{"id":18669,"date":"2020-11-20T06:26:51","date_gmt":"2020-11-20T05:26:51","guid":{"rendered":"http:\/\/www.emiliosilveravazquez.com\/blog\/?p=18669"},"modified":"2020-11-20T06:27:56","modified_gmt":"2020-11-20T05:27:56","slug":"%c2%bfla-naturaleza-%c2%a1simetria-dentro-de-la-diversidad-6","status":"publish","type":"post","link":"https:\/\/www.emiliosilveravazquez.com\/blog\/2020\/11\/20\/%c2%bfla-naturaleza-%c2%a1simetria-dentro-de-la-diversidad-6\/","title":{"rendered":"\u00bfLa Naturaleza? \u00a1Simetr\u00eda dentro de la Diversidad!"},"content":{"rendered":"<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"http:\/\/k41.kn3.net\/taringa\/1\/1\/3\/9\/5\/1\/8\/otro_anonimo\/E1C.jpg?4409\" alt=\"Resultado de imagen de Nuestro mundo visto desde el Espacio\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Nuestro mundo, aunque en la Galaxia existan muchos como \u00e9l, es un lugar privilegiado que conforma un Ecosistema superior en su conjunto formado por muchos ecosistemas locales aislados los unos de los otros y sin embargo, todos conexionados. La Diversidad de regiones diferentes que existen dentro del mismo planeta es asombrosa y, lo mismo nos podemos encontrar en un lugar como ese que vemos arriba, o en una isla paradis\u00edaca, una selva, un desierto, o perdidos en un inmenso y embravecido oc\u00e9ano, en la ventisca de nieve de inmensas monta\u00f1as y, tambi\u00e9n, en grutas enormes en las profundidades del planeta.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/i.pinimg.com\/originals\/8f\/92\/39\/8f9239088cf11aacb3f1f198bf26ac49.png\" alt=\"Diversidad de ecosistemas - B\u00fasqueda de Google en 2020 | Diversidad de  ecosistemas, Ecosistemas, B\u00fasqueda de google\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Pero todos esos climas diferentes son el resultado de la diversidad y, en cada uno de esos lugares ocurren cosas y, la vida, aunque parezca imposible, est\u00e1 all\u00ed presente. Es la consecuencia de que el planeta Tierra est\u00e9 situado en la zona habitable del Sol, ni demasiado cerca para que la vida perezca achicharrada, ni demasiado lejos para que resulte congelada por el fr\u00edo. Aqu\u00ed el agua discurre l\u00edquida y cantarina por multitud de lugares y hace posible que, entre el preciado l\u00edquido y los rayos del Sol que nos env\u00edan la luz y el calor necesarios para la fotos\u00edntesis y la vida&#8230; \u00a1Podamos estar aqu\u00ed!<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/i.pinimg.com\/236x\/ef\/2e\/06\/ef2e063d973d01dbf192fa2baad054ce.jpg\" alt=\"Magnetic Fields II-b\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcStMeRwbZcDCNTZbMVFwyOTFsHcACZNVzqu5Q&amp;usqp=CAU\" alt=\"Electromagnetismo - Toda Materia\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<div style=\"text-align: justify;\">\n<div>\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/2013\/04\/11\/radiacion-electromagnetica\/\" rel=\"prev\">Radiaci\u00f3n electromagn\u00e9tica, antimateria\u2026\u00a1t\u00e1ntas cosas!<\/a><\/div>\n<div><a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/2013\/04\/12\/%c2%a1conocer-el-universo-ese-antiguo-deseo\/\" rel=\"next\">\u00a1Conocer el Universo! Ese antiguo deseo<\/a><\/div>\n<\/div>\n<div>\n<div style=\"text-align: justify;\">\n<div>\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/2014\/04\/25\/%c2%bfuna-guia-para-descubrir-%c2%a1la-simetria-2\/\" rel=\"prev\">\u00bfUna gu\u00eda para descubrir? \u00a1La simetr\u00eda!<\/a><\/div>\n<div><a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/2014\/04\/25\/algo-que-seria-de-agradecer-2\/\" rel=\"next\">Algo que ser\u00eda de agradecer<\/a><\/div>\n<\/div>\n<h3 style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" id=\"irc_mi\" src=\"http:\/\/recursostic.educacion.es\/secundaria\/edad\/2esobiologia\/2quincena4\/imagenes\/reflexion.jpg\" alt=\"\" width=\"495\" height=\"393\" \/><\/h3>\n<div>\n<div style=\"text-align: justify;\">\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 La imagen especular de la monta\u00f1a en el lago es simetr\u00eda<\/div>\n<p style=\"text-align: justify;\">Todos sabemos que la materia en nuestro Universo adopta muchas formas distintas: Galaxias de estrellas y mundos que, en alguna ocasi\u00f3n, pueden incluso tener seres vivos y algunos han podido evolucionar hasta adquirir la consciencia. Sin embargo, no me quer\u00eda referir a eso que es bien sabido por todos, sino que, trato de pararme un poco sobre una curiosa propiedad que la materia tiene en algunas ocasiones y que, la Naturaleza se empe\u00f1a en repetir una y otra vez: \u00a1La Simetr\u00eda!<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Galaxias espirales: caracter\u00edsticas, formaci\u00f3n y tipos - Lifeder\" \/><img decoding=\"async\" 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\" alt=\"Galaxias espirales\" \/><img decoding=\"async\" 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\" alt=\"galaxias espirales | portalastronomico.com\" \/><img decoding=\"async\" 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\" alt=\"La variedad de galaxias espirales \u2013 astroyciencia: Blog de astronom\u00eda y  ciencia\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Las Galaxias espirales, la redondez de los mundos, las estrellas del cielo, los \u00e1rboles y las monta\u00f1as, los r\u00edos y los oc\u00e9anos, las especies animales (incluida la nuestra) que, se repiten una y otra vez y, en general, salvando particularidades, todas repiten un patr\u00f3n de simetr\u00eda.<\/p>\n<p style=\"text-align: justify;\">Recuerdo aqu\u00ed aquel pensamiento de Paul Valery en el que nos dec\u00eda:<\/p>\n<p style=\"text-align: justify;\">\n<blockquote><p><strong>\u201cEl Universo est\u00e1 construido seg\u00fan un plan cuya profunda simetr\u00eda est\u00e1 presente de alg\u00fan modo en la estructura interna de nuestro intelecto<\/strong>.\u201d<\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p><\/blockquote>\n<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" id=\"irc_mi\" src=\"https:\/\/lh4.googleusercontent.com\/-Y1oT6ivynlA\/TYpYRe8w5XI\/AAAAAAAAABo\/VpifuI03Q7k\/s1600\/setas_con_simetrias+B.jpg\" alt=\"\" width=\"589\" height=\"393\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0La Naturaleza est\u00e1 llena de simetr\u00edas<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">La simetr\u00eda es una propiedad universal tanto en la vida corriente, como desde un punto de vista matem\u00e1tico desde el quehacer de la F\u00edsica Te\u00f3rica. En realidad, lo que observamos en la vida corriente es siempre lo repetitivo, lo sim\u00e9trico, lo que se puede relacionar entre s\u00ed por tener algo com\u00fan. Es siempre lo mismo dentro de una inmensa diversidad formada por grupos iguales.<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\"><img decoding=\"async\" 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\" alt=\"AWS Juego 11 Stickers Mariposas Mariposa Impermeables para Coche Moto  Pegatinas de Vinilo Butterfly Tama\u00f1o de impresi\u00f3n A4 Vinyl Waterproof  Stickers For Car 29,7_x_21_cm: Amazon.es: Coche y moto\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcTmPOvsMj2S6sA9auplL-WnuTOt6F0r61lM6g&amp;usqp=CAU\" alt=\"Jilgueros Euroasi\u00e1ticos Fotos e Im\u00e1genes de stock - Alamy\" \/><img decoding=\"async\" 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\" alt=\"Pin en Libro de texto \u00b7 Textbook\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcTFbsr9oN3RucPDJPUaspBrW0PXlWMu3H-abA&amp;usqp=CAU\" alt=\"Derechos Humanos, fuente real de desarrollo\" \/><img decoding=\"async\" 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\" alt=\"REVISTA ECOSOCIALISTA : CAMBIO CLIM\u00c1TICO (MUNDO DE LAS MARGARITAS)\" \/><img decoding=\"async\" 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\" alt=\"Romanescu, el primo &quot;raro&quot; de la familia de las coles\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcQCFx03nMn11rCt8pXHzZmW1rYNR-kaeRqJfg&amp;usqp=CAU\" alt=\"Set de hojas de plantas tropicales | Vector Gratis\" \/><img decoding=\"async\" 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\" alt=\"\u00c1rboles Y Colecci\u00f3n De La Hoja De Las Plantas Ilustraci\u00f3n del Vector -  Ilustraci\u00f3n de plantas, \u00e1rboles: 118398172\" \/><img decoding=\"async\" 