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The tethradekon regiment is a series of numbers from E100#^^#^#10 to E100#^^(#^11)90 defined using Extended Cascading-E Notation (i.e. beginning from tethradekon and up to enenintastaculated-tethradekon).[1] The numbers were coined by Sbiis Saibian.

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Tethrennon regiment Tethratope regiment

List of numbers of the regiment[]

Name of number Extended Cascading-E Notation (Definition) Fast-growing hierarchy (Approximation)
Tethradekon, tethradekonicor, tethradekeract E100#^^#^#10 \(f_{\varphi(10,0)}(100)\)
Grand tethradekon E100(#^^#^10)100#2 \(f^2_{\varphi(10,0)}(100)\)
Grangol-carta-tethradekon E100(#^^#^10)100#100 \(f_{\varphi(10,0)+1}(100)\)
Grand Grangol-carta-tethradekon E100(#^^#^10)100#100#2 \(f^2_{\varphi(10,0)+1}(100)\)
Godgahlah-carta-tethradekon E100(#^^#^10)100#^#100 \(f_{\varphi(10,0)+\omega^\omega}(100)\)
Tethrathoth-carta-tethradekon E100(#^^#^10)100#^^#100 \(f_{\varphi(10,0)+\varepsilon_0}(100)\)
Tethracross-carta-tethradekon E100(#^^#^10)100#^^##100 \(f_{\varphi(10,0)+\zeta_0}(100)\)
Tethracubor-carta-tethradekon E100(#^^#^10)100#^^###100 \(f_{\varphi(10,0)+\eta_0}(100)\)
Tethrateron-carta-tethradekon E100(#^^#^10)100(#^^#^4)100 \(f_{\varphi(10,0)+\varphi(4,0)}(100)\)
Tethrapeton-carta-tethradekon E100(#^^#^10)100(#^^#^5)100 \(f_{\varphi(10,0)+\varphi(5,0)}(100)\)
Tethrahexon-carta-tethradekon E100(#^^#^10)100(#^^#^6)100 \(f_{\varphi(10,0)+\varphi(6,0)}(100)\)
Tethrahepton-carta-tethradekon E100(#^^#^10)100(#^^#^7)100 \(f_{\varphi(10,0)+\varphi(7,0)}(100)\)
Tethra-ogdon-carta-tethradekon E100(#^^#^10)100(#^^#^8)100 \(f_{\varphi(10,0)+\varphi(8,0)}(100)\)
Tethrennon-carta-tethradekon E100(#^^#^10)100(#^^#^9)100 \(f_{\varphi(10,0)+\varphi(9,0)}(100)\)
Tethradekon-by-deuteron E100(#^^#^10)100(#^^#^10)100 \(f_{\varphi(10,0)\times2}(100)\)
Tethradekon-by-triton E100(#^^#^10)100(#^^#^10)100(#^^#^10)100 \(f_{\varphi(10,0)\times3}(100)\)
Tethradekon-by-teterton E100(#^^#^10)100(#^^#^10)100(#^^#^10)100(#^^#^10)100 \(f_{\varphi(10,0)\times4}(100)\)
Tethradekon-by-pepton E100(#^^#^10)*#6 \(f_{\varphi(10,0)\times5}(100)\)
Tethradekon-by-exton E100(#^^#^10)*#7 \(f_{\varphi(10,0)\times6}(100)\)
Tethradekon-by-epton E100(#^^#^10)*#8 \(f_{\varphi(10,0)\times7}(100)\)
Tethradekon-by-ogdon E100(#^^#^10)*#9 \(f_{\varphi(10,0)\times8}(100)\)
Tethradekon-by-ennon E100(#^^#^10)*#10 \(f_{\varphi(10,0)\times9}(100)\)
Tethradekon-by-dekaton E100(#^^#^10)*#11 \(f_{\varphi(10,0)\times10}(100)\)
Tethradekon-by-hyperion E100(#^^#^10)*#100 \(f_{\varphi(10,0)\times99}(100)\)
Tethradekon-by-godgahlah E100(#^^#^10)*#^#100 \(f_{\varphi(10,0)\times\omega^\omega}(100)\)
Tethradekon-by-tethrathoth E100(#^^#^10)*#^^#100 \(f_{\varphi(10,0)\times\varepsilon_0}(100)\)
Tethradekon-by-tethracross E100(#^^#^10)*#^^##100 \(f_{\varphi(10,0)\times\zeta_0}(100)\)
Tethradekon-by-tethracubor E100(#^^#^10)*#^^###100 \(f_{\varphi(10,0)\times\eta_0}(100)\)
Tethradekon-by-tethrateron E100(#^^#^10)*(#^^#^4)100 \(f_{\varphi(10,0)\times\varphi(4,0)}(100)\)
Tethradekon-by-tethrapeton E100(#^^#^10)*(#^^#^5)100 \(f_{\varphi(10,0)\times\varphi(5,0)}(100)\)
Tethradekon-by-tethrahexon E100(#^^#^10)*(#^^#^6)100 \(f_{\varphi(10,0)\times\varphi(6,0)}(100)\)
Tethradekon-by-tethrahepton E100(#^^#^10)*(#^^#^7)100 \(f_{\varphi(10,0)\times\varphi(7,0)}(100)\)
Tethradekon-by-tethra-ogdon E100(#^^#^10)*(#^^#^8)100 \(f_{\varphi(10,0)\times\varphi(8,0)}(100)\)
Tethradekon-by-tethrennon E100(#^^#^10)*(#^^#^9)100 \(f_{\varphi(10,0)\times\varphi(9,0)}(100)\)
Deutero-tethradekon E100(#^^#^10)*(#^^#^10)100 \(f_{\varphi(10,0)^{2}}(100)\)
Trito-tethradekon E100(#^^#^10)*(#^^#^10)*(#^^#^10)100 \(f_{\varphi(10,0)^{3}}(100)\)
Teterto-tethradekon E100(#^^#^10)*(#^^#^10)*(#^^#^10)*(#^^#^10)100 \(f_{\varphi(10,0)^{4}}(100)\)
Pepto-tethradekon E100(#^^#^10)^#5 \(f_{\varphi(10,0)^{5}}(100)\)
Exto-tethradekon E100(#^^#^10)^#6 \(f_{\varphi(10,0)^{6}}(100)\)
Epto-tethradekon E100(#^^#^10)^#7 \(f_{\varphi(10,0)^{7}}(100)\)
Ogdo-tethradekon E100(#^^#^10)^#8 \(f_{\varphi(10,0)^{8}}(100)\)
Ento-tethradekon E100(#^^#^10)^#9 \(f_{\varphi(10,0)^{9}}(100)\)
Dekato-tethradekon E100(#^^#^10)^#10 \(f_{\varphi(10,0)^{10}}(100)\)
Tethradekonifact E100(#^^#^10)^#100 \(f_{\varphi(10,0)^{\omega}}(100)\)
Quadratatethradekon E100(#^^#^10)^##100 \(f_{\varphi(10,0)^{\omega^2}}(100)\)
Kubikutethradekon E100(#^^#^10)^###100 \(f_{\varphi(10,0)^{\omega^3}}(100)\)
Quarticutethradekon E100(#^^#^10)^####100 \(f_{\varphi(10,0)^{\omega^4}}(100)\)
Quinticutethradekon E100(#^^#^10)^(#^5)100 \(f_{\varphi(10,0)^{\omega^5}}(100)\)
Sexticutethradekon E100(#^^#^10)^(#^6)100 \(f_{\varphi(10,0)^{\omega^6}}(100)\)
Septicutethradekon E100(#^^#^10)^(#^7)100 \(f_{\varphi(10,0)^{\omega^7}}(100)\)
Octicutethradekon E100(#^^#^10)^(#^8)100 \(f_{\varphi(10,0)^{\omega^8}}(100)\)
Nonicutethradekon E100(#^^#^10)^(#^9)100 \(f_{\varphi(10,0)^{\omega^9}}(100)\)
Decicutethradekon E100(#^^#^10)^(#^10)100 \(f_{\varphi(10,0)^{\omega^10}}(100)\)
Tethradekon-ipso-godgahlah E100(#^^#^10)^#^#100 \(f_{\varphi(10,0)^{\omega^\omega}}(100)\)
Tethradekon-ipso-tethrathoth E100(#^^#^10)^#^^#100 \(f_{\varphi(10,0)^{\varepsilon_0}}(100)\)
