\u03B5\u03C2 \u03BC\u03B5\u03C4\u03B1\u03BE\u03CD \u03C4\u03BF\u03C5\u03C2. '\u0395\u03B9\u03B4\u03B9\u03BA\u03AE \u03C0\u03B5\u03C1\u03AF\u03C0\u03C4\u03C9\u03C3\u03B7 \u03B9\u03C3\u03BF\u03C3\u03BA\u03B5\u03BB\u03BF\u03CD\u03C2 \u03C4\u03C1\u03B9\u03B3\u03CE\u03BD\u03BF\u03C5 \u03B5\u03AF\u03BD\u03B1\u03B9 \u03C4\u03BF \u03B9\u03C3\u03CC\u03C0\u03BB\u03B5\u03C5\u03C1\u03BF \u03C4\u03C1\u03AF\u03B3\u03C9\u03BD\u03BF"@el , "In geometry, an isosceles triangle (/a\u026A\u02C8s\u0252s\u0259li\u02D0z/) is a triangle that has two sides of equal length. Sometimes it is specified as having exactly two sides of equal length, and sometimes as having at least two sides of equal length, the latter version thus including the equilateral triangle as a special case.Examples of isosceles triangles include the isosceles right triangle, the golden triangle, and the faces of bipyramids and certain Catalan solids."@en , "Tr\u00F3jk\u0105t r\u00F3wnoramienny \u2013 tr\u00F3jk\u0105t o (co najmniej) dw\u00F3ch bokach r\u00F3wnej d\u0142ugo\u015Bci. Te dwa boki zwane s\u0105 ramionami tr\u00F3jk\u0105ta, trzeci bok jego podstaw\u0105. K\u0105ty przy podstawie s\u0105 przystaj\u0105ce a ich miara jest mniejsza od miary k\u0105ta prostego. Tr\u00F3jk\u0105t r\u00F3wnoramienny posiada (co najmniej jedn\u0105) o\u015B symetrii \u2013 przecina ona podstaw\u0119 w po\u0142owie d\u0142ugo\u015Bci i przechodzi przez wierzcho\u0142ek \u0142\u0105cz\u0105cy ramiona. O\u015B symetrii pokrywa si\u0119 z wysoko\u015Bci\u0105, \u015Brodkow\u0105, dwusieczn\u0105 i symetraln\u0105 opuszczonymi na podstaw\u0119. Szczeg\u00F3lne przypadki tr\u00F3jk\u0105ta r\u00F3wnoramiennego:"@pl , "\u5728\u5E7E\u4F55\u5B78\u4E2D\uFF0C\u7B49\u8170\u4E09\u89D2\u5F62\uFF08\u82F1\u8A9E\uFF1AIsosceles triangle\uFF09\u662F\u6307\u81F3\u5C11\u6709\u5169\u908A\u9577\u5EA6\u76F8\u7B49\u7684\u4E09\u89D2\u5F62\uFF0C\u56E0\u6B64\u6703\u9020\u6210\u67092\u500B\u89D2\u76F8\u7B49\u3002\u76F8\u7B49\u7684\u5169\u500B\u908A\u7A31\u7B49\u8170\u4E09\u89D2\u5F62\u7684\u8170\uFF0C\u53E6\u4E00\u908A\u7A31\u70BA\u5E95\u908A\uFF0C\u76F8\u7B49\u7684\u5169\u500B\u89D2\u7A31\u70BA\u7B49\u8170\u4E09\u89D2\u5F62\u7684\u5E95\u89D2\uFF0C\u5176\u9918\u7684\u89D2\u53EB\u505A\u9802\u89D2\u3002 \u7B49\u8170\u4E09\u89D2\u5F62\u7684\u91CD\u5FC3\u3001\u548C\u5782\u5FC3\u90FD\u4F4D\u65BC\u9802\u9EDE\u5411\u5E95\u908A\u7684\u5782\u7EBF\uFF0C\u53EF\u4EE5\u628A\u7B49\u8170\u4E09\u89D2\u5F62\u5206\u6210\u5169\u500B\u5168\u7B49\u7684\u76F4\u89D2\u4E09\u89D2\u5F62\u3002 \u7B49\u908A\u4E09\u89D2\u5F62\u662F\u5E95\u908A\u548C\u8170\u7B49\u9577\u7684\u7B49\u8170\u4E09\u89D2\u5F62\uFF0C\u662F\u7B49\u8170\u4E09\u89D2\u5F62\u7684\u4E00\u500B\u7279\u6B8A\u5F62\u5F0F\u3002\u82E5\u7B49\u8170\u4E09\u89D2\u5F62\u7684\u9802\u89D2\u70BA\u76F4\u89D2\uFF0C\u7A31\u70BA\u7B49\u8170\u76F4\u89D2\u4E09\u89D2\u5F62\u3002"@zh , "In geometria, si definisce triangolo isoscele un triangolo che possiede due lati congruenti. Vale il seguente teorema: \"Un triangolo \u00E8 isoscele se e solo se ha due angoli congruenti\". Questo teorema costituisce la quinta proposizione del Libro I degli Elementi di Euclide ed \u00E8 noto come pons asinorum. In un triangolo isoscele la bisettrice relativa all'angolo al vertice coincide con la mediana, l'altezza e l'asse relativi alla base. Particolari triangoli isosceli sono i triangoli equilateri e i triangoli rettangoli isosceli.Esistono anche triangoli isosceli acutangoli e ottusangoli."@it , "\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\uFF08\u306B\u3068\u3046\u3078\u3093\u3055\u3093\u304B\u304F\u3051\u3044\u3001\u82F1: isosceles triangle\uFF09\u306F\u3001\u4E09\u89D2\u5F62\u306E\u4E00\u7A2E\u3067\u30013 \u672C\u306E\u8FBA\u306E\u3046\u3061\uFF08\u5C11\u306A\u304F\u3068\u3082\uFF092 \u672C\u306E\u8FBA\u306E\u9577\u3055\u304C\u7B49\u3057\u3044\u56F3\u5F62\u3067\u3042\u308B\u3002\u9577\u3055\u306E\u7B49\u3057\u3044 2 \u8FBA\u3092\u7B49\u8FBA\u3068\u3044\u3044\u3001\u6B8B\u308A\u306E 1 \u8FBA\u3092\u5E95\u8FBA\u3068\u3088\u3076\u30022 \u672C\u306E\u7B49\u8FBA\u304C\u5171\u6709\u3059\u308B\u9802\u70B9\u3092\u3068\u304F\u306B\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306E\u9802\u70B9\u3068\u3044\u3046\u3002\u9802\u70B9\u306B\u304A\u3051\u308B\u5185\u89D2\u3092\u3001\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306E\u9802\u89D2\u3068\u3044\u3044\u3001\u6B8B\u308A\u306E 2 \u3064\u306E\u5185\u89D2\u3059\u306A\u308F\u3061\u5E95\u8FBA\u306E\u4E21\u7AEF\u306E\u5185\u89D2\u3092\u5E95\u89D2\u3068\u3088\u3076\u3002\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306E\u5E95\u89D2\u306F\u3001\u4E92\u3044\u306B\u7B49\u3057\u3044\u5927\u304D\u3055\u3092\u6301\u3064\u3002 \u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306E\u9802\u70B9\u306B\u304A\u3051\u308B\u5916\u89D2\u3092\u3001\u9802\u5916\u89D2\u3068\u8A00\u3046\u3002\u9802\u5916\u89D2\u306E\u5927\u304D\u3055\u306F\u3001\u5E95\u89D2\u306E2\u500D\u306B\u7B49\u3057\u3044\u3002\u307E\u305F\u3001\u9802\u5916\u89D2\u306E\u4E8C\u7B49\u5206\u7DDA\u306F\u3001\u5E95\u8FBA\u3068\u5E73\u884C\u3067\u3042\u308B\u3002\u9802\u89D2\u306F180\u00B0\u672A\u6E80\u306E\u5927\u304D\u3055\u3067\u3042\u308B\u304C\u3001\u5E95\u89D2\u306F90\u00B0\u672A\u6E80\u306E\u5927\u304D\u3055\u306B\u9650\u3089\u308C\u3001\u89D2\u5EA6\u306E\u548C\u306F180\u5EA6\u3067\u3042\u308B\u3002\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306F\u7DDA\u5BFE\u79F0\u306A\u56F3\u5F62\u3067\u3042\u308A\u3001\u9802\u70B9\u3068\u5E95\u8FBA\u306E\u4E2D\u70B9\u3092\u7D50\u3076\u4E2D\u7DDA\u3001\u9802\u89D2\u306E\u4E8C\u7B49\u5206\u7DDA\u3001\u5E95\u8FBA\u306E\u5782\u76F4\u4E8C\u7B49\u5206\u7DDA\u3001\u3053\u308C\u3089\u306F\u3059\u3079\u3066\u7DDA\u5BFE\u79F0\u306E\u5BFE\u79F0\u8EF8\u306B\u4E57\u308B\u3002\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306E\u9802\u89D2\u306E\u4E8C\u7B49\u5206\u7DDA\u306F\u5E95\u8FBA\u3092\u5782\u76F4\u306B\u4E8C\u7B49\u5206\u3059\u308B\u3002 \u4E09\u89D2\u5F62\u306E 3 \u3064\u306E\u5185\u89D2\u306E\u3046\u3061\uFF08\u5C11\u306A\u304F\u3068\u3082\uFF092 \u3064\u306E\u89D2\u304C\u7B49\u3057\u3044\u3082\u306E\u306F\u3001\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u3068\u306A\u308B\uFF08\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306E\u6210\u7ACB\u6761\u4EF6\uFF09\u3002\u307E\u305F\u3001\u5BFE\u79F0\u8EF8\u3092\u6301\u3064\u4E09\u89D2\u5F62\u306F\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306B\u9650\u3089\u308C\u308B\u3002 \u9802\u89D2\u304C\u76F4\u89D2\u3067\u3042\u308B\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306F\u76F4\u89D2\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u3068\u3088\u3070\u308C\u308B\u3002\u76F4\u89D2\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306E 2 \u3064\u306E\u5E95\u89D2\uFF082 \u3064\u306E\u92ED\u89D2\uFF09\u306F 45\u00B0\u3067\u3042\u308B\u3002\u3059\u3079\u3066\u306E\u76F4\u89D2\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306F\u3001\u4E92\u3044\u306B\u76F8\u4F3C\u3067\u3042\u308B\u3002"@ja , "Izocela triangulo estas triangulo, \u0109e kiu du lateroj havas la saman longon. Egallatera triangulo estas specifa okazo de izocelo triangulo."@eo , "Hiruki isoszelea edo triangelu isoszelea (grezierazko \u1F34\u03C3\u03BF\u03C2 \"berdin\" eta \u03C3\u03BA\u03AD\u03BB\u03B7 \"hankak\" hitzetatik, hau da, \"bi hankak berdinak\") hiru aldeetatik bi berdinak dituen hirukia da. Desberdina den aldea oinarria deitzen da."@eu , "Rovnoramenn\u00FD troj\u00FAheln\u00EDk je troj\u00FAheln\u00EDk, kter\u00FD m\u00E1 (alespo\u0148) dv\u011B strany shodn\u00E9."@cs , "Em geometria, um tri\u00E2ngulo is\u00F3sceles \u00E9 um tri\u00E2ngulo que possui dois lados de mesma medida, isso \u00E9, congruentes."@pt , "\u0645\u062B\u0644\u062B \u0645\u062A\u0633\u0627\u0648\u064A \u0627\u0644\u0633\u0627\u0642\u064A\u0646 (\u0628\u0627\u0644\u0625\u0646\u062C\u0644\u064A\u0632\u064A\u0629: Isosceles triangle)\u200F \u0648\u064A\u0633\u0645\u0649 \u0623\u064A\u0636\u0627\u064B \u0628\u0627\u0644\u0634\u0651\u0643\u0644 \u0627\u0644\u0645\u0623\u0645\u0648\u0646\u064A \u0647\u0648 \u0645\u062B\u0644\u062B \u0644\u0647 \u0636\u0644\u0639\u0627\u0646 \u0637\u0648\u0644\u0647\u0645\u0627 \u0645\u062A\u0633\u0627\u0648\u064A\u0627\u0646. \u064A\u0633\u0645\u0649 \u0627\u0644\u0636\u0644\u0639 \u0627\u0644\u062B\u0627\u0644\u062B \u0642\u0627\u0639\u062F\u0629\u060C \u0648\u062A\u0633\u0645\u0649 \u0627\u0644\u0646\u0642\u0637\u0629 \u0627\u0644\u0645\u0642\u0627\u0628\u0644\u0629 \u0644\u0647 \u0631\u0623\u0633\u0627\u064B. \u0641\u064A \u0628\u0639\u0636 \u0627\u0644\u0625\u062D\u064A\u0627\u0646\u060C \u064A\u0639\u0631\u0641 \u0627\u0644\u0645\u062B\u0644\u062B \u0645\u062A\u0633\u0627\u0648\u064A \u0627\u0644\u0633\u0627\u0642\u064A\u0646 \u0639\u0644\u0649 \u0623\u0646\u0647 \u0645\u062B\u0644\u062B \u0644\u0647 \u0636\u0644\u0639\u0627\u0646 \u0639\u0644\u0649 \u0627\u0644\u0623\u0642\u0644 \u0637\u0648\u0644\u0647\u0645\u0627 \u0645\u062A\u0633\u0627\u0648\u064A\u0627\u0646. \u0641\u064A \u0625\u0637\u0627\u0631 \u0647\u0630\u0627 \u0627\u0644\u062A\u0639\u0631\u064A\u0641\u060C \u064A\u0635\u0628\u062D \u0645\u062B\u0644\u062B \u0645\u062A\u0633\u0627\u0648\u064A \u0627\u0644\u0623\u0636\u0644\u0627\u0639 \u062D\u0627\u0644\u0629 \u062E\u0627\u0635\u0629 \u0645\u0646 \u0627\u0644\u0645\u062B\u0644\u062B\u0627\u062A \u0645\u062A\u0633\u0627\u0648\u064A\u0627\u062A \u0627\u0644\u0633\u0627\u0642\u064A\u0646."@ar , "Ein gleichschenkliges Dreieck ist ein Dreieck mit mindestens zwei gleich langen Seiten. Folglich sind auch die beiden Winkel gleich gro\u00DF, die den gleich langen Seiten gegen\u00FCberliegen. Zur vollst\u00E4ndigen Bestimmung werden zwei Bestimmungsst\u00FCcke ben\u00F6tigt, davon zumindest eine Seite. Die beiden gleich langen Seiten hei\u00DFen Schenkel, die dritte Seite hei\u00DFt Basis. Der der Basis gegen\u00FCberliegende Eckpunkt hei\u00DFt Spitze. Die an der Basis anliegenden Winkel hei\u00DFen Basiswinkel."