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FqEWHvorhs5CWwgo1AEkiSEklJTv1HhIjp6mkZ8wktIeChrUTrQn2UAAaQnomPM\/ImsS99tVAcwxkAb7R59PM7fGnncOlJAFzAJjaem96s2fZSphxILiFKSCUBtRKgJ8KjHsm4MzTWB7NOuzKVhcSARG41alFUCCJv9r0fcGUOypooJWOoAPAJm\/ra32rtGK7dpDCVJV+9IHhtCSAJmbm835rnbmW\/siW1ENrUiFXNwSSY0ne0T9KJ5rkql4dOJTIC4JSQdICv4gdkj4fKsW7Wu5BLNO2Kn9Oo2BEpHsmDItPWltY1pwpg6UmfCAZEdDBnrf5cUXNMIpoxG25FwLlN48waZOO0hOnpe\/meBtO\/PFXzrP1Z6ufYzBleWoeAkhSknYiyidtwY+QqbmGNZAKE+0OUnwmIjVJvea572bzdbbYQFqA8QEEjczFvU\/GiWJW4kBRSQCY9\/T9eXWq8Oz9dDv7eLyBfrP2P2ok32teEhLhSk\/wjb1GqSPdVPw75VBE\/wBUcCQPuKLnLFFCFAz3mrSmDJ0xfawN\/wC00YNEs\/7VvPYdTSyCDpvAmygZkVd8Bjxi2grDr0lITrSrTqBEQbyLxz8q4zjXfAfd9atHZ1x1tokDShxI8SiUzF4CpAHX3CmxSujsslJClpKlfxaQD5yAN+J\/Ummnkkbj4iuf5L2qcYlt1PeCTBKjqECTcyCNvfV2YzJpxIXwoSJG4+0GR6g1SY04fk3aB5EKQVp8UWUuAI5E6RYbV1nIO1qHUw9pQqQAR7Pvk2rjmWmYEASByTqIvqOq4J+FzVkwoO1ZtymC\/bVrXiVNslKUuOYUFzVZDqkvGUjzQuSRyfOrrlGSMYZtLTbZUBAlY+atQ+xjiBXN8oxIead1yO7U440U7qdjwlRJ2ShKUgDrXXMvxAcaQ4P4kpV8QDWuPdAXmGTB7SFAAJ6XtIIHECQDUtrLGy2WlJBSUlJEWIIj6VOUI\/XzraaZxmpyDsLlToxr5UQThBoSIsVkdyFH\/wBtEV0jDYVwphfdieAg9eurpQDsnjW04vM1rWlI75IlRA9nWKsQz\/CmSHkWEnfb3ijEq2Y9iVJc7xlDS0yFFtepPiB3TE6Tc++CIvXOO1CwypzBuJdADqn0EualJUtvSEqkkaQuVFQkqEdZrtmKz\/DqbcDT7esJMX2JsD58VwTtbmSlqGshRTISfIWpk76FROyeOS0XtaNaFpAUnrcxcX6\/ean9ps5ZdaZQlsgockqUblN\/Da53mSfSqvhnCJjkiazEHb1Nb+f5azv4HGu0HdqW4lCCpX8yZi0TvvegDbgnxEgcwB9K06ffURJmtSYj5dpbeJA3EiOLVGWIMG1IpxHy5uLUQV3YbSoEKlaZRB2SEzJjYyRad\/KhM0oGrELB9HdO6h4lpVpKTzIjVJsJBIO8jYgkgY3tWbg\/O\/5++jvZvsy5iGnHUglCDBA3kJB91iN97jejZO6gBQpCQJv1o1lmTrccW3pMoSVEcgAgT15FRG8uWvUW0qUAoiQPMkbbWE07EJZIxqsRKVSFAC4Ag6gJAJA86jZphggFIuLQYi3G\/kQfeKkYRlbZT1sdrjkEGjGeYZz9kbUrYunTAsJSZ58MkbR\/DPrz3tp0b8MspLjRxDiArWRp1QJ0bEx7QF+NxPAhvtHmTzLqltMoCgNChKykgbEAEehPQDarrgMtH7IwlHhKW29OmwB0jbnk0E7Q4UgBREG0z19T1tXHlMbjluNzBx5SXHQtyDdJUqBHAvYVZV58HMG40lCmySDZaiFCRKVT9b1EzrLAAFoHtbp5B58+p6UGfZW2QI6SDIidt+u9PrNuBeKVeCIn6+VQXBH6vRx5IVNriJ8v80RyDssp5RSoeFSSQZuFRaY3tqMHpXSXGM1W8haSpDgVFiuJUkEEgaSJKZuPzFH23+8ZQltZKwpsaDbSStAA1ETp1H5bmnOz3ZcB3EtuKSHWnUgCxiU6tcHdOw9\/nVkZyRDS0IP\/AJy2g2oJTHeodb1kWhMohQtulXWKLymtTir\/AGiyc4YoXPi8FxpIUmSNUJkDZNjvPM0PxWOeQr2lqmVJKpEXjUINiR0Oxirh20yh8rlYSpIgBaE6VdRKf4osLcAWFV\/MsGV4dL+kgd4W97hRBJTETuBveiVWAmb4tJbKdOmAYuDzN4\/4HFHchxjZZSVkkpbSEhwkCbD92E3jr1oFmmXKDSlxIKVethNN5elfcNq\/hII3HCiD9DWvwz4uuAyVS3EaZIJ30gJIBg3Owjj0tXUcIjShKEn2Rp3jbyrimRZg7hloKYuUq+EjSb8zN7xHWuuME4lCHknRqF0wTCgSDcG+1ZtsajnqMpw7ZBSskkbm8GB0EDn51vOWiyx3gg6\/Ckgjn7\/epuJyhafEkhaTtEztPO1p36VDWNb+Hwa9QT3ner5UAgEiN7EHcW+Fc523UnAYEIQG03UBf7m\/n8iKtPYzGFOBST\/MpIi\/smD9KGY9hTSloJsogoJgBWk7EzvXPj2mxCC6htcDWs2i3eXMHj3U8dFuLp2nxuIQlSu8c0mDIKgmRf3TxtVdw\/bnEogd8ogdTf4m9VrF5w64IdcWoC8KUSAaYZSFySYR0HHSxN+Oea1mOdv6FctxLriHnUpUdTilKIvYwb\/H5mml4pavDza3JnnzqxfhI2ChY0hRWSLpJCY85AnYx5ijma5DLQUlpXgSnSG4JJgKUZJBtKk83na1Vs+jnSt9m8zS2qSkkjbTpvBm82t9qr3b7GIdeHdt92kJUdOqfFbUfKSNqurWRl1uQpKWQoqSYUHDqEDUYmxGw5qh55k7iXtEpUVNLI0mQYJJjnzvHNPDNV3ADLhINuRTmMYuiJAJiT1NZ2eMqKeot60WzzCkNX3N0+ZET8jXS3sA+L1IlMCAkjb+aR8d4PrUPBoVC1AA6U3noZJI84Borim3FshRFi0pWq1whYT8lWoG2bKvx9jWp4hVzAOKCHFAJ7wmCTcxF44FxB5qBiW9Ji0fr9dKUcY6qAXFEAAAFRgAcC9ht8KQszxvVEa4\/Xz\/AF1p1tudgZuR6CZ+V6U1hjEkHjjgmAfjIo7l7JbAcAlSFXMSnStJTEEEHjfrHWq8sSVk+T\/uHXyQEssLUYnxLfQUNgkbGVz6J866H+DLI\/YVgonU+oTMW0Ni8ceVDsM+212ceSUgLU4UG11K71NzG5AEe4UV\/DrP2mMrSkJ1uEuq02AMKjc82+VcuXcbnVA+1uQvYbNG+4CEh5Kim0pgAqWkg7xHs8iBUHsl2cWcM684k91pc0qQD3qtOoaxyG53mAY8qnfiT2ndU7hHkhKFNyQOQoxM9Rbio\/ZvPnm8vDbZKY7ySACVAKMA9RciPrRfOlvY7kGUjFYUPqLYWENtpQCZUrVpCTqHg1QmABso8E0T7dZVh2srUyFArZ0LkJuXNQBJI2kKO\/lVXfzZwONPBxWguoC\/DCUlHsFIAsE3SDuZiiXbbHBWCf1Aa1BMEcwoE++AfnWYdXLs\/wBoZwmHIT\/5Te\/+gD60znGZrcSUkRMbeR3vztQPsE4hWCw0x7Okif61JmrbiMrkAzMkAEb+d+bA0W3wqPjkrQVEwSCRO2mYGq1ufvUzN8s0YVbqUd62ttIGqApA0lIM3i8EAXmL0Q7UZYpKSE6iN4kkbzHrRPKGf2lCgDDACRJ5XHiKem8E3i8dQSJxtvES5r9kAXiQJvwT1JqXhcxUNV9OoQYtYx0irPguxpU42uSEOrdUAkCyW3AEqvuNKiY9N6L572LQEOOBQ7yFK6JUImR87cfOumsfNcuwSP8AqXQDuEqvzbzq99n80ccVh21kqCMUxpJG06gZO8R9Kr2AyFX7chCpOtgLOmZAnbYyQIPkD5VcncvOHcwqAEgKxKFf1nu0m5m8X+dXKqR0XEYZKxBHp61z\/tdkWnEMKQk+NaZF7rQbER1TbrYVe2cX4CpdoJ26ce+Kq3avPU92laUmWnEOAk9DB29auVnrSInIkfv4QFN9yFRcypSFHrPKtv6elUnsPlXe4ZJUlMJWoSqIAm8zzcxNvMGuirzZJUtsAgPFKiQbhB9qPWDH+qhv4U905g1tW8LzoCTvBCTfraieLOzGWdm9LktytKrG8fK5+17bTXQsPhEpSlIAAAArWFwgRsB0qTW+PH9hxpXal5biBKdIUd7qjSUnURtYk8780xgM8aczRpwEJaaSloSZBLiXPETA5MbVQ3cx0qkXtBn0\/wCLetQsPiIvyTP6+dZ+B9O+5mp0a0IbmfYkEoPoqfyrm+IwOjE4lL6e6WGkOBKBKSB4SQdUbxe\/NO5V2xdQ22yhxaUgz4SJ221Hjy22odnWed\/iWi8UhPdlsqQIgEk6jO5Cr\/GjjKrZQV1\/VMwN7R8ulJRioM8RH2\/xTOK0hSkpUVJmxjcTvTLrlpB42+NtvQ1v51hY+xObqwxDg2BJ8pg7+okepHSr+123cCPZavKoKNislZAveCTeuTZW6dJBFjsfUj8zRtD54rNjWrS12xX4kaEBIVKSJlIVfTckEAm0jaN96q+d4xetp3VJSpUEgfxpuLe+ktNnUq3I+lazVHhb\/wDUT96pOxtVTs+4EvIJEi\/MfwkAzxBg+6rojOkaGdbIUltwLJhJUUEaHEGRcXJH+2dpqg4NUEHzFFitRJCZExzt+jXTnx1ab7yG30IWe7RIEmCpK1pACo39lJjaZrXZzKk4gOglQIAIKQDFlEkgqE7frYwsVKdYJ9oAfAj8qN9jMMpaXIUAJAuJkwfMfWq9QwNyTugsKchSAEkggHcCRcjk9fPirBjcSy8hKW2yiVJsQkwkkeGRdNyOpsaEZTlQWHJV4kL06RzEj68+VWLAtONoUhLQvBSoxYyLnkn8hWeV7TeXYNv9lZdEpeZecacSdWlxoqUQDawChHW5MbUb7Q4HDOsoUwV6i2suHTAVoA8IEQIIUZAFj1qHkzRU3iFqhSw8oqIEWUUu2i6bqoxm+Bbbb1ImPEQmTA1IUNvU1i3sq1mzs5SscftNh6wfvUrsoB+xNmAQA6VX8V1kQL8gAfOhWcEjLVDriE\/9v+BT2UMPfsmHGjShzWQpZAbUELUfEfUK6bp4rV\/r\/wBCJ2udSsJ0KUoIAv8Aw+KLesFNxvWuzmYlCEJjlRUZM6dQJgdfO+w63F4v2VAg+zcXsqd44G36NSey6pSUyEgkX5MkeG\/siAbxyZpz+IXE4MvMqCELKmklalqMez44vsRCrAAxxzT\/AG0wahhlgnVpVMwRIJIET6i9EezWHW2h0Kju3NBAJJCtfeNEgQJsq0ADaJ3o5mmZs4jJ1EhJV3IggTdBAJni6a5z1v8ACpfh85OCSAbpWsRNxfV7vaq64LHqTpg7KBI4tXOvw0J7p1Iizk+d0gfara26Qr9cUc+uVUq55jmzZalP\/iKGlCf61WHEb3momaPBjDtYVs+JZDZItCQJWr1ifjVccf8AG15KKvgk\/nU\/Gvan8Ne47xR\/s0\/er6pGsZmqW1YeEQAopAn+Hu1W28h8KcxeZoLTh0kDSqRuNtx0PNV\/NnxrY\/8AUJj\/ANtdSVvpKFDaxn4UfVWm3MubRjMtI2U08gnk\/u9V481H40XzrLmxiMGoJA\/erSYAvqaVv12qi57jlNP5e4LFK4\/uCB+dH837T63sIkgJ\/fFWq+yUKkR7wK3sWrlmlm7RHMkC0dTaqDmaW3EFAIAUCPQnZQ98UQzDtAFHxpmJ93l6VXHcaTwN+AKzyu3Yqi5BmJUlAV7SElCv9qoHyis\/DTMS2rEgDZ87+cg\/ShmRuwt7\/WfqaZ7J4nQ\/iwOXJ+Kl1v8AbMruzGZtq2UB5G1Swa5MxjD1omM2VAAURA4J+NH+ylwpRMEHiQOtYgWFKcQI85FKWn0rtrml4EwoXreICSseRuajoxUCCYHG3rfrTTj5WonaTxWcqSce2lPszB2momuARH66088syE+8TTeIUBIgkyPt\/mricTsrw+pSE7avqBJ+VWXC4HUYSq4BJm1hA+9V\/D4mEogXQEm8dCTtcyN\/Srbl2JTOmeAJ45P5R6VjnphgrJWoKN\/AJ8gCBQ\/NEnQhR27xI+U\/eieNZ0PJ1fxD3Ep494NB84xqS2kAgfvEmPIEJn\/9TRx9Sp4BuUOmJKAg+njCf\/6rpOLw2EcaSENK1JacAUCQC4ClxK7ySCFKMHrXOsqxBSXgIIW2pJn\/AFBQI85Aqy5fnsMoFtSUAe8FSb\/7CP7RXT\/JKoDdocLpSSExpeWnjlKVAfI\/GiHYtcNLgnUp1KY6yALDkzUPPsQS0uf43krHuSsfSKMdg0AsLFp7wmI6JTVyv8Ub7OYP\/qcU2RsuT19pWxq5YZoaov5T13qvZV4cxxfmlo\/EJn4yas3e3nkEfSuXP0wIydYDuLR1Dav7m9P1RRhxQWyskAwi29jaq46\/oxTv9TLfyW5+dLbzjS24hR3iNrjmflVZtSP2gwQ\/+lKcm4xKEgdfASflRXLG3XMtwqNSO5KHLGSZ1LBBvYEwY2BR0JFVjtVjwcIhoQf34X5j92pPHFFOzeLV3GHbbWoQl06YBGpR3Ejz68mtX+oBc1xJEtrQZNyvfcXEG+6TeTaaa7FvoQpZWspgSB\/MJGoC06o20wbm\/VzP2VJBCgU2mTf+Y7nrtbrVaaBvHFbk2B1V3tYwtCgrVCSCIUdagFeFKQroLkkmSTanMjxqHsG8ykaTpdgSJIVqOw2IkT5muYtOxHJBozk2PKHAoGLg+tqxeGeH6GPwzf8A3j7fUJUBz4SQf+4Vb31+K1ULsK93eOUOqFD5p\/Kr08skiOhiPWfvR\/k\/sYfYWC4mdgD9qnnEoGKSVbBqw6lTgEfKg+HJCr201GxWJ\/emdwlKfnPNYWiuaOy83\/vPyA+9b761Qu91qQr+lX1TTlGEL7Zu+Bhf8jyD8iftWsxP\/WM+SHD9qY7WicOfJST84+9OLVrxDK+rM\/3RXSeCpGOxcDe9BEZguSJnm3H6+1S81ZUbi46UHMiT06+6iCiWWGXnup0q+Iv8zUPKlBOMxA6ifmD96jYfMih4rIsRB9BWYTEJVjtQmFp9\/sD8q3no1Z++rP2iojyo9Jpsu1lrVGUb1iqbT18q04TXSOcYpM1toiOt6SpIAmeNqbbX14+lN7jSQXbj61pYJmeonziBTOofWpLSVFJJHhkSfWBH+Kz4jzLsWCfreREfM1NyrGluCSJB+AoaFmSKSsweKpAtfaTPA82jSI0zPnI02qp4p+EwL7EeVaUs9ahPqvWuPHDum2lxtU7CuioKaW2L1upLzQnQmdp+xo32QzANoINgVGf7RagWPuhN5v8AapOULhB9fsKxZvEzpa8PikjHOq\/mYQR5wofaKMOYvwn+aqHhnoxAmfYifKZ+1G8ZmoGkdR9x8t65cpdh005iZxCT\/wDjInzCgfvT+KYJTIvPFoHnNDe98bZG\/jB98flRDDY0eLomIjk3kU3oK3m7C0pBULE2jab3qZk+ZuNIECQJidpm8fKms+eCkg\/1e7Y7U3gSO72kiebb8e6t+8UXm+PW7dWm\/A4Hl5UNQbmpOLWkgwn19RUSOlb4zoHG1x61Mwjkqk1AipWFTeqxCuTPhvGpJsDqHxSfvFXpvMbyOJEHzrmuKXpdQocR8qs6H4Ncuc3KZVgfxt1HrQ3Eu6rmmu+J5pKzWJEdwePLap3tF+KMYLFlZJJ6QPv61W1WNO4B8hQ8XxNqrFBfPU6sO4P6Z\/tM\/aomSPyWZ\/8Asx8DH2peY45JQpJUBqSoRxtQbIcUBokgQFC\/mZ+9M8K2YrBjcdKreZYhDTkKSbjf6frzqxJxc21arRM261T+0kqWVEgjYDpRx9VgerEhRB23J2plGN0vJcHH+fzqCq1Nk3rvOLCxrz5ZA23NufKoDmMWTM0OC6zXVOMXbbJ29KUtEUhC9vSkrcnmsxRtQ1c0hAFNhfFbne1aJSjsadQ+TaY2+oqOBf3GnFkCfdRiOIUfdSXVwRWkAfrem3E\/4qgSdXpUFe9bggxWRW4SYt76lMAfKaaiw9flTrZ0pPnRUzEr8CfL8q3hXIQR5z9KaU7MDgT86Rro\/GJMxLsLn+n86S9itWn0qNq61pEVYhVzEjTKdwYEdTTScRpBAPX41BSo9a20eTerEfxypATwAPjFZhz4Y\/XNRlmTe16xJMjypR64n30lPNaXtWJFSbJqThyKjmloXVqPY5UkDoKNMuylKuoFAnwCJG5qdgHTCRxtPv8AyrF8Q42unAqozVLW4AJrCLWuKiuuEn8qj4NZWSsmw+H6j7U+2kxJ33\/xT4iXNqgtWmpizURwXpiTsJjSnmpL2JQpF4+l6B6qWl4RpI3Iii8TKiYxPiJGxqKRRDEo26+VQXEwa6ceWgilgim1UoVpMbNq0scVjbkDb9e+lRbisAxHWlBREj9G1OOD7U2o7x0p0tIsf1zW1EQY\/XFNpVFYV+6rEfB+XwpWv\/H+aYKuhrSF+X661YMJLk0tKqyOIiPrTJpJ4LAP63pDiyd60EmY61mm3mTV0mib1val6dj5UhQv6U6iua2msje1YLm9CKCawWtSxG1Mq4oTZ3rcdN6VG5HupGoxSiya3NNg3rCq9SOCtzSEKpR3oRUk+lTcudCVCeNvU1AUYraV80WahkZhaNiSRva5P0sKdw+LBBSo9Qd\/T\/5H3UEQ4JuJ8q0HCBHnP6\/XNZ+UsCFJQmAeBP69JqQh5K06kq56e6PnVcU+T9\/lTzOJIAHx+v3rHLhapRhxQuJtppgp258IJ9+3xqCMUb9P+aljMYSf5lQJn+EAiPOiSw9VpUAAxvPut\/xUYLET0JP6\/XStOu8+6OIII\/Km0uCIt\/zarKEjvxvz\/g\/O9R3yD8vpSFCx6mm3DsBTxn6R0Ck94KSsedYkDzrWjUbVEVgN7TWVldC2TPrSHTG3NZWVI0kVsedZWVtNr\/U\/5pNtwdzWqyowpSqcbrKys0HZ5+lJJkbVlZRiaBtW1A1qsqDCdqbWOKyspJQ5pNZWVI5NuKSelbrKE0kXFJVWVlaTRNbC6ysqhKJmklVZWVQFBVYV71lZViLBpYXWVlZTaVUomT6VlZQmlVpSunNZWUAv\/FNOHY9PzrKyqIoLNq3vWVlHir\/\/2Q==\" alt=\"Planeta