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Moser's number, often abbreviated to just Moser, is equal to 2 inside a mega-gon, where Steinhaus-Moser Notation is used or M(2,M(2,3)-2) or M(2,Mega-2) in Hyper-Moser notation. Formally: \begin{eqnarray*} S_3(n) &=& n^n \\ S_{k + 1}(n) &=& S_k^n(n) \\ ext{Moser} &=& S_{S_5(2)}(2) \\ \end{eqnarray*} The last four digits of a Moser are ...1056. Matt Hudelson incorrectly defines a Moser as 2 inside a "Mega + 2"-gon, using his own slightly different version of Steinhaus-Moser Notation.

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  • Moser
  • Moser
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  • Η ονομασία " " σχετίζεται ετυμολογικά με την λέξη "[[ ]]".
  • Moser's number, often abbreviated to just Moser, is equal to 2 inside a mega-gon, where Steinhaus-Moser Notation is used or M(2,M(2,3)-2) or M(2,Mega-2) in Hyper-Moser notation. Formally: \begin{eqnarray*} S_3(n) &=& n^n \\ S_{k + 1}(n) &=& S_k^n(n) \\ ext{Moser} &=& S_{S_5(2)}(2) \\ \end{eqnarray*} The last four digits of a Moser are ...1056. Matt Hudelson incorrectly defines a Moser as 2 inside a "Mega + 2"-gon, using his own slightly different version of Steinhaus-Moser Notation.
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  • Η ονομασία " " σχετίζεται ετυμολογικά με την λέξη "[[ ]]".
  • Moser's number, often abbreviated to just Moser, is equal to 2 inside a mega-gon, where Steinhaus-Moser Notation is used or M(2,M(2,3)-2) or M(2,Mega-2) in Hyper-Moser notation. Formally: \begin{eqnarray*} S_3(n) &=& n^n \\ S_{k + 1}(n) &=& S_k^n(n) \\ ext{Moser} &=& S_{S_5(2)}(2) \\ \end{eqnarray*} The last four digits of a Moser are ...1056. Tim Chow proved that Graham's number is much larger than Moser. The proof hinges on the fact that, using Steinhaus-Moser Notation, n in a (k + 2)-gon is less than \(n\underbrace{\uparrow\uparrow\ldots\uparrow\uparrow}_{2k-1}n\). He sent the proof to Susan Stepney on July 7, 1998. Coincidentally, Stepney was sent a similar proof by Todd Cesere several days later. Matt Hudelson incorrectly defines a Moser as 2 inside a "Mega + 2"-gon, using his own slightly different version of Steinhaus-Moser Notation.
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