@wad_jania: الرد على @user86513394622633 #اخواني_في_الله_ودجنيااا✊🇸🇩 #اضحك_مع_ودجنيااا😂😂 #جخو،الشغل،دا،يا،عالم،➕_❤_📝 #مبدعين_التيكتوك #الشعب_الصيني_ماله_حل😂😂

ود جنيـااا العٓركـي» ❹❶❹
ود جنيـااا العٓركـي» ❹❶❹
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Tuesday 19 September 2023 05:07:34 GMT
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user7268340578637
نبض السعادة 🌤 :
ابدااااااااع والله ربنا يوفقك ان شاء الله 🥰🥰🥰
2023-09-19 05:36:31
2
wad.gsmaliha
النجاضي حفيد دار جعل :
❤️❤️❤️❤️❤️🥰😁😂😂
2023-09-28 20:30:04
2
.61078
ود العز الحمدي 611✌ :
😂😂😂😂
2023-11-22 16:31:41
1
user1800347456761
برطاني شهره :
مكنةة ارفع التعليق
2023-09-22 04:45:32
1
user48rsywtvwr
ابو رنا الكاهلي882 :
😂😂😂😂😂😂😂😂😂😂😂😂😂😂😂😂
2023-09-19 09:43:24
1
user5018143872882
عبدالهادي محمد ود كوستي :
بي جلبيتووو😂😂😂😂😂
2023-09-19 10:04:22
1
asmrani25a
الاسـمـرانـي ✌🏽🔥 :
😂😂😂😂😂
2023-11-06 11:26:29
1
saif_elyazal_gamal
『 سيـف اليـہـزل✨ 』 :
ارفع ي غالي 🥰
2023-10-29 01:31:09
0
user1619385976594
حامد محمود :
😂😂😂😂
2023-10-31 11:59:21
0
user8747636070161
Kamal_Ahmat :
🥰🥰😂😂😂
2023-10-29 01:31:07
0
khaled.brother.of
بيكو 🇵🇸 بلجيكا🇱🇾😎 :
مكنه والله كل الحب والاحترام والتقدير ي غالي ارفع شغول 🥰🥰😂😂
2023-10-28 17:33:51
0
user7783698144101
ابويقين الكردفاني :
😂😂😂😂😂
2023-10-28 11:58:22
0
.51887
نصر الدين يوسف518 :
😂😂😂😂😂😂😂😂😂😂😂
2023-10-28 02:05:04
0
user3419361970555
آلنعيم ود سالم :
😂😂😂😂😂🥰🥰🥰🥰
2023-10-27 06:52:46
0
user6204137933435
مجنون زمراوي :
😂😂😂😂
2023-10-26 13:29:09
0
user1130178845868
أزهري محمد عبدالله الحمري :
😂😂😂😂😂😂
2023-10-26 11:12:05
0
user7774081697888
اقجي :
وكلام زي ال💕🥰😁😁
2023-10-26 06:00:45
0
user99617393166178
كاسميرو (عاشق الليل) :
😂😂😂😂😂😂😂
2023-10-25 10:10:45
0
user2779439161200
✊آآآآآلمـرشـح آآآآآآلجعليـﮯ⁵¹⁵ :
ياااااخ والله العظيم ابداع عديل كدا 😂😂😂😂
2023-10-24 12:48:30
0
user7868800128533
user7868800128533 :
ههههههههه ههههههههه
2023-10-29 03:40:53
0
osamobabaker
osamobabaker :
ابدع❤️❤️❤️❤️
2023-10-23 19:04:16
0
user44563044683435
وطن حاتم ود العمده :
😂😂😂😂😂
2023-11-01 15:56:29
0
izzaldin105
ود الجزيره :
😂😂😂😂😂😂
2023-11-03 19:07:48
0
user3476653994510
user3476653994510 :
🤣🤣🤣🤣🤣🤣
2023-11-05 05:19:52
0
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nature video of me and my friends celebrating!! (og on x by SolisusNerthus) Graham’s number is an unimaginably large positive integer that was once famous for being the largest number ever used in a serious mathematical proof. It arose in a 1977 proof by mathematicians Ronald Graham and Bruce Rothschild in a branch of mathematics called Ramsey theory, which studies when patterns are guaranteed to appear. The important thing about Graham’s number is not its exact value—it’s far too large to write down in ordinary decimal notation. Here’s why it’s so enormous: * A million is 10^6, or 1 followed by 6 zeros. * A googol is 10^{100}, or 1 followed by 100 zeros. * A googolplex is 10^{(10^{100})}, a 1 followed by a googol zeros. * Graham’s number is incomprehensibly larger than even a googolplex. How is it defined? It uses a notation called Knuth’s up-arrow notation, which represents repeated exponentiation. For example: * 3 \uparrow 3 = 3^3 = 27 * 3 \uparrow\uparrow 3 = 3^{3^3} = 3^{27} * 3 \uparrow\uparrow\uparrow 3 is vastly larger still. Graham’s number is built recursively: * g_1 = 3 \uparrow\uparrow\uparrow\uparrow 3 (four up-arrows) * g_2 = 3 \uparrow^{g_1} 3 (where the number of up-arrows is itself g_1) * g_3 is defined similarly using g_2 * … * After repeating this process 64 times, g_{64} is Graham’s number. Even g_1 is far too large to comprehend. By the time you reach g_2, the number of up-arrows is itself unimaginably huge. Can we write it down? No. There isn’t enough room in the observable universe to