Selva' recorre los pinares del Mar Mediterr\u00e1neo, un ecosistema  \u00fanico poblado de seres casi mitol\u00f3gicos - RTVE.es\" \/><img decoding=\"async\" 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9fkiW3CoJstccJIu9mJyV+HC287YGrX8l9xp3S839iw0gyWsSJLlVGAdHZGzHSxlE5dUvLXyKzaN+enmaEuyUoT0W0FRPYUZ6MhgBK4DfOItdJ9y72bXZEsOn2KSLVpJKdhEiFbCLboJLxeQRb5fME0jRKjI1FlKwesQfrFYplKdsxdA46peXtApaN9i\/OyKhrSAULNJajLT\/EBZdEW2LuMHt4Nk5gyDijLSbOCrDNOMFvf8hccO3iYNgJ6oJwP\/rWJXYwrBcsNInP8QE8LRcTfVPfyhZR3H\/iZz3gd42C3wnyicth3LP4jffKduI8+AthZR3Lc\/f34ehwMoVgHD\/zx8dghZQLBSPXrzhWGWB6FYVhkvwrBYV+jtua7aF+8lKvOKjOUdmS4J7nNf6L0Rf2NU\/gUpPgDLwjaOKqrqYyw1N9DC50LbH1by0+8AoeEo0WMb8SI\/xktmJ\/43SBYl1sjaSoeEjBx4PoaKMl1PDVo9g8IicAwnAATgAmcIAnAMJwATOAZM4QBOABk\/vCKRYBcNpn++4fKJLRZOeE6yu+WJGyJK39Swq15W6Qq411T2Yy2XQuxd9\/dyyvIznYJbyHN3bV4CIt78i76+9\/9lgsrDBAmnH2h7XaXwsELe3n+xW1\/Lb5\/wAjhUpTuSJu4kKNyvxK3GYEL5ehSdt+m5JUaqkkiudJBsk6J4zsUZYQrK6fTr5Du7NdenmaqOqbzYE5pbJVPWJPVM7eUZyXI\/maR\/8AJH5GZpU6On+uK34bTcMMIt\/+T0M070l\/+ja457R82WoCQb0jR64vHE2Rklyx+Zs3zyfl7uDShJlNXUB0DKZNmkgzksC24zthv8z7ijtFdiUL1jOZ6xxlscEtlmmn80LsO+7HSuxJFw1bZC3sKrWcErI\/DCtuUuhYhV4t2mQmUk4qRIEe8Ep4wn3GmMHbAbJ7Kwqq\/puapO5Vu8QrDuWhVsudxmn+og2j3iSN0IZIc8bjOYVunKahuAAhWAcO37rxMCXuqBkj3VHlCsO5YF2i0ywNW3mjH3kSibDHS7fcLds0z4y1uIJ3wWHctS737\/jv7zEtDQyXvWz1tMLKA6XYVhliHt8LKBaHt8TYCxL0KwWGD26CwWPkEfRnzQQDCAAgAmACYBhCAIAJgGSBCGhjcT6JgH5lyUaQScRbvsnbsEQ3pc0S5sozQnfPGZ7UrkIhS0Kir+\/siaxzal9adX3EyuGyFbmSHd5HLrt8jUgAPIAuqaO4kXjfOdsZvwN+Zslaql5FCQSyodZtcztEU\/GvNGaT4TXVM2pIzyVdV5EjvMpGfrGMn4GuqZurcVPpJFLZIbGJZd0hu2yinrL5omOkF\/xZoclM6QAJrsuTsBN6CcBuiFt9mjR7vXzT\/wBEuKAAKkyDpk42bDW7bZx5boEr6LpsDdldrfdf7RbaHahVJdXQcIscT2XBjyidHHMtuq7FaqeV79H3+ZCOwEyWgzzJMubK7xwMxA+\/R9f5Ba6dV0\/hj5ydomojWEgHm99QiShvABhW6P8Aod+v\/Y4VIzBBBFq02p4OpUf+w4Qt17+xWz9\/cJSkk3dW9SfyXOI5FQg8\/f8AAeXv+UWKJEp2FVgJMq24OASPuuJifftfwP37f8jierK1NtWQChvDc5KH4myIXv3\/AGPy9+\/kMHJgkGYxImZbl2Vh+dKpbYLDv1HzlxnLsmeidyVTkeFZPCFYdxwq0pkZm9NyiOErvdCoQ7jJdxmJCyeCd1lqTxKYTQJjA3Du\/ayR4hKuMAxwv98Zcbbf1fliWhloVtx5z3bSd0gIQx60\/Xyx8IVhkhfr4wrAOh3Gdnq7aYVgGzgxMFgPl8e+fNBAMIAJgAIQyYYEwhhAAwT6+cK47DJTOewXnbuEJstK4wsTXI3IHxietitlmfoO4kpSB1137ZG4Qk7t9kVJOMUurL1pOdQlEqyQJgjRBxiE+VtmjT4kYx3QKQklQSZNi1ar6x3fCC7STe\/QGk20vCt\/MtraSXCnYGkYmWJOAt8Yno4\/Uv8AMptfJDtN2uJraShNxfVRiRvxthSez+hUY+KN9Xu+iKnDOjpULKirPxcIa0qtdyHrRTXRmqkkhxpaRpKTppF5AxI9XREbOMovpsazupxkt3uCClDiiBNhY0gLUpVjWHVhO8oq\/iQ1aM3bwvf5kNtgJWws6CrWlkzTPCRwMDd2prfqJRSi6ctnsyxZUQ2kzDyOAJTjVnYscxCVk2\/yst3aS\/MvfqOs1iSPzirWH52TpJO9MStFb39RvV3Xv0AkVQTIjAklaB7ro02jxg9+11Dp7\/fdDk2gmc8Kyqq\/yPCxfA84Xv2h+\/bGBkTeTjIBt0byjVdG+UHvy\/ofvz\/slUkgTlUUZVkjRmcHGVWDiJcoW\/z97Mb0+XvdDrFVSW1yAOoq1TZO6ZrNq4KhLVXXr3\/sHo1GXp2\/ocTrlKphYuMyVEfhWJLI3EKhaWuth63s9wSqxXVWL1C1Kv6oA8SgQW+nvYf7jKICRckbDJTJ90zkk7LU8IOvu4O1vdhyq0G2eAUTW\/I5Yo8AVwvftDHTK1JmQbxIVxvKJSVxqAxLGiQueM5dYTNXj1096RBYLk17Jk2HrWSVxOqedeCwD1pEA34YT90Sn+kJgsMavge6z46PeVGJsO44ctljzrS4axH\/AB3QWC46XR2uQmZfpUB4CJsx3R84j3T5wmAAhDJgAIBkgQBYmVk8POEO2lxymQBxOGI5Qr3LtZJ9SwNYC\/Z1jxwSInMXk6f9kpRNJMphPVFw3k48oTdnbuNRvG\/boMU1kB3FKhNNwAwAEK9nlG1mjxO3QtSQZ0hVwOinacOUT\/8AWi11rP0GZVUSp9WsuYSN5hS5moLoOLyRdWW72BCc21VImp25OzfA3nndbIajw6dnvLoWoSUSYB01C1WCAbwkbZRLea8+iLScLUur+w1HaBzlGFhHWxVbcRCk9qjHCKalRX1EaTnWS2BJbZmBtlOG3knm6MUVxKWRbxLa5cbS6j61u8bRiJeMTZQk4vZlXc4KcfEhkLnN9oTn9a35kDbCatyS9GUn\/wCyHqiW6oSSgZxhWui9TZ2gbPKE7t2eku\/cFZK8dYvp2JMgmSvaMHVWLVNHebxxg1b00l9mPRKz1j36oZwylnCVI+zpCdZOwL9ShLXw79UD08W3SS\/2Oo1T7Q1SdV9FiVbA4Lp8YW\/h+j\/0Vt4vqv8AZI0TVck2VXLSJsue8g2A7rIN9Y6+XVBtpLTz6MnV0HJNk6plXYX+U6vAShb6x1\/ce2ktPuiSaugv2c7ifaML5K1eExBvqtfsw20lp90yVGqKi9AG4n2rCu+1PCYhb6rX7MNtJafdEuaAk4KqMD9azPC\/SR3iBavTf6Mb5fFt9V\/Q7qikBS5gDVdT7VI4mxxI5yhKz0X02G3l1f13\/sdxZAzlwN7rWmhX9Rs28x3wlvl+z39GDemb7rb1QoMkzsCD12xnGT77R1eXfB1t189\/qHS\/Ty2+hYoyArSCTqkkuMnZVVrNHw4wvl\/f9j6a\/wBf0OSZgK1uqFKko\/0nhre6rnC+Xv5ofz9+o6VETUJzGsaslD+q3csfiEJ66e\/QoKwSnqhCubR4KkavBQlBa78\/uF7fL7DTkQDZ2Qbvymcv0qHCDfUWw4IM0mZxqm1Q3hJE1cSO+F5labCh0doc1iY3ELII4SlDsK6PBx7B8+EAEwDsTV9ftCuOw9Tb3Y8zhCuVlGqi83eHzVCuVZD1JSvmbrNLknCFe5VrfMduwylNWwG73lfARL1+RUdHbr73YJbkkpBv1l3IEsAcYG7u7Go2TS67voOlE01UGSOus2T4RLet3v2KUbxyx0XVjJRXEhospvUetvgvld3uxpKastIoaQctOiyi6eP7wvB5yZVuJq9IIcSWc6vRaRqjb+8S+VZVux6TeeWkVsM2Ky885opGoMTskMYTeWOSO\/UcVmnxJ6LoSxM0is5okiaRuuE5QSsqVojhd17z07EAKNLVISke8CQ8fjBoqKErvEuw1MSS\/XYtKQK8tts7McIUGlTtPrsVUi+Lmp9Nx6YmukPsa41pWE7ZjbCg7PJPYdVZo8Slv1HlnG881oupFsutK8EYwvBLJLYq3EhxIaSBn2ic+1oujWAuXK8EbYJcksktgjzx4kNJD0U5wF1mSXOujqr3EYHfEy5Hlnt3KhzrPT0fVE5LIWFZvQNoU2oVkTxliPVkFW8bZvr1ChaaeXTuugZKcTpsrTVBJFUmaRuSTBVT0mgoNa05L+BaO4WSWHxWbOqo6pHwMOSzrPDcmDdN8OpqujHVWo9ivaUdWJ0qu5W7fC0q7aSK1o6PWL+wziC0M4z7Rg6zetVG1O0boSanyy0l3HJOCzQ1j2GWKredo5rNy02jpJIxqg3cIS1lknv3G9I56e3YdA9mHWCKpFrSjoK3JPVO66Jfiyz+o0uTPT27dBqCZA5oVZ6zC9HjUOHiOEFTV831Q6ei5fo\/9C0M1SQ3NKry2ZIXySdBQ4Shz1XN9RQ0do\/QdvRWVNC37RsaBO\/NqsnvBt3wnqrS9GNKzvH1X9DNLkSWQFJP1jB0VJJvISfKyE1+rfoxp\/o26oVoyBzQzjfXZUNNHBJw3QPXxaPuJf8AHVduxY2TKuyrOJF7aiQtG0JVePdVCfaenn0Gr7w18iW1A6TRqKN6F6KV7Z3pJ3gCB6aS27jWusdyA6B7MpzZM\/ZOD2av6axMefAQZeu\/mt\/UnN028nt6FsxYhYI7KV2\/oXO08FA7oXnErTZgpZFla7tBCiN01FKu8c4NAseHCfWPdHrtnhWGq4eF5\/aFceUaUjbfsF\/M4Qr3KtZ67juJqnS1j1RZLibzCTvsXJZXrv2LC0QJkA+CE\/MxOZPT\/svI0r\/9EsWmYBWvbclMEtN9EEFd3Wr+yBshKpzrubBcDvOMD5lbZBG0JX3kMtsJVWdM1G2oPjsibuStHbuU4qLzVN+yHcTOS3jVT1UDyAhJ20hv3KavzVdF0Qyk1xXc0GhcnE\/Mwr5dI6sbWZZp6R7DSriuvQZTcntbOMLwuy1kVbOs0tIroMgBYzjmi0nVRt+ZgfK8sdwSzrPPSK2RKDWGedsbTqI9YwnyvJHd7jXMuJPwrZDMW+3du6ifgBthS05I+pUNfxZ+iIZNVRfesJ1U4y3CB6rJAUeWXFq6dkSSpt3Pr1FmQIwGExwEGk4ZFuh606nFlswpM2nc+n6tUpkb9vOCNpwyPdCnenU4q8LLKaS0oPtWpVrgXcYmHOskt+hdT8N8WGz3GcGb9uzag2rRsn1kwlzck9+g3+H+JT2e6JbRVJfo+klVqkY8U\/KBvMsk9+4JZfxKeqe6CiialO0cgk6zSrJnccDBPRZKn1CCu3Ol6otyW6grclNtwmZSrA7ZbImqpWXVF0ZRblbRsoyY7mlqaeEiokjsqnsiqqzxUoGdGXDk4VOpLk6OshWkwu4HSCScCDArVY6aSQ5Xoy5tYv7F9KQpoZ1nSa67d4A2p3bomDU3lnv3LmnTWeGseqGZamnO0UynaWzqq4dk+EJvXLU+o4x0z0vp0FoKkuTWyc05PTQbUE\/iGB3iHUvHSWq7iptTu4aPqgZeSlZQoFlSsLFNLniAfhKBxbV1qvuJSSllej+zHWrNCq83NomxaZlKeRtTE2U9YvUpyyaTWndElCgmY\/1DN4+8R7px5WwXTdnyv7BZpXXNH7jfWAKbOdA6qjVdR7q7+R74Xh0lp+weLWOv7ghQduM1pwV7N5G6tcrgRKB8vy+qGmp\/NejGziFkIdJbdGqoiovvtCh3iFZrWOqC8ZO0tGKt0oPtwUG5NIRcRhWw5Kh2TXJ9GJycXz\/VFiwsCsEhxJvU1KZ3raNiuIM4Sts9Pn\/I3mWu68v4JaeDiSGyhY6zS5p7gdU7oTTi9dPNFKSmtNfIRDyUHNqJQD9m8Jp4JXaCNwinFy5lr5olSUXlenzL824NVtwjCo42U8q8yOETeL3a9StVsjx4GE5fhRaTxVHp3PHStp9kOUyvkjcNJZhXv5\/sVay7fuOhBFqQEDtr1jwEJu++vyKUcuq083uQ2gEzSkrPbXYmBvo9PkEYq94q77vYcgE6RLqsEpsSOfyidVtoU0pPm5n2WwzouC1BI+7Raef7wl\/xV\/NlSXSbt5IcAhOjJpHaNqzwhaN66v7FJNLTlXnuFGTb7JEzi4v4CCT\/AFP0QU1d\/hr1ZCikKsm85t6ogV2uyE8ql+qX2LXWwJLpCpq6qB5ARKbelNepcopc1Z69gQyt8grFVtNycOfzgco0lZasFCdZ3lpFdCunP52TTQ0RecDhZuiqccnPPcmtPi2p09jataaOzVVaSCAm+f7Rik6tS6OiTjQpWepRkOhmddV0rBs+UXiKi8KMsJSl4pGelOZ+kWaqZS4D94uC4dPXdmc3xq+myNvSRdVpKMSZ9w\/cRlhVebZvjnamol6G\/wDTKF+gfATiG\/xUzVR\/AafYpyCQtkoO8RWI5Z3M8I89LKxcgvVSppV4JEjsh4iN7TQsJK16cuhW2TRn6vUWZp5+pRT\/ABqd+qIjehWy9GXZYo5QRSGt1cDHfEUJ5lw5ehpiIOD4sPUvdaTSUBaDJwWpV8DEKToyyvYuUVXipR3KU0hLwLL4qOC44g7QYtxdN54aolTjVXDqaSNCVKQ2UUhNZEpVxaCN+KTEO0pKVPfsWm4xcau3cOj2qUhQUmZqz2b4MTve2oYXw2TujIy9\/DPqbIkhRmme\/Z6wjRx4tNSW5lGfAquD2exteoqkKL7GlW10bd6d8ZRmpLJP6msqbhJ1Ket90JRH0PTqGXaacFZM92KfKHOMqe\/1QoTjV29UyHqQaOuRSoNK31kA7AbwNxgjFVY6bhKfCdnsy3+FI9rRCLbS3PRVvTsMLPflq\/UfDa56P06Fbbzbq5glikC+Y1veHWG+G4ygv1RJjKM5fpkFPUQQp9CkkXPtaQ\/ML5bjBC1rQfowqO2s1bzRr+valNCyLUkSIPFJtHI84z\/8cr7GulSHRlFEpo+rUVMudlWkhXJV44GLlTfiWqIhUXhlo\/MV5stGsUKQn7xkzRxU2dXl3w01NWvfyf8AJMlkd7W81t9C15AdSFlKXZXONGo4nlj3nhEp5HbbyexTSmr7+a3Bl5SklAKaQjrNrAQ6niDYT3QOKTv4X3WwJtq3iXnuU5toWCkOM\/8ArULRwrWyirye8U\/Mm0VtJryOCFC4K\/K2PNUdvn+5wbaX9F\/JYBUFtVv\/AJLMT4vP9i7ZV0j92SyitahE9q3D8IG7bv0Q4xzaxV\/NkOKTcpRdV2U2JHdAr7rT5ill2bzPsti0Nqq+0UGkYJFhPxMS2r8quy8src7yryIZUTosNyHbUJkwNJazfoEW3pSj6sZYbQdMl1zZOcuJwhLNLbRDahB8zzSGza12ukIb7IMh+8LNGOkdWPJOetR2iApHVo6N1cjygy9aj9B5\/wAtFeoBltrSdUVuHqi0wZpT0irIMkKTzVHeRZSwtaayyG2xcnE8dp3RMMsXaOrKqKc43k8sexoyQE1JoTtvxPynEVr5uZmuGUcl4I5NDm66S5aY6Z8kOU4aV6tVuZ1cuP5tkBPWsnulHNh4553fQ7cXUdOnaPUTIFFAFbExWJnrYnBUrRzGLKLmdpFXBJl3X+Ma0lw6VznrPi18vRHXym5m6OZXkADn+045aSz1TuxEuHRZR0aakie0mLxUrysZYGFoXMgX\/rFS4eAjW34CMb\/\/ACma+kzc2krxCvP\/ABGWElzOJtjo8il2NeSXa7YCrQRaPXOM6yyyujehLPT1ORRFFh9TfVnZzu8PKOmdqtNSOKm3RrOHQ6OXqEHEZxNi0W7yBGGHqZZZXszoxdHPHMt0NkGn5xFVWyRB7pQsRTySuh4WrxIWZzqa0aK8Cn6tdo3RvCSrQs90c9RPDVLrws7VIo6KS1JVh6pxBjljOVGeh2TpxrwszmZFpq21lly9J9ccI6K9OM454nNhqsoydOZfl6gf\/YZsULVAWTG3jEYer\/65l4mj\/wC2G6NOSKal5FVQmCJEHxjOtTdOV0aUKqqw1ObS2lURwFtXs1GwHA7OEbwarxtLdHPOMsPJOPhZ1n2W30jOpqqwVcRwMc0ZSpPlOqUIVVzI54pD1FVJwlbeC5Ts2K2GN8sKyutGc+epRdp6x7mn+Abd9owrNOfh1TxT8RGfElDlmro04UZ81N2ZSunSOZprY3KvSd4OBi+H+ei\/Qh1fyV169C8MOs6dHXnW8W1GagPwnHhEZoT0mrPuXlnT1pu67CMNNPe0YUWXcZCQnsWm6HJyp6T1QoxhU5oaP3