"\u7403\u9762 \uFF08\u82F1\u8A9E\uFF1Asphere\uFF09\u662F\u4E09\u7EF4\u7A7A\u95F4\u4E2D\u5B8C\u5168\u5706\u5F62\u7684\u51E0\u4F55\u7269\u4F53\uFF0C\u5B83\u662F\u5706\u7403\u7684\u8868\u9762\uFF08\u7C7B\u4F3C\u4E8E\u5728\u4E8C\u7EF4\u7A7A\u95F4\u4E2D\uFF0C\u201C\u5706 \u201D\u5305\u56F4\u7740\u201C\u5706\u76D8\u201D\u90A3\u6837\uFF09\u3002 \u5C31\u50CF\u5728\u4E8C\u7EF4\u7A7A\u95F4\u4E2D\u7684\u5706\u7684\u5B9A\u4E49\u4E00\u6837\uFF0C\u7403\u9762\u5728\u6570\u5B66\u4E0A\u5B9A\u4E49\u4E3A\u4E09\u7EF4\u7A7A\u95F4\u4E2D\u79BB\u7ED9\u5B9A\u7684\u70B9\u8DDD\u79BB\u76F8\u540C\u7684\u70B9\u7684\u96C6\u5408 r\u3002 \u8FD9\u4E2A\u8DDD\u79BB r \u662F\u7403\u7684\u534A\u5F84 \uFF0C\u7403\uFF08ball\uFF09\u5219\u662F\u7531\u79BB\u7ED9\u5B9A\u70B9\u8DDD\u79BB\u5C0F\u4E8E r \u7684\u6240\u6709\u70B9\u6784\u6210\u7684\u51E0\u4F55\u4F53\uFF0C\u800C\u8FD9\u4E2A\u7ED9\u5B9A\u70B9\u5C31\u662F\u7403\u5FC3\u3002\u7403\u7684\u534A\u5F84\u548C\u7403\u5FC3\u4E5F\u662F\u7403\u9762\u7684\u534A\u5F84\u548C\u4E2D\u5FC3\u3002\u4E24\u7AEF\u90FD\u5728\u7403\u9762\u4E0A\u7684\u6700\u957F\u7EBF\u6BB5\u901A\u8FC7\u7403\u5FC3\uFF0C\u5176\u957F\u5EA6\u662F\u5176\u534A\u5F84\u7684\u4E24\u500D\uFF1B\u5B83\u662F\u7403\u9762\u548C\u7403\u4F53\u7684\u76F4\u5F84 \u3002 \u5C3D\u7BA1\u5728\u6570\u5B66\u4E4B\u5916\uFF0C\u672F\u8BED\u201C\u7403\u9762\u201D\u548C\u201C\u7403\u201D\u6709\u65F6\u53EF\u4E92\u6362\u4F7F\u7528\uFF0C\u4F46\u5728\u6570\u5B66\u4E2D\u662F\u660E\u786E\u533A\u5206\u7684\uFF1A\u7403\u9762\u662F\u4E00\u79CD\u5D4C\u5728\u4E09\u7EF4\u6B27\u51E0\u91CC\u5F97\u7A7A\u95F4\u5185\u7684\u4E8C\u7EF4\u5C01\u95ED\u66F2\u9762\uFF0C\u800C\u7403\u662F\u4E00\u79CD\u4E09\u7EF4\u56FE\u5F62\uFF0C\u5176\u5305\u62EC\u7403\u9762\u548C\u7403\u9762\u5185\u90E8\u7684\u4E00\u5207\uFF08\u95ED\u7403\uFF09\uFF0C\u4E0D\u8FC7\u66F4\u5E38\u89C1\u7684\u5B9A\u4E49\u662F\u53EA\u5305\u62EC\u7403\u9762\u5185\u90E8\u7684\u6240\u6709\u70B9\uFF0C\u4E0D\u5305\u62EC\u7403\u9762\u4E0A\u7684\u70B9\uFF08\u5F00\u7403\uFF09\u3002\u8FD9\u79CD\u533A\u522B\u5E76\u4E0D\u603B\u662F\u4FDD\u6301\u4E0D\u53D8\uFF0C\u5C24\u5176\u662F\u5728\u65E7\u7684\u6570\u5B66\u6587\u732E\u91CC\uFF0Csphere\uFF08\u7403\u9762\uFF09\u88AB\u5F53\u4F5C\u56FA\u4F53\u3002\u8FD9\u4E0E\u5728\u5E73\u9762\u4E0A\u6DF7\u7528\u672F\u8BED\u201C\u5706\u201D\uFF08circle\uFF09\u548C\u201C\u5706\u76D8\u201D\uFF08disk\uFF09\u7684\u60C5\u51B5\u7C7B\u4F3C\u3002"@zh . "Een bol is een driedimensionaal lichaam bestaande uit de punten die ten hoogst op een bepaalde afstand van een gegeven punt liggen. De gegeven afstand heet de straal en het gegeven punt het middelpunt van de bol. Het oppervlak van een bol is de sfeer met hetzelfde middelpunt en dezelfde straal als de bol. Een bol is het driedimensionale analogon van een cirkelschijf, en kan verkregen worden als omwentelingslichaam bij draaiing van een cirkelschijf om een middellijn."