. . . . "Chiral tetartoids based on the dyakis dodecahedron in the middle"@en . . . . . . . . . . . . . . . . . . . "Een regelmatig twaalfvlak, of dodeca\u00EBder, is een ruimtelijke figuur met 12 vijfhoekige vlakken, 20 hoekpunten en 30 ribben. Het is een van de vijf regelmatige veelvlakken in drie dimensies, ook platonische lichamen genoemd. Het heeft icosahedrale symmetrie. Hoewel de naam dodeca\u00EBder evenveel wordt gebruikt als regelmatig twaalfvlak, ligt het voor de duidelijkheid voor de hand over een regelmatig twaalfvlak te spreken."@nl . . . . . . . . . . . . . "Heights 1/2 and 1/\u03C6"@en . . . "Dod\u00E9ca\u00E8dre"@fr . . . . . . . . . . . . . . "Dekduedro"@eo . . . "\u0627\u062B\u0646\u0627 \u0639\u0634\u0631\u064A \u0633\u0637\u0648\u062D"@ar . "Dodekaedro"@eu . . . . . "Dodecahedron"@en . . . . . . . . "Tetartoid light vertical .png"@en . . . . . . "In geometry, a dodecahedron (Greek \u03B4\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF\u03BD, from \u03B4\u03CE\u03B4\u03B5\u03BA\u03B1 d\u014Ddeka \"twelve\" + \u1F15\u03B4\u03C1\u03B1 h\u00E9dra \"base\", \"seat\" or \"face\") or duodecahedron is any polyhedron with twelve flat faces. The most familiar dodecahedron is the regular dodecahedron with regular pentagons as faces, which is a Platonic solid. There are also three regular star dodecahedra, which are constructed as stellations of the convex form. All of these have icosahedral symmetry, order 120. Some dodecahedra have the same combinatorial structure as the regular dodecahedron (in terms of the graph formed by its vertices and edges), but their pentagonal faces are not regular:The , a common crystal form in pyrite, has pyritohedral symmetry, while the has tetrahedral symmetry. The rhombic dodecahedron can be seen as a limiting case of the pyritohedron, and it has octahedral symmetry. The elongated dodecahedron and trapezo-rhombic dodecahedron variations, along with the rhombic dodecahedra, are space-filling. There are numerous . While the regular dodecahedron shares many features with other Platonic solids, one unique property of it is that one can start at a corner of the surface and draw an infinite number of straight lines across the figure that return to the original point without crossing over any other corner."@en . . "\u9EC4\u9244\u9271\u4F53 (\u82F1:pyritohedron) \u306F\u3001\u9EC4\u9244\u9271\u306E\u7D50\u6676\u69CB\u9020\u306B\u307F\u3089\u308C\u308B\u5341\u4E8C\u9762\u4F53\u306E\u4E00\u7A2E\u3067\u3042\u308B\u300212\u679A\u306E\u5408\u540C\u306A\u56DB\u7B49\u8FBA\u4E94\u89D2\u5F62\u306E\u9762\u3092\u6301\u3061\u300120\u500B\u306E\u9802\u70B9\u306B\u305D\u308C\u305E\u308C3\u672C\u306E\u8FBA\u304C\u4EA4\u308F\u3063\u3066\u3044\u308B (\u4E94\u89D2\u5341\u4E8C\u9762\u4F53\u306E\u4E00\u7A2E)\u3002 \u6B63\u5341\u4E8C\u9762\u4F53\u306F\u3001\u5168\u3066\u306E\u9762\u304C\u5408\u540C\u306A\u6B63\u4E94\u89D2\u5F62\u3068\u306A\u3063\u3066\u304A\u308A\u3001\u9EC4\u9244\u9271\u4F53\u306E\u7279\u6B8A\u306A\u5834\u5408\u3067\u3042\u308B\u3002"@ja . . "Regelmatig twaalfvlak"@nl . . "\u5341\u4E8C\u9762\u4F53\uFF08\u3058\u3085\u3046\u306B\u3081\u3093\u305F\u3044\u3001\u82F1: dodecahedron\uFF09\u3068\u306F\u300112\u679A\u306E\u9762\u304B\u3089\u306A\u308B\u591A\u9762\u4F53\u3067\u3042\u308B\u3002\u6700\u3082\u3088\u304F\u77E5\u3089\u308C\u308B\u5341\u4E8C\u9762\u4F53\u306F\u3001\u6B63\u591A\u9762\u4F53\u306E\u4E00\u7A2E\u3067\u3042\u308B\u6B63\u5341\u4E8C\u9762\u4F53\u3067\u3042\u308B\u3002"@ja . . . . "\u9EC4\u9244\u9271\u4F53 (\u82F1:pyritohedron) \u306F\u3001\u9EC4\u9244\u9271\u306E\u7D50\u6676\u69CB\u9020\u306B\u307F\u3089\u308C\u308B\u5341\u4E8C\u9762\u4F53\u306E\u4E00\u7A2E\u3067\u3042\u308B\u300212\u679A\u306E\u5408\u540C\u306A\u56DB\u7B49\u8FBA\u4E94\u89D2\u5F62\u306E\u9762\u3092\u6301\u3061\u300120\u500B\u306E\u9802\u70B9\u306B\u305D\u308C\u305E\u308C3\u672C\u306E\u8FBA\u304C\u4EA4\u308F\u3063\u3066\u3044\u308B (\u4E94\u89D2\u5341\u4E8C\u9762\u4F53\u306E\u4E00\u7A2E)\u3002 \u6B63\u5341\u4E8C\u9762\u4F53\u306F\u3001\u5168\u3066\u306E\u9762\u304C\u5408\u540C\u306A\u6B63\u4E94\u89D2\u5F62\u3068\u306A\u3063\u3066\u304A\u308A\u3001\u9EC4\u9244\u9271\u4F53\u306E\u7279\u6B8A\u306A\u5834\u5408\u3067\u3042\u308B\u3002"@ja . "\u0414\u0432\u0430\u043D\u0430\u0434\u0446\u044F\u0442\u0438\u0433\u0440\u0430\u043D\u043D\u0438\u043A"@uk . "Dodekaeder (av grekiskans dodeka, tolv, och hedra, s\u00E4te, grundyta) \u00E4r en polyeder vars sidor utg\u00F6rs av tolv liksidiga pentagoner. Dodekaedern \u00E4r den fj\u00E4rde av de fem platonska kropparna. Den har 20 tretaliga h\u00F6rn och 30 kanter (att ett h\u00F6rn \u00E4r tretaligt betyder att det utg\u00E5r tre kantlinjer fr\u00E5n det). En regelbunden dodekaeder har Schl\u00E4fli-symbolen . Den dihedrala vinkeln (vinkeln mellan tv\u00E5 plan) \u00E4r \u03C0 \u2212 arctan(2), cirka 116,56\u00B0."@sv . . "In geometry, a dodecahedron (Greek \u03B4\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF\u03BD, from \u03B4\u03CE\u03B4\u03B5\u03BA\u03B1 d\u014Ddeka \"twelve\" + \u1F15\u03B4\u03C1\u03B1 h\u00E9dra \"base\", \"seat\" or \"face\") or duodecahedron is any polyhedron with twelve flat faces. The most familiar dodecahedron is the regular dodecahedron with regular pentagons as faces, which is a Platonic solid. There are also three regular star dodecahedra, which are constructed as stellations of the convex form. All of these have icosahedral symmetry, order 120."@en . . . . . . "Dekduedro estas iu pluredro kun 12 edroj, sed kutime estas subkomprenata la regula dekduedro kiu estas platona solido komponita el 12 du regulaj kvinlateraj edroj, el kiuj tri kuni\u011Das je \u0109iu vertico. \u011Ci havas 20 verticojn kaj 30 randojn. \u011Cia estas la dudekedro."@eo . . "\u4E94\u89D2\u5341\u4E8C\u9762\u9AD4"@zh . . . "October 2020"@en . "Tetartoid dark vertical .png"@en . . . . "\u5728\u5E7E\u4F55\u5B78\u4E2D\uFF0C\u5341\u4E8C\u9762\u9AD4\u662F\u6307\u7531\u5341\u4E8C\u500B\u9762\u7D44\u6210\u7684\u591A\u9762\u9AD4\uFF0C\u800C\u7531\u5341\u4E8C\u500B\u5168\u7B49\u7684\u6B63\u4E94\u908A\u5F62\u7D44\u6210\u7684\u5341\u4E8C\u9762\u9AD4\u7A31\u70BA\u6B63\u5341\u4E8C\u9762\u9AD4\u3002 \u5341\u4E8C\u500B\u9762\u7684\u591A\u9762\u9AD4\u53EF\u4EE5\u662F\u6B63\u5341\u4E8C\u9762\u9AD4\u3001\u83F1\u5F62\u5341\u4E8C\u9762\u9AD4\u3001\u6B63\u4E94\u89D2\u5E33\u5854\u3001\u96D9\u56DB\u89D2\u9310\u67F1\u3001\u626D\u7A1C\u9365\u5F62\u9AD4\u3001\u5341\u4E00\u89D2\u9310\u3001\u5341\u89D2\u67F1\u3002 \u5728\u8A31\u591A\u60C5\u6CC1\u4E0B\uFF0C\u5E38\u7528\u300C\u5341\u4E8C\u9762\u9AD4\u300D\u4E00\u8A5E\u4F86\u4EE3\u8868\u6B63\u5341\u4E8C\u9762\u9AD4\u3002"@zh . "Pravideln\u00FD dvan\u00E1ctist\u011Bn (dodekaedr) je trojrozm\u011Brn\u00E9 t\u011Bleso v prostoru, jeho\u017E st\u011Bny tvo\u0159\u00ED 12 stejn\u00FDch pravideln\u00FDch p\u011Bti\u00FAheln\u00EDk\u016F. M\u00E1 20 roh\u016F a 30 hran. Rozvinut\u00FD pl\u00E1\u0161\u0165 dvan\u00E1ctist\u011Bnu.\u010Cerven\u00E1 \u010D\u00E1ra ozna\u010Duje hrany, na kter\u00FDch mus\u00ED b\u00FDt chlopn\u011B, aby bylo mo\u017En\u00E9 slepit model dvan\u00E1ctist\u011Bnu. Pat\u0159\u00ED mezi mnohost\u011Bny, speci\u00E1ln\u011B mezi takzvan\u00E1 plat\u00F3nsk\u00E1 t\u011Blesa."@cs . . . . . . . . . . "Dekduedro estas iu pluredro kun 12 edroj, sed kutime estas subkomprenata la regula dekduedro kiu estas platona solido komponita el 12 du regulaj kvinlateraj edroj, el kiuj tri kuni\u011Das je \u0109iu vertico. \u011Ci havas 20 verticojn kaj 30 randojn. \u011Cia estas la dudekedro."@eo . . . . "left"@en . . "Tetartoid cube.png"@en . . "Na geometria, um dodecaedro (do grego \u03B4\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF\u03BD, doze faces) \u00E9 qualquer poliedro que tenha doze faces. O mais familiar \u00E9 o dodecaedro regular, um s\u00F3lido plat\u00F4nico constitu\u00EDdo por doze pent\u00E1gonos regulares."