uhi6FGpSm6qxc6ifeFC0cDBayzU3p2He7y1Fr3RclFIFiHG3E4KXrS2GURem9018istRbNP5nnk1yNABpHaN\/fHc8v5tWcKU2uVZUI3mwdBJdVtw\/eG8z30Qo8OL5VmZY+gyBfckOwnHlExa\/Ir+ZU4verKy7IZhSlWMoqjtkW8hClZeN3HBylpSjZd2KA2gzWS65sFvIw7ykuXRCtTg7yeaRbUdcBrENoGAs7zE3hDbVmmWpUWvKhWnkJ0WUV1bcP3huMpazdkTGcIctJXY7lG+0pK+CcOAESp\/lpoqVL89eXoS28tzRZTUTdWN\/7QOMY6zd2NTnU5aSsu5E22jVSM46fPeYOaorvRC5KTsuaROUG9Cu8qajqpFgnsAgpvmtDYdePJmqvXojZQiQ0SqzRO6VkZVPHZG9K6pXfY5fR9s1ycNsdGJdo2OPBRbk2XdJF1lIQL7Z85XxGFVk2Xj3mlGKOrRZIbmbgm3l6Ec8+aWh2Q5IXZxMhJrOKV6vjrxDtBI8\/BrNUcjZ0pXJKE7ST3f5jLCK7bN\/iDtFI6GSBJAls+EY19ZHVh1aCOFQVf6lVa8k+cdc1+ErHnUn\/APIdzu5ZYLjJCLTYZcD\/AJjjoSyVLs78VBzpNI5nR+mgaCrCMI6MTTb1RzYOqksr3LukdEM0votlrD4xOFqLWDHjaT0qR6G7I9LDjfKRHK6Ma0HCR04eoqkDjUUZmkFs3E6J9erI6pfiUlI4qf4NZw7nXy83Xo5smRIj1wnHNh5Zah14uGakyvo8olsEGe666KxK5tRYR3ppmfKDCX1zQqo6i8Ksns\/zF0pOnHXVMzrU41ZcrtJGqjZQLeg+mrhO9J5xlOkpc0DWFVx5aisZn8nLaUXaNpJNqkfLbGkaqmslT6mUqMqcs9LbsaE0pqlIqL0VDA3pNsRknRlmjsWp08RHKxUuOUcFDyc41gsWyH4h8YbUarvF2fYSlOirTV13L8nOAzDaw42eqo2p3W3iJqJrxKzNKTUvC7ox09nMKDiAQnEbJ4iNKcuIsr3M6seE80djpIcbpLdVVsx3HaIwalRldGqyVoWZymX3KGsIctaNiV\/PfHRKMa8bx3OaMp4eWWese5vpVBDknqOoJd8F7lfOMYVHDkmro3nSU+em7MrapyHTm3gW3U4zkeKTiIp03DmhqiY1VPlnpIddDpIMklpYwUsFKucrISnSe90NwrLazOH\/AA3XfXZgMOAHyjrz9KaOPhfmrP0BNIUvRZTUT2pWnhsgcFHWbuwVSU+WkrLuMpptq1ZrLOF5hKU56R0Q3CnS1nqwTnXrNRGwWTG+B5Kfmxri1vJDF5tnRQmuvwHEwss6mstEPPSocsFdkooq3CVPKkLwLhA5xhpDcFSqVdar07EqpgToUdMzirAfOFw2+aoxuso8lFXfcZuggTdfXPj8PlCdW\/LTQ40EvxKrFVSlu6LIqo7VxPDZDUIw1nqxOrOry09F3LiW6Mm6ss4Ynfuiees\/I0\/Dw0fMWi0VTis66eAwAhzqKCyQJp0pVJcSoVUukl5Wbb1BrHaflDhBU1mluRUqOtLJDbqb1FNHanjgNp9Y7ox5q07HS8uHp3OdkyjqcWXF4nwjerJQjlRy4enKpPiSNnSCk1Wwgayv7QYyw0M0szN8bUywyLdi5BZqjxisRK4sHTyop6VqmWxx8ZRWD2Zl8R\/Kjo5HVogRz19zsw\/hOR0jRVeSoWEgE8Y6sK80Gjgxyy1VJHdyY4SkHdHHVVmelRd43OBlRFWlWYyPfHbRd6Wp5ldZcRddT0rekgg3ER570ldHrJXiefyAspcWnAH4\/tHfiFeCZ5mDeWcom7pPR5oS6NZJHd\/mMMJO0nF9TfHU+TOt0ack0nONgHEW+UZ1oZJaG2HqcSGpy3SqiOyFrajYNkdMbV4eaOOTeGqaeFnUplDS8kLQZODVUPI7o54VHTeV7HXUpKqs0d+jM+T6eFgsPpFYXg3HeIupSy89NmdKrnvTqLUV5LlF00EraxBtKRuOyHFxraPRikp0NY6x\/YveordITnEGqvBQ8lbYhTnSeWWxcqcKyzx0fcTJ+U1IVmX7FXblbxth1KKks8CaVZxeSpv+5TlPJxaOfYuvUjDlFUqqmskyK1B03xKfqjqUGlpeawVOwpV5RhUg6czppVI1YXOTR6JVWQ0qqoXtr\/6nER0SnmjzK67nNClklaDt5M6QpqVzZpCJE4G48DGHDceaDOjPGXJNHPVRnKKa7RLjOIvKf2jfPGsrS0kc2SeHd46xNy0NUtAM9IaqhYQYxTnQl5G7jTxEbmH+YPsezWgrIuUMRhG3Cp1OZOxjxatLlav5mFFDmc4+rvuG6NXUty00ZKhfnrMhdMUrRZTJPalby2Q1TS1mxOtKfLSWncsRRm2hWcVNR5kncIlzlPSC0LVKnRWao9RFPuO2IFRHiYahCnrLVkupUraQ0RoQy2wmajacLybMIhynVdkaqnTw8by3Ma1uUg9lGz1eY1tCku7OdupiH2idBSm6Om63AYmMFnqyOp8PDQMLLLj6q7mrgLhyjaUo0laO5zQhUxEs09jfTKYlkVUia8B8TGMKbqO72OmrWjRjljuU5OoBKs46ZqNtuEVUqpLLAihQbfEqbiZRphcOaausCj8Jw6VNRWeZNes6j4dP1NzDKGGyo2ADvOyMpSlUlZHTCEKELswUZtVIXnF6o1Rs2RtJqlHLHc5acZYieee3Q0ZSpubk22BXPhsjOlTz80tjavX4doQ3NFDogSCpdqpTKjbv7oidRt2jsaU6Kis0tWYsivlS1HCtZ5xrXglFGGFqOU32G6UIFVCsQZeu6FhHq0HxCPKmbMj6oO718Yyr7nRhvCjmdIjXeSkXyE+ZnHRhuWDZxY7nqqKO5QUVUjh69bo5KjzM9KlHLFHEKc\/SCoXJNm+Uda\/Dp2POy8avmWyO09SA2jfKwfD1tjkjHNI9Cc1CJzsg0U2rVeTPxjfET6I5cJSesnuy3LdJFXNYkfESsicPB3zl4qosuTuPkWjlCYVeakx4WnkiVdKrW07aw7pRWE0kzP4gr018zRkN7RAPfEYiOtzXCvkSZk6T0UpIeTeJT3+ro0ws7rIzHHU2rVY7o6GSKeHESVj8RGNam4S0OihVVSJzaY0qiOZxEy2o2jskxvCSrxyvc5akXhpZo+FnRfZbpLYINt6VC8GMIylRkdMoQrwv9DNk+nqbVmX78FYKHzjSpTU1ngZUq0oS4dT\/ALGplBU2c9R8bVIwO8b4UKimslT6jqUpQfEpeqLG3W6UkW1Vi4ixSTCcZUX5FKUK8fP7orXSKvsqUkEHVclYefVMUo35qX0Jc8vJVXqWpS4zakl1o81JH\/YePGJeWpvoylnp6rWP3KgwlZztFWAqeki4E7D2TDzNctRE5VJ56T17F\/8AOEix1tSVi8SJ5giyURwW\/C9C\/wDIS0mtTl0pDaAC8oqNsh8kiOiEpS0gjGpGnBXqu5kFMWuxpNUDHGNeHGOs3c5+POelJWRpo2TBruGeMzGcq\/SJvTwq8VRiUrKqU6LInhWw5DGHCg3rMiri4x5aSIomT1KVWcMzvhzrKKtEVLDSnLNU1NVOpyGRVTIqIu2bzGVOnKpq9jetXhRVo7mKg0JTqq7ltsbVKiprLE5qNCVaWeob8o00MpqplWNw2b4wpU3Ud3sdWIrqjGy3M+SKDM5xdpNs9k40r1bLLEywtC74k9xsqUpSjmW\/zHZPCFRgks8isTVlJ8Kn6mihMoZRNRA2mIqSlUlZGlKnCjC7OeoqpC8QgXCNklRj5nK82Jl\/xR2nFpabrG4DhbsjkSdSVj0JONKF2cLJAK3S4q2ZjtrWjDKjzcKnUqObOxllUmFS2AbMQPnHJQV6iO\/FO1F2MPRzVPExtitzmwC5CelGqniZwYTdh8R8KOhktwFAIujGsrSOuhJOCscjKiVNPhxQmkn\/ACI6aLU6eVbnBiE6VbiPY7LdJS4gBJsI9ARyuDg7s74zU46CfwoZbURakW\/4h5+JKzJVNUYNo5NDpeccClXXAXx0zhkjZHHSq8WpdnpWWwBytjgk3c9SKsjybqyukmeBI5CyPSistLQ8aTc8Rqero6RUluHGPNk+a57EVocFFIDi1Mu3gmR9Yyjty5IqcTg4nEm6UzYphbKaydNPiPnjGWeNR2ehvllSV1qjW1SG6Q2UzBBv2jl6ujJwlSlctThWi0cFDa6K5JYmgmxQujsbjXjpucEVLDTs\/D3PSMuoeRIyIPr1yjhcZU5XPSTjUied06I7I2tquOz9xHby14eZ5vNhan\/FncpdGRSWxbbeCLwd22OSEpUpHdUpxrQMOT8oqaVmXrDgrBQjapSVRZ4GNKtKm+HU+pblDJpnn6PYq8pwULD3xNOrpkmOrQd+JT3\/AHLKHTkPpzbgE7lJIuMKdOVN5ol06sa0cslr2M5S5RDZNbOOJRPzEXeNbfRmVp4fbWP7F6qM28M6yqo5LWTjxGMRnlT5Z6o0cI1eaDsyg5Vfb0HGipQxSJgjAxfBhLWLsRx6kNJRu\/I\/\/9k=\" alt=\"Por qu\u00e9 las dunas de Chile y Marruecos producen extra\u00f1as melod\u00edas en el  silencio del desierto - INVDES\" \/><img decoding=\"async\" src=\"https:\/\/cdnmundo3.img.sputniknews.com\/img\/108012\/53\/1080125364_147:0:1853:960_1200x0_80_0_1_5eb70342adc6fa105cada340d99e1e12.jpg\" alt=\"La NASA muestra c\u00f3mo luce una 'cuna de estrellas' - Sputnik Mundo\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">No tendr\u00edamos sitio suficiente para reflejar aqu\u00ed todas las simetr\u00edas que nos rodean y est\u00e1n presentes en el planeta Tierra, en otros cuerpos celestes, en el Universo en fin. Como podemos ver en la \u00faltima imagen de relucientes estrellas en la inmensa Nebulosa.<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">En un sentido din\u00e1mico, la simetr\u00eda podemos entenderla como lo que se repite, lo reiterativo, lo que tiende a ser igual. Es decir, los objetos que, por mantener la misma geometr\u00eda, son representativos de otros objetos. En el Caos matem\u00e1tico encontramos concepci\u00f3n de la simetr\u00eda en el mundo los fractales. Sin embargo, la simetr\u00eda es mucho m\u00e1s. Hay distintas maneras de expresarla: \u201cConjunto de invariancias de un sistema\u201d, podr\u00eda ser una de ellas. Al aplicar una transformaci\u00f3n de simetr\u00eda sobre un sistema, el sistema queda inalterado, la simetr\u00eda es estudiada matem\u00e1ticamente usando teor\u00eda de grupos. Algunas de las simetr\u00edas son directamente f\u00edsicas. Algunos ejemplos son las reflexiones y las rotaciones en las mol\u00e9culas y las translaciones en las redes cristalinas.<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\"><img decoding=\"async\" loading=\"lazy\" id=\"irc_mi\" src=\"http:\/\/www.madrimasd.org\/blogs\/matematicas\/files\/2012\/10\/12.caracolaaurea.jpg\" alt=\"\" width=\"413\" height=\"393\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 Aqu\u00ed hay mucho m\u00e1s de lo que a simple vista parece<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">Los f\u00edsicos te\u00f3ricos tambi\u00e9n se gu\u00edan en sus investigaciones por motivaciones est\u00e9ticas tanto como racionales. Poincar\u00e9 escribi\u00f3: \u201cPara hacer ciencia, es necesario algo m\u00e1s que la pura l\u00f3gica\u201d. \u00c9l identific\u00f3 ese elemento adicional como la intuici\u00f3n, que supone \u201cel sentido de la belleza matem\u00e1tica\u201d. Heisenberg hablaba de \u201cla simplicidad y belleza de los esquemas matem\u00e1ticos que la Naturaleza nos presenta\u201d.<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\"><img decoding=\"async\" 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\" alt=\"Las simetr\u00edas biol\u00f3gicas del Universo : Blog de Emilio Silvera V.\" \/><img decoding=\"async\" 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\" alt=\"Simetr\u00edas en la naturaleza\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcSa3CTryW3AGDu7G0DsB8FTZSyH3VIVDqZvhA&amp;usqp=CAU\" alt=\"Ritmos y simetrias: Bases para la vida - Monografias.com\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcQuj5LKBjvVuHbzKKu14ecUlxXuPVufK1nyGw&amp;usqp=CAU\" alt=\"Blog para la reflexi\u00f3n: Simetr\u00eda: el lenguaje de la naturaleza\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\">La simetr\u00eda est\u00e1 presente por todas partes y, cada objeto, tiene la suya que siempre, est\u00e1 relacionada con la de otro de la misma especie. Hay simetr\u00edas que\u00a0<strong>en f\u00edsica<\/strong>\u00a0incluye todos los rasgos de un sistema f\u00edsico que exhibe propiedades de la simetr\u00eda \u2013 eso es, que bajo ciertas transformaciones, aspectos de esos sistemas son \u201cincambiables\u201d, de acuerdo a una observaci\u00f3n particular. Una simetr\u00eda de un sistema f\u00edsico es un rasgo f\u00edsico o matem\u00e1tico de un sistema que es preservado sobre cierto cambio.<\/p>\n<p style=\"text-align: justify;\">En matem\u00e1tica,\u00a0 una transformaci\u00f3n es un operador aplicado a una funci\u00f3n tal que bajo esa transformaci\u00f3n, ciertas operaciones sean simplificadas. En ejemplo, en la aritm\u00e9tica cuando se busca un algoritmo de n\u00fameros, el proceso de b\u00fasqueda es reducido a la suma de los algoritmos de cada factor.