About: Gong Megisiquadruon

Description
Metadata
Settings
- owl:sameAs
- Inference Rule:

About: Gong Megisiquadruon Sponge Permalink

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

The Gong Megisiquadruon is equal to M(5,4) = M(Gong Megisitruon,3), using the Hyper-Moser notation M(m,n) for m inside n+2-gon in Steinhaus-Moser notation. The term was coined by Aarex Tiaokhiao. In the up-arrow notation Gong Megisiquadruon is between \(5 \uparrow^{4} 6\) and \(5 \uparrow^{4} 7\).

Attributes	Values
rdfs:label	Gong Megisiquadruon
rdfs:comment	The Gong Megisiquadruon is equal to M(5,4) = M(Gong Megisitruon,3), using the Hyper-Moser notation M(m,n) for m inside n+2-gon in Steinhaus-Moser notation. The term was coined by Aarex Tiaokhiao. In the up-arrow notation Gong Megisiquadruon is between \(5 \uparrow^{4} 6\) and \(5 \uparrow^{4} 7\).
dcterms:subject	Numbers Up-arrow notation level Numbers by Aarex Tiaokhiao Hyper-Moser numbers Powers of 5
dbkwik:googology/p...iPageUsesTemplate	dbkwik:resource/R3cGJMTLItpCG-wOrKRezw==
abstract	The Gong Megisiquadruon is equal to M(5,4) = M(Gong Megisitruon,3), using the Hyper-Moser notation M(m,n) for m inside n+2-gon in Steinhaus-Moser notation. The term was coined by Aarex Tiaokhiao. In the up-arrow notation Gong Megisiquadruon is between \(5 \uparrow^{4} 6\) and \(5 \uparrow^{4} 7\).

OpenLink Virtuoso version 07.20.3217, on Linux (x86_64-pc-linux-gnu), Standard Edition
Data on this page belongs to its respective rights holders.
Virtuoso Faceted Browser Copyright © 2009-2012 OpenLink Software