{"id":12370,"date":"2022-01-16T05:15:43","date_gmt":"2022-01-16T04:15:43","guid":{"rendered":"http:\/\/www.emiliosilveravazquez.com\/blog\/?p=12370"},"modified":"2022-01-16T05:15:36","modified_gmt":"2022-01-16T04:15:36","slug":"%c2%bfcuanta-materia-vemos-6","status":"publish","type":"post","link":"http:\/\/www.emiliosilveravazquez.com\/blog\/2022\/01\/16\/%c2%bfcuanta-materia-vemos-6\/","title":{"rendered":"\u00bfCu\u00e1nta materia vemos?"},"content":{"rendered":"<div style=\"text-align: justify;\">\u00a0<img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/www.universetoday.com\/wp-content\/uploads\/2009\/05\/hubble-constant-2-580x290.jpg\" alt=\"\" width=\"580\" height=\"290\" border=\"0\" \/><\/div>\n<div>\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\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 La constante de <a href=\"#\" onclick=\"referencia('hubble',event); return false;\">Hubble<\/a>\u00a0en funci\u00f3n de la Densidad Cr\u00edtica<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">La cantidad total de Materia del Universo se da generalmente en t\u00e9rminos de una cantidad llamada Densidad Cr\u00edtica, denotada por \u03a9. Esta es la densidad de la materia que se necesita para producir un universo plano. Si Densidad efectivamente observada es menor o mayor que ese , en el primer caso el Universo es abierto, en el segundo es cerrado.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"Densidad Cr\u00edtica : Blog de Emilio Silvera V.\" \/><img decoding=\"async\" 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\" alt=\"Friedmann Equation\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">La Densidad Cr\u00edtica no es muy grande; corresponde aproximadamente a un <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a><\/a> por metro c\u00fabico de espacio. Puede que no parezca mucho, dado el n\u00famero inmenso de \u00e1tomos en un metro c\u00fabico de lodo, pero no debemos olvidar que existe una gran cantidad de espacio \u201cvac\u00edo\u201d las galaxias.<\/p>\n<p style=\"text-align: justify;\">Algunos n\u00fameros que definen nuestro Universo:<\/p>\n<ul style=\"text-align: justify;\">\n<li>El n\u00famero de <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('foton',event); return false;\">fotones<\/a><\/a> por <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a><\/a><\/li>\n<li>La raz\u00f3n densidades de &#8220;Materia Oscura&#8221; y Luminosa.<\/li>\n<li>La Anisotrop\u00eda de la Expansi\u00f3n.<\/li>\n<li>La falta de homogeneidad del Universo.<\/li>\n<li>La Constante Cosmol\u00f3gica.<\/li>\n<li>La desviaci\u00f3n de la expansi\u00f3n respecto al valor cr\u00edtico.<\/li>\n<li>Fluctuaciones de vac\u00edo y sus consecuencias.<\/li>\n<li>\u00bfOtras Dimensiones?<\/li>\n<\/ul>\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\" loading=\"lazy\" src=\"http:\/\/www.esa.int\/images\/heic0701c_L.jpg\" alt=\"\u201ddistribuci\u00f3n_materia_oscura_y_materia_bari\u00f3nica\u201d\" width=\"450\" height=\"216\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">En las \u00faltimas medidas realizadas, la\u00a0 <strong>Densidad cr\u00edtica<\/strong> que es la densidad necesaria que la curvatura del universo sea cero, ha dado el resultado siguiente:\u00a0 r<sub>0<\/sub> = 3H<sub>0<\/sub><sup>2<\/sup>\/8pG = <em>1.879 h<sup>2<\/sup> 10<sup>-29<\/sup> g\/cm<sup>3<\/sup><\/em>, que corresponde a una densidad tan baja la de la masa de 2 a 3 \u00e1tomos de hidr\u00f3geno por metro c\u00fabico (siempre, por supuesto obviando la incertidumbre en la constante de <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('hubble',event); return false;\">Hubble<\/a><\/a>).<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/www.iac.es\/cosmoeduca\/universo\/anexos\/densidaduniverso_clip_image005.jpg\" alt=\"Origen y evoluci\u00f3n del Universo\" \/><img decoding=\"async\" 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\" alt=\"Materia negra \u2014 Astronoo\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Estimar la cantidad de materia luminosa del universo es una cosa muy f\u00e1cil de hacer. Sabemos el brillo que tiene una estrella media, as\u00ed que podemos hacer una estimaci\u00f3n del de estrellas de una galaxia distante. Podemos contar entonces el n\u00famero de galaxias en un volumen dado de espacio y sumar las masas que encontramos. Dividiendo la masa por el volumen del espacio obtenemos la densidad media de materia en ese volumen. Cuando llevamos a cabo esta operaci\u00f3n, obtenemos que la densidad de la materia luminosa es aproximadamente entre el <strong>uno<\/strong> o <strong>dos <\/strong>% menor de la <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('densidad critica',event); return false;\">densidad cr\u00edtica<\/a><\/a>; es decir, menos de lo que se necesita cerrar el universo.