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Steinhaus–Moser notation
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== Special values == Steinhaus defined: *'''mega''' is the number equivalent to 2 in a circle: {{tooltip|2=C(2) = S(S(2))|②}} *'''megiston''' is the number equivalent to 10 in a circle: ⑩ '''Moser's number''' is the number represented by "2 in a megagon". '''Megagon''' is here the name of a polygon with "mega" sides (not to be confused with the [[megagon|polygon with one million sides]]). Alternative notations: *use the functions square(x) and triangle(x) *let {{math|<VAR>M</VAR>(<VAR >n</VAR >, <VAR >m</VAR >, <VAR >p</VAR >)}} be the number represented by the number {{math|<VAR >n</VAR >}} in {{math|<VAR >m</VAR >}} nested {{math|<VAR >p</VAR >}}-sided polygons; then the rules are: **<math>M(n,1,3) = n^n</math> **<math>M(n,1,p+1) = M(n,n,p)</math> **<math>M(n,m+1,p) = M(M(n,1,p),m,p)</math> * and **mega = <math>M(2,1,5)</math> **megiston = <math>M(10,1,5)</math> **moser = <math>M(2,1,M(2,1,5))</math>
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