User:ARsygo/Forging tethratope regiment numbers

Note: this article is a part of ExE generator of googologisms.

This article provides list of comprehensive googolisms listed in tethratope regiment, which coined using Extended Cascading-E Notation. And also, I'm going to add some of my own googolisms which is not available in original source. The original source has 897 googolisms listed there.

So, let's begin.

Note: E100#^^#^#n = E100#^^#^(n)100

Numbers

 * 1) tethrahendekon (E100#^^#^#11) (has recursion level \(f_(\varphi(11,0))(100)\))
 * 2) tethradodekon (E100#^^#^#12) (has recursion level \(f_(\varphi(12,0))(100)\))
 * 3) tethratredekon (E100#^^#^#13) (has recursion level \(f_(\varphi(13,0))(100)\))
 * 4) tethraterdekon (E100#^^#^#14) (has recursion level \(f_(\varphi(14,0))(100)\))
 * 5) tethrapedekon (E100#^^#^#15) (has recursion level \(f_(\varphi(15,0))(100)\))
 * 6) tethra-exdekon (E100#^^#^#16) (has recursion level \(f_(\varphi(16,0))(100)\))
 * 7) tethra-epdekon (E100#^^#^#17) (has recursion level \(f_(\varphi(17,0))(100)\))
 * 8) tethra-ogdekon = E100(#^^#^18)100 (has recursion level \(f_(\varphi(18,0))(100)\))
 * 9) tethra-enndekon = E100(#^^#^19)100 (has recursion level \(f_(\varphi(19,0))(100)\))
 * 10) tethra-icoson = E100(#^^#^20)100 (has recursion level \(f_(\varphi(20,0))(100)\))
 * 11) tethra-penicoson = E100(#^^#^25)100 (has recursion level \(f_(\varphi(25,0))(100)\))
 * 12) tethratrianton = E100(#^^#^30)100 (has recursion level \(f_(\varphi(30,0))(100)\))
 * 13) tethrasaranton = E100(#^^#^40)100 (has recursion level \(f_(\varphi(40,0))(100)\))
 * 14) tethrapeninton = E100(#^^#^50)100 (has recursion level \(f_(\varphi(50,0))(100)\))
 * 15) tethra-exinton = E100(#^^#^60)100 (has recursion level \(f_(\varphi(60,0))(100)\))
 * 16) tethra-ebdominton = E100(#^^#^70)100 (has recursion level \(f_(\varphi(70,0))(100)\))
 * 17) tethra-ogdonton = E100(#^^#^80)100 (has recursion level \(f_(\varphi(80,0))(100)\))
 * 18) tethra-eneninton = E100(#^^#^90)100 (has recursion level \(f_(\varphi(90,0))(100)\))
 * 19) tethra-heneneninton = E100(#^^#^91)100 (has recursion level \(f_(\varphi(91,0))(100)\))
 * 20) tethra-doeneninton = E100(#^^#^92)100 (has recursion level \(f_(\varphi(92,0))(100)\))
 * 21) tethra-tre-eneninton = E100(#^^#^93)100 (has recursion level \(f_(\varphi(93,0))(100)\))
 * 22) tethra-ter-eneninton = E100(#^^#^94)100 (has recursion level \(f_(\varphi(94,0))(100)\))
 * 23) tethra-pent-eneninton = E100(#^^#^95)100 (has recursion level \(f_(\varphi(95,0))(100)\))
 * 24) tethra-ex-eneninton = E100(#^^#^96)100 (has recursion level \(f_(\varphi(96,0))(100)\))
 * 25) tethra-ep-eneninton = E100(#^^#^97)100 (has recursion level \(f_(\varphi(97,0))(100)\))
 * 26) tethra-ogdeneninton = E100(#^^#^98)100 (has recursion level \(f_(\varphi(98,0))(100)\))
 * 27) tethra-enneneninton = E100(#^^#^99)100 (has recursion level \(f_(\varphi(99,0))(100)\))
 * 28) tethrahecton or tethratope = E100(#^^#^100)100 = E100#^^#^#100 (has recursion level \(f_(\varphi(100,0))(100) \approx f_(\varphi(\omega,0))(100)\))
 * 29) grand tethrahecton = E100(#^^#^100)100#2 (has recursion level \(f_(\varphi(100,0))^2(100)\))
 * 30) grangol-carta-tethrahecton = E100(#^^#^100)100#100 (has recursion level \(f_(\varphi(100,0) + 1)(100)\))
 * 31) greagol-carta-tethrahecton = E100(#^^#^100)100#100#100 (has recursion level \(f_(\varphi(100,0) + 2)(100)\))
 * 32) gigangol-carta-tethrahecton = E100(#^^#^100)100#100#100#100 (has recursion level \(f_(\varphi(100,0) + 3)(100)\))
 * 33) gugold-carta-tethrahecton = E100(#^^#^100)100##100 (has recursion level \(f_(\varphi(100,0) + \omega)(100)\))
 * 34) throogol-carta-tethrahecton = E100(#^^#^100)100###100 (has recursion level \(f_(\varphi(100,0) + \omega^2)(100)\))
 * 35) tetroogol-carta-tethrahecton = E100(#^^#^100)100####100 (has recursion level \(f_(\varphi(100,0) + \omega^3)(100)\))
 * 36) pentoogol-carta-tethrahecton = E100(#^^#^100)100#^(5)100 (has recursion level \(f_(\varphi(100,0) + \omega^4)(100)\))