. "pentagonal pyramid flat.svg"@en . . . . . "\uC624\uAC01\uBFD4\uC740 \uBC11\uBA74\uC774 \uC624\uAC01\uD615\uC778 \uAC01\uBFD4\uC774\uB2E4. \uC815\uC774\uC2ED\uBA74\uCCB4\uC758 \uC5C7\uC624\uAC01\uAE30\uB465\uC758 \uC704\uC544\uB798 \uBD80\uBD84\uC774\uB2E4. \uB9C8\uCC2C\uAC00\uC9C0\uB85C \uC0AC\uAC01\uC9C0\uBD95\uC774 \uB9C8\uB984\uBAA8\uC721\uD314\uBA74\uCCB4\uC758 \uD314\uAC01\uAE30\uB465\uC758 \uB450 \uBC11\uBA74\uC5D0 \uBD99\uC740 \uAC83\uACFC \uAC19\uAE30 \uB54C\uBB38\uC5D0 \uC11C\uB85C \uBE44\uC2B7\uD558\uB2E4. \uAE30\uD558\uD559\uC5D0\uC11C \uC624\uAC01\uBFD4(\u4E94\u89D2-)\uC740 \uC624\uAC01\uD615 \uBC11\uBA74\uC5D0\uC11C \uC0BC\uAC01\uD615 \uBA74 \uB2E4\uC12F \uAC1C\uB97C \uD55C \uC810\uC5D0\uC11C \uB9CC\uB098\uAC8C \uC138\uC6B4 \uAC01\uBFD4\uC774\uB2E4. \uB2E4\uB978 \uBAA8\uB4E0 \uAC01\uBFD4\uACFC \uAC19\uC774, \uC774\uAC83\uC740 \uC790\uAE30 \uC30D\uB300\uC774\uB2E4. \uC815 \uC624\uAC01\uBFD4\uC740 \uC815\uC624\uAC01\uD615 \uBC11\uBA74\uACFC \uC815\uC0BC\uAC01\uD615 \uC606\uBA74\uC744 \uAC00\uC9C4\uB2E4. \uC774\uAC83\uC740 \uC874\uC2A8\uC758 \uB2E4\uBA74\uCCB4 \uC911 \uD558\uB098\uC774\uB2E4(J2). \uC624\uAC01\uD615 \uBA74\uC758 \uC911\uC2EC\uC5D0\uC11C \uAF2D\uB300\uAE30\uAE4C\uC9C0\uC758 \uB192\uC774 H\uB294 (a\uAC00 \uBAA8\uC11C\uB9AC \uAE38\uC774\uC77C \uB54C, a\uC5D0 \uB300\uD55C \uD568\uC218\uB85C) \uB2E4\uC74C\uACFC \uAC19\uC774 \uACC4\uC0B0\uD560 \uC218 \uC788\uB2E4: \uD45C\uBA74\uC801 A\uB294 \uC624\uAC01\uD615 \uBC11\uBA74\uC758 \uBA74\uC801 \uB354\uD558\uAE30 \uC0BC\uAC01\uD615 \uD558\uB098\uC758 \uB113\uC774\uC758 \uB2E4\uC12F\uBC30\uB97C \uB354\uD55C \uAC83\uC73C\uB85C \uACC4\uC0B0\uD560 \uC218 \uC788\uB2E4: \uBAA8\uC11C\uB9AC\uC758 \uAE38\uC774\uB97C \uC54C\uB54C \uADF8 \uBD80\uD53C\uB3C4 \uC774 \uC2DD\uC73C\uB85C \uACC4\uC0B0\uD560 \uC218 \uC788\uB2E4: \uC774\uAC83\uC740 \uC815\uC774\uC2ED\uBA74\uCCB4\uC758 \"\uB36E\uAC1C\"\uB85C \uBCFC \uC218 \uC788\uB2E4; \uC815\uC774\uC2ED\uBA74\uCCB4\uC758 \uB098\uBA38\uC9C0 \uBD80\uBD84\uC740 1966\uB144\uC5D0 \uC5D0 \uC758\uD574 \uC774\uB984\uC774 \uBD99\uACE0 \uC11C\uC220\uB41C \uC874\uC2A8\uC758 \uB2E4\uBA74\uCCB4 92\uAC1C \uC911 \uD558\uB098\uC778 J11\uC774\uB2E4. \uB9C8\uCC2C\uAC00\uC9C0\uB85C \uC0AC\uAC01\uC9C0\uBD95\uB3C4 \uB9C8\uB984\uBAA8\uC721\uD314\uBA74\uCCB4\uC758 \uB36E\uAC1C\uAC00 \uB41C\uB2E4. \uADF8\uB9AC\uACE0 \uB0A8\uC740 \uB9C8\uB984\uBAA8\uC721\uD314\uBA74\uCCB4\uC758 \uC77C\uBD80\uBD84\uC740 \uC774\uB2E4. \uB530\uB77C\uC11C \uC0AC\uAC01\uC9C0\uBD95 \uC5ED\uC2DC \uACFC \uBE44\uC2B7\uD558\uB2E4."