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/espaciociencia.com\/wp-content\/uploads\/2015\/01\/punto-de-ebullicion-de-agua-600x325.jpg\" alt=\"Resultado de imagen de Recipiente con agua apunto de hervir\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">Por ejemplo, veamos la invariancia de escala: En un recipiente con agua a punto de hervor, las burbujas de vapor, nucleadas en el fondo del recipiente, crecen, se liberan, y fluct\u00faan\u00a0 hasta la superficie de donde se escapan para la atm\u00f3sfera. A la temperatura de ebullici\u00f3n, el agua existe al mismo tiempo en dos fases distintas \u2013 l\u00edquido y gas \u2013 y a medida que las burbujas se forman las dos fases se separan en el espacio. Si cerramos el recipiente la temperatura de ebullici\u00f3n aumenta, como en una olla a presi\u00f3n. A medida que la presi\u00f3n aumenta, el sistema llega al punto cr\u00edtico, donde las propiedades del l\u00edquido y del gas se vuelven id\u00e9nticas. Por encima de esa temperatura, en el r\u00e9gimen supercr\u00edtico, dejan de existir dos fases distintas y existe apenas un fluido homog\u00e9neo.<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\"><img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/1.bp.blogspot.com\/-y6wJIBmByOo\/T7IcYVgTpQI\/AAAAAAAAAD0\/6MEWvH6GYsA\/s400\/2456212-el-agua-hirviendo-en-una-olla-m-s-clara-de-gas.jpg\" alt=\"\" width=\"400\" height=\"300\" border=\"0\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\">Cerca del punto cr\u00edtico, la materia fluct\u00faa sin l\u00edmites. Burbujas y gotas, unas tan peque\u00f1as como unos cuantos \u00e1tomos, otras tan grandes como el recipiente, aparecen y desaparecen, se unen y se separan. Exactamente en el punto cr\u00edtico la escala de las mayores fluctuaciones divergen, pero el efecto de las fluctuaciones en escalas menores no es despreciable. La distribuci\u00f3n de las fluctuaciones es invariable para transformaciones de escala.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" id=\"irc_mi\" src=\"http:\/\/2.bp.blogspot.com\/-1Tdhu4AI5Fw\/UN86Dwwzy4I\/AAAAAAAAB-c\/RwFpi6R7VNo\/s400\/Copia+de+Ruptura+de+simetr%C3%ADa.png\" alt=\"\" width=\"336\" height=\"229\" \/><\/p>\n<p style=\"text-align: justify;\">De la figura se deduce que la teor\u00eda tiene una \u201csimetr\u00eda interna\u201d: la figura no cambia cuando hacemos rotaciones en el plano definido por A y B. La invariancia es definida matem\u00e1ticamente por transformaciones que dejan magnitudes sin cambio. Por ejemplo, la distancia entre dos puntos de un s\u00f3lido que se mueve, pero no se deforma.<\/p>\n<p style=\"text-align: justify;\">\n<h3 style=\"text-align: justify;\">Simetr\u00edas locales y globales<\/h3>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/upload.wikimedia.org\/wikipedia\/commons\/thumb\/b\/b3\/Components_stress_tensor_cartesian.svg\/220px-Components_stress_tensor_cartesian.svg.png\" alt=\"\" \/><img decoding=\"async\" src=\"https:\/\/upload.wikimedia.org\/wikipedia\/commons\/thumb\/8\/8e\/Metal_yield.svg\/220px-Metal_yield.svg.png\" alt=\"\" \/><\/p>\n<p style=\"text-align: justify;\">Un tensor de segundo orden, en tres dimensiones y\u00a0<span><span>Prueba de tracci\u00f3n: Ensayo de tracci\u00f3n.<\/span><\/span><br \/>\n<span><span>El l\u00edmite el\u00e1stico es el punto 3<\/span><\/span><\/p>\n<p style=\"text-align: justify;\">\n<p><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Criptomoneda red inform\u00e1tica nodo gui\u00f3n red global, Servicio, tri\u00e1ngulo,  simetr\u00eda png | PNGWing\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcTMxLdWmWWAok2eRNbVb94-NgmjV0bDlrVunw&amp;usqp=CAU\" alt=\"Proveedores de Centros de Datos | Global Switch\" \/><\/p>\n<p>&nbsp;<\/p>\n<blockquote>\n<p style=\"text-align: justify;\">Una simetr\u00eda global es una simetr\u00eda que sostiene todos los puntos en el\u00a0<a title=\"Tiempo-espacio (a\u00fan no redactado)\" href=\"https:\/\/es.wikipedia.org\/w\/index.php?title=Tiempo-espacio&amp;action=edit&amp;redlink=1\">tiempo-espacio<\/a>\u00a0bajo consideraci\u00f3n, a diferencia de la simetr\u00eda local que solo sostiene a un subconjunto de puntos.<\/p>\n<p style=\"text-align: justify;\">La mayor\u00eda de las teor\u00edas f\u00edsicas son descritas por lagrangianos (En f\u00edsica, un lagrangiano es una funci\u00f3n matem\u00e1tica a partir del cual se pueden derivar la evoluci\u00f3n temporal, las leyes de conservaci\u00f3n y otras propiedades importantes de un sistema f\u00edsico) que son invariantes bajo ciertas transformaciones, cuando las transformaciones son realizadas en diferentes puntos del espacio-tiempo y est\u00e1n relacionadas linealmente \u2013 ellas tienen simetr\u00eda global.<\/p>\n<\/blockquote>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" src=\"https:\/\/upload.wikimedia.org\/wikipedia\/commons\/thumb\/e\/e7\/Hydrogen_Density_Plots.png\/220px-Hydrogen_Density_Plots.png\" alt=\"\" \/><\/p>\n<p>&nbsp;<\/p>\n<blockquote>\n<p style=\"text-align: justify;\">&#8220;Funciones de onda del <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> en un \u00e1tomo de hidr\u00f3geno a diferentes niveles de energ\u00eda. La mec\u00e1nica cu\u00e1ntica no puede predecir la ubicaci\u00f3n exacta de una part\u00edcula en el espacio, solo la probabilidad de encontrarla en diferentes lugares. Las \u00e1reas m\u00e1s brillantes representan una mayor probabilidad de encontrar el <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a>.&#8221;<\/p>\n<\/blockquote>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Por ejemplo, en toda teor\u00eda cu\u00e1ntica\u00a0la fase global de una funci\u00f3n de onda es arbitraria y no representa algo f\u00edsico. Consecuentemente, la teor\u00eda es invariante bajo a cambio global de fases (Agregando una constante a la fase de todas las funciones de onda, en todos lados); esto es una simetr\u00eda global. En la electrodin\u00e1mica cu\u00e1ntica, la teor\u00eda es tambi\u00e9n invariante bajo un cambio local de fase, es decir, que se puede alterar la fase de todas las funciones de onda tal que la alteraci\u00f3n sea diferente en cada punto del espacio-tiempo. Esto es una simetr\u00eda local.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Simetr\u00edas : Blog de Emilio Silvera V.\" \/><img decoding=\"async\" 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\" alt=\"Teor\u00eda cu\u00e1ntica de campos - Wikipedia, la enciclopedia libre\" \/><img decoding=\"async\" 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\" alt=\"La Naturaleza? \u00a1Simetr\u00eda dentro de la Diversidad! : Blog de Emilio Silvera  V.\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcRi7vejHCvtK9ehLd7r1iHtVI4Q4RcAy8M1Eg&amp;usqp=CAU\" alt=\"GEOMETR\u00cdA Y SU DID\u00c1CTICA PARA MAESTROS Juan D. Godino Francisco Ru\u00edz\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Una simetr\u00eda global es una simetr\u00eda que sostiene todos los puntos en el tiempo-espacio bajo consideraci\u00f3n, a diferencia de la simetr\u00eda local que solo sostiene a un subconjunto de puntos.<\/p>\n<p style=\"text-align: justify;\">La mayor\u00eda de las teor\u00edas f\u00edsicas son descritas por lagrangianos (En f\u00edsica, un lagrangiano es una funci\u00f3n matem\u00e1tica a partir del cual se pueden derivar la evoluci\u00f3n temporal, las leyes de conservaci\u00f3n y otras propiedades importantes de un sistema f\u00edsico) que son invariantes bajo ciertas transformaciones, cuando las transformaciones son realizadas en diferentes puntos del espacio-tiempo y est\u00e1n relacionadas linealmente \u2013 ellas tienen simetr\u00eda global.<\/p>\n<p style=\"text-align: justify;\">Por ejemplo, en toda teor\u00eda cu\u00e1ntica la fase global de una funci\u00f3n de onda es arbitraria y no representa algo f\u00edsico. Consecuentemente, la teor\u00eda es invariante bajo a cambio global de fases (Agregando una constante a la fase de todas las funciones de onda, en todos lados); esto es una simetr\u00eda global. En la electrodin\u00e1mica qu\u00e1ntica, la teor\u00eda es tambi\u00e9n invariante bajo un cambio local de fase, es decir, que se puede alterar la fase de todas las funciones de onda tal que la alteraci\u00f3n sea diferente en cada punto del espacio-tiempo. Esto es una simetr\u00eda local.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\"><img decoding=\"async\" loading=\"lazy\" id=\"irc_mi\" src=\"http:\/\/www.atlantico.net\/media\/atlantico\/images\/2012\/11\/20\/2014021511462232278.jpg\" alt=\"\" width=\"350\" height=\"273\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">Tambi\u00e9n se habla de ruptura de simetr\u00edas temporales en la f\u00edsica de part\u00edculas.