{"id":27778,"date":"2024-04-19T12:47:13","date_gmt":"2024-04-19T11:47:13","guid":{"rendered":"http:\/\/www.emiliosilveravazquez.com\/blog\/?p=27778"},"modified":"2024-04-19T12:47:21","modified_gmt":"2024-04-19T11:47:21","slug":"las-interacciones-fundamentales-8","status":"publish","type":"post","link":"https:\/\/www.emiliosilveravazquez.com\/blog\/2024\/04\/19\/las-interacciones-fundamentales-8\/","title":{"rendered":"Las Interacciones Fundamentales"},"content":{"rendered":"<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcRkzZsyesub8UQWOodzpp-BKugB7nx-oeqj8pHklp_7-0s5GfyKfKQ183if0aMAiTD5log&amp;usqp=CAU\" alt=\"Las mejores 10 ideas de La fuerza gravitacional | fuerza gravitacional, fuerza, leyes de newton\" width=\"318\" height=\"238\" \/><img decoding=\"async\" src=\"https:\/\/aprendefisicaenpocospasos.files.wordpress.com\/2017\/01\/anim_tierra_campo_magnetico.gif\" alt=\"Campo Electromagn\u00e9tico | Aprende fisica facil y r\u00e1pido\" \/><\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0\u00a0<img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"MATERIAL PARA PPT - 100ciator\" \/><img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"http:\/\/1.bp.blogspot.com\/_ehap_kTGFmU\/Sxwq46tTIII\/AAAAAAAAAE0\/veCUJATSl9s\/s200\/fuerza+nuclear+fuerte.gif\" alt=\"Las 5 fuerzas que mueven el universo - Mindmap\" width=\"267\" height=\"192\" \/><\/p>\n<blockquote>\n<ul>\n<li><strong>Gravedad<\/strong><\/li>\n<li><strong>Electromagnetismo<\/strong><\/li>\n<li><strong>Interacci\u00f3n d\u00e9bil (<a href=\"#\" onclick=\"referencia('fuerza nuclear debil',event); return false;\">fuerza nuclear d\u00e9bil<\/a>)<\/strong><\/li>\n<li><strong>Interacci\u00f3n fuerte (<a href=\"#\" onclick=\"referencia('fuerza nuclear fuerte',event); return false;\">fuerza nuclear fuerte<\/a>)<\/strong><\/li>\n<\/ul>\n<\/blockquote>\n<p style=\"text-align: justify;\">Como pueden haber deducido, me estoy refiriendo a cualquiera de los cuatro tipos diferentes de interacciones que pueden ocurrir entre los cuerpos.\u00a0 Estas interacciones pueden tener lugar incluso cuando los cuerpos no est\u00e1n en contacto f\u00edsico y juntas pueden explicar todas las fuerzas que se observan en el universo.<\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 <img decoding=\"async\" src=\"https:\/\/qph.cf2.quoracdn.net\/main-qimg-f27ea87adf088e4f0eac877539ffa32f-lq\" alt=\"En qu\u00e9 orden surgieron las cuatro fuerzas fundamentales luego del Big Bang?  - Quora\" \/><\/p>\n<p>&nbsp;<\/p>\n<blockquote>\n<p style=\"text-align: justify;\">Las fuerzas fundamentales son aquellas fuerzas del Universo que no se pueden explicar en funci\u00f3n de otras m\u00e1s b\u00e1sicas. Las fuerzas o interacciones fundamentales conocidas hasta ahora son cuatro:\u00a0<b>gravitatoria, electromagn\u00e9tica,\u00a0<span tabindex=\"0\" role=\"tooltip\"><span class=\"c5aZPb\" tabindex=\"0\" role=\"button\" data-enable-toggle-animation=\"true\" data-extra-container-classes=\"ZLo7Eb\" data-hover-hide-delay=\"1000\" data-hover-open-delay=\"500\" data-send-open-event=\"true\" data-theme=\"0\" data-width=\"250\" data-ved=\"2ahUKEwj0xP3Clc6FAxWg0gIHHVoJDJoQmpgGegQIFBAD\"><span class=\"JPfdse\" data-bubble-link=\"\" data-segment-text=\"nuclear fuerte\">nuclear fuerte<\/span><\/span><\/span>\u00a0y nuclear d\u00e9bil<\/b>.<\/p>\n<\/blockquote>\n<p style=\"text-align: justify;\">Viene de lejos el deseo de muchos f\u00edsicos que han tratado de unificar en una teor\u00eda o modelo a las cuatro fuerzas, que pudieran expresarse mediante un conjunto de ecuaciones.\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a><\/a>\u00a0se pas\u00f3 los \u00faltimos a\u00f1os de su vida intent\u00e1ndolo, pero igual que otros antes y despu\u00e9s de \u00e9l, a\u00fan no se ha conseguido dicha teor\u00eda unificadora de los cuatro interacciones fundamentales del universo. Se han hecho progresos en la unificaci\u00f3n de interacciones electromagn\u00e9ticas y d\u00e9biles.<\/p>\n<h3 style=\"text-align: justify;\">Figuras<\/h3>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcSKURNILS3k6G5aFEH9RI0p0mxCv9YbYMrjZA&amp;s\" alt=\"Exchange Particles\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcTwuhsBneLOP333iiQwXimTtJadXk8lakbm5WHTmUtTdQ&amp;s\" alt=\"Dise\u00f1o gr\u00e1fico y visualizaci\u00f3n cient\u00edfica en f\u00edsica de part\u00edculas | Francis  (th)E mule Science's News\" \/><\/p>\n<p style=\"text-align: justify;\"><strong>\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 Estos diagramas son una concepci\u00f3n art\u00edstica de los procesos f\u00edsicos.<\/strong><\/p>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"https:\/\/neofronteras.com\/wp-content\/photos\/decaimiento_neutron.jpg\" alt=\"Foto\" width=\"366\" height=\"240\" \/><\/p>\n<p style=\"text-align: justify;\"><strong>\u00a0 \u00a0 \u00a0Se ha conseguido observar por primera vez la desintegraci\u00f3n radiactiva del <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutr\u00f3n<\/a><\/strong><\/p>\n<p style=\"text-align: justify;\">Dentro de los n\u00facleos de los \u00e1tomos hay <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> y <a href=\"#\" onclick=\"referencia('proton',event); return false;\">protones<\/a>. En condiciones normales y mientras que est\u00e1n ah\u00ed los <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> son estables. Sin embargo los <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> libres son inestables, tienen una vida media de unos 10 minutos, y se desintegran produciendo un <a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a> un <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> y un antineutrino. Pero los f\u00edsicos nucleares te\u00f3ricos predijeron que una de cada mil veces los <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> decaer\u00edan en todas esas part\u00edculas y adem\u00e1s en un <a href=\"#\" onclick=\"referencia('foton',event); return false;\">fot\u00f3n<\/a>.<\/p>\n<p style=\"text-align: justify;\"><b>Un <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutr\u00f3n<\/a> libre, decaer\u00e1 con una semi-vida de unos 10,3 minutos, pero es estable si est\u00e1 combinado en el interior del n\u00facleo<\/b>. Este decaimiento es un ejemplo del decaimiento beta, con la emisi\u00f3n de un <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> y un antineutrino electr\u00f3nico<\/p>\n<pre><\/pre>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/neofronteras.com\/wp-content\/photos\/decaimientos_neutron.jpg\" alt=\"NeoFronteras \u00bb Observado el decaimiento radiativo del neutr\u00f3n - Portada -\" \/><\/p>\n<p style=\"text-align: justify;\">\u00a0Un <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutr\u00f3n<\/a> decae en un <a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a>, un <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> y un antineutrino, a trav\u00e9s de un <a href=\"#\" onclick=\"referencia('bosones',event); return false;\">bos\u00f3n<\/a> virtual (mediador). Este es el decaimiento beta del <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutr\u00f3n<\/a>.<\/p>\n<p style=\"text-align: justify;\">Una colisi\u00f3n <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> &#8211; positr\u00f3n (anti<a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a>) a alta energ\u00eda puede aniquilarlos para producir <a href=\"#\" onclick=\"referencia('mesones',event); return false;\">mesones<\/a> <em>B<\/em><sup>0<\/sup>\u00a0y\u00a0<em>B<\/em>barra<sup>0<\/sup>\u00a0a trav\u00e9s de un bos\u00f3n\u00a0<em>Z<\/em>\u00a0virtual o de un <a href=\"#\" onclick=\"referencia('foton',event); return false;\">fot\u00f3n<\/a> virtual.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">\n<pre>               <img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcTbICkm7Trzz4qIxuw_alKLg7KUhBbcL8TFt8m77yXWPw&amp;s\" alt=\"Components of the Chart\" width=\"459\" height=\"478\" \/><\/pre>\n<p style=\"text-align: justify;\">Dos <a href=\"#\" onclick=\"referencia('proton',event); return false;\">protones<\/a> que colisionan a alta energ\u00eda pueden producir varios <a href=\"#\" onclick=\"referencia('hadrones',event); return false;\">hadrones<\/a> m\u00e1s part\u00edculas de masa muy grande tales como los <a href=\"#\" onclick=\"referencia('bosones',event); return false;\">bosones<\/a> <em>Z<\/em>. Este tipo de suceso es raro pero puede darnos claves cruciales sobre c\u00f3mo es la estructura de la materia.<\/p>\n<p style=\"text-align: justify;\">Aunque no pueda dar esa sensaci\u00f3n, todo est\u00e1 relacionado con las interacciones fundamentales de la materia en el entorno del espacio-tiempo en el que se mueven y conforman objetos de las m\u00e1s variadas estructuras que en el Universo podemos contemplar, desde una hormiga a una estrella, un mundo o una galaxia. Las fuerzas fundamentales de la Naturaleza siempre est\u00e1n presentes y de alguna manera, afecta a todo y a todos.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" id=\"irc_mi\" src=\"http:\/\/3.bp.blogspot.com\/-CK2K3yAq-M8\/UZNpqRgFKfI\/AAAAAAAAAEA\/ZGiLd1INphA\/s1600\/gravedad_640.jpg\" alt=\"\" width=\"640\" height=\"293\" \/><\/p>\n<p style=\"text-align: justify;\">Cuando hablamos de la\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('relatividad',event); return false;\">relatividad<\/a><\/a>\u00a0general, todos pensamos en la fuerza gravitatoria que es unas 10<sup>40<\/sup>\u00a0veces m\u00e1s d\u00e9bil que la\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('fuerza electromagnetica',event); return false;\">fuerza electromagn\u00e9tica<\/a><\/a>. Es la m\u00e1s d\u00e9bil de todas las fuerzas y s\u00f3lo act\u00faa entre los cuerpos que tienen masa. Es siempre atractiva y pierde intensidad a medida que las distancias entre los cuerpos se agrandan. Como ya se ha dicho, su cuanto de gravitaci\u00f3n, el\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('graviton',event); return false;\">gravit\u00f3n<\/a><\/a>, es tambi\u00e9n un concepto \u00fatil en algunos contextos. En la escala at\u00f3mica, esta fuerza es despreciablemente d\u00e9bil, pero a escala cosmol\u00f3gica, donde las masas son enormes, es inmensamente importante para mantener a los componentes del universo juntos. De hecho, sin esta fuerza no existir\u00eda el Sistema Solar ni las galaxias, y seguramente, nosotros tampoco estar\u00edamos aqu\u00ed. Es la fuerza que tira de nuestros pies y los mantiene firmemente asentados a la superficie del planeta. Aunque la teor\u00eda cl\u00e1sica de la gravedad fue la que nos dej\u00f3 Isaac\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('newton',event); return false;\">Newton<\/a><\/a>, la teor\u00eda macrosc\u00f3pica bien definida y sin fisuras de la gravitaci\u00f3n universal es la Teor\u00eda de la R<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">elatividad<\/a>\u00a0General de\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a><\/a>, mucho m\u00e1s completa y profunda. En realidad nos trajo una nueva Cosmolog\u00eda.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" class=\"\" 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\" alt=\"Gravedad cu\u00e1ntica, pesando lo muy peque\u00f1o (Segunda parte) - Naukas\" width=\"293\" height=\"191\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcR3VpepK_lCpcfv_NPV5mPB9zxmO6Ia0ZCJQDIWnjOa84o8xCaqoId9QsnUmR7jFPe0AC8&amp;usqp=CAU\" alt=\"Teor\u00eda cu\u00e1ntica de campos \u2014 Astronoo\" \/><\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 <strong>\u00a0 Gravedad cu\u00e1ntica y la teor\u00eda cu\u00e1ntica de campos<\/strong><\/p>\n<p style=\"text-align: justify;\">Nadie ha podido lograr, hasta el momento, formular una teor\u00eda coherente de la Gravedad Cu\u00e1ntica que unifique las dos teor\u00edas. Claro que, la cosa no ser\u00e1 nada f\u00e1cil, ya que, mientras que aquella nos habla del macrocosmos, \u00e9sta otra nos lleva al microcosmos, son dos fuerzas antag\u00f3nicas que nos empe\u00f1amos en casar.