@ko . . . . "Een vijfhoekige piramide is in de meetkunde een piramide met een vijfhoekige basis, waarop vijf driehoekige zijvlakken staan, die samenkomen in een hoekpunt, de vertex. Een bijzondere vijfhoekige piramide is de regelmatige vijfhoekige piramide. Dat is een van de johnsonlichamen en heeft een meetkundige naam: J2. Het heeft een regelmatige vijfhoek als basis, zijwaarts oplopende gelijkzijdige driehoeken als zijvlakken en is het duale veelvlak van zichzelf. Een regelmatige vijfhoekige piramide kan worden gezien als het deksel op een regelmatig twintigvlak, de rest van het twintigvlak vormt dan een verlengde gedraaide vijfhoekige piramide J11."@nl . . . . "JohnsonSolid"@en . . "En g\u00E9om\u00E9trie, la pyramide pentagonale est un des solides de Johnson (J2). Comme toute pyramide, c'est un . Il peut \u00EAtre vu comme le \"couvercle\" d'un icosa\u00E8dre; le reste de l'icosa\u00E8dre forme la pyramide pentagonale gyroallong\u00E9e, J11. Les 92 solides de Johnson ont \u00E9t\u00E9 nomm\u00E9s et d\u00E9crits par Norman Johnson en 1966. Plus g\u00E9n\u00E9ralement, une pyramide pentagonale de sommet uniforme d'ordre 2 peut \u00EAtre d\u00E9finie avec une base pentagonale r\u00E9guli\u00E8re et 5 c\u00F4t\u00E9s en forme de triangles isoc\u00E8les de hauteur quelconque."@fr . "\u4E94\u89D2\u9310\u662F\u6307\u5E95\u9762\u70BA\u4E94\u908A\u5F62\u7684\u9310\u9AD4\u3002\u4E94\u89D2\u9310\u53EF\u4EE5\u6839\u64DA\u5E95\u9762\u7684\u7279\u6027\u5206\u985E\uFF0C\u4F8B\u5982\u51F9\u4E94\u89D2\u9310\u3001\u51F8\u4E94\u89D2\u9310\u548C\u6B63\u4E94\u89D2\u9310\u3002\u6240\u6709\u4E94\u89D2\u9310\u7686\u75316\u500B\u9762\u300110\u689D\u908A\u548C6\u500B\u9802\u9EDE\u7D44\u6210\u3002\u82E5\u4E00\u500B\u6B63\u4E94\u89D2\u9310\u5074\u9762\u4E5F\u7531\u6B63\u591A\u908A\u5F62\u7D44\u6210\uFF0C\u5247\u9019\u500B\u7ACB\u9AD4\u662F\u4E00\u7A2E\u8A79\u68EE\u591A\u9762\u9AD4\u3002\u5728\u5316\u5B78\u4E2D\uFF0C\u90E8\u5206\u7ACB\u9AD4\u7684\u5206\u5B50\u5F62\u72C0\u70BA\u4E94\u89D2\u9310\u5F62\uFF0C\u4F8B\u5982\u516D\u7532\u82EF\u7684\u96D9\u96FB\u5B50\u96E2\u5B50\u3002"@zh . "4508"^^ . . "Pir\u00E1mide pentagonal"@es . "\uC624\uAC01\uBFD4"@ko . "\u4E94\u89D2\u9310\uFF08\u3054\u304B\u304F\u3059\u3044\u3001\u82F1: pentagonal