{"id":32158,"date":"2024-02-20T06:05:45","date_gmt":"2024-02-20T05:05:45","guid":{"rendered":"https:\/\/www.emiliosilveravazquez.com\/blog\/?p=32158"},"modified":"2024-02-20T06:05:45","modified_gmt":"2024-02-20T05:05:45","slug":"el-universo-de-las-particulas-es-fascinante","status":"publish","type":"post","link":"https:\/\/www.emiliosilveravazquez.com\/blog\/2024\/02\/20\/el-universo-de-las-particulas-es-fascinante\/","title":{"rendered":"El &#8220;universo&#8221; de las part\u00edculas, es fascinante"},"content":{"rendered":"<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 <img decoding=\"async\" loading=\"lazy\" id=\"irc_mi\" class=\"irc_mut\" style=\"margin-top: 0px;\" src=\"http:\/\/4.bp.blogspot.com\/-XQZFpB26wmQ\/TtPKYM69IrI\/AAAAAAAAADs\/YG_QlEqIXJM\/s1600\/experimento-nucle-atomo-alfa-pan-de-oro.jpg\" alt=\"\" width=\"420\" height=\"293\" \/><\/p>\n<p style=\"text-align: justify;\"><strong>\u00a0 \u00a0 \u00a0 \u00bfQu\u00e9 no ser\u00e1 capaz de inventar el hombre para descubrir los misterios de la naturaleza?<\/strong><\/p>\n<p style=\"text-align: justify;\">Ha pasado mucho tiempo desde que Rutherford identificara la primera part\u00edcula nuclear (la <a href=\"#\" onclick=\"referencia('particula alfa',event); return false;\">part\u00edcula alfa<\/a>). El camino ha sido largo y muy duro, con muchos intentos fallidos antes de ir consiguiendo los triunfos (los \u00fanicos que suenan), y muchos han sido los nombres que contribuyeron para conseguir llegar al conocimiento del \u00e1tomo y del n\u00facleo actual; los <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electrones<\/a> circulando alrededor del n\u00facleo, en sus diferentes niveles, con un n\u00facleo compuesto de <a href=\"#\" onclick=\"referencia('proton',event); return false;\">protones<\/a> y <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a> que, a su vez, son constituidos por los <a href=\"#\" onclick=\"referencia('quarks',event); return false;\">quarks<\/a> all\u00ed confinados por los <a href=\"#\" onclick=\"referencia('gluones',event); return false;\">gluones<\/a>, las part\u00edculas mediadoras de la <a href=\"#\" onclick=\"referencia('fuerza nuclear fuerte',event); return false;\">fuerza nuclear fuerte<\/a>. Pero, \u00bfqu\u00e9 habr\u00e1 m\u00e1s all\u00e1 de los <a href=\"#\" onclick=\"referencia('quarks',event); return false;\">quarks<\/a>?, \u00bflas supercuerdas vibrantes? Alg\u00fan d\u00eda se sabr\u00e1.<\/p>\n<p><iframe loading=\"lazy\" title=\"El n\u00facleo at\u00f3mico\" width=\"500\" height=\"281\" src=\"https:\/\/www.youtube.com\/embed\/he5671YVNkI?feature=oembed\" frameborder=\"0\" allow=\"accelerometer; autoplay; clipboard-write; encrypted-media; gyroscope; picture-in-picture; web-share\" allowfullscreen><\/iframe><\/p>\n<p><strong>\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 El n\u00facleo at\u00f3mico<\/strong><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\"><strong>\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0\u00a0 <img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"https:\/\/teoriaderuedas.com\/wp-content\/uploads\/2016\/10\/Helium_atom_QMuniv.svg_-e1475739224785.png\" alt=\"Cuarta fase: El n\u00facleo at\u00f3mico - Teor\u00eda de Ruedas\" width=\"393\" height=\"341\" \/><\/strong><\/p>\n<blockquote>\n<p style=\"text-align: justify;\">Si dividimos el \u00e1tomo en 100.000 partes, una de ellas ser\u00e1 el n\u00facleo at\u00f3mico. Lo curioso del caso es que esa peque\u00f1\u00edsima parte tiene el 99,99% de toda la masa del \u00e1tomos, el resto son espacios vac\u00edos. Adem\u00e1s, en esa infinitesimal superficie\u00a0 est\u00e1n los <a href=\"#\" onclick=\"referencia('nucleones',event); return false;\">nucleones<\/a> (<a href=\"#\" onclick=\"referencia('proton',event); return false;\">protones<\/a> y <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a>) que est\u00e1n hechos por part\u00edculas