<\/p>\n<p style=\"text-align: justify;\">La Teor\u00eda de Planck no se lleva bien con la Teor\u00eda de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a>, y, seg\u00fan parece, la teor\u00eda cu\u00e1ntica de la gravedad subyace en la Teor\u00eda de Cuerdas. Cuando los f\u00edsicos trabajan con las ecuaciones de campo de \u00e9sta teor\u00eda, sin que nadie los llame y como por arte de magua, all\u00ed aparecen las ecuaciones de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a> de la Relatividad General. \u00bfQu\u00e9 significado tendr\u00e1 eso?<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0<img decoding=\"async\" src=\"https:\/\/encrypted-tbn2.gstatic.com\/images?q=tbn:ANd9GcTrWBUWiBsF16ZTmQGgzddUaOl11dYW6GLCqVELVTgcnKAWT4uX\" alt=\"Imagen de miniatura de un resultado de Lens\" \/><img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcQ8laPVMtq0Jt9w1k0ieAZxRQ08uzWG7Kfsu7_NH5M0W9uUhNXIChv6k0XjwxxexfRcGZ8&amp;usqp=CAU\" alt=\"MECANICA CUANTICA\" width=\"420\" height=\"206\" \/><\/p>\n<blockquote><p>\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 Seguimos empe\u00f1ados en buscar esa teor\u00eda que una lo muy grande con lo muy peque\u00f1o y la Gravedad, hasta el momento no da el s\u00ed. De hecho, en el Modelo Est\u00e1ndar de la F\u00edsica de Part\u00edculas est\u00e1 ausente.<\/p>\n<p>&nbsp;<\/p><\/blockquote>\n<p style=\"text-align: justify;\">Por el momento, no hay una teor\u00eda cu\u00e1ntica de la interacci\u00f3n gravitatoria satisfactoria. Es posible que la\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><em><a href=\"#\" onclick=\"referencia('supercuerdas teoria',event); return false;\">teor\u00eda de supercuerdas<\/a><\/em><\/a>\u00a0pueda dar una teor\u00eda cu\u00e1ntica de la gravitaci\u00f3n consistente, adem\u00e1s de unificar la gravedad con los dem\u00e1s interacciones fundamentales sin que surjan los dichosos e indeseados infinitos.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\" align=\"center\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0<img decoding=\"async\" src=\"https:\/\/encrypted-tbn1.gstatic.com\/images?q=tbn:ANd9GcRYVkZ_smIh0NQF6NgNedvHNCYiXHDR5oiG9Rnrdq4IK2kktuK0\" alt=\"Imagen de miniatura de un resultado de Lens\" \/><img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"https:\/\/encrypted-tbn2.gstatic.com\/images?q=tbn:ANd9GcRjd5ETX0QoaiB6TjXvZIBroumk3UM89VvORkL4D-z0vHXBcBfG\" alt=\"Imagen de miniatura de un resultado de Lens\" width=\"348\" height=\"195\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"center\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 Las part\u00edculas colisionan ente s\u00ed y se producen cambios y transiciones de fase<\/p>\n<p style=\"text-align: justify;\" align=\"center\">Algunos han puesto en duda la realidad del Modelo Est\u00e1ndar que, como se ha dicho aqu\u00ed en otros trabajos, est\u00e1 construido con el contenido de una veintena de par\u00e1metros aleatorios (uno de ellos era el Bos\u00f3n de <a href=\"#\" onclick=\"referencia('higgs',event); return false;\">Higgs<\/a>) que no son nada satisfactorios para dar una conformidad a todo su entramado que, aunque hasta el momento ha sido una eficaz herramienta de la f\u00edsica, tambi\u00e9n es posible que sea la \u00fanica herramienta que hemos sabido construir pero que no es\u00a0<strong><em>\u00a1la herramienta!\u00a0<\/em><\/strong><\/p>\n<p style=\"text-align: justify;\" align=\"center\"><img decoding=\"async\" src=\"https:\/\/e6.pngbyte.com\/pngpicture\/280760\/png-Standard-Model-Interacciones-Del-Modelo-Est%C3%A1ndar-De-La-F%C3%ADsica-De-Particulas-particulas.png\" alt=\"Standard Model, Interacciones Del Modelo Est\u00e1ndar De La F\u00edsica De Particulas, particulas,Interacciones Modelo png | Pngbyte\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"center\">Es posible que sola sea cuesti\u00f3n de tiempo y de m\u00e1s investigaci\u00f3n y experimento. En el sentido de la insatisfacci\u00f3n reinante entre algunos sectores, se encuentran los f\u00edsicos del experimento de alta energ\u00eda BaBar, en el SLAC, un acelerador lineal situado en Stanford (California). Seg\u00fan ellos, la desintegraci\u00f3n de un tipo de part\u00edculas llamado \u00abB to D-star-tau-nu\u00bb es mucho m\u00e1s frecuente de lo predicho por el modelo est\u00e1ndar. Puede que no sea importante y puede que, hasta la existencia del Bos\u00f3n de <a href=\"#\" onclick=\"referencia('higgs',event); return false;\">Higgs<\/a> est\u00e9 en peligro a pesar de que en el LHC digan que se ha encontrado.<\/p>\n<p style=\"text-align: justify;\" align=\"center\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0<img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Desintegraci\u00f3n beta - Wikipedia, la enciclopedia libre\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"center\">Esquema del decaimiento Beta y una sencilla explicaci\u00f3n de la interacci\u00f3n d\u00e9bil<\/p>\n<p style=\"text-align: justify;\">La fuerza d\u00e9bil recibe su nombre porque a la escala de sus interacciones es la m\u00e1s d\u00e9bil dentro del modelo est\u00e1ndar. Pero ojo, esto no incluye la gravedad, puesto que la gravedad no pertenece al modelo est\u00e1ndar por el momento. La interacci\u00f3n d\u00e9bil ocurre a una escala de\u00a0 metros, es decir, la cent\u00e9sima parte del di\u00e1metro de un\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a><\/a>\u00a0y en una escala de tiempos muy variada, desde\u00a0 segundos hasta unos 5 minutos. Para hacernos una idea, esta diferencia de \u00f3rdenes de magnitud es la misma que hay entre 1 segundo y 30 millones de a\u00f1os.<\/p>\n<p>&nbsp;<\/p>\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<img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Aris. on Twitter: &quot;Al final de la era inflacionaria, a los 10 elevado a la -32 segundos desde el Big Bang, la temperatura del universo hab\u00eda descendido a los 10 elevado a\" \/><\/p>\n<p style=\"text-align: justify;\">La\u00a0<em>interacci\u00f3n d\u00e9bil<\/em>, que es unas 10<sup>10<\/sup>\u00a0veces menor que la interacci\u00f3n \u00a0electromagn\u00e9tica, ocurre entre\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('leptones',event); return false;\">leptones<\/a><\/a>\u00a0y en la desintegraci\u00f3n de los\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('hadrones',event); return false;\">hadrones<\/a><\/a>. Es responsable de la\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('desintegracion beta',event); return false;\">desintegraci\u00f3n beta<\/a><\/a>\u00a0de las part\u00edculas y n\u00facleos. En el modelo actual, la interacci\u00f3n d\u00e9bil se entiende como una fuerza mediada por el intercambio de part\u00edculas virtuales, llamadas\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('bosones',event); return false;\">bosones<\/a><\/a>\u00a0vectoriales intermediarios, que para esta fuerza son las part\u00edculas W<sup>+<\/sup>, W<sup>&#8211;<\/sup>\u00a0y Z<sup>0<\/sup>.\u00a0 Las interacciones d\u00e9biles son descritas por la teor\u00eda electro-d\u00e9bil, que las unifica con las interacciones electromagn\u00e9ticas.<\/p>\n<p>&nbsp;<\/p>\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<img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcQawUoI40I0K9Wj3IdyUkoSaAWXAZxzCHFotA&amp;usqp=CAU\" alt=\"Bosones W y Z - Wikipedia, la enciclopedia libre\" \/><img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"Bosones W y Z - Wikipedia, la enciclopedia libre\" \/><\/p>\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 Propiedades de los Bosones mediadores intermediarios de la fuerza d\u00e9bil<\/p>\n<blockquote><p>La teor\u00eda electro-d\u00e9bil es una teor\u00eda\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('gauge',event); return false;\">gauge<\/a><\/a>\u00a0de \u00e9xito que fue propuesta en 1.967 por Steven Weinberg y <strong>Abdus Salam<\/strong>, conocida como\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('weinberg salam modelo de',event); return false;\">modelo WS<\/a><\/a>.\u00a0 Tambi\u00e9n <strong>Sheldon Glashow<\/strong>, propuso otra similar.<\/p><\/blockquote>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" src=\"https:\/\/i0.wp.com\/www3.gobiernodecanarias.org\/medusa\/ecoblog\/mramrodp\/files\/2017\/02\/captura-de-pantalla-2018-02-26-a-las-0-18-21.png?resize=595%2C254&amp;ssl=1\" alt=\"Interacci\u00f3n electromagn\u00e9tica: esquemas y actividades | EL GATO DE  SCHR\u00d6DINGER. Blog de f\u00edsica y qu\u00edmica.\" \/><img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"https:\/\/www.foronuclear.org\/wp-content\/uploads\/2010\/06\/atomo-y-electrones.jpg\" alt=\"C\u00f3mo est\u00e1 constituido el n\u00facleo de los \u00e1tomos? - Foro Nuclear\" width=\"544\" height=\"385\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">La\u00a0<em>interacci\u00f3n electromagn\u00e9tica<\/em>\u00a0es la responsable de las fuerzas que controlan la estructura at\u00f3mica, reacciones qu\u00edmicas y todos los fen\u00f3menos electromagn\u00e9ticos. Puede explicar las fuerzas entre las part\u00edculas cargadas, pero al contrario que las interacciones gravitacionales, pueden ser tanto atractivas como repulsivas. Algunas part\u00edculas neutras se desintegran por interacciones electromagn\u00e9ticas. La interacci\u00f3n se puede interpretar tanto como un modelo cl\u00e1sico de fuerzas (ley de Coulomb) como por el intercambio de unos\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('foton',event); return false;\">fotones<\/a><\/a>\u00a0virtuales. Igual que en las interacciones gravitatorias, el hecho de que las interacciones electromagn\u00e9ticas sean de largo alcance significa que tiene una teor\u00eda cl\u00e1sica bien definida dadas por las ecuaciones de Maxwell. La teor\u00eda cu\u00e1ntica de las interacciones electromagn\u00e9ticas se describe con la electrodin\u00e1mica cu\u00e1ntica, que es una forma sencilla de teor\u00eda\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('gauge',event); return false;\">gauge<\/a><\/a>.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\" align=\"center\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0<img decoding=\"async\" loading=\"lazy\" id=\"irc_mi\" src=\"http:\/\/de.academic.ru\/pictures\/dewiki\/104\/hst_sn_1987a_20th_anniversary.jpg\" alt=\"\" width=\"501\" height=\"393\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"center\"><em>\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 <strong>\u00a0 \u00a0 \u00a0 \u00a0 El electromagnetismo est\u00e1 presente por todo el Universo<\/strong><\/em><\/p>\n<p style=\"text-align: justify;\">La\u00a0<em>interacci\u00f3n fuerte<\/em>\u00a0es unas 10<sup>2<\/sup>\u00a0veces mayor que la interacci\u00f3n electromagn\u00e9tica y, como ya se dijo antes, aparece s\u00f3lo entre los\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('hadrones',event); return false;\">hadrones<\/a><\/a>\u00a0y es la responsable de las fuerzas entre\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('nucleones',event); return false;\">nucleones<\/a><\/a>\u00a0que confiere a los n\u00facleos de los \u00e1tomos su gran estabilidad. Act\u00faa a muy corta distancia dentro del n\u00facleo (10<sup>-15<\/sup>\u00a0metros) y se puede interpretar como una interacci\u00f3n mediada por el intercambio de\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('mesones',event); return false;\">mesones<\/a><\/a>\u00a0virtuales llamados Gluones. Est\u00e1 descrita por una teor\u00eda\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('gauge',event); return false;\">gauge<\/a><\/a>\u00a0llamada Cromo-din\u00e1mica cu\u00e1ntica.