{"id":12086,"date":"2021-02-25T06:50:47","date_gmt":"2021-02-25T05:50:47","guid":{"rendered":"http:\/\/www.emiliosilveravazquez.com\/blog\/?p=12086"},"modified":"2021-02-25T06:57:22","modified_gmt":"2021-02-25T05:57:22","slug":"%c2%bfcuanta-materia-vemos-5","status":"publish","type":"post","link":"https:\/\/www.emiliosilveravazquez.com\/blog\/2021\/02\/25\/%c2%bfcuanta-materia-vemos-5\/","title":{"rendered":"\u00bfCu\u00e1nta materia vemos?"},"content":{"rendered":"<div>\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>&nbsp;<\/p>\n<p>La constante de <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\"><a href=\"#\" onclick=\"referencia('hubble',event); return false;\">Hubble<\/a><\/a> en funci\u00f3n de la Densidad Cr\u00edtica<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: 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alt=\"Resultado de imagen de densidad cr\u00edtica Omega, la cantidad de materia del Universo\" width=\"237\" height=\"118\" data-atf=\"1\" \/><img decoding=\"async\" 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\" alt=\"Densidad Cr\u00edtica : Blog de Emilio Silvera V.\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcTQRKXiIs-ED5NnQjBA5HpOaF0BkzXHaYMtWA&amp;usqp=CAU\" alt=\"Ser\u00e1 la vida, un principio esencial para la coherencia del Universo? : Blog  de Emilio Silvera V.\" \/><img decoding=\"async\" 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\" alt=\"Densidad Cr\u00edtica : Blog de Emilio Silvera V.\" \/><\/a><\/div>\n<div data-attrid=\"image\" data-docid=\"HPC5YzDRsEskCM\" data-lpage=\"http:\/\/hyperphysics.phy-astr.gsu.edu\/hbasees\/Astro\/denpar.html\" data-ved=\"2ahUKEwjA9vDTp4TvAhWJEBQKHb3VCgMQzkx6BAgKEAA\">\n<div>\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0 El Universo ser\u00e1 plano, abierto o cerrado en funci\u00f3n de la materia que contenga<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<\/div>\n<div lang=\"es-ES\" data-md=\"61\">\n<blockquote>\n<div style=\"text-align: justify;\" data-attrid=\"wa:\/description\" data-hveid=\"CAgQAA\">\u03a9<sub>0<\/sub>\u00a0= 1,02 +\/- 0,02 indicando que el\u00a0<strong>universo<\/strong>\u00a0est\u00e1 muy pr\u00f3ximo a la\u00a0<strong><a href=\"#\" onclick=\"referencia('densidad critica',event); return false;\">densidad cr\u00edtica<\/a><\/strong>\u00a0o \u03a9 =1. La\u00a0<strong><a href=\"#\" onclick=\"referencia('densidad critica',event); return false;\">densidad cr\u00edtica<\/a><\/strong>\u00a0calculada es \u03c1<sub>c<\/sub><sub>,<\/sub><sub>0<\/sub>\u00a0= 9,47 x 10<sup>&#8211;<\/sup><sup>27<\/sup>\u00a0kg\/m<sup>3<\/sup>\u00a0De esta\u00a0<strong><a href=\"#\" onclick=\"referencia('densidad critica',event); return false;\">densidad cr\u00edtica<\/a><\/strong>, se cree que la\u00a0<strong>materia<\/strong>\u00a0ordinaria (<strong>materia<\/strong>\u00a0bari\u00f3nica) constituye solo alrededor del 4%.<\/div>\n<\/blockquote>\n<\/div>\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 Omega\u00a0 (\u03a9). Esta es la densidad de la materia que se necesita para producir un universo plano. Si la Densidad efectivamente observada es menor o mayor que ese par\u00e1metro, en el primer caso el Universo es abierto, en el segundo es cerrado. 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 entre las galaxias.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"La v\u00eda l\u00e1ctea: Grupos y c\u00famulos de galaxias\" \/><img decoding=\"async\" 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\" alt=\"Evoluci\u00f3n de Galaxias en C\u00famulos | Instituto de Astrof\u00edsica de Canarias \u2022  IAC\" \/><img decoding=\"async\" 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\" alt=\"Hubble capta una colecci\u00f3n de galaxias y c\u00famulos de estrellas que arrojan  luz sobre la materia oscura\" \/><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"La formaci\u00f3n de nuestro universo: \u00bfherencia o entorno? | Sociedad | EL PA\u00cdS\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Cuando contemplamos im\u00e1genes como la de arriba, nos resulta enga\u00f1oso y no imaginamos las inmensas distancias que las separan. Las galaxias est\u00e1n muy retiradas las unas de las otras. Andr\u00f3medra y la V\u00eda L\u00e1ctea est\u00e1n a 2,3 a\u00f1os-luz perteneciendo al mismo Grupo Local.