Tethradekon-ipso-tethracross E100(#^^#^10)^#^^##100 \(f_{\varphi(10,0)^{\zeta_0}}(100)\)
Tethradekon-ipso-tethracubor E100(#^^#^10)^#^^###100 \(f_{\varphi(10,0)^{\eta_0}}(100)\)
Tethradekon-ipso-tethrateron E100(#^^#^10)^(#^^#^4)100 \(f_{\varphi(10,0)^{\varphi(4,0)}}(100)\)
Tethradekon-ipso-tethrapeton E100(#^^#^10)^(#^^#^5)100 \(f_{\varphi(10,0)^{\varphi(5,0)}}(100)\)
Tethradekon-ipso-tethrahexon E100(#^^#^10)^(#^^#^6)100 \(f_{\varphi(10,0)^{\varphi(6,0)}}(100)\)
Tethradekon-ipso-tethrahepton E100(#^^#^10)^(#^^#^7)100 \(f_{\varphi(10,0)^{\varphi(7,0)}}(100)\)
Tethradekon-ipso-tethra-ogdon E100(#^^#^10)^(#^^#^8)100 \(f_{\varphi(10,0)^{\varphi(8,0)}}(100)\)
Tethradekon-ipso-tethrennon E100(#^^#^10)^(#^^#^9)100 \(f_{\varphi(10,0)^{\varphi(9,0)}}(100)\)
Dutetrated-tethradekon E100(#^^#^10)^(#^^#^10)100 \(f_{\varphi(10,0)^{\varphi(10,0)}}(100)\)
Giant tethradekon E100(#^^#^10)^(#^^#^10)^#100 \(f_{\varphi(10,0)^{\varphi(10,0)^{\omega}}}(100)\)
Tritetrated tethradekon E100(#^^#^10)^(#^^#^10)^(#^^#^10)100 \(f_{\varphi(10,0)^{\varphi(10,0)^{\varphi(10,0)}}}(100)\)
Super Giant tethradekon E100(#^^#^10)^(#^^#^10)^(#^^#^10)^#100 \(f_{\varphi(10,0)^{\varphi(10,0)^{\varphi(10,0)^{\omega}}}}(100)\)
Quadratetrated tethradekon E100(#^^#^10)^^#4 \(f_{\varepsilon_{\varphi(10,0)+1}[4]}(100)\)
Quinquatetrated tethradekon E100(#^^#^10)^^#5 \(f_{\varepsilon_{\varphi(10,0)+1}[5]}(100)\)
Sexatetrated tethradekon E100(#^^#^10)^^#6 \(f_{\varepsilon_{\varphi(10,0)+1}[6]}(100)\)
Septatetrated tethradekon E100(#^^#^10)^^#7 \(f_{\varepsilon_{\varphi(10,0)+1}[7]}(100)\)
Octatetrated tethradekon E100(#^^#^10)^^#8 \(f_{\varepsilon_{\varphi(10,0)+1}[8]}(100)\)
Nonatetrated tethradekon E100(#^^#^10)^^#9 \(f_{\varepsilon_{\varphi(10,0)+1}[9]}(100)\)
Decatetrated tethradekon E100(#^^#^10)^^#10 \(f_{\varepsilon_{\varphi(10,0)+1}[10]}(100)\)
Terrible tethradekon E100(#^^#^10)^^#100 \(f_{\varepsilon_{\varphi(10,0)+1}}(100)\)
Terrible terrible tethradekon E100((#^^#^10)^^#)^^#100 \(f_{\varepsilon_{\varphi(10,0)+2}}(100)\)
Three-ex-terrible tethradekon E100(((#^^#^10)^^#)^^#)^^#100 \(f_{\varepsilon_{\varphi(10,0)+3}}(100)\)
Four-ex-terrible tethradekon E100((((#^^#^10)^^#)^^#)^^#)^^#100 \(f_{\varepsilon_{\varphi(10,0)+4}}(100)\)
Five-ex-terrible tethradekon E100(#^^#^10)^^#>#5 \(f_{\varepsilon_{\varphi(10,0)+5}}(100)\)
Six-ex-terrible tethradekon E100(#^^#^10)^^#>#6 \(f_{\varepsilon_{\varphi(10,0)+6}}(100)\)
Seven-ex-terrible tethradekon E100(#^^#^10)^^#>#7 \(f_{\varepsilon_{\varphi(10,0)+7}}(100)\)
Eight-ex-terrible tethradekon E100(#^^#^10)^^#>#8 \(f_{\varepsilon_{\varphi(10,0)+8}}(100)\)
Nine-ex-terrible tethradekon E100(#^^#^10)^^#>#9 \(f_{\varepsilon_{\varphi(10,0)+9}}(100)\)
Ten-ex-terrible tethradekon E100(#^^#^10)^^#>#10 \(f_{\varepsilon_{\varphi(10,0)+10}}(100)\)
Territerated tethradekon E100(#^^#^10)^^#>#100 \(f_{\varepsilon_{\varphi(10,0)+\omega}}(100)\)
Godgahlah-turreted-territethradekon E100(#^^#^10)^^#>#^#100 \(f_{\varepsilon_{\varphi(10,0)+\omega^\omega}}(100)\)
Tethrathoth-turreted-territethradekon E100(#^^#^10)^^#>#^^#100 \(f_{\varepsilon_{\varphi(10,0)+\varepsilon_0}}(100)\)
Tethracross-turreted-territethradekon E100(#^^#^10)^^#>#^^##100 \(f_{\varepsilon_{\varphi(10,0)+\zeta_0}}(100)\)
Tethracubor-turreted-territethradekon E100(#^^#^10)^^#>#^^###100 \(f_{\varepsilon_{\varphi(10,0)+\eta_0}}(100)\)
Tethrateron-turreted-territethradekon E100(#^^#^10)^^#>####100 \(f_{\varepsilon_{\varphi(10,0)+\varphi(4,0)}}(100)\)
Tethrapeton-turreted-territethradekon E100(#^^#^10)^^#>(#^^#^5)100 \(f_{\varepsilon_{\varphi(10,0)+\varphi(5,0)}}(100)\)
Tethrahexon-turreted-territethradekon E100(#^^#^10)^^#>(#^^#^6)100 \(f_{\varepsilon_{\varphi(10,0)+\varphi(6,0)}}(100)\)
Tethrahepton-turreted-territethradekon E100(#^^#^10)^^#>(#^^#^7)100 \(f_{\varepsilon_{\varphi(10,0)+\varphi(7,0)}}(100)\)
Tethra-ogdon-turreted-territethradekon E100(#^^#^10)^^#>(#^^#^8)100 \(f_{\varepsilon_{\varphi(10,0)+\varphi(8,0)}}(100)\)
Tethrennon-turreted-territethradekon E100(#^^#^10)^^#>(#^^#^9)100 \(f_{\varepsilon_{\varphi(10,0)+\varphi(9,0)}}(100)\)
Tethradekon-turreted-territethradekon E100(#^^#^10)^^#>(#^^#^10)100 \(f_{\varepsilon_{\varphi(10,0)\times2}}(100)\)
Dustaculated-territethradekon E100(#^^#^10)^^#>(#^^#^10)^^#100 \(f_{\varepsilon_{\varepsilon_{\varphi(10,0)+1}}}(100)\)
Tristaculated-territethradekon E100(#^^#^10)^^#>(#^^#^10)^^#>(#^^#^10)^^#100 \(f_{\varepsilon_{\varepsilon_{\varepsilon_{\varphi(10,0)+1}}}}(100)\)
Tetrastaculated-territethradekon E100(#^^#^10)^^#>(#^^#^10)^^#>(#^^#^10)^^#>(#^^#^10)^^#100 \(f_{\varepsilon_{\varepsilon_{\varepsilon_{\varepsilon_{\varphi(10,0)+1}}}}}(100)\)
Pentastaculated-territethradekon E100(#^^#^10)^^##5 \(f_{\zeta_{\varphi(10,0)+1}[5]}(100)\)
Hexastaculated-territethradekon E100(#^^#^10)^^##6 \(f_{\zeta_{\varphi(10,0)+1}[6]}(100)\)
Heptastaculated-territethradekon E100(#^^#^10)^^##7 \(f_{\zeta_{\varphi(10,0)+1}[7]}(100)\)
Ogdastaculated-territethradekon E100(#^^#^10)^^##8 \(f_{\zeta_{\varphi(10,0)+1}[8]}(100)\)
Ennastaculated-territethradekon E100(#^^#^10)^^##9 \(f_{\zeta_{\varphi(10,0)+1}[9]}(100)\)
Dekastaculated-territethradekon E100(#^^#^10)^^##10 \(f_{\zeta_{\varphi(10,0)+1}[10]}(100)\)
