. . . . . . . "In geometry, circular symmetry is a type of continuous symmetry for a planar object that can be rotated by any arbitrary angle and map onto itself. Rotational circular symmetry is isomorphic with the circle group in the complex plane, or the special orthogonal group SO(2), and unitary group U(1). Reflective circular symmetry is isomorphic with the orthogonal group O(2)."@en . . . . . . . . . . . "p/o070300"@en . . . . . . . "A simetria circular em f\u00EDsica matem\u00E1tica aplica-se a um campo bidimensional que pode ser expresso apenas como fun\u00E7\u00E3o da dist\u00E2ncia a um ponto central. Isto significa que todos os pontos em um mesmo c\u00EDrculo assumem o mesmo valor do campo. Tal simetria \u00E9 utilizada em matem\u00E1tica. Um exemplo seria a intensidade do campo magn\u00E9tico em um plano perpendicular a um fio onde passa corrente. Uma simetria circular cl\u00E1ssica consistiria em c\u00EDrculos conc\u00EAntricos."@pt . "A simetria circular em f\u00EDsica matem\u00E1tica aplica-se a um campo bidimensional que pode ser expresso apenas como fun\u00E7\u00E3o da dist\u00E2ncia a um ponto central. Isto significa que todos os pontos em um mesmo c\u00EDrculo assumem o mesmo valor do campo. Tal simetria \u00E9 utilizada em matem\u00E1tica. Um exemplo seria a intensidade do campo magn\u00E9tico em um plano perpendicular a um fio onde passa corrente. Uma simetria circular cl\u00E1ssica consistiria em c\u00EDrculos conc\u00EAntricos. O equivalente tridimensional \u00E9 a simetria esf\u00E9rica. Um campo escalar possui simetria esf\u00E9rica se depender apenas da dist\u00E2ncia \u00E0 origem, como o potencial de uma for\u00E7a central. J\u00E1 um campo vetorial tem simetria esf\u00E9rica se est\u00E1 orientado na dire\u00E7\u00E3o radial, para dentro ou para fora, cuja intensidade e sentido (para dentro/para fora) dependem apenas da dist\u00E2ncia \u00E0 origem, tal como uma for\u00E7a central."@pt . . "Simetria circular e esf\u00E9rica"@pt . . . . . . . . . . . "Circular symmetry"@en . "SurfaceofRevolution"@en . "Simetria esf\u00E8rica"@ca . "Orthogonal group"@en . . . "In geometry, circular symmetry is a type of continuous symmetry for a planar object that can be rotated by any arbitrary angle and map onto itself. Rotational circular symmetry is isomorphic with the circle group in the complex plane, or the special orthogonal group SO(2), and unitary group U(1). Reflective circular symmetry is isomorphic with the orthogonal group O(2)."@en . . . "La simetr\u00EDa esf\u00E9rica es la simetr\u00EDa respecto a un punto central, de modo que un sistema f\u00EDsico o geom\u00E9trico tiene simetr\u00EDa esf\u00E9rica cuando todos los puntos a una cierta distancia del punto central son equivalentes."@es . "Surface of Revolution"@en . . . . . "4322"^^ . "SolidofRevolution"@en . "Solid of Revolution"@en . . "\u5728\u6578\u5B78\u7269\u7406\u9818\u57DF\uFF0C\u4E00\u500B\u5B9A\u7FA9\u57DF\u70BA\u4E8C\u7DAD\u7A7A\u9593\u7684\u51FD\u6578\uFF0C\u5047\u82E5\u53EA\u8207\u96E2\u67D0\u53C3\u8003\u9EDE\u7684\u8DDD\u96E2\u6709\u95DC\uFF0C\u5247\u6B64\u51FD\u6578\u5177\u6709\u5713\u5C0D\u7A31\u6027\uFF08circular symmetry\uFF09\u3002\u5C0D\u65BC\u4E00\u7D44\u4EE5\u6B64\u53C3\u8003\u9EDE\u70BA\u5713\u5FC3\u7684\u540C\u5FC3\u5713\uFF0C\u5728\u540C\u4E00\u500B\u540C\u5FC3\u5713\u7684\u6BCF\u4E00\u500B\u4F4D\u7F6E\uFF0C\u51FD\u6578\u503C\u90FD\u76F8\u540C\u3002 \u5728\u4E00\u500B\u8207\u5E36\u96FB\u6D41\u7684\u96FB\u7DDA\u5782\u76F4\u7684\u5E73\u9762\uFF0C\u78C1\u5834\u5177\u6709\u5713\u5C0D\u7A31\u6027\u3002\u4E00\u500B\u5177\u6709\u5713\u5C0D\u7A31\u6027\u7684\u5716\u6848\u662F\u7531\u540C\u5FC3\u5713\u69CB\u6210\u7684\u3002"@zh . . . . . . . . . . . "2217599"^^ . "La simetria esf\u00E8rica \u00E9s la simetria respecte a un punt central, de manera que un sistema f\u00EDsic o geom\u00E8tric t\u00E9 simetria esf\u00E8rica quan tots els punts a una certa dist\u00E0ncia del punt central s\u00F3n equivalents."@ca . . . . . . . . . "\u5728\u6578\u5B78\u7269\u7406\u9818\u57DF\uFF0C\u4E00\u500B\u5B9A\u7FA9\u57DF\u70BA\u4E8C\u7DAD\u7A7A\u9593\u7684\u51FD\u6578\uFF0C\u5047\u82E5\u53EA\u8207\u96E2\u67D0\u53C3\u8003\u9EDE\u7684\u8DDD\u96E2\u6709\u95DC\uFF0C\u5247\u6B64\u51FD\u6578\u5177\u6709\u5713\u5C0D\u7A31\u6027\uFF08circular symmetry\uFF09\u3002\u5C0D\u65BC\u4E00\u7D44\u4EE5\u6B64\u53C3\u8003\u9EDE\u70BA\u5713\u5FC3\u7684\u540C\u5FC3\u5713\uFF0C\u5728\u540C\u4E00\u500B\u540C\u5FC3\u5713\u7684\u6BCF\u4E00\u500B\u4F4D\u7F6E\uFF0C\u51FD\u6578\u503C\u90FD\u76F8\u540C\u3002 \u5728\u4E00\u500B\u8207\u5E36\u96FB\u6D41\u7684\u96FB\u7DDA\u5782\u76F4\u7684\u5E73\u9762\uFF0C\u78C1\u5834\u5177\u6709\u5713\u5C0D\u7A31\u6027\u3002\u4E00\u500B\u5177\u6709\u5713\u5C0D\u7A31\u6027\u7684\u5716\u6848\u662F\u7531\u540C\u5FC3\u5713\u69CB\u6210\u7684\u3002"@zh . "1047893248"^^ . "Simetr\u00EDa esf\u00E9rica"@es . . "\u5713\u5C0D\u7A31"@zh . . . . . . . "La simetria esf\u00E8rica \u00E9s la simetria respecte a un punt central, de manera que un sistema f\u00EDsic o geom\u00E8tric t\u00E9 simetria esf\u00E8rica quan tots els punts a una certa dist\u00E0ncia del punt central s\u00F3n equivalents."@ca . . . "La simetr\u00EDa esf\u00E9rica es la simetr\u00EDa respecto a un punto central, de modo que un sistema f\u00EDsico o geom\u00E9trico tiene simetr\u00EDa esf\u00E9rica cuando todos los puntos a una cierta distancia del punto central son equivalentes."@es . .