@hss_177: #الوضع_بعد#سامري#فرقة_الوطن

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sadah22
🇸🇦🌹🇸🇦ابو فيصل🇸🇦🌹🇸🇦 :
الله الله عليك افضل ممثل والله يزين الحال يا اهل السودان العزيزه ويصلح الحال ياحي ياقيوم والله يرحمه ويرحم ابوي وجميع اموات المسلمين ومسكنهم جنان يارب
2023-08-26 18:36:01
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dodoo.accaoui
Dodoo Accaoui :
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2025-10-22 18:36:32
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sahoma070
Seham 🌹🌹 :
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2026-03-20 13:37:07
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swsan334
swsan ☕️🎶🤍 :
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2026-07-07 18:10:02
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Editing my cousin Elliot when he was a kid he passed away and i miss him so much ||  IA IA IA IA IA IA ALL FAKE || The Graham’s number is one of the largest numbers ever used in a serious mathematical proof. It is so enormous that it cannot be written down completely, even if you filled the entire universe with paper, screens, or atoms. To get an idea of its size: one million is (10^6), a googol is (10^{100}) (a 1 followed by 100 zeros), and a googolplex is (10^{10^{100}}), which is vastly larger. Even so, Graham’s number is unimaginably bigger than a googolplex. It is defined using the up-arrow notation created by Donald Knuth. For example, (3 \uparrow 3 = 3^3 = 27), (3 \uparrow\uparrow 3 = 3^{27}), which is already enormous, and (3 \uparrow\uparrow\uparrow 3) is far larger. The more arrows you add, the faster the number grows. Graham’s number is built in 64 steps. The first number, (G_1), already uses an enormous number of arrows between two 3s. Then (G_2) uses (G_1) as the number of arrows, (G_3) uses (G_2), and so on until (G_{64}), which is Graham’s number. Although it is unimaginably large, it is not infinite. It is a finite number, meaning it has a last digit, you can add 1 to it to get another number, and it is still much smaller than infinity. For comparison, the observable universe is estimated to contain about (10^{80}) atoms. However, Graham’s number is so huge that not even the number of digits it contains could be written using all the atoms in the universe. A fascinating fact is that, even though we cannot write the entire number, we do know its last digit: it ends in 7. It is one of the best examples of how mathematics can define numbers that are far larger than anything that could ever be physically represented. #targetaudience #ER #fyp #zeroday
Editing my cousin Elliot when he was a kid he passed away and i miss him so much || IA IA IA IA IA IA ALL FAKE || The Graham’s number is one of the largest numbers ever used in a serious mathematical proof. It is so enormous that it cannot be written down completely, even if you filled the entire universe with paper, screens, or atoms. To get an idea of its size: one million is (10^6), a googol is (10^{100}) (a 1 followed by 100 zeros), and a googolplex is (10^{10^{100}}), which is vastly larger. Even so, Graham’s number is unimaginably bigger than a googolplex. It is defined using the up-arrow notation created by Donald Knuth. For example, (3 \uparrow 3 = 3^3 = 27), (3 \uparrow\uparrow 3 = 3^{27}), which is already enormous, and (3 \uparrow\uparrow\uparrow 3) is far larger. The more arrows you add, the faster the number grows. Graham’s number is built