<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">Los f\u00edsicos creen tambi\u00e9n que est\u00e1n en el camino correcto porque, de alg\u00fan modo que no pueden explicar, tienen la convicci\u00f3n de que son correctas, y las ideas de simetr\u00eda son esenciales para esa intuici\u00f3n. Se presiente que es correcto que ning\u00fan lugar del Universo es especial comparado con cualquier otro lugar del Universo, as\u00ed que los f\u00edsicos tienen la confianza de que la simetr\u00eda de traslaci\u00f3n deber\u00eda estar las simetr\u00edas de las leyes de la Naturaleza. Se presiente que es correcto que ning\u00fan movimiento a velocidad constante es especial comparado con cualquier otro. De modo que los f\u00edsicos tienen confianza en que la\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/2014\/04\/25\/%C2%A1simetria-en-la-naturaleza-2\/#\"><a href=\"#\" onclick=\"referencia('relatividad',event); return false;\">relatividad<\/a><\/a>\u00a0especial, al abrazar plenamente la simetr\u00eda entre todos los observadores con velocidad constante, es una parte esencial de las leyes de la Naturaleza.<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\"><img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"Resultado de imagen de La Ecuaci\u00f3n de Euler\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">Se dice que esta ecuaci\u00f3n de Euler es la m\u00e1s bella conocida. Aunque son muchas las ecuaciones que podr\u00edamos traer aqu\u00ed y que son de todos conocidas y han quedado como s\u00edmbolos en la historia de las matem\u00e1ticas, la de Euler, es posible que por su elegancia y simplicidad, le pueda ganar a las dem\u00e1s en belleza. Ah\u00ed, en ese sencillo conjunto, los n\u00fameros m\u00e1s significativos de las matem\u00e1ticas se abrazan:\u00a0<strong>o, 1, e,\u00a0\u03c0, y la unidad imaginaria i<\/strong>\u00a0.<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\"><img decoding=\"async\" src=\"https:\/\/image.europafm.com\/\/clipping\/cmsimages01\/\/2014\/08\/29\/15E81BBA-0641-4D8C-A706-666B680CF4B7\/30.jpg\" alt=\"F\u00f3rmula de Euler\" \/>Si se fijan en la f\u00f3rmula, en ella aparecen los 5 n\u00fameros m\u00e1s importantes en la historia de las matem\u00e1ticas. El\u00a00\u00a0y el\u00a01\u00a0que, entre otras aportaciones a esta disciplina, son famosos por ser elementos neutros y, por lo tanto, indispensables en las operaciones de suma y producto; los n\u00fameros\u00a0<em>\u03c0\u00a0<\/em>y<em>\u00a0e<\/em>, posiblemente, los dos irracionales m\u00e1s famosos (junto con\u00a0<em>\u03c6<\/em>, la raz\u00f3n a\u00farea) que existen (y que nos permiten hacer el chiste aquel de que la parte m\u00e1s irracional de nuestro cuerpo es el\u00a0pi-e); y la unidad imaginaria,\u00a0<em>i<\/em>, cuyo valor es<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\"><img decoding=\"async\" src=\"https:\/\/image.europafm.com\/\/clipping\/cmsimages01\/\/2014\/08\/29\/D68C8449-3065-483B-9135-7BC59D00361E\/30.jpg\" alt=\"Desarrollo de la f\u00f3rmula de Euler\" \/><\/p>\n<p>Si se fijan en la f\u00f3rmula, en ella aparecen los 5 n\u00fameros m\u00e1s importantes en la historia de las matem\u00e1ticas.<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">Dirac nos hablaba de ecuaciones bellas. La est\u00e9tica es, evidentemente, subjetiva, y la afirmaci\u00f3n de que los f\u00edsicos buscan la belleza en sus teor\u00edas tiene sentido s\u00f3lo si podemos definir la belleza. Afortunadamente, esto se puede , en cierta medida, pues la est\u00e9tica cient\u00edfica est\u00e1 iluminada por el sol central de la simetr\u00eda.<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\"><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"La ecuaci\u00f3n m\u00e1s bonita. \u2013 Vasos Comunicantes\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<div id=\"page\">\n<div id=\"content-wrapper\">\n<div id=\"content\">\n<div id=\"primary\">\n<article id=\"post-1830\">\n<div>\n<p style=\"text-align: justify;\">\u00c9sa es la ecuaci\u00f3n de Dirac. Gracias a esto, se describe el\u00a0fen\u00f3meno de entrelazamiento cu\u00e1ntico,\u00a0que en la pr\u00e1ctica dice que:<em>\u00a0\u2018Si dos sistemas interact\u00faan uno con el otro durante un cierto per\u00edodo de tiempo y luego se separan, lo podemos describir como dos sistemas separados, pero de alguna manera sutil est\u00e1n convertidos en un s<\/em><em>olo sistema. Uno de ellos sigue influyendo en el otro, a pesar de kil\u00f3metros de distancia o a\u00f1os luz\u2019.<\/em>\u00a0Esto es el entrelazamiento cu\u00e1ntico o conexi\u00f3n cu\u00e1ntica. Dos part\u00edculas que, en alg\u00fan momento estuvieron unidas, siguen estando de alg\u00fan modo relacionadas.\u00a0No importa la distancia entre ambas, aunque se hallen en extremos opuestos del universo. La conexi\u00f3n entre ellas es instant\u00e1nea.<\/p>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" src=\"https:\/\/ichef.bbci.co.uk\/news\/ws\/624\/amz\/worldservice\/live\/assets\/images\/2016\/01\/21\/160121160247_ecuacion_dirac_624x351_bbc_nocredit.jpg\" alt=\"Resultado de imagen de Ecuacion de Dirac\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">La llamada\u00a0ecuaci\u00f3n de Dirac\u00a0es la versi\u00f3n\u00a0relativista\u00a0de la ecuaci\u00f3n de ondas de la mec\u00e1nica cu\u00e1ntica y fue formulada por\u00a0Paul Dirac\u00a0en\u00a01928. Da una descripci\u00f3n de las\u00a0part\u00edculas elementales\u00a0de\u00a0<a href=\"#\" onclick=\"referencia('espin',event); return false;\">esp\u00edn<\/a>\u00a0\u00bd, como el\u00a0<a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a>, y es completamente consistente con los principios de la\u00a0mec\u00e1nica cu\u00e1ntica\u00a0y de la\u00a0teor\u00eda de la <a href=\"#\" onclick=\"referencia('relatividad',event); return false;\">relatividad<\/a> especial. Adem\u00e1s de dar cuenta del <a href=\"#\" onclick=\"referencia('espin',event); return false;\">esp\u00edn<\/a>, la ecuaci\u00f3n predice la existencia de\u00a0antimateria.<\/p>\n<p style=\"text-align: justify;\">\n<\/div>\n<\/article>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div id=\"atatags-26942-5fb74f7f23f97\">\u00a0<img decoding=\"async\" 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\" alt=\"Simetria y sus aplicaciones\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcSanyPF2jezG3H8SevKMWJlpE1kcjDHlrKrNA&amp;usqp=CAU\" alt=\"La importancia de la simetr\u00eda en la existencia de la vida humana. | Blog de  Jose Antonio Martin\" \/><\/div>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 La Naturaleza nos la muestra por todas partes<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">La simetr\u00eda es un concepto venerable y en modo alguno inescrutable y no podemos negar que tiene muchas implicaciones en la Ciencia, en las Artes y sobre todo, \u00a1en la Naturaleza! que de manera constante nos habla de ella. Miremos donde miremos\u2026\u00a1all\u00ed est\u00e1!<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">El f\u00edsico chino-norteamericano Chen Ning Yang gan\u00f3 el N\u00f3bel de F\u00edsica por su en el desarrollo de una teor\u00eda de campos basada en la simetr\u00eda y, a\u00fan afirmaba: \u201cNo comprendemos todav\u00eda el alcance del concepto de simetr\u00eda\u201d. Es l\u00f3gico pensar que, si la Naturaleza emplea la simetr\u00eda en sus obras, la raz\u00f3n debe estar implicada con la eficacia de los sistemas sim\u00e9tricos.<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">En griego, la palabra\u00a0<em>simetr\u00eda<\/em>\u00a0significa \u201cla misma medida\u201d (syn significa \u201cjuntos\u201d, como en sinfon\u00eda, una uni\u00f3n de sonidos, y\u00a0<em>metr\u00f3n<\/em>, \u201cmedici\u00f3n\u201d); as\u00ed su etimolog\u00eda nos informa que la simetr\u00eda supone la repetici\u00f3n de una cantidad medible. Pero la simetr\u00eda los griegos, tambi\u00e9n significaba la \u201cla debida proporci\u00f3n\u201d, lo que implicaba que la repetici\u00f3n involucrada deb\u00eda ser armoniosa y placentera, como de hecho, resultan ser en las im\u00e1genes que arriba contemplamos. Asi, la Naturaleza nos est\u00e1 indicando que una relaci\u00f3n sim\u00e9trica debe ser juzgada por un criterio est\u00e9tico superior.<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\"><img decoding=\"async\" src=\"https:\/\/l450v.alamy.com\/450ves\/by7tjm\/humo-de-color-simetrico-arte-contra-un-fondo-negro-by7tjm.jpg\" alt=\"Arte de humo sim\u00e9trico Fotograf\u00eda de stock - Alamy\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0Humo sim\u00e9trico<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">Muchos de nosotros, la mayor\u00eda, conocimos la simetr\u00eda en sus manifestaciones geom\u00e9tricas de aquellas primeras clases en la Escuela Elemental, m\u00e1s tarde en el arte y, finalmente, la pudimos percibir en la Naturaleza, en el Universo y en nosotros mismos que, de alguna manera, somos de ese Universo de simetr\u00eda.