Language
English
عربي
Tiếng Việt
русский
français
español
日本語
한글
Deutsch
हिन्दी
简体中文
繁體中文
API
Home
How To Use
Language
English
عربي
Tiếng Việt
русский
français
español
日本語
한글
Deutsch
हिन्दी
简体中文
繁體中文
Home
Detail
@phamminhthu888: Dung dịch vệ sinh CAVAILLES chuẩn hãng - Dịu nhẹ, cấp ẩm cho cả nam và nữ #phạmminhthu888 #MinhThu #minhthureview #mẹbốibốinè
Phạm Minh Thu 888
Open In TikTok:
Region: VN
Thursday 29 January 2026 11:36:16 GMT
785
0
0
2
Music
Download
No Watermark .mp4 (
5.36MB
)
No Watermark(HD) .mp4 (
2.64MB
)
Watermark .mp4 (
5.76MB
)
Music .mp3
Comments
There are no more comments for this video.
To see more videos from user @phamminhthu888, please go to the Tikwm homepage.
Other Videos
Meshoooooo ❤️ #petsloveres #lovecatsoftiktok😻 #قطط_كيوت #catsoftiktok #PetsOfTikTok
Looking for a comfortable yet budget-friendly hotel at the heart of Quezon City? 🛏🪞🛋 📍Try Torre Venezia Suites - we recently had a staycation and it was such a lovely experience for the whole fam. 🥰 📲Book via the RedDoorz app to get a room great value. 👌🏻 And if you want to save even more, use the code TARAREDKADA to get additional discounts. ❤️ @RedDoorz Philippines #RedDoorzPH #RedKada #QC #WhereToStayInQC #staycation
Graham's number is an immense number that arose as an upper bound on the answer of a problem in the mathematical field of Ramsey theory. It is much larger than many other large numbers introduced as effective bounds in mathematics, such as Skewes's bound, which in turn is much larger than a googolplex. Graham's number is so large that the observable universe is far too small to contain its ordinary digital representation, assuming that each digit occupies one Planck volume. But even the number of digits in this digital representation of Graham's number would itself be a number so large that its digital representation cannot be represented in the observable universe. Nor even can the number of digits of that number—and so forth, for a number of times far exceeding the total number of Planck volumes in the observable universe. Thus, Graham's number cannot be expressed even by physical universe-scale power towers of the form a b c ⋅ ⋅ ⋅ {\displaystyle a^{b^{c^{\cdot ^{\cdot ^{\cdot }}}}}}, even though Graham's number is indeed a power of three. However, Graham's number can be explicitly given by computable recursive formulas using Knuth's up-arrow notation or equivalent, as was done by Ronald Graham, the number's namesake. As there is a recursive formula to define it, it is much smaller than typical busy beaver numbers, the sequence of which grows faster than any computable sequence. Though too large to ever be computed in full, the sequence of digits of Graham's number can be computed explicitly via simple algorithms; the last 10 digits of Graham's number are ...2464195387. Using Knuth's up-arrow notation, Graham's number is g 64 {\displaystyle g_{64}},[1] where g n = { 3↑↑↑↑3, if n=1 and 3 ↑ g n − 1 3, if n≥2. {\displaystyle g_{n}={\begin{cases}3\uparrow \uparrow \uparrow \uparrow 3,&{\text{if }}n=1{\text{ and}}\\3\uparrow ^{g_{n-1}}3,&{\text{if }}n\geq 2.\end{cases}}} Graham's number was used by Graham in conversations with popular science writer Martin Gardner as a simplified explanation of the upper bounds of the problem he was working on. In 1977, Gardner described the number in Scientific American, introducing it to the general public. At the time of its introduction, it was the largest specific positive integer ever to have been used in a published mathematical proof. The number was described in the 1980 Guinness Book of World Records, adding to its popular interest. Other specific integers (such as TREE(3)) known to be far larger than Graham's number have since appeared in many serious mathematical proofs, for example in connection with Harvey Friedman's various finite forms of Kruskal's theorem. Additionally, smaller upper bounds on the Ramsey theory problem from which Graham's number was derived have since been proven to be valid.#Funny #actor #tcc #fyp
lagbe nki piccy...!!🎀🫶💖😇#fyp #viral #khasmeruchuri #trending #cretersearchinsight @TikTok
#☝️🤲🤲🙏
About
Robot
API
Legal
Privacy Policy