User blog:Edwin Shade/My Own Naming System

This naming system is so simple it can be explained fully in one paragraph, but in order to include examples it will have to be a good sized paragraph. The naming system can be used to name any number of the form $$n{↑^m}n{↑^m}n{↑^m}...{↑^m}n{↑^m}n$$, where there x n's. The name of the number is broken into three parts, the base, the repeater, and the hyper-operator. For instance if I wish to denote the number $$1000{↑^10}1000{↑^10}1000{↑^10}1000{↑^10}1000$$, I would first take the base, (which is a thousand), the number of times it is repeated, (which is five), and the number of up arrows between successive bases, (which is ten). Next I concatenate the names for a thousand, five, and twelve, (which are "milla", "quinta", and "deci"}, thus forming the word "millarequintafledecix". You will note that there are three additional phrases, that is, "re", "fle", and "ex", which are for making sure that one number may not be mistaken for another. "Re" is short for "repeat" and is to be inserted between the prefix for the base number and the number of times that base number appears. Thus "myrirebi" means "a myriad repeated twice". The last part of the number name is the word "flex" with the prefix for the number of up arrows being used inserted between the letters e and x of flex. If only one up arrow is being used between terms then the suffix is to stay just as "flex", but if a tetrational power tower is being described then the prefix "bi" would be inserted between e and x to give the suffix "flebix". Therefore, a Myrirebifletrix means that the number 10,000 appears twice in a pentational power tower. This is equal to $$10000↑↑↑10000$$. Now lets say we have the number $$287{↑^498}287{↑^498}287{↑^498}287{↑^498}287{↑^498}287{↑^498}287{↑^498}287{↑^498}287{↑^498}287$$. To describe this we first take the prefix for the base number 287, or "duocenseptenoctoginta"; the prefix for the number of times this number is repeated, 10, or "deci", and finally the prefix for the number of up-arrows between terms, 498, or "quadringenoctononaginta". Now put 'duocenseptenoctoginta' before 'deci' and insert a "re" inbetween. Then take this result and concatenate it with the word flex with the prefix "quadringenoctononaginta" between letters e and x. The final result is the name, or a "duocenseptenoctogintaredeciflequadringenoctononagex".

Here are just some example names using my system. A Millilliretriflex $$1000000^{1000000^{1000000^1000000}}$$  A Centirequintaflebix 100↑↑100↑↑100↑↑100↑↑100  A Quindeciredecifletrix $$15↑↑↑15↑↑↑15↑↑↑15↑↑↑15↑↑↑15↑↑↑15↑↑↑15↑↑↑15↑↑↑15$$  A Nanilliremilliflequintex 10^3000000003↑↑↑↑↑10^3000000003↑↑↑↑↑...[1,000 terms in total]...↑↑↑↑↑10^3000000003 If anyone has suggestions or questions about this system please leave a comment below.