@nl . "\u0421\u0444\u0435\u0301\u0440\u0430 (\u0432\u0456\u0434 \u0433\u0440\u0435\u0446. \u03C3\u03C6\u03B1\u1FD6\u03C1\u03B1 \u2014 \u043A\u0443\u043B\u044F) \u2014 \u0437\u0430\u043C\u043A\u043D\u0443\u0442\u0430 \u043F\u043E\u0432\u0435\u0440\u0445\u043D\u044F, \u0433\u0435\u043E\u043C\u0435\u0442\u0440\u0438\u0447\u043D\u0435 \u043C\u0456\u0441\u0446\u0435 \u0442\u043E\u0447\u043E\u043A \u0440\u0456\u0432\u043D\u043E\u0432\u0456\u0434\u0434\u0430\u043B\u0435\u043D\u0438\u0445 \u0432\u0456\u0434 \u0434\u0430\u043D\u043E\u0457 \u0442\u043E\u0447\u043A\u0438, \u0449\u043E \u0454 \u0446\u0435\u043D\u0442\u0440\u043E\u043C \u0441\u0444\u0435\u0440\u0438. \u0421\u0444\u0435\u0440\u0430 \u0454 \u043E\u043A\u0440\u0435\u043C\u0438\u043C \u0432\u0438\u043F\u0430\u0434\u043A\u043E\u043C \u0435\u043B\u0456\u043F\u0441\u043E\u0457\u0434\u0430, \u0443 \u044F\u043A\u043E\u0433\u043E \u0432\u0441\u0456 \u0442\u0440\u0438 \u043F\u0456\u0432\u043E\u0441\u0456 \u043E\u0434\u043D\u0430\u043A\u043E\u0432\u0456."@uk . . . . . "En sf\u00E4r \u00E4r en klotformad kropps yta. Alla punkter p\u00E5 en sf\u00E4r befinner sig p\u00E5 samma avst\u00E5nd till sf\u00E4rens (centrum) \u2013 detta avst\u00E5nd kallas radie och betecknas r . Sf\u00E4rens area \u00E4r och det tillh\u00F6rande klotets volym \u00E4r F\u00F6r den som vill l\u00E4ra sig formlerna utantill kan det underl\u00E4tta att l\u00E4gga p\u00E5 minnet att uttrycket f\u00F6r arean \u00E4r volymuttryckets derivata med avseende p\u00E5 r. Sf\u00E4ren \u00E4r den minsta yta som kan omsluta en given volym. I naturen \u00E4r exempelvis luftbubblor och vattendroppar (fr\u00E5nsett gravitation eller annan p\u00E5verkan) klotformiga eftersom ytsp\u00E4nningen str\u00E4var efter att minimera ytan."@sv . . . . . . "27859"^^ . . . "\u521D\u7B49\u5E7E\u4F55\u5B66\u306B\u304A\u3051\u308B\u7403\u9762\uFF08\u304D\u3085\u3046\u3081\u3093\u3001\u82F1: sphere, globe, ball\uFF09\u306F\u3001\u5B8C\u5168\u7403\u4F53 (ball) \u306E\u8868\u9762\u3092\u6210\u3059\u4E09\u6B21\u5143\u7A7A\u9593\u5185\u306E\u307E\u3063\u305F\u304F\u4E38\u3044\u3067\u3042\u308B\u3002\u4E8C\u6B21\u5143\u306E\u5834\u5408\u306B\u3001\u5186\u677F\u306E\u5883\u754C\u304C\u5186\u5468\u3067\u3042\u308B\u3068\u3044\u3046\u95A2\u4FC2\u306E\u4E09\u6B21\u5143\u7684\u306A\u5BFE\u5FDC\u7269\u3068\u8003\u3048\u308B\u3053\u3068\u304C\u3067\u304D\u308B\u3002 \u4E8C\u6B21\u5143\u7A7A\u9593\u306B\u304A\u3051\u308B\u5186\u5468\u304C\u305D\u3046\u3067\u3042\u3063\u305F\u3088\u3046\u306B\u3001\u4E0E\u3048\u3089\u308C\u305F\u70B9\u304B\u3089\u306E\u8DDD\u96E2\u304C\u4E00\u5B9A\u5024 r \u3092\u3082\u3064\u3088\u3046\u306A\u70B9\u5168\u4F53\u306E\u6210\u3059\u96C6\u5408\uFF08\u305F\u3060\u3057\u4ECA\u306E\u5834\u5408\u306F\u70B9\u306F\u4E09\u6B21\u5143\u7A7A\u9593\u5185\u3067\u3068\u308B\uFF09\u3068\u3057\u3066\u7403\u9762\u3092\u5B9A\u7FA9\u3059\u308B\u3053\u3068\u304C\u3067\u304D\u308B\u3002\u3053\u306E\u3068\u304D\u3001\u4E0E\u3048\u3089\u308C\u305F\u70B9\u3092\u3053\u306E\u7403\u9762\u3042\u308B\u3044\u306F\u7403\u4F53\uFF08\u8DDD\u96E2\u304C r \u4EE5\u4E0B\u306E\u70B9\u5168\u4F53\uFF09\u306E\u4E2D\u5FC3\u3068\u3044\u3044\u3001\u307E\u305F\u8DDD\u96E2 r \u3092\u3053\u306E\u7403\u9762\u3042\u308B\u3044\u306F\u7403\u4F53\u306E\u534A\u5F84\u3068\u547C\u3076\u3002\u7403\u4F53\u306E\u4E2D\u3092\u901A\u308A\u3001\u7403\u9762\u4E0A\u306E\u4E8C\u70B9\u3092\u7D50\u3076\u6700\u9577\u306E\u76F4\u7DDA\uFF08\u7403\u9762\u306E\u5DEE\u3057\u6E21\u3057\uFF09\u306F\u304B\u306A\u3089\u305A\u305D\u306E\u4E2D\u5FC3\u3092\u901A\u308A\u3001\u534A\u5F84\u306E\u4E8C\u500D\u306B\u7B49\u3057\u3044\u3002\u3053\u308C\u3092\u7403\u9762\u3042\u308B\u3044\u306F\u7403\u4F53\u306E\u76F4\u5F84\u3068\u547C\u3076\u3002 \u7DE9\u3044\u8A00\u3044\u65B9\u3084\u6570\u5B66\u4EE5\u5916\u306E\u6587\u8108\u3067\u306F\u3001\u300C\u7403\u300D\u304C\u300C\u7403\u9762\u300D\u3068\u300C\u7403\u4F53\u300D\u306E\u3069\u3061\u3089\u306E\u610F\u5473\u3067\u3082\u7528\u3044\u3089\u308C\u305F\u308A\u3001\"sphere\" \u3068 \"ball\" \u306E\u610F\u5473\u304C\u5165\u308C\u9055\u3063\u3066\u3044\u305F\u308A\u3059\u308B\u3053\u3068\u3082\u3042\u308B\u304C\u3001\u6570\u5B66\u7684\u306B\u306F\u7403\u9762 (sphere) \u306F\u4E09\u6B21\u5143\u30E6\u30FC\u30AF\u30EA\u30C3\u30C9\u7A7A\u9593\u306B\u57CB\u3081\u8FBC\u307E\u308C\u305F\u4E8C\u6B21\u5143\u3067\u3042\u308A\u3001\u7403\u4F53 (ball) \u306F\u4E09\u6B21\u5143\u7A7A\u9593\u5185\u306E\u7403\u9762\u304A\u3088\u3073\u7403\u9762\u306E\u56F2\u3080\u300C\u5185\u5074\u300D\u3092\u8A00\u3046\u3068\u3044\u3046\u533A\u5225\u306F\u78BA\u7ACB\u3055\u308C\u305F\u3082\u306E\u3067\u3042\u308B\uFF08\u3044\u307E\u306E\u3088\u3046\u306B\u7403\u9762\u3092\u542B\u3081\u308B\u5834\u5408\u3092\u7279\u306B\u300C\u9589\u7403\u4F53\u300D\u3068\u547C\u3073\u3001\u56F2\u3080\u9818\u57DF\u306B\u7403\u9762\u3092\u307E\u3063\u305F\u304F\u542B\u3081\u306A\u3044\u5834\u5408\u306B\u306F\u300C\u958B\u7403\u4F53\u300D\u3068\u547C\u3076\uFF09\u3002\u3053\u306E\u533A\u5225\u306F\u5FC5\u305A\u5B88\u3089\u308C\u308B\u3068\u3044\u3046\u3088\u3046\u306A\u3082\u306E\u3067\u306F\u306A\u3044\u3057\u3001\u7279\u306B\u53E4\u3044\u6587\u732E\u3067\u306F\u4E2D\u8EAB\u306E\u8A70\u307E\u3063\u305F\u56F3\u5F62\u3092\u300C\u7403\u300D(sphere) \u3068\u3057\u3066\u3044\u308B\u3002\u3053\u308C\u306F\u4E8C\u6B21\u5143\u306E\u5834\u5408\u306B\u3001\u300C\u5186\u300D\u304C\uFF08\u4E2D\u8EAB\u306E\u8A70\u307E\u3063\u305F\uFF09\u300C\u5186\u677F\u300D\u306E\u610F\u5473\u3060\u3063\u305F\u308A\uFF08\u5883\u754C\u3067\u3042\u308B\uFF09\u300C\u5186\u5468\u300D\u306E\u610F\u5473\u3060\u3063\u305F\u308A\u3059\u308B\u306E\u3068\u3061\u3087\u3046\u3069\u540C\u3058\u3002"@ja . . . . . . . . . . "En geometr\u00EDa, una superficie esf\u00E9rica es una superficie de revoluci\u00F3n formada por el conjunto de todos los puntos del espacio que equidistan de un punto llamado centro. Para los puntos cuya distancia es menor que la longitud del radio, se dice que forman el interior de la superficie esf\u00E9rica. La uni\u00F3n del interior y la superficie esf\u00E9rica se llama bola cerrada en topolog\u00EDa, o esfera, como en geometr\u00EDa elemental del espacio.\u200BObviamente, la esfera es un s\u00F3lido geom\u00E9trico. La esfera, como s\u00F3lido de revoluci\u00F3n, se genera haciendo girar una superficie semicircular alrededor de su di\u00E1metro (Euclides, L. XI, def. 14). Esfera proviene del t\u00E9rmino griego \u03C3\u03C6\u03B1\u1FD6\u03C1\u03B1, spha\u00EEra, que significa pelota (para jugar). Coloquialmente hablando, se emplea la palabra bola, para describir al cuerpo delimitado por una esfera."