<\/p>\n<p>Algunos n\u00fameros que definen nuestro Universo:<\/p>\n<p>&nbsp;<\/p>\n<ul>\n<li>El 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 Materia Oscura 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><img decoding=\"async\" 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\" alt=\"De que est\u00e1 compuesta la materia oscura? - George de la f\u00edsica\" \/><img decoding=\"async\" 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\" alt=\"Materia oscura - Wikipedia, la enciclopedia libre\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcT_npbUZeVFEcFWZaB6JlCxBLklgFY8x04ICw&amp;usqp=CAU\" alt=\"Materia oscura del universo \u2014 Astronoo\" \/><img decoding=\"async\" src=\"https:\/\/www.researchgate.net\/profile\/Antonio_Perez-Garrido\/publication\/260144204\/figure\/fig1\/AS:392534359592968@1470598892327\/Figura-1-Distribucion-de-masa-energia-en-el-Universo-Solo-el-4-es-materia-barionica.png\" alt=\"Distribuci\u00f3n de masa-energ\u00eda en el Universo. S\u00f3lo el 4 % es materia... |  Download Scientific Diagram\" \/><\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">En las \u00faltimas medidas realizadas, la\u00a0 <strong>Densidad cr\u00edtica<\/strong> que es la densidad necesaria para 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=\"data:image\/jpeg;base64,\/9j\/4AAQSkZJRgABAQAAAQABAAD\/2wCEAAkGBxITEhUTExIWFhUXGRcXFxcWGBkaGhgbGx4ZFxgZGhgYHiggGholGx4XITEhJSkrLi4uGh8zODMsNygtLisBCgoKDg0OGxAQGy0mICUrLS0tLS4tLS8tLSstLS0tLS8vLS0tLS0tLy0tLS0tLS8tLS8tLS0tLS0tLS0tLS0tLf\/AABEIALUBFwMBIgACEQEDEQH\/xAAcAAABBQEBAQAAAAAAAAAAAAAAAQMEBQYCBwj\/xAA8EAACAQMCBQIEAwYFBQADAAABAhEAAyESMQQFIkFRE2EGMnGBQpGhBxQjUrHwM2LB0eEVQ4KS8XKy0v\/EABoBAAMBAQEBAAAAAAAAAAAAAAABAgMEBQb\/xAA1EQACAgAFAQUHAgUFAAAAAAAAAQIRAwQSITFBE1FhodEUIjJxgpGyM7EFBiPB8FJigcLx\/9oADAMBAAIRAxEAPwDw2iilFNKwAUClmhRnAn2qvkAGnPTJn2zXH6U9asO5MSWGSDvH3+351omuojlLR3j3+vbFclJPYT+VTeHiVJuRkHIIXvPYSQJH3xS3QrIMwcgKSSfYRHTtt7jO9PZoVkM242gjsTie3ekdBiDP0Bx9ZqSiQp6RMYyD5ExMzkHHinOH4Y\/hBBc6R3gd8+4jMdxU+AWQUHsYG8U2asLFkEKuqNR7gx9\/z7T2pu4o0yzAkzpOR4mfYHtA70S3QWRBSkU7cXE7knMbAbeMZpsYMY377fp\/pRewziiKUrFJWdDCkpaSkwCiiikAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAC0oBO2aUA+PpQikmBV0B3btFtsnx3P08\/au+FtHUvSTmYA3\/PsakWGS1eUnKjSTiYODEHBg79jmpJZ1YNauBVndTH3gYEj371pyrIbGL+lmlFIEScSMYiO+2596bSyXIyAWaMzqHaI3I2\/pUlLBGol387DJOxAk9iJ8QRVzym3YuFrd4ssdSXGDMNQiekDBBP0AnaMnJMpUrKz9xZNLFVa2GALmSpIPmBpXSZ7wI707b5bcYg6YLMArE9LAQDEiCB15n8oq1bhLoclBAkqNZyVmAIVurAPmQBirLm3EPbC2uGTPpkYHYkEsTliSTqzAncYqqRm8R2kihu8C4cDQW1IWUNAEDtjELEw0fTaWrXBBYDFTqg6y2FMYtt2nVAxjJParXgh6pIa1LEEawYkDfTH4sFZidvvxc4ROs8PquWwSgchmKkrOl00wdOwIBmREGlXVCUt6ZWcbbvKzatEYHpk\/NqEdPb+YiNo9hUThLNslhI0YkwurAJIUEgkGBn22ravwbhNd30ysa4ZJOg4NwqpOktqnEE\/y5NZi1wya9SjJDMFBKhFMBVJO243PfMTTkqY8PEUkVR4YNcZYhRIEP0gnKyxBx7eag2ngMNIO2SNoP8ArtV+GtNb0aSCZXV8ywCEUnPR9h3FQ25efT9S2uBMyJmCBkE+87dsVm13Gyl3ldcOrUfA32O\/jzTaW\/8Aj3qzZBZGwLRq6sFcERAMESQdpx4zXPGW1JBMrjUdRmSSASdIgLvsO1NRHZV0V2VzH69j4OaRljxU0M5pKWkqZDCilpKkAooooAKKKKACiiligBKKWiKKASilooASiloinQCUUtJSA6mpq2mAJIAWF3AnsQRqExkTHmosnIU4OT9tpp7hbpSGMxkACP8AWcT\/AFrVPfcTHeMsgTOeykAhSN5E57g\/SKXg9IIXUIJWZjJ7ESDt4xTd0gCNA0zhu8Ef2atOUcuFzW+knQA+pBK7GEC+TDf+vijl7EtpK2TeD4O4hZ21pCMRCv0nMTuBgGQT3B3NTOTK\/psI1nWGNwnWksQBGNAYwBOSSG2Ak8csuXGULetsLhQlZUg3FXUCpxOZOTAGkbgCLXllpNH8MrquHSmsgaREFQyloJEnC\/y1d0cuJKk7G7Vpy6Kitbh1camCKxAVWIhYKYy\/cCNzh21yK6Lmeu3rRhoB1AZ1MQGIjBgg\/iwBNWN7hCFIEsqqDOp1ENpUoLYgjaMmcCN8UXE8e9pQ6BC4gwAA3UenuWOxmc1Os54zc17hzxPJX\/eFybZwwW0xxuC3UJE9QwIO\/epHO+INskrqTVAbqNsSQi5Cg6104B1d48ik4e+W0vdOkEI5OBgEdJP4ZkGMds9qe4fUpa67s+mRowwJUgqJbVC4EwJOTFZ66L1u05dDm1xTW2XTJvXEVQLggBRuTIMZ0\/SFEYNVq8othtTlrTFtYEiGAiWQAlSAdUKfAEjatW\/GLdtrCrKsoJjAYKNRBtapjH\/rtWfe8oS4wYem3UgfTBMsFbSZIAgHH4ZkE4FKd8k4WI3e1Mp+N5