@de , "\uAE30\uD558\uD559\uC5D0\uC11C \uC774\uB4F1\uBCC0 \uC0BC\uAC01\uD615(\u4E8C\u7B49\u908A\u4E09\u89D2\u5F62, \uC601\uC5B4: isosceles triangle)\uC740 \uB450 \uBCC0\uC758 \uAE38\uC774\uAC00 \uAC19\uC740 \uC0BC\uAC01\uD615\uC774\uB2E4. \uC774 \uACBD\uC6B0 \uAE38\uC774\uAC00 \uAC19\uC740 \uB450 \uBCC0\uC774 \uB9C8\uC8FC\uBCF4\uB294 \uB450 \uB0B4\uAC01\uC758 \uD06C\uAE30\uB294 \uAC19\uB2E4. \uB610\uD55C, \uAE38\uC774\uAC00 \uAC19\uC740 \uB450 \uBCC0\uC758 \uAD50\uC810\uC744 \uC9C0\uB098\uB294 \uB0B4\uAC01\uC758 \uC774\uB4F1\uBD84\uC120\uC740 \uB0A8\uC740 \uD55C \uBCC0\uC758 \uC218\uC9C1 \uC774\uB4F1\uBD84\uC120\uACFC \uC77C\uCE58\uD55C\uB2E4. \uAE38\uC774\uAC00 \uAC19\uC740 \uB450 \uBCC0\uC774 \uB9C8\uC8FC\uBCF4\uB294 \uAF2D\uC9D3\uC810\uC5D0\uC11C \uB450 \uBCC0\uC5D0 \uB0B4\uB9B0 \uC218\uC120\uACFC \uC911\uC120, \uB0B4\uAC01\uC758 \uC774\uB4F1\uBD84\uC120\uC758 \uAE38\uC774\uB294 \uC138 \uBCC0\uC758 \uAE38\uC774\uAC00 \uBAA8\uB450 \uAC19\uC740 \uC0BC\uAC01\uD615\uC744 \uC815\uC0BC\uAC01\uD615\uC774\uB77C\uACE0 \uD55C\uB2E4. \uACFC\uAC70 \uC5D0\uC6B0\uD074\uB808\uC774\uB370\uC2A4\uC758 \uC815\uC758\uC5D0\uC11C\uB294 \uC774\uB4F1\uBCC0 \uC0BC\uAC01\uD615\uC744 \uC815\uD655\uD788 \uB450 \uBCC0\uC758 \uAE38\uC774\uAC00 \uAC19\uC740 \uC0BC\uAC01\uD615\uC73C\uB85C \uC815\uC758\uD558\uC5EC \uC815\uC0BC\uAC01\uD615\uC744 \uD3EC\uD568\uC2DC\uD0A4\uC9C0 \uC54A\uC558\uC73C\uB098, \uD604\uB300 \uAE30\uD558\uD559\uC740 \uC815\uC0BC\uAC01\uD615\uC744 \uC774\uB4F1\uBCC0 \uC0BC\uAC01\uD615\uC758 \uD2B9\uC218\uD55C \uACBD\uC6B0\uB85C\uC11C \uD3EC\uD568\uD55C\uB2E4."@ko , "Dalam geometri, segitiga sama kaki (bahasa Inggris: isosceles triangle) adalah segitiga yang memiliki dua sisi yang sama panjangnya. Segitiga ini terkadang dinyatakan memiliki tepat dua sisi yang sama panjang. Segitiga ini juga terkadang dinyatakan setidaknya mempunyai dua sisi yang sama panjang, dan pernyataan ini meliputi segitiga sama sisi sebagai kasus istimewa. Contoh-contoh segitiga sama kaki di antaranya , segitiga emas, muka , dan ."@in , "\u0420\u0456\u0432\u043D\u043E\u0431\u0435\u0301\u0434\u0440\u0435\u043D\u0438\u0439 \u0442\u0440\u0438\u043A\u0443\u0301\u0442\u043D\u0438\u043A \u2014 \u0442\u0440\u0438\u043A\u0443\u0442\u043D\u0438\u043A, \u0443 \u044F\u043A\u043E\u0433\u043E \u0434\u0432\u0456 \u0441\u0442\u043E\u0440\u043E\u043D\u0438 \u0440\u0456\u0432\u043D\u0456. \u0420\u0456\u0432\u043D\u0456 \u0441\u0442\u043E\u0440\u043E\u043D\u0438 \u043D\u0430\u0437\u0438\u0432\u0430\u044E\u0442\u044C \u0431\u0456\u0447\u043D\u0438\u043C\u0438 \u0441\u0442\u043E\u0440\u043E\u043D\u0430\u043C\u0438, \u0430 \u0442\u0440\u0435\u0442\u044E \u0441\u0442\u043E\u0440\u043E\u043D\u0443 \u2014 \u043E\u0441\u043D\u043E\u0432\u043E\u044E \u0440\u0456\u0432\u043D\u043E\u0431\u0435\u0434\u0440\u0435\u043D\u043E\u0433\u043E \u0442\u0440\u0438\u043A\u0443\u0442\u043D\u0438\u043A\u0430. \u0417\u0430 \u043E\u0437\u043D\u0430\u0447\u0435\u043D\u043D\u044F\u043C, \u043F\u0440\u0430\u0432\u0438\u043B\u044C\u043D\u0438\u0439 \u0442\u0440\u0438\u043A\u0443\u0442\u043D\u0438\u043A \u0442\u0430\u043A\u043E\u0436 \u0454 \u0440\u0456\u0432\u043D\u043E\u0431\u0435\u0434\u0440\u0435\u043D\u0438\u043C, \u0430\u043B\u0435 \u043E\u0431\u0435\u0440\u043D\u0435\u043D\u0435 \u0442\u0432\u0435\u0440\u0434\u0436\u0435\u043D\u043D\u044F \u043D\u0435 \u0454 \u043F\u0440\u0430\u0432\u0438\u043B\u044C\u043D\u0438\u043C."@uk . @prefix dbp: . dbr:Isosceles_triangle dbp:name "Isosceles triangle"@en . @prefix foaf: . dbr:Isosceles_triangle foaf:depiction , , , , , , , , , , , , , , , . @prefix dcterms: . @prefix dbc: . dbr:Isosceles_triangle dcterms:subject dbc:Types_of_triangles ; dbo:wikiPageID 315428 ; dbo:wikiPageRevisionID 1111071064 ; dbo:wikiPageWikiLink dbr:Scalene_triangle , dbr:Triangle , , dbr:Cyclic_quadrilateral , dbr:Angle_bisector , , dbr:Euler_line , , dbr:Acute_triangle , , dbr:Rhind_Mathematical_Papyrus , , dbr:Circumcircle , dbr:Cyclic_polygon , dbr:Isosceles_set , dbr:Isosceles_trapezoid , dbr:Working_class , dbr:Social_hierarchy , dbr:Triakis_octahedron , dbr:Numerically_unstable , dbr:Incenter , dbr:Complex_plane , dbr:Catalan_solid , dbr:Greek_mathematics , , dbr:Centroid , dbr:Notre-Dame_de_Paris , dbr:Graphic_design , dbr:Right_triangle , dbr:Orthocenter , dbr:Complex_conjugate , dbr:Moscow_Mathematical_Papyrus , dbr:Special_case , dbr:Decorative_arts , dbr:Lewis_Carroll , dbr:Equilateral_triangles , , dbr:Semiperimeter , dbr:Flag_of_Guyana , dbr:Inscribed_circle , dbr:List_of_Greek_and_Latin_roots_in_English , dbr:Boundary_case , dbr:Axis_of_symmetry , dbr:Geometry , dbr:Architecture , dbr:Acute_and_obtuse_triangles , dbr:Gothic_architecture , dbr:Ancient_Greek_architecture , , , , dbr:Isoperimetric_inequality , dbr:Triakis_tetrahedron , dbr:Pythagorean_theorem , dbr:Sri_Yantra , dbr:Edwin_Abbott_Abbott , dbr:Medieval_architecture , dbr:Flatland , dbr:Gable , dbr:Hendrik_Petrus_Berlage , , dbr:Tantra , dbr:Line_segment , , , dbr:Acute_angle , dbr:Pyramid , dbr:Pons_asinorum , dbr:Tetrakis_hexahedron , dbr:Golden_gnomon , dbr:Degrees_of_freedom , , dbr:Three-body_problem , dbr:Diagonal , dbr:Flag , dbr:Rhombus , dbr:Flag_of_Saint_Lucia , dbr:Pentakis_dodecahedron , dbr:Deployable_structure , dbr:Argand_diagram , , dbr:American_Mathematical_Monthly , , dbc:Types_of_triangles , dbr:Euclidean_geometry , dbr:Circumcenter , , dbr:Pediment , dbr:Convex_polygon , , dbr:Calabi_triangle , dbr:Equilateral_triangle , dbr:Electronic_Journal_of_Combinatorics , dbr:Early_Neolithic , dbr:Circumscribed_circle , dbr:Lagrangian_point , dbr:Yoshimura_buckling , dbr:Cubic_equation , dbr:Babylonian_mathematics , , dbr:Hero_of_Alexandria , dbr:Jakob_Steiner , dbr:Isosceles_right_triangle , dbr:Bipyramid , dbr:Triakis_triangular_tiling , , dbr:Perpendicular_bisector , dbr:Heraldry , dbr:Euclid , dbr:The_Mathematical_Gazette , dbr:Schwarz_lantern , dbr:Tessellation , dbr:Triakis_icosahedron , dbr:Real_number , dbr:Warren_truss , dbr:Dihedral_symmetry , dbr:Celestial_mechanics , dbr:Ancient_Egyptian_mathematics , dbr:Golden_ratio , dbr:Forum_Geometricorum , dbr:Mathematical_fallacy ; dbo:wikiPageExternalLink , . @prefix ns8: . dbr:Isosceles_triangle dbo:wikiPageExternalLink ns8:atreatiseongeom00lardgoog , , , , , , , , , , , , , , , , , ns8:thirteenbooksofe00eucl , , , , , , . @prefix ns9: . dbr:Isosceles_triangle dbo:wikiPageExternalLink ns9:isosceles , , . @prefix owl: . dbr:Isosceles_triangle owl:sameAs . @prefix wikidata: . dbr:Isosceles_triangle owl:sameAs wikidata:Q875937 , , . @prefix dbpedia-sl: . dbr:Isosceles_triangle owl:sameAs dbpedia-sl:Enakokraki_trikotnik , . @prefix dbpedia-nl: . dbr:Isosceles_triangle owl:sameAs dbpedia-nl:Gelijkbenige_driehoek , . @prefix dbpedia-id: . dbr:Isosceles_triangle owl:sameAs dbpedia-id:Segitiga_sama_kaki . @prefix dbpedia-nn: . dbr:Isosceles_triangle owl:sameAs dbpedia-nn:Likebeint_trekant . @prefix dbpedia-simple: . dbr:Isosceles_triangle owl:sameAs dbpedia-simple:Isosceles_triangle , . @prefix dbpedia-cy: . dbr:Isosceles_triangle owl:sameAs dbpedia-cy:Triongl_isosgeles , , , , . @prefix dbpedia-als: . dbr:Isosceles_triangle owl:sameAs dbpedia-als:Gleichschenkliges_Dreieck , , , , , . @prefix ns19: . dbr:Isosceles_triangle owl:sameAs ns19:Teng_yonli_uchburchak , , , , . @prefix dbpedia-it: . dbr:Isosceles_triangle owl:sameAs dbpedia-it:Triangolo_isoscele , , . @prefix dbpedia-ro: . dbr:Isosceles_triangle owl:sameAs dbpedia-ro:Triunghi_isoscel , , . @prefix dbpedia-fi: . dbr:Isosceles_triangle owl:sameAs dbpedia-fi:Tasakylkinen_kolmio . @prefix dbpedia-eo: . dbr:Isosceles_triangle owl:sameAs dbpedia-eo:Izocela_triangulo . @prefix dbpedia-de: . dbr:Isosceles_triangle owl:sameAs dbpedia-de:Gleichschenkliges_Dreieck , , . @prefix dbpedia-eu: . dbr:Isosceles_triangle owl:sameAs dbpedia-eu:Hiruki_isoszele , , , , , , , , , , . @prefix dbpedia-no: . dbr:Isosceles_triangle owl:sameAs dbpedia-no:Likebeint_trekant , , . @prefix dbt: . dbr:Isosceles_triangle dbp:wikiPageUsesTemplate dbt:Sfnp , dbt:IPAc-en , dbt:MathWorld , dbt:Short_description , dbt:Good_article , dbt:Polygons , dbt:Citation , dbt:Infobox_Polygon , dbt:Multiple_image , dbt:Redirect , dbt:Reflist , dbt:Refend , dbt:Refbegin ; dbo:thumbnail ; dbp:dual "Self-dual"@en ; "\u2228 { }"@en ; dbp:caption "Acute isosceles gable over the Saint-Etienne portal, Notre-Dame de Paris"@en , dbr:Pentakis_dodecahedron , dbr:Triakis_octahedron , "Isosceles triangle with vertical axis of symmetry"@en , dbr:Flag_of_Saint_Lucia , dbr:Isosceles_right_triangle , "A golden triangle subdivided into a smaller golden triangle and golden gnomon"@en , "The triakis triangular tiling"@en , "Three congruent inscribed squares in the Calabi triangle"@en , dbr:Triakis_icosahedron , dbr:Flag_of_Guyana , dbr:Tetrakis_hexahedron , "Obtuse isosceles pediment of the Pantheon, Rome"@en , dbr:Triakis_tetrahedron ; dbp:edges 3 ; dbp:header "Catalan solids with isosceles triangle faces"@en , "Special isosceles triangles"@en ; dbp:image "Flag of Saint Lucia.svg"@en , "Triakistetrahedron.jpg"@en , "Cath\u00E9drale Notre-Dame - Portail du transept sud, dit portail Saint-Etienne, Gables, c\u00F4t\u00E9 droit - Paris 04 - M\u00E9diath\u00E8que de l'architecture et du patrimoine - APMH00021092.jpg"@en , "Calabi triangle.svg"@en , "Pantheon Rome exterior 2015.JPG"@en , "Pentakisdodecahedron.jpg"@en , 45 , "Tetrakishexahedron.jpg"@en , 1 , "Triakisoctahedron.jpg"@en , "Golden triangle .svg"@en , "Triakisicosahedron.jpg"@en , "Flag of Guyana.svg"@en ; dbp:imagesize 100 ; dbp:perrow 2 ; dbp:properties dbr:Convex_polygon , dbr:Cyclic_polygon ; dbp:symmetry "Dih2, [ ], , order 2"@en ; dbp:totalWidth 360 , 600 , 480 ; dbp:type dbr:Triangle ; dbo:abstract "Dalam geometri, segitiga sama kaki (bahasa Inggris: isosceles triangle) adalah segitiga yang memiliki dua sisi yang sama panjangnya. Segitiga ini terkadang dinyatakan memiliki tepat dua sisi yang sama panjang. Segitiga ini juga terkadang dinyatakan setidaknya mempunyai dua sisi yang sama panjang, dan pernyataan ini meliputi segitiga sama sisi sebagai kasus istimewa. Contoh-contoh segitiga sama kaki di antaranya , segitiga emas, muka , dan . Kajian matematika tentang segitiga sama kaki berawal dari dan matematika Babilonia. Segitiga sama kaki bahkan dipakai sebagai hiasan pada masa sebelumnya. Segitiga ini sering ditemukan dalam arsitektur dan desain, seperti pedimen dan atap pelana bangunan. Dua sisi yang sama disebut kaki dan sisi ketiga disebut alas segitiga. Dimensi segitiga lain seperti tinggi, luas, dan keliling, dapat dihitung dengan rumus sederhana menggunakan panjang kaki dan alas segitiga. Setiap segitiga sama kaki memiliki sumbu simetri di sepanjang dari alasnya. Dua sudut yang berhadapan dengan kaki segitiga adalah sama dan selalu lancip, jadi penggolongan segitiga berupa segitiga lancip, siku-siku, atau tumpul, hanya bergantung pada sudut yang diapit oleh dua kaki segitiga."