Terrisquared-tethradekon E100(#^^#^10)^^##100 \(f_{\zeta_{\varphi(10,0)+1}}(100)\)
Two-ex-terrisquared-tethradekon E100((#^^#^10)^^##)^^##100 \(f_{\zeta_{\varphi(10,0)+2}}(100)\)
Three-ex-terrisquared-tethradekon E100((#^^#^10)^^##)^^##100 \(f_{\zeta_{\varphi(10,0)+3}}(100)\)
Four-ex-terrisquared-tethradekon E100(((#^^#^10)^^##)^^##)^^##100 \(f_{\zeta_{\varphi(10,0)+4}}(100)\)
Five-ex-terrisquared-tethradekon E100(#^^#^10)^^##>(5)100 \(f_{\zeta_{\varphi(10,0)+5}}(100)\)
Six-ex-terrisquared-tethradekon E100(#^^#^10)^^##>(6)100 \(f_{\zeta_{\varphi(10,0)+6}}(100)\)
Seven-ex-terrisquared-tethradekon E100(#^^#^10)^^##>(7)100 \(f_{\zeta_{\varphi(10,0)+7}}(100)\)
Eight-ex-terrisquared-tethradekon E100(#^^#^10)^^##>(8)100 \(f_{\zeta_{\varphi(10,0)+8}}(100)\)
Nine-ex-terrisquared-tethradekon E100(#^^#^10)^^##>(9)100 \(f_{\zeta_{\varphi(10,0)+9}}(100)\)
Ten-ex-terrisquared-tethradekon E100(#^^#^10)^^##>(10)100 \(f_{\zeta_{\varphi(10,0)+10}}(100)\)
Hundred-ex-terrisquared-tethradekon E100(#^^#^10)^^##>#100 \(f_{\zeta_{\varphi(10,0)+\omega}}(100)\)
Godgahlah-turreted-terrisquared-tethradekon E100(#^^#^10)^^##>#^#100 \(f_{\zeta_{\varphi(10,0)+\omega^\omega}}(100)\)
Tethrathoth-turreted-terrisquared-tethradekon E100(#^^#^10)^^##>#^^#100 \(f_{\zeta_{\varphi(10,0)+\varepsilon_0}}(100)\)
Tethracross-turreted-terrisquared-tethradekon E100(#^^#^10)^^##>#^^##100 \(f_{\zeta_{\varphi(10,0)+\zeta_0}}(100)\)
Tethracubor-turreted-terrisquared-tethradekon E100(#^^#^10)^^##>#^^###100 \(f_{\zeta_{\varphi(10,0)+\eta_0}}(100)\)
Tethrateron-turreted-terrisquared-tethradekon E100(#^^#^10)^^##>#^^####100 \(f_{\zeta_{\varphi(10,0)+\varphi(4,0)}}(100)\)
Tethrapeton-turreted-terrisquared-tethradekon E100(#^^#^10)^^##>(#^^#^5)100 \(f_{\zeta_{\varphi(10,0)+\varphi(5,0)}}(100)\)
Tethrahexon-turreted-terrisquared-tethradekon E100(#^^#^10)^^##>(#^^#^6)100 \(f_{\zeta_{\varphi(10,0)+\varphi(6,0)}}(100)\)
Tethrahepton-turreted-terrisquared-tethradekon E100(#^^#^10)^^##>(#^^#^7)100 \(f_{\zeta_{\varphi(10,0)+\varphi(7,0)}}(100)\)
Tethra-ogdon-turreted-terrisquared-tethradekon E100(#^^#^10)^^##>(#^^#^8)100 \(f_{\zeta_{\varphi(10,0)+\varphi(8,0)}}(100)\)
Tethrennon-turreted-terrisquared-tethradekon E100(#^^#^10)^^##>(#^^#^9)100 \(f_{\zeta_{\varphi(10,0)+\varphi(9,0)}}(100)\)
Tethradekon-turreted-terrisquared-tethradekon E100(#^^#^10)^^##>(#^^#^10)100 \(f_{\zeta_{\varphi(10,0)\times2}}(100)\)
Dustaculated-terrisquared-tethradekon E100(#^^#^10)^^##>(#^^#^10)^^##100 \(f_{\zeta_{\zeta_{\varphi(10,0)+1}}}(100)\)
Tristaculated-terrisquared-tethradekon E100(#^^#^10)^^##>(#^^#^10)^^##>(#^^#^10)^^##100 \(f_{\zeta_{\zeta_{\zeta_{\varphi(10,0)+1}}}}(100)\)
Tetrastaculated-terrisquared-tethradekon E100(#^^#^10)^^##>(#^^#^10)^^##>(#^^#^10)^^##>(#^^#^10)^^##100 \(f_{\zeta_{\zeta_{\zeta_{\zeta_{\varphi(10,0)+1}}}}}(100)\)
Pentastaculated-terrisquared-tethradekon E100(#^^#^10)^^###5 \(f_{\eta_{\varphi(10,0)+1}[5]}(100)\)
Hexastaculated-terrisquared-tethradekon E100(#^^#^10)^^###6 \(f_{\eta_{\varphi(10,0)+1}[6]}(100)\)
Heptastaculated-terrisquared-tethradekon E100(#^^#^10)^^###7 \(f_{\eta_{\varphi(10,0)+1}[7]}(100)\)
Ogdastaculated-terrisquared-tethradekon E100(#^^#^10)^^###8 \(f_{\eta_{\varphi(10,0)+1}[8]}(100)\)
Ennastaculated-terrisquared-tethradekon E100(#^^#^10)^^###9 \(f_{\eta_{\varphi(10,0)+1}[9]}(100)\)
Dekastaculated-terrisquared-tethradekon E100(#^^#^10)^^###10 \(f_{\eta_{\varphi(10,0)+1}[10]}(100)\)
Terricubed-tethradekon E100(#^^#^10)^^###100 \(f_{\eta_{\varphi(10,0)+1}}(100)\)
Two-ex-terricubed-tethradekon E100((#^^#^10)^^###)^^###100 \(f_{\eta_{\varphi(10,0)+2}}(100)\)
Three-ex-terricubed-tethradekon E100(((#^^#^10)^^###)^^###)^^###100 \(f_{\eta_{\varphi(10,0)+3}}(100)\)
Four-ex-terricubed-tethradekon E100(#^^#^10)^^###>(4)100 \(f_{\eta_{\varphi(10,0)+4}}(100)\)
Five-ex-terricubed-tethradekon E100(#^^#^10)^^###>(5)100 \(f_{\eta_{\varphi(10,0)+5}}(100)\)
Six-ex-terricubed-tethradekon E100(#^^#^10)^^###>(6)100 \(f_{\eta_{\varphi(10,0)+6}}(100)\)
Seven-ex-terricubed-tethradekon E100(#^^#^10)^^###>(7)100 \(f_{\eta_{\varphi(10,0)+7}}(100)\)
Eight-ex-terricubed-tethradekon E100(#^^#^10)^^###>(8)100 \(f_{\eta_{\varphi(10,0)+8}}(100)\)
Nine-ex-terricubed-tethradekon E100(#^^#^10)^^###>(9)100 \(f_{\eta_{\varphi(10,0)+9}}(100)\)
Ten-ex-terricubed-tethradekon E100(#^^#^10)^^###>(10)100 \(f_{\eta_{\varphi(10,0)+10}}(100)\)
Hundred-ex-terricubed-tethradekon E100(#^^#^10)^^###>#100 \(f_{\eta_{\varphi(10,0)+\omega}}(100)\)
Godgahlah-turreted-terricubed-tethradekon E100(#^^#^10)^^###>#^#100 \(f_{\eta_{\varphi(10,0)+\omega^\omega}}(100)\)
Tethrathoth-turreted-terricubed-tethradekon E100(#^^#^10)^^###>#^^#100 \(f_{\eta_{\varphi(10,0)+\varepsilon}}(100)\)
Tethracross-turreted-terricubed-tethradekon E100(#^^#^10)^^###>#^^##100 \(f_{\eta_{\varphi(10,0)+\zeta}}(100)\)
Tethracubor-turreted-terricubed-tethradekon E100(#^^#^10)^^###>#^^###100 \(f_{\eta_{\varphi(10,0)+\eta}}(100)\)
Tethrateron-turreted-terricubed-tethradekon E100(#^^#^10)^^###>#^^####100 \(f_{\eta_{\varphi(10,0)+\varphi(4,0)}}(100)\)
Tethrapeton-turreted-terricubed-tethradekon E100(#^^#^10)^^###>(#^^#^5)100 \(f_{\eta_{\varphi(10,0)+\varphi(5,0)}}(100)\)
Tethrahexon-turreted-terricubed-tethradekon E100(#^^#^10)^^###>(#^^#^6)100 \(f_{\eta_{\varphi(10,0)+\varphi(6,0)}}(100)\)