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" title=\"M\u00e1s...\" src=\"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-includes\/js\/tinymce\/plugins\/wordpress\/img\/trans.gif\" alt=\"\" \/><\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/upload.wikimedia.org\/math\/c\/2\/1\/c21f7b175e75cc6183cc565bdcb9d698.png\" alt=\"\" width=\"244\" height=\"71\" border=\"0\" \/><img decoding=\"async\" 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\" alt=\"Qu\u00e9 forma tiene el Universo? - Universo - 2022\" \/><\/p>\n<blockquote>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">En funci\u00f3n de la cantidad de materia (Omega negro), Densidad Cr\u00edtica, el Universo ser\u00e1: abierto, plano o cerrado. Lo de la &#8220;<a href=\"#\" onclick=\"referencia('materia oscura',event); return false;\">materia oscura<\/a>&#8221; que muchas dan por hecho&#8230; \u00a1Est\u00e1 por ver!<\/p>\n<\/blockquote>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Por otro lado, est\u00e1 lo bastante cerca del valor cr\u00edtico para hacer una pausa. Despu\u00e9s de todo, esta fracci\u00f3n podr\u00eda haber sido en principio de una billon\u00e9sima o trillon\u00e9sima, y tambi\u00e9n podr\u00eda haber sucedido que fuese un mill\u00f3n de veces la materia necesaria para el cierre. \u00bfPor qu\u00e9, entre todas las masas que podr\u00eda tener el universo, la masa de materia luminosa medida est\u00e1 cerca del valor cr\u00edtico?<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\u00a0<img decoding=\"async\" loading=\"lazy\" id=\"il_fi\" src=\"http:\/\/cerezo.pntic.mec.es\/%7Emrego\/graphics\/Cosmo5\/Fig6model.gif\" alt=\"\" width=\"410\" height=\"352\" \/><\/p>\n<p style=\"text-align: justify;\">Claro que el hecho de que la materia luminosa medida est\u00e9 tan cercana al valor cr\u00edtico, simplemente debe ser a un accidente c\u00f3smico; las cosas simplemente \u201cresultan\u201d de ese modo. Me costar\u00eda mucho aceptar una explicaci\u00f3n y supongo que a otros tambi\u00e9n. Es tentador decir que el Universo tiene en realidad la masa cr\u00edtica, pero que de alg\u00fan modo no conseguimos verla toda.<\/p>\n<p style=\"text-align: justify;\">Como resultado de esta suposici\u00f3n, los astr\u00f3nomos comenzaron a hablar de la \u201cmasa perdida\u201d con lo que alud\u00edan a la materia que habr\u00eda llenado la diferencia densidades observadas y cr\u00edtica. Tales teor\u00edas de \u201cmasa perdida\u201d, \u201cinvisible\u201d o, finalmente \u201coscura\u201d, nunca me ha gustado, toda vez que, hablamos y hablamos de ella, damos por supuesta su existencia sin haberla visto ni saber, exactamente qu\u00e9 es, y, en ese plano, parece como si la Ciencia se pasara al \u00e1mbito religioso, la fe de creer en lo que no podemos ver ni tocar y, la Ciencia, amigos m\u00edos, es otra cosa.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"La materia oscura, Pullman y Milton - Thalassa, ciencia ficci\u00f3n\" \/><img decoding=\"async\" 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\" alt=\"Cient\u00edficos del XENON1T podr\u00edan haber detectado accidentalmente la energ\u00eda  oscura | Ciencia y Ecolog\u00eda | DW | 17.09.2021\" \/><\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"Nueva b\u00fasqueda de materia oscura en el LHC\" \/><img decoding=\"async\" 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\" alt=\"La materia oscura, aquello que nos invade y no podemos ver | Ciencia | La  Rep\u00fablica\" \/><\/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 Buscan desesperadamente la &#8220;<a href=\"#\" onclick=\"referencia('materia oscura',event); return false;\">materia oscura<\/a>&#8221; que no se deja ver<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Tendremos que imaginar sat\u00e9lites y sondas que, de alguna manera, puedan detectar grandes halos gal\u00e1cticos que encierren la tan buscada <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('materia oscura',event); return false;\">materia oscura<\/a><\/a> y que, al parecer, hace que nuestro Universo sea lo conocemos y, es la responsable del ritmo al que se alejan las galaxias, es decir, la expansi\u00f3n del Universo.