@pt . . . "Polyhedron pyritohedron from blue max.png"@en . . . . . . "Un dodecaedro (del griego \u03B4\u03C9\u03B4\u03B5\u03BA\u03B1\u03B5\u03B4\u03C1\u03BF\u03BD d\u014Ddek\u00E1edron, de \u03B4\u03CE\u03B4\u03B5\u03BA\u03B1 d\u014Ddeka, \u2018doce\u2019 y \u1F15\u03B4\u03C1\u03B1 edra; \u2018cara\u2019) es un poliedro de doce caras, convexo o . Sus caras han de ser pol\u00EDgonos de once lados o menos. Si las doce caras del dodecaedro son pent\u00E1gonos regulares, iguales entre s\u00ED, el dodecaedro es convexo y se denomina 'regular', siendo entonces uno de los llamados s\u00F3lidos plat\u00F3nicos. Recientes investigaciones cient\u00EDficas han propuesto que el espacio dodeca\u00E9drico de Poincar\u00E9 ser\u00EDa la forma del Universo\u200B\u200B\u200B y en el a\u00F1o 2008 se estim\u00F3 la orientaci\u00F3n \u00F3ptima del modelo en el cielo.\u200B"@es . . . . . . . . . . . "Orthographic projections of the pyritohedron with h = 1/2"@en . . . . "Das Dodekaeder [\u02CCdodeka\u02C8\u0294e\u02D0d\u0250] (von griech. Zw\u00F6lffl\u00E4chner; dt. auch (das) Zw\u00F6lfflach) ist ein K\u00F6rper mit zw\u00F6lf Fl\u00E4chen. In der Regel ist damit ein platonischer K\u00F6rper gemeint, n\u00E4mlich das regelm\u00E4\u00DFige Pentagondodekaeder, ein K\u00F6rper mit \n* 12 kongruenten regelm\u00E4\u00DFigen F\u00FCnfecken \n* 30 gleich langen Kanten, von denen jede die Seite von zwei F\u00FCnfecken ist \n* 20 Ecken, in denen jeweils drei dieser F\u00FCnfecke zusammentreffen Es gibt aber auch von hoher Symmetrie."@de . "\u0414\u0432\u0435\u043D\u0430\u0434\u0446\u0430\u0442\u0438\u0433\u0440\u0430\u0301\u043D\u043D\u0438\u043A \u2014 \u043C\u043D\u043E\u0433\u043E\u0433\u0440\u0430\u043D\u043D\u0438\u043A \u0441 \u0434\u0432\u0435\u043D\u0430\u0434\u0446\u0430\u0442\u044C\u044E \u0433\u0440\u0430\u043D\u044F\u043C\u0438. \u0421\u0443\u0449\u0435\u0441\u0442\u0432\u0443\u0435\u0442 \u043D\u0435\u0441\u043A\u043E\u043B\u044C\u043A\u043E \u043E\u0431\u044A\u0451\u043C\u043D\u044B\u0445 \u0444\u0438\u0433\u0443\u0440 \u0441 \u0434\u0432\u0435\u043D\u0430\u0434\u0446\u0430\u0442\u044C\u044E \u0433\u0440\u0430\u043D\u044F\u043C\u0438."@ru . . . . . . . . "Dvan\u00E1ctist\u011Bn"@cs . . . "320"^^ . "\u041F\u0435\u043D\u0442\u0430\u0433\u043E\u0301\u043D\u0434\u043E\u0434\u0435\u043A\u0430\u0301\u044D\u0434\u0440 (\u043E\u0442 \u0434\u0440.-\u0433\u0440\u0435\u0447. \u03C0\u03B5\u03BD\u03C4\u03B1\u03B3\u03BF\u03BD \u2014 \u00AB\u043F\u044F\u0442\u0438\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A\u00BB + \u03B4\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF\u03BD \u2014 \u00AB\u0434\u0432\u0435\u043D\u0430\u0434\u0446\u0430\u0442\u0438\u0433\u0440\u0430\u043D\u043D\u0438\u043A\u00BB) \u2014 \u043E\u0431\u044A\u0451\u043C\u043D\u0430\u044F \u0444\u0438\u0433\u0443\u0440\u0430 \u0441 \u0434\u0432\u0435\u043D\u0430\u0434\u0446\u0430\u0442\u044C\u044E \u0433\u0440\u0430\u043D\u044F\u043C\u0438 \u0432 \u0444\u043E\u0440\u043C\u0435 \u043D\u0435\u043F\u0440\u0430\u0432\u0438\u043B\u044C\u043D\u044B\u0445 \u043F\u044F\u0442\u0438\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A\u043E\u0432."@ru . . "\u0394\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF"@el . . . . . . . . . . . . "\u0645\u062A\u0639\u062F\u062F \u0627\u0644\u0633\u0637\u0648\u062D \u0627\u0644\u0627\u062B\u0646\u0627 \u0639\u0634\u0631\u064A \u0623\u0648 \u0645\u062A\u0639\u062F\u062F \u0627\u0644\u0623\u0648\u062C\u0647 \u0627\u0644\u0627\u062B\u0646\u0627 \u0639\u0634\u0631\u064A (\u0628\u0627\u0644\u0625\u0646\u062C\u0644\u064A\u0632\u064A\u0629: Dodecahedron)\u200F \u0641\u064A \u0627\u0644\u0647\u0646\u062F\u0633\u0629 \u0627\u0644\u0631\u064A\u0627\u0636\u064A\u0629 \u0639\u0628\u0627\u0631\u0629 \u0639\u0646 \u0645\u062A\u0639\u062F\u062F \u0633\u0637\u0648\u062D \u0644\u0647 \u0627\u062B\u0646\u0627 \u0639\u0634\u0631 \u0633\u0637\u062D\u0627\u064B \u0623\u0648 \u0648\u062C\u0647\u0627\u064B\u060C \u0644\u0643\u0646 \u063A\u0627\u0644\u0628\u0627 \u0645\u0627 \u064A\u0642\u0635\u062F \u0628\u0647 \u0627\u0644\u0634\u0643\u0644 \u0627\u0644\u0645\u0646\u062A\u0638\u0645\u060C \u0623\u064A \u0623\u0646 \u064A\u0643\u0648\u0646 \u0645\u0624\u0644\u0641\u0627 \u0645\u0646 \u0627\u062B\u0646\u064A \u0639\u0634\u0631 \u062E\u0645\u0627\u0633\u064A \u0623\u0636\u0644\u0627\u0639."