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Untierable
These articles have no tier, meaning they wont appear on official hierarchies. |
BASIC NUMBERS[]
As you see, those numbers are extreme, so the colors are, those with color-epilepsy shall not even go on this page, if you do, proceed with caution.
Measurements[]
NOTE: This is very op, dont get mad, just get nervous :)
Basical infinities chain[]
Mibsolute[]
Having this power is equivalent to Absolute infinity.
Bibsolute[]
Having this power is equivalent to Ω2.
Trilsolute[]
Having this power is equivalent to Ω10.
Quadisolute[]
Having this power is equivalent to Ω25.
Quinisolute[]
Having this power is equivalent to Ω50.
Sexasolute[]
Having this power is equivalent to Ω100.
Septasolute[]
Having this power is equivalent to Ω500.
Octolute[]
Having this power is equivalent to Ω1,000.
Nonolute[]
Having this power is equivalent to Ω10,000.
Decolute[]
Having this power is equivalent to Ω100,000.
Advanced infinities chain[]
Tredecolute[]
Having this power is equivalent to Ω1M.
Quintidecolute[]
Having this power is equivalent to Ω10M.
Septendecolute[]
Having this power is equivalent to Ω100M.
Vigilute[]
Having this power is equivalent to Ω1T.
Trevigilute[]
Having this power is equivalent to Ω10T.
Quinivilute[]
Having this power is equivalent to Ω100T.
Septenvilute[]
Having this power is equivalent to Ω1Qa.
Googolute[]
Having this power is equivalent to Ω10Qa.
Centolute[]
Having this power is equivalent to Ω100Qa.
Googolplexolute[]
Having this power is equivalent to Ω1Qi.
Mega infinities chain[]
Millililiolute[]
Having this power is equivalent to Ω10Qi.
Googolplexolute[]
Having this power is equivalent to Ω100Qi.
Googolplexiantholute[]
Having this power is equivalent to Ω1De.
Bigolute[]
Having this power is equivalent to Ω1TDe.
Googolplexigongolute[]
Having this power is equivalent to Ω1QDe.
Bigolgongolute[]
Having this power is equivalent to Ω1SDe.
Googolbongolute[]
Having this power is equivalent to Ω1Vgi.
Bigolbongolute[]
Having this power is equivalent to Ω1Vte.
Grahamlute[]
Having this power is equivalent to Ω1Vqi.
Treelute[]
Having this power is equivalent to Ω1Vst.
Truegogolute[]
Having this power is equivalent to Ω100,000,000,000..
Sizpreme infinities chain[]
Unilute[]
Having this power is equivalent to ΩUni.
Multilute[]
Having this power is equivalent to ΩMulti.
Megalute[]
Having this power is equivalent to ΩMega.
Gigalute[]
Having this power is equivalent to ΩGiga.
Teralute[]
Having this power is equivalent to ΩTera.
Petalute[]
Having this power is equivalent to ΩPeta.
Exalute[]
Having this power is equivalent to ΩExa.
Yottalute[]
Having this power is equivalent to ΩYotta.
Xennalute[]
Having this power is equivalent to ΩXena.
Wekalute[]
Having this power is equivalent to ΩWeka.
Dekalute[]
Having this power is equivalent to ΩDeka.
Superior infinities chain[]
Gratuelute[]
Having this power is equivalent to ΩG64.
Treraelute[]
Having this power is equivalent to ΩTREE(3).
Rayyaaolute[]
Having this power is equivalent to ΩRayo(10100).
Fishelute[]
Having this power is equivalent to ΩFISH55.
Footaelute[]
Having this power is equivalent to ΩFOOT10100.
Timelute[]
Having this power is equivalent to Ω100100100100.
Transfinite chain of zero[]
omelute[]
Having this power is equivalent to Ωω.
epsilute[]
Having this power is equivalent to Ωε.
zetalute[]
Having this power is equivalent to Ωζ.
philute[]
Having this power is equivalent to ΩΦ.
gammalute[]
Having this power is equivalent to ΩΓ.
No acess absolutes chain[]
Inacessible absolute[]
Having this power is equivalent to ΩI.
ABSOLUTE COMPACT CARDINAL[]
Having this power is equivalent to ΩKTP.
MAHLOLUTE[]
Having this power is equivalent to ΩM.
ωΦεΓζABSOLUTE ABSOLUTEζΓεΦω[]
Having this power is equivalent to ΩΩ.
ωΦεΓζTHE BEYOND NUMBERSζΓεΦω[]
Limitbreakers[]
That broken number[]
Having this power is equivalent to ΩƱ
That absolute broken number[]
Having this power is equivalent to ƱƱ
The fin[]
Having this power is equivalent to Ʊ{1/10/5}SUPREME
The blossa[]
Having this power is equivalent to Ʊ{1/10/10}SUPREME
Supreme numbers.[]
Supreme blossla[]
Having this power is equivalent to ƱRefixed final {IH}
Nigh before[]
Having this power is equivalent to Before{1/3}SUPREME
Before[]
Having this power is equivalent to Before{2/3}SUPREME
Absolutely.before.[]
Having this power is equivalent to Before{3/3}SUPREME++
notices[]