m\u00e1s peque\u00f1as llamadas Quarks, cada <a href=\"#\" onclick=\"referencia('hadrones',event); return false;\">hadr\u00f3n<\/a> <a href=\"#\" onclick=\"referencia('barion',event); return false;\">bari\u00f3n<\/a> (<a href=\"#\" onclick=\"referencia('proton',event); return false;\">protones<\/a> y <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a>) tienen en sus entra\u00f1as tripletes de Quarks\u00a0 que est\u00e1n all\u00ed confinados por la <a href=\"#\" onclick=\"referencia('fuerza nuclear fuerte',event); return false;\">fuerza nuclear fuerte<\/a>, la m\u00e1s potente de las cuatro fuerzas fundamentales del universo. La fuerza es intermediada por Bosones que se llaman Gluones, y, es la \u00fanica fuerza de las cuatro que no disminuye con la distancia, sino que, por el contrario, cuanto m\u00e1s se alejan los Quarks unos de otros m\u00e1s potente es la fuerza para retenerlos.<\/p>\n<\/blockquote>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" src=\"https:\/\/i.imgur.com\/INsbden.png\" \/><\/p>\n<p>&nbsp;<\/p>\n<blockquote>\n<p style=\"text-align: justify;\">El <a href=\"#\" onclick=\"referencia('gluones',event); return false;\">glu\u00f3n<\/a> es el\u00a0<a title=\"Bos\u00f3n\" href=\"https:\/\/quimica.fandom.com\/wiki\/Bos%C3%B3n\">bos\u00f3n<\/a> portador de la interacci\u00f3n nuclear fuerte, una de las cuatro fuerzas fundamentales. No posee masa ni carga el\u00e9ctrica, pero s\u00ed carga de color, por lo que adem\u00e1s de transmitir la interacci\u00f3n fuerte tambi\u00e9n la sufre<\/p>\n<\/blockquote>\n<p style=\"text-align: justify;\">El universo de las part\u00edculas es fascinante. Cuando las part\u00edculas primarias chocan con \u00e1tomos y mol\u00e9culas en el aire, aplastan sus n\u00facleos y producen toda clase de part\u00edculas secundarias. En esta radiaci\u00f3n secundaria (a\u00fan muy energ\u00e9tica) la que detectamos cerca de la Tierra, por los globos enviados a la atm\u00f3sfera superior, han registrado la radiaci\u00f3n primaria.<\/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 <img decoding=\"async\" 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\" alt=\"Radiaci\u00f3n c\u00f3smica - Wikipedia, la enciclopedia libre\" \/><img decoding=\"async\" loading=\"lazy\" class=\"\" 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\" alt=\"Aumento de la radiaci\u00f3n c\u00f3smica entre 2015 a 2016 | \u00bfDe que hablamos ahora?\" width=\"276\" height=\"196\" \/><\/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 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 <img decoding=\"async\" src=\"https:\/\/userscontent2.emaze.com\/images\/4194285f-1bdf-4d82-abd7-20b5de784a1d\/df51e5f0-1749-4069-ae17-39d618e26926.jpg\" alt=\"Radiacion cosmica by vpatino5529 on emaze\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">El f\u00edsico estadounidense Robert Andrews Millikan, que recogi\u00f3 una gran cantidad de informaci\u00f3n acerca de esta radiaci\u00f3n (y que le dio el nombre de rayos c\u00f3smicos), decidi\u00f3 que deber\u00eda haber una clase de radiaci\u00f3n electromagn\u00e9tica. Su poder de penetraci\u00f3n era tal que, parte del mismo, atravesaba muchos cent\u00edmetros de plomo. Para Millikan, esto suger\u00eda que la radiaci\u00f3n se parec\u00eda a la de los penetrantes <a href=\"#\" onclick=\"referencia('gamma rayos',event); return false;\">rayos gamma<\/a>, pero con una longitud de onda m\u00e1s corta.