@in , "Ein gleichschenkliges Dreieck ist ein Dreieck mit mindestens zwei gleich langen Seiten. Folglich sind auch die beiden Winkel gleich gro\u00DF, die den gleich langen Seiten gegen\u00FCberliegen. Zur vollst\u00E4ndigen Bestimmung werden zwei Bestimmungsst\u00FCcke ben\u00F6tigt, davon zumindest eine Seite. Die beiden gleich langen Seiten hei\u00DFen Schenkel, die dritte Seite hei\u00DFt Basis. Der der Basis gegen\u00FCberliegende Eckpunkt hei\u00DFt Spitze. Die an der Basis anliegenden Winkel hei\u00DFen Basiswinkel. Jedes gleichschenklige Dreieck ist achsensymmetrisch. Es kann spitzwinklig, rechtwinklig oder stumpfwinklig sein. Schlie\u00DFt die Spitze den Winkel oder ein, wird es Goldenes Dreieck erster bzw. zweiter Art genannt."@de , "In geometry, an isosceles triangle (/a\u026A\u02C8s\u0252s\u0259li\u02D0z/) is a triangle that has two sides of equal length. Sometimes it is specified as having exactly two sides of equal length, and sometimes as having at least two sides of equal length, the latter version thus including the equilateral triangle as a special case.Examples of isosceles triangles include the isosceles right triangle, the golden triangle, and the faces of bipyramids and certain Catalan solids. The mathematical study of isosceles triangles dates back to ancient Egyptian mathematics and Babylonian mathematics. Isosceles triangles have been used as decoration from even earlier times, and appear frequently in architecture and design, for instance in the pediments and gables of buildings. The two equal sides are called the legs and the third side is called the base of the triangle. The other dimensions of the triangle, such as its height, area, and perimeter, can be calculated by simple formulas from the lengths of the legs and base.Every isosceles triangle has an axis of symmetry along the perpendicular bisector of its base. The two angles opposite the legs are equal and are always acute, so the classification of the triangle as acute, right, or obtuse depends only on the angle between its two legs."@en , "\u5728\u5E7E\u4F55\u5B78\u4E2D\uFF0C\u7B49\u8170\u4E09\u89D2\u5F62\uFF08\u82F1\u8A9E\uFF1AIsosceles triangle\uFF09\u662F\u6307\u81F3\u5C11\u6709\u5169\u908A\u9577\u5EA6\u76F8\u7B49\u7684\u4E09\u89D2\u5F62\uFF0C\u56E0\u6B64\u6703\u9020\u6210\u67092\u500B\u89D2\u76F8\u7B49\u3002\u76F8\u7B49\u7684\u5169\u500B\u908A\u7A31\u7B49\u8170\u4E09\u89D2\u5F62\u7684\u8170\uFF0C\u53E6\u4E00\u908A\u7A31\u70BA\u5E95\u908A\uFF0C\u76F8\u7B49\u7684\u5169\u500B\u89D2\u7A31\u70BA\u7B49\u8170\u4E09\u89D2\u5F62\u7684\u5E95\u89D2\uFF0C\u5176\u9918\u7684\u89D2\u53EB\u505A\u9802\u89D2\u3002 \u7B49\u8170\u4E09\u89D2\u5F62\u7684\u91CD\u5FC3\u3001\u548C\u5782\u5FC3\u90FD\u4F4D\u65BC\u9802\u9EDE\u5411\u5E95\u908A\u7684\u5782\u7EBF\uFF0C\u53EF\u4EE5\u628A\u7B49\u8170\u4E09\u89D2\u5F62\u5206\u6210\u5169\u500B\u5168\u7B49\u7684\u76F4\u89D2\u4E09\u89D2\u5F62\u3002 \u7B49\u908A\u4E09\u89D2\u5F62\u662F\u5E95\u908A\u548C\u8170\u7B49\u9577\u7684\u7B49\u8170\u4E09\u89D2\u5F62\uFF0C\u662F\u7B49\u8170\u4E09\u89D2\u5F62\u7684\u4E00\u500B\u7279\u6B8A\u5F62\u5F0F\u3002\u82E5\u7B49\u8170\u4E09\u89D2\u5F62\u7684\u9802\u89D2\u70BA\u76F4\u89D2\uFF0C\u7A31\u70BA\u7B49\u8170\u76F4\u89D2\u4E09\u89D2\u5F62\u3002"@zh , "Un triangle \u00E9s is\u00F2sceles quan t\u00E9 dos costats de la mateixa longitud. Segons com sigui el m\u00E9s gran dels seus tres angles, els triangles is\u00F2sceles poden ser acutangles, rectangles o obtusangles. Si es pren com a base el costat diferent dels altres dos, aleshores l'altura el divideix en dos triangles rectangles. Si el triangle original, a m\u00E9s de ser is\u00F2sceles, \u00E9s rectangle, aleshores els dos triangles que se n'obtenen s\u00F3n tamb\u00E9 is\u00F2sceles i rectangles. Tots els triangles is\u00F2sceles rectangles s\u00F3n semblants, amb un angle recte, de noranta graus, i dos angles aguts de quaranta-cinc graus. Els angles que forma el costat desigual amb els altres dos s\u00F3n iguals."@ca , "\uAE30\uD558\uD559\uC5D0\uC11C \uC774\uB4F1\uBCC0 \uC0BC\uAC01\uD615(\u4E8C\u7B49\u908A\u4E09\u89D2\u5F62, \uC601\uC5B4: isosceles triangle)\uC740 \uB450 \uBCC0\uC758 \uAE38\uC774\uAC00 \uAC19\uC740 \uC0BC\uAC01\uD615\uC774\uB2E4. \uC774 \uACBD\uC6B0 \uAE38\uC774\uAC00 \uAC19\uC740 \uB450 \uBCC0\uC774 \uB9C8\uC8FC\uBCF4\uB294 \uB450 \uB0B4\uAC01\uC758 \uD06C\uAE30\uB294 \uAC19\uB2E4. \uB610\uD55C, \uAE38\uC774\uAC00 \uAC19\uC740 \uB450 \uBCC0\uC758 \uAD50\uC810\uC744 \uC9C0\uB098\uB294 \uB0B4\uAC01\uC758 \uC774\uB4F1\uBD84\uC120\uC740 \uB0A8\uC740 \uD55C \uBCC0\uC758 \uC218\uC9C1 \uC774\uB4F1\uBD84\uC120\uACFC \uC77C\uCE58\uD55C\uB2E4. \uAE38\uC774\uAC00 \uAC19\uC740 \uB450 \uBCC0\uC774 \uB9C8\uC8FC\uBCF4\uB294 \uAF2D\uC9D3\uC810\uC5D0\uC11C \uB450 \uBCC0\uC5D0 \uB0B4\uB9B0 \uC218\uC120\uACFC \uC911\uC120, \uB0B4\uAC01\uC758 \uC774\uB4F1\uBD84\uC120\uC758 \uAE38\uC774\uB294 \uC138 \uBCC0\uC758 \uAE38\uC774\uAC00 \uBAA8\uB450 \uAC19\uC740 \uC0BC\uAC01\uD615\uC744 \uC815\uC0BC\uAC01\uD615\uC774\uB77C\uACE0 \uD55C\uB2E4. \uACFC\uAC70 \uC5D0\uC6B0\uD074\uB808\uC774\uB370\uC2A4\uC758 \uC815\uC758\uC5D0\uC11C\uB294 \uC774\uB4F1\uBCC0 \uC0BC\uAC01\uD615\uC744 \uC815\uD655\uD788 \uB450 \uBCC0\uC758 \uAE38\uC774\uAC00 \uAC19\uC740 \uC0BC\uAC01\uD615\uC73C\uB85C \uC815\uC758\uD558\uC5EC \uC815\uC0BC\uAC01\uD615\uC744 \uD3EC\uD568\uC2DC\uD0A4\uC9C0 \uC54A\uC558\uC73C\uB098, \uD604\uB300 \uAE30\uD558\uD559\uC740 \uC815\uC0BC\uAC01\uD615\uC744 \uC774\uB4F1\uBCC0 \uC0BC\uAC01\uD615\uC758 \uD2B9\uC218\uD55C \uACBD\uC6B0\uB85C\uC11C \uD3EC\uD568\uD55C\uB2E4."