Tethrahepton-turreted-terricubed-tethradekon E100(#^^#^10)^^###>(#^^#^7)100 \(f_{\eta_{\varphi(10,0)+\varphi(7,0)}}(100)\)
Tethra-ogdon-turreted-terricubed-tethradekon E100(#^^#^10)^^###>(#^^#^8)100 \(f_{\eta_{\varphi(10,0)+\varphi(8,0)}}(100)\)
Tethrennon-turreted-terricubed-tethradekon E100(#^^#^10)^^###>(#^^#^9)100 \(f_{\eta_{\varphi(10,0)+\varphi(9,0)}}(100)\)
Tethradekon-turreted-terricubed-tethradekon E100(#^^#^10)^^###>(#^^#^10)100 \(f_{\eta_{\varphi(10,0)\times2}}(100)\)
Dustaculated-terricubed-tethradekon E100(#^^#^10)^^###>(#^^#^10)^^###100 \(f_{\eta_{\eta_{\varphi(10,0)+1}}}(100)\)
Tristaculated-terricubed-tethradekon E100(#^^#^10)^^###>(#^^#^10)^^###>(#^^#^10)^^###100 \(f_{\eta_{\eta_{\eta_{\varphi(10,0)+1}}}}(100)\)
Tetrastaculated-terricubed-tethradekon E100(#^^#^10)^^###>(#^^#^10)^^###>(#^^#^10)^^###>(#^^#^10)^^###100 \(f_{\eta_{\eta_{\eta_{\eta_{\varphi(10,0)+1}}}}}(100)\)
Pentastaculated-terricubed-tethradekon E100(#^^#^10)^^####5 \(f_{\varphi(4, \varphi(10,0)+1)[5]}(100)\)
Hexastaculated-terricubed-tethradekon E100(#^^#^10)^^####6 \(f_{\varphi(4, \varphi(10,0)+1)[6]}(100)\)
Heptastaculated-terricubed-tethradekon E100(#^^#^10)^^####7 \(f_{\varphi(4, \varphi(10,0)+1)[7]}(100)\)
Ogdastaculated-terricubed-tethradekon E100(#^^#^10)^^####8 \(f_{\varphi(4, \varphi(10,0)+1)[8]}(100)\)
Ennastaculated-terricubed-tethradekon E100(#^^#^10)^^####9 \(f_{\varphi(4, \varphi(10,0)+1)[9]}(100)\)
Dekastaculated-terricubed-tethradekon E100(#^^#^10)^^####10 \(f_{\varphi(4, \varphi(10,0)+1)[10]}(100)\)
Territesserated-tethradekon E100(#^^#^10)^^####100 \(f_{\varphi(4, \varphi(10,0)+1)}(100)\)
Two-ex-territesserated-tethradekon E100((#^^#^10)^^####)^^####100 \(f_{\varphi(4, \varphi(10,0)+2)}(100)\)
Three-ex-territesserated-tethradekon E100(((#^^#^10)^^####)^^####)^^####100 \(f_{\varphi(4, \varphi(10,0)+3)}(100)\)
Four-ex-territesserated-tethradekon E100(#^^#^10)^^####>(4)100 \(f_{\varphi(4, \varphi(10,0)+4)}(100)\)
Five-ex-territesserated-tethradekon E100(#^^#^10)^^####>(5)100 \(f_{\varphi(4, \varphi(10,0)+5)}(100)\)
Six-ex-territesserated-tethradekon E100(#^^#^10)^^####>(6)100 \(f_{\varphi(4, \varphi(10,0)+6)}(100)\)
Seven-ex-territesserated-tethradekon E100(#^^#^10)^^####>(7)100 \(f_{\varphi(4, \varphi(10,0)+7)}(100)\)
Eight-ex-territesserated-tethradekon E100(#^^#^10)^^####>(8)100 \(f_{\varphi(4, \varphi(10,0)+8)}(100)\)
Nine-ex-territesserated-tethradekon E100(#^^#^10)^^####>(9)100 \(f_{\varphi(4, \varphi(10,0)+9)}(100)\)
Ten-ex-territesserated-tethradekon E100(#^^#^10)^^####>(10)100 \(f_{\varphi(4, \varphi(10,0)+10)}(100)\)
Hundred-ex-territesserated-tethradekon E100(#^^#^10)^^####>#100 \(f_{\varphi(4, \varphi(10,0)+\omega)}(100)\)
Godgahlah-turreted-territesserated-tethradekon E100(#^^#^10)^^####>#^#100 \(f_{\varphi(4, \varphi(10,0)+\omega^\omega)}(100)\)
Tethrathoth-turreted-territesserated-tethradekon E100(#^^#^10)^^####>#^^#100 \(f_{\varphi(4, \varphi(10,0)+\varepsilon_0)}(100)\)
Tethracross-turreted-territesserated-tethradekon E100(#^^#^10)^^####>#^^##100 \(f_{\varphi(4, \varphi(10,0)+\zeta_0)}(100)\)
Tethracubor-turreted-territesserated-tethradekon E100(#^^#^10)^^####>#^^###100 \(f_{\varphi(4, \varphi(10,0)+\eta_0)}(100)\)
Tethrateron-turreted-territesserated-tethradekon E100(#^^#^10)^^####>#^^####100 \(f_{\varphi(4, \varphi(10,0)+\varphi(4,0))}(100)\)
Tethrapeton-turreted-territesserated-tethradekon E100(#^^#^10)^^####>(#^^#^5)100 \(f_{\varphi(4, \varphi(10,0)+\varphi(5,0))}(100)\)
Tethrahexon-turreted-territesserated-tethradekon E100(#^^#^10)^^####>(#^^#^6)100 \(f_{\varphi(4, \varphi(10,0)+\varphi(6,0))}(100)\)
Tethrahepton-turreted-territesserated-tethradekon E100(#^^#^10)^^####>(#^^#^7)100 \(f_{\varphi(4, \varphi(10,0)+\varphi(7,0))}(100)\)
Tethra-ogdon-turreted-territesserated-tethradekon E100(#^^#^10)^^####>(#^^#^8)100 \(f_{\varphi(4, \varphi(10,0)+\varphi(8,0))}(100)\)
Tethrennon-turreted-territesserated-tethradekon E100(#^^#^10)^^####>(#^^#^9)100 \(f_{\varphi(4, \varphi(10,0)+\varphi(9,0))}(100)\)
Tethradekon-turreted-territesserated-tethradekon E100(#^^#^10)^^####>(#^^#^10)100 \(f_{\varphi(4, \varphi(10,0)\times2)}(100)\)
Dustaculated-territesserated-tethradekon E100(#^^#^10)^^####>(#^^#^10)^^####100 \(f_{\varphi(4, \varphi(4, \varphi(10,0)+1))}(100)\)
Tristaculated-territesserated-tethradekon E100(#^^#^10)^^####>(#^^#^10)^^####>(#^^#^10)^^####100 \(f_{\varphi(4, \varphi(4, \varphi(4, \varphi(10,0)+1)))}(100)\)
Tetrastaculated-territesserated-tethradekon E100(#^^#^10)^^#####4 \(f_{\varphi(5, \varphi(10,0)+1)[4]}(100)\)
Pentastaculated-territesserated-tethradekon E100(#^^#^10)^^#####5 \(f_{\varphi(5, \varphi(10,0)+1)[5]}(100)\)
Hexastaculated-territesserated-tethradekon E100(#^^#^10)^^#####6 \(f_{\varphi(5, \varphi(10,0)+1)[6]}(100)\)
Heptastaculated-territesserated-tethradekon E100(#^^#^10)^^#####7 \(f_{\varphi(5, \varphi(10,0)+1)[7]}(100)\)
Ogdastaculated-territesserated-tethradekon E100(#^^#^10)^^#####8 \(f_{\varphi(5, \varphi(10,0)+1)[8]}(100)\)
Ennastaculated-territesserated-tethradekon E100(#^^#^10)^^#####9 \(f_{\varphi(5, \varphi(10,0)+1)[9]}(100)\)
Dekastaculated-territesserated-tethradekon E100(#^^#^10)^^#####10 \(f_{\varphi(5, \varphi(10,0)+1)[10]}(100)\)