<\/p>\n<p style=\"text-align: justify;\">Esos halos, tendr\u00edan muchas veces las masas que podemos ver en la Materia luminosa de las estrellas, planetas, galaxias y nosotros mismos. La teor\u00eda de la <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('materia oscura',event); return false;\">materia oscura<\/a><\/a> y su presencia en c\u00famulos y superc\u00famulos ha sido \u201cdescubierta\u201d (o inventada tapar nuestra ignorancia)\u00a0en \u00e9poca relativamente cercana para que prevalezca entre los astr\u00f3nomos la unanimidad respecto a su contribuci\u00f3n a la masa total del universo.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0<img decoding=\"async\" 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\" alt=\"Qu\u00e9 es la materia oscura y para qu\u00e9 sirve? - BBC News Mundo\" \/><img decoding=\"async\" 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ETm9VRC\/S++yWYtYa6IIFYPPc35TLzr56NPCLvsUAs1GvlMjMrCmUkEeBBowX1cE4J3e+efPmMdNqqN25SbXGeD2PnKTJaCaLnj+eMYGlfl6wGm4nT6DqNNW+tCyZwGojwo1yPSbWKmUrgg2lUa6LrNiaibEYOu22WyubtT2MDrsLNcQKNG0mCqMFZe6ZeZqKhDd+cuCuSFAf19IqaPPqD\/SRFmtGiRZrzPAEb6L5e9Q5IW\/qZckDxHjUqxUT6+ComWAML1NBj5Hn3i2oRuIBxVgtQxV5onPl44jekLxYLU0+fzAfENV9qIwACra0oBKt9YLEfqwcE9pnV1TFdQsxySe3sMATn31m2XFDFwyHG2hzd1nwq\/CaXpiNvDb1sBTZySKI7EEcenjLRakpUpuDmg\/0hfA2PpHcZtuewx6zo6HVMi4xZ5s5rt4dxOaijaCG+q621+b79pNTUIwbx28D3\/pKaTUBNp06mt1pfLEk+cmnroNv02QbazhhiloccH7zlJqRn5gYk0BfABND72SPeCSQNt9GOo6mySBXehwPIRbV177xfWYj0gi2RZx38o2yUP6Oru2rsVjRUYoktdE1yQTj7S9faCUJK7QeRksP9OOM3OVqa20nabAJo8WOxrtBHWPJk1fB9+jupq3ybjPxDpkREdNVXLDKjcCp8DYA+xMQTTZhYBq647+HrA6wIwYtVxpjy0rTpdD143odS2VSMX2vgeE6f\/EHxLR1X3aemEFVX747zyqnvcP0nUujq6mipsWAR7g4PoZHiqn9L8nIN2m1httrFNdUM2K73j7TA04MahJJ8T7faOdO6gMCoJIoGyNpsGxXOARnxm6MGCUQlGFpaOc9sYPj6QReWSaQeOIFnl67ihQqhnPJs58u32iT6kT1BpBd+ZtyLNHHYkVfhjNGKq0JcmlQ1ukmN8kKEH1f\/EIgJuhwM1+8UD8fzvGtHqWUMoYgMKYWQCOaMdfwSSvSwTkWc8557++RA6qQoaRluWR9FTpzDJHnawLGRj1HaWvRuSg+kfMypZgBW4rZJOMg8yNRLpaTbiE+l1m03DoSrC6IqxYIsX3zzB3Cv9LeNeh9fUQOc0L7+w5MnnsrvoPpam3PfsbIo3diu8J85AxbUBd9+QTYcG91kG7vvebPhnnNqwLvmRrpWeHpfhWr0zPojUQhRu+YQf1WTtodqwItodV8tyyBWAJoMquCPNWBBnJ0Xh98WcoHpjmvplnbANWTtyteIrFRXWAxXvNaXVMm7axG4bTXcHsfKAZ7lf8Agn\/RZ5kISL7eNGrAusd4R1kQHgk0L86sGsHzkNMrLQz0PVbQfqIPb3wfQ1Umtp2LEU2UY7oOtG7uht4\/VYu\/Kt34lZfxk6X0XTTonIwL4OT\/ANv88DzOj8K6fTdx812RSc7VBxR4yPLEWZyST48+s7Hwoh1dGC\/ptPoBYv2UMKYA349oaUQ89Yqqoj7todeVBOD2BajfnUGW3Zqj38D6CsQurolbBHr\/AEz9\/wAxdWqaZSXSdNvhliYIvG9t96\/eB6kWS3ib8I3SELu0V1YwYPUSRotGNJxeRY8Lo8czbNAslEjH88+80qkyU4VKa3STO2SPyH4joMLu87x\/BBAQqzRGTCaYjaDEAgxNbyJplmekEdcRLUYj2jiankDgjIvkV94DU04tdHngiWhet6pCwOmh06QKfqJJNUxJ87OBipWon5gHSYaya51wBqJgGxknHcV4\/f8ABgYcpkV73x+JGXFbQOL9u+eLvtiQacINS+f6AcQ2ujIxR1KsuCDgg+BHaAfTxY4wMkXdWaHNc59PGWgu7Pbwuz4QTE0FUwjaDBA54Ziozm1Ck4\/8wgV852dDU6TZTLrq44KujLfmpCkfeLWmvgZymcdko1YPpf2yBKWO\/EtZXfciKgoCh3IHNWeYB0F4Njxqs0LHsTKy6ui0ozWykymWyrWf02QaHqPwZvpunLXQJCizQuhxZ8BkRnpes2ab6ZRDvqnK26EH\/QbxYwRFVBF7brxjSYuB30FDsFbcoJAaqsdjR4nW+Faz6RGolBlODjBIPb7zndMTkc3zfrPS9T8D2dOmsXX6uFBz7ym1EtfQSftfDh9SSxJOSc3f3irLN6rQbamK\/H89ZrxejOt+ybsAfwzOqozVkdrGa7WM0ZgNmNdNpbiB4yW4is5rhzXXnEEy2ane+JfCX0wCykWMY5nEcEGZLS0qi3l5cZPiPQPpttdSrUDTCjRFj8S\/hXVrpOrOgdVN7GvaTXepOq6zUcje5alCizdKOAL4ArtEzIabUZon4uo6v\/VV\/wCxPtJORckn9SL\/AG6OmtZ5vt\/vCJBAQgadSORnoNDqtAdMyfLHzCwO7fWKOPD\/ADONeYDdIjZhlQT6MgzUwGl8zSkME4uZfSEMVqa7RSjpzNfRKkg\/3mvh+oi6iM67kDAsvioOR9ox1GfDw4i+ho7jWOCckAYBPJ7495jrPw1zrvDXW7dTWdtNCA7kogzQJNAdzUX2ViM6TMjBlYqwyGBIqvCplwSdxNkm\/EnzMlZnBvV6BVIRCRYBoHB9Lv8AaMdO6r+pAw9SPyDA1mOdH6VTMDTlqk6XUsgRECrvX9TqbDA5A45EBtvgRrqJfHBpfh2o+m2scgMFJN8kYzx28ZnoUDFUZwo3AcXzdufTEP8AMQaTId++1rP00BTAjxuIBaP9jDKb4NtIfToXJbapIQ5I4Gf8wnU9RaqoZztX6g1AA+C5yOJOh+KaukrBWYBxRpiL+xzz38Zz2ezZjytN9E3mcDvtezW2kFAWdzCgSSTi\/qb8RJiKOcjgVz4xwdbtRkHcj0oXz71+ZzHMOjc5DYaNdLrlWBERVvGaR4exLnT1XxP\/AIhfWRUeqXjHA8LnmtbMr5kEXk5wsqIrW3r2b1OlygDod48a2WxFPYwcX6ERFx28IbUgXMIOmJJJIgO90+lpnSdmchxW1dt7rOc3ipzWeYZ8QQOL7eo\/p+8FU\/Y9aWkopBpNWbVosphA0tMyaDh4RHim+aDylolofQyyYsjzReVSYV1D7jdAcCgKGBX+\/vMLzffmH09MMrEsBQsA3bZqhQ981KrtfHn\/AEk+yvSBMJSLmEZJtACf9oQVKZcVBFYZ1mFQxtAmDmlP8JxJtllRXfdfhiu3vzEMhfMIoi68xxNmy7O++KFba5u7u+1e8EwhnX0yuCKI5BwftBq\/pia6rVJyTZPnf3gA3v8AziFCF6j5gWmtSBfETY0h3rgjMPlil2oK7l9g3mvNt0SJlK5g2uQuIv2wpeY3QbEyg0KOB9ZwchQBQHc2QMnPc8wWkm9gtgEmgSaF+Z7eEyzS9cIFXaxLEfUCtAGzgG84r7mTp\/BpfSvlHy\/9S