YbRY27jBTMNBGs4OQRGrIwsgxiow4i6g\/iOM6QQwkqSCwBQ5A0k5EZj3rQ8DzS4q2fUdCJLKWQjWCCCAwXVG+8zCmMyYHFOC6g2dYGgjJHgDUWXURlsFpJByBg1sdUZt7SX+eRC4iyjKrkamOshIkumojVvIMz9PeKq7ttQjAgBlaAVEhhtAPjcyfarvm9iblrRp0vbVurVOQ2pQCYI1aiAB\/WDRHh7mx1AE4XMsZIMYjEEH6bUS2NYO1Yxcvk4aSu2QNWIETHaBimHXuNu1WYtM3WEOlfmDHcjvJOT2n22qHxc9MyMRBEQBsPfEZorbctM44RQXAO01sub\/CS8L6Yv6Q1xQ4VCGKof5xGGOCAD5rH8B\/iL9a2d7QohhdW6rFm1wARANvpOVMZJkyCPrXXh4k4YMXDrKV7LujQ0k2RLPL+HRWF2wSzAaDr0gTmds47VFHKkIYqpKrEmMCTAnGJ96tuL4NrYtPrQm4rNCMJUGQQ640kyTUKxqJ0r+PtJAPjE9t87U1msTm\/JehehET\/AKYmnVpETHb+m\/n8qDy23JGnb8\/vU+9bWFgEHIJLgglZ1aSIBXaN58ma6tW0KsC4BUysyNQJCmAFMMMNkiADuafteJ3+S9AcIlavLbZwFz4x996UcsSR0gDaTsD7mrS69wIbYebZaDpMq2iSpkCCBqJH1O1JZYrdBQINBLDXBWU6iCSIeSIAODMd6XtWK+vkvQNESDb4Dh4jTkwQx6QDBlSBOJgyPERmR0OUWCWjUBplNSdT+flwq\/MdUnAGMmHbttmDXIhSxBaIXUeoqO0wZ0jYEU9x\/FNdfUwgwsCXIAAGBrJIU5MTuT2oWZxb58l6D0RIF\/ltvpItaQVEZnVB0lp9zP0pP+m2yZ0QD5OPG595qXaUEHYEiTPtBhYGCc9wPNPPbAYS2pRBbT4JzEjf6jftQs1id\/kvQlxihrjuWcGzqLIZFjqLnX1AZI0jYntUYcrslZEBhHSckgjJECOkifo3tm34D0\/VM4VdZXVB1EjpDLkScDGxz2MrzSzaDA2WZ0gA6gAQ5GRA7DEH6bVPtWKtr8l6BpiUlvllsmNBJ7ADf2\/sUv8A0u0DDLEGDj3g79wKshZYaWVWU56tjjBjaO35ntWk4rjOFHCmylhfXwBdEkGCNw+xY5nYSRim83i9\/kvQNMTy\/mlkKQAIxRT\/AMQKRcg7iQdtxg7YorLO12t+EfxRKIXB3VVpYSP7zjvSuFxBkk+8D2zv+VRq7t3SpkEgwRjwd65LAuOHD3Qya0TQhPyxq2\/hiBJJE9uxzUrhFti2suAq3SdLBgokLOokAs+Ihe0zGxq+C4tdBRoklTrYaoVZOkdwCd4ImAKmX7k\/w9QLDSoB+XTMQCTg7ZHlvFXZDRozxSOxlirswIkTAKgY0iMGFiNzGasuF5eotm46hWDMWg5krLQzTAInwQJ3JNZK2ts9VtyrdPqGSF0zqOliuDhTkYO29aVOdKsDcuQQy6nKz0yEIzmdMScHOc5zkzhxoySqNkvhuM1ArbJjTLC6GIYOVgNggHT9I8YqNa5kygANaRJg2lCwMliG1Ayxyv2nc5l3uVXEAuFr1wEL1WyzBoG7KMqSDkZ2GDVinJirqbqWrpJUCTpuEEknVsJAXwIKn3I53iRXJyvEw478kPmOq6w1IjW2KokmACAGJAnUSVnpncCuOHuOzaVjA1hWtsfxFTkqQXAEgTP5VqW4DhrINxreRDEfPpYZ6cb9RzHmurvKLL3C5YmZhSIgxBwYYiCBAMbiub2mPXg41m8NLh18v\/TL8RynShFr1LUAsRhgJOpwP83cagDtB3mt4DhjaLBXb00kdQxJglSSZWSQI2OojNWN63xJd2fWmj1MEhdTfIiCB1AIZ+9SLXAqdVso6XB1dZxdkaQASfIJk\/rE10xxKXJ2LEcYvU78yi43hzfgoo1hmS2uoISASp0CBqEfygwDtiqu1w9u0yFtanQwZrbKMzkzJ8lTMwGG81I5pwwS4LiyxkXgrsNA\/DGrWdY8EGIYzNJxHNPWAe3Z6wupQsQjA7AfygAH74jv0RkdkG6VcfsSeJuKLaJabQSshTLSEDIQpYAGMmAYyTnYUnO+GX+GFdimmZ0wuo\/NlurVjuJ8UvN+a3CuhgnyrqleqWkNlTMgn2zOKi8VzABCrOS7IFYJGk7spYjdgCo7nfOTW2q1ub4cGkmPcLzCFa3oUEFvl1QS0KMz3E\/qaqOP4gNA6iw3YmZ+njx9AKitcJETjeuKhzbVG6ik7JPAH+Iv1rYcRxlxkQXAG0E6WIzmCQXU9UQIBmP0rHcB86\/Wtituz6Vwsz+r0aIXpj8WokyMQBEzXYq7CF\/6pftAqPLI7q27Y1ZyI1Sfw4ipjcruJat8Q6qbTkgDWAzRvjJGfaonEFsKcaMBRsPOZIyc4p7hLqSQzN6ZiV85UxIxONWcYrJ2abj3BcuZyupfwm6TObif5cYJhoJOdhmATmHGJcZNFoWtC6QNRYYYsCxefMeMDGTXPHmy1xv3ZWCT0a\/nGxElTBYf796aNrQw9RCIyRJBYeAT8uO8Gjndi6nfLuXXb5KW1LaQztEfKI1GCcgCpvEcvsjhbd5byeqdStZE6iAfmOTMz7CF8iq2zxDW\/kYrODnBEgxI7SM\/Su73A3bWhnQqtxdSE7MpxI9j9qb55HZL4UX9KjVeiNCKgwdWrtsZlh56t8QWeX8H6j6WaCxjUROfJJP17f7jVH4iQ8L+6FRKBv4loyWwenWNlJIE++xrI2bRnH6CahNtMUtjU87+Br\/CoL2pXTcMIP5g4rPjhlX52xAYBQGlgYCtkacT7\/ni94bjeINvQbhK56TkeKZbgyMEd5IM5OR9MTvWcZOqkyGyscO9okEQh2OkMFaMzjVLCO5Edga4voga3pbBRSSYABO8aZ27znfGwq75rcsuCyIbdx26kRYtgCNOnJJkyTPeIqBwFmwHI4gNpEj+GV1Se5JlSBnaJx5qlLvKGOX8QLd8FWKpqGSATGxEZkwSBjvMDYTeZ\/ErG6bltUOq21ozaEaMgR216ckiMzVZxlpTcbSwCnMsNJUGQFaBpHbbB7GoTwYYggagIJ6QDmNWSDuTj3q6sIlD8RqA6gTOkapg53wV7bUU1zr5l+lFPOfq\/TH8UQitooorlGFdi6YicSDH0mP6muKKALjheKB+VihGmV21ZBYLHeQI+sdq0fIuYFX9V0thdLWlZV2jLE7sdI0DIzqjFYWrTgOf37IAtsFjvAkgsGIJ7gkD67UpK0Y4uFqVHr1goERtTq4B6Sxgsca3UEgqpMz3iRmol3iLukGwxur3VNQnJUKBgqu51tMlt4EVRfDfFpfuoEeSoZjcdVE4P+MAciNQEAnKxWx5RwoDovD3Tavag6uB\/DuW2XpXVJLIWlogaoGxgDhxPcuzzYZX3qkV\/B8zvy1y4FBDm2ygMhBGkDbJEz1QN99qh8Hziy\/qAtcW0vTqcEhW6WOnUCQcgZYwFE7AVaDinLXLt23ZDlHc3vSV5KhwjK1wMZ6VbSewbPTh74e5sl12tHQty5bd2F1FZbZaWZTcQ9IMM4U4zAInEN0nLT9jpWRjVpHXC8UHWWl1tpqXUkHA1SpYltWn6j+tU1wrw9xrrh7mlmNosWIxAe5c6ehtUQO\/XU3iOJJth14uwANRYBwhGn+GSfUkEM50kjBaD3aoPxVee1xD+oF\/dmRBcOoEK2mcJnq1MDoI6u+IqsPaVd9+VHF7K4SaXD6EPn12w7geojK6wyqwI16iGTA06+qfmBidqyfFcRas6jacozAqyFeqF0xBzpY5MkVV8z45NrLXNJIZ9YUDWCTKKvyiqy7cLEsxJJMknJJO5Nd0IaVR6ODl9CSt0SOI5jdcQzkiSfqTkk+TUSiiqOpKgru1bLEBQSTgAb1f\/DfwbxXFwyJotd7ryF99Pdz9P0re8L8N2OEQhBqeIa43zH6fyj2H613ZTIyx5K9kTKaR53Z5WbRU3JmRKjsPr5q1SDMnH1iQPw7EZxB2BGa65yOsTO423+1O8XwLW20HLBSXVRJQidSuOzCM+K9n+MZXCy+Hgww9tpP5\/DuLAnd2MlOmQkCQJmcxJEeDvkdt964DZ8+\/9DTy2enV0jIWNQnbUDpmY7E7DbegWW+fSWAIDEqSAXBiSRExMT3GJivETOmyTyjmJs3FeNRUgwwn5Z6fpv8AkKm\/FPPzxt31GRUO0KCAB5IEyaqwBoB0GDIDEYkEE6cRIEAzMTS2OGLCZUAKTuJMGCAP5szBjANS0rtksOMYsAYIXOnAA3Gr5QATtMDtU\/lvE2Aji+pulrbJZ\/iEG0VOCw2AM4USMGob8PqchSqg6iJJVYAJEa87YAOZgVwipmNW+JidhIMe+3\/NDSoOhL4G\/cRToOnUHRmAyysF1IT\/ACwPA3P2uOV8t1mYDYyQds77wTVXy3hy7quqFnSC06Vmd+3cn7\/Wt18N8N1ZM9iQcGMD7YBzWONPSiC35R8PSs6TsP8A7T3EfD6syhsS0GNIxj8j9orb8rtqEEVR\/El5Bq31RgiIHma8\/tJN\/M0SXBgvi7kVux8twF8yB+Hxn3\/Ssva4K4\/RbYk3GCm2pEkiSJA3XOCe+qtDzOzca5pIksAREHcTuJztipvJuT3TpKqQVOoRuD2g7x3jyc11rE0xJMVxXKL1q41q4oUqup0d9IIAmMkSY2gzMRVZxXBsul3tlbTzoaIBUY6Sd4gTv+ea1nxhwN0XdVxmdyRk4M484+\/9Ky3NONuXCq3GnQNIGNIjEKBgdpjcjvvXRhy1JMI8mX58hDgEEEDY4I+opaTnzEuCSSYySZJ+pNFaZx\/1fpj+KIRV0UUVyDCiiigAooooAd4biHtsGRirDIIrYch+ObwvA3rhVOnV6SrbZyo0jU6jVkYOdpiDBGKpaUoxkqaBc2epXPjM3GVLiKwkguGuMSBp2uEwZMiNgMTmakWef2mAEqgRkuO2liAV0rKspJjuC2rtMQK8qtu67T9O35VO4fl3F3wfSs3rqlv+1bZ1LDf5RvFY+zQXGx2LM+7TW5efEvN7HrOdFm6ZPpNaBRbak61BKadTAlhEfcxWa5nzG5ffXdbU0KvgAKoRYA9gKuuC+AeaXfk4C\/8A+aFP1eK0nK\/2J81uwbi2rAnPqXAxjyBaDD7SPtW6ikqON7uzzaivf+TfsD4dYPFcVcuf5bSi2PoS2on9K9C+H\/gfl\/BweH4W2rD8bDW\/\/u8kfamB84\/C\/wCzHmXGwVsG1bP\/AHL0oseQCNTfYR716z8Ofsf4LhAHvn96uj+cRaX6W86v\/InbYV6vUDmFXh\/ETIyvMFAEAQBgAYA9gKxvOdjWz5l3rGc52NfS5DlGMjznnQlwPcb081tRbYwfmAVta4gDWDbGTMrBkDpO+QGed\/OPrSsnTq2BxuMkAFjEyB9u\/wBY2\/mLjB+Uv+pWX6nfCXRIBTVtA7tmSggZknffFLErgsf5xpkKJ0qdRM7mNh2pzgHFq6k2tZUgG2xMM04kCD3Aid++YqKD4gedxPt+dfN0dJe855SOHFlkvi7bcF0P8rCNdtrZmHBwR3FcteuXxbshbYjuNKzqgwzYGkHABwMgVWcOcgsCROeqJ+jRj9at+E5eYDSOqR7iI3EyM4yKzey35IfJG0sVCn8O052JIAB+USWJAwZzSrwpd8LuTpUDySQoAMjftNajguTal7z7d\/b+v5VIu8nNv8OcQcz328T7icVn2qQqZI5JwTXrNrh1tIrai2uc3AJ06lO6iWAY4wfepSo3Du1s4AaSq4E5jHmJ\/XeqXhOKazcDBiO5K7+4BPePtRx\/OQyr83qAnUScGYiB2I\/X86xcZN+Brqjp8Tc\/9da2CIInIB3jtmP171nucc3DqQdxmc52EHP3qgu84ZwdRXtknIjt5jO3sNqsuScnv8UH9NlVFlWaR1CQTv8AMMA5xjtU9mo7snVZ3wxRES8t4+qCdKCZU\/hYdiCew7mtx8Nc4VtWsQ7HIA7\/AEG1eM3+JNpntapyBIOJB9sHNT+TfFNzhrkoATtBkiZ7CfPaqxMByWwJmj\/afc64KwTsN\/0HtXmBB1CAJJiMZJwMffvWt57zHiL95LyNrfSLkqJ0mT0n3Ebe9Z7lfKbnE31sopLmZEiYEs2+xjzW+BHRCmO+pmPiRCLiypB0yZjfvEADTMxH5mko+Ili4FIAgRjAx3pK2zf6n0x\/FGaKmiiiuUYUUUUAFFFOIygGRJIj6HGffE0AJ6Z06oxMT77xXVg5EbyIPil4awztCgn\/AEG0nwPet38OfDWq0zrdtgKWVrgKBtLdONUiCcSdtsSaUpqKtkSmo8lLZ5UoW4wNwKjKjKyai7lGbp2A6hHkBhvVvya5YZh6ii2WlQEdyQeoMSoIIaRuIgEZxBb5fxSjiHS6HUExehmYkqCNauCGViSZAkGY2NXJ4bhLQt8Sj3OIbTcC600LZbqAuMq5YerIhYEDPvnOT43\/AODWOOkqKHmvE8w4II9vj+ICvDKFu3AQCAw9RC2GggxBGd5kVJ5b+2Dm9rfiFuj+W7bQ\/qoVv1rrmvOGdQ\/po+uybYQIEIIK9QAEOGfr05aNzuKy\/G8r9IRclWnEwIUrrErvLSIB7dhitIt173Jkp2z1rk37fhgcVwf1aw\/9Ef8A\/qvRPh\/9pPLOLIW3xKq5\/Bd\/htPgasMfoTXyUy0lMs+4gagcwr5S+GPj3mHAwLHEN6Y\/7Vzrt\/TSfl\/8Yr1v4c\/bPw3EQnFp+73DjWJa0T9fmT7yPetMP4hPg1XMu9YznOxrYcZdV1DKwZSJVlIII8gjBFY\/nWxr6XIcowkec87HWPrT3L2ti7bZ11IHUssTKdxpBBb8xTPOvnH1rlg6nIIPvgj\/AG\/5rf8AmJXHBXhL+xWX6jl0gkwIWTGIMdp+360\/w3Bs5M9ICzME4AkDpBicD75qOyxpMQDA7TgCfcAzg\/1qy5fzZ7QdbZ0K6lHA7rMwTEFveK+Z6bHQxrgcTqUEHGQen6f19wpHc1ruVWk0qJJc+RgLg9xOqc\/f3rI2Lx1CVBAABAxqAJOSNzk5rQ8r4qCMAgCJXHiCY3\/uayxU2iHyepfDvLkYCalc84AKJ9u+fbvVDyXnmgTP9\/SpvMeZtcSVEiYEEZOMATJNea4y1Gqexi+d2CpUlTBmCdmE5H5zVS4dGuIgB3TVpEwcMMSMxG52kVYc2t3Db9cRo1adQInVvETIqy\/Z\/wALauXJuEEGTuN\/f\/muzVphqZn1MPx1kpAIIknEZ+\/efai5xTKBbllMkNBMRhZEnJLap2275rR\/tN4S3bvwny\/f75rO8s5l6b23W4Q3UjKRFpbTY0ghiwUy0qAImQa1i9cVIKorWumApGxYk47xnAnEEyT3xHdhGyIB9oGZ8D+lerch+CrNzhXOpHVWdlcKVLYjLHq0+Aa864S4lniQLii5aRzqWcETBgjGQBn2FOGIpWl0HwjSfAvxLY4cOly2pYhoJPtOZ2AAO3vWYvcx0XjdsMVYyyssjTqJGkyN43IkZEd4k895pc0tbVFt2WJZU0JIkgkeoRqOI71UcVYC5Do4LMqlSQSFjqKMAygyIneD4qoQWpy7yku8o\/iNpdDn5Bu2qT3P+Uf5TtRTfPo1iJ27n\/balrTOL+p9MfxRmiqoorpAO\/g\/nGP1rkGc04iAgmdpx39vrSONveuKYHTsDECMfmfNIBXVq2WIAEk7VacFZCOLb2pY6tLdWfwqQO6yJ27GkJuibyjkzhS5Jg6RAiCrH5ob5gIJ2PaM7W\/DcIlpStxriwIVxEDS2oslqQHE\/wAw7mJgGq5OccUqqwvdSyNQbqIJEgncqWmcdvym8v4hXv6y5A6VuklvTYRoKZMhnAkRO+IqXZyTc978jQ8o4e0xRXtG5aS0ArknJ1S9u7bWATt+WNRM1G4249lPUtcQDcJAuAibKQNAXQVCwQSsEE\/6