Terripenterated-tethradekon E100((#^^#^10)^^#^5)100 \(f_{\varphi(5, \varphi(10,0)+1)}(100)\)
Two-ex-terripenterated-tethradekon E100(((#^^#^10)^^#^5)^^#^5)100 \(f_{\varphi(5, \varphi(10,0)+2)}(100)\)
Three-ex-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(3)100 \(f_{\varphi(5, \varphi(10,0)+3)}(100)\)
Four-ex-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(4)100 \(f_{\varphi(5, \varphi(10,0)+4)}(100)\)
Five-ex-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(5)100 \(f_{\varphi(5, \varphi(10,0)+5)}(100)\)
Six-ex-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(6)100 \(f_{\varphi(5, \varphi(10,0)+6)}(100)\)
Seven-ex-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(7)100 \(f_{\varphi(5, \varphi(10,0)+7)}(100)\)
Eight-ex-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(8)100 \(f_{\varphi(5, \varphi(10,0)+8)}(100)\)
Nine-ex-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(9)100 \(f_{\varphi(5, \varphi(10,0)+9)}(100)\)
Ten-ex-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(10)100 \(f_{\varphi(5, \varphi(10,0)+10)}(100)\)
Hundred-ex-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>#100 \(f_{\varphi(5, \varphi(10,0)+\omega)}(100)\)
Godgahlah-turreted-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>#^#100 \(f_{\varphi(5, \varphi(10,0)+\omega^\omega)}(100)\)
Tethrathoth-turreted-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>#^^#100 \(f_{\varphi(5, \varphi(10,0)+\varepsilon_0)}(100)\)
Tethracross-turreted-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>#^^##100 \(f_{\varphi(5, \varphi(10,0)+\zeta_0)}(100)\)
Tethracubor-turreted-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>#^^###100 \(f_{\varphi(5, \varphi(10,0)+\eta_0)}(100)\)
Tethrateron-turreted-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>#^^####100 \(f_{\varphi(5, \varphi(10,0)+\varphi(4,0))}(100)\)
Tethrapeton-turreted-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(#^^#^5)100 \(f_{\varphi(5, \varphi(10,0)+\varphi(5,0))}(100)\)
Tethrahexon-turreted-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(#^^#^6)100 \(f_{\varphi(5, \varphi(10,0)+\varphi(6,0))}(100)\)
Tethrahepton-turreted-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(#^^#^7)100 \(f_{\varphi(5, \varphi(10,0)+\varphi(7,0))}(100)\)
Tethra-ogdon-turreted-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(#^^#^8)100 \(f_{\varphi(5, \varphi(10,0)+\varphi(8,0))}(100)\)
Tethrennon-turreted-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(#^^#^9)100 \(f_{\varphi(5, \varphi(10,0)+\varphi(9,0))}(100)\)
Tethradekon-turreted-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(#^^#^10)100 \(f_{\varphi(5, \varphi(10,0)\times2)}(100)\)
Territethradekon-turreted-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(#^^#^10)^^#100 \(f_{\varphi(5, \varepsilon(\varphi(10,0)+1))}(100)\)
Dustaculated-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(#^^#^10)^^(#^5)100 \(f_{\varphi(5, \varphi(5, \varphi(10,0)+1))}(100)\)
Tristaculated-terripenterated-tethradekon E100(#^^#^10)^^(#^5)>(#^^#^10)^^(#^5)>(#^^#^10)^^(#^5)100 \(f_{\varphi(5, \varphi(5, \varphi(5, \varphi(10,0)+1)))}(100)\)
Tetrastaculated-terripenterated-tethradekon E100((#^^#^10)^^#^6)4 \(f_{\varphi(6, \varphi(10,0)+1)[4]}(100)\)
Pentastaculated-terripenterated-tethradekon E100((#^^#^10)^^#^6)5 \(f_{\varphi(6, \varphi(10,0)+1)[5]}(100)\)
Hexastaculated-terripenterated-tethradekon E100((#^^#^10)^^#^6)6 \(f_{\varphi(6, \varphi(10,0)+1)[6]}(100)\)
Heptastaculated-terripenterated-tethradekon E100((#^^#^10)^^#^6)7 \(f_{\varphi(6, \varphi(10,0)+1)[7]}(100)\)
Ogdastaculated-terripenterated-tethradekon E100((#^^#^10)^^#^6)8 \(f_{\varphi(6, \varphi(10,0)+1)[8]}(100)\)
Ennastaculated-terripenterated-tethradekon E100((#^^#^10)^^#^6)9 \(f_{\varphi(6, \varphi(10,0)+1)[9]}(100)\)
Dekastaculated-terripenterated-tethradekon E100((#^^#^10)^^#^6)10 \(f_{\varphi(6, \varphi(10,0)+1)[10]}(100)\)
Terrihexerated-tethradekon E100((#^^#^10)^^#^6)100 \(f_{\varphi(6, \varphi(10,0)+1)}(100)\)
Two-ex-terrihexerated-tethradekon E100(((#^^#^10)^^#^6)^^#^6)100 \(f_{\varphi(6, \varphi(10,0)+2)}(100)\)
Three-ex-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(3)100 \(f_{\varphi(6, \varphi(10,0)+3)}(100)\)
Four-ex-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(4)100 \(f_{\varphi(6, \varphi(10,0)+4)}(100)\)
Five-ex-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(5)100 \(f_{\varphi(6, \varphi(10,0)+5)}(100)\)
Six-ex-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(6)100 \(f_{\varphi(6, \varphi(10,0)+6)}(100)\)
Seven-ex-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(7)100 \(f_{\varphi(6, \varphi(10,0)+7)}(100)\)
Eight-ex-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(8)100 \(f_{\varphi(6, \varphi(10,0)+8)}(100)\)
Nine-ex-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(9)100 \(f_{\varphi(6, \varphi(10,0)+9)}(100)\)
Ten-ex-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(10)100 \(f_{\varphi(6, \varphi(10,0)+10)}(100)\)
Hundred-ex-terrihexerated-tethradekon E100(#^^#^10)^^(#^5)>#100 \(f_{\varphi(6, \varphi(10,0)+\omega)}(100)\)