\/3ki+6XF0dQ0VJwOf5z5QCGFZqgGeNkoYRox1ToduzcPpG7cb+ruRXbiIo0Krc4BseeM8ij5V7mHsfrgwNRQuN268mxt29sVd3IXsxcyK0pMmDaNNmAZhuIU2LNHxF4J9oZDctOktQIkJMduPeYZ5RIeUhzBDUmkezFQaDu8wrQbvmQvHRQ00E7TRfHHvn7eEHvFGybsVjHnefSLTKWSC+e38r9\/tDb84uu1+Hp2geoQKQAyuCAbUms9qIBBHFGM\/DX094+bv2ZvZV8Yq8c1JWvo2vgvrSkJY33J4AAyfIcTfW6u4k\/7+584DRcggjkG4NjSGeo0mQ0wIPgRRk6\/qjqEM4AIQKCor9IoX4njMY+M9S7uH1XDuyqbBvFCga4IH9JyHeQnUm\/ZbUbSKZ2oA8Zr8Xn2ErfMmG6Z0F\/MVmG07QpCneeCSQfp8oWC9gWaDMvaavwr8+XfiY1D4RNjQTU09tZF+RBoUCDYPn+IBjITNNpNt3bW23zRr78Sb\/SuN8B3JB7pcKEOg48OfLmKhY\/q6cB8vMvSIyzCww4mAk0iwQMo+smmhJAAJJNADuewlsJom+BVeHryfPIH2h9D4UkOjQIhFfFUObus+l+EpCaGd5qrxBMITSW9tnBxecfz94z8S6VdNgFcOKBscWRZHtx7QelYJZcoiiliFsCyBZNAX3J7CW+mVcrYaiRamwaPKnuMYMI6IEUhiXN7hVAZ+mj3uCggZZMm6RdUqbU1zwexBBH2NQbDg+Pn\/KhRQIGHfPvUHqGVcwzQbBI01AmjYvBqr867TW\/jygbkXnmvM9vtEmVBx9dSgXYN2699myK\/TXFRZuLsc1zn7eExvkdhQq7zfFeVfmFGkV8yEV6NiryMgHkEHB8jFxNboghdyKciheeJhzMExDSHvjPxE67hyiJShaRdoNdz5xAC5CYbV10KoAgVlB3MCTvJNgkHihjEhJJJIptt1gHxjHPP+\/hCdP1zorojMocANTMAQDdFQab3gW9vvMajWbAAGMDjArvnNX7wcfB54DklSQgzvNANJJNtGGfRSzaySRIpmNSZSSSJjNLD63K\/wDgX\/2iSSP6L4F0e\/oZHkki+j+ATIZJJRDMtMDmSSAF6nMG8kkkZUoySRFFGYMkkAKlmSSAzJlNLkiAz4+kG0kkTGZaReD6fuJJIhg5JJIDP\/\/Z\" alt=\"Materia oscura - Wikipedia, la enciclopedia libre\" \/><\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0Hablan de <a href=\"#\" onclick=\"referencia('materia oscura',event); return false;\">materia oscura<\/a> caliente, <a href=\"#\" onclick=\"referencia('materia oscura',event); return false;\">materia oscura<\/a> fr\u00eda&#8230; \u00a1Palos de Ciego!<\/p>\n<p style=\"text-align: justify;\">El debate contin\u00faa, est\u00e1 muy vivo y, es el tema tan candente e importante que, durar\u00e1 bastante tiempo mientras alg\u00fan equipo de observadores no pueda, de una vez por todas, demostrar que, la \u201c<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('materia oscura',event); return false;\">materia oscura<\/a><\/a>\u201d existe, que nos digan donde est\u00e1, y, de qu\u00e9 est\u00e1 conformada y act\u00faa. Claro que, cuando se haga la suma de materia luminosa y oscura, la densidad de la masa total del universo no ser\u00e1 todav\u00eda mayor del 30% del valor cr\u00edtico. A todo esto, ocurren sucesos que no podemos explicar y, nos preguntamos si en ellos, est\u00e1 implicada la Materia oscura.<\/p>\n<p style=\"text-align: justify;\">La m\u00e1s abarrotada colisi\u00f3n de c\u00famulos gal\u00e1cticos ha sido identificada al combinar informaci\u00f3n de tres diferentes telescopios. El resultado brinda a los cient\u00edficos una posibilidad de aprender lo que ocurre algunos de los m\u00e1s grandes objetos en el universo chocan en una batalla campal c\u00f3smica.<\/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<img decoding=\"async\" loading=\"lazy\" id=\"BLOGGER_PHOTO_ID_5325416169820413058\" src=\"http:\/\/4.bp.blogspot.com\/_Vea_3vg0ArY\/SeetyotEXII\/AAAAAAAADK4\/7sFD_8zn93Y\/s400\/macs.jpg\" alt=\"MACSJ0717.5+3745\" width=\"350\" height=\"340\" border=\"0\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Usando del Observatorio de rayos-X Chandra, el Telescopio Espacial <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('hubble',event); return false;\">Hubble<\/a><\/a> y el Observatorio Keck de Hawai, los astr\u00f3nomos fueron capaces de determinar la geometr\u00eda tridimensional y el movimiento en el sistema MACSJ0717.5+3745 localizado a 5.4 mil millones de luz de la Tierra. Los investigadores encontraron que cuatro distintos c\u00famulos de galaxias est\u00e1n envueltos en una triple fusi\u00f3n, la primera vez que un fen\u00f3meno as\u00ed es documentado.<\/p>\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<img decoding=\"async\" loading=\"lazy\" id=\"BLOGGER_PHOTO_ID_5325416170753824402\" title=\"MACSJ0717.5+3745 etiquetado\" src=\"http:\/\/3.bp.blogspot.com\/_Vea_3vg0ArY\/SeetysLnFpI\/AAAAAAAADLA\/SFKJ1b1EkuQ\/s400\/macs_labeled.jpg\" alt=\"MACSJ0717.5+3745 etiquetado\" width=\"400\" height=\"388\" border=\"0\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">La composici\u00f3n de imagen (arriba de todo) muestra el c\u00famulo de galaxias masivo MACSJ0717.5+3745. El color del gas caliente est\u00e1 codificado con colores mostrar su temperatura. El gas m\u00e1s fr\u00edo es mostrado como un p\u00farpura rojizo, el gas m\u00e1s caliente en azul y las temperaturas intermedias en p\u00farpura. Las repetidas colisiones en el c\u00famulo son causadas por una corriente de galaxias, polvo y \u201c<a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('materia oscura',event); return false;\">materia oscura<\/a><\/a>\u201d -conocida filamento- de 13 millones de a\u00f1os luz.