<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">Los planetas son esf\u00e9ricos y, por ejemplo, tienen simetr\u00eda de rotaci\u00f3n. Lo que quiere indicar es que poseen una caracter\u00edstica -en caso, su perfil circular- que permanece invariante en la transformaci\u00f3n producida cuando la Natuiraleza los hace rotar. Las esferas pueden Hacerse rotar en cualquier eje y en cualquier grado sin que cambie su perfil, lo cual hace que sea m\u00e1s sim\u00e9trica.<\/p>\n<p style=\"text-align: justify;\" align=\"JUSTIFY\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/www.lahuelladigital.com\/wp-content\/photos\/simetria2.jpg\" alt=\"\" width=\"150\" height=\"199\" align=\"left\" border=\"2\" hspace=\"8\" vspace=\"4\" \/><\/p>\n<p style=\"text-align: justify;\">La clave de la belleza est\u00e1 en la simetr\u00eda<\/p>\n<p style=\"text-align: justify;\">La simetr\u00eda por rotaci\u00f3n se encuentra en los p\u00e9talos de una flor o en los tent\u00e1culos de una medusa: aunque sus cuerpos roten, permanecen iguales. La simetr\u00eda bilateral que hace que los lados derecho e izquierdo sean iguales y se presenta en casi todos los animales, incluido nosotros. Pero es uniendo estos aspectos se obtienen figuras realmente armoniosas. Si se trata de desplazamiento y rotaci\u00f3n en un\u00a0 mismo plano hablamos de una espiral, mientras que en el espacio ser\u00eda una h\u00e9lice, aunque ambas se encuentran por todas partes en la naturaleza.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Las simetr\u00edas se generan mediante las fuerzas que act\u00faan sobre los cuerpos, descritas por leyes rigurosas e inequ\u00edvocas, como una f\u00f3rmula matem\u00e1tica y dependen de la existencia de fuerzas distintas que act\u00faan en diversas\u00a0 direcciones. Si \u00e9stas permanecen en equilibrio, no hay preferencia alguna hacia arriba o abajo, a la derecha o a la izquierda, y los cuerpos tender\u00e1n a ser perfectamente esf\u00e9ricos, como suele ocurrir en el caso de virus y bacterias, las estrellas y los mundos\u2026 las galaxias. Adem\u00e1s, cuando el aspecto no es el de una esfera perfecta, la Naturaleza har\u00e1 todo lo posible para acercarse a esta.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/4.bp.blogspot.com\/_goBY-P2onxs\/TGFP75hF-tI\/AAAAAAAAAF4\/5-RRpTr2lwk\/s1600\/neurona8.bmp\" alt=\"\" width=\"365\" height=\"193\" \/><\/p>\n<p style=\"text-align: justify;\">La simetr\u00eda tambi\u00e9n est\u00e1n presentes\u00a0 en\u00a0 nuestros cerebros<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\u00bfSer\u00eda posible que la simetr\u00eda\u00a0<em>material<\/em>\u00a0tuviera un paralelismo en la abstracci\u00f3n\u00a0<em>intelectual<\/em>\u00a0que son las leyes f\u00edsicas? luego hace falta un esfuerzo mental considerable para pasar de lo material a lo intelectual, pero cuando se profundiza en ella, la conexi\u00f3n aparece. En la naturaleza existen muchas cosas que nos pueden llevar a pensar en lo complejo que puede llegar a resultar entender cosas que, a primera vista, parec\u00edan sencillas.<\/p>\n<p style=\"text-align: justify;\">Me explico:<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" id=\"irc_mi\" src=\"http:\/\/k37.kn3.net\/3A67CE214.jpg\" alt=\"\" width=\"400\" height=\"300\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Fij\u00e9monos, por ejemplo, en una Flor de Girasol y en las matem\u00e1ticas que sus semillas conllevan. Forman una serie de n\u00fameros en la que cifra es la suma de las dos precedentes (por ejemplo 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233\u2026) se denomina, en t\u00e9rminos matem\u00e1ticos, sucesi\u00f3n de Fibonacci, una ley que se cumple incluso en el mundo vegetal, como hemos podido comprobar en las semillas del girasol, dispuestas en espiral y que respetan \u00e9sta f\u00f3rmula. La podemos ver por todas partes.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/marcianosmx.com\/wp-content\/uploads\/2012\/05\/numero-aureo-fibonacci_9.jpg\" alt=\"\" width=\"365\" height=\"365\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 Lo mismo ocurre con otros ejemplares de la diversidad del mundo de las plantas<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">En el mundo inorg\u00e1nico las leyes de la cristalizaci\u00f3n del agua congelada, determinadas por las fuerzas que act\u00faan entre las mol\u00e9culas, hacen que los cristales adopten formas que son infinitas y var\u00edan con respecto a un tema com\u00fan: la estrella de seis puntas. Sin embargo, los planetas son esf\u00e9ricos porque han nacido en la primordial que rodeaba al Sol, atrayendo materia indiferentemente de todas partes.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"Una gu\u00eda para descubrir? \u00a1La simetr\u00eda! : Blog de Emilio Silvera V.\" \/><img decoding=\"async\" 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\" alt=\"Confirman la simetr\u00eda fundamental en la naturaleza\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Claro que, en la Naturaleza, nada ocurre porque s\u00ed, todo tiene su por qu\u00e9, y, todo lo que en ella podemos contemplar posee una funcionalidad que est\u00e1 directamente relacionada con su mec\u00e1nica, con el medio en el que habita, con lo que el Universo espera que haga en su medio y, para ello, dota a figura con aquellos \u201ctrajes\u201d que mejor les permita realizar aquello para lo que est\u00e1n destinados.<\/p>\n<p style=\"text-align: justify;\">Vamos a generalizar un paso m\u00e1s el concepto de simetr\u00eda, plante\u00e1ndonos si es posible\u00a0<em>que una ley f\u00edsica se cumpla en cualquier lugar<\/em>. \u00bfEn cualquier lugar\u2026 de d\u00f3nde?, \u00bfde nuestra ciudad?, \u00bfde nuestro planeta? No: del universo. Una ley que fuera v\u00e1lida en cualquier lugar del universo ser\u00eda una ley\u00a0<em>sim\u00e9trica respecto al espacio<\/em>. Se cumplir\u00eda dondequiera que se hiciese un experimento para comprobarla.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"Puede una persona atravesar un agujero de gusano? | El Diario Vasco\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcQ6FrvqUPTHVn57urZJPSv6CgaUO15a9cpTzw&amp;usqp=CAU\" alt=\"Agujero negro - Wikipedia, la enciclopedia libre\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcRM2DKXn19I6WqGvA4zYmqb0JdIeoVJXYupJw&amp;usqp=CAU\" alt=\"Los agujeros negros podr\u00edan tener una salida | RTVE.es\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcSITYZUGgymSrlycVFTj4Fru36u78m2RTl_TQ&amp;usqp=CAU\" alt=\"Estrella negra de neutrones desconcierta a los astr\u00f3nomos - Gaceta UNAM\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">F\u00edjense que nuestra idea de simetr\u00eda se va haciendo m\u00e1s compleja y m\u00e1s profunda. no nos detenemos en ver si la forma material de un objeto es sim\u00e9trica, ni de si la escritura de una f\u00f3rmula matem\u00e1tica es sim\u00e9trica. Ahora nos preguntamos si una ley f\u00edsica es v\u00e1lida en todo el Universo.<\/p>\n<p style=\"text-align: justify;\">La otra simetr\u00eda interesante para una ley f\u00edsica es la que se refiere al tiempo. Cierta ley f\u00edsica se cumple ; \u00bfantes tambi\u00e9n?, \u00bfse cumplir\u00e1 pasado alg\u00fan tiempo? Una ley que fuera cierta en\u00a0<em>cualquier instante<\/em>\u00a0de la historia del universo ser\u00eda una ley\u00a0<em>sim\u00e9trica respecto al tiempo<\/em>.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"http:\/\/www.monografias.com\/trabajos91\/ritmos-y-simetrias-bases-vida\/image014.jpg\" alt=\"Monografias.com\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Lo que nos preguntamos es: \u00bfson sim\u00e9tricas o no las leyes de la f\u00edsica?<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Hasta donde alcanzan nuestras medidas,\u00a0<em>las leyes f\u00edsicas<\/em>\u00a0(y, por tanto, la interacci\u00f3n gravitatoria)\u00a0<em>s\u00ed son sim\u00e9tricas respecto al espacio y respecto al tiempo.\u00a0<\/em>En cualquier lugar y momento temporal del universo, la Naturaleza se comporta igual que aqu\u00ed y ahora en lo que se refiere a estas leyes.