{"id":3018,"date":"2022-02-09T06:20:34","date_gmt":"2022-02-09T05:20:34","guid":{"rendered":"http:\/\/www.emiliosilveravazquez.com\/blog\/?p=3018"},"modified":"2022-02-09T06:20:06","modified_gmt":"2022-02-09T05:20:06","slug":"las-constantes-naturales-y-los-grandes-numeros","status":"publish","type":"post","link":"https:\/\/www.emiliosilveravazquez.com\/blog\/2022\/02\/09\/las-constantes-naturales-y-los-grandes-numeros\/","title":{"rendered":"Las Constantes Naturales y los grandes n\u00fameros"},"content":{"rendered":"<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"Las constantes de la naturaleza - John D. Barrow\" \/><img decoding=\"async\" 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\" alt=\"Las constantes de la Naturaleza : Blog de Emilio Silvera V.\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Dan al Universo su car\u00e1cter distintivo y lo hace singular, distinto a otros que podr\u00eda nuestra imaginaci\u00f3n inventar. Estos n\u00fameros misteriosos, a la vez que dejan al descubierto nuestros conocimientos, tambi\u00e9n dejan al desnudo nuestra enorme ignorancia sobre el Universo que nos acoge. Las medimos con una precisi\u00f3n cada vez mayor y modelamos nuestros patrones fundamentales de masa y tiempo alrededor de su invarianza; no podemos explicar sus valores.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"Las constantes de la Naturaleza : Blog de Emilio Silvera V.\" \/><\/p>\n<p style=\"text-align: justify;\">\n<blockquote>\n<p style=\"text-align: justify;\">&#8220;La\u00a0<strong>constante de estructura fina de\u00a0<a title=\"Arnold Sommerfeld\" href=\"https:\/\/es.wikipedia.org\/wiki\/Arnold_Sommerfeld\">Sommerfeld<\/a><\/strong>\u00a0(s\u00edmbolo\u00a0<em>\u03b1<\/em>) es la\u00a0<a title=\"Constante f\u00edsica fundamental\" href=\"https:\/\/es.wikipedia.org\/wiki\/Constante_f%C3%ADsica_fundamental\">constante f\u00edsica fundamental<\/a>\u00a0que caracteriza la fuerza de la\u00a0<a title=\"Interacci\u00f3n electromagn\u00e9tica\" href=\"https:\/\/es.wikipedia.org\/wiki\/Interacci%C3%B3n_electromagn%C3%A9tica\">interacci\u00f3n electromagn\u00e9tica<\/a>. Es una cantidad sin dimensiones, por lo que su valor num\u00e9rico es independiente del\u00a0<a title=\"Sistema de unidades\" href=\"https:\/\/es.wikipedia.org\/wiki\/Sistema_de_unidades\">sistema de unidades<\/a>\u00a0usado.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/wikimedia.org\/api\/rest_v1\/media\/math\/render\/svg\/0d22941cfa0575a66b28fbf330346b1b1e55f2bf\" alt=\"{\\displaystyle \\alpha ={\\frac {e^{2}}{4\\pi \\epsilon _{0}s}}\\div h\\nu ={\\frac {e^{2}}{4\\pi \\epsilon _{0}s}}\\div {\\frac {hc}{2\\pi s}}={\\frac {e^{2}}{4\\pi \\epsilon _{0}\\hbar c}}}\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">En la teor\u00eda de\u00a0<a title=\"Electrodin\u00e1mica cu\u00e1ntica\" href=\"https:\/\/es.wikipedia.org\/wiki\/Electrodin%C3%A1mica_cu%C3%A1ntica\">electrodin\u00e1mica cu\u00e1ntica<\/a>, la constante de estructura fina juega el rol de una\u00a0<a title=\"Constante de acoplamiento\" href=\"https:\/\/es.wikipedia.org\/wiki\/Constante_de_acoplamiento\">constante de acoplamiento<\/a>, representando la fuerza de la interacci\u00f3n entre <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electrones<\/a> y <a href=\"#\" onclick=\"referencia('foton',event); return false;\">fotones<\/a>. Su valor no puede predecirse por la teor\u00eda, y debe insertarse uno basado en resultados experimentales. De hecho, es uno de los veinte \u00abpar\u00e1metros externos\u00bb en el\u00a0<a title=\"Modelo est\u00e1ndar\" href=\"https:\/\/es.wikipedia.org\/wiki\/Modelo_est%C3%A1ndar\">modelo est\u00e1ndar<\/a>\u00a0de\u00a0<a title=\"F\u00edsica de part\u00edculas\" href=\"https:\/\/es.wikipedia.org\/wiki\/F%C3%ADsica_de_part%C3%ADculas\">f\u00edsica de part\u00edculas<\/a>.