xehrAW4qu\/qkabbRbZwFRNRHVhZ+X+pMnJuau2v0hbtdQBGjo+YhV1mZDEEAGMztvWel8mHv3q\/z+\/7CWOOCoty6W9RmNtHt6QJt4ZkVgFXogzgycRA0weZDhrjNdKMLatpNsGDcAkiGILBgIWcDpI3Ip7nvNWd7eolHXUq9AKLBDL36WBPURiAMCAKzXFcP\/GIaYY5JnTqmT1KSDHkVcI9TfCje72ZEW0xnQJBmFIkx3IB\/KRnBqNcQgwfb9citBxVu2LWq3cISFUB1JbWZZgrDZQRP5HNR05eAlu4p1KSJTSWIjV3AmIBaMfpWh0KZSUVI4khmciBkwAInPjtio9BoXfw98U8TwZ\/hXOg\/NbbKN9ux9xBrf8D8U2eLSB0XO9tj\/wDqfxD9favJa6ViCCDBHcV2ZTOzwJXyu4mUUzX87+cfWu7hf8U7aSSTkAwoE9hAGNtNUljmbXCqvlpGfP19\/eru1w5ZgEWZMR7zgHYZ+tez\/F83hZnCwZwfSV+D90nAjpuzqz1Esc6VGD3AgRMzt3GfpuJF1FOk2w23VORJnCEZIjzGZp\/iLap6lt7RW6H+bVHplSQ6KgwRO2cAV6X8Ack4O5w+pyNecnEV89i4qgrNjG8x5ZwicNbe1dL3m+dO9sKJYiDn6mftFVv7yssyrALHSC2QDsD5gRmpXxNw1u3fuLbY6Rq2xO\/fuM59pql4e07kIg1McBR8zH2G52pwVxsmjR8NzdEbIZ1zgkKTjeR4Oe80xe505MkyJ7Hc4+\/f9aomckYIBkTjsRuTEaf96mcuW31m46r\/AA5UwX6saQNB6WJkEkkAkyKOzSFTLE8cWC3blpxw5uSQmpU91RmJAOD743OwicLzo22YoGiemWyE2A8TEZ23xVevGmdLG56QIdkVgBq\/EVEQm5AwYxvUWQcGQs6ifmgHAJAjPbtuKaw1xQ6LXmfMGvF7hkATpDPmCwAjGSAczAyT2iq69YdQJXBAIYZEESJIJExiMHzTJgHBP99\/12rTf9aW1wlzhGtK5LkeoMxBGQwOxyPGZmcVXw0kikkQ+F+Jb6WmtLcIWPI9sfn+lU+sF8E7gSYM+\/au+MvqSum2EKqA0EnWc9edjkYGMU5dt4DG6hJ9MaU30kEEmBAKwAQckmc5NEYpdOSkTef84vcUltriqEtRbBWBGJA3kmO5\/wBqh3+X3lspfa2fSc9DwCpK4KmNjvvv+tRWMD6HAgEHz17+Me+4jN1xXFsnCJZW\/K3CXuWCMWYAKMGJzqUk4jbOaXFJBuYnn\/zid47RHntRRz9YcYjGQf7xRV5zbE+mP4oyRVV0zk79sfauaK5BhRRUvhUHUrLuuD42IPvO0e9NIB\/gOCncw2YDIxAjSZMAgggkd+31qztkOVS7czLtMMATjpBgaciCAImKg8IlzIXVKAtqk6G0DWFIjsBMVYM5LW7bo46GyYXByBnYTAOQTtFVRlLdiWL6WXgXEuEDRKpGDgtqjJA8xORXfPOBYoCrqyf4jEtBYmAJQklSBAj3+wz\/AAyHVp0wxgSYx5JBFWl3\/DACu7K7qwIlSCZkHsSIwMQAe9TQnGndlp61l0WbrlwCUKRqJwxJBzkgwGI7EeKeblqIAysHt6Zwpi45y+SRoOAudhmN6oVGl2YI1u4OqS2AMd4mdRB+lWnqOfTv22DAyhwZVlLPENiN3x4IgdzSZuDXD2IVy5cfLNo1sPTXUwUZgYnYwRJx3mi9y4m4bdog6mErMkD+YnYjcjORmgcwKoxHEBmDAiUJaQZAAbASQD9qnXHttftgAocTBQiZ1lUwDEkAltR3gU0VumR+W8KLYJOgrqMs8SQMABDkEyR9\/wDLUheaoQLYvQhBOrTo0AZ9NQB1TgSYBjOKq+Y3FDrqA0zDKuDHSchszEiTBMdqkXmm3\/DtBV+bUIDaIiDLHSsyd5kxBFUkPTe7IY4Bp1gGQAwIGGideTERB9sGoXFRiNzknM5ztMf\/ACrIWSzB\/wDtodIC79tMiSBO+\/Y1B4oqchCIj5pJacyTtt4jBFDSNURHWDFc12\/nuZmuKzKJPL\/8RfrXqfKeWnibLuzOq2kOFUFA2NAhYiTOSCc4ryzl\/wDiL9a9i+CrsSlxmUHTgHEHPUPcbV1YjrKxfjL9oij8RRcRyogatz33KkZ6gcH6z3\/RrhuPe30KzEHspgSRj9a9b+JbHC+kEs6dbYxk\/evM\/iT4b4jh9DXLfTcICHBGo9j2B+tc2FiqfxFNHfwpf9S4LV0MbbnU5BQMSgZpDvhMHaRVRx3HDWPSCoBrXWsh2DSDrac4xiBB96iBXIZQDpX5oEjcgaiPJ7n6eKZuppw6kE6SOxg5BE7yDIP0rdQ3so6s3YOMQDEkAj8UyRuD4ydhvXDWGLMCRIzLHtjMnJwQfMdqVmGJXIaTOZntBJBEz+ecYqw5cvD3GD8VfuABgjKsM+mIRkJwUEaSMaQFiZgU9tx8E74Z+GTxjR6oQ6WcahAbJCgeSSG\/Jqpv3e116rhVljQNGrUZg5B6cZkzNWPFW+FR7qWbj3EhQtydLK+xJXZ07Eewgiarm4l7i+ng9RuElV1zGZufMV05id+00lfNitjIMAkAwRpOBAnJGQYGMGQd65IaNQBidM9pyQPrE1Y8Zwtv1haW7b9M9Au9SLKsR6lwdRJI3IGxGMGl+H+GsPftpeYIhJ1vMwDsfY\/8U9W1jTK8WTpU9mLDsYKxOAdWxGSAPE5jrhb5tsLikEqZAZQw7EYONo96t\/iiylu5+72Lge0p6GAAL64mWHzLIXBMD86iW+L1BUuD1DZlbakdBUklkYKVYyxDTM4Oe1CdoLfUveV8Bw55Vxl5gBeDoqYjSMRAMkAyfyrIov4YXqIEkrAyO5+UeTj8qeutcA0sXknOT1ae5neMfQUtkAqWLhCmUnU2pgV6AACF7tqODBHalFci4RR\/FVx2ug3HLtpUaiwclQBo6gSPljHbbtRTXP3Juam3aWJ2kkyTA2yaKrN\/qfTH8UZr1KqiilrlSGPJagSR4jME5gxTjqekiRGASdWZGIjET+c1y986ApPcnscHO\/3P511YZYGswGJypyCBiV9zH61QhxTdYEEkIxkk4XGJ+wMY7YqzsXmSzqtsSJAN0mRb26VUiQSdJx4qtW9pUwdiJVjk5BGIggEZn8qLPGEoUZunLFSBBPaIyD9I8bU7olqxU425qMEy5GDgEHtgwAZ\/+VwhKnSCW+aBMBW2JK57D71LPBJcUi26MxYGSQhiDICGIE\/UDyM0vGcPpthGuHDkk6TBGkaSI3jzv1HwTSoLRPHCWzw4\/iLpKkOEn5lMI8GWacjA075Bpi3xNoAhWUWmFtXJSW76tKmV7zJzKziq61x+hAiFhmWb3yMAbCI95nNSeH9PUysrbDYZH4SYOZzvnfY71W17E6e8e4KwA+lFVgoJLhhkgyJExGoqMwDG9P8ApWVuNqI1PryDlSQQoU6VQgkjOwzTCraFsupJW5g5I9IiJJAPUTONse5MNHi0YkSwGGGR824hYOmM5nHmjZByReKsPb6GRsiU1qQYkwVExBE5z\/rUjhFC2yC+hp1AZIYAMCDBgkTER\/yyHusToYtAC6gcn\/2gxv28U1cYs0l2IXB3EAYiCdp7UccF7k7jLak2gqhVEkrJx1Z1mTBiNvPvUC4zMHkkBcgbTsAu+8T5OKj+tEaZEdwTPv8ASlu3mY5JPfv+f196TdgkckY8+N8eRTdd6sQc+M7d64qGUSuWGLqEicjHn2r1ng+UXhZHEW16AxXQGJPc5HjtONj5NeR8G4DqT2Nelck\/aY3CoFtPq\/m1KpnwR3xneutwnPLxUK+KVptLpHvEqt2d3OYspVizh1YEyJUCRnBmQNxGauvjL42XjeESwqaSpDMTHbAgd5mshz741XiSxZEBYqS2nqx2B7A9x7Cqe3ze0Jkn2jztJ+xNKOVbSbq1\/uXqGpGlXlHE2rSOT6dq+QFfVpXBnqjODn2iq3iRDEwDnTqWYBGxU7QYJHeAdqiXfiBSgQ3GZQMKdlJOYznbfG9RhzW15Md8985H28z3q1gTW9r7x9StSLBeEdmQCJcwoBG\/y5Ays53ydxin+a8qbhyVuyl4N1WivyqRKsGnIJ1dMYABnNQH5vZ0AjDBpJByf5QFmBB7iub3PldnZ7jOSCJcBi3YTM6SFJhhJB2quynzt916j1ol8UR0surSwWZUKNagao0gAwT2+p3rieoAmJg6gJOnpIOkH6GAZ3naoC8zswZGSOmCYBxmDM7N9yPEV1c50mkoDFssH07w0aZ1EatpxMUdhLvX3XqLUi\/5jy+0tuy6XULMHFweoGAZW0hukdKEEEGTMEz2rjlHJ7t67ptFWILKWLabZiTAunHUoJGxqj4XnC22DgjUpkagGE\/\/AItIP0Iou8faAWHmRJGMZOMHxG8VPYz4tfdeoal3kt1JLTJOWJZhnzJJE58Z+tXvwvzG3w\/ErcvW9W5aYgmZmBtuKzN3mVsSNUz82Zk4yCIByZggxG5rlObWguGywZWGntggzOTI+0UPAk1Tr7r1G5I1Pxr8QJxV0tbXQsjpERiRJ98n23qkAKMtu8HRQQWUr1LrCguFMEnTpIEgHHmq65zS2fxd8D9J\/QU\/xHObTAEszMUCsW0Y0kadMCYCgDOT5qo5dxjSa+69RalRUc9+cRt2kRjtgUU1zW+HII8RRWec\/Vrwj+KJRApTSUVyWMUV2pwc\/pvnz2rigU9gHFbpIkbg+5O2PzoViRpAGfzPjJ2pukobAfa8dJECGgnaZH9B7VYWeZ9JDCAVIlTlW\/EwURk+DjeqssCdo9hOPzoVfB798frQmJpE5biK1shMALmT8x3JjO8wARsKev8Ap+pGk+SCcgiQ0lflTA2mBTNm76ilWUYA0mI0iTOB82W296huV958+fera2FRL4lRJUtgAFdM6V36dJ8nv7z3peE4hkJQwvksBIHSYkg6cCodt8\/KD\/ftTZqW+o6JJbTMMZ76doxAJ+o\/pTdy6MgdzOd\/73rkHByfcea4FAHS5jG32nvSm4ZkYjb2FIDjauKGMKKWkqACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigApaSimgFoAooq6WpIApWEUUUUtLfiIUuYiceK5pKKlsZ1FBNFFVJcCEopKKixhRRRSAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP\/\/Z\" alt=\"Materia negra \u2014 Astronoo\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcT9HT_cG4CNjDbZ3gSklxiU3LXFP3SySu797g&amp;usqp=CAU\" alt=\"Todo lo que quer\u00edas saber sobre las estrellas | National Geographic\" \/><\/p>\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcTXh-Mphr7BKq-XJGThaIL78KE7cpuGVT5Cdg&amp;usqp=CAU\" alt=\"Los secretos del Universo : Blog de Emilio Silvera V.\" \/><img decoding=\"async\" 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\" alt=\"Nuevas pistas rebaten las ideas sobre la formaci\u00f3n de estrellas masivas\" \/><\/p>\n<p style=\"text-align: justify;\">\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 para cerrar el universo.<\/p>\n<p style=\"text-align: justify;\">\n<p><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><img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/upload.wikimedia.org\/math\/c\/2\/1\/c21f7b175e75cc6183cc565bdcb9d698.png\" alt=\"\" width=\"244\" height=\"71\" border=\"0\" \/><\/p>\n<p>&nbsp;<\/p>\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;\">\n<p>\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>&nbsp;<\/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 podr\u00eda deberse a un accidente c\u00f3smico; las cosas sencillamente \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 entre las densidades observadas y la 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;\">\n<p><img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/esamultimedia.esa.int\/images\/dtos\/mission\/C2_goce.jpg\" alt=\"http:\/\/esamultimedia.esa.int\/images\/dtos\/mission\/C2_goce.jpg\" width=\"672\" height=\"503\" \/><\/p>\n<p>Ingenios tecnol\u00f3gicos que detecten la &#8220;<a href=\"#\" onclick=\"referencia('materia oscura',event); return false;\">materia oscura<\/a>&#8221; invisible que no se deja ver<\/p>\n<p>&nbsp;<\/p>\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 para 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. 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 como 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 &#8220;Materia oscura&#8221;, o, por el contrario, est\u00e1 tirando de nuestro Universo, otros universos vecinos.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" id=\"BLOGGER_PHOTO_ID_5328429088077313682\" title=\"NGC 6397\" src=\"http:\/\/3.bp.blogspot.com\/_Vea_3vg0ArY\/SfJiBj209pI\/AAAAAAAADQw\/Nto8Jca-et4\/s400\/43a.jpg\" alt=\"NGC 6397\" border=\"0\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Inusual colisi\u00f3n de enanas blancas y tambi\u00e9n, se ha podido detectar la m\u00e1s abarrotada colisi\u00f3n de c\u00famulos gal\u00e1cticos que han sido identificados al combinar informaci\u00f3n de tres diferentes telescopios. El resultado brinda a los cient\u00edficos una posibilidad de aprender lo que ocurre con algunos de los m\u00e1s grandes objetos en el universo que chocan en una batalla campal c\u00f3smica de inusitada fuerza y descomunal emisi\u00f3n de energ\u00eda.