- Not to be confused with Myrillion.
Myllion is equal to \(10^{8}\) = \(10,000^{2}\) = 100,000,000 in the -yllion system,[1][2] or 10 squared 3 times. It is equal to 100 million.
CompactStar gave the name dyriad for this number as part of the -yriad system, referring to it being myriad2.[3] ompactStar also gave the name five-ex-grand zeroogol , and it's equal to Q<10,four-ex-grand zeroogol> in Quick array notation[4].
Sbiis Saibian gave the name "octad", referring to the value of this number.[5]
Aarex Tiaokhiao calls this number ooocol, 8-noogol[6], or goonaolhexault, and it's equal to a(10,100,0)x[6] in Aarex's Array Notation.[7]
Username5243 calls this number niloogolquintiplex or gooctol, and it's equal to 10[1]8 in Username5243's Array Notation.[8]
Wikia user NumLynx gave the name octaplex for this number, coined in analogy to octalogue. [9]
DeepLineMadom calls the number boogolquintiplex, boogolquinplex, and troo-ool, and is equal to 10[2]10[2]10[2]10[2]10[2]10[2]100 = 10[3]8 in DeepLineMadom's Array Notation.[10][11]
A myriad myriad, and the largest number mentioned in the Bible (Hebrew תנ"ך (Tanakh) or Christian Old Testament): Daniel 7:10, "... and ten thousand times ten thousand stood before him, ..." (King James version) [ישמשונה ורבו (רבון) [רבבן] קדמוהי יקומון[12]]. It is probably not a coincidence that 108 was also the largest number for which the Greeks had a name; the book of Daniel reached its final form well after Alexander conquered the entire Levant region. [13]
108 is 億 in China (yì, dàng) and Japan (oku), where they construct numerals on the basis of 10, 100, 10000, 108, and higher powers of 104. This system closely resembles the Knuth -yllion naming system for very large powers of 10.
In the sand reckoner, myriad myriad or 108 is a unit of second order where second order is the range of numbers from 108 to (108)2, numbers below 108 are called first order.[14]
In the German language, 100,000,000 is sometimes called "Zehntelmilliarde", meaning "One tenth of a billion".
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Some currencies, such as the German Papiermark, the Hungarian pengő, and the second and third Zimbabwean dollars, had banknotes with this number in the denomination.
It was also the prize for correctly answering the first two questions in the Turkish game show Kim 500 Milyar İster? in first Turkish lira.
Approximations[]
Notation | Lower bound | Upper bound |
---|---|---|
Scientific notation | \(1\times10^8\) | |
Arrow notation | \(10\uparrow8\) | |
Steinhaus-Moser Notation | 8[3] | 9[3] |
Copy notation | 9[8] | 1[9] |
Taro's multivariable Ackermann function | A(3,23) | A(3,24) |
Pound-Star Notation | #*(5)*10 | #*(16)*6 |
BEAF | {10,8} | |
Hyper-E notation | E8 | |
Bashicu matrix system | (0)[10000] | |
Hyperfactorial array notation | 11! | 12! |
Fast-growing hierarchy | \(f_2(22)\) | \(f_2(23)\) |
Hardy hierarchy | \(H_{\omega^2}(22)\) | \(H_{\omega^2}(23)\) |
Slow-growing hierarchy | \(g_{\omega^8}(10)\) |
Sources[]
- ↑ Myriad system on Wikipedia
- ↑ Large numbers By Robert Munafo
- ↑ -yriad numbers. Retrieved Apr 21, 2023
- ↑ Numbers from quick array notation
- ↑ Saibian, Sbiis. UFNL - Large Numbers. Retrieved 2021-03-30.
- ↑ Part 1 (LAN) - Aarex Googology[dead link]
- ↑ AAN Numbers - P1 - Aarex Googology[dead link]
- ↑ Part 1 - My Large Numbers
- ↑ -plex numbers. Retrieved 2021-11-21.
- ↑ DeepLineMadom's googology - Numbers I've coined (Retrieved 4 May 2022)
- ↑ Pointless Googolplex Stuffs - DLMAN Part 1 (retrieved 9 November 2024)
- ↑ https://www.sefaria.org/Daniel.7.10
- ↑ https://www.mrob.com/pub/math/numbers-16.html#le009_429_b
- ↑ https://sacred-texts.com/cla/archim/sand/sandreck.htm
See also[]
2-entry series: Zero-quinvicenol · Zeroogol · Grand zeroogol · Two-ex-grand zeroogol · Three-ex-grand zeroogol · Four-ex-grand zeroogol · Five-ex-grand zeroogol · Six-ex-grand zeroogol · Seven-ex-grand zeroogol · Eight-ex-grand zeroogol · Nine-ex-grand zeroogol · Zero-unol · Zero-binol
Myriad System Numbers myllion · byllion · tryllion · quadryllion · quintyllion · decyllion · undecyllion ·vigintyllion · trigintyllion · centyllion · yoctyllion · latinlatinlatinbyllionyllionyllionyllion
Note: The readers should be careful that numbers defined by Username5243's Array Notation are ill-defined as explained in Username5243's Array Notation#Issues. So, when an article refers to a number defined by the notation, it actually refers to an intended value, not an actual value itself (for example, a[c]b = \(a \uparrow^c b\) in arrow notation). In addition, even if the notation is ill-defined, a class category should be based on an intended value when listed, not an actual value itself, as it is not hard to fix all the issues from the original definition, hence it should not be removed.