@ko , "\u0420\u0456\u0432\u043D\u043E\u0431\u0435\u0301\u0434\u0440\u0435\u043D\u0438\u0439 \u0442\u0440\u0438\u043A\u0443\u0301\u0442\u043D\u0438\u043A \u2014 \u0442\u0440\u0438\u043A\u0443\u0442\u043D\u0438\u043A, \u0443 \u044F\u043A\u043E\u0433\u043E \u0434\u0432\u0456 \u0441\u0442\u043E\u0440\u043E\u043D\u0438 \u0440\u0456\u0432\u043D\u0456. \u0420\u0456\u0432\u043D\u0456 \u0441\u0442\u043E\u0440\u043E\u043D\u0438 \u043D\u0430\u0437\u0438\u0432\u0430\u044E\u0442\u044C \u0431\u0456\u0447\u043D\u0438\u043C\u0438 \u0441\u0442\u043E\u0440\u043E\u043D\u0430\u043C\u0438, \u0430 \u0442\u0440\u0435\u0442\u044E \u0441\u0442\u043E\u0440\u043E\u043D\u0443 \u2014 \u043E\u0441\u043D\u043E\u0432\u043E\u044E \u0440\u0456\u0432\u043D\u043E\u0431\u0435\u0434\u0440\u0435\u043D\u043E\u0433\u043E \u0442\u0440\u0438\u043A\u0443\u0442\u043D\u0438\u043A\u0430. \u0417\u0430 \u043E\u0437\u043D\u0430\u0447\u0435\u043D\u043D\u044F\u043C, \u043F\u0440\u0430\u0432\u0438\u043B\u044C\u043D\u0438\u0439 \u0442\u0440\u0438\u043A\u0443\u0442\u043D\u0438\u043A \u0442\u0430\u043A\u043E\u0436 \u0454 \u0440\u0456\u0432\u043D\u043E\u0431\u0435\u0434\u0440\u0435\u043D\u0438\u043C, \u0430\u043B\u0435 \u043E\u0431\u0435\u0440\u043D\u0435\u043D\u0435 \u0442\u0432\u0435\u0440\u0434\u0436\u0435\u043D\u043D\u044F \u043D\u0435 \u0454 \u043F\u0440\u0430\u0432\u0438\u043B\u044C\u043D\u0438\u043C."@uk , "\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\uFF08\u306B\u3068\u3046\u3078\u3093\u3055\u3093\u304B\u304F\u3051\u3044\u3001\u82F1: isosceles triangle\uFF09\u306F\u3001\u4E09\u89D2\u5F62\u306E\u4E00\u7A2E\u3067\u30013 \u672C\u306E\u8FBA\u306E\u3046\u3061\uFF08\u5C11\u306A\u304F\u3068\u3082\uFF092 \u672C\u306E\u8FBA\u306E\u9577\u3055\u304C\u7B49\u3057\u3044\u56F3\u5F62\u3067\u3042\u308B\u3002\u9577\u3055\u306E\u7B49\u3057\u3044 2 \u8FBA\u3092\u7B49\u8FBA\u3068\u3044\u3044\u3001\u6B8B\u308A\u306E 1 \u8FBA\u3092\u5E95\u8FBA\u3068\u3088\u3076\u30022 \u672C\u306E\u7B49\u8FBA\u304C\u5171\u6709\u3059\u308B\u9802\u70B9\u3092\u3068\u304F\u306B\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306E\u9802\u70B9\u3068\u3044\u3046\u3002\u9802\u70B9\u306B\u304A\u3051\u308B\u5185\u89D2\u3092\u3001\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306E\u9802\u89D2\u3068\u3044\u3044\u3001\u6B8B\u308A\u306E 2 \u3064\u306E\u5185\u89D2\u3059\u306A\u308F\u3061\u5E95\u8FBA\u306E\u4E21\u7AEF\u306E\u5185\u89D2\u3092\u5E95\u89D2\u3068\u3088\u3076\u3002\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306E\u5E95\u89D2\u306F\u3001\u4E92\u3044\u306B\u7B49\u3057\u3044\u5927\u304D\u3055\u3092\u6301\u3064\u3002 \u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306E\u9802\u70B9\u306B\u304A\u3051\u308B\u5916\u89D2\u3092\u3001\u9802\u5916\u89D2\u3068\u8A00\u3046\u3002\u9802\u5916\u89D2\u306E\u5927\u304D\u3055\u306F\u3001\u5E95\u89D2\u306E2\u500D\u306B\u7B49\u3057\u3044\u3002\u307E\u305F\u3001\u9802\u5916\u89D2\u306E\u4E8C\u7B49\u5206\u7DDA\u306F\u3001\u5E95\u8FBA\u3068\u5E73\u884C\u3067\u3042\u308B\u3002\u9802\u89D2\u306F180\u00B0\u672A\u6E80\u306E\u5927\u304D\u3055\u3067\u3042\u308B\u304C\u3001\u5E95\u89D2\u306F90\u00B0\u672A\u6E80\u306E\u5927\u304D\u3055\u306B\u9650\u3089\u308C\u3001\u89D2\u5EA6\u306E\u548C\u306F180\u5EA6\u3067\u3042\u308B\u3002\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306F\u7DDA\u5BFE\u79F0\u306A\u56F3\u5F62\u3067\u3042\u308A\u3001\u9802\u70B9\u3068\u5E95\u8FBA\u306E\u4E2D\u70B9\u3092\u7D50\u3076\u4E2D\u7DDA\u3001\u9802\u89D2\u306E\u4E8C\u7B49\u5206\u7DDA\u3001\u5E95\u8FBA\u306E\u5782\u76F4\u4E8C\u7B49\u5206\u7DDA\u3001\u3053\u308C\u3089\u306F\u3059\u3079\u3066\u7DDA\u5BFE\u79F0\u306E\u5BFE\u79F0\u8EF8\u306B\u4E57\u308B\u3002\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306E\u9802\u89D2\u306E\u4E8C\u7B49\u5206\u7DDA\u306F\u5E95\u8FBA\u3092\u5782\u76F4\u306B\u4E8C\u7B49\u5206\u3059\u308B\u3002 \u4E09\u89D2\u5F62\u306E 3 \u3064\u306E\u5185\u89D2\u306E\u3046\u3061\uFF08\u5C11\u306A\u304F\u3068\u3082\uFF092 \u3064\u306E\u89D2\u304C\u7B49\u3057\u3044\u3082\u306E\u306F\u3001\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u3068\u306A\u308B\uFF08\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306E\u6210\u7ACB\u6761\u4EF6\uFF09\u3002\u307E\u305F\u3001\u5BFE\u79F0\u8EF8\u3092\u6301\u3064\u4E09\u89D2\u5F62\u306F\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306B\u9650\u3089\u308C\u308B\u3002 \u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306E\u3046\u3061\u30013 \u672C\u306E\u8FBA\u306E\u9577\u3055\u304C\u5168\u3066\u7B49\u3057\u3044\u4E09\u89D2\u5F62\u306F\u6B63\u4E09\u89D2\u5F62\u3068\u3044\u3046\u3002\u6B63\u4E09\u89D2\u5F62\u306F\u3001\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306E\u7279\u6B8A\u306A\u5834\u5408\u3067\u3042\u308B\u3002\u6B63\u4E09\u89D2\u5F62\u306E\u5185\u89D2\u306F\u3059\u3079\u3066\u7B49\u3057\u304F\u3001\u305D\u306E\u5927\u304D\u3055\u306F 60\u00B0 \u306B\u7B49\u3057\u3044\u3002\u3059\u3079\u3066\u306E\u6B63\u4E09\u89D2\u5F62\u306F\u3001\u4E92\u3044\u306B\u76F8\u4F3C\u3067\u3042\u308B\u3002 \u9802\u89D2\u304C\u76F4\u89D2\u3067\u3042\u308B\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306F\u76F4\u89D2\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u3068\u3088\u3070\u308C\u308B\u3002\u76F4\u89D2\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306E 