@ar . "\u5728\u5E7E\u4F55\u5B78\u4E2D\uFF0C\u4E94\u89D2\u5341\u4E8C\u9762\u9AD4\uFF08Pentagonal dodecahedron\u6216Pyritohedron\uFF09\u662F\u4E00\u7A2E\u753112\u500B\u4E0D\u7B49\u908A\u4E94\u908A\u5F62\u7D44\u6210\u7684\u5341\u4E8C\u9762\u9AD4\uFF0C\u5177\u6709\u56DB\u9762\u9AD4\u7FA4\u5C0D\u7A31\u6027\u3002\u5176\u8207\u6B63\u5341\u4E8C\u9762\u9AD4\u985E\u4F3C\uFF0C\u7686\u662F\u753112\u500B\u5168\u7B49\u7684\u4E94\u908A\u5F62\u7D44\u6210\uFF0C\u4E14\u6BCF\u500B\u9802\u9EDE\u90FD\u662F3\u500B\u4E94\u908A\u5F62\u7684\u516C\u5171\u9802\u9EDE\uFF0C\u4F46\u7531\u65BC\u5176\u9762\u4E0D\u662F\u6B63\u591A\u908A\u5F62\uFF0C\u5176\u9802\u9EDE\u7684\u6392\u4F48\u672A\u80FD\u9054\u5230\u4E94\u647A\u5C0D\u7A31\u6027\uFF0C\u56E0\u6B64\u4E0D\u5C6C\u65BC\u6B63\u591A\u9762\u9AD4\u3002\u90E8\u5206\u7684\u5316\u5B78\u7269\u8CEA\u6216\u7926\u77F3\u5176\u6676\u9AD4\u5F62\u72C0\u662F\u9019\u7A2E\u5F62\u72C0\uFF0C\u4F8B\u5982\u9EC4\u94C1\u77FF\u548C\u90E8\u5206\u7684\u5929\u7136\u6C23\u6C34\u5408\u7269\u3002\u5176\u82F1\u6587\u540D\u7A31Pyritohedron\u662F\u4F86\u81EA\u9EC4\u94C1\u77FF\u7684\u82F1\u6587pyrite\u4EE5\u53CA\u591A\u9762\u9AD4\u7684\u5B57\u5C3E-hedron\u547D\u540D\u7684\u3002"@zh . . "Pyrite-184681.jpg"@en . . . "Pravideln\u00FD dvan\u00E1ctist\u011Bn (dodekaedr) je trojrozm\u011Brn\u00E9 t\u011Bleso v prostoru, jeho\u017E st\u011Bny tvo\u0159\u00ED 12 stejn\u00FDch pravideln\u00FDch p\u011Bti\u00FAheln\u00EDk\u016F. M\u00E1 20 roh\u016F a 30 hran. Rozvinut\u00FD pl\u00E1\u0161\u0165 dvan\u00E1ctist\u011Bnu.\u010Cerven\u00E1 \u010D\u00E1ra ozna\u010Duje hrany, na kter\u00FDch mus\u00ED b\u00FDt chlopn\u011B, aby bylo mo\u017En\u00E9 slepit model dvan\u00E1ctist\u011Bnu. Pat\u0159\u00ED mezi mnohost\u011Bny, speci\u00E1ln\u011B mezi takzvan\u00E1 plat\u00F3nsk\u00E1 t\u011Blesa."@cs . . . . "Dodec\u00E0edre"@ca . . "\u5341\u4E8C\u9762\u9AD4"@zh . . "300"^^ . . . . . "278"^^ . "28454"^^ . . "\u0394\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF \u03C3\u03C4\u03B7 \u03C3\u03C4\u03B5\u03C1\u03B5\u03BF\u03BC\u03B5\u03C4\u03C1\u03AF\u03B1 \u03BB\u03AD\u03B3\u03B5\u03C4\u03B1\u03B9 \u03AD\u03BD\u03B1 \u03C0\u03BF\u03BB\u03CD\u03B5\u03B4\u03C1\u03BF \u03C0\u03BF\u03C5 \u03AD\u03C7\u03B5\u03B9 \u03B4\u03CE\u03B4\u03B5\u03BA\u03B1 . \u03A4\u03BF \u03BA\u03B1\u03BD\u03BF\u03BD\u03B9\u03BA\u03CC \u03B4\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF \u03B5\u03AF\u03BD\u03B1\u03B9 \u03AD\u03BD\u03B1 \u03B1\u03C0\u03CC \u03C4\u03B1 \u03A0\u03BB\u03B1\u03C4\u03C9\u03BD\u03B9\u03BA\u03AC \u03C3\u03C4\u03B5\u03C1\u03B5\u03AC, \u03C0\u03BF\u03C5 \u03AD\u03C7\u03B5\u03B9 \u03C9\u03C2 \u03AD\u03B4\u03C1\u03B5\u03C2 \u03B4\u03CE\u03B4\u03B5\u03BA\u03B1 \u03BA\u03B1\u03BD\u03BF\u03BD\u03B9\u03BA\u03AC \u03C0\u03B5\u03BD\u03C4\u03AC\u03B3\u03C9\u03BD\u03B1, \u03C4\u03B1 \u03BF\u03C0\u03BF\u03AF\u03B1 \u03B5\u03BD\u03CE\u03BD\u03BF\u03BD\u03C4\u03B1\u03B9 \u03B1\u03BD\u03AC \u03C4\u03C1\u03AF\u03B1 \u03C3\u03B5 \u03BA\u03AC\u03B8\u03B5 \u03BA\u03BF\u03C1\u03C5\u03C6\u03AE \u03C4\u03BF\u03C5. \u039F \u0395\u03C5\u03BA\u03BB\u03B5\u03AF\u03B4\u03B7\u03C2 \u03B1\u03C3\u03C7\u03BF\u03BB\u03B5\u03AF\u03C4\u03B1\u03B9 \u03BC\u03B5 \u03C4\u03BF \u03BA\u03B1\u03BD\u03BF\u03BD\u03B9\u03BA\u03CC \u03B4\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF \u03C3\u03C4\u03B7\u03BD \u03A0\u03C1\u03CC\u03C4\u03B1\u03C3\u03B7 17 \u03C4\u03BF\u03C5 13\u03BF\u03C5 \u03B2\u03B9\u03B2\u03BB\u03AF\u03BF\u03C5 \u03C4\u03C9\u03BD \u03A3\u03C4\u03BF\u03B9\u03C7\u03B5\u03AF\u03C9\u03BD \u03C4\u03BF\u03C5 (XXIII.17). \u0395\u03BA\u03C4\u03CC\u03C2 \u03B1\u03C0\u03CC \u03C4\u03BF \u03BA\u03B1\u03BD\u03BF\u03BD\u03B9\u03BA\u03CC \u03B4\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF, \u03AC\u03BB\u03BB\u03B1 \u03B4\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03B1 \u03B5\u03AF\u03BD\u03B1\u03B9 \u03C4\u03BF \u03C1\u03BF\u03BC\u03B2\u03B9\u03BA\u03CC \u03B4\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF, \u03C4\u03BF \u03B4\u03B5\u03BA\u03B1\u03B3\u03C9\u03BD\u03B9\u03BA\u03CC \u03C0\u03C1\u03AF\u03C3\u03BC\u03B1, \u03C4\u03BF \u03C0\u03B5\u03BD\u03C4\u03B1\u03B3\u03C9\u03BD\u03B9\u03BA\u03CC \u03B1\u03BD\u03C4\u03B9\u03C0\u03C1\u03AF\u03C3\u03BC\u03B1 \u03BA.