<\/p>\n<p style=\"text-align: justify;\">\n<p><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>&nbsp;<\/p>\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><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>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p style=\"text-align: justify;\">La composici\u00f3n de imagen (arriba) 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;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Cu\u00e1nta materia vemos? : Blog de Emilio Silvera V.\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcTWT8rnlK61Ya8wRHFY9WpdQVjbgYWvmGmw_Q&amp;usqp=CAU\" alt=\"En este astrobito aprendemos como se\" \/><\/p>\n<p style=\"text-align: justify;\">\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 interact\u00faan, pero\u2026<\/p>\n<p style=\"text-align: justify;\">\n<p><strong>\u00bfCu\u00e1l debe ser la Masa del Universo?<\/strong><\/p>\n<p>&nbsp;<\/p>\n<p><img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/www.paulagordon.com\/shows\/guth\/guth-photo.jpg\" alt=\"Alan Guth's photo\" width=\"200\" height=\"153\" \/><img decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"Origen del Universo: Teor\u00eda de Inflaci\u00f3n del Universo\" \/><\/p>\n<h4>\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 Alan Guth<\/h4>\n<p>&nbsp;<\/p>\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\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcRm--zyNRL58y23EDKl2-sLNiNZIAKfWbapgQ&amp;usqp=CAU\" alt=\"La inflaci\u00f3n c\u00f3smica - La Ciencia de la Mula Francis\" \/><img decoding=\"async\" src=\"https:\/\/encrypted-tbn0.gstatic.com\/images?q=tbn:ANd9GcRQAb-tdj-55iCPVpr4H3f1vcMFjJ5RYEiMFA&amp;usqp=CAU\" alt=\"La inflaci\u00f3n c\u00f3smica y el multiverso inflacionario - La Ciencia de la Mula  Francis\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">Nuestra conversaci\u00f3n de hoy, diremos que 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;\">\n<p><img decoding=\"async\" loading=\"lazy\" id=\"imagenprincipal\" title=\"Abell 370: Lente gravitacional de un c\u00famulo de galaxias\" src=\"http:\/\/antwrp.gsfc.nasa.gov\/apod\/image\/0909\/abell370_hst.jpg\" alt=\"Abell 370: Lente gravitacional de un c\u00famulo de galaxias\" width=\"630\" height=\"517\" \/><\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\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 , \u00bfque 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, deajndo 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\" 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\" alt=\"Efecto Doppler | Efecto doppler, F\u00edsica, V\u00eda lactea\" \/><img decoding=\"async\" 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\" alt=\"C\u00f3mo la luz nos ayuda a saber que el universo se est\u00e1 expandiendo? |  Enterarse\" \/><\/p>\n<p>&nbsp;<\/p>\n<p>El objeto que se aleja se ve en rojo, el que se acerca en azul<\/p>\n<p>&nbsp;<\/p>\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. Dicho de otra manera, pongamos, por ejmplo, 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 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>&nbsp;<\/p>\n<p>&nbsp;<\/p>\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;\">\n<div><img decoding=\"async\" loading=\"lazy\" src=\"http:\/\/upload.wikimedia.org\/wikipedia\/commons\/thumb\/4\/43\/Supernova-1987a.jpg\/350px-Supernova-1987a.jpg\" alt=\"\" width=\"350\" height=\"318\" data-file-width=\"1309\" data-file-height=\"1190\" \/><\/div>\n<div>\n<div style=\"text-align: justify;\">Los <a href=\"#\" onclick=\"referencia('neutrinos',event); return false;\">neutrinos<\/a> sacan una ventaja de 20 metros a los <a href=\"#\" onclick=\"referencia('foton',event); return false;\">fotones<\/a> al recorrer los 730 kil\u00f3metros. CERN. La noticia fue publicada cuando un grupo de f\u00edsicos italianos midieron mal la velocidad de los <a href=\"#\" onclick=\"referencia('neutrinos',event); return false;\">neutrinos<\/a> y, dejaba en entredicho la teor\u00eda de la <a href=\"#\" onclick=\"referencia('relatividad',event); return false;\">relatividad<\/a> especial de <a href=\"#\" onclick=\"referencia('einstein',event); return false;\">Einstein<\/a>. Sin embargo, pocos d\u00edas m\u00e1s tarde, se tuvieron que desdecir.