2 \u3064\u306E\u5E95\u89D2\uFF082 \u3064\u306E\u92ED\u89D2\uFF09\u306F 45\u00B0\u3067\u3042\u308B\u3002\u3059\u3079\u3066\u306E\u76F4\u89D2\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306F\u3001\u4E92\u3044\u306B\u76F8\u4F3C\u3067\u3042\u308B\u3002 \u3053\u306E\u9805\u3067\u306F\u4E00\u822C\u7684\u306A\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306B\u3064\u3044\u3066\u8FF0\u3079\u308B\u3002 \u540C\u3058\u5927\u304D\u3055\u306E\u9802\u89D2\u3092\u6301\u3064\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306F\u5168\u3066\u4E92\u3044\u306B\u76F8\u4F3C\u3067\u3042\u308B\u3002 \u307E\u305F\u3001\u540C\u3058\u5927\u304D\u3055\u306E\u5E95\u89D2\u3092\u6301\u3064\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306F\u5168\u3066\u4E92\u3044\u306B\u76F8\u4F3C\u3067\u3042\u308B\u3002 \u7DDA\u5206\u306E\u4E21\u5074\u306B\u3001\u3053\u308C\u3092\u5E95\u8FBA\u3068\u3059\u308B 2 \u3064\u306E\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u3092\u4F5C\u3063\u3066\u4E26\u3079\u308B\u3068\u3001\u51E7\u5F62\u304C\u3067\u304D\u308B\u3002\u3068\u304F\u306B\u30012 \u3064\u306E\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u304C\u5408\u540C\u3067\u3042\u308B\u5834\u5408\u3001\u83F1\u5F62\u304C\u3067\u304D\u308B\u3002\u9006\u306B\u3001\u83F1\u5F62\u3084\u51E7\u5F62\u3092\u5BFE\u89D2\u7DDA\u30672\u3064\u306B\u5206\u3051\u3066\u3001\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u3092\u4F5C\u308B\u3053\u3068\u304C\u3067\u304D\u308B\u3002\u7279\u306B\u3001\u6B63\u65B9\u5F62\u3092 1 \u672C\u306E\u5BFE\u89D2\u7DDA\u3067 2 \u3064\u306B\u5206\u3051\u308B\u3068\u3001\u76F4\u89D2\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u304C\u5F97\u3089\u308C\u308B\u3002 \u6B63n\u89D2\u5F62\u306E\u91CD\u5FC3\u304B\u3089\u5404\u9802\u70B9\u306B\u7DDA\u5206\u3092\u5F15\u304F\u3068n\u500B\u306E\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u304C\u3067\u304D\u308B\u3002 \u6247\u5F62\u306E\u4E2D\u5FC3\u89D2\u3092\u9650\u308A\u306A\u304F\u5C0F\u3055\u304F\u3059\u308B\u3068\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u306B\u8FD1\u3065\u304F\u3002 \u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u3092\u5BFE\u79F0\u8EF8\u3092\u4E2D\u5FC3\u3068\u3057\u3066\u534A\u56DE\u8EE2\u3055\u305B\u308B\u3068\u5186\u9310\u304C\u3067\u304D\u308B\u3002\u5186\u9310\u306E\u6295\u5F71\u56F3\u306E\u3046\u3061\u3001\u7ACB\u9762\u56F3\u306F\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u3067\u3042\u308B\u3002 \u89D2\u9310\u306E\u3046\u3061\u5E95\u9762\u304C\u6B63\u591A\u89D2\u5F62\u3067\u305D\u306E\u91CD\u5FC3\u306E\u771F\u4E0A\u306B\u9802\u70B9\u306E\u3042\u308B\u3082\u306E\u306F\u3001\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u304B\u3089\u306A\u308B\u5074\u9762\u3092\u6301\u3064\u3002"@ja , "En geometr\u00EDa, un tri\u00E1ngulo is\u00F3sceles es un tri\u00E1ngulo que tiene, al menos, dos lados de igual longitud. Al \u00E1ngulo formado por los lados de igual longitud se le denomina \u00E1ngulo en el v\u00E9rtice y al lado opuesto a \u00E9l, lado base.\u200B"@es , "Rovnoramenn\u00FD troj\u00FAheln\u00EDk je troj\u00FAheln\u00EDk, kter\u00FD m\u00E1 (alespo\u0148) dv\u011B strany shodn\u00E9."@cs , "In geometria, si definisce triangolo isoscele un triangolo che possiede due lati congruenti. Vale il seguente teorema: \"Un triangolo \u00E8 isoscele se e solo se ha due angoli congruenti\". Questo teorema costituisce la quinta proposizione del Libro I degli Elementi di Euclide ed \u00E8 noto come pons asinorum. In un triangolo isoscele la bisettrice relativa all'angolo al vertice coincide con la mediana, l'altezza e l'asse relativi alla base. Particolari triangoli isosceli sono i triangoli equilateri e i triangoli rettangoli isosceli.Esistono anche triangoli isosceli acutangoli e ottusangoli. I triangoli isosceli rettangoli sono tutti simili tra di loro, come i triangoli equilateri."@it , "\u0645\u062B\u0644\u062B \u0645\u062A\u0633\u0627\u0648\u064A \u0627\u0644\u0633\u0627\u0642\u064A\u0646 (\u0628\u0627\u0644\u0625\u0646\u062C\u0644\u064A\u0632\u064A\u0629: Isosceles triangle)\u200F \u0648\u064A\u0633\u0645\u0649 \u0623\u064A\u0636\u0627\u064B \u0628\u0627\u0644\u0634\u0651\u0643\u0644 \u0627\u0644\u0645\u0623\u0645\u0648\u0646\u064A \u0647\u0648 \u0645\u062B\u0644\u062B \u0644\u0647 \u0636\u0644\u0639\u0627\u0646 \u0637\u0648\u0644\u0647\u0645\u0627 \u0645\u062A\u0633\u0627\u0648\u064A\u0627\u0646. \u064A\u0633\u0645\u0649 \u0627\u0644\u0636\u0644\u0639 \u0627\u0644\u062B\u0627\u0644\u062B \u0642\u0627\u0639\u062F\u0629\u060C \u0648\u062A\u0633\u0645\u0649 \u0627\u0644\u0646\u0642\u0637\u0629 \u0627\u0644\u0645\u0642\u0627\u0628\u0644\u0629 \u0644\u0647 \u0631\u0623\u0633\u0627\u064B. \u0641\u064A \u0628\u0639\u0636 \u0627\u0644\u0625\u062D\u064A\u0627\u0646\u060C \u064A\u0639\u0631\u0641 \u0627\u0644\u0645\u062B\u0644\u062B \u0645\u062A\u0633\u0627\u0648\u064A \u0627\u0644\u0633\u0627\u0642\u064A\u0646 \u0639\u0644\u0649 \u0623\u0646\u0647 \u0645\u062B\u0644\u062B \u0644\u0647 \u0636\u0644\u0639\u0627\u0646 \u0639\u0644\u0649 \u0627\u0644\u0623\u0642\u0644 \u0637\u0648\u0644\u0647\u0645\u0627 \u0645\u062A\u0633\u0627\u0648\u064A\u0627\u0646. \u0641\u064A \u0625\u0637\u0627\u0631 \u0647\u0630\u0627 \u0627\u0644\u062A\u0639\u0631\u064A\u0641\u060C \u064A\u0635\u0628\u062D \u0645\u062B\u0644\u062B \u0645\u062A\u0633\u0627\u0648\u064A \u0627\u0644\u0623\u0636\u0644\u0627\u0639 \u062D\u0627\u0644\u0629 \u062E\u0627\u0635\u0629 \u0645\u0646 \u0627\u0644\u0645\u062B\u0644\u062B\u0627\u062A \u0645\u062A\u0633\u0627\u0648\u064A\u0627\u062A \u0627\u0644\u0633\u0627\u0642\u064A\u0646."