Godgahlah-turreted-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>#^#100 \(f_{\varphi(6, \varphi(10,0)+\omega^\omega)}(100)\)
Tethrathoth-turreted-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>#^^#100 \(f_{\varphi(6, \varphi(10,0)+\varepsilon_0)}(100)\)
Tethracross-turreted-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>#^^##100 \(f_{\varphi(6, \varphi(10,0)+\zeta_0)}(100)\)
Tethracubor-turreted-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>#^^###100 \(f_{\varphi(6, \varphi(10,0)+\eta_0)}(100)\)
Tethrateron-turreted-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>#^^####100 \(f_{\varphi(6, \varphi(10,0)+\varphi(4,0))}(100)\)
Tethrapeton-turreted-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(#^^#^5)100 \(f_{\varphi(6, \varphi(10,0)+\varphi(5,0))}(100)\)
Tethrahexon-turreted-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(#^^#^6)100 \(f_{\varphi(6, \varphi(10,0)+\varphi(6,0))}(100)\)
Tethrahepton-turreted-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(#^^#^7)100 \(f_{\varphi(6, \varphi(10,0)+\varphi(7,0))}(100)\)
Tethra-ogdon-turreted-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(#^^#^8)100 \(f_{\varphi(6, \varphi(10,0)+\varphi(8,0))}(100)\)
Tethrennon-turreted-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(#^^#^9)100 \(f_{\varphi(6, \varphi(10,0)+\varphi(9,0))}(100)\)
Tethradekon-turreted-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(#^^#^10)100 \(f_{\varphi(6, \varphi(10,0)\times2)}(100)\)
Territethradekon-turreted-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(#^^#^10)^^#100 \(f_{\varphi(6, \varepsilon(\varphi(10,0)+1))}(100)\)
Dustaculated-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(#^^#^10)^^(#^6)100 \(f_{\varphi(6, \varphi(6, \varphi(10,0)+1))}(100)\)
Tristaculated-terrihexerated-tethradekon E100(#^^#^10)^^(#^6)>(#^^#^10)^^(#^6)>(#^^#^10)^^(#^6)100 \(f_{\varphi(6, \varphi(6, \varphi(6, \varphi(10,0)+1)))}(100)\)
Tetrastaculated-terrihexerated-tethradekon E100((#^^#^10)^^#^7)4 \(f_{\varphi(7, \varphi(10,0)+1)[4]}(100)\)
Pentastaculated-terrihexerated-tethradekon E100((#^^#^10)^^#^7)5 \(f_{\varphi(7, \varphi(10,0)+1)[5]}(100)\)
Hexastaculated-terrihexerated-tethradekon E100((#^^#^10)^^#^7)6 \(f_{\varphi(7, \varphi(10,0)+1)[6]}(100)\)
Heptastaculated-terrihexerated-tethradekon E100((#^^#^10)^^#^7)7 \(f_{\varphi(7, \varphi(10,0)+1)[7]}(100)\)
Ogdastaculated-terrihexerated-tethradekon E100((#^^#^10)^^#^7)8 \(f_{\varphi(7, \varphi(10,0)+1)[8]}(100)\)
Ennastaculated-terrihexerated-tethradekon E100((#^^#^10)^^#^7)9 \(f_{\varphi(7, \varphi(10,0)+1)[9]}(100)\)
Dekastaculated-terrihexerated-tethradekon E100((#^^#^10)^^#^7)10 \(f_{\varphi(7, \varphi(10,0)+1)[10]}(100)\)
Terrihepterated-tethradekon E100((#^^#^10)^^#^7)100 \(f_{\varphi(7, \varphi(10,0)+1)}(100)\)
Two-ex-terrihepterated-tethradekon E100(((#^^#^10)^^#^7)^^#^7)100 \(f_{\varphi(7, \varphi(10,0)+2)}(100)\)
Three-ex-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(3)100 \(f_{\varphi(7, \varphi(10,0)+3)}(100)\)
Four-ex-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(4)100 \(f_{\varphi(7, \varphi(10,0)+4)}(100)\)
Five-ex-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(5)100 \(f_{\varphi(7, \varphi(10,0)+5)}(100)\)
Six-ex-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(6)100 \(f_{\varphi(7, \varphi(10,0)+6)}(100)\)
Seven-ex-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(7)100 \(f_{\varphi(7, \varphi(10,0)+7)}(100)\)
Eight-ex-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(8)100 \(f_{\varphi(7, \varphi(10,0)+8)}(100)\)
Nine-ex-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(9)100 \(f_{\varphi(7, \varphi(10,0)+9)}(100)\)
Ten-ex-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(10)100 \(f_{\varphi(7, \varphi(10,0)+10)}(100)\)
Hundred-ex-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>#100 \(f_{\varphi(7, \varphi(10,0)+\omega)}(100)\)
Godgahlah-turreted-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>#^#100 \(f_{\varphi(7, \varphi(10,0)+\omega^\omega)}(100)\)
Tethrathoth-turreted-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>#^^#100 \(f_{\varphi(7, \varphi(10,0)+\varepsilon_0)}(100)\)
Tethracross-turreted-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>#^^##100 \(f_{\varphi(7, \varphi(10,0)+\zeta_0)}(100)\)
Tethracubor-turreted-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>#^^###100 \(f_{\varphi(7, \varphi(10,0)+\eta_0)}(100)\)
Tethrateron-turreted-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>#^^####100 \(f_{\varphi(7, \varphi(10,0)+\varphi(4,0))}(100)\)
Tethrapeton-turreted-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(#^^#^5)100 \(f_{\varphi(7, \varphi(10,0)+\varphi(5,0))}(100)\)
Tethrahexon-turreted-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(#^^#^6)100 \(f_{\varphi(7, \varphi(10,0)+\varphi(6,0))}(100)\)
Tethrahepton-turreted-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(#^^#^7)100 \(f_{\varphi(7, \varphi(10,0)+\varphi(7,0))}(100)\)
Tethra-ogdon-turreted-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(#^^#^8)100 \(f_{\varphi(7, \varphi(10,0)+\varphi(8,0))}(100)\)
Tethrennon-turreted-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(#^^#^9)100 \(f_{\varphi(7, \varphi(10,0)+\varphi(9,0))}(100)\)