pyramid\uFF09\u3068\u306F\u3001\u5E95\u9762\u304C\u4E94\u89D2\u5F62\u306E\u89D2\u9310\u3067\u3042\u308B\u3002\u7279\u306B\u5E95\u9762\u304C\u6B63\u4E94\u89D2\u5F62\u3067\u3001\u982D\u9802\u70B9\u304B\u3089\u5E95\u9762\u306B\u4E0B\u308D\u3057\u305F\u5782\u7DDA\u304C\u5E95\u9762\u306E\u4E2D\u5FC3\u3067\u4EA4\u308F\u308B\u3082\u306E\u3092\u6B63\u4E94\u89D2\u9310\u3068\u3044\u3044\u3001\u305D\u306E\u5074\u9762\u306F\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u3067\u3042\u308B\u3002\u6B63\u4E94\u89D2\u9310\u306E\u5185\u3001\u5074\u9762\u304C\u6B63\u4E09\u89D2\u5F62\u306E\u3082\u306E\u306F2\u756A\u76EE\u306E\u30B8\u30E7\u30F3\u30BD\u30F3\u306E\u7ACB\u4F53\u3067\u3042\u308B\u3002"@ja . . . . "Ejemplo En geometr\u00EDa, una pir\u00E1mide pentagonal es una pir\u00E1mide de base pentagonal sobre la cual se erigen cinco caras triangulares que se encuentran en un punto, la c\u00FAspide. Al igual que cualquier pir\u00E1mide, es autodual. Este poliedro tiene 6 caras, 10 aristas y 6 v\u00E9rtices."@es . . . . "En geometrio, kvinlatera piramido estas piramido kun kvinlatera bazo kaj kvin triangulaj flankaj edroj. Kiel \u0109iu piramido, \u011Di estas . La regula kvinlatera piramido havas bazon kiu estas regula kvinlatero kaj flankajn edrojn kiuj estas egallateraj trianguloj. \u011Ci estas unu el la solidoj de Johnson (J2). \u011Ci povas esti konsiderata kiel la \"kovrilo\" de dudekedro; la resta parto de la dudekedro estas turnoplilongigita kvinlatera piramido (J11). Pli \u011Denerala ordo-2 vertico-uniforma kvinlatera piramido povas esti difinita kun regula kvinlatera bazo kaj 5 izocelaj triangulaj flankoj de iu ajn alto."@eo . . . . "Em geometria, uma pir\u00E2mide pentagonal \u00E9 uma pir\u00E2mide com uma base pentagonal, onde s\u00E3o erguidos cinco faces triangulares que se conectam em um ponto. Como toda pir\u00E2mide, \u00E9 autodual. \u00C9 constitu\u00EDda por 1 pent\u00E1gono e 5 tri\u00E2ngulos. Se o pent\u00E1gono \u00E9 regular e os tri\u00E2ngulos s\u00E3o equil\u00E1teros \u00E9 um dos s\u00F3lidos de Johnson (J2). Tem 6 v\u00E9rtices, 6 faces e 10 arestas."@pt . "\u4E94\u89D2\u9310\u662F\u6307\u5E95\u9762\u70BA\u4E94\u908A\u5F62\u7684\u9310\u9AD4\u3002\u4E94\u89D2\u9310\u53EF\u4EE5\u6839\u64DA\u5E95\u9762\u7684\u7279\u6027\u5206\u985E\uFF0C\u4F8B\u5982\u51F9\u4E94\u89D2\u9310\u3001\u51F8\u4E94\u89D2\u9310\u548C\u6B63\u4E94\u89D2\u9310\u3002\u6240\u6709\u4E94\u89D2\u9310\u7686\u75316\u500B\u9762\u300110\u689D\u908A\u548C6\u500B\u9802\u9EDE\u7D44\u6210\u3002\u82E5\u4E00\u500B\u6B63\u4E94\u89D2\u9310\u5074\u9762\u4E5F\u7531\u6B63\u591A\u908A\u5F62\u7D44\u6210\uFF0C\u5247\u9019\u500B\u7ACB\u9AD4\u662F\u4E00\u7A2E\u8A79\u68EE\u591A\u9762\u9AD4\u3002\u5728\u5316\u5B78\u4E2D\uFF0C\u90E8\u5206\u7ACB\u9AD4\u7684\u5206\u5B50\u5F62\u72C0\u70BA\u4E94\u89D2\u9310\u5F62\uFF0C\u4F8B\u5982\u516D\u7532\u82EF\u7684\u96D9\u96FB\u5B50\u96E2\u5B50\u3002"@zh . . . . . . . . . . . . . . "1128461"^^ . . . "Ejemplo En geometr\u00EDa, una pir\u00E1mide pentagonal es una pir\u00E1mide de base pentagonal sobre la cual se erigen cinco caras triangulares que se encuentran en un punto, la c\u00FAspide. Al igual que cualquier pir\u00E1mide, es autodual. Este poliedro tiene 6 caras, 10 aristas y 6 v\u00E9rtices."@es . "\uC624\uAC01\uBFD4\uC740 \uBC11\uBA74\uC774 \uC624\uAC01\uD615\uC778 \uAC01\uBFD4\uC774\uB2E4. \uC815\uC774\uC2ED\uBA74\uCCB4\uC758 \uC5C7\uC624\uAC01\uAE30\uB465\uC758 \uC704\uC544\uB798 \uBD80\uBD84\uC774\uB2E4. \uB9C8\uCC2C\uAC00\uC9C0\uB85C \uC0AC\uAC01\uC9C0\uBD95\uC774 \uB9C8\uB984\uBAA8\uC721\uD314\uBA74\uCCB4\uC758 \uD314\uAC01\uAE30\uB465\uC758 \uB450 \uBC11\uBA74\uC5D0 \uBD99\uC740 \uAC83\uACFC \uAC19\uAE30 \uB54C\uBB38\uC5D0 \uC11C\uB85C \uBE44\uC2B7\uD558\uB2E4. \uAE30\uD558\uD559\uC5D0\uC11C \uC624\uAC01\uBFD4(\u4E94\u89D2-)\uC740 \uC624\uAC01\uD615 \uBC11\uBA74\uC5D0\uC11C \uC0BC\uAC01\uD615 \uBA74 \uB2E4\uC12F \uAC1C\uB97C \uD55C \uC810\uC5D0\uC11C \uB9CC\uB098\uAC8C \uC138\uC6B4 \uAC01\uBFD4\uC774\uB2E4. \uB2E4\uB978 \uBAA8\uB4E0 \uAC01\uBFD4\uACFC \uAC19\uC774, \uC774\uAC83\uC740 \uC790\uAE30 \uC30D\uB300\uC774\uB2E4. \uC815 \uC624\uAC01\uBFD4\uC740 \uC815\uC624\uAC01\uD615 \uBC11\uBA74\uACFC \uC815\uC0BC\uAC01\uD615 \uC606\uBA74\uC744 \uAC00\uC9C4\uB2E4. \uC774\uAC83\uC740 \uC874\uC2A8\uC758 \uB2E4\uBA74\uCCB4 \uC911 \uD558\uB098\uC774\uB2E4(J2). \uC624\uAC01\uD615 \uBA74\uC758 \uC911\uC2EC\uC5D0\uC11C \uAF2D\uB300\uAE30\uAE4C\uC9C0\uC758 \uB192\uC774 H\uB294 (a\uAC00 \uBAA8\uC11C\uB9AC \uAE38\uC774\uC77C \uB54C, a\uC5D0 \uB300\uD55C \uD568\uC218\uB85C) \uB2E4\uC74C\uACFC \uAC19\uC774 \uACC4\uC0B0\uD560 \uC218 \uC788\uB2E4: \uD45C\uBA74\uC801 A\uB294 \uC624\uAC01\uD615 \uBC11\uBA74\uC758 \uBA74\uC801 \uB354\uD558\uAE30 \uC0BC\uAC01\uD615 \uD558\uB098\uC758 \uB113\uC774\uC758 \uB2E4\uC12F\uBC30\uB97C \uB354\uD55C \uAC83\uC73C\uB85C \uACC4\uC0B0\uD560 \uC218 \uC788\uB2E4: \uBAA8\uC11C\uB9AC\uC758 \uAE38\uC774\uB97C \uC54C\uB54C \uADF8 \uBD80\uD53C\uB3C4 \uC774 \uC2DD\uC73C\uB85C \uACC4\uC0B0\uD560 \uC218 \uC788\uB2E4: \uC774\uAC83\uC740 \uC815\uC774\uC2ED\uBA74\uCCB4\uC758 \"\uB36E\uAC1C\"\uB85C \uBCFC \uC218 \uC788\uB2E4; \uC815\uC774\uC2ED\uBA74\uCCB4\uC758 \uB098\uBA38\uC9C0 \uBD80\uBD84\uC740 1966\uB144\uC5D0 \uC5D0 \uC758\uD574 \uC774\uB984\uC774 \uBD99\uACE0 \uC11C\uC220\uB41C \uC874\uC2A8\uC758 \uB2E4\uBA74\uCCB4 92\uAC1C \uC911 \uD558\uB098\uC778 J11\uC774\uB2E4. \uB9C8\uCC2C\uAC00\uC9C0\uB85C \uC0AC\uAC01\uC9C0\uBD95\uB3C4 \uB9C8\uB984\uBAA8\uC721\uD314\uBA74\uCCB4\uC758 \uB36E\uAC1C\uAC00 \uB41C\uB2E4. \uADF8\uB9AC\uACE0 \uB0A8\uC740 \uB9C8\uB984\uBAA8\uC721\uD314\uBA74\uCCB4\uC758 \uC77C\uBD80\uBD84\uC740 \uC774\uB2E4. \uB530\uB77C\uC11C \uC0AC\uAC01\uC9C0\uBD95 \uC5ED\uC2DC \uACFC \uBE44\uC2B7\uD558\uB2E4. \uB354 \uC77C\uBC18\uC801\uC73C\uB85C 2\uCC28 \uAF2D\uC9D3\uC810-\uACE0\uB978 \uC624\uAC01\uBFD4\uC740 \uC815\uC624\uAC01\uD615 \uBC11\uBA74\uACFC \uC5B4\uB5A4 \uB192\uC774\uB97C \uAC00\uC9C0\uB294 \uC774\uB4F1\uBCC0\uC0BC\uAC01\uD615 5\uAC1C\uB85C \uC815\uC758\uB41C\uB2E4."@ko . . . . "\u041F\u044F\u0442\u0438\u0443\u0433\u043E\u043B\u044C\u043D\u0430\u044F \u043F\u0438\u0440\u0430\u043C\u0438\u0434\u0430"@ru . . . . . . "Een vijfhoekige piramide is in de meetkunde een piramide met een vijfhoekige basis, waarop vijf driehoekige zijvlakken staan, die samenkomen in een hoekpunt, de vertex. Een bijzondere vijfhoekige piramide is de regelmatige vijfhoekige piramide. Dat is een van de johnsonlichamen en heeft een meetkundige naam: J2. Het heeft een regelmatige vijfhoek als basis, zijwaarts oplopende gelijkzijdige driehoeken als zijvlakken en is het duale veelvlak van zichzelf. Een regelmatige vijfhoekige piramide kan worden gezien als het deksel op een regelmatig twintigvlak, de rest van het twintigvlak vormt dan een verlengde gedraaide vijfhoekige piramide J11. Er komen in de scheikunde moleculen voor met een pentagonaal piramidale moleculaire geometrie. De 92 johnsonlichamen werden in 1966 door Norman Johnson benoemd en beschreven."@nl . "\u4E94\u89D2\u9310"@ja . . . . "En geometria, la pir\u00E0mide pentagonal \u00E9s una pir\u00E0mide que t\u00E9 un pent\u00E0gon a la base. Aquest pol\u00EDedre t\u00E9 6 cares, 10 arestes i 6 v\u00E8rtexs. Si el v\u00E8rtex oposat a la base pentagonal est\u00E0 sobre la perpendicular tra\u00E7ada al centra del pent\u00E0gon llavors t\u00E9 simetria C5v. Com totes les pir\u00E0mides, \u00E9s dual de si mateixa."@ca . . . "PentagonalPyramid"@en . "En g\u00E9om\u00E9trie, la pyramide pentagonale est un des solides de Johnson (J2). Comme toute pyramide, c'est un . Il peut \u00EAtre vu comme le \"couvercle\" d'un icosa\u00E8dre; le reste de l'icosa\u00E8dre forme la pyramide pentagonale gyroallong\u00E9e, J11. Les 92 solides de Johnson ont \u00E9t\u00E9 nomm\u00E9s et d\u00E9crits par Norman Johnson en 1966. Plus g\u00E9n\u00E9ralement, une pyramide pentagonale de sommet uniforme d'ordre 2 peut \u00EAtre d\u00E9finie avec une base pentagonale r\u00E9guli\u00E8re et 5 c\u00F4t\u00E9s en forme de triangles isoc\u00E8les de hauteur quelconque."