write all of its digits. In fact, the number of digits in Graham’s number is itself astronomically larger than the number of atoms in the observable universe. A surprising fact Although Graham’s number is unimaginably large, its last few digits are known. The last 10 digits are: …2464195387 This is possible because modular arithmetic lets mathematicians compute the ending digits without ever calculating the entire number. Is it the biggest number in mathematics? No. There are many numbers defined later that are vastly larger, such as those arising from the TREE(3) function or the Busy Beaver function. Graham’s number is famous not because it’s the largest possible number, but because it was one of the first extremely large numbers to appear naturally in a rigorous mathematical proof. A useful way to think about it is this: if a googol is like a grain of sand, a googolplex is like the Earth, and Graham’s number is so much larger that the comparison itself becomes essentially meaningless. #actor #tcc #🍵🌊🌊 #truecrimecommunity #rampage
nature video of me and my friends celebrating!! (og on x by SolisusNerthus) Graham’s number is an unimaginably large positive integer that was once famous for being the largest number ever used in a serious mathematical proof. It arose in a 1977 proof by mathematicians Ronald Graham and Bruce Rothschild in a branch of mathematics called Ramsey theory, which studies when patterns are guaranteed to appear. The important thing about Graham’s number is not its exact value—it’s far too large to write down in ordinary decimal notation. Here’s why it’s so enormous: * A million is 10^6, or 1 followed by 6 zeros. * A googol is 10^{100}, or 1 followed by 100 zeros. * A googolplex is 10^{(10^{100})}, a 1 followed by a googol zeros. * Graham’s number is incomprehensibly larger than even a googolplex. How is it defined? It uses a notation called Knuth’s up-arrow notation, which represents repeated exponentiation. For example: * 3 \uparrow 3 = 3^3 = 27 * 3 \uparrow\uparrow 3 = 3^{3^3} = 3^{27} * 3 \uparrow\uparrow\uparrow 3 is vastly larger still. Graham’s number is built recursively: * g_1 = 3 \uparrow\uparrow\uparrow\uparrow 3 (four up-arrows) * g_2 = 3 \uparrow^{g_1} 3 (where the number of up-arrows is itself g_1) * g_3 is defined similarly using g_2 * … * After repeating this process 64 times, g_{64} is Graham’s number. Even g_1 is far too large to comprehend. By the time you reach g_2, the number of up-arrows is itself unimaginably huge. Can we write it down? No. There isn’t enough room in the observable universe to write all of its digits. In fact, the number of digits in Graham’s number is itself astronomically larger than the number of atoms in the observable universe. A surprising fact Although Graham’s number is unimaginably large, its last few digits are known. The last 10 digits are: …2464195387 This is possible because modular arithmetic lets mathematicians compute the ending digits without ever calculating the entire number. Is it the biggest number in mathematics? No. There are many numbers defined later that are vastly larger, such as those arising from the TREE(3) function or the Busy Beaver function. Graham’s number is famous not because it’s the largest possible number, but because it was one of the first extremely large numbers to appear naturally in a rigorous mathematical proof. A useful way to think about it is this: if a googol is like a grain of sand, a googolplex is like the Earth, and Graham’s number is so much larger that the comparison itself becomes essentially meaningless. #actor #tcc #🍵🌊🌊 #truecrimecommunity #rampage

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