<\/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 <img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"data:image\/jpeg;base64,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\" alt=\"Volar en aviones nos expone a riesgos de radiaci\u00f3n c\u00f3smica? - 100CIA\" width=\"603\" height=\"345\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Otros, sobre todo el f\u00edsico norteamericano Holly Compton, no estaban de acuerdo en que los rayos c\u00f3smicos fuesen part\u00edculas. Hab\u00eda un medio para investigar este asunto; si se trataba de part\u00edculas cargadas, deber\u00edan ser rechazadas por el campo magn\u00e9tico de la Tierra al aproximarse a nuestro planeta desde el espacio exterior. Compton estudi\u00f3 las mediciones de la radiaci\u00f3n c\u00f3smica en varias latitudes y descubri\u00f3 que en realidad se curvaban con el campo magn\u00e9tico: era m\u00e1s d\u00e9bil cera del ecuador magn\u00e9tico y m\u00e1s fuerte cerca de los polos, donde las l\u00edneas de fuerza magn\u00e9tica se hund\u00edan m\u00e1s en la Tierra.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0<img decoding=\"async\" loading=\"lazy\" id=\"irc_mi\" class=\"irc_mut\" style=\"margin-top: 0px;\" src=\"http:\/\/images.iop.org\/objects\/phw\/news\/15\/8\/25\/cloud2.jpg\" alt=\"\" width=\"680\" height=\"481\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Las part\u00edculas c\u00f3smicas primarias, cuando entran en nuestra atm\u00f3sfera, llevan consigo unas energ\u00edas fant\u00e1sticas, muy elevadas. En general, cuanto m\u00e1s pesado es el n\u00facleo, m\u00e1s raro resulta entre las part\u00edculas c\u00f3smicas. N\u00facleos tan complejos como los que forman los \u00e1tomos de hierro se detectaron con rapidez; en 1.968, otros n\u00facleos como el del uranio. Los n\u00facleos de uranio constituyen s\u00f3lo una part\u00edcula entre 10 millones. Tambi\u00e9n se incluir\u00e1n aqu\u00ed <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electrones<\/a> de muy elevada energ\u00eda.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">\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=\"Dirac y la antimateria \u2013 Blog del Instituto de Matem\u00e1ticas de la Universidad de Sevilla\" \/><img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"data:image\/jpeg;base64,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\" alt=\"Qu\u00e9 es la Antimateria ? \u2013 matematicacuanticayconsciente\" width=\"377\" height=\"211\" \/><\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0<strong>\u00a0 \u00a0 \u00a0 \u00a0La famosa ecuaci\u00f3n de Dirac que predice la existencia del positr\u00f3n<\/strong><\/p>\n<p style=\"text-align: justify;\">Ahora bien, la siguiente part\u00edcula in\u00e9dita (despu\u00e9s del <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutr\u00f3n<\/a>) se descubri\u00f3 en los rayos c\u00f3smicos. A decir verdad, cierto f\u00edsico te\u00f3rico hab\u00eda predicho ya este descubrimiento. Paul Adrien Dirac hab\u00eda deducido, fund\u00e1ndose en un an\u00e1lisis matem\u00e1tico de las propiedades inherentes a las part\u00edculas subat\u00f3micas, que cada part\u00edcula deber\u00eda tener su <em>antipart\u00edcula<\/em> (los cient\u00edficos desean no s\u00f3lo que la naturaleza sea simple, sino tambi\u00e9n sim\u00e9trica). As\u00ed pues, deber\u00eda haber un <em>antielectr\u00f3n<\/em>, salvo por su carga que ser\u00eda positiva y no negativa, id\u00e9ntico al electr\u00f3n; y un <em>anti<a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a><\/em>, con carga negativa en vez de positiva.<\/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<img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"https:\/\/francis.naukas.com\/files\/2012\/06\/dibujo20120624-plaque-commemorate-paul-dirac-westminster-abbey.jpg\" alt=\"Paul A. M. Dirac y el descubrimiento del positr\u00f3n - La Ciencia de la Mula Francis\" width=\"568\" height=\"504\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">En 1.930, cuando Dirac expuso su teor\u00eda, no llam\u00f3 demasiado la atenci\u00f3n en el mundo de la ciencia. Pero, fiel a la cita, dos a\u00f1os despu\u00e9s apareci\u00f3 el anti<a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a>. Por entonces, el f\u00edsico americano Carl David Anderson trabajaba con Millikan en un intento por averiguar si los rayos c\u00f3smicos eran radiaci\u00f3n electromagn\u00e9tica o part\u00edculas. Por aquellas fechas, casi todo el mundo estaba dispuesto a aceptar las pruebas presentadas por Compton, seg\u00fan las cuales, se tratar\u00eda de part\u00edculas cargadas; pero Millikan no acababa de darse por satisfecho con tal soluci\u00f3n.