@es . . . . . . "\u0421\u0444\u0435\u0301\u0440\u0430 (\u0432\u0456\u0434 \u0433\u0440\u0435\u0446. \u03C3\u03C6\u03B1\u1FD6\u03C1\u03B1 \u2014 \u043A\u0443\u043B\u044F) \u2014 \u0437\u0430\u043C\u043A\u043D\u0443\u0442\u0430 \u043F\u043E\u0432\u0435\u0440\u0445\u043D\u044F, \u0433\u0435\u043E\u043C\u0435\u0442\u0440\u0438\u0447\u043D\u0435 \u043C\u0456\u0441\u0446\u0435 \u0442\u043E\u0447\u043E\u043A \u0440\u0456\u0432\u043D\u043E\u0432\u0456\u0434\u0434\u0430\u043B\u0435\u043D\u0438\u0445 \u0432\u0456\u0434 \u0434\u0430\u043D\u043E\u0457 \u0442\u043E\u0447\u043A\u0438, \u0449\u043E \u0454 \u0446\u0435\u043D\u0442\u0440\u043E\u043C \u0441\u0444\u0435\u0440\u0438. \u0421\u0444\u0435\u0440\u0430 \u0454 \u043E\u043A\u0440\u0435\u043C\u0438\u043C \u0432\u0438\u043F\u0430\u0434\u043A\u043E\u043C \u0435\u043B\u0456\u043F\u0441\u043E\u0457\u0434\u0430, \u0443 \u044F\u043A\u043E\u0433\u043E \u0432\u0441\u0456 \u0442\u0440\u0438 \u043F\u0456\u0432\u043E\u0441\u0456 \u043E\u0434\u043D\u0430\u043A\u043E\u0432\u0456."@uk . . . "\u03A3\u03C6\u03B1\u03AF\u03C1\u03B1 \u03BF\u03BD\u03BF\u03BC\u03AC\u03B6\u03B5\u03C4\u03B1\u03B9 \u03BF \u03B3\u03B5\u03C9\u03BC\u03B5\u03C4\u03C1\u03B9\u03BA\u03CC\u03C2 \u03C4\u03CC\u03C0\u03BF\u03C2 \u03C4\u03C9\u03BD \u03C3\u03B7\u03BC\u03B5\u03AF\u03C9\u03BD \u03C0\u03BF\u03C5 \u03B1\u03C0\u03AD\u03C7\u03BF\u03C5\u03BD \u03C3\u03C4\u03B1\u03B8\u03B5\u03C1\u03AE \u03B1\u03C0\u03CC\u03C3\u03C4\u03B1\u03C3\u03B7 \u03C1 \u03B1\u03C0\u03CC \u03AD\u03BD\u03B1 \u03C3\u03B7\u03BC\u03B5\u03AF\u03BF \u039F \u03C3\u03C4\u03BF\u03BD \u03C4\u03C1\u03B9\u03C3\u03B4\u03B9\u03AC\u03C3\u03C4\u03B1\u03C4\u03BF \u03C7\u03CE\u03C1\u03BF. \u03A4\u03BF \u03C3\u03B7\u03BC\u03B5\u03AF\u03BF \u039F \u03BF\u03BD\u03BF\u03BC\u03AC\u03B6\u03B5\u03C4\u03B1\u03B9 \u03BA\u03B1\u03B9 \u03BA\u03AD\u03BD\u03C4\u03C1\u03BF \u03C4\u03B7\u03C2 \u03C3\u03C6\u03B1\u03AF\u03C1\u03B1\u03C2 \u03BA\u03B1\u03B9 \u03B7 \u03B1\u03C0\u03CC\u03C3\u03C4\u03B1\u03C3\u03B7 \u03C1 \u03B1\u03BA\u03C4\u03AF\u03BD\u03B1. \u03A9\u03C2 \u03B4\u03B9\u03AC\u03BC\u03B5\u03C4\u03C1\u03BF\u03C2 \u03C4\u03B7\u03C2 \u03C3\u03C6\u03B1\u03AF\u03C1\u03B1\u03C2 \u03BF\u03C1\u03AF\u03B6\u03B5\u03C4\u03B1\u03B9 \u03C4\u03BF \u03B4\u03B9\u03C0\u03BB\u03AC\u03C3\u03B9\u03BF \u03C4\u03B7\u03C2 \u03B1\u03BA\u03C4\u03AF\u03BD\u03B1\u03C2 \u03C4\u03B7\u03C2 \u03BA\u03B1\u03B9 \u03B5\u03AF\u03BD\u03B1\u03B9 \u03B7 \u03BC\u03AD\u03B3\u03B9\u03C3\u03C4\u03B7 \u03B4\u03C5\u03BD\u03B1\u03C4\u03AE \u03B1\u03C0\u03CC\u03C3\u03C4\u03B1\u03C3\u03B7 \u03B4\u03CD\u03BF \u03C3\u03B7\u03BC\u03B5\u03AF\u03C9\u03BD \u03C4\u03B7\u03C2. \u0397 \u03C3\u03C6\u03B1\u03AF\u03C1\u03B1 \u03B5\u03AF\u03BD\u03B1\u03B9 \u03BC\u03B9\u03B1 \u03B4\u03B9\u03C3\u03B4\u03B9\u03AC\u03C3\u03C4\u03B1\u03C4\u03B7 \u03BA\u03BB\u03B5\u03B9\u03C3\u03C4\u03AE \u03C3\u03C4\u03BF\u03BD \u03C4\u03C1\u03B9\u03C3\u03B4\u03B9\u03AC\u03C3\u03C4\u03B1\u03C4\u03BF \u03C7\u03CE\u03C1\u03BF. \u039C\u03B9\u03B1 \u03C3\u03C6\u03B1\u03B9\u03C1\u03B9\u03BA\u03AE \u03B5\u03C0\u03B9\u03C6\u03AC\u03BD\u03B5\u03B9\u03B1 \u03AD\u03C7\u03B5\u03B9 \u03C4\u03AD\u03C4\u03BF\u03B9\u03B1 \u03C0\u03BF\u03C5 \u03B4\u03B5\u03BD \u03B5\u03C0\u03B9\u03C4\u03C1\u03AD\u03C0\u03B5\u03B9 \u03C4\u03B7\u03BD \u03CD\u03C0\u03B1\u03C1\u03BE\u03B7 \u03B5\u03C0\u03AF\u03C0\u03B5\u03B4\u03BF\u03C5 , \u03CC\u03C0\u03C9\u03C2 \u03B1\u03C0\u03AD\u03B4\u03B5\u03B9\u03BE\u03B5 \u03BF \u0391\u03C1\u03C7\u03B9\u03BC\u03AE\u03B4\u03B7\u03C2."