<\/p>\n<p style=\"text-align: justify;\">Se han obtenido Im\u00e1genes (MACSJ0717) que muestran c\u00f3mo c\u00famulos gal\u00e1cticos gigantes interact\u00faan con su entorno en escalas de millones de a\u00f1os luz. Es un sistema hermoso para estudiar c\u00f3mo los c\u00famulos crecen mientras el material cae en ellos a lo largo de filamentos. Simulaciones por ordenador muestran que los c\u00famulos de galaxias m\u00e1s masivos deben crecer en regiones donde filamentos de gran escala de gas intergal\u00e1ctico, galaxias, y materia desconocida son atrapados por la gravedad all\u00ed presente.<\/p>\n<p style=\"text-align: justify;\"><strong>\u00bfCu\u00e1l debe ser la Masa del Universo?<\/strong><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"La teor\u00eda inflacionaria de Alan H Guth\" \/><img decoding=\"async\" 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\" alt=\"ALAN GUTH COSM\u00d3LOGO CREADOR DE LA TEOR\u00cdA DEL UNIVERSO INFLACIONARIO\" \/><\/p>\n<h4 style=\"text-align: justify;\">\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 Alan Guth<\/h4>\n<p style=\"text-align: justify;\">Claro que la idea de masa perdida se introdujo porque la densidad observada de la materia del universo est\u00e1 cerca del valor cr\u00edtico. Sin embargo, hasta comienzos de los ochenta, no se tuvo una raz\u00f3n te\u00f3rica firme <strong><\/strong>para suponer que el universo ten\u00eda efectivamente la masa cr\u00edtica. En 1981, Alan Guth, public\u00f3 la primera versi\u00f3n de una teor\u00eda que entonces se ha conocido como \u201cuniverso inflacionista\u201d. Desde entonces, la teor\u00eda ha sufrido numerosas modificaciones t\u00e9cnicas, pero los puntos centrales no han cambiado.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"El f\u00edsico del MIT Alan Guth explica de primera mano las dudas sobre los  ecos del Big Bang - RTVE.es\" \/><img decoding=\"async\" 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\" alt=\"Alan Guth: \u201cUn mundo de infinitos universos es la mejor explicaci\u00f3n para la  realidad\u201d\" \/><\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0Aqu\u00ed Guth trata de explicar el universo inflacionista que postula<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Se podr\u00eda decir en relaci\u00f3n el aspecto principal del universo inflacionista es que estableci\u00f3 por primera vez una fuerte presunci\u00f3n de que la masa del universo ten\u00eda realmente el valor cr\u00edtico. Esta predicci\u00f3n viene de las teor\u00edas que describen la congelaci\u00f3n de la fuerza fuerte en el segundo 10<sup>-35<\/sup> del <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('big bang',event); return false;\">Big Bang<\/a><\/a>. los otros muchos procesos en marcha en ese tiempo estaba una r\u00e1pida expansi\u00f3n del universo, un proceso que vino a ser conocido como inflaci\u00f3n. Es la presencia de la inflaci\u00f3n la que nos lleva a la predicci\u00f3n de que el universo tiene que ser plano.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/i.pinimg.com\/736x\/8e\/97\/0a\/8e970a18f557974f7b5c5ca9aa6e5a5e.jpg\" alt=\"Abell 370 is a galaxy cluster about 4 billion light years from Earth |  Hubble photos, Hubble space telescope, Hubble\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Abell 370: La lente gravitacional distorsiona la Imagen y nos ense\u00f1a, a la derecha, algo que nos parece una inmensa cuerda c\u00f3smica , \u00bfQu\u00e9 podr\u00e1 ser en realidad? la materia a lo largo y ancho del universo se reparte de manera que, se ve concentrada en c\u00famulos de galaxias y superc\u00famulos que son las estructuras m\u00e1s grandes conocidas y, dentro de ellas, est\u00e1n todos los dem\u00e1s objetos que existen. Claro que, dejando a un lado esas fluctuaciones de vac\u00edo y, la posible materia desconocida.<\/p>\n<p style=\"text-align: justify;\">El proceso mediante el cual la fuerza fuerte se congela es un ejemplo de un cambio de fase, similar en muchos aspectos a la congelaci\u00f3n del agua. el agua se convierte en hielo, se expande; una botella de leche explotar\u00e1 si la dejamos en el exterior en una noche de invierno de g\u00e9lido fr\u00edo. No deber\u00eda ser demasiado sorprendente que el universo se expanda del mismo modo al cambiar de fase.