&#8221;<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/e-medida.es\/wp-content\/uploads\/2017\/11\/NuevoSI_Tabla1.gif\" alt=\"\" width=\"815\" height=\"215\" \/><\/p>\n<\/blockquote>\n<div style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 Tabla 1. Valores CODATA 2014 recomendados para\u00a0<em>h<\/em>,<em>e<\/em>,<em>k<\/em>\u00a0y\u00a0<em>N<\/em>A. Entre par\u00e9ntesis, los valores de las incertidumbres t\u00edpicas asociadas.<\/div>\n<p style=\"text-align: justify;\">Nunca nadie ha explicado el valor num\u00e9rico de ninguna de las constantes de la naturaleza. \u00bfRecord\u00e1is el 137? Ese n\u00famero puro, adimensional, que guarda los secretos del <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> (e), de la luz (c) y del cuanto de acci\u00f3n (h). Hemos descubierto otros nuevos, hemos relacionado los viejos y hemos entendido su papel crucial para hacer que las cosas sean como son, pero la raz\u00f3n de sus valores sigue siendo un secreto profundamente escondido.<\/p>\n<p style=\"text-align: justify;\">Buscar esos secretos ocultos implica que necesitamos desentra\u00f1ar la teor\u00eda m\u00e1s profunda de todas y la m\u00e1s fundamental de las leyes de la Naturaleza: descubrir si las Constantes de la Naturaleza que las definen est\u00e1n determinadas y conformadas por alguna consistencia l\u00f3gica superior o si, por el contrario, sigue existiendo un papel para el azar.<\/p>\n<p style=\"text-align: justify;\">\n<ul>\n<li>la frecuencia de la transici\u00f3n hiper-fina del estado fundamental no perturbado del \u00e1tomo de cesio 133, \u0394\u03bdCs, es 9 192 631 770 Hz,<\/li>\n<li>la velocidad de la luz en el vac\u00edo,\u00a0<em>c<\/em>, es 299 792 458 m\/s,<\/li>\n<li>la <a href=\"#\" onclick=\"referencia('planck constante de',event); return false;\">constante de Planck<\/a>,\u00a0<em>h<\/em>, es 6,626 070 15 x 10-34\u00a0J s,<\/li>\n<li>la carga elemental,\u00a0<em>e<\/em>, es 1,602 176 634 x 10-19\u00a0C,<\/li>\n<li>la constante de Boltzmann,\u00a0<em>k<\/em>, es 1,380 649 x 10-23\u00a0J\/K<\/li>\n<li>la constante de Avogadro,\u00a0<em>N<\/em>A, es 6,022 140 76 x 1023\u00a0mol-1,<\/li>\n<li>la eficacia luminosa de la radiaci\u00f3n monocrom\u00e1tica de 540 x 1012\u00a0Hz,\u00a0<em>K<\/em>cd, es 683 lm\/W.<\/li>\n<\/ul>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Si estudiamos atentamente las Constantes de la Naturaleza nos encontramos con una situaci\u00f3n muy peculiar. Mientras parece que ciertas constantes estuvieran fijadas, otras tienen espacio para ser distintas de las que son, y algunas no parecen afectadas por ninguna otra cosa del \u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u00ad\u2013 o en el \u2013 universo.<\/p>\n<p style=\"text-align: justify;\">\u00bfLlegaron estos valores al azar?<\/p>\n<p style=\"text-align: justify;\">\u00bfPodr\u00edan ser realmente distintos?<\/p>\n<p style=\"text-align: justify;\">\u00bfCu\u00e1n diferentes podr\u00edan ser para seguir albergando la existencia de seres vivos en el Universo?<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"Y si solo puede haber vida en nuestra regi\u00f3n de Universo?\" \/><img decoding=\"async\" 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\" alt=\"Constantes universales : Blog de Emilio Silvera V.\" \/><\/p>\n<blockquote>\n<p style=\"text-align: justify;\">Una simple variaci\u00f3n en la carga del <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> o en la masa del <a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a>, har\u00eda imposible la presencia de vida en nuestro Universo.<\/p>\n<p style=\"text-align: justify;\">\n<\/blockquote>\n<p style=\"text-align: justify;\">En 1986, el libro <em>The Anthropic Cosmological Principle<\/em> exploraba las diez maneras conocidas en que la vida en el universo era sensible a los valores de las constantes universales. Universos con constantes ligeramente alteradas nacer\u00edan muertos, privados del potencial para desarrollar y sostener la complejidad que llamamos vida.