@el . . . . . . "A esfera pode ser definida como \"uma sequ\u00EAncia de pontos alinhados em todos os sentidos \u00E0 mesma dist\u00E2ncia de um centro comum\". \u00C9 tida tamb\u00E9m como um s\u00F3lido geom\u00E9trico formado por uma superf\u00EDcie curva cont\u00EDnua, cujos pontos est\u00E3o equidistantes de um outro fixo e interior, chamado centro; ou seja: \u00E9 uma superf\u00EDcie fechada de tal forma que todos os pontos dela est\u00E3o \u00E0 mesma dist\u00E2ncia de seu centro; ou ainda: de qualquer ponto de vista de sua superf\u00EDcie, a dist\u00E2ncia ao centro \u00E9 a mesma. A esfera pode ser obtida atrav\u00E9s do movimento de rota\u00E7\u00E3o de um semic\u00EDrculo em torno de seu di\u00E2metro. Uma esfera \u00E9 um objeto tridimensional perfeitamente sim\u00E9trico. Na matem\u00E1tica, o termo se refere \u00E0 superf\u00EDcie de uma bola. Na f\u00EDsica, esfera \u00E9 um objeto (usado muitas vezes por causa de sua simplicidade) capaz de colidir ou chocar-se com outros objetos que ocupam espa\u00E7o. Quanto \u00E0 geometria anal\u00EDtica, uma esfera \u00E9 representada (em coordenadas retangulares) pela equa\u00E7\u00E3o: em que a, b, c s\u00E3o as coordenadas do centro da esfera nos eixos x, y, z respectivamente, e r \u00E9 o raio da esfera.A esfera \u00E9 uma forma circular ou seja esf\u00E9rica como a forma de uma bola."@pt . . . . . . . . . "En geometr\u00EDa, una superficie esf\u00E9rica es una superficie de revoluci\u00F3n formada por el conjunto de todos los puntos del espacio que equidistan de un punto llamado centro. Para los puntos cuya distancia es menor que la longitud del radio, se dice que forman el interior de la superficie esf\u00E9rica. La uni\u00F3n del interior y la superficie esf\u00E9rica se llama bola cerrada en topolog\u00EDa, o esfera, como en geometr\u00EDa elemental del espacio.\u200BObviamente, la esfera es un s\u00F3lido geom\u00E9trico."@es . . . "Sfera (z gr. \u03C3\u03C6\u03B1\u1FD6\u03C1\u03B1 spha\u00EEra \u201Ekula, pi\u0142ka\u201D) \u2013 zbi\u00F3r wszystkich punkt\u00F3w (miejsce geometryczne) w przestrzeni metrycznej oddalonych o ustalon\u0105 odleg\u0142o\u015B\u0107 od wybranego punktu. Ustalona odleg\u0142o\u015B\u0107 nazywa si\u0119 promieniem sfery, wybrany punkt nazywa si\u0119 \u015Brodkiem sfery. Tak zdefiniowany zbi\u00F3r jest brzegiem kuli o tym samym \u015Brodku i promieniu. Zazwyczaj jako przestrze\u0144 metryczn\u0105 rozpatruje si\u0119 przestrze\u0144 euklidesow\u0105."