<\/p>\n<p style=\"text-align: justify;\">Esta simetr\u00eda es un arma muy poderosa para investigar hacia el pasado y hacia el futuro, ya que nos permite suponer (y, en la medida en que confiemos en la seguridad de la simetr\u00eda,<em>conocer<\/em>) locales donde jam\u00e1s podremos llegar por la distancia espacial y temporal que nos separa de muchas partes del universo. As\u00ed, por ejemplo, gracias a esta simetr\u00eda, podemos calcular que el Sol lleva 5.000 millones de a\u00f1os produciendo energ\u00eda y que le quedan, probablemente, otros 5.000 millones hasta que consuma toda su masa. Esto lo podemos aventurar suponiendo que en ese enorme tramo de 5.000 + 5.000 = 10.000 millones de a\u00f1os las leyes f\u00edsicas que determinan los procesos mediante los cuales el Sol consume su propia masa como combustible (las reacciones nucleares que le permiten producir energ\u00eda), fueron, son y ser\u00e1n las mismas aqu\u00ed en el Brazo de Ori\u00f3n donde nos encontramos como en los arrabales de la Galaxia Andr\u00f3meda donde luce una estrella como nuestro Sol que, tambi\u00e9n env\u00eda luz y calor a sus planetas circundantes, y, por muy lejos que podamos mirar, siempre veremos lo mismo.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/www.biocab.org\/Galaxies_Nest.jpg\" alt=\"\" width=\"608\" height=\"439\" \/><\/p>\n<p style=\"text-align: justify;\">\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 Por tanto, en cierto modo, la simetr\u00eda se vuelve tan importante o m\u00e1s que la propia ley f\u00edsica.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"http:\/\/4.bp.blogspot.com\/_-GPmefGS5yY\/SC1vLcHzpjI\/AAAAAAAAAU0\/Vj4FufDcYh8\/s400\/maori.jpg\" alt=\"Resultado de imagen de los maor\u00edes neozelandeses se decoran el rostro\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">La regularidad de las formas de la Naturaleza se refleja incluso en la cultura humana, que desde siempre intenta inspirarse en el mundo natural conformar su propio mundo. Existen h\u00e9lices en las escaleras de palacios, castillos y minaretes y en las decoraciones de esculturas y columnas. Las espirales abundan en los vasos, en los bajorrelieves, en los cuadros,\u00a0 en las esculturas en los collares egipcios, griegos, celtas, precolombinos e hind\u00faes e, incluso, en los tatuajes con los que los maor\u00edes neozelandeses se decoran el rostro.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/www.castor.es\/joconde.gif\" alt=\"\" width=\"245\" height=\"393\" \/><\/p>\n<p style=\"text-align: justify;\">\n<blockquote>\n<p style=\"text-align: justify;\">\u00bfTen\u00eda en mente Leonardo la proporci\u00f3n \u00e1urea a la hora de realizar su obra maestra? Afirmarlo resultar\u00eda aventurado. Menos pol\u00e9mico es aseverar que el genio florentino conced\u00eda gran importancia a la relaci\u00f3n entre la est\u00e9tica y la matem\u00e1tica. Dejaremos la cuesti\u00f3n en el aire por el momento, no sin antes mencionar que Leonardo realiz\u00f3 las ilustraciones de una obra de contenido estrictamente matem\u00e1tico, escrita por su buen amigo Luca Pacioli, llamada &#8220;De divina proportione&#8221;, es decir, &#8220;La divina proporci\u00f3n&#8221;.<\/p>\n<p>&nbsp;<\/p><\/blockquote>\n<p style=\"text-align: justify;\">La b\u00fasqueda de la perfecci\u00f3n geom\u00e9trica y de las propiedades matem\u00e1ticas pueden ser una gu\u00eda importante en el estudio cient\u00edfico del mundo. Paul Dirac, una de los padres de la moderna mec\u00e1nica cu\u00e1ntica, sol\u00eda decir que \u201csi una teor\u00eda es bella desde el punto de vista matem\u00e1tico, muy probablemente es tambi\u00e9n verdadera\u201d.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcS8vzTHwwRWEJWlAjK2KHZ_aEibKHZRHqlTcg&amp;usqp=CAU\" alt=\"La Entrop\u00eda! con el paso del tiempo, todo lo destruye : Blog de Emilio  Silvera V.\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcSTHR4VgsGI_Y-wl6sr9JDQLQ2KxBy6YRJL-Q&amp;usqp=CAU\" alt=\"Supernova | National Geographic\" \/><\/p>\n<p style=\"text-align: justify;\">El paso inexorable del Tiempo lo transforma todo, lo que antes fue&#8230; Hoy es algo diferente<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">A todo esto, no debemos olvidar que todo, sin excepci\u00f3n, en nuestro Universo, est\u00e1 sometido a la Entrop\u00eda que nos trae el paso inexorable de eso que llamamos \u201cTiempo\u201d, y que, convierte perfectas simetr\u00edas de joven belleza, en deteriorados objetos o entidades que, nos viene a recordar que nada es perpetuo, que todo pasa y se transforma. Claro que, de alguna manera, todo vuelve a resurgir.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><a href=\"https:\/\/www.prosperidaduniversal.org\/mujer-exitosa-1\/libro-de-deseos\/para-el-alma\/\"><img decoding=\"async\" id=\"cc-m-textwithimage-image-5118163711\" src=\"https:\/\/image.jimcdn.com\/app\/cms\/image\/transf\/dimension=267x1024:format=jpg\/path\/s747ae4b5e2119fd4\/image\/ia4d64ba640f8ad8f\/version\/1472233212\/belleza-interior-prosperidad-universal.jpg\" alt=\"BELLEZA INTERIOR - PROSPERIDAD UNIVERSAL\" data-src-width=\"612\" data-src-height=\"768\" data-src=\"https:\/\/image.jimcdn.com\/app\/cms\/image\/transf\/dimension=267x1024:format=jpg\/path\/s747ae4b5e2119fd4\/image\/ia4d64ba640f8ad8f\/version\/1472233212\/belleza-interior-prosperidad-universal.jpg\" data-image-id=\"3394302611\" \/><\/a><\/p>\n<p style=\"text-align: justify;\">La Belleza m\u00e1s valiosa no la podemos ver. \u00a1Vive en el interior!<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Un dolor que llevo dentro de m\u00ed es el no poder contemplar la verdadera belleza que\u00a0 estando presente en los seres vivos inteligentes, en la mayor\u00eda de los casos, se nos queda oculta a nuestra percepci\u00f3n, toda vez que esa clase de belleza, que no podemos ver pero s\u00ed percibir, s\u00f3lo la podemos captar con el trato y la convivencia y, verdaderamente, tengo que admitir que, algunas bellezas que he tenido la suerte de poder \u201cver con los ojos del esp\u00edritu\u201d, llegan a ser segadoras, deslumbrantes, su esplendor es muy superior al de la estrella m\u00e1s brillante del cielo, y,\u00a0 seguramente (estoy seguro) como a muchos de ustedes les pasa, tengo la suerte de tenerla junto a m\u00ed desde hace muchos a\u00f1os. y, si pienso en ello en profundidad y detenimiento, no tengo m\u00e1s remedio que concluir que es ese brillo y esplendor el que me da la fuerza para seguir cada d\u00eda en la dura lucha que nos hacen participar.<\/p>\n<p style=\"text-align: justify;\">\u00a1S\u00ed que es importante la Belleza! Dirac ten\u00eda toda la raz\u00f3n. Y, no digamos las Simetr\u00edas que indican con el dedo de la Naturaleza el camino a seguir a muchos f\u00edsicos que quieren desvelar sus secretos.<\/p>\n<p style=\"text-align: justify;\">emilio silvera<\/p>\n<\/div>\n<\/div>\n<div class='bookmark'>\r\n\t\t<table align='left' border='0' cellpadding='0' width='100%'>\r\n\t\t<tr><td><span class='pushbutton'><a href='http:\/\/delicious.com\/post?url=https%3A%2F%2Fwww.emiliosilveravazquez.com%2Fblog%2F2020%2F11%2F20%2F%25c2%25bfla-naturaleza-%25c2%25a1simetria-dentro-de-la-diversidad-6%2F&amp;title=%C2%BFLa+Naturaleza%3F+%C2%A1Simetr%C3%ADa+dentro+de+la+Diversidad%21' title='Delicious' target='_blank' rel='nofollow'><img src='https:\/\/www.emiliosilveravazquez.com\/blog\/wp-content\/plugins\/knxdt-bookmarks-wordpress-plugin\/images\/delicious.png'  alt='' class='book_img' border='none' style='margin:1px; padding: 0;'  \/><\/a><\/span><span class='pushbutton'><a href='http:\/\/digg.com\/submit?url=https%3A%2F%2Fwww.emiliosilveravazquez.com%2Fblog%2F2020%2F11%2F20%2F%25c2%25bfla-naturaleza-%25c2%25a1simetria-dentro-de-la-diversidad-6%2F&amp;title=%C2%BFLa+Naturaleza%3F+%C2%A1Simetr%C3%ADa+dentro+de+la+Diversidad%21' title='Digg' target='_blank' rel='nofollow'><img src='https:\/\/www.emiliosilveravazquez.com\/blog\/wp-content\/plugins\/knxdt-bookmarks-wordpress-plugin\/images\/digg.png'  alt='' class='book_img' border='none' style='margin:1px; 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La Diversidad de regiones diferentes que existen dentro del mismo planeta es asombrosa y, lo mismo nos [&hellip;]<\/p>\n","protected":false},"author":2,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_s2mail":"yes","footnotes":""},"categories":[197],"tags":[],"_links":{"self":[{"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts\/18669"}],"collection":[{"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/users\/2"}],"replies":[{"embeddable":true,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/comments?post=18669"}],"version-history":[{"count":0,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts\/18669\/revisions"}],"wp:attachment":[{"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/media?parent=18669"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/categories?post=18669"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/tags?post=18669"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}