<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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ffNFAp7M3yS3LIhbWkbudsY6Y9uWqwzcOn0+JkwVGxJUgeVUn\/Da4Ed60bYw8bkn7WMHT7Ku97dySyOB4IwCMsdztyFBI4VwgRjvCoVnzvu2FHNsnc5O2eVLuKWgnuhI6Al0ZFyc7D6vtxvWk8fvEOhoxP4NIPoYA5D8KY2DPJ9JNEY8kLgtn2OPLegUnstA0ehMgZJ0iMKSfs56j2169l8mGhWTWpTxPl9AIP0YHU8uu1NOJXckf\/TbIO3jUEj3\/wB6QXs+gcyXJz4t8k0DO1s4lVWKszyOdcmFYpgHA35D2VCVzzLOck+kc6d+X4UyuVEESxZ8WkbddxufVzxSh3oHPDTmM\/xn9FrTxV8pF4SHWRs56DAx\/OveEv8ARn+M\/otHEj9GW+wwb+e\/8qgZWHEmjTSoBcjmw2X+9ar66k2OdZKnZjoyeg2Gw6VouLUTQEI5R1zhkYr1yP5GpHZyGN0VHupUmjOH71VcNv6xvtQQr3jEHyRky3fEgd2ME5\/rjz5VIsgjxjUMOEGc9dqO0Nh3cbTNNYnSpwAroz\/uDnS3g6ytEZZAEAyQASc9PLryqhdeRJcS6Hz3akFtO+kZFOiqrbnSPDkY9Q1bVCtbJi0h1BRrVc89WPSH41O4k+IWwNhp9260EaNtqqLWRiunGcrvgjyO+Kscc1ReJIDh+o2NA04GyuwV1Vl\/epn2neCGEKjEOxGxJfbyFVbhdw6lnA2TGffWnjVy7uJAQXBBHXT+7QXLsA4IlAxh1yP7U8kFv3iqzASEbbadXrrn\/ZXjckDMXj9Py5f7CrFxBXuIwJBhkAKMgI7v97PWgubEIng2z5b5qk8csw0qyMRjXsMc9P8ATPSsuGcSm0aXIYKQMj629QuIT\/Svudm8+W1BlI+1FLpp6KCgWl40F3HKPqP+ux\/Wr\/c2xm+lEjxyaBjG4PtHUVzfiKHWf4j+tdF4JcJcwRuz4fQF26EbYoPbe7uYx4oe8Iz4oHG\/+k1LXjkh8MkE6KcjLJsD0qba2Lqdn2rHiWtI28QyeWT\/AOVBEuroqfHzC58qrHEOMKJV6+LfB9dQOMXjDUO8L49Js51H7NQktjIgbHjG4+GguCXgk3ycn7RrGR6U8KcFdJHT8KZqm2P1oG\/BpPoz\/Gf0WveJcRjjQo7eKQFQF3O+2fUN6gW90kEZ1HPjOAMZbZf5euk0cRmlMjZ2Oo\/jsvsoLDwLiJjf5PKfFpwCdtYxs34VYUtgdwVzj8fVVX4nZCRUffO2Cu2PXW21ub+AbRpOvmjBD7wevsoGPErdCdwPXnkKVcR4yIxojyzg+BV31t9s+QHOoPE+I3UxIaJos9WZT+GOtb04asMTNgmRl8TNuTty9QoG1ldRvGrRtqXSN\/X1z5HNYcWl+hf\/AE\/\/AKWqnwy7MBIxlDzHLPkfbTq7vFkt2KnyyDzXxLzoI0U3rrY8mQQfKlqPS3inE8EIh3VwWI9X1aCwcGukSQpIPo5UKN+6eje3IrHi1sSRJHK6NsCpwyt\/Y0mS4HMei2Ka8Pn7zMbkb+fWgf8ABEOFLNJqOchUjfG225Ixk+Yp0eFmeQSXDO0cakrGZDpc52Z8eljy5Uh4VYlj6TDcj0iKtQi7mPLbY8yTqoF80yxoxbYKxO22o52FVh7ssSx5kk152j4ie\/EHLRGrn2sTz92KWrLUEuaf9a9qEz\/qKKoQcUjIdv4jUe04lJB6B8DHOD+tN+MQeM7f8zSG5iOnlyNBbbHthKy4CEkc\/GBmofFuMT3BwxCp0VD+tVeMHORn3bYqbrk2D6sHqQRq9WaAlcuVRR4FPT6xp\/w1NI9h\/ClNmmHXYYyefTY0\/skwoO2\/nQa7mLQ4kHJjuB0P2qcQuCM+qll+pYfw45\/rWXC5ehNBjxRvpB\/AP1NSeBuNbRn\/AORDj2jp+FReK+mP4R+pqOH0FWBGpWBG4oLnYp3kOmpkRdFIxmoPALtH9E7E8jzQ\/ZpvKNLHaoExtC8g1cs5OetecU8tuRzTYIFGvrVU4\/felGN3cbkH0Bn0fbVCCdssSORY4xQDy3\/nigpWMw8P\/POgwuLvYhPxpEf6mmJXf31BuEw7DyY0E3hravATvip0AYNp3DA7UiRvWQR1G2PXTBOJNt3gyRjxrz9\/nQXawlutOnSDuNxkU8jZ9Bknk8MYz6lwOfrNKeA8RMkfgIONiVPL+1Ku1vG\/B3CHw\/WI+ufs+ygQSX5nu5ZjnxsQPUAMD+QpjHSSwXxe400gkK0EwL+tFeo4OPdzoqBzN2dcqM2N8xKEHVbTkqdSnVy54DgY28W9QP2amS41rw+9aHu22a1lbL6GxgOh21aOYNfRFFEfPnCuCuXi7zhV0oVizhrKVlORLhchMkZaPnqHh2A3zA7S9m7xivcWN2U1u3htZ1K5I8JGnHTpX0lRQfNFl2av+8BNjeKO7PO2lG+23o07g7PXoXHyS598Mnw13yig4Q\/ALw7fJLkjrmGT+1QV7O3qyHFpd6en+Xl+GvoWig4JP2fmfeSzvi2g40W8x6jHJefPnt51Dv8Ass7K7x2F6spKldNtcjT6Oea\/x+\/GNq+h6KDg3DbK5haMnht6dECKzLavl2ymoY7vlgN4jlvIirZaWTyCJvk1zGwzq120yY2PPK+ePOum0UHJu0SXUcWmC1upXYneO3lbQM\/w86o54DxNiS1jcgHOfoZi3t9HnX0hRVHzgvZziI\/\/AJLsjya3l29+n9ak2vZu7Z1WSzuwhYavoJhtkZ+rX0PRUHAX7PH0Pm++wJM6ltbgZHhyu6+jsx33rTc9mC2nPD77YOMpa3OW3GPq\/ZyBnrz2r6EooPmzhnALlIwsvC7x2NwpYm0kOlPB+5knIbwggeeamTcClaKXHDbwPIq6AbCQFSEA5qgA8YztpHq6V9D0UHyzF2Z4mhyllxBD5pbzLn\/xobsxxNj4rG+J\/etpj\/619TUUHzJZ9l+IBxmxvBsedtKP\/WmH7NX33O7\/AOxL8NfRdFB87r2cvsg\/I7vY\/wD0S\/DRX0RRQUjiclzNxGeCO+ltUhsY5E0JCVDFpAWfWhyuFG2RSvh3+I791a95AjyTLErmOVgUZyyqzKIyFUlc7sDg7A1beJ9lrO5lM00TPI0YRtM0yB1GcIyq4Vh4jzFYTdkbBnEht1Djusd20kYHd47s6VYDwgAZxy25bUFTvu3jXMChIZoiVhaVorgK1uzXHd9xvGcnwOeQyvtqV+1E91d2DRxtFaS3k6Bu+BNwEWQYeMDw+JMjJPLpVkHZSxxKBAALiZZZNMki63VtSvs23i3wMD1UQdlLFJluFgCypKzqVeQBGYEMyrq0jIO4AwTvzoNFhxGRuKXUDP8ARR29uyodI0s3eZPvwOtV+37QSSA3lxd3UUPzg0KRWcMTKgVwoWUshbLeeVxq2qyw9krBPRg3+URy5aSVyXTOhssxJAycLy9VeXHZGwkkaZoPG8gdtEsyK7A5DsiuFLZ6kZzQJbXtzNMyJHYEvNNMkQe5VVl7ov3jE6crgCPmNy5HJcnGz\/xBWZ41S2dVkt3kHeSaWlZe81QRLoIkbXHp9JT4thT+TspZNEsLQeBZHdcSyqyMxJZgwbUMljsDioD8F4QodyI1S1Uxv9PIqW\/g0+jr0q2hvSxq8Wc0E\/srx35fB32lEIfSUSYyGPAB0tlFKtvupHvIp\/SBPm\/hkWdcdvHLJq1zysxlYjmXdiWOF6k7U0sb2KdBJBIkqHk0Tq4PqyP0oJdFYEgDJ2AHXpS4cbtvkvyzvV+S6C3eAMRjONXLPP1UDSilF12hs4XWOW6t43dQwWWREJBzg7n1UwuJljRpHOERSzE5OkAEk\/gKDfRSqw43bXBIimRyFiYgZBAkXUnMfWXcCmtBR+2PEZkvrWBJbyOKSGdnHDo45XYro0nDI2256VpHbqURystoSsV09urXFxoad01ZARIy2rSoOAvNsdCat8vDonmS4ZczRoyo2phpDY1DGcfVHMVAl7LWTgq0OxuXnyJJQe8f0nBDZGc+iDp9VBWj\/iPqjM0VmXjSzjnctOqFFZ3VlA0HUQU8xn1Udju1TzXdxZ+KVhe3bF5ZdHcxq6hI0Ug6ufIYCjnzqwx9juHojxrb4jkgETKJJd0DM2n0tvExORvW237LWUciypDpkSaSVWWSTIaT0z6W4OPRPh9VBQZe1t3FMsbzMVtOIyi5ZlTxRGWBEztttOfL0Kip2juysTy3FwsrizkOmRVQJLcSYUIEH\/x6BkscjpXR7rstZStO8kAZrtUWY95KveBMaRs22NI3XGetEnZWydldoN0WELiSQYERzGMBvqn8euaBJN21nFmeILZx\/Jifo+9u9DygkqPCsTYYkJhcn0tyMVCuv8QjrNu9s0UuBG+mbU0MjJkKBpGpVLIC2Vw3IEb1YJOxPDmGnuGCCUSBY7i4jVHGrDqquAp8R9ECty9k7IPrEUmrSAT8ouPpMDAL+PxnTtl8mgT\/AOHHaV723ClS3cQwq8ryZaSRlBYaNOQP3ifEeVFP+G9nbW2cSQR92whWLIeQ6kX0VILYJHLUQWxtmigc0UUUBRRRQFFFFAVyjjXA76SPizRvcoklwSsKWyP8qGiPxKShY8seA\/Vrq9FBz7jd3LIbN\/kl6FtOIgPi2eQuqxMO+VVyShLY1Ui4jbXwaeW3tr23ivLtmQRd8jRaYgO8dImBHeSfbIVdOW2xXXqKDk9hFxd5IYpGvgkyW9xI5MqdyUjkElqT9UvIIjoGPSO1Lbu14lLZNFcpxR2bh0XcpCsrBmy3eLMOrehgPvjlvXaqKDnHEOz1xd3s0epobeXhkCSO1uX14Z8xoxICsPYxHkOdLeIW\/EcyxKvEGl764QgiRoGtu6cIqfVLn6PGPHqzmus0UHFLfhN2Xtmmi4j3Nu\/DxpiFwvdj5Iocqq75Ei4JUZUlgcZNSWfiLGeS3Xi6Bp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alt=\"The Nobel Prize in Physics for 2004 Announced\" \/><img decoding=\"async\" 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\" alt=\"Confinamiento del color - Wikipedia, la enciclopedia libre\" \/><img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"Bag Model of Quark Confinement\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">La interacci\u00f3n fuerte, tambi\u00e9n conocida como\u00a0<em>interacci\u00f3n nuclear fuerte<\/em>, es la interacci\u00f3n que permite unirse a los <a href=\"#\" onclick=\"referencia('quarks',event); return false;\">quarks<\/a> para formar <a href=\"#\" onclick=\"referencia('hadrones',event); return false;\">hadrones<\/a>. A pesar de su fuerte intensidad, su efecto s\u00f3lo se aprecia a distancias muy cortas del orden del radio at\u00f3mico. Seg\u00fan el Modelo est\u00e1ndar, la part\u00edcula mediadora de esta fuerza es el Glu\u00f3n.\u00a0 La teor\u00eda que describe a esta interacci\u00f3n es la cromo-din\u00e1mica cu\u00e1ntica\u00a0 (QCD) y fue propuesta por David Politzer, Frank Wilczek y David Gross en la d\u00e9cada de 1980 y por lo que recibieron el Nobel 30 a\u00f1os m\u00e1s tarde cuando el experimento conform\u00f3 su teor\u00eda.<\/p>\n<p style=\"text-align: justify;\">La interacci\u00f3n fuerte, como se ha explicado muchas veces, es la m\u00e1s fuerte de todas las fuerzas fundamentales de la Naturaleza, es la responsable de mantener unidos los\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">protones<\/a>\u00a0y\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">neutrones<\/a>\u00a0en el n\u00facleo del \u00e1tomo. Como los\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">protones<\/a>\u00a0y\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">neutrones<\/a>\u00a0est\u00e1n compuestos de Quarks, \u00e9stos dentro de dichos\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">bariones<\/a>, est\u00e1n sometidos o confinados en aquel recinto, y, no se pueden separar por impedirlo los\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('gluones',event); return false;\">gluones<\/a><\/a>\u00a0que ejercen la fuerza fuerte, es decir, esta fuerza, al contrario que las dem\u00e1s, cuando m\u00e1s se alejan los\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">quarks<\/a>\u00a0los unos de los otros m\u00e1s fuerte es. Aumenta con la distancia.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\" align=\"center\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0\u00a0<img decoding=\"async\" loading=\"lazy\" id=\"irc_mi\" src=\"http:\/\/terrinches.blogia.com\/upload\/20070202172727-faraday.jpg\" alt=\"\" width=\"180\" height=\"269\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcTAOHX8RzSlAk32JnGs23zLw40wX122OEeUsQFU1V0lkgqw_Xj21ah3zgUwF2y-ZCAwrXc&amp;usqp=CAU\" alt=\"Divulgaci\u00f3n Campos Electromagn\u00e9ticos: Ley de Faraday\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"left\">En la incipiente teor\u00eda del campo electromagn\u00e9tico sugerida por Faraday, desaparec\u00eda la distinci\u00f3n esencial entre fuerza y materia, introduciendo la hip\u00f3tesis de que\u00a0<em>las fuerzas constituyen la \u00fanica sustancia f\u00edsica.<\/em><\/p>\n<p style=\"text-align: justify;\" align=\"left\">Las caracter\u00edsticas de las fuerzas eran:<\/p>\n<ol style=\"text-align: justify;\">\n<li>\n<p align=\"left\">Cada punto de fuerza act\u00faa directamente s\u00f3lo sobre los puntos vecinos.<\/p>\n<\/li>\n<li>\n<p align=\"left\">La propagaci\u00f3n de cualquier cambio de la intensidad de la fuerza requiere un tiempo finito.<\/p>\n<\/li>\n<li>\n<p align=\"left\">Todas las fuerzas son b\u00e1sicamente de la misma clase; no hay en el fondo fuerzas el\u00e9ctricas, magn\u00e9ticas ni gravitatorias, sino s\u00f3lo variaciones (probablemente geom\u00e9tricas) de un s\u00f3lo tipo de fuerza subyacente.<\/p>\n<\/li>\n<\/ol>\n<div style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0<img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcRNhAM9yv7vbke5I7kE6zV-qqXIQvEmP-IGabtR3StqB6F6NuN_FI8OMReMmqMTINOktwo&amp;usqp=CAU\" alt=\"Faraday's Law\" \/><img decoding=\"async\" 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XWViVtMoeCBjGHWeVgxK\/McgjQ0FCTV70BuV7crHl48CfijAGffVW69UVVva00vDKeCBMyDDJ8xgQZxJGNe6REVVBYsQ9QABkBmDyxQMJErBjgwPYnU9xSR3UKQrIysQIkqsgAjkDuMaVluu\/UA+CLl7gLh3UjJGIvMgTj3xM0NNaqstNlqhWgR8aA9yKxxAMEKCDgEY5Rg6tWZ1V6LCO1hj415ZZnypxMQedLn2B66qrW2VfvCY5BDpVX+m6pdB4vxGDpb6TXY1aqEOy02kVMginW7wjKACeMkQylT89MlouKlJmV3NKVDBuVIwzTzGVZfcq3gRekPp7yowrC0XpPTtyHBEqR\/6gVI91OgPT6yJRG4m41Hm4AiRUqKBKn2BVeJFujaBlr7Rf8AASp4S6VDAnmDPEiTxOVVTejbPS29gseemxi1TeWKH6JJH9P0GjTjtuZ3tSlaWRbqjT8KhwhUEee7qNmSLx44KHrFHo3hB8KWAqeSA1JeMHuH0yfGgd\/t0Z92tNl+8VVWnAYqYVL4JGVJuY3D5e2qvtPtYRKNEGL0qNAmQsIiiCMtFoHyPBjQUz6k9CgiIaSOFurVKxLJTZpIBtMl2OYmAABOVkb7MUa1QNuH7nqFhe5ugK0CaYwGUKAsEgSxJ96ftPvqalaNVpo9VzVVQ11SEuCkL83VpAAJA9tGbbfvTFRaZExNOnYUp0aV0SWiWkkxZIMgAQJ1LDei57S8ojE2oSGeoY\/NEgjkhVwABJAEaG3G+qSXVqVBMhuuVkvlQTa2AIBtkE4GM6G3OwqFg4c1KpSCI6aAfEt5g1FWRFikTGfM37LZUwabrSpvUI8EWUo8qFnBM55mZI41JXtK1Uz+JWrPIwKYopAI+ElTg\/NzIOOdDv6ktOtCfeAWEsIuAOS3a0MxFwmwkCfHBbPtqznuqlc\/7IQRgj81wYceFP8Ahqne0Ktyh6K16YMj4b1bABIcquJbIzx+jBSbdbyhuFC1qdakVNwqpTMAHHcCGNMNMw47SBMEDR716u2FKmeo6nIqhS6lmuJR7e4gkqFIAPHOZ9T7RrSI+8Umor8IdweJNoYkRJj8rNzpjR9QpV6ZVAH7ZNMMO5eJQjBGRBEZwYOtAN6R6glWpWFNXSpaC4eYD\/DlZmYskwJEDBDas9PrF1rJbbUpkhBVAIFwBiQTKTIkR2wPGktCE3DIOx2Aba1SsXC240C0WlTDC0m7tJjAOiNp6hWWvWavQZA9O5UuukUybwrWgYBuhuS0Y0WJd6FUWrTelaVNIuqg4Kq93afBIzxg9p0xeq15F1hNMhQCASQRBUEw3Dn5AiedKq4UbgOrMr1dxYxBwaYpgGRwQZWD4JGj\/UyjUWp0nDVKaKVjuYE\/DxnIBn5To5GLKW2qjcV6sqAzJAnIRQL2Ez8QgH5jVvojTSpuUtLg9rGDDMz5BOTEsT5jA1KqytVcOQAR0hnkvLEf+1VP6692u\/WrSU0CssuCY+FWsJx5HcQPcaztVkojb10pUyWZRDsGMmC7MSQvuxYxA84A9o0N8XdwIAQxk5OSLvYCQQAc4J4iaqGzFKkEFrWPcjPkli1xJP8AOSxAPzHOgdps329Gq5YA99UqAI\/mhiYn2nGIGInTHPkJoVVVYpgqiwFAHxZIAE+8DGOZJzq2owIN0gRkk\/X2OD5n5jQ253BRaQC9SsQLULBZx3EmIwJzHyHOoJt6bCLQYNxsJgvyfPiVi73ERGNOVEUUtsCi0AxHOP38+5\/x12q6VbuS7F0cGZPMA\/QE8a7WnOj6b1TcCAKqkC+02tTJkQLviAkeciYgxoapv6FTqKuWgBiBlakEqGQwVeIIkCeJwNUeobyxk6lfpdQ8MA9Pi0LcLYuORJiSR5Gqt\/tTTXqGlU3FQDARpBxAAJghTM2mQCSR765vcJ3G7sZQyGHxeqyOZVWAyJkiSIn2nVFbpJTDv3IpDpdk0zECCT88ZxPMRFbbtCrO1Q0vym+UtJ4DC6C3aYIM+x4OkbesFdykIzI1tM1AGEzGDfAaCbgxyJaJujVNo9GXqezWm\/3qmJYKeook304MwAYJBhuDNuIJk3H1AFlosGosUJS5SArIQIDcEZ4MSB89QqWrUbtQ0n7awFpCu2SzggEBsAnMyJAiTXX2DosMrbrbwSVd7nUQPhkDqKwyUJ5AiZxRVP05nWsvUVF+8KWtQggVVyxHMqUPxCMgkgFtefaX09K70KNUnpuzrAIHcKblWEjkCSPYqDpF6R6hRrYuqJtqdUdMt2VKDkRSZYmaLgsoOcsAZBMaT73dV6VSA9Io4GO9SCvUXzyWERi3nyGzBuqau0KMK7x1Bt6pqOB8LW0xiSIHZ+4PE693lOoiXWio4eiB\/asUfygGAxZvPnUt2VZ66FvjphApmLDN3OPefEW\/PUqXqtM0xUYBYpisRAwGDeRy2GE+f11nflqQnIpNuduhuaoAajkpy1QFmvBm0KUSFJxKjMaPr7xdqRTQmvutwxbJF0Dlm\/lRQYA\/5nQmxrQy1kE9a4gquCJ7KcSZYm6pdMRf7692O6FM1GCLU3NVyCqthFBIUO2SEHkxJYnEzDpwX6f6KlKnfuagJYXVQSBSvg3NBAkQY7sAKIC6hU9aQjp7IkhMM9GheFGY6ZkIWmcZ8mPcbcPtaCh9yUaszSSxDNJaFgEYVZXNogDRP\/fNRgiotOnd8F7MSR4KoFBiP5rYnjxq1ZUmo1a6WvTr2soDCrVpLOBIK01PmRwPePGhdh6PuaM2F1UMStJK4ttgQpvpZlrsi3nyBi2tsatQjrV0KgZKIysc4E9SFEewknnjIG8+zj06LDb7mulUAlZqkqx9iOF5gN4xzEC7p9jtp1R9asULuaD0hJUmLqfNq5WYDfPjycjUKf2YpLU622fokDtVYZCw7e5c9sdpCwfYjSih6lvKfZuHpZFq1Gpko\/j8Z1cWk\/JIM\/pqCUqm3b8Kk1IlmZyrF6YUx3KYuE\/EyWkeYPIYzY0eypLuab9RSpJC1aNx\/DqI1ysDEgxa4I5BU\/Mh+ubWpUQMABVoVYaWgPTcBCzfJkiZ8XZxoD03dVKjxWCU96oPRrACK9P4rZAhhEiB4NwCmQNVR3im2QAzys4IlZJE4JGGIH14zrSY77KbpqjUFe\/+JWhiMkp0SAcmBMgnjnImBsa1QLWVQJeqCSY4Snzn+pxA\/tNpP6crDduziC24qIBNwtalTYWkgRNilhmO356O2O5asUqGUU06pUkfD3AAtkibcx\/ZJnOizURb9K1SrCVQlRt2QpB8JTZaje4Cr2Ae4zjWg++UKNBXQzTppagU8j2A4JNvPyPz0u9FpoKQqRYa4a2TJWio7Wk4AtFzGMlxOs79o93RrKoQp9124QCAbqrXgFKZYRAUSTBmY9zrKNDvq9d6KAM9Nj1qkmwWkkBWPdFNeBgMzJ4GdMqgaq5NB4TCvUIuEA4SioIGCZZiCDxnwIt22RBTWmrOwAUsStNTJDM0BmqP2LHuRGASadlvK9Dt3NVXqAxTpIZJDH+JXMEiJ8YEYnGpmm5R6VxQNUL5tJMzAyztNoGcDxwJmfV9RUMaZNzgT2oQP6QScnkwD7zGg\/WKBDBqtU2A3FbokjIVFHmbTcSTxEc6IprTSncilbiY7WksflAY+\/jEnGtOPJW24ZtxTS02CGZlMm+DCP4AiDgmfl57VvpqIhIpAn8Q3R4Y8kk5P1knXaY5cva30muKs06zMDTMBDUMuIwHBK9T6lADwZyTLbbTbKsijSpAEB1KDtnCwQYWcH9ZgE6CTYpRDNS3NdRaqkVWIg5tIO47bsgRI4Anxpl6bUdk\/idVZADlRDKQJbDEGTORiMR78+T6EBbyhSR+t00vBF1UWh7fMxBIj5kwPMRqT7UOCrVL1gqykhlZDgBpHP8Aa55knwDumo01qpXfqh2+GooJmIVUSmJYx5+LgTwNKxTqhi9LauDjvpu6hgRGEqsqm3m11tHgzxZop+HanbTp0y9EKQWR++mVgQQWubybh3DAg+F33TcIDW2xNUG4im5MoSSWH4kM6gnCkqV8AnSXd7Wr1KbPR3KPeIqI1KGPxBWDM1gAWDa1sFgByNE7\/wBcR1ktXpskjrPSdbSfi\/Eoq1OMTJRkOPbWpGbTDeenmuh3W2sFSogDIwtJMG5GKtAYk2kMMFAZBWQJtfWFrKwctTr7ftVmBl4Aa4KwV24NyAcEwSCCVlJdwGrVEWm9Js1E27lqoYKLawVWS1jAYhIN0wIJ0c25L2fidW1LkrCLwwlXD05DMVBtkKT3Msgg61y9CKqu+l\/xOC5XmbkamzWnPEsyj3AH00Cu8HSRO4M6miMzFJL7WiYiCsk8iPaNLdxRy5AYKQbKgUgraCLSsAwCSymATPvyv3W6ZnTvWy2BbGWbFw+QBOPEH6a8vLl5zXq4cNO63qj1hKHpqVtVhIIpzBtiIuHBHAUe+CD62f8AZAIDyx59gFU+B4nAiII1k9y15hibSPDEZIgARkwIyZHP015X3MnLBeJb\/LiOf6v741i231XWdPPhqttuqNLuVFBmS+LjOMsc\/oMeB7asb7T06QPcoBJwscnJwMczJOM5OsYa9MDNQvME3KTJAtn4Z9\/lk++PafTKkKFURnAXGR+o51Tj92rt+pGor+u13+CotMZyIc+LZUqI8+fbVaV6ncfvNXuJZoCiSYyIELxH65J1l2o0fzOpJx8cfKDnx89SY0lHaX7YwhJgcxz5E66f5+Ge37\/Lcj1MMpDG7zzxJgGeR7A++hNt6m9JwtOqzAEnpvILAgi1GJtxggRkxJyTrK7aqhW9argsMyc\/FIkeYPg44P0IXdE9rEMPMqZIx+hP+PtrP8fEpvDfONhV9YSrT6ZBAJUjA7SCGQxxggcecaO9K9cNzrAlmBdPykE2syk8ggSRHM+86wC1UE29pAxyDPkQYx7jzA9hojb+oRkPxmeO05yBMx7\/AE+uqcr6H7W\/D6nt0FSujrJl3uMkRFNVBVcg8qbpHGiKO3uo1duSFXrGnTERcmGYAfqy48DxM6xv2a+0CqYOCtMpSh1AzZ\/N2g4gSDhfnrY1ahhrWAhnAqlC1gLszEMfiJhFiImDnXo48tjzc+F48spP9oNypdaVJadihKbuCSSB3dGmFUsyzYGP5blJB41PY+mrt2NtLr7mZJdj06AJui9wTj+ZQWY8+dNPQ9p0UY9IGpkIvapFKYUQWJUWhSxklmyc6YuSlJmqJccsUpgtPkBZyT88Z8DU536KfT3DOWUdaoCT1LLKaX5IQnLcCSoJMiT7EVKnSUkU85Lulig5Ikk+R8UQfOSecn6z61XqWnqVduzk20qaM1QiCLWvISAcnpgnRXp\/oO5qFfvSVBTgMipWaaTAiLlBtZpEz3CMR7rNd6Z6mpitTp1a7M\/dXqKBap4FOSBbgrCHnJGcv2NR2RkARR8dym4j+VZAiSBJ\/b30v3f2iooRSoKT0yLlAKACSIXtzwc4X+1qr1wPVZJDUUVlkteTUJDSgWk3wwMseZjS58jjZ7hWqEKwa090eD7SBHuTmRj312hfTKS0zTSndERb0yiAeTAQAcGAff567WnG+xmw2FOwrRqdjvdKVnJKyOCWke0yfGRjQu72K0R1KXUQAg1BRZAtQAkzUvzPgspDGfMRq5truqbtZVolWaQaikMfcELFxn8wtxGPJR1ayVGDncU9zFxZINRQBglaaLIjGSZJx51zse+VftKDpTeqdxVIYFiHBcjnGIMRiFAJxmdBbnc9wcsDiW6aV+6YUBSKgAJ9jMEGciNWbRqdx6e5pFmm1KNJAyrMkEA3TJMk2gQMCDNCenbhxbWd2BXmpVYBcgQwpKomADBc5P00FTud9XWiXoEiGJZ2LRAn8Jk3BvHxSLfhjzEFb\/8AyhaCNTt279SWA6dXJiCKiPaZgGWDNJnGmG32dOlSKPundqktZSRDdkQwpheIAHcSO7kzmf8A3Ltmoo6ruKRNuFMkW\/CpBBUEgEG0cMw4J0yxnFG03VZkVKnp9KicRVBqqFWIWKiC+mTjLMIEz4BYpsVemoelSrDKwpPVMntcPXIYsDgMHHkjwAq9Li1Rt\/vDKgM9I0jFzEFAAqJfOJuIUA54062\/qIVgtWuysgMolXqMByrVDxeWBTpBW4xyTrVqkZ\/1ugadrilXplhcwamCBBg3BZ72UESDwAfYaV+m\/Z81No+5R6YSnf2tdd2RcY9pZR+vz1s6+1DI1IiGNS92q1CXCmWkrSIuY2mKcwBzxBzY+yO5FyX05DOLeoQzAC6VBEG6FI+nyx5+fH+te39PzyfykZpgRgDIkkkXST4WDOvCrlpAp+xgH\/X\/AF860T\/Y6uKd99FqWCe4qyg5BiwCM8YmdVr9kqppo46dVIIYUlLFY8Ecg\/LPB1w7OU+HvvW6d+Wda+fiRSR\/LycAZJ99SqU7uQhjiRPz\/TMf89aal9garza1G5TNjdRWngAyIEjzn3zqB+xG8BIspgkmIeQc4nHbjzn6e2+zl8OX73S3zfzWZqSD2hSoxxn\/AFM69pExkDOcef8ACP11q0+we6MZogRJ72PsY+ER+bOePnie7+wu4Ftj0nJJuElY+YmZ5+X10Xhzs9Hj1+lL7ZMVCfyePcc\/Wcj6jXEkTIMDzII+fOtXR+xFa2alalTjkQTxGZkQJ+XtxoRfs8pJVd3Tdh+Ww5I\/lImfGQG5Gi8OX0Z1+l91nabE5Dz\/AO2D8sfLV1In6cc8Z8cz+\/1073P2cUMQ1dS6gOR0jKiGI5ICnH5syQAJOitn9kixVhX+IqIKnAYXBmzg9pESTEcTpvT5fQnX6cvsiIBBDQMxE+Jx\/wBNfWilNne6nSDsoJvJc4PAGBAtBEHk8awu0+yhZVPVGUvbsyFJgAiRmJMSIA8626i1SuCL2+IKopSCFZgpE02MwRnv8xI7dHheMuvF+r6nDnZ2rts7LfYskqGCA\/iPxBLOwJUA5lQR\/doOt96qLC7hElsrQVGdZktBdlUESomD+s6m2woMJSl3o3wU3ZDiVWSncUgG3xkY0PuUoNWYV9sKZZwBVZEN+Jgs83CARyCPYHXbHhqits6A79xU3VN6s0wj1pJDYhekSOZaFPtIgAap3vpO1WmAlTdJYva4+9NbBkzcGUT8MhZgmNPtv6dtaAFSilGiWi2oFBBEzE\/MH3HPy1fuICioNy4WApCAOpJPxQQ7DmOYGtMVmdjv12zSA1dnwzUnLQq5CdNqhcFZPg+c5xqFqlhd3JI7ZBDfOVYc4+es36\/SSu60w9Sq5JIUoqdO2JILIMzBA8kYIjU\/Qt\/SVTTclKqM0dVQXK+SCPiOYkZ8RONEY5G203i3IrVFV2OKZYSRwIkBvBMRMz7RrtD7T1Ok1Smhr0zUkwEUi4ZgQZIxM55B+mu1pyvtWm42lSt2UesSe96kuUjuWFa45mYXgETGmm2ZmaBSNKkkWsSou84USQvHJUzOBiVFOptwaYpDbUzSeS4GKSjtNxNveyGMwRcTLYlrtqT1FNVapbJCK4W1cwSRTMOfIk+3GdYe4l3O\/FRmp9KYcn+FJMZwvdJI8kqPnkDUN5SrBC1RC0i4U1tDSB\/tGckDPhBgkfLRfrVCuFZm3NgLCmlgAZp8XMVVGJk4A8SSAAMr9qKaIAOqatYmxAWaoKTBhMI4IYyRmFEhB5EGNSm+49ZagiBNvdUqt2qHUAmM31G7WeJJglcEXExrM\/aT1MXp94c1EFUmykWIpx8Ss5wXgOhjFt3EgaXD0XcVqxWki1YWKhCdNVkAkXECCZHwiTbIjLEF\/TujTWlVKwM1HUMxp3AkU+4BFckkWqSbgJMAjV2xeW89Ir0t0Am2QUKdrGbO55FvAIKD4SWJBbAk5iVOhRo0maiQ1O8oSVDGvuWcLgT8IZuBE2x8MEq\/s56yCHShQrFoPUGL7Av4IuJtprGSJnnBOS232\/WmA1OmtRqdJXSkokJVqMpYs+PxSrDJAMuD+edSgr0o0nqlQW6Yqp2kEl3W81GaTEEsCZElQh+GIr3NYNQpnpuUC\/d6lMgWk2XUKkE4icn4gbQeNUfZzdYCveVXpqxkTVrVar0nrMZLESrLBMxEDAOmVBhUdtzTAuBugi6UalSrSJkKTa6zAgv+9i0ZSrLUUvSqKa9FrVqkGGptLU1dwM02FpuEgEA5zJO2Z2YV6Sqy1BlXAWoAD3JepKmDJEyORMGQOnpb0lpjYFFamoNlSba1IyyoGHEEkBoJH0OZ0SlZfvGxdQzhWZWJCOcR1FOUqHgOBOMzpsPcn6jT29VlFfbnPmoogYjuYEr5iJ88aA9W9FUBTS+8EYBFDcMkpdIEO4EciQwMccCGDesMlRDuEqbdDKm+w07iQVLVF+HgqLrQSY9tUb70ra7nvUqQ4KhqTxJEzbaYJHMj2B8A6xJhvLYE2Xoa2N3VyzAr\/wCIc1I8ZUsQRjEHyTOZ1Rt\/swKbuaa01knuBrAwR3hYqCyT4BjtBxzqVP7M1l\/\/ALm4KwJBZviHkQwwREgzmSInQu8+z1FCnU31YGmLhdW7z+WQCe0eO0DMHkTrQ0XU+z+2QT0tsrDl3QE45MuZ4HknP94CmnVdegTUZRHWK9tNYi1MQpYEG1LcDJ8EIjaKyOnp1dyHimX7b3KkhitV72wZvKkgieV1oBt6zGm1WsKStkUKawZKxbeYcxMmAsQOI0WGclNdakClQFNGLZMT015vCxBY+ASM5zB0J6ftxZUrNNeojswdzNtSVARIxAgXR5kAad7fZBUsANItwZk+BczGReZ5JJ0Bt0Fq0kQJSvCqpxbeRbIOS8F6sYIuTzkHGG1fSlDRoqb2VCahMANFRBVZ5gG7uGAckn21FKDkKqRci1KKHIZSLWRGIJyVtPkdpPmQL92KbQ1Dca5V6ZBJLq1VgwpiWIlZmJieDGjd4QN9t6h+CozABSIvCgK5gBpYG0jMCmPE66uNr3eU6b1aYNNFZlhadVI7wO5UdRggDDIcFJAMghzQerYrUgwZRa1Ks0kieS4JN0ZDSQfOeA\/URdU71Ztu7dOorR+HUkdOspmQMAdo5ZTzOlY9S3FJwtVQ7q4UVLlplgcIzAtD03JskTawBjzqzwxTXcfZ7pX1dqz0qhe8oHlKhMkhlaVEliZEGYzHAWw9deq1Sm+0ejXpCTAVxlZwQwM58Y4E50yG\/UqrUQy1E+KgwZSQW7+08wZIZRGImDrPb16tyV1asyhmRWRB1aZJvenVFQhXp4geVtUe+phpPvTkKSDMFunADk8RBYrB5m4ZAzqjcVVrB6JJDETlPH64JHy+ulW59W3AkoyshgFjRYFGP5SFLEflUlgLY85gsINxRTqva6QzFaiyG+tMi3zxHnUxVuw2q03sFNo7SGJlZAjEklSB44iIPOu0dRIuAA7QARE\/9Ndpc6T\/AGiFPb7iemalRgYYdPsLQsgMQuFkm+cLMgTouhut26p0KChGYx94aCVwSQVbEm4ABTwCJGdRr+pNQFQ06TMQWivWObrRDPcJFOO2R5EAEmNdfXqEVDXIpxdVrgdNBTABKUbpYKYlnJzJg4gYmvco3X2Y3NV2r\/eeiAxZaVNA5U2haguW25jaAMEjidZn\/u\/b0q9td6hCU7hTplzUZrmgAq7WABSOmpuJy5J1vaW+ShTpliKFLIROS5ORgrdOGMcmc5OlFUU6z1QEKsTbua7tHTWZFNCRF8Wyq4WRJJImxS\/bOV\/tH922\/RokNUBtBCFVpxJAJZSHYjmCRaoMkS+snudrV3LBKrBXWFsKCmAxAuqVSWh8yxGWJBUYGt96B6JRrswpz90QdhkhnYqFBukGFFzQRk1FJmBFG02a1dxSeltkXb0nlHYzeLSWrEEEZFhBkHvBMljqhtLvQd3922VWiB+JUJFF2WwVQymKpDQwphRIuyeBonbfZ+mOnt6dVRRpURX3NcsSH7hUswRAEK7EZKlJPGlX2kqmtvQipVFlQvaYN0L0wFWVtVGp2gkxL8EHTrb+l1alKvt0NqU4pu5iCoopUNPmQTVfuaZtRROMXleCj0gXUqSP3vUWpVFRfyojMALiIAFVXqhjdAPByRr\/APs8sekjIc9XuViLrehTGQODIHbwM+2sz69uG2212R29tPrUTSaoYCg1BTYghpgE3OZHF+ZOlfoW9qUepU2ykiggqNf8TUYVWJBhgFtLDBJl4InWu3yz3eH0v0SulG\/bO0CkD0SMN0pgoIzNLtBjFtjedJ\/RqJ2IrUqi03oK4NU3Zp0iSorER3IxBuUfAwc8GdMPtNt+6nvKZU2oVnGQ0dNweMGVyD21n1n9zv6m2qB2Vm27mKDspzTqBQ23eYiMHvIzS5yZpx+x3NZYKq20ym527wSGkjp8EU3Ha\/cvDGRnwANKNx\/2f7Uuei7UyqyEVzCklgWIBuM5XJ\/KAIiDP0rbU2DfctxUoGe6kxuCvyZRzIm4HtNpEHMg6gyVqdUVKtCKsKjV6Sh1bu+JlUrU8KcTExHuWWejsqqn9lNxSqdRt2qUhELdVALzyQ1UCc4z4UENo\/0\/1BB3PuDVLEItqoFnkhShIn3ucxHjzZtt+SGPUpRDOAEe4xgtYxmA0DEzPgnQDfaaglUJU3D3T8HQKW4ulrlkSDz\/AMDrOVo2TaO5uSmtGTBdgrOV5xaYBJOCSRzg6o36ptgzualUkSDdLsREKAIVUHk9qjE5JJzO9\/7RFcolAgBpDOwZ2XHYFRILFvk2JGjPSPVq9SlVd1DW1GC1asHuXAFit3HBAprw3JmSTtvydh2j9AF93WAqVD2UUlsSAAqgXOwkAlQB8vJxm29Th+u7IaqmsyoCBc8BE8mXnqd4xbTgYXWtT00BDV3LM9Zo\/NLAGQtJeFEyVlQJkyeTrGep7OysaNz9Ck4DJ3EM7oC9MssQJqKMY\/Gc4iNakxadbz1hukJH8Kur1mETIJqqikQBUISWHgMvvr3fbl23G1RFMI7PSVyq3gZU3E+UuXnLKpkCRrOt6p+ElAsOoatWvUhSLJRgvljCwD7hSgHtoo+qlK+13Ci5lpIGbPallQGC2SIak0Y\/hmedMjnyrfUNzTqpRJDGjvV4Kg2FqYIBIkZAPOJGNZep6GtWKVd6kJUNPqqRChiFKvnsBY3JGIKggFRprt65TZUiU7CpqIMdlp6tIsRAwoM4kkcydGeqbxEL1lYPTeynuUwYDAWOfOFYCM4YGBzpFALQr1BW29dixpVAtGqUF7294UlbIZ0thlImCOcaY+ivUFX\/AMQj070Ch7gyO6+xXAdgYI\/MVxJwF3oNG8bnb13YIlRChDR+GLWpFWGcERd57SI0\/wB5tOoBSq1OoBllOCVntYxkMpAIYRkePBjFWbj0ekHDklWJP4iyCBzDNnEnAbHgDXh2UOCRkyCwUZHgGCY\/XEjxiQGrNTp2muKn4lsMRJU8ICPzxxM3GR5xbTlXgOTTg9rSSrTAg+xyIPtg+NWMVNPTEWoveyC7tW4QxiDAIkA+wOYnXaron8VrXJAIvQn4W5VgD7\/t7cHXacrnaH+77WiV3F3UKuyKx7izWntohe2REYEDv8zov1KWQraDWdbsNK0xBsdiQeIMQuWnHnRlOrCVWCtWdAadyrbceYSPhAJALjyP7OA6GzasVLAmlKlw0w5tiCDh0XtGSZJdvA1n\/HsgIUn3CB6BdO2yk0fCpYL1LpDFsFyow0KD8ytkFVqagl1Q9NTESyg9as1otgHtmPin3nVlasldDS\/EsaoFpmmIDKsAlSJ7FbJJjgAT5j9oKZo7duiqCoafSp3kkHyqlYNxgNE+T8ydPpe2O+1+yq16429EgpfbJm5qjG6opn8oUXM1tuR8taz1lGtNKl07Eos\/wytyMFAZcdqwWCgySvIjPvT6KMu2AfcN2NUYKCWUTUqucXQWGJi4xjJ1ftNp93kIRUApS7OYueQEyJAB78RySSSSSYsZsfS6tCjTq2yxtbuGe6tcwVWcsLFHxMThZ8EE70el\/wCD6is6tuappsCs2g1G6xUfCTmobzx28gCT\/U6bPRsqVhSFPqtKggljUenKtyIDWg8sW8cGlglL09aas5NSqRQOCRDgK3xC4YuaMsGYxk6obCn1Hav0Alj1Sm4q30gqyUqEpTuIJiabdrDjBgRGj0K7bdVCwLbauCSoWQqMBN85tUjI8dRvEaL2tvU3aqxinUWtBVu3o2qFJiAIVTADQDccsBqfqe7V69VFosalajUpOtswadrQ1piSlXAmDaBPdplZsNPTkp0k+71CB3kKCxYVA5NvPIOQV4kHxGgKAUu21qqWokXbaoEICjM07hgPT4GBjBkzr1KIejRcRUosllV6hcNJ\/iXiIU3qrXYtYHHdIP8AXaPVdKIJBVlbsa2oszbVpHIa0yGXyC3yDMBB6x9kHZYoVT08g0ZC4ggqHWO283FCMZtK8aEoLuUQ0m+8vVRINN0p1qbAiA2LHKjjDHPj3dVvQNwawqJV6bhg3Uk21SFssqUgwtkQSUaDYpKyI0X95WojUoVFBK1wHekaRM3MjQLgWyD2yDPyLRGR2qVasdMDbxgtR2tYi4AzaRBA+A5MGIA0z9K+yqVGSpW3H3o02LIxJJBMMJDEkRjt9wCfADDcHdbdDbX29alHa24c0mA\/LDoGDjIEkKZ8mdZqhufUKsEJUq04mUruqscDtdk718xZnwTrFah3ttmimu1eq7qhPc6hUpjHwsoUyBHcoAUYBPOqdpXoU1G6aej2pQDl2c5tlFYkAGRBUTaCSc6ltvs5uqwL7jcvkNFJAYQsZIvwHAGBCiIGTmSftDuKdO0rSFWuqN02LKqqMKzO04USCYBEgAZjU1kAVvtG5pTtiXLu1jlZITERkSxLAgRgMqxPK31z7PMq7bbhi9aqzOxZQQjllqNUYE8QpWByQePEfSSKBV61Nq1cuqokSKWPwkAzDAw0LFq9x7gRpxXR9v1KoY1d5WCrGPw72tQKLsAAYXyV5E6IaVUdnSS5Ka3Ugy0r8FS7mmGLFjDqCSABgSwkYiXoH2e6gPUQjo0K1IuYy\/YF\/pZFESOYIJkaf\/eaY22029JFZKhpqAwAUqrYaMjLKMcmfc4fbDYAF5BB6rVYAA5LBZj4sCc+49hrTFJFWluNuu2UA1aVMOq3Ta9MhT3COSQATEhjPkaVfZ0XUOnWVrXpVaVY5Nr03hCxHwiwtDHBAUYiNFbPYCnV2FSCp+7KlUEYJKStwMW5pnMZIHto8UOluGp0gXpbhAz5BDEK10EgnuACnn4hxGjRhV6MvSrxDsNsTRIAKs9NgrBysQxVzhRkhpE4l9t2pMOv1QwQvTVxIhZtKP8ANXByQPH6++nVqTxUiAhpqCwBNRGC9IvObkeFkkkGm3vi+2majdqlK2DgQzrIMjgm3Gf5I8ao58oWb8BKqvf+G5K1gIIaEuWoxAFhHk+QAfGiOp0z\/wDRIyxYAAxhhGIbjxBE+dKtvtHFRmeoCqVBTbntjKhvDIVeOBbcPAnTwCmFVbQoEAKR8JMgD5eRpjnQtIFqoYFSUNjSIb3ORiD2mI99dr3ZbbpsZknCgySSg+EmRyJM8+\/mNdpc77NW3l1WoiJC0kKuSJEmLUUCRwQ0RJECNW7ZlH4dOXAm7sAUkRMGApPiBiSRIiAT6PTQJKK4FSahLnJZomZMz4jgWx7ar3KMtOqarLEkoQuEEQJEGYySTjJ4GsvXvwVbll6dY06eFpG6OGckstNTmQSxmCAL+fa1qBO4ooVLU6SFyWyeqYVCOSTDOSx4j6ww3z9NQ2GUOO2QGYyAqgsQJuMxjgAc6G2FWAlMq5qshrEsCsy0MpIxcA2FJ9uPFDb4LfUdua7tTLMEcm0IMlKZW5h4lqjcnwg850z2dN2ZnsUK1QDvm7popg5HxdTgexmZ1Df+oigEcdtBA6lAMsykIiLPA+Iz\/ZGY1XvPUVZKlWjURkRA5JypOSpQk2jzLA8x7HUvI4Kjbh0YBj0kMEA4uqD2jnSDcbRvudF6MqVIqKe5mVVudgkgwWW5DMCHI9taLckiqjgEqKb3tMDlY88yCZ8AHVNXcormjACmlcCqnCk2gHFoEmR+uMadxAtjsenX3NZSWLfiKOcNTprA85NLAB86WfbFuhU2+9phTYWSpbE1Fa0WyASYtJAyZEDJgvdvRqPT21SWBVUvQQAZW0k\/SSY+Q9tEbnah76borU2UNBPDT7DI\/mDAzM8ahpT6Ey0jUEA0qhvosGkVJm4d0Q1oXBw2TMloq3ew+8NS3FquikgqsGac9rUzhkqCFJAj8y86v9Bep0KlKqaZqUWI\/DYHtPdSYFzzB5byp9tKvSvSNxtzSAYhgrOEyFqYB6TkEgMCWIJuPEMwVpRaYUWuDmjuFemva9LcSbWgQOp8QkeTfzI15t\/VaNRgCyUyo5NSQcYEg2upUkwxDcEqPBC+n0q9M1KeGqKbnVbbhJDCopBDMucMvxTxnS1dhuKu36KlHThjVpMryp5YVCSZAEPBMifnqMAU9rtzWrLQq0WaQ1RUU0lMTCvUp4bLKYGMGQDnTLY7vcogA27VAQLGRlcLcR8bNWZ2gGT4xycav2gcFaFSn3+alCrbaMAAxbU85kFcrnOKNt6dSo1QiCsKpExRRukpYyXYqoV2GJ6hk+2TrOtF3rno25rBid3TorIvDBiuCLRDkIREg4zjJ1Dbem0KIZKHU3G4ZZvZCAFkQ0wtNYOVtyTJE5Id7mnVovIIqU34dhUqvIUliwVbVURgKV\/UkLoX1NakrZSrrSq2tUbt6he4WoJYskLjA7QZEWkgahTudyyV+mjdIyAO1BTpBoFRywJvqGCACbuJUZOvPuQSl1abCm71CaRqIWqOD8NR2+IG1RAGbQB8tFt9mhtlavIG5IqGmiElFa3Lm7udrRLO0kk4BMDTPe0JTbLuYLkyynChAsuWtjtgcHtlgDMaf6GvPRKNDp\/eDjsSsFYx0qSoy05C4I\/iH2liRwNFqrFtsgVluZq7hjJSBimYkfn\/APhqfqG0Xp1EpEBq1tA4MKIiFCx8CFmj9zrq4K1zVvPSVWdlT+yLe6fcs2BH8NTONI9q9orV9zXD\/BSsUATlpdh+lroT844jPtPa3ChYyGtt3VTKkAwtlQTEiQZHuUAyNeelUkeu9Wjw7XVHjLDpqaY8eH857B+pG\/2PSFSpTuZmdXOQLYk445kg8\/FoFVtsANxWqOQ9KrTFNlP5Ixbg5VgZ4kH66E226qlmphRNNABLTLK7Kwaf5kVWnMXz9WO3I69VSv8AFW+I4sCo4f8Atdy+8iP1Gfbldy7QLXpKQoOWZS4YxOe1kE\/TVGOVW1lgGBkcRg+8T5HGhq9GUaQoYjJ4wOJIzIz9NeeoVXs6aMFrEG0Adv5rQT+WQCZHlTExBvdxgMIPic5x5\/X\/AB0uNqpVyIM5nJ\/1+2u1ABrlAOBzPM4j+6f7tdpYrQpWLuymmVCnsdo7jBuKjmADE\/M+2l1TqGgXDdUh3kMpW5CSrIBzjMHJNoznTDaze5LEq0EA\/lkDGePHbHufOh9n1FaqaoAUlnJGYg2qF8\/AoY\/NjrL1QM+wY0KKWoxW1m6gmWXuGD56mZkRHOrNx6hfRZ6TKT0g6k9oE5DGchDEz8jr2tXZ6FzEUC8RcLiBIgMpgkkYt+cfLUDuKL30xA6pNORy7CVcDHCcTwCY0lmfRvS+uu2L1n7VNWqjmpJuuU2B+0AEkYE2nPI0zremO1HdU07XqsaYZgoUrJY2hYYwrPN2SQfA09pLTpIQI7FiCRMciT\/ajzpbuSr7mgiTKA1GjgIUdEGMAEsII5sjxqxbVu8YM1AXqFYPScDgs6XBcEexIP8AxnSf75X+77lkpPUqdUqot\/Ktv0lFhwLSZjgknR\/q+yanZXuZratN2QDhmHRdpCzAVruORPGNHbbdMKppuwYWFrhi0qRIY8ZVkM\/1eCIcGrKm9a1Kix02VDdyBdmcCYiBPHdJ417VWoa10jpgDgGT8QZTB8drAxjuHnXu49PptTVAIQflGQykEFTMypBOPpERrgtOmiUzcQlgUtJJbhO7y2PPuPfTg0r9O2nRfdW01IaqHQnEkgSvHCvJEfzHE8tjSa8tJKFfhkyG+XAIPseDxzGhNxv0spl7iGAIZVICuCBBJ+AyYhj4I1aN9TZhTqIab3doqAQTJi0gkSYJGZMH2MCWNtGgim1hunmQI9wRJugBhPkkGc6ENRnqANToVDTAkipBWpntCkEiQVIk+f10zo07e0uTMkTbP0EAYGlW69P6tZWqIgKfCQEcMpx3XqCMnhSfGdRiys1RqpZa6pAW6mbDbIwrQLskg4YfLRStVWmLjTd\/MKyqfbBLEQI9\/PGhfUt9SVzFrvT8EGUJGMhDaCM3HGp0qNrsad5Zhcxa4gzBhMhJ\/wBHzoRR6RTruWdm6FL\/AGVOkiElT+cSlwW4zDDPJjRfp+1qU6tWorVat0qUqPTgEZulRiRACxwBPyZ3Vu2KSgE95L8Ln4YBlpjGBnQD06zuF6hNOMhVKMcj43aeFwQsEk\/l1YdKvtj6wtGxF7q9RgenNxsGWaJDWG2zGIZjBIOqjWFatTquIVagDOtJlNWoDCqoLFrEAliccnMSLaFc7jeMtRHtpMwTh0hQFIEfmZjJLTAAGCTr3f7iszA0qbVmJamlSFNOmD\/Ea26ajgC3wCwYAjMxEfaKqTTStQdB02NeGBHVAGVEkQGkd8GJBg+Rtrvqp2Z61JTUrHKkkKKdV2gEm0i1CSRiJ0B6qrUTR69R6u4qdyIoYoKiWkLYJlZx44JJ4h36juSclMpSJZAwJUsyqFIEiWUOAeB3al9KPsnsWpI6GSGqRKHCm2akHJKrUJQeQFX20\/qUyaytcbQD2gnmCASP5YJ\/ULof06kEq1VJJYuWHZAhgCYIwRI597tdQ3FR2e1VUq9oZlM2goSIwcgsQZj4edXwzy9iXUCqG7QbSI8kmCT+yD9vloDebVqjXSIUykHPwlXBPImSMew4OmCotwAtxJYckM3wkHxgv++ht3QZli603q0r7BgSp9wYIPyOiVnkHMPPFuZzmMjkH3u0P6ht7rDyAykifAlgRHJm36gRoqrRUqUBK4\/KxlfYj9voYPz1CucY8+3j5\/QaXGhadOCoBMAeZn5Sf359\/lrtdSqy7Ag9rAfUETP7kj9NdrTmbnaU6dW8E31SRmTOAW5nhUjjwBjRO93DIpZULgKxtWQSwEqo8ZyM+SNSrPbLXMQASFEZtBnxz+vjVdOQ99QgKQAonCyJYmQPIjzx8yBl7Ed3txUUBye10qcxBVgw9+CODzGgH2tj1WghXphUt8Ot7kgTyxYkHklTPjTOkVLtwKhClhi62Wsujx8UfrpJUpVd1Sp1YSm1OqXp9RZV1EhHMGUJBDDypHGnEv2W6H3dXqKQ0KKrfDLh7X8zh5OcQf00WdmFJKn8RkCmqYJIUzaB75PAic6Bas1GnSeojKFU3iQSazMqLBmTczPB9jOMDTRaAUKzklkQgvnP8xjzx89Sebfcm8oQfhDqx5IJIiPfE\/QjQ\/q2y6ppqGVe8O0rJYKIgf3An2kZ0VuKIbKkCoBKt5+h8lTgEfP6aE2lqmWcF377Vj2VGZQJNtwknxcZ860F3pu16dJFaoagQC1yBMBYzbz58eRzE6oqFD+JWQqwUK8SUKsTE4griciVkTEnRVIKMIs2do+WJgE\/KB\/00FT9TqVFZ6aEBajUiHUiCJF44MBoBB8Ake5kKqqKoZagFoJIhpMflefynn\/jr3c0+rSbtSopGFJkOOR3CLSTGYMRP0I2w7VFtsAEqOAfIEYxqNPaKgbpgJcbiAMXTkxxJ8++pF3p22ouFQ0nVqXcqVhJXwHUmR\/7Ti4znRGzVFLJBLjJGBfxcwWYAk\/TjzorbMGF0Qe4CQJXOV8jBH6wNTrULlFxPbnDFQ39UeNZsSNTdW0y7qVAEkCSR+gzPy0FvrrLqdYIoEw0C6PFxBKA8EwY8aKrblUXPyAGYmJ5PI\/4a8pUpEsq9TBYxP0gwOATHtOpA\/RiIqOHDEuBgu6iABClufMkYk6I3VPqAp+Jb8RKsBdk9l3MfSMDn3vrB2ttNonuDLMrnt5wTgzn6Z0IiG8QzAKIFNQQs5EuYzB8CAIHOolu99DWpNJKz01tEU6faqCTLiBlpJiTEgSDGjFpNSHSpXBSP4jkvaYtUKJzEScgD5zgbb7xUqN0qVR0DWvUJP8AEJhgepFxHYJE4wOI1bsqjPWH9gEHuLKuSAJxLsInBtyJM6mg2x2hFRsu1UuwNSZtRQO3IIWSQ0AZP017svQKdJXFo6tSbn7jcSWiR5E1DicxOjaXp9KkIAcBSX+InqOfeTLtjj5jTJXFtx7cSZ8ec\/TRYND3M6FQVvCweVtJX2z7zE\/rqKgs4AjpKpUzyT2wVj8vxAnGRoVEqqKhZpd6kpZwFFqiZnmJzMSYmNM0oKslQJMf3YGgVUzQQSoiSA3EDAHOSScY1ByZPtqdW1wysFaOVInHj9cfuNBLswHuHFqqAcxaSRzkfEfPt7aozyr0UgJIAk5P6xJ\/uGoMNSUE5yPEHxHt9f8ALUXOcDH+oj31pxoWYIBzkD9fc\/8ALXanm4e2u1pzaAWkEAqVkgjEE8EHxzz+uhPVKvwKRClx3FbuCpAAg8icniCfGqPR\/wCHW\/8A9NT\/APJpi\/8AEH0\/z1ivXPYWqgKtUplLnSDVUSTAJTgG4AljGeT76tm2OFQLzIAX+7EeP10t+yP\/AJZP63\/3jpruvgbSgPqGyasUQlGpq4dwygk2kFFgyPc3f2RETII3lCo1NgrlWkFWAyIIMexmCM+\/Gi086huuB\/rxqSilswvAwfiBzJxBJjlQIH0HtqfRVmulpUkefIWYnxwcef11bQ+EfQf4ajuPiT+o\/wC6daQIFGriLpsmQph\/aWGJXuFp\/m0QzGTYpJhvMKWEQG8yfBAOAflrvVPgH\/3E\/wB8aLfVioDbVGdYZCs\/EGJghhJt8xOIIBA8DXm2CEsQbijECbgVAEQZMlTEzwcHMTovb8H+pv8AeOo1eW\/pH+LakijMAzMZNo7RwDGbTAJB+f8AdqN1RnXAFOLgQ5kmMArbBGZ+Lxq99cnC\/p\/hqQfcK5ZGABg9wvZQAYkwAQxHgH99Q9Qo1ChCMFbwzAEAyIx5aOPmNGjz9f8AIaA2\/wD5it\/TS\/8A21FfR27gG6qWPvCgDzgR+mZxqltnSJNUgFmjuEnH5YieMHHtPz1bu+aX\/wBw\/wC4+r6Pwr9B\/hqAXc+nrUy4lgpFykgieSucEeDyNSSjFqBV6aqInkEcQI\/WZ17veaX9Y\/wOraXA0JzHPiP8+BoeusMjKqm4wxxNsE498qoj\/hq2hyf6j\/lr3xT+v+R0FUjllBEqcEjB8SVPP7\/tqdIEFpaZMgRwOI+fvPz8aH9H\/wDL0v6F\/wB0aMGliqKk3YUc5M+I\/wCMCPrqt6oLFZhhBgHNvv8AQkEfodEnkaE\/2jf0j\/PQzVbv3EYgCSZ49sfvn5aHo32y4AbyFJI\/QnMRHjRraHqamKHQHEmTOu1Lzrtac3\/\/2Q==\" alt=\"El campo electromagn\u00e9tico: cuadripotencial, tensor de Faraday, ecuaciones de Maxwell, lagrangiana y ecuaci\u00f3n de la onda electromagn\u00e9tica. \u2013 Estudiar F\u00edsica\" \/><\/div>\n<p style=\"text-align: justify;\" align=\"left\">Lo importante al considerar la influencia de la metaf\u00edsica de Faraday en sus investigaciones, es su suposici\u00f3n de que la teor\u00eda de campos ofrece una explicaci\u00f3n \u00faltima a todos los fen\u00f3menos. Los cuerpos s\u00f3lidos, los campos el\u00e9ctricos y la masa de los objetos son, de alguna forma,\u00a0 s\u00f3lo apariencias. La realidad subyacente es el campo, y el problema de Faraday era encontrar un lazo de uni\u00f3n entre las apariencias y la supuesta realidad subyacente<\/p>\n<p style=\"text-align: justify;\" align=\"center\">\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 Estar\u00eda bueno que al final del camino se descubriera que todas son una sola fuerza<\/p>\n<p style=\"text-align: justify;\">El concepto de campo de Faraday ha dado mucho juego en F\u00edsica, es un concepto ideal para explicar cierttos fen\u00f3menos que se han podido observar en las investigaciones de las fuerzas fundamentales y otros. El campo no se ve, sin embargo, est\u00e1 ah\u00ed, rodea los cuerpos como, por ejemplo, un\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electr\u00f3n<\/a>\u00a0o el planeta Tierra que emite su campo electromagn\u00e9tico a su alrededor y que tan \u00fatil nos resulta para evitar problemas.<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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alt=\"Teor\u00eda de campo de gauge - Wikipedia, la enciclopedia libre\" \/><img decoding=\"async\" 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\" alt=\"SIMETR\u00cdAS GAUGE: ENTRE EL MUNDO REAL Y EL MUNDO MATEM\u00c1TICO\" \/><\/p>\n<p style=\"text-align: justify;\">Me he referido a una teor\u00eda\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('gauge',event); return false;\">gauge<\/a><\/a>\u00a0que son teor\u00edas cu\u00e1nticas de campo creadas para explicar las interacciones fundamentales. Una teor\u00eda\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('gauge',event); return false;\">gauge<\/a><\/a>\u00a0requiere un grupo de simetr\u00eda para los campos y las potenciales (el grupo\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('gauge',event); return false;\">gauge<\/a><\/a>). En el caso de la electrodin\u00e1mica, el grupo es abeliano, mientras que las teor\u00edas\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('gauge',event); return false;\">gauge<\/a><\/a>\u00a0para las interacciones fuertes y d\u00e9biles utilizan grupos no abelianos. Las teor\u00edas\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('gauge',event); return false;\">gauge<\/a><\/a>\u00a0no abelianas son conocidas como teor\u00edas de Yang\u2013Mills. Esta diferencia explica por qu\u00e9 la electrodin\u00e1mica cu\u00e1ntica es una teor\u00eda mucho m\u00e1s simple que la\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">cromo-din\u00e1mica cu\u00e1ntica<\/a>, que describe las interacciones fuertes, y la teor\u00eda electro-d\u00e9bil que unifica la fuerza d\u00e9bil con la electromagn\u00e9tica. En el caso de la gravedad cu\u00e1ntica, el grupo\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('gauge',event); return false;\">gauge<\/a><\/a>\u00a0es mucho m\u00e1s complicado que los anteriores necesarios para la fuerza fuerte y electro-d\u00e9bil.<\/p>\n<p style=\"text-align: justify;\">En las teor\u00edas\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('gauge',event); return false;\">gauge<\/a><\/a>, las interacciones entre part\u00edculas se pueden explicar por el intercambio de part\u00edculas (<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('bosones',event); return false;\">bosones<\/a><\/a>\u00a0vectoriales intermediarios o\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('bosones',event); return false;\">bosones<\/a><\/a>\u00a0gante), como los\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('gluones',event); return false;\">gluones<\/a><\/a>,\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('foton',event); return false;\">fotones<\/a><\/a>\u00a0y los W y Z.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\" align=\"center\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0<img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Si yo pudiera recordar el nombre de todas estas part\u00edculas...\" \/><\/p>\n<p style=\"text-align: justify;\">El f\u00edsico Enrico\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">Fermi<\/a>, refiri\u00e9ndose al gran n\u00famero de part\u00edculas existentes, dijo: \u201c<em>Si tuviera que saber el nombre de todas las part\u00edculas, me habr\u00eda hecho bot\u00e1nico.<\/em>\u201d Por todo lo antes expuesto, es preciso conocer los grupos o familias m\u00e1s importantes de part\u00edculas, l\u00f3gicamente\u00a0 \u201cel espacio tiempo\u201d nos limita y, me remitir\u00e9 a\u00a0 las m\u00e1s comunes, importantes y conocidas como:<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcSW_XJDBNv7j34O5D7De5ZGaC6DRTmUkYEYSQ&amp;usqp=CAU\" alt=\"Qu\u00e9 hay realmente dentro de un prot\u00f3n?\" \/><\/p>\n<p style=\"text-align: justify;\">&#8211;\u00a0\u00a0<strong>Prot\u00f3n<\/strong>, que es una part\u00edcula elemental estable que tiene una carga positiva igual en magnitud a la del\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electr\u00f3n<\/a>\u00a0y posee una masa de 1\u2019672614\u00d710<sup>-27\u00a0<\/sup>Kg, que es 1836,12 veces la del electr\u00f3n<sup>.\u00a0<\/sup>El\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a><\/a>\u00a0aparece en los n\u00facleos at\u00f3micos, por eso es un\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('nucleones',event); return false;\">nucle\u00f3n<\/a><\/a>\u00a0que est\u00e1 formado por part\u00edculas m\u00e1s simples, los Quarks. Es decir, un <a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a> est\u00e1 formado por dos <a href=\"#\" onclick=\"referencia('quarks',event); return false;\">quarks<\/a> up y un <a href=\"#\" onclick=\"referencia('quark',event); return false;\">quark<\/a> down.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\" align=\"center\"><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcRQ0lUN5D5CKvDHiXaRKy3dyE_7s-AHgGvD1g&amp;usqp=CAU\" alt=\"Descubrimiento del neutr\u00f3n - RESUMEN f\u00e1cil + ESQUEMAS!!\" \/><\/p>\n<p style=\"text-align: justify;\">&#8211;\u00a0\u00a0<strong>Neutr\u00f3n<\/strong>, que es un\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">hadr\u00f3n<\/a>\u00a0como el\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a><\/a>\u00a0pero con carga neutra y tambi\u00e9n permanece en el n\u00facleo, pero que se desintegra en un\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a><\/a>, un\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electr\u00f3n<\/a>\u00a0y un antineutrino con una vida media de 12 minutos fuera del n\u00facleo. Su masa es ligeramente mayor que la del\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a><\/a>\u00a0(s\u00edmbolo m<sub>n<\/sub>), siendo de 1\u20196749286(10)\u00d710<sup>-27\u00a0<\/sup>kg. Los\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">neutrones<\/a>\u00a0aparecen en todos los n\u00facleos at\u00f3micos excepto en el del hidr\u00f3geno que est\u00e1 formado por un solo\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a><\/a>. Su existencia fue descubierta y anunciada por primera vez en 1.932 por James Chadwick (1891-1974. El <a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a> est\u00e1 formado por tres <a href=\"#\" onclick=\"referencia('quarks',event); return false;\">quarks<\/a>, dos <a href=\"#\" onclick=\"referencia('quarks',event); return false;\">quarks<\/a> down y un <a href=\"#\" onclick=\"referencia('quark',event); return false;\">quark<\/a> up. Fij\u00e1os en la diferencia entre las dos part\u00edculas: la aparentemente min\u00fascula diferencia hace que las dos part\u00edculas \u201chermanas\u201d se comporten de formas muy distintas: la carga del <a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a> es\u00a0 +2\/3 +2\/3 -1\/3 = +1. Pero como el <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutr\u00f3n<\/a> tiene up\/down\/down su carga es +2\/3 -1\/3 -1\/3 = 0. \u00a1No tiene carga!