@fr . . "\u041F\u044F\u0442\u0438\u0443\u0433\u043E\u0301\u043B\u044C\u043D\u0430\u044F \u043F\u0438\u0440\u0430\u043C\u0438\u0301\u0434\u0430 \u2014 \u043F\u0438\u0440\u0430\u043C\u0438\u0434\u0430, \u0438\u043C\u0435\u044E\u0449\u0430\u044F \u043F\u044F\u0442\u0438\u0443\u0433\u043E\u043B\u044C\u043D\u043E\u0435 \u043E\u0441\u043D\u043E\u0432\u0430\u043D\u0438\u0435. \u0421\u043E\u0441\u0442\u0430\u0432\u043B\u0435\u043D\u0430 \u0438\u0437 6 \u0433\u0440\u0430\u043D\u0435\u0439: 5 \u0442\u0440\u0435\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A\u043E\u0432 \u0438 1 \u043F\u044F\u0442\u0438\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A\u0430. \u0418\u043C\u0435\u0435\u0442 10 \u0440\u0451\u0431\u0435\u0440 \u0438 6 \u0432\u0435\u0440\u0448\u0438\u043D. \u0415\u0441\u043B\u0438 \u043E\u0441\u043D\u043E\u0432\u0430\u043D\u0438\u0435 \u043F\u044F\u0442\u0438\u0443\u0433\u043E\u043B\u044C\u043D\u043E\u0439 \u043F\u0438\u0440\u0430\u043C\u0438\u0434\u044B \u2014 \u043F\u0440\u0430\u0432\u0438\u043B\u044C\u043D\u044B\u0439 \u043F\u044F\u0442\u0438\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A, \u0430 \u0431\u043E\u043A\u043E\u0432\u044B\u0435 \u0433\u0440\u0430\u043D\u0438 \u2014 \u0440\u0430\u0432\u043D\u043E\u0431\u0435\u0434\u0440\u0435\u043D\u043D\u044B\u0435 \u0442\u0440\u0435\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A\u0438, \u043F\u0438\u0440\u0430\u043C\u0438\u0434\u0430 \u044F\u0432\u043B\u044F\u0435\u0442\u0441\u044F \u043F\u0440\u0430\u0432\u0438\u043B\u044C\u043D\u043E\u0439 \u0438 \u0438\u043C\u0435\u0435\u0442 \u0433\u0440\u0443\u043F\u043F\u0443 \u0441\u0438\u043C\u043C\u0435\u0442\u0440\u0438\u0438 C5v."@ru . "Geometrian, piramide pentagonala oinarritzat pentagono bat eta beste aurpegiak triangeluarrak dituen poliedroa da. Alde triangeluarrek erpin komuna dute, goierpin deiturikoa, eta ez dago oinarriaren plano berean."@eu . . . . "Kvinlatera piramido"@eo . . . . . . "\u4E94\u89D2\u9310\uFF08\u3054\u304B\u304F\u3059\u3044\u3001\u82F1: pentagonal pyramid\uFF09\u3068\u306F\u3001\u5E95\u9762\u304C\u4E94\u89D2\u5F62\u306E\u89D2\u9310\u3067\u3042\u308B\u3002\u7279\u306B\u5E95\u9762\u304C\u6B63\u4E94\u89D2\u5F62\u3067\u3001\u982D\u9802\u70B9\u304B\u3089\u5E95\u9762\u306B\u4E0B\u308D\u3057\u305F\u5782\u7DDA\u304C\u5E95\u9762\u306E\u4E2D\u5FC3\u3067\u4EA4\u308F\u308B\u3082\u306E\u3092\u6B63\u4E94\u89D2\u9310\u3068\u3044\u3044\u3001\u305D\u306E\u5074\u9762\u306F\u4E8C\u7B49\u8FBA\u4E09\u89D2\u5F62\u3067\u3042\u308B\u3002\u6B63\u4E94\u89D2\u9310\u306E\u5185\u3001\u5074\u9762\u304C\u6B63\u4E09\u89D2\u5F62\u306E\u3082\u306E\u306F2\u756A\u76EE\u306E\u30B8\u30E7\u30F3\u30BD\u30F3\u306E\u7ACB\u4F53\u3067\u3042\u308B\u3002"@ja . "Pir\u00E2mide pentagonal"@pt . "Pir\u00E0mide pentagonal"@ca . . . . . "\u041F\u044F\u0442\u0438\u0443\u0433\u043E\u0301\u043B\u044C\u043D\u0430\u044F \u043F\u0438\u0440\u0430\u043C\u0438\u0301\u0434\u0430 \u2014 \u043F\u0438\u0440\u0430\u043C\u0438\u0434\u0430, \u0438\u043C\u0435\u044E\u0449\u0430\u044F \u043F\u044F\u0442\u0438\u0443\u0433\u043E\u043B\u044C\u043D\u043E\u0435 \u043E\u0441\u043D\u043E\u0432\u0430\u043D\u0438\u0435. \u0421\u043E\u0441\u0442\u0430\u0432\u043B\u0435\u043D\u0430 \u0438\u0437 6 \u0433\u0440\u0430\u043D\u0435\u0439: 5 \u0442\u0440\u0435\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A\u043E\u0432 \u0438 1 \u043F\u044F\u0442\u0438\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A\u0430. \u0418\u043C\u0435\u0435\u0442 10 \u0440\u0451\u0431\u0435\u0440 \u0438 6 \u0432\u0435\u0440\u0448\u0438\u043D. \u0415\u0441\u043B\u0438 \u043E\u0441\u043D\u043E\u0432\u0430\u043D\u0438\u0435 \u043F\u044F\u0442\u0438\u0443\u0433\u043E\u043B\u044C\u043D\u043E\u0439 \u043F\u0438\u0440\u0430\u043C\u0438\u0434\u044B \u2014 \u043F\u0440\u0430\u0432\u0438\u043B\u044C\u043D\u044B\u0439 \u043F\u044F\u0442\u0438\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A, \u0430 \u0431\u043E\u043A\u043E\u0432\u044B\u0435 \u0433\u0440\u0430\u043D\u0438 \u2014 \u0440\u0430\u0432\u043D\u043E\u0431\u0435\u0434\u0440\u0435\u043D\u043D\u044B\u0435 \u0442\u0440\u0435\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A\u0438, \u043F\u0438\u0440\u0430\u043C\u0438\u0434\u0430 \u044F\u0432\u043B\u044F\u0435\u0442\u0441\u044F \u043F\u0440\u0430\u0432\u0438\u043B\u044C\u043D\u043E\u0439 \u0438 \u0438\u043C\u0435\u0435\u0442 \u0433\u0440\u0443\u043F\u043F\u0443 \u0441\u0438\u043C\u043C\u0435\u0442\u0440\u0438\u0438 C5v."@ru . . "In geometry, a pentagonal pyramid is a pyramid with a pentagonal base upon which are erected five triangular faces that meet at a point (the apex). Like any pyramid, it is self-dual. The regular pentagonal pyramid has a base that is a regular pentagon and lateral faces that are equilateral triangles. It is one of the Johnson solids (J2). It can be seen as the \"lid\" of an icosahedron; the rest of the icosahedron forms a gyroelongated pentagonal pyramid, J11. More generally an order-2 vertex-uniform pentagonal pyramid can be defined with a regular pentagonal base and 5 isosceles triangle sides of any height."