@pl . . . . . "\u0643\u0631\u0629"@ar . "\uAD6C(\u7403, sphere)\uB294 \uD55C \uC810\uACFC\uC758 \uAC70\uB9AC\uAC00 \uAC19\uC740 \uC810\uB4E4\uB85C \uC774\uB8E8\uC5B4\uC9C4 2\uCC28\uC6D0\uC758 \uB3C4\uD615\uC774\uBA70, 3\uCC28\uC6D0\uC5D0\uC11C \uC815\uC758\uB41C\uB2E4. '\uAD6C'\uB77C\uB294 \uC774\uB984\uC740 \uACF5\uC774\uB780 \uC758\uBBF8\uC758 \uD55C\uC790\uC5D0\uC11C \uC654\uC9C0\uB9CC, \uC218\uD559\uC5D0\uC11C\uC758 \uAD6C\uB294 \uC18D\uC774 \uBE44\uC5B4 \uC788\uB294 '\uAD6C\uBA74'\uC744, \uACF5\uC740 \uC18D\uC774 \uCC28 \uC788\uB294 '\uAD6C\uCCB4'\uB97C \uAC00\uB9AC\uD0A4\uB294 \uB9D0\uC774\uB2E4. \uB370\uCE74\uB974\uD2B8 \uC88C\uD45C\uACC4\uC5D0\uC11C\uB294 \uC911\uC2EC\uC774 (a, b, c)\uC774\uACE0 \uBC18\uC9C0\uB984\uC774 r\uC778 \uAD6C\uB97C \uB77C\uB294 \uBC29\uC815\uC2DD\uC73C\uB85C \uB098\uD0C0\uB0BC \uC218 \uC788\uB2E4. \uB450 \uAC1C\uC758 \uB9E4\uAC1C\uBCC0\uC218 \u03B8 \u2208 [0, 2\u03C0], \u03C6 \u2208 [0, \u03C0]\uB97C \uC774\uC6A9\uD558\uC5EC \uB85C \uD45C\uD604\uD560 \uC218\uB3C4 \uC788\uB2E4."@ko . "A esfera pode ser definida como \"uma sequ\u00EAncia de pontos alinhados em todos os sentidos \u00E0 mesma dist\u00E2ncia de um centro comum\". \u00C9 tida tamb\u00E9m como um s\u00F3lido geom\u00E9trico formado por uma superf\u00EDcie curva cont\u00EDnua, cujos pontos est\u00E3o equidistantes de um outro fixo e interior, chamado centro; ou seja: \u00E9 uma superf\u00EDcie fechada de tal forma que todos os pontos dela est\u00E3o \u00E0 mesma dist\u00E2ncia de seu centro; ou ainda: de qualquer ponto de vista de sua superf\u00EDcie, a dist\u00E2ncia ao centro \u00E9 a mesma. A esfera pode ser obtida atrav\u00E9s do movimento de rota\u00E7\u00E3o de um semic\u00EDrculo em torno de seu di\u00E2metro."@pt . . . . . . . . . . "Sph\u00E8re"@fr . . . . . . . . "\uAD6C (\uAE30\uD558\uD559)"@ko . . "Esfera (grezieratik: \u03C3\u03C6\u03B1\u03AF\u03C1\u03B1 - sphaira, \"globoa, baloia\") hiru dimentsiotako espazioan puntu jakin batetik distantzia berera dauden espazioko puntu guztiek osatzen duten azalera da. Erdiko puntutik azalerara dagoen distantziari erradio deritzo. Era berean, zirkulu bat bere ardatzaren inguruan biratzen denean sortzen den gorputz geometrikoa ere bada. Alde guztietatik begiratuta, erabat biribila den gorputza da esfera."@eu . "En sf\u00E4r \u00E4r en klotformad kropps yta. Alla punkter p\u00E5 en sf\u00E4r befinner sig p\u00E5 samma avst\u00E5nd till sf\u00E4rens (centrum) \u2013 detta avst\u00E5nd kallas radie och betecknas r . Sf\u00E4rens area \u00E4r och det tillh\u00F6rande klotets volym \u00E4r F\u00F6r den som vill l\u00E4ra sig formlerna utantill kan det underl\u00E4tta att l\u00E4gga p\u00E5 minnet att uttrycket f\u00F6r arean \u00E4r volymuttryckets derivata med avseende p\u00E5 r. Sf\u00E4ren \u00E4r den minsta yta som kan omsluta en given volym. I naturen \u00E4r exempelvis luftbubblor och vattendroppar (fr\u00E5nsett gravitation eller annan p\u00E5verkan) klotformiga eftersom ytsp\u00E4nningen str\u00E4var efter att minimera ytan. En sf\u00E4r eller ett klot som omsluts av en cylinder har en volym som \u00E4r 2/3 av cylinderns volym, vilket (tillsammans med formlerna f\u00F6r sf\u00E4rens yta och volym) redan Arkimedes k\u00E4nde till."@sv . . . . "Sf\u00E9ra (matematika)"@cs . "\u7403\u9762"@ja . . . . . . . . . . . . . . . . "Dalam geometri, bola adalah bangun ruang tiga dimensi yang dibentuk oleh tak hingga lingkaran berjari-jari sama panjang dan berpusat pada satu titik yang sama. Bola hanya memiliki 1 sisi."