\u00a0 No porque no haya nada con carga en \u00e9l,\u00a0<strong>sino porque las cargas que hay en su interior se anulan.<\/strong><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\" align=\"center\"><img decoding=\"async\" loading=\"lazy\" id=\"irc_mi\" src=\"http:\/\/4.bp.blogspot.com\/_IP-xhn2P2rQ\/TFCjomVvx2I\/AAAAAAAAFKY\/kRnnTV5fVxs\/s1600\/4.jpg\" alt=\"\" width=\"290\" height=\"393\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"center\">\u00a0<strong>\u00a0Andamos a la caza de los <a href=\"#\" onclick=\"referencia('neutrinos',event); return false;\">neutrinos<\/a><\/strong><\/p>\n<p style=\"text-align: justify;\">Los\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">neutrinos<\/a>, se cree que no tienen masa o, muy poca, y, su localizaci\u00f3n es dif\u00edcil. Se han imaginado grandes recipientes llenos de agua pesada que, enterrados a mucha profundidad en las entra\u00f1as de la Tierra, en Minas abandonadas, captan los\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">neutrinos<\/a>\u00a0provenientes del Sol y otros objetos celestes, explosiones supernovas, etc.<\/p>\n<p>&nbsp;<\/p>\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<img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Los neutrinos podr\u00edan explicar nuestra existencia - Ciencia UNAM\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">&#8211;\u00a0\u00a0<strong>Neutrino<\/strong>, que es un\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">lept\u00f3n<\/a>\u00a0que existe en tres formas exactas pero (se cree que) con distintas masas. Tenemos el\u00a0<em>v<sub>e<\/sub><\/em>\u00a0(neutrino electr\u00f3nico) que acompa\u00f1a al\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electr\u00f3n<\/a>,\u00a0<em>v<sub>\u03bc<\/sub><\/em>\u00a0(neutrino mu\u00f3nico) que acompa\u00f1a al\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">mu\u00f3n<\/a>, y\u00a0<em>v<sub>t<\/sub><\/em>\u00a0(neutrino\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">tau<\/a>) que acompa\u00f1a a la part\u00edcula\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">tau<\/a>, la m\u00e1s pesada de las tres. Cada forma de\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">neutrino<\/a>\u00a0tiene su propia antipart\u00edcula.<\/p>\n<p style=\"text-align: justify;\">El\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">neutrino<\/a>\u00a0fue postulado en 1.931 para explicar la \u201cenerg\u00eda perdida\u201d en la\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\"><a href=\"#\" onclick=\"referencia('desintegracion beta',event); return false;\">desintegraci\u00f3n beta<\/a><\/a>. Fue identificado de forma tentativa en 1.953 y definitivamente en 1.956. Los\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">neutrinos<\/a>\u00a0no tienen carga y se piensa que tienen masa en reposo nula y viajan a la velocidad de la luz, como el\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">fot\u00f3n<\/a>. Hay teor\u00edas de gran unificaci\u00f3n que predicen\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">neutrinos<\/a>\u00a0con masa no nula, pero no hay evidencia concluyente.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\" align=\"center\"><img decoding=\"async\" loading=\"lazy\" id=\"irc_mi\" src=\"http:\/\/t2.gstatic.com\/images?q=tbn:ANd9GcQ4fF9JctNRxVu1dHZxqL3gXlZyVM7QyIzGoCW3kklZ5dtd1yVA\" alt=\"\" width=\"300\" height=\"271\" \/><img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"data:image\/jpeg;base64,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\" alt=\"La funci\u00f3n de onda, su ecuaci\u00f3n y su interpretaci\u00f3n. Postulados. \u2013 F\u00edsica cu\u00e1ntica en la red\" width=\"300\" height=\"273\" \/><\/p>\n<p align=\"center\">\n<ul style=\"text-align: justify;\">\n<li>El punto de partida de la denominada Mec\u00e1nica Ondulatoria, desarrollada por Schr\u00f6dinger, es la\u00a0<a href=\"http:\/\/www.fisicacuantica.es\/de-broglie-las-ondas-de-materia\/\" target=\"_blank\" rel=\"noopener\">onda de materia de de Broglie<\/a>\u00a0y la consideraci\u00f3n del \u00e1tomo como un sistema de vibraciones continuas.<\/li>\n<\/ul>\n<p style=\"text-align: justify;\">Se ha conseguido fotograf\u00edar a un\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electr\u00f3n<\/a>. Poder filmar y fotografiar un\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electr\u00f3n<\/a>\u00a0no es f\u00e1cil por dos razones: primero, gira alrededor del n\u00facleo at\u00f3mico cada 0,000000000000000140 segundos , y, segundo, porque para fotografiar un\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electr\u00f3n<\/a>\u00a0es necesario bombardearlo con part\u00edculas de luz (y cualquier que haya intentado sacarle una foto a un\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electr\u00f3n<\/a>\u00a0sabe que hay que hacerlo sin flash).<\/p>\n<p style=\"text-align: justify;\">&#8211;\u00a0\u00a0<strong>Electr\u00f3n<\/strong>, que es una part\u00edcula elemental clasificada como\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">lept\u00f3n<\/a>, con una carga de 9\u2019109 3897 (54)\u00d710<sup>-31<\/sup>Kg y una carga negativa de 1\u00b4602 177 33 (49) x 10<sup>-19<\/sup>\u00a0culombios. Los\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electrones<\/a>\u00a0est\u00e1n presentes en todos los \u00e1tomos en agrupamientos llamados capas alrededor est\u00e1n presentes en todos los \u00e1tomos en agrupamientos llamados capas alrededor del n\u00facleo; cuando son arrancados del \u00e1tomo se llaman\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electrones<\/a>\u00a0libres. Su antipart\u00edcula es el positr\u00f3n, predicha por Paul Dirac.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\" align=\"center\"><img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/upload.wikimedia.org\/wikipedia\/commons\/thumb\/2\/23\/Helium_atom_QM.svg\/598px-Helium_atom_QM.svg.png\" alt=\"File:Helium atom QM.svg\" width=\"598\" height=\"600\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"center\">\u00a0\u00a0 El n\u00facleo del \u00e1tomo constituye el 99% de la masa<\/p>\n<p style=\"text-align: justify;\">En los \u00e1tomos existen el mismo n\u00famero de\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">protones<\/a>\u00a0que el de\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electrones<\/a>, y, las cargas positivas de los\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">protones<\/a>\u00a0son iguales que las negativas de los\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electrones<\/a>, y, de esa manera, se consigue la estabilidad del \u00e1tomo al equilibrarse las dos fuerzas contrapuestas. El\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electr\u00f3n<\/a>\u00a0fue descubierto en 1.897 por el f\u00edsico brit\u00e1nico Joseph John Thomson (1.856 \u2013 1940). El problema de la estructura (si la hay) del\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electr\u00f3n<\/a>\u00a0no est\u00e1 resuelto. Si el\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electr\u00f3n<\/a>\u00a0se considera como una carga puntual, su auto-energ\u00eda es infinita y surgen dificultades en la ecuaci\u00f3n conocida como de Lorente\u2013Dirac.<\/p>\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<img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"La Part\u00edcula Elemental on Twitter: &quot;#TalD\u00edaComoHoy 20 de octubre en 1984 falleci\u00f3, Paul Dirac #NobeldeF\u00edsica en 1933, formul\u00f3 la ecuaci\u00f3n de Dirac que es la versi\u00f3n relativista de la ecuaci\u00f3n de onda\" \/><\/p>\n<blockquote>\n<p style=\"text-align: justify;\">&#8220;La llamada\u00a0ecuaci\u00f3n de Dirac\u00a0es la versi\u00f3n relativista de la ecuaci\u00f3n de ondas de la mec\u00e1nica cu\u00e1ntica y fue formulada por Paul Dirac en 1928, quien junt\u00f3 dos de las ideas m\u00e1s importantes de la ciencia: la mec\u00e1nica cu\u00e1ntica (la <a href=\"#\" onclick=\"referencia('schrodinger ecuacion de',event); return false;\">ecuaci\u00f3n de Schr\u00f6dinger<\/a>) que describe el comportamiento de objetos muy peque\u00f1os; y la teor\u00eda especial de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a> de la <a href=\"#\" onclick=\"referencia('relatividad',event); return false;\">relatividad<\/a>, que describe el comportamiento de objetos en movimiento r\u00e1pido. Por lo tanto, la ecuaci\u00f3n de Dirac describe c\u00f3mo las part\u00edculas como <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electrones<\/a> se comportan cuando viajan a casi la velocidad de la luz, tambi\u00e9n describe de forma natural el spin y predice la existencia de antimateria.&#8221;<\/p>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" src=\"data:image\/jpeg;base64,\/9j\/4AAQSkZJRgABAQAAAQABAAD\/2wCEAAoHCBYSFBgSEhIYGBgUGRUcFhkcHBoYGRkZGBgZHB0VGBwfIS4lHB4tIRgaKzg0LDAxN0M1HCQ7QDs0Py81OjEBDAwMEA8QHhISHzUsIyQ0NjQ0NDQ0NDc0PjE3NDQ0NDQxNzQ0NDE2NjQxMTQ+NDE0MTE0PT01NDQ0NDE0NDY\/P\/\/AABEIAKgBLAMBIgACEQEDEQH\/xAAbAAEAAwEBAQEAAAAAAAAAAAAAAwQFAgEGB\/\/EAEYQAAIBAgQDBQUEBAoLAAAAAAECAAMRBBIhMQVBURMiYXGBMkJykaEUI1KxM2KSsgYVU2OCosHR0uEkNFSDk7PCw9Pw8f\/EABYBAQEBAAAAAAAAAAAAAAAAAAABAv\/EAB0RAQEBAAMBAQEBAAAAAAAAAAABEQIhMUESYVH\/2gAMAwEAAhEDEQA\/APxmIiAiIgIiICIiAiIgIiICIiAiIgIiICIiAiIgIiICIiAiJ7ARNevwN0o9uWXLpYA3JBNriRYLhZqoagYBUzdqT7gAup8c1rDxl5S8fWuXC8blmMyIiRkiIgIiICIiAiIgIiICIiAiIgIiICIAlqrg3W10OpAGx1OwNtj4GBViWjgals2QkDcjvW8TblKsBERAREQEREBERAREtouQB2FyfZB2+Jh+Q5+QsQ8SgAAztlB2A1Y+IF9vE28LwMQq+xTUeLd8\/UZfpIGcsbk3J3JnEC19vqcnI+Hu\/u2nv25z7RDfEqtfzuL38d5UiBt4LiRJVe9sQFW7KQTqpQ8j4HTpOOJYDIC9I3QkBgDfI34SRuL7H56yHhlZVLKxy9oLBwLlf8jsbazWwaHDK4chbjKbHKHub2Dc2sdDay6Eyy22y3zxvhyvK3jyvUnWvm3pldGUg+II9dZHN3i60ggFPtLMQVzulQg7sQUAC+0N97g7WMpcOx\/Yhyo77BcjWBykMCTr1FxJtzWFCeTY4jxZaqsi0VVCUKAboRfNY21zEn5CY8bvoREQEREBERAREQEREBLlLDLb7yoEPIFWPzttPaK5E7T3mJCeFgMzelwB4k9J9B\/BVaFOhVxOJya1KVOmz0TiBfK71LLnWx9jW\/PxgfOYjCMlibFT7LKbqbcgeR8DYyrPrP4P4ajiXxC1aiohOZVBp0l3Y5lV20ygcr2BN9J87iFFOqwUhlVyFJswYK2l7aEEDlpGj7Dg64Q4ajTqFDUTM75myqDVaooGdW7rHsqCkn2VckWOokw3D6QxXeFOlTp0MO2IyMxUtWCvnQktYKKi63sMul5jUuLq+ZcS9N0YL3VVqeUqbj2EGb1MlrcToZXSnYCqAKjM1ZmKqO7luCLjx5aeMxbfMEnFuGqvZtTFGjUSg1Z+zao6se0qBQrEsAMiJrmsWcanNPnOJIBUawsGytb8OdQ2X0zW9JqU6tNQy\/a2ZXChkKuMwQEKpaxsACRoNAdJSoJ21Y5w9S5Y2p778gRoPSaGbEucRoBHKhKiWA7tS2b6AaTSThdLs87uylUSo22qtmAVQfeJy+GsW4MGJqfxZ9+9AvojWLeGYLmPQDNc+AMpYvDmm7U23RmU+htLLKIIiICIiBYw1MM2vsqCzfCouQPE7eZE4rVCzFjz5DYDkB4AaSWnpTY82KqPEC7NbyIT5jrKsBERA7RCxsBrOnpFTbS\/gb\/lJcNSY94WA1FyQBqNQL7mx5SbKaWpHeI7uxAH4gdielpqSVqSWNLCcOFOgcS+uU2KgjML2t8N76k7cheZuJ7Wt94UJRRYZVbIqj3R0A\/+ykTfWbGG4ivYJhiMoZ27Sp3rqjFPZynXQNcEGZ5W\/C3ep5Gfhu9en+L2fBwNLee3qOkqS3jaa06hVGuFIysGDcgbgrpvOccoDtbZrMB0DAMB6AwyrTumpYhQLkkADqToBOJZwWJNKotRQCUIZQdRcbH0OvpFFriXBa2HuaiCwIBZSGUEi+UkbHzmbNHHOXp0nJJJDK3iUa4J66OB6TOkm52V5ERKEREBERAREQL+LF6VEjYB1Pg2ctY+OVlnOBs7LTd7Jcmxay5iu55C9lBM5wuJy3UrmVrZl222YHkRc6+JknY0TqKjqOhS5+YbX6SeCagnZms5AAVWVQGDDNUGUAMCQbLmO\/KZcuYutmARAQiXyg7knd2\/WNh5AASNMHUb2abnyU\/naIK0+o4fgcPRWnUrOuepSNQpUXuFe0dAimxs7BAbkaKxI71rY1LAEMM+QD3gaiKfK17j5TVrUqDj2XZsoC2r0zlAFgoDC5HgI\/WD5uJJUWxIsRYnQ7+sjlCdsxO5OgAHkNhOIgdXvvNalxFKisuJapmOQK6hSSqgjI1yLjUa3vpMeIslHTWvptyvvbxnMRAREQLNT9Enx1f3acrS1S1puv4Sjegupt43dflKsBERA+h4I9IVaLVswpgFbqyqFYlswcsDuDfloQOUp8RVFXuLUVWIZBUsXKldWuAAVJtYgcudtM+lWZTdGKk6XBI06aTXwPEaipbEUmrYck3zhu6zbtTqe43rY8wZm7Low5Yp4gqLWU+aKfqReaWO4NZDiMM3a0NLtb7ylf3Kyj2Tyv7J5HWYsuyjuo9zewHkLD5SbHe0Pgo\/8tJDTUsQoFySAB1J0Ak2NcM7WsQDZSOaqLA\/ICUVoiIF\/Ef6vR+Kt\/25Rl7F6UaK9RUb9pso\/clGTj4PIiJQiIgIiICJMqdxm6Mo+YY\/9M7w+Hzq5vbs0zeffRbf1oES1CNmI8iROhiX\/lG\/aP8AfOHQqbMCCOR0M4gWBjKn8o\/7Tf3yOpVZvaYt5kn857Vp5TY72uR0vyPjIhARLuJw4VEqISVfMLHcOlsym3xKR5yDEpldlHI2gQxEQEREBE7emV3BF9RcWuOs4gIiICIiBPhquRgSLjUEdQwsR52M5r0shK79DyIOoYeYkUsowYZW0t7LdL+6f1fyPmYFaJJUplTZhb\/3cdRI4Hs1OK8UauKYzMAtOmjKT3SyAjMBe2uh87zKiBd4bxGphnFWk+Ui4OxBU7qynRlPQzYFDD479EFw+INrUybUKrdKbH9Gx5Kxy7AET5uWsEWRhVVymQghgbMD0XqZLx+z0X+I8KfBN95o3ZoygjKwZl1BHVTfXqF6zFl3iOPfENnqszEAAFiWIA5XO\/8AnKUs3O\/QnaIWIAFySAB1J2E4l7Cfdqax31Wn8RGrf0QfmRA84m4L5VN1phUB65RqfVsx9ZSiIkwIiICIiAiIgWqY+5c\/zlL92rL\/AAHHU6AqNUXMXVVVRvYuGZ1NiAy5VIvztKdMfcOf5yl+7VlelRze8o8zaSzfRrYalTXENaotUZWamzWXO5W6hs+ga558xzg0C2JQOqrmy93MrXIGmYrpdiPDeURgx\/L0vm\/+GSU8LR9\/EgfCjt+eWQcJTUOftPaITcmyAsSTzDMtpcpVKYoEI6hzmDhswYgmy5bAg93qdCTpsZC9OgT3sTUa2gPZX06a1JH2GG\/2ip\/wV\/8ALGyjrFVVWilEMGYM7sRsM6ooQHmbJcnbXnOMZQZqzhFZrMb5QTz8JTe1zY3HI2t9OU062JFKvULKWBZhZWZOe9xvKMx1IJBBBG4OhHnLGEwTVb5QNLDU21Ow8zIa9QMxYAgEk2JLH1J3k+GxzUwAoGjo+vVL2B11Gst3OhFWwzoFLKQHF1vzHUS1W4eadI1HOrMqpbZgVDFvEAFR5t4TmtjGrlFquAFL96xJ7xzEkDfXa00HWnVVVNbEVFoghctBSqhjc3JqX+fSZtoz8dVpstMU84KrZgwGW9ySVINzck7gShOm3Ntv7JzNBERAREQES02EIorWzCzO6Bed1VGJ8u+sqwLFPEWGUgMvQ7i+5U7j8uoM77JG9l8v6rg\/IMoIPmQsho0WdsqIzMdgAWJ9BPHQqSrAggkEHQgjkRAm+xtyZD\/vKY\/No+yEas9Nf6Yb6JcyBELGwBJOwGpnjCxsdCN4Fn7tOrn1VP8AEf6u3ORVapc3Y7bDYAdABoJDJaQF9TYdbX+kLJrkqem85m1UXJSuyPlbRMw0uRfMNNPCx1mNeaskzLrXLjJmVYo0QRnc2UftN4L4+Ow+k9qZqlyFsqCwUclv8zrufGe1KNQkMUbUHKMptZdwBbYTSwtOsytoqqaLVb2GqKSthbmWIXXWSfn7U4yX2sGJ7PJGSIiAiIgIiIGiothSetZP6qN\/imdNBz\/oyDrWqfRKf95mfJAmvgeGoyq1VyvakhLC+UKbGo99lB0+e1plqRfUXHTaWsVji6U6dgq01IsCbG7s1yOveii1gMNSIcVKlO6qct2cXJ2ykC2m+x5TLcg7AD5\/W84iWQJd4x+nqfG35yDDWDqX9nMubn3bi\/0jE1c7s\/4mZvmSY+iGIiBOtLTMxsOXVvIf2y+3FCtOktB2RkLlspK6lhlJPvG0yiZ5GS+jt3LEkm5JJJ8TznERAREQEREDewtGnVwqI2Jp02StWYhs5JDpRCkBVPNGlQcRC0TQFNbknv2W5ub81v8AWUalEqFJ99cw8sxX81MikwbGARxSqZUa7hAriwsFa7Am9wDp8p1wriS0i5rqaocrdGsQTfvOSdQ4GxHM66THvPJbJ8atmdR9F\/BpUz1iCwXs3CkWzi5FrHQBrDymdxqoXqlyCLhALsGY5VVczEe8ctz4mVcPXamSVYgspU+KsLEeokJiSe\/S3jmZ25iSMhABIIBvY20NtDbrFKmzEKoJJ2A3MMtnj\/EFZilMLlJpOXBJLMKYFt7C2Yiw6SjxLiTVypcAZRYWao377tb0tIcXhHpECopUkXGxBHUEaEeUrSSSTobJ\/hBVz5xlHfV7W\/Dl7t98pyLceEiHF3+zth8q5WbNe2oW4JReillU+YmZEfmf4PIiJQiIgIiICIiB7flPIiAiJdqYIimtX3WB30FwxFh1On0MaKUS9VwLU1V3FgxFgRrqL3sdCLePMXtPOJdnmzUWJB1IK5cp6WzG8gpREShERARLNTDFUSpmUhywAF7gra97i3MbXlaAiIgIiICIiBvVeF1K1Oi9NQVWlZjmRbN2lQkd5hrqJTx+JQqqIF09oimqNcC1swYlh8pnTyTBrYCutOi7hKbN2iCzqr3Qq9wAdRqF1Fj4z3gqUSH7ZlBNlUt7uZXJcDnYhfnMiIsH0vD8DhqjkF8qGkKhLNdkyVLMunvMik2\/WEoYZabmq7dminMUBPeXcqqrY5hsP7ZlWiM\/o1sF2BFEVXNr1hU9o5VyjIQOWpO3SX8LjsIGu9MgVkyuELLkZXNrEDVWULe19Qd581PJLx36utvj2KoMKdLDBslPObsS2rkEhSVU2GXmBuZiREsmTEIiJQiIgIiICIiAiIgIiICb\/C6+JemKVOiKlMKylWW6HMScxYkBWBOhBBmBLWBoGq6Ug1szWF9QL87SWDX4pgsQ65qtCmGUDM4ZMzBRbUB7E6chefPiXMWaNstNXzBrZmZSrLrqFCAqduZlKJBbxNBAoKM7XNrsgVfRs5v8hI8IoLqGICllDE6AAkXJM5qV2YAM7MBsCSQPK+0ilH1GFw2GeyXUnNVpqbgMbICK7a7Zg1vi8Jn4I0fs9Rnt2iXFNdLt2lhm8ctmPqJjz2Scf6LycUqil2GYdnr3Sqki+psxGYX8DKERKEREBERAS5xCiEZLC2anSb1ZASfnKc0P42q5OzzDKBlF0QnKOWbLf6xf4DUqfZZhYNpu4JPIgIF0HmZLlSnQRjTRzVNS5YtdQuUADKwtuTreZU6J5dJMG3w3BUGRQ7DPV7QC7BVp5VYhm8zlGvjPGpYZKlAghkbMtUZjfR2U1eq3UhgPCYkR+e\/RpcddDVyUiClJURWHv5BZn\/pNmPrPcAlNqbBzQVhexc18226hAVPrMuIzoemfR8dpUAKiUlRTRrKq2N2dHVixJvdgGHoDafNxLex0wsbXvOYiAiIgIiICIiAiIgIiICIiAnaOVIIJBGxGhHkZxEBERAREQEREBERAREQEREBERAREQEREBERAREQEREBERAREQEREBERAREQEREBERAREQEREBERAREQEREBERAREQEREBERAREQEREBERAREQEREBERA\/9k=\" alt=\"Radios del modelo de Bohr (obtenci\u00f3n con el uso de f\u00edsica) (video) | Khan Academy\" \/><\/p>\n<p><strong>Radios del modelo Bhor<\/strong><\/p><\/blockquote>\n<p style=\"text-align: justify;\"><strong>Es posible dar al\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electr\u00f3n<\/a>\u00a0un tama\u00f1o<\/strong> no nulo con un radio r<sub>o<\/sub>, llamado radio cl\u00e1sico del\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electr\u00f3n<\/a>, dado por e<sup>2<\/sup>\/(mc<sup>2<\/sup>) = 2\u201982\u00d710<sup>-13<\/sup>cm, donde e y m son la carga y la masa, respectivamente, del\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electr\u00f3n<\/a>\u00a0y c es la velocidad de la luz<sup>.\u00a0<\/sup>Este modelo tambi\u00e9n tiene problemas, como la necesidad de postular las tensiones de Poincar\u00e9.<\/p>\n<p style=\"text-align: justify;\">Muchas son las part\u00edculas de las que aqu\u00ed podr\u00edamos hablar, sin embargo, me he limitado a las que componen la materia, es decir Quarks y Leptones que conforman Protones y Neutrones, los nucleaones del \u00e1tomo que son rodeados por los\u00a0<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\">electrones<\/a>. El Modelo Est\u00e1ndar es la herramienta con la ue los f\u00edsicos trabajan (de momento) hasta que surjan nuevas y m\u00e1s avanzadas teor\u00edas que permitan un modelo m\u00e1s eficaz y realista. De Wikipedia he cogido el cuadro comparativo de las fuerzas.<\/p>\n<h3 style=\"text-align: justify;\">Tabla comparativa<\/h3>\n<table style=\"width: 35.7332%; height: 216px;\">\n<tbody>\n<tr style=\"height: 48px;\">\n<th style=\"height: 48px;\">Interacci\u00f3n<sup id=\"cite_ref-7\"><a href=\"http:\/\/es.wikipedia.org\/wiki\/Interacciones_fundamentales#cite_note-7\">7<\/a><\/sup><\/th>\n<th style=\"height: 48px;\">Teor\u00eda descriptiva<\/th>\n<th style=\"height: 48px;\">Mediadores<\/th>\n<th style=\"height: 48px;\">Fuerza relativa<\/th>\n<th style=\"height: 48px;\">Comportamiento con la distancia (r)<\/th>\n<th style=\"height: 48px;\">Alcance (m)<\/th>\n<\/tr>\n<tr style=\"height: 51px;\">\n<td style=\"height: 51px;\"><a title=\"Interacci\u00f3n fuerte\" href=\"http:\/\/es.wikipedia.org\/wiki\/Interacci%C3%B3n_fuerte\">Fuerte<\/a><\/td>\n<td style=\"height: 51px;\"><a title=\"Cromodin\u00e1mica cu\u00e1ntica\" href=\"http:\/\/es.wikipedia.org\/wiki\/Cromodin%C3%A1mica_cu%C3%A1ntica\">Cromodin\u00e1mica cu\u00e1ntica<\/a>\u00a0(QCD)<\/td>\n<td style=\"height: 51px;\"><a title=\"Glu\u00f3n\" href=\"http:\/\/es.wikipedia.org\/wiki\/Glu%C3%B3n\"><a href=\"#\" onclick=\"referencia('gluones',event); return false;\">gluones<\/a><\/a><\/td>\n<td style=\"height: 51px;\">10<sup>38<\/sup><\/td>\n<td style=\"height: 51px;\"><img decoding=\"async\" src=\"http:\/\/upload.wikimedia.org\/math\/6\/5\/c\/65c49c924d7a51402c683b9cecfb3054.png\" alt=\" \\frac {e^{- \\frac {r}{R}}}{r^2}\" \/><\/td>\n<td style=\"height: 51px;\">10<sup>-15<\/sup><\/td>\n<\/tr>\n<tr style=\"height: 48px;\" bgcolor=\"#EFEFEF\">\n<td style=\"height: 48px;\"><a title=\"Interacci\u00f3n electromagn\u00e9tica\" href=\"http:\/\/es.wikipedia.org\/wiki\/Interacci%C3%B3n_electromagn%C3%A9tica\">Electromagn\u00e9tica<\/a><\/td>\n<td style=\"height: 48px;\"><a title=\"Electrodin\u00e1mica cu\u00e1ntica\" href=\"http:\/\/es.wikipedia.org\/wiki\/Electrodin%C3%A1mica_cu%C3%A1ntica\">Electrodin\u00e1mica cu\u00e1ntica<\/a>\u00a0(QED)<\/td>\n<td style=\"height: 48px;\"><a title=\"Fot\u00f3n\" href=\"http:\/\/es.wikipedia.org\/wiki\/Fot%C3%B3n\"><a href=\"#\" onclick=\"referencia('foton',event); return false;\">fotones<\/a><\/a><\/td>\n<td style=\"height: 48px;\">10<sup>36<\/sup><\/td>\n<td style=\"height: 48px;\"><img decoding=\"async\" src=\"http:\/\/upload.wikimedia.org\/math\/c\/8\/b\/c8ba4a492c13d2672d1789da2b88c508.png\" alt=\"\\frac{1}{r^2}\" \/><\/td>\n<td style=\"height: 48px;\"><img decoding=\"async\" src=\"http:\/\/upload.wikimedia.org\/math\/d\/2\/4\/d245777abca64ece2d5d7ca0d19fddb6.png\" alt=\"\\infty\" \/><\/td>\n<\/tr>\n<tr style=\"height: 48px;\">\n<td style=\"height: 48px;\"><a title=\"Interacci\u00f3n d\u00e9bil\" href=\"http:\/\/es.wikipedia.org\/wiki\/Interacci%C3%B3n_d%C3%A9bil\">D\u00e9bil<\/a><\/td>\n<td style=\"height: 48px;\"><a title=\"Modelo electrod\u00e9bil\" href=\"http:\/\/es.wikipedia.org\/wiki\/Modelo_electrod%C3%A9bil\">Teor\u00eda electrod\u00e9bil<\/a><\/td>\n<td style=\"height: 48px;\"><a title=\"Bosones W y Z\" href=\"http:\/\/es.wikipedia.org\/wiki\/Bosones_W_y_Z\"><a href=\"#\" onclick=\"referencia('bosones',event); return false;\">bosones<\/a> W y Z<\/a><\/td>\n<td style=\"height: 48px;\">10<sup>25<\/sup><\/td>\n<td style=\"height: 48px;\"><img decoding=\"async\" src=\"http:\/\/upload.wikimedia.org\/math\/1\/e\/0\/1e009598b9c2525a5d1c86416ef668f5.png\" alt=\"\\frac{e^{-m_{W,Z}r}}{r^2}\" \/><\/td>\n<td style=\"height: 48px;\">10<sup>-18<\/sup><\/td>\n<\/tr>\n<tr style=\"height: 47px;\" bgcolor=\"#EFEFEF\">\n<td style=\"height: 47px;\"><a title=\"Interacci\u00f3n gravitatoria\" href=\"http:\/\/es.wikipedia.org\/wiki\/Interacci%C3%B3n_gravitatoria\">Gravitatoria<\/a><\/td>\n<td style=\"height: 47px;\"><a title=\"Gravedad cu\u00e1ntica\" href=\"http:\/\/es.wikipedia.org\/wiki\/Gravedad_cu%C3%A1ntica\">Gravedad cu\u00e1ntica<\/a><\/td>\n<td style=\"height: 47px;\"><a title=\"Gravit\u00f3n\" href=\"http:\/\/es.wikipedia.org\/wiki\/Gravit%C3%B3n\"><a href=\"#\" onclick=\"referencia('graviton',event); return false;\">gravitones<\/a><\/a>\u00a0(<a title=\"F\u00edsica de part\u00edculas\" href=\"http:\/\/es.wikipedia.org\/wiki\/F%C3%ADsica_de_part%C3%ADculas#Part.C3.ADculas_hipot.C3.A9ticas\">hipot\u00e9ticos<\/a>)<\/td>\n<td style=\"height: 47px;\">1<\/td>\n<td style=\"height: 47px;\"><img decoding=\"async\" src=\"http:\/\/upload.wikimedia.org\/math\/c\/8\/b\/c8ba4a492c13d2672d1789da2b88c508.png\" alt=\"\\frac{1}{r^2}\" \/><\/td>\n<td style=\"height: 47px;\"><img decoding=\"async\" src=\"http:\/\/upload.wikimedia.org\/math\/d\/2\/4\/d245777abca64ece2d5d7ca0d19fddb6.png\" alt=\"\\infty\" \/><\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<p style=\"text-align: justify;\">La\u00a0<a title=\"Teor\u00eda cu\u00e1ntica de campos\" href=\"http:\/\/es.wikipedia.org\/wiki\/Teor%C3%ADa_cu%C3%A1ntica_de_campos\">teor\u00eda cu\u00e1ntica de campos<\/a>\u00a0es el marco general dentro del cual se inscriben la <a href=\"#\" onclick=\"referencia('cromodinamica cuantica',event); return false;\">cromodin\u00e1mica cu\u00e1ntica<\/a>, la teor\u00eda electrod\u00e9bil y la electrodin\u00e1mica cu\u00e1ntica. Por otra parte la &#8220;gravedad cu\u00e1ntica&#8221; actualmente no consiste en un marco general \u00fanico sino un conjunto de propuestas que tratan de unificar la teor\u00eda cu\u00e1ntica de campos y la\u00a0<a title=\"Relatividad general\" href=\"http:\/\/es.wikipedia.org\/wiki\/Relatividad_general\"><a href=\"#\" onclick=\"referencia('relatividad',event); return false;\">relatividad<\/a> general<\/a>.