<\/p>\n<p>\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0<img decoding=\"async\" src=\"https:\/\/www.uhv.es\/sites\/milka\/imagenes\/iones\/iones.gif\" alt=\"SMS::.. Fuente de Iones\" \/><\/p>\n<p style=\"text-align: justify;\">Las mol\u00e9culas del gas y los \u00e1tomos son ionizados por las colisiones con los <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electrones<\/a>, dentro de la c\u00e1mara de ionizaci\u00f3n. En el interior de la c\u00e1mara de ionizaci\u00f3n, se encuentra el \u00e1nodo dentro de un cilindro \u201crepeledor\u201d. El filamento (c\u00e1todo), se encuentra a una distancia equidistante de todo el \u00e1nodo. Los <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electrones<\/a> son emitidos y acelerados hacia el \u00e1nodo con una energ\u00eda de unos 100eV, es entonces cuando ionizan a las part\u00edculas de gas, formando un <a href=\"#\" onclick=\"referencia('plasma',event); return false;\">plasma<\/a> de iones y <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electrones<\/a>. De este modo un <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> que no haya colisionado con el gas se vera reflejado por el potencial del cilindro \u201crepetidor\u201d, y ser\u00e1 rempujado de nuevo hacia el \u00e1nodo.<\/p>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"https:\/\/services.meteored.com\/img\/article\/los-rayos-cosmicos-se-hunden-a-un-minimo-en-6-anos-1672469838155_1280.jpg\" alt=\"Los rayos c\u00f3smicos se hunden a un m\u00ednimo en 6 a\u00f1os\" width=\"488\" height=\"371\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Anderson se propuso averiguar si los rayos c\u00f3smicos que penetraban en una c\u00e1mara de ionizaci\u00f3n se curvaban bajo la acci\u00f3n de un potente campo magn\u00e9tico. Al objeto de frenar dichos rayos lo suficiente como para detectar la curvatura, si la hab\u00eda, puso en la c\u00e1mara una barrera de plomo de 6&#8217;35 mm de espesor. Descubri\u00f3 que, cuando cruzaba el plomo, la radiaci\u00f3n c\u00f3smica trazaba una estela curva a trav\u00e9s de la c\u00e1mara; y descubri\u00f3 algo m\u00e1s. A su paso por el plomo, los rayos c\u00f3smicos energ\u00e9ticos arrancaban part\u00edculas de los \u00e1tomos de plomo. Una de esas part\u00edculas dej\u00f3 una estela similar a la del <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a>. \u00a1All\u00ed estaba, pues, el anti<a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> de Dirac! Anderson le dio el nombre de positr\u00f3n. Tenemos aqu\u00ed un ejemplo de radiaci\u00f3n secundaria producida por rayos c\u00f3smicos. Pero a\u00fan hab\u00eda m\u00e1s, pues en 1.963 se descubri\u00f3 que los positrones figuraban tambi\u00e9n entre las radiaciones primarias.<\/p>\n<p style=\"text-align: justify;\">Abandonado a sus propios medios, el positr\u00f3n es tan estable como el <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> (\u00bfy por qu\u00e9 no habr\u00eda de serlo si el id\u00e9ntico al <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a>, excepto en su carga el\u00e9ctrica?). Adem\u00e1s, su existencia puede ser indefinida. Ahora bien, en realidad no queda abandonado nunca a sus propios medios, ya que se mueve en un universo repleto de <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electrones<\/a>. Apenas inicia su veloz carrera (cuya duraci\u00f3n ronda la millon\u00e9sima de segundo), se encuentra ya con uno.