\u03AC."@el . . "\u5341\u4E8C\u9762\u4F53"@ja . . . . "\uC2ED\uC774\uBA74\uCCB4"@ko . . "Tetartoid tetrahedron.png"@en . "Tetartoid from red.png"@en . . "In geometria solida il dodecaedro \u00E8 un poliedro con dodici facce. Generalmente con questo termine si intende per\u00F2 il dodecaedro regolare: nel dodecaedro regolare le facce sono pentagoni regolari che si incontrano in ogni vertice a gruppi di tre."@it . . "\u0414\u0432\u0430\u043D\u0430\u0434\u0446\u044F\u0442\u0438\u0433\u0440\u0430\u043D\u043D\u0438\u043A (\u0434\u043E\u0434\u0435\u043A\u0430\u0435\u0434\u0440) \u2014 \u043C\u043D\u043E\u0433\u043E\u0433\u0440\u0430\u043D\u043D\u0438\u043A \u0437 \u0434\u0432\u0430\u043D\u0430\u0434\u0446\u044F\u0442\u044C\u043C\u0430 \u0433\u0440\u0430\u043D\u044F\u043C\u0438. \u0406\u0441\u043D\u0443\u0454 \u043A\u0456\u043B\u044C\u043A\u0430 \u043E\u0431'\u0454\u043C\u043D\u0438\u0445 \u0444\u0456\u0433\u0443\u0440 \u0437 \u0434\u0432\u0430\u043D\u0430\u0434\u0446\u044F\u0442\u044C\u043C\u0430 \u0433\u0440\u0430\u043D\u044F\u043C\u0438."@uk . . . "\u0645\u062A\u0639\u062F\u062F \u0627\u0644\u0633\u0637\u0648\u062D \u0627\u0644\u0627\u062B\u0646\u0627 \u0639\u0634\u0631\u064A \u0623\u0648 \u0645\u062A\u0639\u062F\u062F \u0627\u0644\u0623\u0648\u062C\u0647 \u0627\u0644\u0627\u062B\u0646\u0627 \u0639\u0634\u0631\u064A (\u0628\u0627\u0644\u0625\u0646\u062C\u0644\u064A\u0632\u064A\u0629: Dodecahedron)\u200F \u0641\u064A \u0627\u0644\u0647\u0646\u062F\u0633\u0629 \u0627\u0644\u0631\u064A\u0627\u0636\u064A\u0629 \u0639\u0628\u0627\u0631\u0629 \u0639\u0646 \u0645\u062A\u0639\u062F\u062F \u0633\u0637\u0648\u062D \u0644\u0647 \u0627\u062B\u0646\u0627 \u0639\u0634\u0631 \u0633\u0637\u062D\u0627\u064B \u0623\u0648 \u0648\u062C\u0647\u0627\u064B\u060C \u0644\u0643\u0646 \u063A\u0627\u0644\u0628\u0627 \u0645\u0627 \u064A\u0642\u0635\u062F \u0628\u0647 \u0627\u0644\u0634\u0643\u0644 \u0627\u0644\u0645\u0646\u062A\u0638\u0645\u060C \u0623\u064A \u0623\u0646 \u064A\u0643\u0648\u0646 \u0645\u0624\u0644\u0641\u0627 \u0645\u0646 \u0627\u062B\u0646\u064A \u0639\u0634\u0631 \u062E\u0645\u0627\u0633\u064A \u0623\u0636\u0644\u0627\u0639."@ar . . . "\u0394\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF \u03C3\u03C4\u03B7 \u03C3\u03C4\u03B5\u03C1\u03B5\u03BF\u03BC\u03B5\u03C4\u03C1\u03AF\u03B1 \u03BB\u03AD\u03B3\u03B5\u03C4\u03B1\u03B9 \u03AD\u03BD\u03B1 \u03C0\u03BF\u03BB\u03CD\u03B5\u03B4\u03C1\u03BF \u03C0\u03BF\u03C5 \u03AD\u03C7\u03B5\u03B9 \u03B4\u03CE\u03B4\u03B5\u03BA\u03B1 . \u03A4\u03BF \u03BA\u03B1\u03BD\u03BF\u03BD\u03B9\u03BA\u03CC \u03B4\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF \u03B5\u03AF\u03BD\u03B1\u03B9 \u03AD\u03BD\u03B1 \u03B1\u03C0\u03CC \u03C4\u03B1 \u03A0\u03BB\u03B1\u03C4\u03C9\u03BD\u03B9\u03BA\u03AC \u03C3\u03C4\u03B5\u03C1\u03B5\u03AC, \u03C0\u03BF\u03C5 \u03AD\u03C7\u03B5\u03B9 \u03C9\u03C2 \u03AD\u03B4\u03C1\u03B5\u03C2 \u03B4\u03CE\u03B4\u03B5\u03BA\u03B1 \u03BA\u03B1\u03BD\u03BF\u03BD\u03B9\u03BA\u03AC \u03C0\u03B5\u03BD\u03C4\u03AC\u03B3\u03C9\u03BD\u03B1, \u03C4\u03B1 \u03BF\u03C0\u03BF\u03AF\u03B1 \u03B5\u03BD\u03CE\u03BD\u03BF\u03BD\u03C4\u03B1\u03B9 \u03B1\u03BD\u03AC \u03C4\u03C1\u03AF\u03B1 \u03C3\u03B5 \u03BA\u03AC\u03B8\u03B5 \u03BA\u03BF\u03C1\u03C5\u03C6\u03AE \u03C4\u03BF\u03C5. \u039F \u0395\u03C5\u03BA\u03BB\u03B5\u03AF\u03B4\u03B7\u03C2 \u03B1\u03C3\u03C7\u03BF\u03BB\u03B5\u03AF\u03C4\u03B1\u03B9 \u03BC\u03B5 \u03C4\u03BF \u03BA\u03B1\u03BD\u03BF\u03BD\u03B9\u03BA\u03CC \u03B4\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF \u03C3\u03C4\u03B7\u03BD \u03A0\u03C1\u03CC\u03C4\u03B1\u03C3\u03B7 17 \u03C4\u03BF\u03C5 13\u03BF\u03C5 \u03B2\u03B9\u03B2\u03BB\u03AF\u03BF\u03C5 \u03C4\u03C9\u03BD \u03A3\u03C4\u03BF\u03B9\u03C7\u03B5\u03AF\u03C9\u03BD \u03C4\u03BF\u03C5 (XXIII.17). \u0395\u03BA\u03C4\u03CC\u03C2 \u03B1\u03C0\u03CC \u03C4\u03BF \u03BA\u03B1\u03BD\u03BF\u03BD\u03B9\u03BA\u03CC \u03B4\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF, \u03AC\u03BB\u03BB\u03B1 \u03B4\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03B1 \u03B5\u03AF\u03BD\u03B1\u03B9 \u03C4\u03BF \u03C1\u03BF\u03BC\u03B2\u03B9\u03BA\u03CC \u03B4\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF, \u03C4\u03BF \u03B4\u03B5\u03BA\u03B1\u03B3\u03C9\u03BD\u03B9\u03BA\u03CC \u03C0\u03C1\u03AF\u03C3\u03BC\u03B1, \u03C4\u03BF \u03C0\u03B5\u03BD\u03C4\u03B1\u03B3\u03C9\u03BD\u03B9\u03BA\u03CC \u03B1\u03BD\u03C4\u03B9\u03C0\u03C1\u03AF\u03C3\u03BC\u03B1 \u03BA.\u03AC."@el . . "Dodekaeder (av grekiskans dodeka, tolv, och hedra, s\u00E4te, grundyta) \u00E4r en polyeder vars sidor utg\u00F6rs av tolv liksidiga pentagoner. Dodekaedern \u00E4r den fj\u00E4rde av de fem platonska kropparna. Den har 20 tretaliga h\u00F6rn och 30 kanter (att ett h\u00F6rn \u00E4r tretaligt betyder att det utg\u00E5r tre kantlinjer fr\u00E5n det). En regelbunden dodekaeder har Schl\u00E4fli-symbolen . Den dihedrala vinkeln (vinkeln mellan tv\u00E5 plan) \u00E4r \u03C0 \u2212 arctan(2), cirka 116,56\u00B0."@sv . "Dodecaedro"@it . . . . . . . . "Tetartoid from green.png"@en . "Polyhedron pyritohedron from yellow max.png"@en . . "1114246108"^^ . . . . . . . . . . "\u0414\u0432\u0435\u043D\u0430\u0434\u0446\u0430\u0442\u0438\u0433\u0440\u0430\u0301\u043D\u043D\u0438\u043A \u2014 \u043C\u043D\u043E\u0433\u043E\u0433\u0440\u0430\u043D\u043D\u0438\u043A \u0441 \u0434\u0432\u0435\u043D\u0430\u0434\u0446\u0430\u0442\u044C\u044E \u0433\u0440\u0430\u043D\u044F\u043C\u0438. \u0421\u0443\u0449\u0435\u0441\u0442\u0432\u0443\u0435\u0442 \u043D\u0435\u0441\u043A\u043E\u043B\u044C\u043A\u043E \u043E\u0431\u044A\u0451\u043C\u043D\u044B\u0445 \u0444\u0438\u0433\u0443\u0440 \u0441 \u0434\u0432\u0435\u043D\u0430\u0434\u0446\u0430\u0442\u044C\u044E \u0433\u0440\u0430\u043D\u044F\u043C\u0438."@ru . . . . . . . . . . "Image should be replaced by one with the specified height."@en . . . "Polyhedron pyritohedron from red max.png"@en . "Dodekaedroa poliedro erregular bat da hamabi aurpegi dituena. Dodekaedroa erregularra da hamabi pentagono erregularrez osatuta dagoenean. 20 erpin, 12 aurpegi eta 30 ertz ditu."@eu . . . . . . . "Un dodecaedro (del griego \u03B4\u03C9\u03B4\u03B5\u03BA\u03B1\u03B5\u03B4\u03C1\u03BF\u03BD d\u014Ddek\u00E1edron, de \u03B4\u03CE\u03B4\u03B5\u03BA\u03B1 d\u014Ddeka, \u2018doce\u2019 y \u1F15\u03B4\u03C1\u03B1 edra; \u2018cara\u2019) es un poliedro de doce caras, convexo o . Sus caras han de ser pol\u00EDgonos de once lados o menos. Si las doce caras del dodecaedro son pent\u00E1gonos regulares, iguales entre s\u00ED, el dodecaedro es convexo y se denomina 'regular', siendo entonces uno de los llamados s\u00F3lidos plat\u00F3nicos. Recientes investigaciones cient\u00EDficas han propuesto que el espacio dodeca\u00E9drico de Poincar\u00E9 ser\u00EDa la forma del Universo\u200B\u200B\u200B y en el a\u00F1o 2008 se estim\u00F3 la orientaci\u00F3n \u00F3ptima del modelo en el cielo.\u200B"@es . "440"^^ . . . . . . . . . "Dodecaedro"@pt . . "\uC2ED\uC774\uBA74\uCCB4(\u5341\u4E8C\u9762\u9AD4)\uB294 \uBA74\uC774 12\uAC1C\uC778 \uB2E4\uBA74\uCCB4\uB97C \uB9D0\uD55C\uB2E4. \uB300\uD45C\uC801\uC778 \uC885\uB958\uB85C\uB294 \uC815\uC2ED\uC774\uBA74\uCCB4\uC640 \uC624\uAC01\uC9C0\uBD95\uC774 \uC788\uB2E4. \uC774 \uBC16\uC5D0\uB3C4 \uACFC , , \uADF8\uB9AC\uACE0 \uC5C7\uC624\uAC01\uAE30\uB465 \uB4F1\uC774 \uC788\uB2E4. \uB610\uD55C \uC624\uBAA9\uD55C \uC815\uB2E4\uBA74\uCCB4 \uC911\uC5D0\uC11C\uB294 \uC791\uC740 \uBCC4\uBAA8\uC591 \uC2ED\uC774\uBA74\uCCB4\uC640 \uD070 \uC2ED\uC774\uBA74\uCCB4, \uD070 \uBCC4\uBAA8\uC591 \uC2ED\uC774\uBA74\uCCB4\uC774\uB2E4."