@in . . "En g\u00E9om\u00E9trie dans l'espace, une sph\u00E8re est une surface constitu\u00E9e de tous les points situ\u00E9s \u00E0 une m\u00EAme distance d'un point appel\u00E9 centre. La valeur de cette distance au centre est appel\u00E9e le rayon de la sph\u00E8re. La g\u00E9om\u00E9trie sph\u00E9rique est la science qui \u00E9tudie les propri\u00E9t\u00E9s des sph\u00E8res. La surface de la Terre peut, en premi\u00E8re approximation, \u00EAtre mod\u00E9lis\u00E9e par une sph\u00E8re dont le rayon est d'environ 6 371 km. Plus g\u00E9n\u00E9ralement en math\u00E9matiques, dans un espace m\u00E9trique, une sph\u00E8re est l'ensemble des points situ\u00E9s \u00E0 m\u00EAme distance d'un centre. Leur forme peut alors \u00EAtre tr\u00E8s diff\u00E9rente de la forme ronde usuelle. Une sph\u00E8re est \u00E9galement un ellipso\u00EFde d\u00E9g\u00E9n\u00E9r\u00E9. Les points dont la distance au centre est inf\u00E9rieure ou \u00E9gale au rayon constituent une boule."@fr . . "A sphere (from Greek \u03C3\u03C6\u03B1\u1FD6\u03C1\u03B1\u2014sphaira, \"globe, ball\") is a geometrical object in three-dimensional space that is the surface of a ball (viz., analogous to the circular objects in two dimensions, where a \"circle\" circumscribes its \"disk\"). Like a circle in a two-dimensional space, a sphere is defined mathematically as the set of points that are all at the same distance r from a given point, but in a three-dimensional space. This distance r is the radius of the ball, which is made up from all points with a distance less than (or, for a closed ball, less than or equal to) r from the given point, which is the center of the mathematical ball. These are also referred to as the radius and center of the sphere, respectively. The longest straight line segment through the ball, connecting two points of the sphere, passes through the center and its length is thus twice the radius; it is a diameter of both the sphere and its ball. While outside mathematics the terms \"sphere\" and \"ball\" are sometimes used interchangeably, in mathematics the above distinction is made between a sphere, which is a two-dimensional closed surface embedded in a three-dimensional Euclidean space, and a ball, which is a three-dimensional shape that includes the sphere and everything inside the sphere (a closed ball), or, more often, just the points inside, but not on the sphere (an open ball). The distinction between ball and sphere has not always been maintained and especially older mathematical references talk about a sphere as a solid. This is analogous to the situation in the plane, where the terms \"circle\" and \"disk\" can also be confounded."