<\/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 <img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"https:\/\/images.everyeye.it\/img-notizie\/un-studio-positronio-confonde-scienziati-v4-464911-1280x720.jpg\" alt=\"Un nuovo studio sul Positronio confonde gli scienziati\" width=\"532\" height=\"299\" \/><\/p>\n<p>\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0Se han realizado estudios sobre el positronio para observar las reacciones del encuentro<\/p>\n<p style=\"text-align: justify;\">As\u00ed, durante un momento relampagueante quedaron asociados el <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> y el positr\u00f3n; ambas part\u00edculas girar\u00e1n en torno a un centro de fuerza com\u00fan. En 1.945, el f\u00edsico americano Arthur<strong> Edwed Ruark<\/strong> sugiri\u00f3 que se diera el nombre de <em>positronio<\/em> a este sistema de dos part\u00edculas, y en 1.951, el f\u00edsico americano de origen austriaco\u00a0 <strong>Martin Deutsch<\/strong> consigui\u00f3 detectarlo gui\u00e1ndose por los <a href=\"#\" onclick=\"referencia('gamma rayos',event); return false;\">rayos gamma<\/a> caracter\u00edsticos del conjunto.<\/p>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" src=\"https:\/\/upload.wikimedia.org\/wikipedia\/commons\/thumb\/e\/ec\/PairCreation.svg\/600px-PairCreation.svg.png\" \/><\/p>\n<blockquote>\n<p style=\"text-align: justify;\">Es caracter\u00edstica la reacci\u00f3n\u00a0<b>\u03b3\u00a0\u2192\u00a0e<sup>+<\/sup>\u00a0\u00a0+\u00a0 e<sup>&#8211;<\/sup>\u00a0<\/b>, donde el <a href=\"#\" onclick=\"referencia('foton',event); return false;\">fot\u00f3n<\/a> debe tener al menos una energ\u00eda igual a la masa del <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> y el positr\u00f3n (ambos tienen una energ\u00eda en reposo de 511 keV), es decir, 1.022 keV o 1,022 MeV, para poder generar las part\u00edculas. Generalmente este proceso viene seguido del inverso, en el que el positr\u00f3n generado se\u00a0<a class=\"mw-redirect\" title=\"Aniquilaci\u00f3n\" href=\"https:\/\/es.wikipedia.org\/wiki\/Aniquilaci%C3%B3n\">aniquila<\/a>\u00a0con un <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> de la materia que existe alrededor.<\/p>\n<p style=\"text-align: justify;\">Para que se d\u00e9 este proceso de creaci\u00f3n de pares es imprescindible que exista en las cercan\u00edas del <a href=\"#\" onclick=\"referencia('foton',event); return false;\">fot\u00f3n<\/a> inicial un n\u00facleo, cuya presencia es la que permite que se cumplan las leyes de conservaci\u00f3n de momento y energ\u00eda.<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0<img decoding=\"async\" src=\"https:\/\/i.imgur.com\/2RpccVl.png\" \/><img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"https:\/\/i.imgur.com\/486poY7.png\" width=\"303\" height=\"379\" \/><\/p>\n<p><strong>\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 El encuentro <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> positr\u00f3n es ef\u00edmero y se produce el decaimiento Beta<\/strong><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Pero no nos confundamos, aunque se forme un sistema positronio, su existencia durar\u00e1, como m\u00e1ximo, una diezmillon\u00e9sima de segundo. El encuentro del electr\u00f3n-positr\u00f3n provoca un aniquilamiento mutuo; s\u00f3lo queda energ\u00eda en forma de radiaci\u00f3n gamma. Ocurre pues, tal como hab\u00eda sugerido <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a>: la materia puede convertirse en energ\u00eda y viceversa. Por cierto, que Anderson consigui\u00f3 detectar muy pronto el fen\u00f3meno inverso: desaparici\u00f3n s\u00fabita de <a href=\"#\" onclick=\"referencia('gamma rayos',event); return false;\">rayos gamma<\/a> para dar origen a una pareja electr\u00f3n-positr\u00f3n. Este fen\u00f3meno se llama <em>producci\u00f3n en pareja<\/em>. Anderson comparti\u00f3 con Hess el premio Nobel de F\u00edsica de 1.936.