in 64 steps. The first number, (G_1), already uses an enormous number of arrows between two 3s. Then (G_2) uses (G_1) as the number of arrows, (G_3) uses (G_2), and so on until (G_{64}), which is Graham’s number. Although it is unimaginably large, it is not infinite. It is a finite number, meaning it has a last digit, you can add 1 to it to get another number, and it is still much smaller than infinity. For comparison, the observable universe is estimated to contain about (10^{80}) atoms. However, Graham’s number is so huge that not even the number of digits it contains could be written using all the atoms in the universe. A fascinating fact is that, even though we cannot write the entire number, we do know its last digit: it ends in 7. It is one of the best examples of how mathematics can define numbers that are far larger than anything that could ever be physically represented. #targetaudience #ER #fyp #zeroday
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#🇦🇫 Afganistán 🇦🇱 Albania 🇩🇿 Argelia 🇦🇩 Andorra 🇦🇴 Angola 🇦🇬 Antigua y Barbuda 🇦🇷 Argentina 🇦🇲 Armenia 🇦🇺 Australia 🇦🇹 Austria 🇦🇿 Azerbaiyán 🇧🇸 Bahamas 🇧🇭 Baréin 🇧🇩 Bangladés 🇧🇧 Barbados 🇧🇾 Bielorrusia 🇧🇪 Bélgica 🇧🇿 Belice 🇧🇯 Benín 🇧🇹 Bután 🇧🇴 Bolivia 🇧🇦 Bosnia y Herzegovina 🇧🇼 Botsuana 🇧🇷 Brasil 🇧🇳 Brunéi 🇧🇬 Bulgaria 🇧🇫 Burkina Faso 🇧🇮 Burundi 🇨🇻 Cabo Verde 🇰🇭 Camboya 🇨🇲 Camerún 🇨🇦 Canadá 🇨🇫 República Centroafricana 🇹🇩 Chad 🇨🇱 Chile 🇨🇳 China 🇨🇴 Colombia 🇰🇲 Comoras 🇨🇬 Congo 🇨🇷 Costa Rica 🇨🇮 Costa de Marfil 🇭🇷 Croacia 🇨🇺 Cuba 🇨🇾 Chipre 🇨🇿 República Checa 🇩🇰 Dinamarca 🇩🇯 Yibuti 🇩🇲 Dominica 🇩🇴 República Dominicana 🇪🇨 Ecuador 🇪🇬 Egipto 🇸🇻 El Salvador 🇬🇶 Guinea Ecuatorial 🇪🇷 Eritrea 🇪🇪 Estonia 🇸🇿 Esuatini 🇪🇹 Etiopía 🇫🇯 Fiyi 🇫🇮 Finlandia 🇫🇷 Francia 🇬🇦 Gabón 🇬🇲 Gambia 🇬🇪 Georgia 🇩🇪 Alemania 🇬🇭 Ghana 🇬🇷 Grecia 🇬🇩 Granada 🇬🇹 Guatemala 🇬🇳 Guinea 🇬🇼 Guinea-Bisáu 🇬🇾 Guyana 🇭🇹 Haití 🇭🇳 Honduras 🇭🇺 Hungría 🇮🇸 Islandia 🇮🇳 India 🇮🇩 Indonesia 🇮🇷 Irán 🇮🇶 Irak 🇮🇪 Irlanda 🇮🇱 Israel 🇮🇹 Italia 🇯🇲 Jamaica 🇯🇵 Japón 🇯🇴 Jordania 🇰🇿 Kazajistán 🇰🇪 Kenia 🇰🇮 Kiribati 🇰🇼 Kuwait 🇰🇬 Kirguistán 🇱🇦 Laos 🇱🇻 Letonia 🇱🇧 Líbano 🇱🇸 Lesoto 🇱🇷 Liberia 🇱🇾 Libia 🇱🇮 Liechtenstein 🇱🇹 Lituania 🇱🇺 Luxemburgo 🇲🇬 Madagascar 🇲🇼 Malaui 🇲🇾 Malasia 🇲🇻 Maldivas 🇲🇱 Malí 🇲🇹 Malta 🇲🇭 Islas Marshall 🇲🇷 Mauritania 🇲🇺 Mauricio 🇲🇽 México 🇫🇲 Micronesia 🇲🇩 Moldavia 🇲🇨 Mónaco 🇲🇳 Mongolia 🇲🇪 Montenegro 🇲🇦 Marruecos 🇲🇿 Mozambique 🇲🇲 Myanmar 🇳🇦 Namibia 🇳🇷 Nauru 🇳🇵 Nepal 🇳🇱 Países Bajos 🇳🇿 Nueva Zelanda 🇳🇮 Nicaragua 🇳🇪 Níger 🇳🇬 Nigeria 🇰🇵 Corea del Norte 🇲🇰 Macedonia del Norte 🇳🇴 Noruega 🇴🇲 Omán 🇵🇰 Pakistán 🇵🇼 Palaos 🇵🇦 Panamá 🇵🇬 Papúa Nueva Guinea 🇵🇾 Paraguay 🇵🇪 Perú 🇵🇭 Filipinas 🇵🇱 Polonia 🇵🇹 Portugal 🇶🇦 Catar 🇷🇴 Rumanía 🇷🇺 Rusia 🇷🇼 Ruanda 🇰🇳 San Cristóbal y Nieves 🇱🇨 Santa Lucía 🇻🇨 San Vicente y las Granadinas 🇼🇸 Samoa 🇸🇲 San Marino 🇸🇹 Santo Tomé y Príncipe 🇸🇦 Arabia Saudita 🇸🇳 Senegal 🇷🇸 Serbia 🇸🇨 Seychelles 🇸🇱 Sierra Leona 🇸🇬 Singapur 🇸🇰 Eslovaquia 🇸🇮 Eslovenia 🇸🇧 Islas Salomón 🇸🇴 Somalia 🇿🇦 Sudáfrica 🇰🇷 Corea del Sur 🇸🇸 Sudán del Sur 🇪🇸 España 🇱🇰 Sri Lanka 🇸🇩 Sudán 🇸🇷 Surinam 🇸🇪 Suecia 🇨🇭 Suiza 🇸🇾 Siria 🇹🇼 Taiwán 🇹🇯 Tayikistán 🇹🇿 Tanzania 🇹🇭 Tailandia 🇹🇱 Timor Oriental 🇹🇬 Togo 🇹🇴 Tonga 🇹🇹 Trinidad y Tobago 🇹🇳 Túnez 🇹🇷 Turquía 🇹🇲 Turkmenistán 🇹🇻 Tuvalu 🇺🇦 Ucrania 🇺🇬 Uganda 🇦🇪 Emiratos Árabes Unidos 🇬🇧 Reino Unido 🇺🇸 Estados Unidos 🇺🇾 Uruguay 🇺🇿 Uzbekistán 🇻🇺 Vanuatu 🇻🇦 Ciudad del Vaticano 🇻🇪 Venezuela 🇻🇳 Vietnam 🇾🇪 Yemen 🇿🇲 Zambia 🇿🇼 Zimbabue

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