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"La galaxia m\u00e1s lejana - Levante-EMV\" \/><img decoding=\"async\" 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\" alt=\"La reina de las cefeidas | Ciencia | EL PA\u00cdS\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">La distancia a una galaxia lejana se determina estudiando la luz proveniente de estrellas de tipo Cefeidas Variables. El espectro de la luz estelar revela la velocidad a la que se mueve la galaxia (Efecto Doppler) y la cantidad de expansi\u00f3n que ha sufrido el universo que la luz sali\u00f3 de su fuente.<\/p>\n<p style=\"text-align: justify;\">Lo que es sorprendente es la enorme amplitud de la expansi\u00f3n. El tama\u00f1o del Universo aument\u00f3 en un factor no menor de 10<sup>50<\/sup>. Este es tan inmenso que virtualmente no tiene significado para la mayor\u00eda de la gente, incluido yo mismo que, no pocas veces me cuesta asimilar esas distancias inconmensurables del Cosmos.<\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"Universo observable - Wikipedia, la enciclopedia libre\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Dicho de otra manera, pongamos, por ejemplo, que la altura de los lectores aumentara en un factor tan grande como ese, se extender\u00edan de un extremo al otro del Universo y, seguramente, faltar\u00eda sitio. Incluso un s\u00f3lo <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('proton',event); return false;\">prot\u00f3n<\/a><\/a> de un s\u00f3lo \u00e1tomo de su cuerpo, si sus dimensiones aumentaran en 10<sup>50<\/sup>, ser\u00eda mayor que el mismo universo. En 10<sup>-35<\/sup> segundos, el universo pas\u00f3 de algo con un radio de curvatura mucho menor que la part\u00edcula elemental m\u00e1s peque\u00f1a a algo como el tama\u00f1o de una naranja grande. No es extra\u00f1o que el inflaci\u00f3n est\u00e9 ligado a este proceso.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\" align=\"center\"><img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/astronomia.net\/cosmologia\/universo.JPG\" alt=\"\" name=\"Imagen6\" width=\"509\" height=\"408\" align=\"bottom\" border=\"0\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Comparaci\u00f3n entre un modelo de expansi\u00f3n desacelerada (arriba) y uno en expansi\u00f3n acelerada (abajo). La esfera de referencia es proporcional al factor de escala. El universo observable aumenta proporcionalmente al tiempo. En un universo acelerado el universo observable aumenta m\u00e1s r\u00e1pidamente que el factor de escala con lo que cada vez podemos ver mayor del universo. En cambio, en un universo en expansi\u00f3n acelerada (abajo), la escala aumenta de manera exponencial mientras el universo observable aumenta de la misma manera que en el caso anterior. La cantidad de objetos que podemos ver disminuye con el tiempo y el observador termina por quedar aislado del resto del universo.<\/p>\n<p style=\"text-align: justify;\">Cuando ( mucho tiempo ya) le\u00ed por primera vez acerca del universo inflacionario, experiment\u00e9 dificultades para poder asimilar el \u00edndice de inflaci\u00f3n. \u00bfNo violar\u00eda un crecimiento tan r\u00e1pido las reglas impuestas por la <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('relatividad',event); return false;\">relatividad<\/a><\/a> de Einstien que marcaban el l\u00edmite de la velocidad en el de la luz en el vac\u00edo? Si un cuerpo material viaj\u00f3 de un extremo de una naranja a otro en 10<sup>-35<\/sup> segundos, su velocidad excedi\u00f3 a la de la luz en una fracci\u00f3n considerable.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/c.tenor.com\/XOJyPTMOUT8AAAAd\/cosmos-universo.gif\" alt=\"Cosmos Universo GIF - Cosmos Universo Espa\u00e7o - Descubre &amp;amp; Comparte GIFs\" \/><\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0Claro que lo que se expande es el Espacio y en \u00e9l est\u00e1n las galaxias que se ven transportadas<\/p>\n<p style=\"text-align: justify;\">Claro que, con esto pasar como pas\u00f3 en su d\u00eda con los <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\">neutrinos<\/a>\u00a0del experimento \u00d3pera que, algunos dec\u00edan haber comprobado que corr\u00edan m\u00e1s r\u00e1pidos que la luz, y, sin embargo, todo fue un error de c\u00e1lculo en el que no se tuvieron en algunos par\u00e1metros presentes en las mediciones y los aparatos que hac\u00edan las mismas. Aqu\u00ed, podr\u00eda pasar algo parecido y, la respuesta la podemos encontrar en aquella analog\u00eda con la masa de pan.