<\/p>\n<p>&nbsp;<\/p><\/blockquote>\n<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" id=\"irc_mi\" class=\"irc_mut\" style=\"margin-top: 0px;\" src=\"http:\/\/lappweb.in2p3.fr\/neutrinos\/centenaire\/radimg\/joliot.jpg\" alt=\"\" width=\"504\" height=\"393\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Poco despu\u00e9s, los Joliot-Curie detectaron el positr\u00f3n por otros medios, y al hacerlo as\u00ed realizaron, de paso, un importante descubrimiento. Al bombardear los \u00e1tomos de aluminio con <a href=\"#\" onclick=\"referencia('particula alfa',event); return false;\">part\u00edculas alfa<\/a>, descubrieron que con tal sistema no s\u00f3lo se obten\u00edan <a href=\"#\" onclick=\"referencia('proton',event); return false;\">protones<\/a>, sino tambi\u00e9n positrones.<\/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 <img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"https:\/\/encrypted-tbn3.gstatic.com\/images?q=tbn:ANd9GcS6-tiQXEfPitEPHC1hK1iepRwUVg0PN4aHv1tta7h2Eau-ob2hkA\" alt=\"Resultado de imagen de los Joliot-Curie detectaron el positr\u00f3n por otros medios\" width=\"493\" height=\"493\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Cuando suspendieron el bombardeo, el aluminio sigui\u00f3 emitiendo positrones, emisi\u00f3n que s\u00f3lo con el tiempo se debilit\u00f3. Aparentemente hab\u00edan creado, sin propon\u00e9rselo, una nueva sustancia radiactiva. He aqu\u00ed la interpretaci\u00f3n de lo ocurrido seg\u00fan los Joliot-Curie: cuando un n\u00facleo de aluminio absorbe una <a href=\"#\" onclick=\"referencia('particula alfa',event); return false;\">part\u00edcula alfa<\/a>, la adici\u00f3n de los dos <a href=\"#\" onclick=\"referencia('proton',event); return false;\">protones<\/a> transforma el aluminio (n\u00famero at\u00f3mico 13) en f\u00f3sforo (n\u00famero at\u00f3mico 15). Puesto que las <a href=\"#\" onclick=\"referencia('particula alfa',event); return false;\">part\u00edculas alfa<\/a> contienen cuatro <a href=\"#\" onclick=\"referencia('nucleones',event); return false;\">nucleones<\/a> en total, el n\u00famero masivo se eleva 4 unidades, es decir, del aluminio 27 al f\u00f3sforo 31. Ahora bien, si al reaccionar se expulsa un <a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a> de ese n\u00facleo, la reducci\u00f3n en una unidad de sus n\u00fameros at\u00f3micos y masivos har\u00e1 surgir otro elemento, o sea, el silicio 30.<\/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<img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"Part\u00edcula alfa - Wikipedia, la enciclopedia libre\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn%3AANd9GcThMGwJy2o2oS35B9_k5hA56K9RWVkx0PLPXw&amp;usqp=CAU\" alt=\"Part\u00edcula beta | \u00bfQu\u00e9 es la radioactividad? Definici\u00f3n\" \/><\/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 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 <strong>\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 Part\u00edcula Alfa y part\u00edcula Beta<\/strong><\/p>\n<p style=\"text-align: justify;\">Puesto que la <a href=\"#\" onclick=\"referencia('particula alfa',event); return false;\">part\u00edcula alfa<\/a> es el n\u00facleo del helio, y un <a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a> es el n\u00facleo del hidr\u00f3geno, podemos escribir la siguiente ecuaci\u00f3n de esta <em>reacci\u00f3n nuclear<\/em>:<\/p>\n<p style=\"text-align: justify;\" align=\"center\"><strong>aluminio 27 + helio 4 = silicio 30 + hidr\u00f3geno 1<\/strong><\/p>\n<p style=\"text-align: justify;\"><strong>N\u00f3tese que los n\u00fameros m\u00e1sicos se equilibran:<\/strong><\/p>\n<p style=\"text-align: justify;\" align=\"center\"><strong>27 + 4 = 30 + 1<\/strong><\/p>\n<p style=\"text-align: justify;\">Adentrarse en el universo de las part\u00edculas que componen los elementos de la tabla peri\u00f3dica, y en definitiva, la materia conocida, es verdaderamente fant\u00e1stico.