<\/p>\n<p style=\"text-align: justify;\">En la literatura cient\u00edfica puede encontrarse todo tipo de coincidencias num\u00e9ricas que involucran a los valores de las constantes de la naturaleza. He aqu\u00ed algunas de las f\u00f3rmulas propuestas (ninguna tomada en serio) para la constante\u00a0 de estructura fina.<\/p>\n<p style=\"text-align: justify;\">Valor experimental: 1\/\u03b1 = 137\u2019035989561\u2026<\/p>\n<p style=\"text-align: justify;\">\n<ul style=\"text-align: justify;\">\n<li>Lewis y Adams:\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 1\/\u03b1 = 8\u03c0 (8\u03c0<sup>5<\/sup> \/ 15)<sup>1\/3<\/sup> \u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 = 137\u2019384<\/li>\n<li>Eddington:\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 1\/\u03b1 = (16<sup>2<\/sup> \u2013 16) \/ 2 + 16 \u2013 1 \u00a0 = 137<\/li>\n<li>Wiler:\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 1\/\u03b1 = (8\u03c0<sup>4<\/sup> \/ 9)(2<sup>4<\/sup>5! \/ \u03c0<sup>5<\/sup>)<sup>1\/4<\/sup> \u00a0\u00a0\u00a0\u00a0\u00a0 = 137\u2019036082<\/li>\n<li>Aspden y Eagles:\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 1\/\u03b1 = 108\u03c0 (8 \/ 1.843)<sup>1\/6<\/sup>\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 = 137\u2019035915<\/li>\n<\/ul>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0<img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"El estado actual de la teor\u00eda M - La Ciencia de la Mula Francis\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Por supuesto, si la <a href=\"#\" onclick=\"referencia('supercuerdas teoria',event); return false;\">teor\u00eda M<\/a> da al fin con una determinaci\u00f3n del valor de 1\/\u03b1 podr\u00eda parecerse perfectamente a una de estas f\u00f3rmulas especulativas. Sin embargo ofrecer\u00eda un amplio y constante edificio te\u00f3rico del que seguir\u00eda la predicci\u00f3n.<\/p>\n<p style=\"text-align: justify;\">Tambi\u00e9n tendr\u00eda que haber, o mejor, que hacer, algunas predicciones de cosas que todav\u00eda no hemos medido; por ejemplo, las siguientes cifras decimales de 1\/\u03b1, que los futuros experimentadores podr\u00edan buscar y comprobar con medios m\u00e1s adelantados que los que ahora tenemos, a todas luces insuficientes en tecnolog\u00eda y potencia.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"http:\/\/3.bp.blogspot.com\/-brCSOUX8NeU\/Tk-WXvkh1eI\/AAAAAAAAADI\/XwnoSnDayoo\/s1600\/Constantes-f%25C3%25ADsicas-2.jpg\" alt=\"Obstinados navegantes en oc\u00e9anos de incertidumbre: LA CUESTI\u00d3N DE LAS  CONSTANTES F\u00cdSICAS DE LA NATURALEZA\" \/><\/p>\n<p style=\"text-align: justify;\">Todos estos ejercicios de juegos mentales num\u00e9ricos se acercan de manera impresionante al valor obtenido experimentalmente, pero el premio para el ingenio persistente le corresponde a Gary Adamson, cuya muestra de 137-log\u00eda se mostraron en numerosas publicaciones.<\/p>\n<p style=\"text-align: justify;\">Estos ejemplos tienen al menos la virtud de surgir de alg\u00fan intento de formular una teor\u00eda de electromagnetismo y part\u00edculas. Pero hay tambi\u00e9n matem\u00e1ticos \u201cpuros\u201d que buscan cualquier combinaci\u00f3n de potencias de n\u00fameros peque\u00f1os y constantes matem\u00e1ticas importantes, como \u03c0, que se aproxime al requerido 137\u2019035989561\u2026 He aqu\u00ed alg\u00fan ejemplo de este tipo.