The googolminex is equal to 10^-googol or 10^-googolplex. \(a\)\(l\)\(t\) 04:17, April 20, 2013 (UTC)
- \[\text{googolminex} = \frac{1}{\text{googolplex}} = \frac{1}{10^{10^{100}}} = (10^\text{googol})^{-1} = 10^{-\text{googol}}\] — I want more clouds! 06:09, April 20, 2013 (UTC)
The -plex in Bowers' terms are not so formal. If you say "if n=f(10,100), then n-plex=f(10,n)", what's golapulusplex then? Also, some numbers not base on 100 can use -plex, e.g. generalplex and iteralplex. Anyway, I think that it's no sense to find a way how Bowers' uses the suffix -plex on numbers. hyp$hyp?cos&cos (talk) 11:22, December 5, 2013 (UTC)