<\/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<img decoding=\"async\" loading=\"lazy\" id=\"irc_mi\" class=\"irc_mut\" style=\"margin-top: 83px;\" src=\"http:\/\/upload.wikimedia.org\/wikipedia\/commons\/8\/8d\/Hidrogeno_isotopo.jpg\" alt=\"\" width=\"532\" height=\"227\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">Tan pronto como los Joliot-Curie crearon el primer is\u00f3topo radiactivo artificial, los f\u00edsicos se lanzaron en tropel a producir tribus enteras de ellas. En realidad, las variedades radiactivas de cada elemento en la tabla peri\u00f3dica son producto de laboratorio. En la moderna tabla peri\u00f3dica, cada elemento es una familia con miembros estables e inestables, algunos procedentes de la naturaleza, otros s\u00f3lo del laboratorio. Por ejemplo, el hidr\u00f3geno presenta tres variedades: en primer lugar, el corriente, que tienen un solo <a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a>. En 1.932, el qu\u00edmico Harold Urey logr\u00f3 aislar el segundo. Lo consigui\u00f3 sometiendo a lenta evaporaci\u00f3n una gran cantidad de agua, de acuerdo con la teor\u00eda de que los residuos representar\u00edan una concentraci\u00f3n de la forma m\u00e1s pesada del hidr\u00f3geno que se conoc\u00eda, y, en efecto, cuando se examinaron al espectroscopio las \u00faltimas gotas de agua no evaporadas, se descubri\u00f3 en el espectro una leve l\u00ednea cuya posici\u00f3n matem\u00e1tica revelaba la presencia de <em>hidr\u00f3geno pesado<\/em>.<\/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 <img decoding=\"async\" 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\" alt=\"Ciencia de los Materiales (Powerpoint) (p\u00e1gina 2) - Monografias.com\" \/><img decoding=\"async\" loading=\"lazy\" class=\"\" src=\"data:image\/png;base64,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\" alt=\"&#x2622; La fusi\u00f3n nuclear - Energ\u00eda nuclear: el poder del \u00e1tomo\" width=\"345\" height=\"200\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">El n\u00facleo de hidr\u00f3geno pesado est\u00e1 constituido por un <a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a> y un <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutr\u00f3n<\/a>. Como tiene un n\u00famero m\u00e1sico de 2, el is\u00f3topo es hidr\u00f3geno. Urey llam\u00f3 a este \u00e1tomo <em><a href=\"#\" onclick=\"referencia('deuterio',event); return false;\">deuterio<\/a><\/em> (de la voz griega <strong><em>deutoros<\/em><\/strong>, &#8220;segundo&#8221;), y el n\u00facleo <em>deuter\u00f3n<\/em>. Una mol\u00e9cula de agua que contenga <a href=\"#\" onclick=\"referencia('deuterio',event); return false;\">deuterio<\/a> se denomina <em>agua pesada<\/em>, que tiene puntos de ebullici\u00f3n y congelaci\u00f3n superiores al agua ordinaria, ya que la masa del <a href=\"#\" onclick=\"referencia('deuterio',event); return false;\">deuterio<\/a> es dos veces mayor que la del hidr\u00f3geno corriente. Mientras que \u00e9sta hierve a 100\u00ba C y se congela a 0\u00ba C, el agua pesada hierve a 101&#8217;42\u00ba C y se congela a 3&#8217;79\u00ba C. El punto de ebullici\u00f3n del <a href=\"#\" onclick=\"referencia('deuterio',event); return false;\">deuterio<\/a> es de -23&#8217;7\u00ba K, frente a los 20&#8217;4\u00ba K del hidr\u00f3geno corriente. El <a href=\"#\" onclick=\"referencia('deuterio',event); return false;\">deuterio<\/a> se presenta en la naturaleza en la proporci\u00f3n de una parte por cada 6.000 partes de hidr\u00f3geno corriente. En 1.934 se otorg\u00f3 a Urey el premio Nobel de Qu\u00edmica por su descubrimiento del <a href=\"#\" onclick=\"referencia('deuterio',event); return false;\">deuterio<\/a>.<\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 <img decoding=\"async\" loading=\"lazy\" id=\"irc_mi\" class=\"irc_mut\" style=\"margin-top: 77px;\" src=\"http:\/\/upload.wikimedia.org\/wikipedia\/commons\/f\/fd\/Atomo_hidrogeno.gif\" alt=\"\" width=\"504\" height=\"378\" \/><\/p>\n<blockquote>\n<p style=\"text-align: justify;\"><strong>Representaci\u00f3n 3D animada de un <a href=\"#\" onclick=\"referencia('deuterio',event); return false;\">deuterio<\/a>. Hay que tener en cuenta que la \u00f3rbita del <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> no es regular.