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An Entity of Type : owl:Thing, within Data Space : 134.155.108.49:8890 associated with source dataset(s)

Fz- is a prefix used on a number n to indicate \(n^n\) or equivalently \({^2}n\) (i.e n tetrated to 2). It was invented by Allstair Cockburn to continue the gar- prefix invented by his son. Fz(n) is equivalent to \(n[3]\) (triangle(n)), using Steinhaus-Moser notation. The first few values of fz-n are 1, 4, 27, 256, 3125, 46,656, 823,543, 16,777,216, 387,420,429, and 10,000,000,000.

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rdfs:label
  • Fz-
rdfs:comment
  • Fz- is a prefix used on a number n to indicate \(n^n\) or equivalently \({^2}n\) (i.e n tetrated to 2). It was invented by Allstair Cockburn to continue the gar- prefix invented by his son. Fz(n) is equivalent to \(n[3]\) (triangle(n)), using Steinhaus-Moser notation. The first few values of fz-n are 1, 4, 27, 256, 3125, 46,656, 823,543, 16,777,216, 387,420,429, and 10,000,000,000.
dcterms:subject
dbkwik:googology/p...iPageUsesTemplate
abstract
  • Fz- is a prefix used on a number n to indicate \(n^n\) or equivalently \({^2}n\) (i.e n tetrated to 2). It was invented by Allstair Cockburn to continue the gar- prefix invented by his son. Fz(n) is equivalent to \(n[3]\) (triangle(n)), using Steinhaus-Moser notation. The first few values of fz-n are 1, 4, 27, 256, 3125, 46,656, 823,543, 16,777,216, 387,420,429, and 10,000,000,000.
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