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"data:image\/jpeg;base64,\/9j\/4AAQSkZJRgABAQAAAQABAAD\/2wCEAAoGCBIVExUTFREXGBcYGRkaGxkaGRohGxsaGBocGhcaHR0jHysjGh8pHR8gKDUkKCwuMjI\/GSE3PDcwOysxMy4BCwsLDw4PHRERHTEoIygzMTE1MTMxMTExMS4zMzEuMTkxLjExMTE7MTExMTE5MTIxMTE5MTExMTExMTMxMzExOf\/AABEIAMMBAgMBIgACEQEDEQH\/xAAcAAEAAgIDAQAAAAAAAAAAAAAABAUDBgECBwj\/xABCEAACAQIEBAMFBgQDBgcAAAABAgMAEQQSITEFEyJBBjJRI0JhcYEUM1JikaEHcoKxksHwFVNjotHSFiRDc5Oz4f\/EABoBAQADAQEBAAAAAAAAAAAAAAABAgMEBQb\/xAAjEQEBAAICAwACAgMAAAAAAAAAAQIRAzEEEiETQTJRBXGR\/9oADAMBAAIRAxEAPwDxmlKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKz4WRVdWeMOoIJQlgGHcXUgi\/qKDBVx4T4kuGxKTuDZQ46RcjOjICBmW+\/Zge99Kz8SaFMskeEhaJ75GJnuCPMjjm6Otxcd7gjQiquaeN2U8lUUeYRl9RfXV2ext9PhQbfB4pw8cc0Yw80fMaSQRly6yiWJ0XnM7ZiOtX2N8gIsTepGL8UcOMjNJwwlXkdzmjjDsDM7G7+bsFJv7rD1v0n8UPiRLKnDCwEZSRlGdEiCYgRglo2KFeapvcC2HWwA2iY3xlFJiRiGwS3yyjMWBkUyyTSXW68vpMoAzRsega60Ev\/AMRcO5mT\/ZgvnGnIjDFwY18mbTZ\/Zg5bsNPTtNxzAK2WThsllZlCuiXtzZZBGL25OUSIbIOrynSxMXiXjBJpYJYsDy3imknYxlS5F2kbqMZ7XZiwI6b2tUsePRFKw+xuhWRSytIM142wwykNH0aQMMoAC8zQDLqHXCeLOGp1jA5ZLqbrFELFeWLqQQVuocEDQ5wdwb+f1tnHfFUU2H5EeCjhJWJS4yE5Yw2ZR0AgEkHQ333vWp0ClKUClKUClKteHRLGn2mRAwBIiRtpJBuSO6LcE+pyr3YgMa8ExRAIw8tiAR0NqDqDt6Vm4ZwSWTFQ4ZwYmlYAF12BJGa2lxof0qsnlZmZ2YlmJJJ3JJuSfjeu2GneN1eN2R1N1ZSQykbEEag0G14jwFPpyZEkDBmB2BVY4XFmBZCSZsvSxW6Hq9ImL8HzxwTzM6ewKCRVbNkzF0IJGziRMhW3vA3trVZ\/t3GXLfbJ8zXuea9zcKDc310RR\/QvoK6S8ZxTAhsVMwK5SDI5BUAgKbnUWZhb8x9aC+TwPMY1lWWKxELauoyrNEsoL2YlDmdUAIucwI01qNxvwficPE07ZcihM2oDBnWMsAPeytIqkg66kCwNqnDcXxSG6YmZSMuqyOPKmRdj2TpHoNNq6ycTnZDG08hjNroXYqcoAW63sbBQB6ZR6UEKlKUClKUClKUClKUClKUClKUClKUE7h+LCEq6lo3sHS9ttmU+663Nj8SDcMwLieCMZBDZ0cZkcCwZfl7rA6Fex9RYmDVhw7GhVaKQFoWNyBbMjbCRL+8O40DDQ20ICx8NeIvs0UkTQiQSG\/UdFJRkLZSCLgNcFcrXGpI0rYp\/4ke0kZcKGVnBHMcklUlaZA4sRoTZbWygBbmwI0bH4RomykggjMjDyup2dT6G3zBBBAIIEWg3c+P5OWYxEQDzAW5pLlXieLMzlcxlGa+fY5QMtZj\/ABImzE\/Zkyly+QsxS5d3sVtYi7D\/AALWhUoLTxJxU4qdp2XKWCi1wT0KFBYhVzMbamwqrpSgUpSgUpUjBwNI6xoLsxsB\/ck7AAaknQWJoM3DMGHJZzljjGaRhuF7Bb7ux0Uep1sASOnEsVzHzWyqAFRAdEQbKPXuSe5JJ1JrPxOdABBEbxobltfaPsXt+HsoOw10LNVbQKUpQKUpQKUpQKUpQKUpQKUpQKUpQKUpQKVccH4G88byLLEqpcvnexVQ0a5jobA59D3yP3AB7N4en5JnGXIsaSvdlBRZGdY9Cbtmyi1r+dR3oKWlXfDfD0ssfNUqEPNC9QLF4o2lZMt8w6FOtrare2YVX4Xh08i5o4ZHW9rqjML+lwN6CJSpeK4fNGM0kMiAmwLoyi+9rkb6ftUSgtOHYtCnImJ5ZN1e1zEx94DcqdMy97AjUComOwjxsUYC41BBuGUi6sp2ZSNQRvesUMbMwVVLE6AAEk\/IDet04J4Mxs8XLmj5SqCYpJDZkJ1KFNXyMdbEDKTmG7BpmNvSLdNHpXq3Df4aYdLGaZ5DfZQEX5Hdj9CK2XhvhrCRW5eGjBGzFczD+prsP1racGV7+K3OPEcHwzES6xwSONrqjEfqBYVb4bwVj23iVB6s6f2BJ\/avZMdGV1O1v00rUOL+IQpKxrmPqdt7bbmoywwwm8qthM8\/4xrEXgGb3541\/lzMf3C1Jj8ALfXFn6Remv8AvK7v4nmvchNfQHvr6\/EfvVjwzjquRfQ6VGPpUWZTtXHwRAN5pD\/hH+RqTJ4VhhjZVeQO4s5zLdV3MY6NM1wW76ZfxA7JhXsM51OuQfEaF\/kDt6n5GsEyEg6E63\/W9\/7CtPx4q7rTW8MQa9Umgv5l11F\/c9L\/AKVDfgcN7DmbE+ZewJA8lbc8RzDQ63G34hb\/ADqomADAnYEH971Ppj\/RMq1mXh0WtpHFgTbKp21OuYdrnbtUU4WPKWEpFjbqW2pFx5S3of0q4lj68p7kofhmuh\/v+1VeHhaQSJGrOxyOFUEnpOU6DX36xzx1V4xycPYXsyNa17Na19vNa9\/hUaeF0NmUqfQgir0cFmJswSLPGg9q6R2ylAxIdg1hlJuBVj9hhDyRyYmOQZ5NIVdwwvcEFgi29pcMD6fTNLTatPDM8EWIjlnUsiEvlABzMqkxqQdCC+W99LX3qf4a4jFg8ZI7ZygSWNSoOcZ1Ko1hIhuLi+VwfQ1b4\/xBw6YyMcG+aQysWEcZZC4nAlzZgXPXF7MkBeVcMSSSEnCce4QjM6QWaSTOeZDnyZmdrD2oUKoZVGUAgxlurRTqHifERSYmWSG\/LZrrdUU7DMcqgAC97aX2vretrwviThnNunDyLOWjyxRsy3eVjdc3X0GNQCbLlLDUa8Y\/xHw8lSuBUSlgxaaJMtpJInYuRmLAqJLNlLASi17A0Gg0qx8RSwNiJDAuWEELH6skYCK50HUwGY\/FjVdQKUpQKUpQKUpQZopmUMqtYOArD1AYMAfhmAP9I9KsMN4gxUYRUmZQgUAAkBgjM6Zxs2UsbX209KqaUFrhuP4pEMYmYpaSyk3VTKrK7KNgxVmF\/wA1VVXnhnwxisY1oo+gGzSNoi\/XufgATrXqvhv+HmDw9mkXnyDvIOgfKPY\/1X+laYceWXStykeZeEOCY+Vs2HiJRul2cWiZb6q19HF+wuQQCLEA1v3C\/wCF+GzZ5XZtiYkY5FNuoByM7rfbykd77nf8mg07f2oy610Y8GM7UudVvDOFQYdcsMKRjY5V1P8AM3mb6k1JcVKYX+B9ex+fof8AXxrFIlt63muoowol9PlV1g8KqrcioPDUu1c+Isfy1sDWPLbbpfH5NuOPYRZEKr6a2ryzj3DDGx00\/wD0fp+tbXwrj3tSGPpWbxjg1ZM6jQi+168nly9rdfp73g+mOMmXVeQ49AN\/8u2hHlPumo+GlIYbmx+PY67L8CfqK2fHzYFcMA0czYnmm5z5EKMDYdxa1tAA1xuBWufbhrkw8K7a5DIdbd5WZR9BWvHvTi8uSZ\/I27hfEZJmvqSdlW+gGgUDew2+nrV8uGksbjLp77BTuOzEGtV4fxfEyBRJMzAAKF0ChQTYZVAXv6VsOCc22Gx7D0Pwrs47bi8\/Lt1mRV1M23ZAxOnzyj96itDndkjWSRlDHqlSMWTVtD6DXRr2B9Kz4hz8P8K\/9Kiy4ySNnKWGYFTpurEEg\/UD9K00qpeI8RIe4hiHUGuYw7EHqGsue30tVViuKTNzY3dmWzDKGZV6CDYIGyLoOy1P4oy3tyx5U2LX8o+JrGeD5pZS94xaU6srOQQ17R2BHqMxUHsTWeeFvyReZSdqeIRnJqy+yk3swt7Xc6f2NbV4a4GOYhnPSFvyxcM4CQXzbGMbaGzEHS3mrDw+GOLl8pNeTMeY2sgI5wGU7JqAekZtbZiK2bgWHKyKD94VK2\/AeVh7l\/zjLe3bW+ulXx8f1+5f8VvJv+LzfxqLY7FCwFpXBAtYEGxAtpvXPhfiMcDSGRCwZY7AWBOSaKUrcggBghF7Ht2vUbxM4bF4lhs00pHyMjEVXVyNW9YXxvAkpkXAhSWkJdDEkgV81grLCCtrgbnRaoPGPFUxUyyquX2ahv5rliPkubIPggqkpQKUpQKUpQKUpQKUpQK27+G\/hlcbM2ckRRBWcDdixOVQewNjc+g9TcajW+\/wW4py8Y0JPTMhA\/nQFk\/UZh8yKthrf1F3r49iwmGSNFjjRURRYKosAPQD51IVaiYbiMLmwkXN+Emzd7aH+Vv0qcBXdti4y10cVlNdXFJRHcVxfSx2\/cfL\/pXdjWO1afpCZwxADe9+9\/8AW1af434j1FQa2yKQJGx+FaTxDw7jZiZRF0nUXIvXB5Fy1fWGV+aasrsrBx2q3x3H3aHlgX\/1r39P8qjyYJ0bK6kH0oMH8K8Lkz5OPK\/EYeXnhNRXwcHw00SBpVjmBZ3az3yqwVF6vZkWbOSrBgEtlJuRU\/ZMKEw5QStL0c1ZD7PQAsFKgMBf0atnOANttPW2mlV0pw6HqmX+nqP\/AC3t9a7PF5OTkuvVaeTnyXeS1w+Hw2ZxGoCFpipCMMpd2aKwy+VUWNbf8RzWwRcLC2HOU300Ee1yt\/Psdx3N9bVpzcXhRFaON3uzr1WUdIQk+8SOoelYsLxuZ5Yx0opcAhV9TbdrkfQivax4ctJvJNr7iacsm7JlvYO2QKfkToT8AT9apuJ4+JWKkcw2XRVCjVQfMRf\/AJfrVBI5bqZiSRqWJJ\/U1YcRwjcws1kWy2ZzYGyKOkas\/wDSDW84pL9ZXO3pxxHFsG9mBHeOM9F83VEjEZyS1tdr202qQICZcU+ioDKM7Xy3L2toCWOuwBNdZRGJ0RVzseSuZ\/KOhF0Qb\/1Ej8tcAvLz5neyEZc7Xyi8qOEWw1Ngelf2q81J8V\/2zxNlVRErF+Q1ntZ+uZlGUAnJ5r33+IFxWw8LkWLnPuIuZKzDY5DIOWB3A5QuR8LaWzU2EUMSigKgXDpI7aMUYCVwdTYdBGQb3JJIF1zeLsSYeGturTFUQdN1DhZJs1veJVs3pnUbbYc2Wsa045uvLHJJuTcmutKV5zpKUpQKUpQKUpQKUpQKUpQKkcOxbxSxyobPG6up\/MpBH7io9KD3LiqxTpHiYxZJVWRe6liRdGtchrgx6X8zaVXYVJ48ojlkykGMMjm3ZoHOU2XMCo17A+tVX8IuLh0fh0h16pIb9zb2kXqLjqBGo67amtjnwdmIDZGOm9hfMShRhsAxK6kWWVBeuzjz3jpjnj9Y8PxzFBY3EzEbMCFNypvuRcXUgfQ1YQ8ZxIkyF1YE2BKgeYdDadtQawKrk9ag8wXF1B9ou4zd7m4GumcVIjiVlBKDTpNidvd3v8R9BVrkiQw\/G8QWAITXTynQnQE9XY1hk4\/iB7sd\/wCVv+6ps2FQ9VmGbU6g69+w+f1qFxWJLg5m6vyjf3ve9dfqKrlzTGbpZqLDifFHTDNKQN+m19iLi+voRVJwjxlMsTXf0FtToQddSbba201q\/wCIYVWwyRtcg6Hp9du9ahJ4KszGHEOmdWWxXa+osc34gP3rg4\/8nxY5\/jzm73N9OfPOe3rvW1VxzxKzMHBGhJvob+mh2tWxy8WQwpKNM6q1hpbMA1v3rUZPCCRn2uJZgOyoBf65zUziM0PKiAjkyrmjA5ijyEMPcPZ7b+7XXnw4+TZlZ8TcJr5XRseZZgpOj5k\/+RSg\/c1RgfvU6DGqjq6wRjKwOpkJ0N+7Zb\/Su2KxMqO6K+QK7L7MKl8pI1yAX+td3Fw48fzGaOo7\/YZOSuZclpH+8ITzJHqM1s3l7XrtwuOITRXkLnOuiKbb92axH0U1iw0TvC4RWciVCcoJOqyXJt8t6y8MwwWVC8iC1zlBzN0qT7t1G2zMK0vVJ2i\/aso9mipp5vM+34j5T8UC1n4lC8k0zAaB2VnY2UEG3Ux0v8L3rphzHmVEjzFiq5pNd9LhB0jfZi4qWqSTYhZHPszLcM5suTPchB3FuyjTval+XZ2yM0SYpjrIUkdu4RRFdrAeZzZfyi\/ZhWOKBnjXmuRzZI1RQACVUEWUWyxpeQa2t3AbamBa\/NeNC8gUnmNYWMjAEhb5VGQuczE7X6al4OOxFmzSIhcykkqss33RXu8hBQi9\/uzYHzCt+HadgkMjZithmkkWPLoIpCIg7g7vkEpVTqxAvYZQdV\/ipxESYkQKbrhwyk6HNIzZpDcbnYH4qa3LF4tcFhnnIHMTojDAEyOylEdtSS3mkIuABIy6sWNeQSuWJYkkkkkk3JJ1JJ7mvP5893UdPHjqbY6UpXO1KUpQKUpQKUpQKUpQKUpQKUpQZ8HiXjkSVGKujBlYbhlNwf1r3LgXE4+IYYTqFzgZZouyvbUj8CsASH2v5vJXg1XXhLxBLgpxNHqD0yIT0uh3U+h7g9iAatjl61Fm3tEUJBYBmViRoTu9tDcaWcettflVhBH3KrZtDYaX7+XfXX9qwcKxcGLhXEYds0bmxQ7o1rsjKPIwOt130OoJap2H0ubkX3I2v2a++vpvvWty3FJNOWgAUgg\/r3\/Tv\/kKpIoVkkyXbe46R2397uP7Ctgx2YobAHLub9h39f8AQqPwnkhTIhVmN\/KdFIFyPhXm+XlnrUnz9suWu+NQXCXFgLd9+371R8SxQUWEig\/1\/wDbU3ik673YX+R+Y7Vr\/FSjWfO\/Ve\/QPMPN7\/e4P9VV8LwPbP8AJyT6xx4932yVvGlVmzGUWYZgArnfcC4GzXH0qqKQmORc8mmWT7texyED2nfOD\/TVliViaPzvdDf7tfK1h\/vNg3\/2VX4cwcxV9oc90JuqgCQFL7Nte\/0r6LCamourC8A\/9ORvnIoB+gS\/\/NUniOKHMYrFGuYK5JXMbyIrnzlgNW7AVGMsS3HI178yRjb\/AAhKnSPMwieOEC8Y1WIGxRmjHWQWGiDXNWirGnPlhe+dwJIrXvkXolvv0qNvTtXGAgVWJaVfu5elOs\/dP3HRt+auzxu0TmWdfvIvM5kPlm06c1j87bU4esftOXHJK4jNgRYHMyRnoQlj0sdQ4+VT+qg4S45yCOG5Ul7t1uRGC5AFgq3y2vluL70wyAGSSSQu6xsMqtmY5\/YgGTVR576ZjodBWaEsEl5kiquXJy4gpOaRguqqQpOQOOpiwtsazYeFlRY1Vonlbyi7TMi6Ak6CNSzNcnJYJs2tVtTHEWHzLHBIOXzJM5iQWbIgsHdjfKAeYSXJYZRoBte8Kwpf2jheXrKWBASJAGVCl\/woGbm97pa4GZcXC8BnuqFeWQEUAEgxJrnZre0LEEXtyxeU2ezA6v4\/8TI+bC4Yry8xMsq3HNb0X8gsBfvlUeVVrm5eT1jbjw2qPHPHvtUwVLiCIFIlIt092I7XsNOwCjtWu0pXDbt0FKUqApSlApSlApSlApSlApV14aw+EfmDEs65VLqVKi6qGzqL7yXy5Rseq\/arHA8DwskPMaflnlTSLmdBndHKphxmYdWUBri\/n+K3DVKVenhEaYbESSyhZ4pREIhJES1iA7Zc+YqNRmUMDcW0DET4PDuD+0LEcerRmN3aQNAmUrsozTFWZtgLg6jYXIDU6VteN8LiKGLnSKjvOqZwbrkYMsmjZReN4zc3sc41tY1mwHA8AHxSSYtXCRgxuHjQXMcjFgoduYVdUXIpueYdPQKrwl4knwM3NiIKmwkjbySL6MPX0bcX+Jv7d4Y49hsbHzYGs6L7SJj7RDsb286H8QB3Gx0r51qRgMXJDIskbsjqbqymxB+dTLo09+8Q8PlkC5JQhGmVho3fKSpAvb46\/CsHh3BDCLd5WPMILHKcvT2GpvufnetZ8MfxOjcCPHLlci32iNbgj\/iRjUa63T\/CN63ZVWRDNDIkkbX643vm76lNEYa6kE6aje+symU1WWWKBimYFo2aMkE2uFFm+bAXB9R8DVUwJzIY49fz7OL5bgPp3H1v2q14vGb9WgNrO6x726lbNlIu1\/3O21PjYC4JMS5wOrMk4uot1dNwTbe177+tdGGtK5ICqwazYYZT0t955Toff3G\/zAqsxkcqEryoUIJGpiO3\/uManY8RsC5EWYfeXaYak2V9dddj8f5hULGCN0DgQXWyP1TnYWjPSe6i23ufGt8azrHjnlzl+dFGJAHuhS92F3AMSliA+YX\/AC1ixjI0cZknZyGkW4VmvbK1ruVPv+hqWmHLRKVjToYrdIZnOVrsthItj1Z7\/wAwrIgcRZc7qRIvSDDAetWvdVLE+TbLerS6QjLhssT\/APlyvtI\/v3y7LLsPZ6j06t67wAtBJ1mRSyKREojiFszHMxVVXULclfTXXSxTCZ4vIolzd0LPJHEgF7SgZmUNqyodLaaay8LwZ5eWpBbKC5LdZXPYnKWXKLKq9PLUi5sarc5+yYqvC4ZskaRgKZWJ9mxAYDpUGZrkkWkJWNWBBvoDVxgsAgVpCwjhVcoZsoRUFwxYHNctc5c5bV3FkIqJxjxBgcIXuwnmYBSkbAgKosEkl1uNNR1MNdrmvP8AxL4mxOMYGVrIvkjXSNNLCw3Jt3JJ7baVzcnP+o2x4\/7XfjLxnzFbDYXMsJ0dyTnlA0A11VLaa9TbtqSK0ilK5LbbutpNFKUqApSlApSlApSlApSlApSlArtmNrX03t89\/wCw\/SutKBSlKDNPiHe2d2awAGYk2AAAAvsLAD6CsNKUClK2Dhq4A4e8mZZcyITe\/mMxaQKGuwVeX02FyoF7MbBr9TuE8Unw78yCd4m9UYi\/wI2YfA6VfR4bA4eJMSkoxEiyWyFkUFMupaJlLjU23I0Y6dObXcM8IJzxyMPdCyKpHzJjbN+goPQsF\/EedYI5J8PHMS0sbMvs36RGwN1BXXOdMvu3qwg8Z8JlIL82FhqGeMSFT2yuCzWHoR8iK81xGNi5JijidQzo5LyBvIrrYARra+fU\/lFVtWmdnSLJXtcXEMA9nj4lFf0Z2iBuNbqQuW+um3yrgfZQbjH4cqdCpxy7Hcayfod9BXitK0\/Lkr6R7IYsApbPxDCspFiC8L31BUmwJ0IHc1Fk8QcLiVl+1F9uiGOQroDoA+VO\/YivJaUvNlT0j0bFfxCgjAXC4InLqrTNoG9eWn09+qXxT4hxeKjEnPIibpeJOlUe1yrBfOrWLKWufMLkqSdTqdwvGctjmXNG4yyJ+JSQdPRgQCp7EDcXBzuVva0kiDSpfFMJy3sGDIwDI4Fg6G4DW7G4II7FWHaolVSUq88HYbCPMRi5AkeRstywDPaygsoOUDVviVA71sPBuG8KMUXMliYF7PIZHSS5liCryuZomQyZmtst8wNgQ0Klb1huAcJZVvjmDZQWvJHYtkVigunRd2y5iSFyEm\/bvh\/DvCGkCfb2AB1YyQqCC0oGtiFyhEJN2vzBYDS4aFSt4j4FwsqrNjQOmPNkdQM3KiLoFcFrljI2fygrksDt2xXA+FxwvIuLEj5JMiGVNzFKyaKA2ZXVB+FuYNBqKDRaUpQKUpQKUpQKUpQKUpQKUpQKUpQKUpQKUpQKUpQKUpQKUpQKUpQWOExSGMwy5sl8yMqgsj6ZrAsAVYCxFxqFPYg8PFhbG00xNjYGFAL9rnnGw+lV9KDYPDWLwkcOKM0SySERiJSL6nPnIuCBbpv39KveKw8E5c7xyAysMRy09qEUl2MNhk0IVQACbdevw0Ktu4fiuHrhUSaNWZo9WUe0R1GM1DAgglmw4s11I7HLoFrw\/DcImhh5jxI0cStIFMisTeFHZ35epuXOQK5vswUWqJiMDwQRApiHaTl6hi665VOYWia8mYkBNFNjci2YyTiuBax8sZS4YHLNlsDJYM2bm\/dlAQDbPrbKK64yLgqRROFUl1Fhnd5FBbD5mlVJbBwpnIHSDZAQbGgzcjgCkosxKllBduYWCMVBy+zsLKCSdwSRtoIWHw3AnQs0ssbZD05mbqMUL6Hl7iRpUA2PLv6XySz8BDECAlSRqDiOkWgDZLuCRfnMMwJ0TtodX8TGI4iTlZMtkvkHRnCLzSltMvMzWtpa1tKCrpSlApSlApSlApSlApSlApSlApSlApSlApSlApSlApSlApSlApSlApSlApSlApSlApSlApSlApSlApSlB9k0pSgVzSlBxXNKUHFc0pQKUpQK4pSgUpSgVzSlBxSlKDmuKUoFKUoFKUoFc0pQcUpSgVzSlBxJsfka1mbicwK9e6g7L8fhSlBKjx8th19h2H\/SlKUH\/9k=\" alt=\"Nuevos resultados que apoyan la conjetura AdS\/CFT de Maldacena - La Ciencia de la Mula Francis\" \/><img decoding=\"async\" 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\" alt=\"ER=EPR, la nueva conjetura de Maldacena y Susskind - La Ciencia de la Mula Francis\" \/><\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0Van surgiendo por ah\u00ed nuevas conjeturas como, por ejemplo, las de <strong>Maldacena<\/strong>.<\/p>\n<blockquote>\n<p style=\"text-align: justify;\">&#8220;Las consecuencias de esta conjetura son muy importantes, pues existe la posibilidad de que el resto de interacciones (electromagn\u00e9ticas y nucleares) sean\u00a0<strong>tan s\u00f3lo una ilusi\u00f3n<\/strong>, el reflejo sobre el cristal de un escaparate del contenido de la tienda. As\u00ed, podr\u00eda ser que el electromagnetismo tan s\u00f3lo sea la imagen proyectada de la interacci\u00f3n de algunas cuerdas en un supuesto interior del espacio-tiempo. De la misma manera, la necesidad de compactificar las dimensiones adicionales desaparece en cierto modo si consideramos que, quiz\u00e1s, nuestro mundo sea solamente la frontera; siendo el interior del espacio-tiempo inaccesible.&#8221;<\/p>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Gravedad: La fuerza que no nos acompa\u00f1a: el caso de Einstein contra los Jedi | Vac\u00edo C\u00f3smico | EL PA\u00cdS\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcQ-8LfdRuC0HshhZ5aqibKWYpBAH_CZkFeTRg&amp;usqp=CAU\" alt=\"Una nebulosa planetaria con brazos espirales\" \/><\/p>\n<p>&nbsp;<\/p><\/blockquote>\n<p style=\"text-align: justify;\">Que gran sorpresa ser\u00eda si al final del camino se descubriera que en realidad solo existe una sola fuerza: La Gravedad, de la que se derivan las otras tres que hemos podido conocer en sus \u00e1mbitos particulares y que, \u00bfpor qu\u00e9 no? podr\u00edan surgir a partir de aquella primera y \u00fanica fuerza existente en los principios o comienzos del Universo: \u00a1La Gravedad! Que no acabamos de comprender.<\/p>\n<dl>\n<dd><\/dd>\n<\/dl>\n<p style=\"text-align: justify;\" align=\"right\"><em>emilio silvera<\/em><\/p>\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%2F2024%2F04%2F19%2Flas-interacciones-fundamentales-8%2F&amp;title=Las+Interacciones+Fundamentales' 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%2F2024%2F04%2F19%2Flas-interacciones-fundamentales-8%2F&amp;title=Las+Interacciones+Fundamentales' 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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