@en . . "Piramide pentagonal"@eu . "Pentagonal pyramid"@en . . "In geometry, a pentagonal pyramid is a pyramid with a pentagonal base upon which are erected five triangular faces that meet at a point (the apex). Like any pyramid, it is self-dual. The regular pentagonal pyramid has a base that is a regular pentagon and lateral faces that are equilateral triangles. It is one of the Johnson solids (J2). It can be seen as the \"lid\" of an icosahedron; the rest of the icosahedron forms a gyroelongated pentagonal pyramid, J11."@en . . . . "5"^^ . . "Pentagonal pyramid"@en . "Pyramide pentagonale"@fr . "1"^^ . . "Johnson solid"@en . . . . "\u4E94\u89D2\u9310"@zh . "1124773468"^^ . . . . . . . "Vijfhoekige piramide"@nl . "En geometrio, kvinlatera piramido estas piramido kun kvinlatera bazo kaj kvin triangulaj flankaj edroj. Kiel \u0109iu piramido, \u011Di estas . La regula kvinlatera piramido havas bazon kiu estas regula kvinlatero kaj flankajn edrojn kiuj estas egallateraj trianguloj. \u011Ci estas unu el la solidoj de Johnson (J2). \u011Ci povas esti konsiderata kiel la \"kovrilo\" de dudekedro; la resta parto de la dudekedro estas turnoplilongigita kvinlatera piramido (J11). Pli \u011Denerala ordo-2 vertico-uniforma kvinlatera piramido povas esti difinita kun regula kvinlatera bazo kaj 5 izocelaj triangulaj flankoj de iu ajn alto."@eo . . "Geometrian, piramide pentagonala oinarritzat pentagono bat eta beste aurpegiak triangeluarrak dituen poliedroa da. Alde triangeluarrek erpin komuna dute, goierpin deiturikoa, eta ez dago oinarriaren plano berean."@eu . . "En geometria, la pir\u00E0mide pentagonal \u00E9s una pir\u00E0mide que t\u00E9 un pent\u00E0gon a la base. Aquest pol\u00EDedre t\u00E9 6 cares, 10 arestes i 6 v\u00E8rtexs. Si el v\u00E8rtex oposat a la base pentagonal est\u00E0 sobre la perpendicular tra\u00E7ada al centra del pent\u00E0gon llavors t\u00E9 simetria C5v. Com totes les pir\u00E0mides, \u00E9s dual de si mateixa."@ca . . . . . . "6"^^ . "Em geometria, uma pir\u00E2mide pentagonal \u00E9 uma pir\u00E2mide com uma base pentagonal, onde s\u00E3o erguidos cinco faces triangulares que se conectam em um ponto. Como toda pir\u00E2mide, \u00E9 autodual. \u00C9 constitu\u00EDda por 1 pent\u00E1gono e 5 tri\u00E2ngulos. Se o pent\u00E1gono \u00E9 regular e os tri\u00E2ngulos s\u00E3o equil\u00E1teros \u00E9 um dos s\u00F3lidos de Johnson (J2). Tem 6 v\u00E9rtices, 6 faces e 10 arestas."@pt . . "self"@en . . . . "10"^^ . .