@en . "Sf\u00E4r"@sv . "Esfera"@pt . . . . . . . "\uAD6C(\u7403, sphere)\uB294 \uD55C \uC810\uACFC\uC758 \uAC70\uB9AC\uAC00 \uAC19\uC740 \uC810\uB4E4\uB85C \uC774\uB8E8\uC5B4\uC9C4 2\uCC28\uC6D0\uC758 \uB3C4\uD615\uC774\uBA70, 3\uCC28\uC6D0\uC5D0\uC11C \uC815\uC758\uB41C\uB2E4. '\uAD6C'\uB77C\uB294 \uC774\uB984\uC740 \uACF5\uC774\uB780 \uC758\uBBF8\uC758 \uD55C\uC790\uC5D0\uC11C \uC654\uC9C0\uB9CC, \uC218\uD559\uC5D0\uC11C\uC758 \uAD6C\uB294 \uC18D\uC774 \uBE44\uC5B4 \uC788\uB294 '\uAD6C\uBA74'\uC744, \uACF5\uC740 \uC18D\uC774 \uCC28 \uC788\uB294 '\uAD6C\uCCB4'\uB97C \uAC00\uB9AC\uD0A4\uB294 \uB9D0\uC774\uB2E4. \uB370\uCE74\uB974\uD2B8 \uC88C\uD45C\uACC4\uC5D0\uC11C\uB294 \uC911\uC2EC\uC774 (a, b, c)\uC774\uACE0 \uBC18\uC9C0\uB984\uC774 r\uC778 \uAD6C\uB97C \uB77C\uB294 \uBC29\uC815\uC2DD\uC73C\uB85C \uB098\uD0C0\uB0BC \uC218 \uC788\uB2E4. \uB450 \uAC1C\uC758 \uB9E4\uAC1C\uBCC0\uC218 \u03B8 \u2208 [0, 2\u03C0], \u03C6 \u2208 [0, \u03C0]\uB97C \uC774\uC6A9\uD558\uC5EC \uB85C \uD45C\uD604\uD560 \uC218\uB3C4 \uC788\uB2E4."@ko . . . . . . . . . . . . . . . "Esfera"@eu . . . "\u521D\u7B49\u5E7E\u4F55\u5B66\u306B\u304A\u3051\u308B\u7403\u9762\uFF08\u304D\u3085\u3046\u3081\u3093\u3001\u82F1: sphere, globe, ball\uFF09\u306F\u3001\u5B8C\u5168\u7403\u4F53 (ball) \u306E\u8868\u9762\u3092\u6210\u3059\u4E09\u6B21\u5143\u7A7A\u9593\u5185\u306E\u307E\u3063\u305F\u304F\u4E38\u3044\u3067\u3042\u308B\u3002\u4E8C\u6B21\u5143\u306E\u5834\u5408\u306B\u3001\u5186\u677F\u306E\u5883\u754C\u304C\u5186\u5468\u3067\u3042\u308B\u3068\u3044\u3046\u95A2\u4FC2\u306E\u4E09\u6B21\u5143\u7684\u306A\u5BFE\u5FDC\u7269\u3068\u8003\u3048\u308B\u3053\u3068\u304C\u3067\u304D\u308B\u3002 \u4E8C\u6B21\u5143\u7A7A\u9593\u306B\u304A\u3051\u308B\u5186\u5468\u304C\u305D\u3046\u3067\u3042\u3063\u305F\u3088\u3046\u306B\u3001\u4E0E\u3048\u3089\u308C\u305F\u70B9\u304B\u3089\u306E\u8DDD\u96E2\u304C\u4E00\u5B9A\u5024 r \u3092\u3082\u3064\u3088\u3046\u306A\u70B9\u5168\u4F53\u306E\u6210\u3059\u96C6\u5408\uFF08\u305F\u3060\u3057\u4ECA\u306E\u5834\u5408\u306F\u70B9\u306F\u4E09\u6B21\u5143\u7A7A\u9593\u5185\u3067\u3068\u308B\uFF09\u3068\u3057\u3066\u7403\u9762\u3092\u5B9A\u7FA9\u3059\u308B\u3053\u3068\u304C\u3067\u304D\u308B\u3002\u3053\u306E\u3068\u304D\u3001\u4E0E\u3048\u3089\u308C\u305F\u70B9\u3092\u3053\u306E\u7403\u9762\u3042\u308B\u3044\u306F\u7403\u4F53\uFF08\u8DDD\u96E2\u304C r \u4EE5\u4E0B\u306E\u70B9\u5168\u4F53\uFF09\u306E\u4E2D\u5FC3\u3068\u3044\u3044\u3001\u307E\u305F\u8DDD\u96E2 r \u3092\u3053\u306E\u7403\u9762\u3042\u308B\u3044\u306F\u7403\u4F53\u306E\u534A\u5F84\u3068\u547C\u3076\u3002\u7403\u4F53\u306E\u4E2D\u3092\u901A\u308A\u3001\u7403\u9762\u4E0A\u306E\u4E8C\u70B9\u3092\u7D50\u3076\u6700\u9577\u306E\u76F4\u7DDA\uFF08\u7403\u9762\u306E\u5DEE\u3057\u6E21\u3057\uFF09\u306F\u304B\u306A\u3089\u305A\u305D\u306E\u4E2D\u5FC3\u3092\u901A\u308A\u3001\u534A\u5F84\u306E\u4E8C\u500D\u306B\u7B49\u3057\u3044\u3002\u3053\u308C\u3092\u7403\u9762\u3042\u308B\u3044\u306F\u7403\u4F53\u306E\u76F4\u5F84\u3068\u547C\u3076\u3002"@ja . . . . "Een bol is een driedimensionaal lichaam bestaande uit de punten die ten hoogst op een bepaalde afstand van een gegeven punt liggen. De gegeven afstand heet de straal en het gegeven punt het middelpunt van de bol. Het oppervlak van een bol is de sfeer met hetzelfde middelpunt en dezelfde straal als de bol. Een bol is het driedimensionale analogon van een cirkelschijf, en kan verkregen worden als omwentelingslichaam bij draaiing van een cirkelschijf om een middellijn."@nl . . . . . .