<\/div>\n<\/div>\n<p style=\"text-align: justify;\">Claro que, con esto pasa como pas\u00f3 con estos &#8220;veloces&#8221; <a href=\"http:\/\/www.emiliosilveravazquez.com\/blog\/category\/densidad-critica\/#\">neutrinos<\/a> 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. 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;\">\n<p><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>&nbsp;<\/p>\n<p>El Universo se expande<\/p>\n<p>&nbsp;<\/p>\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><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>&nbsp;<\/p>\n<p>&nbsp;<\/p>\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\u00e1i 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\u00f1aria 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, est\u00e1ndo 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;\">\n<p><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>&nbsp;<\/p>\n<p>En imagenes como , los \u201cexpertos\u201d nos dicen cosas como:<\/p>\n<p>&nbsp;<\/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 Rayos X Chandra que orbita alrededor de la Tierra.\u201d<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" 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\" alt=\"Observatorio de rayos X Chandra - Wikipedia, la enciclopedia libre\" \/><img decoding=\"async\" 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\" alt=\"El Observatorio de Rayos X Chandra Celebra su 20 Aniversario :: NASA EN  ESPA\u00d1OL\" \/><\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<\/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 efecto de \u201ctirachinas\u201d gravitacional.<\/p>\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\">\n<p style=\"text-align: justify;\"><img decoding=\"async\" src=\"https:\/\/upload.wikimedia.org\/wikipedia\/commons\/c\/c6\/A520-mass%2Bxray%2Blum-4up-m-1.jpg\" alt=\"Abell 520 - Wikipedia\" \/><\/p>\n<p style=\"text-align: justify;\">\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 menos, unas grandes lagunas en sus explicaciones y, tratando de taparlas hacen aseveraciones que nada tienen que ver con la realidad).<\/p>\n<p><em>emilio silvera<\/em><\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/p>\n<p>&nbsp;<\/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=https%3A%2F%2Fwww.emiliosilveravazquez.com%2Fblog%2F2021%2F02%2F25%2F%25c2%25bfcuanta-materia-vemos-5%2F&amp;title=%C2%BFCu%C3%A1nta+materia+vemos%3F' 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%2F2021%2F02%2F25%2F%25c2%25bfcuanta-materia-vemos-5%2F&amp;title=%C2%BFCu%C3%A1nta+materia+vemos%3F' title='Digg' target='_blank' rel='nofollow'><img src='https:\/\/www.emiliosilveravazquez.com\/blog\/wp-content\/plugins\/knxdt-bookmarks-wordpress-plugin\/images\/digg.png'  alt='' class='book_img' border='none' style='margin:1px; 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La\u00a0densidad [&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":[369],"tags":[],"_links":{"self":[{"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts\/12086"}],"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=12086"}],"version-history":[{"count":0,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/posts\/12086\/revisions"}],"wp:attachment":[{"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/media?parent=12086"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/categories?post=12086"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.emiliosilveravazquez.com\/blog\/wp-json\/wp\/v2\/tags?post=12086"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}