@ko . "Disdyakis 12 untruncated to dyakis 12 vertical.png"@en . "Polyhedron 12 pyritohedral max.png"@en . . . "\u0414\u0432\u0435\u043D\u0430\u0434\u0446\u0430\u0442\u0438\u0433\u0440\u0430\u043D\u043D\u0438\u043A\u0438"@ru . . . . . "Dodekaeder"@de . "\u041F\u0435\u043D\u0442\u0430\u0433\u043E\u0301\u043D\u0434\u043E\u0434\u0435\u043A\u0430\u0301\u044D\u0434\u0440 (\u043E\u0442 \u0434\u0440.-\u0433\u0440\u0435\u0447. \u03C0\u03B5\u03BD\u03C4\u03B1\u03B3\u03BF\u03BD \u2014 \u00AB\u043F\u044F\u0442\u0438\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A\u00BB + \u03B4\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF\u03BD \u2014 \u00AB\u0434\u0432\u0435\u043D\u0430\u0434\u0446\u0430\u0442\u0438\u0433\u0440\u0430\u043D\u043D\u0438\u043A\u00BB) \u2014 \u043E\u0431\u044A\u0451\u043C\u043D\u0430\u044F \u0444\u0438\u0433\u0443\u0440\u0430 \u0441 \u0434\u0432\u0435\u043D\u0430\u0434\u0446\u0430\u0442\u044C\u044E \u0433\u0440\u0430\u043D\u044F\u043C\u0438 \u0432 \u0444\u043E\u0440\u043C\u0435 \u043D\u0435\u043F\u0440\u0430\u0432\u0438\u043B\u044C\u043D\u044B\u0445 \u043F\u044F\u0442\u0438\u0443\u0433\u043E\u043B\u044C\u043D\u0438\u043A\u043E\u0432."@ru . . . . . "\uC2ED\uC774\uBA74\uCCB4(\u5341\u4E8C\u9762\u9AD4)\uB294 \uBA74\uC774 12\uAC1C\uC778 \uB2E4\uBA74\uCCB4\uB97C \uB9D0\uD55C\uB2E4. \uB300\uD45C\uC801\uC778 \uC885\uB958\uB85C\uB294 \uC815\uC2ED\uC774\uBA74\uCCB4\uC640 \uC624\uAC01\uC9C0\uBD95\uC774 \uC788\uB2E4. \uC774 \uBC16\uC5D0\uB3C4 \uACFC , , \uADF8\uB9AC\uACE0 \uC5C7\uC624\uAC01\uAE30\uB465 \uB4F1\uC774 \uC788\uB2E4. \uB610\uD55C \uC624\uBAA9\uD55C \uC815\uB2E4\uBA74\uCCB4 \uC911\uC5D0\uC11C\uB294 \uC791\uC740 \uBCC4\uBAA8\uC591 \uC2ED\uC774\uBA74\uCCB4\uC640 \uD070 \uC2ED\uC774\uBA74\uCCB4, \uD070 \uBCC4\uBAA8\uC591 \uC2ED\uC774\uBA74\uCCB4\uC774\uB2E4."@ko . . "Een regelmatig twaalfvlak, of dodeca\u00EBder, is een ruimtelijke figuur met 12 vijfhoekige vlakken, 20 hoekpunten en 30 ribben. Het is een van de vijf regelmatige veelvlakken in drie dimensies, ook platonische lichamen genoemd. Het heeft icosahedrale symmetrie. Hoewel de naam dodeca\u00EBder evenveel wordt gebruikt als regelmatig twaalfvlak, ligt het voor de duidelijkheid voor de hand over een regelmatig twaalfvlak te spreken."@nl . "Un dodec\u00E0edre o dodecaedre (ambdues variants s\u00F3n acceptades) \u00E9s un pol\u00EDedre regular de dotze cares. El dodec\u00E0edre \u00E9s regular quan est\u00E0 format per dotze pent\u00E0gons regulars. T\u00E9 20 v\u00E8rtexs i 30 arestes."@ca . . "En g\u00E9om\u00E9trie, un dod\u00E9ca\u00E8dre est un poly\u00E8dre \u00E0 douze faces. Puisque chaque face a au moins trois c\u00F4t\u00E9s et que chaque ar\u00EAte borde deux faces, un dod\u00E9ca\u00E8dre a au moins 18 ar\u00EAtes."@fr . . . . . "\u0414\u0432\u0430\u043D\u0430\u0434\u0446\u044F\u0442\u0438\u0433\u0440\u0430\u043D\u043D\u0438\u043A (\u0434\u043E\u0434\u0435\u043A\u0430\u0435\u0434\u0440) \u2014 \u043C\u043D\u043E\u0433\u043E\u0433\u0440\u0430\u043D\u043D\u0438\u043A \u0437 \u0434\u0432\u0430\u043D\u0430\u0434\u0446\u044F\u0442\u044C\u043C\u0430 \u0433\u0440\u0430\u043D\u044F\u043C\u0438. \u0406\u0441\u043D\u0443\u0454 \u043A\u0456\u043B\u044C\u043A\u0430 \u043E\u0431'\u0454\u043C\u043D\u0438\u0445 \u0444\u0456\u0433\u0443\u0440 \u0437 \u0434\u0432\u0430\u043D\u0430\u0434\u0446\u044F\u0442\u044C\u043C\u0430 \u0433\u0440\u0430\u043D\u044F\u043C\u0438."@uk . . . . . . . . . "550"^^ . . "En g\u00E9om\u00E9trie, un dod\u00E9ca\u00E8dre est un poly\u00E8dre \u00E0 douze faces. Puisque chaque face a au moins trois c\u00F4t\u00E9s et que chaque ar\u00EAte borde deux faces, un dod\u00E9ca\u00E8dre a au moins 18 ar\u00EAtes."@fr . . . . . . . "Pyrite-193871_angles.jpg"@en . "\u9EC4\u9244\u9271\u4F53"@ja . . "Na geometria, um dodecaedro (do grego \u03B4\u03C9\u03B4\u03B5\u03BA\u03AC\u03B5\u03B4\u03C1\u03BF\u03BD, doze faces) \u00E9 qualquer poliedro que tenha doze faces. O mais familiar \u00E9 o dodecaedro regular, um s\u00F3lido plat\u00F4nico constitu\u00EDdo por doze pent\u00E1gonos regulares."