<\/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<img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"El universo es un globo que se hincha a toda velocidad\" \/><\/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 Aqu\u00ed suplimos la masa de pan por globos que se inflan<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Durante el per\u00edodo de inflaci\u00f3n es el espacio mismo -la masa de pan- lo que est\u00e1 expandi\u00e9ndose. Ning\u00fan cuerpo material (acordaos que en aquella masa estaban incrustadas las uvas que hac\u00edan de galaxias y, a medida que la masa se inflaba, las uvas -galaxias- se alejaban las unas de las otras pero, en realidad, ninguna de estas uvas se mueven, es la masa lo que lo hace.<\/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<img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/mentescuriosas.es\/wp-content\/uploads\/2010\/01\/estrellas-doppler.jpg\" alt=\"\" width=\"320\" height=\"262\" \/><\/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 \u00a0 \u00a0El Universo se expande<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Las reglas contra los viajes a mayor velocidad que la de la luz s\u00f3lo se aplican al movimiento del espacio. As\u00ed no hay contradicci\u00f3n, aunque a primera vista pueda parecer que s\u00ed. Las consecuencias del per\u00edodo de r\u00e1pida expansi\u00f3n se pueden describir mejor con referencia a la visi\u00f3n einsteniana de la gravitaci\u00f3n. de que el universo tuviera 10<sup>-35<\/sup> segundos de edad, es de suponer que hab\u00eda alg\u00fan tipo de distribuci\u00f3n de la materia. A cauda de esa materia, el espacio-tiempo tendr\u00e1 alguna forma caracter\u00edstica. Supongamos que la superficie estaba arrugada antes de que se produjera la inflaci\u00f3n. Y, de esa manera, cuando comenz\u00f3 a estirarse, poco a poco, tom\u00f3 la forma que podemos detectar de \u201ccasi\u201d plana conforme a la materia que contiene.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" id=\"imagenprincipal\" title=\"La Galaxia NGC 4388 y su Inmensa Nube de Gas\" src=\"http:\/\/antwrp.gsfc.nasa.gov\/apod\/image\/0206\/ngc4388_subaru.jpg\" alt=\"La Galaxia NGC 4388 y su Inmensa Nube de Gas\" width=\"625\" height=\"455\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">En todo esto, hay un enigma que persiste, nadie sabe contestar c\u00f3mo, a pesar de la expansi\u00f3n de <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('hubble',event); return false;\">Hubble<\/a><\/a>, se pudieron formar las galaxias. La pregunta ser\u00eda: \u00bfQu\u00e9 clase de materia estaba all\u00ed presente, que, la materia bari\u00f3nica no se expandiera sin rumbo fijo por todo el universo y, se quedara el tiempo suficiente para formar las galaxias? Todo ello, a pesar de la inflaci\u00f3n de la que hablamos y que habr\u00e1 impedido su formaci\u00f3n. As\u00ed que, algo ten\u00eda que existir all\u00ed que generaba la gravedad necesaria para retener la materia bari\u00f3nica hasta que esta, pudo formar estrellas y galaxias.<\/p>\n<p style=\"text-align: justify;\">No me extra\u00f1ar\u00eda que, eso que llaman <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('materia oscura',event); return false;\">materia oscura<\/a><\/a>, pudiera ser como la primera fase de la materia \u201cnormal\u201d que, estando en una primera fase, no emite radiaciones ni se deja ver y, sin embargo, s\u00ed que genera la fuerza de Gravedad para que nuestro Universo, sea tal como lo podemos observar.<\/p>\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<img decoding=\"async\" loading=\"lazy\" id=\"il_fi\" src=\"http:\/\/espacioteca.files.wordpress.com\/2008\/07\/materia.jpg\" alt=\"\" width=\"400\" height=\"400\" \/><\/p>\n<p style=\"text-align: justify;\">\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0En im\u00e1genes como\u00a0 estas, los \u201cexpertos\u201d nos dicen cosas como:<\/p>\n<blockquote>\n<p style=\"text-align: justify;\">\u201cLa <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('materia oscura',event); return false;\">materia oscura<\/a><\/a> en la imagen de varias longitudes de onda de arriba se muestra en un falso color azul, y nos ense\u00f1a detalles de como el c\u00famulo distorsiona la luz emitida por galaxias m\u00e1s distantes. En de gas muy caliente, la materia normal en falso color rojo, son fruto de los rayos-X detectados por el Observatorio de Rayois X Chandra que orbita alrededor de la Tierra.