graham's number wikipedia - EAS
See more
See all on Wikipediahttps://en.wikipedia.org › wiki › Graham's_numberGraham'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
...
See moreGraham'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 such as Skewes's number
...
See moreGraham's number is connected to the following problem in Ramsey theory:
Connect each pair of geometric vertices of an n-dimensional...
See moreUsing Knuth's up-arrow notation, Graham's number G (as defined in Gardner's Scientific American article) is
where the number of...
See more
The number gained a degree of popular attention when Martin Gardner described it in the "Mathematical Games" section of Scientific American in November 1977, writing that Graham had recently established, in an unpublished proof, "a bound so vast that it holds
...
See moreGraham's number is a "power tower" of the form 3↑↑n (with a very large value of n), so its rightmost decimal digits must satisfy certain properties
...
See moreWikipedia text under CC-BY-SA license- https://en.wikipedia.org › wiki › Graham_number
The Graham number or Benjamin Graham number is a figure used in securities investing that measures a stock's so-called fair value. Named after Benjamin Graham, the founder of value investing, the Graham number can be calculated as follows:
The final number is, theoretically, the maximum price that a defensive investor should pay for the given stock. Put another way, a stock priced below the Graham Number would be considered a g…Wikipedia · Text under CC-BY-SA license- Estimated Reading Time: 2 mins
- https://simple.wikipedia.org › wiki › Graham's_number
Graham's number is a very big natural number that was defined by a man named Ronald Graham. Graham was solving a problem in an area of mathematics called Ramsey theory. He proved that the answer to his problem was smaller than Graham's number. Graham's number is one of the biggest numbers ever used in a mathematical proof.
- Estimated Reading Time: 4 mins
- https://en.wikipedia.org › wiki › Talk:Graham's_number
- I have something I'd like to get a little clarity on. The intro contains this wonderful description of the scale of Graham's Number: I absolutely love this description, but I have a question on one aspect of it. Throughout, the description uses the concept of the number of Planck volumes in the observable universe, which is fine... but by the end, ...
- https://en.wikipedia.org › wiki › Talk:Graham's_number › Archive_1
The closest I can come to visualizing Graham's number is ∞-1 (i.e. less than ∞, but still more than I could ever even hope to imagine). --WikiMarshall 06:17, 26 June 2007 (UTC) Think of a number, any number. Is it even bigger than G? If you picked randomly, almost surely yes. Graham's number is way, way, smaller than infinity.
- https://en.wikipedia.org › wiki › Talk:Graham's_number › Archive_2
Graham's number has 64 of the up arrows, so it's much more than what a brain can comprehend without just thinking of infinity. 98.223.56.77 02:14, 22 September 2008 (UTC) Graham's number has many, many, many more than 64 up arrows. g 1 has 4 up arrows. g 2 has g 1 up arrows.
- https://googology.fandom.com › wiki › Graham's_number
Graham's number \(G_{64}\) is a famous large number, defined by Ronald Graham. Using Up-arrow notation, it is defined as the 64th term of the following sequence: \(\begin{array}{l} G_0=4 ... Using Up-arrow notation, it is defined as the 64th term of the following sequence: \(\begin{array}{l} G_0=4 \\ G_1=3\uparrow\uparrow\uparrow\uparrow3 \\ \textrm{For}\;0\le...
- https://brilliant.org › wiki › grahams-number
Graham's number is a tremendously large finite number that is a proven upper bound to the solution of a certain problem in Ramsey theory. It is named after mathematician Ronald Graham who used the number as a simplified explanation of the upper bounds of the problem he was working on in conversations with popular science writer Martin Gardner.
Missing:
- wikipedia
Must include:
- https://en.wikipedia.org › wiki › Graham's
W. & J. Graham's. W. & J. Graham's, or simply Graham's, is a producer of port wine. It is one of the most important of the port names and it is necessary for Graham's to declare a vintage for the year to be considered vintage by the port industry. Founded in 1820 as a consequence of the Graham family firm receiving a load of Portuguese wine as ...
- https://en.wikipedia.org › wiki › Graham
Graham (mango), a named mango cultivar originating in Trinidad. Graham number, a figure used in value investing. Graham escapement, a type of clockwork escapement. Graham's, a producer of port wine. Graham's number, the largest number that has ever been seriously used in a mathematical proof. Graham scan, a method of computing a convex hull.
- Some results have been removed