<\/p>\n<p style=\"text-align: justify;\">\n<ul style=\"text-align: justify;\">\n<li>Robertson:\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 1\/\u03b1 = 2<sup>-19\/4 <\/sup>3<sup>10\/3<\/sup> 5<sup>17\/4<\/sup> \u03c0<sup>-2<\/sup>\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 = 137\u201903594<\/li>\n<li>Burger:\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 1\/\u03b1 = (137<sup>2<\/sup> + \u03c0<sup>2<\/sup>)<sup>1\/2<\/sup>\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 = 137\u20190360157<\/li>\n<\/ul>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Ni siquiera el gran f\u00edsico te\u00f3rico Werner Heisenberg pudo resistirse a la iron\u00eda o ir\u00f3nica sospecha de que\u2026<\/p>\n<p style=\"text-align: justify;\">\u201c<em>En cuanto al valor num\u00e9rico, supongo que 1\/\u03b1 = 2<sup>4<\/sup> 3<sup>3<\/sup> \/ \u03c0, pero por supuesto es una broma.<\/em>\u201d<\/p>\n<p style=\"text-align: justify;\">Arthur Eddington, uno de los m\u00e1s grandes astrof\u00edsicos del siglo XX y una notable combinaci\u00f3n de lo profundo y lo fant\u00e1stico, m\u00e1s que cualquier figura moderna, fue el responsable impulsor de poner en marcha los inacabables intentos de explicar las constantes de la naturaleza mediante aut\u00e9nticas proezas de numerolog\u00eda pura. \u00c9l tambi\u00e9n advirti\u00f3 un aspecto nuevo y especular de las constantes de la naturaleza.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0\u00a0<img decoding=\"async\" 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\" alt=\"Teor\u00eda cu\u00e1ntica de campos - Wikipedia, la enciclopedia libre\" \/><img decoding=\"async\" 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\" alt=\"Teor\u00eda cu\u00e1ntica de campos - Wikipedia, la enciclopedia libre\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Hay que prestar atenci\u00f3n a las coincidencias. Uno de los aspectos m\u00e1s sorprendentes en el estudio del universo astron\u00f3mico durante el siglo XX, ha sido el papel desempe\u00f1ado por la coincidencia: que existiera, que fuera despreciada y que fuera recogida. Cuando los f\u00edsicos empezaron a apreciar el papel de las constantes en el dominio cu\u00e1ntico y a explorar y explorar la nueva teor\u00eda de la gravedad de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a> para describir el universo en conjunto, las circunstancias eran las adecuadas para que alguien tratara de unirlas.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcQQVcsvU-s8h2IKp5VOcd7fLE_rm42vqSttSQ&amp;usqp=CAU\" alt=\"Nota dominical: Por qu\u00e9 llamaron Sir Arthur \u00abAdding-One\u00bb a Eddington y el  n\u00famero de part\u00edculas que hay en el universo | Francis (th)E mule Science's  News\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcQ0ySkfrD4V1zelXQYiSuLu3BLWT41N5kvxSQ&amp;usqp=CAU\" alt=\"An\u00e9cdota Cient\u00edfica #10: Una confirmaci\u00f3n de la Relatividad. | \u2022Ciencia\u2022  Amino\" \/><\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0Tuvo un importante papel en la verificaci\u00f3n de la Teor\u00eda de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Entr\u00f3 en escena Arthur Eddington; un extraordinario cient\u00edfico que hab\u00eda sido el primero en descubrir c\u00f3mo se alimentaban las estrellas a partir de reacciones nucleares. Tambi\u00e9n hizo importantes contribuciones a nuestra comprensi\u00f3n de la galaxia, escribi\u00f3 la primera exposici\u00f3n sistem\u00e1tica de la teor\u00eda de la <a href=\"#\" onclick=\"referencia('relatividad',event); return false;\">relatividad<\/a> general de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a> y fue el responsable de verificar, en una prueba decisiva durante un eclipse de Sol, la veracidad de la teor\u00eda de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a> en cuanto a que el campo gravitatorio del Sol deber\u00eda desviar la luz estelar que ven\u00eda hacia la Tierra en aproximadamente 1\u201975 segmentos de arco cuando pasaba cerca de la superficie solar, y as\u00ed result\u00f3.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0<img decoding=\"async\" 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\" alt=\"El astrof\u00edsico Arthur Eddington - Cultura y ocio\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Albert <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a> y Arthur Stanley Eddington se conocieron y se hicieron amigos. Se conservan fotos de los dos juntos conversando sentados en un banco en el jard\u00edn de Eddington en el a\u00f1o 1930, donde fueron fotografiados por la hermana del due\u00f1o de la casa.