Tethradekon-turreted-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(#^^#^10)100 \(f_{\varphi(7, \varphi(10,0)\times2)}(100)\)
Territethradekon-turreted-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(#^^#^10)^^#100 \(f_{\varphi(7, \varepsilon(\varphi(10,0)+1))}(100)\)
Dustaculated-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(#^^#^10)^^(#^7)100 \(f_{\varphi(7, \varphi(7, \varphi(10,0)+1))}(100)\)
Tristaculated-terrihepterated-tethradekon E100(#^^#^10)^^(#^7)>(#^^#^10)^^(#^7)>(#^^#^10)^^(#^7)100 \(f_{\varphi(7, \varphi(7, \varphi(7, \varphi(10,0)+1)))}(100)\)
Tetrastaculated-terrihepterated-tethradekon E100((#^^#^10)^^#^8)4 \(f_{\varphi(8, \varphi(10,0)+1)[4]}(100)\)
Pentastaculated-terrihepterated-tethradekon E100((#^^#^10)^^#^8)5 \(f_{\varphi(8, \varphi(10,0)+1)[5]}(100)\)
Hexastaculated-terrihepterated-tethradekon E100((#^^#^10)^^#^8)6 \(f_{\varphi(8, \varphi(10,0)+1)[6]}(100)\)
Heptastaculated-terrihepterated-tethradekon E100((#^^#^10)^^#^8)7 \(f_{\varphi(8, \varphi(10,0)+1)[7]}(100)\)
Ogdastaculated-terrihepterated-tethradekon E100((#^^#^10)^^#^8)8 \(f_{\varphi(8, \varphi(10,0)+1)[8]}(100)\)
Ennastaculated-terrihepterated-tethradekon E100((#^^#^10)^^#^8)9 \(f_{\varphi(8, \varphi(10,0)+1)[9]}(100)\)
Dekastaculated-terrihepterated-tethradekon E100((#^^#^10)^^#^8)10 \(f_{\varphi(8, \varphi(10,0)+1)[10]}(100)\)
Terriocterated-tethradekon E100((#^^#^10)^^#^8)100 \(f_{\varphi(8, \varphi(10,0)+1)}(100)\)
Two-ex-terriocterated-tethradekon E100(((#^^#^10)^^#^8)^^#^8)100 \(f_{\varphi(8, \varphi(10,0)+2)}(100)\)
Three-ex-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(3)100 \(f_{\varphi(8, \varphi(10,0)+3)}(100)\)
Four-ex-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(4)100 \(f_{\varphi(8, \varphi(10,0)+4)}(100)\)
Five-ex-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(5)100 \(f_{\varphi(8, \varphi(10,0)+5)}(100)\)
Six-ex-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(6)100 \(f_{\varphi(8, \varphi(10,0)+6)}(100)\)
Seven-ex-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(7)100 \(f_{\varphi(8, \varphi(10,0)+7)}(100)\)
Eight-ex-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(8)100 \(f_{\varphi(8, \varphi(10,0)+8)}(100)\)
Nine-ex-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(9)100 \(f_{\varphi(8, \varphi(10,0)+9)}(100)\)
Ten-ex-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(10)100 \(f_{\varphi(8, \varphi(10,0)+10)}(100)\)
Hundred-ex-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>#100 \(f_{\varphi(8, \varphi(10,0)+\omega)}(100)\)
Godgahlah-turreted-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>#^#100 \(f_{\varphi(8, \varphi(10,0)+\omega^\omega)}(100)\)
Tethrathoth-turreted-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>#^^#100 \(f_{\varphi(8, \varphi(10,0)+\varepsilon_0)}(100)\)
Tethracross-turreted-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>#^^##100 \(f_{\varphi(8, \varphi(10,0)+\zeta_0)}(100)\)
Tethracubor-turreted-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>#^^###100 \(f_{\varphi(8, \varphi(10,0)+\eta_0)}(100)\)
Tethrateron-turreted-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>#^^####100 \(f_{\varphi(8, \varphi(10,0)+\varphi(4,0))}(100)\)
Tethrapeton-turreted-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(#^^#^5)100 \(f_{\varphi(8, \varphi(10,0)+\varphi(5,0))}(100)\)
Tethrahexon-turreted-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(#^^#^6)100 \(f_{\varphi(8, \varphi(10,0)+\varphi(6,0))}(100)\)
Tethrahepton-turreted-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(#^^#^7)100 \(f_{\varphi(8, \varphi(10,0)+\varphi(7,0))}(100)\)
Tethra-ogdon-turreted-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(#^^#^8)100 \(f_{\varphi(8, \varphi(10,0)+\varphi(8,0))}(100)\)
Tethrennon-turreted-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(#^^#^9)100 \(f_{\varphi(8, \varphi(10,0)+\varphi(9,0))}(100)\)
Tethradekon-turreted-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(#^^#^10)100 \(f_{\varphi(8, \varphi(10,0)\times2)}(100)\)
Territethradekon-turreted-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(#^^#^10)^^#100 \(f_{\varphi(8, \varepsilon(\varphi(10,0)+1))}(100)\)
Dustaculated-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(#^^#^10)^^(#^8)100 \(f_{\varphi(8, \varphi(8, \varphi(10,0)+1))}(100)\)
Tristaculated-terriocterated-tethradekon E100(#^^#^10)^^(#^8)>(#^^#^10)^^(#^8)>(#^^#^10)^^(#^8)100 \(f_{\varphi(8, \varphi(8, \varphi(8, \varphi(10,0)+1)))}(100)\)
Tetrastaculated-terriocterated-tethradekon E100((#^^#^10)^^#^9)4 \(f_{\varphi(9, \varphi(10,0)+1)[4]}(100)\)
Pentastaculated-terriocterated-tethradekon E100((#^^#^10)^^#^9)5 \(f_{\varphi(9, \varphi(10,0)+1)[5]}(100)\)
Hexastaculated-terriocterated-tethradekon E100((#^^#^10)^^#^9)6 \(f_{\varphi(9, \varphi(10,0)+1)[6]}(100)\)
Heptastaculated-terriocterated-tethradekon E100((#^^#^10)^^#^9)7 \(f_{\varphi(9, \varphi(10,0)+1)[7]}(100)\)
Ogdastaculated-terriocterated-tethradekon E100((#^^#^10)^^#^9)8 \(f_{\varphi(9, \varphi(10,0)+1)[8]}(100)\)
Ennastaculated-terriocterated-tethradekon E100((#^^#^10)^^#^9)9 \(f_{\varphi(9, \varphi(10,0)+1)[9]}(100)\)