<\/strong><\/p>\n<\/blockquote>\n<p style=\"text-align: justify;\">El <a href=\"#\" onclick=\"referencia('deuterio',event); return false;\">deuterio<\/a> result\u00f3 ser una part\u00edcula muy valiosa para bombardear los n\u00facleos. En 1.934, el f\u00edsico australiano Marcus Lawrence Edwin Oliphant y el austriaco P. Harteck atacaron el <a href=\"#\" onclick=\"referencia('deuterio',event); return false;\">deuterio<\/a> con deuterones y produjeron una tercera forma de hidr\u00f3geno, constituido por un <a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a> y dos <a href=\"#\" onclick=\"referencia('neutron',event); return false;\">neutrones<\/a>. La reacci\u00f3n se plante\u00f3 as\u00ed:<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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alt=\"ISO = IGUAL. - ppt descargar\" \/><img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"Trit\u00f3n (qu\u00edmica) - Wikipedia, la enciclopedia libre\" \/><\/p>\n<p style=\"text-align: justify;\" align=\"center\"><strong>hidr\u00f3geno 2 + hidr\u00f3geno 2 = hidr\u00f3geno 3 + hidr\u00f3geno 1<\/strong><\/p>\n<p style=\"text-align: justify;\">Este nuevo hidr\u00f3geno superpesado se denomin\u00f3 <em><a href=\"#\" onclick=\"referencia('tritio',event); return false;\">tritio<\/a><\/em> (del griego<strong> <em>tritos<\/em><\/strong>, &#8220;tercero&#8221;); su ebullici\u00f3n a 25\u00ba K y su fusi\u00f3n\u00a0 a 20&#8217;5\u00ba K.<\/p>\n<p style=\"text-align: justify;\">Como es mi costumbre, me desv\u00edo del tema y sin poderlo evitar, mis ideas (que parecen tener vida propia), cogen los caminos m\u00e1s diversos. Basta con que se cruce en el camino del trabajo que realizo un fugaz recuerdo; lo sigo y me lleva a destinos distintos de los que me propuse al comenzar. As\u00ed, en este caso, me pas\u00e9 a la qu\u00edmica, que tambi\u00e9n me gusta mucho y est\u00e1 directamente relacionada con la f\u00edsica; de hecho son hermanas: la madre de ambas son las matem\u00e1ticas. Las matem\u00e1ticas componen ese lenguaje que explica lo que las palabras no pueden.<\/p>\n<p style=\"text-align: justify;\"><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%2F02%2F20%2Fel-universo-de-las-particulas-es-fascinante%2F&amp;title=El+%26%238220%3Buniverso%26%238221%3B+de+las+part%C3%ADculas%2C+es+fascinante' 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%2F02%2F20%2Fel-universo-de-las-particulas-es-fascinante%2F&amp;title=El+%26%238220%3Buniverso%26%238221%3B+de+las+part%C3%ADculas%2C+es+fascinante' 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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Ha pasado mucho tiempo desde que Rutherford identificara la primera part\u00edcula nuclear (la part\u00edcula alfa). El camino ha sido largo y muy duro, con muchos intentos fallidos [&hellip;]<\/p>\n","protected":false},"author":2,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_s2mail":"","footnotes":""},"categories":[1],"tags":[],"_links":{"self":[{"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts\/32158"}],"collection":[{"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/users\/2"}],"replies":[{"embeddable":true,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/comments?post=32158"}],"version-history":[{"count":0,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts\/32158\/revisions"}],"wp:attachment":[{"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/media?parent=32158"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/categories?post=32158"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/tags?post=32158"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}