<\/p>\n<p style=\"text-align: justify;\">Aunque Eddington era un hombre t\u00edmido con pocas dotes para hablar en p\u00fablico, sab\u00eda escribir de forma muy bella, y sus met\u00e1foras y analog\u00edas a\u00fan las utilizan los astr\u00f3nomos que buscan explicaciones gr\u00e1ficas a ideas complicadas. Nunca se cas\u00f3 y vivi\u00f3 en el observatorio de Cambridge, donde su hermana cuidaba de \u00e9l y de su anciana madre.<\/p>\n<p style=\"text-align: justify;\">Eddington cre\u00eda que a partir del pensamiento puro ser\u00eda posible deducir leyes y constantes de la naturaleza y predecir la existencia en el universo de cosas como estrellas y galaxias. \u00a1Se est\u00e1 saliendo con la suya!<\/p>\n<p style=\"text-align: justify;\">Entre los n\u00fameros de Eddington, uno lo consider\u00f3 importante y lo denomin\u00f3 \u201cn\u00famero de Eddington\u201d, que es igual al n\u00famero de <a href=\"#\" onclick=\"referencia('proton',event); return false;\">protones<\/a> del universo visible. Eddington calcul\u00f3 (a mano) este n\u00famero enorme y de enorme precisi\u00f3n en un crucero trasatl\u00e1ntico concluyendo con esta memorable afirmaci\u00f3n.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"C\u00f3mo es viajar en crucero solo - HolaCruceros Blog\" \/><img decoding=\"async\" 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\" alt=\"Tripadvisor | Crucero tur\u00edstico a bordo Bateaux Parisiens por el r\u00edo Sena  ofrecido por Bateaux Parisiens | Par\u00eds, Francia\" \/><\/p>\n<p style=\"text-align: justify;\">Con libreta y l\u00e1piz, sentado en lugar tranquilo del crucero (en el viaje de novios) dijo:<\/p>\n<p style=\"text-align: justify;\">\u00a0\u201c<em>Creo que en el universo hay <\/em><\/p>\n<p style=\"text-align: justify;\"><em>15.747.724.136.275.002.577.605.653.961.181.555.468.044.717.914.527.116.709.366.231.425.076.185.631.031.296 <\/em><\/p>\n<p style=\"text-align: justify;\"><em>protones y el mismo n\u00famero de <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electrones<\/a>.<\/em>\u201d<\/p>\n<p style=\"text-align: justify;\">Este n\u00famero enorme, normalmente escrito <em>N<sub>Edd<\/sub><\/em>, es aproximadamente igual a 10<sup>80<\/sup>. Lo que atrajo la atenci\u00f3n de Eddington hacia \u00e9l era el hecho de que debe ser un n\u00famero entero, y por eso en principio puede ser calculado exactamente.<\/p>\n<p style=\"text-align: justify;\">Durante la d\u00e9cada de 1920, cuando Eddington empez\u00f3 su b\u00fasqueda para explicar las constantes de la naturaleza, no se conoc\u00edan bien las fuerzas d\u00e9bil y fuerte, y las \u00fanicas constantes dimensionales de la f\u00edsica que s\u00ed se conoc\u00edan e interpretaban con confianza eran las que defin\u00edan la gravedad y las fuerzas electromagn\u00e9ticas.<\/p>\n<p style=\"text-align: justify;\">Eddington las dispuso en tres grupos o tres puros n\u00fameros adimensionales. Utilizando los valores experimentales de la \u00e9poca, tom\u00f3 la raz\u00f3n entre las masas del <a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a> y del electr\u00f3n:<\/p>\n<p style=\"text-align: justify;\">m<sub>p <\/sub>\/ m<sub>e<\/sub> \u2248 1.840<\/p>\n<p style=\"text-align: justify;\">La inversa de la constante de estructura fina:<\/p>\n<p style=\"text-align: justify;\">2\u03c0hc \/ e<sup>2<\/sup> \u2248 137<\/p>\n<p style=\"text-align: justify;\">Y la raz\u00f3n entre la fuerza gravitatoria y la <a href=\"#\" onclick=\"referencia('fuerza electromagnetica',event); return false;\">fuerza electromagn\u00e9tica<\/a> entre un <a href=\"#\" onclick=\"referencia('electron',event); return false;\">electr\u00f3n<\/a> y un <a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a>:<\/p>\n<p style=\"text-align: justify;\">e<sup>2<\/sup> \/ Gm<sub>p<\/sub>m<sub>e<\/sub> \u2248 10<sup>40<\/sup><\/p>\n<p style=\"text-align: justify;\">A \u00e9stas uni\u00f3 o a\u00f1adi\u00f3 su n\u00famero cosmol\u00f3gico, N<sub>Edd<\/sub> \u2248 10<sup>80<\/sup>.