\u201d<\/p>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" src=\"http:\/\/www.nasa.gov\/sites\/default\/files\/images\/627372main_hubble_full_full.jpg\" alt=\"Merging Galaxy Cluster Abell 520 | NASA\" \/><\/p>\n<p>&nbsp;<\/p><\/blockquote>\n<p style=\"text-align: justify;\">Algunas galaxias individuales dominadas por materia normal aparecen en colores amarillentos o blanquecinos. La sabidur\u00eda convencional sostiene que la <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('materia oscura',event); return false;\">materia oscura<\/a><\/a> y la materia normal son atra\u00eddas lo mismo gravitacionalmente, con lo que deber\u00edan distribuirse homog\u00e9neamente en Abell 520. Si se inspecciona la imagen superior, sin embargo, se ve un sorprendente vac\u00edo de concentraci\u00f3n de galaxias visibles a lo largo de la <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('materia oscura',event); return false;\">materia oscura<\/a><\/a>. Una respuesta hipot\u00e9tica es que la discrepancia causada por las grandes galaxias experimentan alg\u00fan de \u201ctirachinas\u201d gravitacional.<\/p>\n<p style=\"text-align: justify;\">Una hip\u00f3tesis m\u00e1s arriesgada sostiene que la <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('materia oscura',event); return false;\">materia oscura<\/a><\/a> est\u00e1 chocando consigo misma de alguna forma no gravitacional que nunca se hab\u00eda visto antes..? (esto est\u00e1 sacado de Observatorio y, en el texto que se ha podido traducir podemos ver que, los astr\u00f3nomos autores de dichas observaciones, tienen, al , unas grandes lagunas y, tratando de taparlas hacen aseveraciones que nada tienen que ver con la realidad).<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/farm6.static.flickr.com\/5146\/5653032414_c8e6085f98.jpg\" alt=\"http:\/\/farm6.static.flickr.com\/5146\/5653032414_c8e6085f98.jpg\" width=\"500\" height=\"375\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Lo cierto es que, en el Universo, son muchas las cosas que se expanden y, pienso yo\u2026\u00bfPor qu\u00e9 no tratamos todos de expandir nuestras mentes? De esa manera, posiblemente podr\u00edamos llegar a comprender esos fen\u00f3menos que nos atormentan y a los que no podemos encontrar una explicaci\u00f3n\u00a0 que podamos constatar.<\/p>\n<p style=\"text-align: justify;\">\u00bfMateria Oscura?\u00a0 S\u00ed, Unicornios y G\u00e1rgolas, tambi\u00e9n.<\/p>\n<p style=\"text-align: justify;\"><em>emilio silvera<\/em><\/p>\n<\/div>\n<div class='bookmark'>\r\n\t\t<table align='left' border='0' cellpadding='0' width='100%'>\r\n\t\t<tr><td><span class='pushbutton'><a href='http:\/\/delicious.com\/post?url=http%3A%2F%2Fwww.emiliosilveravazquez.com%2Fblog%2F2022%2F01%2F16%2F%25c2%25bfcuanta-materia-vemos-6%2F&amp;title=%C2%BFCu%C3%A1nta+materia+vemos%3F' title='Delicious' target='_blank' rel='nofollow'><img src='http:\/\/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=http%3A%2F%2Fwww.emiliosilveravazquez.com%2Fblog%2F2022%2F01%2F16%2F%25c2%25bfcuanta-materia-vemos-6%2F&amp;title=%C2%BFCu%C3%A1nta+materia+vemos%3F' title='Digg' target='_blank' rel='nofollow'><img src='http:\/\/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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Esta es la densidad de la materia que se necesita para producir un universo plano. Si Densidad efectivamente observada es menor o mayor [&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":[30],"tags":[],"_links":{"self":[{"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts\/12370"}],"collection":[{"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/users\/2"}],"replies":[{"embeddable":true,"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/comments?post=12370"}],"version-history":[{"count":0,"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts\/12370\/revisions"}],"wp:attachment":[{"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/media?parent=12370"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/categories?post=12370"},{"taxonomy":"post_tag","embeddable":true,"href":"http:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/tags?post=12370"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}