@ar , "Em geometria, um tri\u00E2ngulo is\u00F3sceles \u00E9 um tri\u00E2ngulo que possui dois lados de mesma medida, isso \u00E9, congruentes."@pt , "Hiruki isoszelea edo triangelu isoszelea (grezierazko \u1F34\u03C3\u03BF\u03C2 \"berdin\" eta \u03C3\u03BA\u03AD\u03BB\u03B7 \"hankak\" hitzetatik, hau da, \"bi hankak berdinak\") hiru aldeetatik bi berdinak dituen hirukia da. Desberdina den aldea oinarria deitzen da."@eu , "Izocela triangulo estas triangulo, \u0109e kiu du lateroj havas la saman longon. Egallatera triangulo estas specifa okazo de izocelo triangulo."@eo , "Tr\u00F3jk\u0105t r\u00F3wnoramienny \u2013 tr\u00F3jk\u0105t o (co najmniej) dw\u00F3ch bokach r\u00F3wnej d\u0142ugo\u015Bci. Te dwa boki zwane s\u0105 ramionami tr\u00F3jk\u0105ta, trzeci bok jego podstaw\u0105. K\u0105ty przy podstawie s\u0105 przystaj\u0105ce a ich miara jest mniejsza od miary k\u0105ta prostego. Tr\u00F3jk\u0105t r\u00F3wnoramienny posiada (co najmniej jedn\u0105) o\u015B symetrii \u2013 przecina ona podstaw\u0119 w po\u0142owie d\u0142ugo\u015Bci i przechodzi przez wierzcho\u0142ek \u0142\u0105cz\u0105cy ramiona. O\u015B symetrii pokrywa si\u0119 z wysoko\u015Bci\u0105, \u015Brodkow\u0105, dwusieczn\u0105 i symetraln\u0105 opuszczonymi na podstaw\u0119. Szczeg\u00F3lne przypadki tr\u00F3jk\u0105ta r\u00F3wnoramiennego: \n* tr\u00F3jk\u0105t r\u00F3wnoboczny \u2013 dowolne dwa boki mo\u017Cna uzna\u0107 za ramiona, \n* r\u00F3wnoramienny tr\u00F3jk\u0105t prostok\u0105tny \u2013 k\u0105t prosty mo\u017Ce by\u0107 jedynie mi\u0119dzy ramionami. D\u0142ugo\u015B\u0107 podstawy jest r\u00F3wna d\u0142ugo\u015Bci ramienia."@pl , "\u0420\u0430\u0432\u043D\u043E\u0431\u0435\u0434\u0440\u0435\u043D\u043D\u044B\u0439 \u0442\u0440\u0435\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A \u2014 \u0442\u0440\u0435\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A, \u0432 \u043A\u043E\u0442\u043E\u0440\u043E\u043C \u0434\u0432\u0435 \u0441\u0442\u043E\u0440\u043E\u043D\u044B \u0440\u0430\u0432\u043D\u044B \u043C\u0435\u0436\u0434\u0443 \u0441\u043E\u0431\u043E\u0439 \u043F\u043E \u0434\u043B\u0438\u043D\u0435. \u0411\u043E\u043A\u043E\u0432\u044B\u043C\u0438 \u043D\u0430\u0437\u044B\u0432\u0430\u044E\u0442\u0441\u044F \u0440\u0430\u0432\u043D\u044B\u0435 \u0441\u0442\u043E\u0440\u043E\u043D\u044B, \u0430 \u043F\u043E\u0441\u043B\u0435\u0434\u043D\u044F\u044F \u043D\u0435\u0440\u0430\u0432\u043D\u0430\u044F \u0438\u043C \u0441\u0442\u043E\u0440\u043E\u043D\u0430 \u2014 \u043E\u0441\u043D\u043E\u0432\u0430\u043D\u0438\u0435\u043C. \u041F\u043E \u043E\u043F\u0440\u0435\u0434\u0435\u043B\u0435\u043D\u0438\u044E, \u043A\u0430\u0436\u0434\u044B\u0439 \u043F\u0440\u0430\u0432\u0438\u043B\u044C\u043D\u044B\u0439 \u0442\u0440\u0435\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A \u0442\u0430\u043A\u0436\u0435 \u044F\u0432\u043B\u044F\u0435\u0442\u0441\u044F \u0440\u0430\u0432\u043D\u043E\u0431\u0435\u0434\u0440\u0435\u043D\u043D\u044B\u043C, \u043D\u043E \u043E\u0431\u0440\u0430\u0442\u043D\u043E\u0435 \u0443\u0442\u0432\u0435\u0440\u0436\u0434\u0435\u043D\u0438\u0435 \u043D\u0435\u0432\u0435\u0440\u043D\u043E."@ru , "\u0399\u03C3\u03BF\u03C3\u03BA\u03B5\u03BB\u03AD\u03C2 \u03C4\u03C1\u03AF\u03B3\u03C9\u03BD\u03BF \u03C3\u03C4\u03B7 \u03B3\u03B5\u03C9\u03BC\u03B5\u03C4\u03C1\u03AF\u03B1 \u03B5\u03AF\u03BD\u03B1\u03B9 \u03AD\u03BD\u03B1 \u03C4\u03C1\u03AF\u03B3\u03C9\u03BD\u03BF \u03C4\u03BF\u03C5 \u03BF\u03C0\u03BF\u03AF\u03BF\u03C5 \u03B4\u03CD\u03BF \u03C0\u03BB\u03B5\u03C5\u03C1\u03AD\u03C2 \u03B5\u03AF\u03BD\u03B1\u03B9 \u03AF\u03C3\u03B5\u03C2 \u03BC\u03B5\u03C4\u03B1\u03BE\u03CD \u03C4\u03BF\u03C5\u03C2. '\u0395\u03B9\u03B4\u03B9\u03BA\u03AE \u03C0\u03B5\u03C1\u03AF\u03C0\u03C4\u03C9\u03C3\u03B7 \u03B9\u03C3\u03BF\u03C3\u03BA\u03B5\u03BB\u03BF\u03CD\u03C2 \u03C4\u03C1\u03B9\u03B3\u03CE\u03BD\u03BF\u03C5 \u03B5\u03AF\u03BD\u03B1\u03B9 \u03C4\u03BF \u03B9\u03C3\u03CC\u03C0\u03BB\u03B5\u03C5\u03C1\u03BF \u03C4\u03C1\u03AF\u03B3\u03C9\u03BD\u03BF"@el , "En g\u00E9om\u00E9trie, un triangle isoc\u00E8le est un triangle ayant au moins deux c\u00F4t\u00E9s de m\u00EAme longueur. Plus pr\u00E9cis\u00E9ment, un triangle ABC est dit isoc\u00E8le en A lorsque les longueurs AB et AC sont \u00E9gales. A est alors le sommet principal du triangle et [BC] sa base. Dans un triangle isoc\u00E8le, les angles adjacents \u00E0 la base sont \u00E9gaux. Un triangle \u00E9quilat\u00E9ral est un cas particulier de triangle isoc\u00E8le, ayant ses trois c\u00F4t\u00E9s de m\u00EAme longueur."@fr . @prefix gold: . dbr:Isosceles_triangle gold:hypernym dbr:Triangle . @prefix prov: . dbr:Isosceles_triangle prov:wasDerivedFrom . @prefix xsd: . dbr:Isosceles_triangle dbo:wikiPageLength "37074"^^xsd:nonNegativeInteger . @prefix wikipedia-en: . dbr:Isosceles_triangle foaf:isPrimaryTopicOf wikipedia-en:Isosceles_triangle .