@pt . . . . . "Dodekaeder"@sv . . . . . . . "Das Dodekaeder [\u02CCdodeka\u02C8\u0294e\u02D0d\u0250] (von griech. Zw\u00F6lffl\u00E4chner; dt. auch (das) Zw\u00F6lfflach) ist ein K\u00F6rper mit zw\u00F6lf Fl\u00E4chen. In der Regel ist damit ein platonischer K\u00F6rper gemeint, n\u00E4mlich das regelm\u00E4\u00DFige Pentagondodekaeder, ein K\u00F6rper mit \n* 12 kongruenten regelm\u00E4\u00DFigen F\u00FCnfecken \n* 30 gleich langen Kanten, von denen jede die Seite von zwei F\u00FCnfecken ist \n* 20 Ecken, in denen jeweils drei dieser F\u00FCnfecke zusammentreffen Es gibt aber auch von hoher Symmetrie."@de . . . . . "Dodekaedroa poliedro erregular bat da hamabi aurpegi dituena. Dodekaedroa erregularra da hamabi pentagono erregularrez osatuta dagoenean. 20 erpin, 12 aurpegi eta 30 ertz ditu."@eu . . . . . . . . . . . . . . . . . "Cubic and tetrahedral form"@en . "Orthographic projections from 2- and 3-fold axes"@en . . . . . "In geometria solida il dodecaedro \u00E8 un poliedro con dodici facce. Generalmente con questo termine si intende per\u00F2 il dodecaedro regolare: nel dodecaedro regolare le facce sono pentagoni regolari che si incontrano in ogni vertice a gruppi di tre."@it . . . . . "Tetartoid from yellow.png"@en . . . . . "\u5728\u5E7E\u4F55\u5B78\u4E2D\uFF0C\u5341\u4E8C\u9762\u9AD4\u662F\u6307\u7531\u5341\u4E8C\u500B\u9762\u7D44\u6210\u7684\u591A\u9762\u9AD4\uFF0C\u800C\u7531\u5341\u4E8C\u500B\u5168\u7B49\u7684\u6B63\u4E94\u908A\u5F62\u7D44\u6210\u7684\u5341\u4E8C\u9762\u9AD4\u7A31\u70BA\u6B63\u5341\u4E8C\u9762\u9AD4\u3002 \u5341\u4E8C\u500B\u9762\u7684\u591A\u9762\u9AD4\u53EF\u4EE5\u662F\u6B63\u5341\u4E8C\u9762\u9AD4\u3001\u83F1\u5F62\u5341\u4E8C\u9762\u9AD4\u3001\u6B63\u4E94\u89D2\u5E33\u5854\u3001\u96D9\u56DB\u89D2\u9310\u67F1\u3001\u626D\u7A1C\u9365\u5F62\u9AD4\u3001\u5341\u4E00\u89D2\u9310\u3001\u5341\u89D2\u67F1\u3002 \u5728\u8A31\u591A\u60C5\u6CC1\u4E0B\uFF0C\u5E38\u7528\u300C\u5341\u4E8C\u9762\u9AD4\u300D\u4E00\u8A5E\u4F86\u4EE3\u8868\u6B63\u5341\u4E8C\u9762\u9AD4\u3002"@zh . . . . . . . . "8407"^^ . . . "Polyhedron pyritohedron max.png"@en . . "Dodecaedro"@es . "\u5341\u4E8C\u9762\u4F53\uFF08\u3058\u3085\u3046\u306B\u3081\u3093\u305F\u3044\u3001\u82F1: dodecahedron\uFF09\u3068\u306F\u300112\u679A\u306E\u9762\u304B\u3089\u306A\u308B\u591A\u9762\u4F53\u3067\u3042\u308B\u3002\u6700\u3082\u3088\u304F\u77E5\u3089\u308C\u308B\u5341\u4E8C\u9762\u4F53\u306F\u3001\u6B63\u591A\u9762\u4F53\u306E\u4E00\u7A2E\u3067\u3042\u308B\u6B63\u5341\u4E8C\u9762\u4F53\u3067\u3042\u308B\u3002"@ja . "Natural pyrite"@en . "\u041F\u0435\u043D\u0442\u0430\u0433\u043E\u043D\u0434\u043E\u0434\u0435\u043A\u0430\u044D\u0434\u0440"@ru . "Un dodec\u00E0edre o dodecaedre (ambdues variants s\u00F3n acceptades) \u00E9s un pol\u00EDedre regular de dotze cares. El dodec\u00E0edre \u00E9s regular quan est\u00E0 format per dotze pent\u00E0gons regulars. T\u00E9 20 v\u00E8rtexs i 30 arestes."@ca . . . "\u5728\u5E7E\u4F55\u5B78\u4E2D\uFF0C\u4E94\u89D2\u5341\u4E8C\u9762\u9AD4\uFF08Pentagonal dodecahedron\u6216Pyritohedron\uFF09\u662F\u4E00\u7A2E\u753112\u500B\u4E0D\u7B49\u908A\u4E94\u908A\u5F62\u7D44\u6210\u7684\u5341\u4E8C\u9762\u9AD4\uFF0C\u5177\u6709\u56DB\u9762\u9AD4\u7FA4\u5C0D\u7A31\u6027\u3002\u5176\u8207\u6B63\u5341\u4E8C\u9762\u9AD4\u985E\u4F3C\uFF0C\u7686\u662F\u753112\u500B\u5168\u7B49\u7684\u4E94\u908A\u5F62\u7D44\u6210\uFF0C\u4E14\u6BCF\u500B\u9802\u9EDE\u90FD\u662F3\u500B\u4E94\u908A\u5F62\u7684\u516C\u5171\u9802\u9EDE\uFF0C\u4F46\u7531\u65BC\u5176\u9762\u4E0D\u662F\u6B63\u591A\u908A\u5F62\uFF0C\u5176\u9802\u9EDE\u7684\u6392\u4F48\u672A\u80FD\u9054\u5230\u4E94\u647A\u5C0D\u7A31\u6027\uFF0C\u56E0\u6B64\u4E0D\u5C6C\u65BC\u6B63\u591A\u9762\u9AD4\u3002\u90E8\u5206\u7684\u5316\u5B78\u7269\u8CEA\u6216\u7926\u77F3\u5176\u6676\u9AD4\u5F62\u72C0\u662F\u9019\u7A2E\u5F62\u72C0\uFF0C\u4F8B\u5982\u9EC4\u94C1\u77FF\u548C\u90E8\u5206\u7684\u5929\u7136\u6C23\u6C34\u5408\u7269\u3002\u5176\u82F1\u6587\u540D\u7A31Pyritohedron\u662F\u4F86\u81EA\u9EC4\u94C1\u77FF\u7684\u82F1\u6587pyrite\u4EE5\u53CA\u591A\u9762\u9AD4\u7684\u5B57\u5C3E-hedron\u547D\u540D\u7684\u3002"@zh . .