<\/p>\n<p style=\"text-align: justify;\">A estos cuatro n\u00fameros los llam\u00f3 \u201clas constantes \u00faltimas\u201d, y la explicaci\u00f3n de sus valores era el mayor desaf\u00edo de la ciencia te\u00f3rica.<\/p>\n<p style=\"text-align: justify;\">\u201c<em>\u00bfSon estas cuatro constantes irreducibles, o una unificaci\u00f3n posterior de la f\u00edsica demostrar\u00e1 que alguna o todas ellas pueden ser prescindibles?<\/em><\/p>\n<p style=\"text-align: justify;\"><em>\u00bfPodr\u00edan haber sido diferentes de los que realmente son?<\/em>\u201d<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"Qu\u00e9 es la constante gravitacional? - Gravedad\" \/><img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"Tema 4: Electromagnetismo\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">De momento, con certeza nadie ha podido contestar a estas dos preguntas que, como tantas otras, est\u00e1n a la espera de esa Gran Teor\u00eda Unificada del Todo, que por fin nos brinde las respuestas tan esperadas y buscadas por todos los grandes f\u00edsicos del mundo. \u00a1Es todo tan complejo! \u00bfAcaso es sencillo y no sabemos verlo? Seguramente un poco de ambas cosas; no ser\u00e1 tan complejo, pero nuestras mentes a\u00fan no est\u00e1n preparadas para ver su simple belleza. Una cosa es segura, la verdad est\u00e1 ah\u00ed, esper\u00e1ndonos.<\/p>\n<p style=\"text-align: justify;\">Para poder ver con claridad no necesitamos gafas, sino evoluci\u00f3n. Hace falta alguien que, como <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a> hace 100 a\u00f1os, venga con nuevas ideas y revolucione el mundo de la f\u00edsica que, a comienzos del siglo XXI, est\u00e1 necesitada de un nuevo y gran impulso. \u00bfQui\u00e9n ser\u00e1 el elegido? Por mi parte me da igual qui\u00e9n pueda ser, pero que venga pronto. Quiero ser testigo de los grandes acontecimientos que se avecinan, la <a href=\"#\" onclick=\"referencia('supercuerdas teoria',event); return false;\">teor\u00eda de supercuerdas<\/a> y mucho m\u00e1s.<\/p>\n<p style=\"text-align: justify;\">emilio silvera<\/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%2F2022%2F02%2F09%2Flas-constantes-naturales-y-los-grandes-numeros%2F&amp;title=Las+Constantes+Naturales+y+los+grandes+n%C3%BAmeros' 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%2F2022%2F02%2F09%2Flas-constantes-naturales-y-los-grandes-numeros%2F&amp;title=Las+Constantes+Naturales+y+los+grandes+n%C3%BAmeros' 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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Estos n\u00fameros misteriosos, a la vez que dejan al descubierto nuestros conocimientos, tambi\u00e9n dejan al desnudo nuestra enorme ignorancia sobre el Universo que nos acoge. Las medimos con una precisi\u00f3n cada vez mayor y modelamos nuestros patrones [&hellip;]<\/p>\n","protected":false},"author":2,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_s2mail":"yes","footnotes":""},"categories":[22],"tags":[],"_links":{"self":[{"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts\/3018"}],"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=3018"}],"version-history":[{"count":0,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts\/3018\/revisions"}],"wp:attachment":[{"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/media?parent=3018"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/categories?post=3018"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/tags?post=3018"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}