Dekastaculated-terriocterated-tethradekon E100((#^^#^10)^^#^9)10 \(f_{\varphi(9, \varphi(10,0)+1)[10]}(100)\)
Terriennerated-tethradekon E100((#^^#^10)^^#^9)100 \(f_{\varphi(9, \varphi(10,0)+1)}(100)\)
Two-ex-terriennerated-tethradekon E100(((#^^#^10)^^#^9)^^#^9)100 \(f_{\varphi(9, \varphi(10,0)+2)}(100)\)
Three-ex-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(3)100 \(f_{\varphi(9, \varphi(10,0)+3)}(100)\)
Four-ex-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(4)100 \(f_{\varphi(9, \varphi(10,0)+4)}(100)\)
Five-ex-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(5)100 \(f_{\varphi(9, \varphi(10,0)+5)}(100)\)
Six-ex-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(6)100 \(f_{\varphi(9, \varphi(10,0)+6)}(100)\)
Seven-ex-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(7)100 \(f_{\varphi(9, \varphi(10,0)+7)}(100)\)
Eight-ex-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(8)100 \(f_{\varphi(9, \varphi(10,0)+8)}(100)\)
Nine-ex-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(9)100 \(f_{\varphi(9, \varphi(10,0)+9)}(100)\)
Ten-ex-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(10)100 \(f_{\varphi(9, \varphi(10,0)+10)}(100)\)
Hundred-ex-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>#100 \(f_{\varphi(9, \varphi(10,0)+\omega)}(100)\)
Godgahlah-turreted-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>#^#100 \(f_{\varphi(9, \varphi(10,0)+\omega^\omega)}(100)\)
Tethrathoth-turreted-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>#^^#100 \(f_{\varphi(9, \varphi(10,0)+\varepsilon_0)}(100)\)
Tethracross-turreted-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>#^^##100 \(f_{\varphi(9, \varphi(10,0)+\zeta_0)}(100)\)
Tethracubor-turreted-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>#^^###100 \(f_{\varphi(9, \varphi(10,0)+\eta_0)}(100)\)
Tethrateron-turreted-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>#^^####100 \(f_{\varphi(9, \varphi(10,0)+\varphi(4,0))}(100)\)
Tethrapeton-turreted-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(#^^#^5)100 \(f_{\varphi(9, \varphi(10,0)+\varphi(5,0))}(100)\)
Tethrahexon-turreted-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(#^^#^6)100 \(f_{\varphi(9, \varphi(10,0)+\varphi(6,0))}(100)\)
Tethrahepton-turreted-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(#^^#^7)100 \(f_{\varphi(9, \varphi(10,0)+\varphi(7,0))}(100)\)
Tethra-ogdon-turreted-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(#^^#^8)100 \(f_{\varphi(9, \varphi(10,0)+\varphi(8,0))}(100)\)
Tethrennon-turreted-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(#^^#^9)100 \(f_{\varphi(9, \varphi(10,0)+\varphi(9,0))}(100)\)
Tethradekon-turreted-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(#^^#^10)100 \(f_{\varphi(9, \varphi(10,0)\times2)}(100)\)
Territethradekon-turreted-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(#^^#^10)^^#100 \(f_{\varphi(9, \varepsilon(\varphi(10,0)+1))}(100)\)
Dustaculated-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(#^^#^10)^^(#^8)100 \(f_{\varphi(9, \varphi(9, \varphi(10,0)+1))}(100)\)
Tristaculated-terriennerated-tethradekon E100(#^^#^10)^^(#^9)>(#^^#^10)^^(#^9)>(#^^#^10)^^(#^9)100 \(f_{\varphi(9, \varphi(9, \varphi(9, \varphi(10,0)+1)))}(100)\)
Tetrastaculated-terriennerated-tethradekon E100((#^^#^10)^^#^10)4 \(f_{\varphi(10, 1)[4]}(100)\)
Pentastaculated-terriennerated-tethradekon E100((#^^#^10)^^#^10)5 \(f_{\varphi(10, 1)[5]}(100)\)
Hexastaculated-terriennerated-tethradekon E100((#^^#^10)^^#^10)6 \(f_{\varphi(10, 1)[6]}(100)\)
Heptastaculated-terriennerated-tethradekon E100((#^^#^10)^^#^10)7 \(f_{\varphi(10, 1)[7]}(100)\)
Ogdastaculated-terriennerated-tethradekon E100((#^^#^10)^^#^10)8 \(f_{\varphi(10, 1)[8]}(100)\)
Ennastaculated-terriennerated-tethradekon E100((#^^#^10)^^#^10)9 \(f_{\varphi(10, 1)[9]}(100)\)
Dekastaculated-terriocterated-tethradekon E100((#^^#^10)^^#^10)10 \(f_{\varphi(10, 1)[10]}(100)\)
Tethradudekon E100((#^^#^10)^^#^10)100 \(f_{\varphi(10, 1)}(100)\)
Tethratridekon E100(((#^^#^10)^^#^10)^^#^10)100 \(f_{\varphi(10, 2)}(100)\)
Tethratetradekon E100((((#^^#^10)^^#^10)^^#^10)^^#^10)100 \(f_{\varphi(10, 3)}(100)\)
Tethrapentadekon E100#^^(#^10)>#5 \(f_{\varphi(10, 4)}(100)\)
Tethrahexadekon E100#^^(#^10)>#6 \(f_{\varphi(10, 5)}(100)\)
Tethraheptadekon E100#^^(#^10)>#7 \(f_{\varphi(10, 6)}(100)\)
Tethra-octadekon E100#^^(#^10)>#8 \(f_{\varphi(10, 7)}(100)\)
Tethra-ennadekon E100#^^(#^10)>#9 \(f_{\varphi(10, 8)}(100)\)
Tethradekadekon E100#^^(#^10)>#10 \(f_{\varphi(10, 9)}(100)\)
Tethra-endekadekon E100#^^(#^10)>#11 \(f_{\varphi(10, 10)}(100)\)
Tethradodekadekon E100#^^(#^10)>#12 \(f_{\varphi(10, 11)}(100)\)
Tethra-icosadekon E100#^^(#^10)>#20 \(f_{\varphi(10, 19)}(100)\)
Tethra-triantadekon E100#^^(#^10)>#30 \(f_{\varphi(10, 29)}(100)\)
Tethra-sarantadekon E100#^^(#^10)>#40 \(f_{\varphi(10, 39)}(100)\)
Tethra-penintadekon E100#^^(#^10)>#50 \(f_{\varphi(10, 49)}(100)\)
Tethra-exintadekon E100#^^(#^10)>#60 \(f_{\varphi(10, 59)}(100)\)
Tethra-ebdomintadekon E100#^^(#^10)>#70 \(f_{\varphi(10, 69)}(100)\)
Tethra-ogdontadekon E100#^^(#^10)>#80 \(f_{\varphi(10, 79)}(100)\)
Tethra-enenintadekon E100#^^(#^10)>#90 \(f_{\varphi(10, 89)}(100)\)
Tethriterdekon E100#^^(#^10)>#100 \(f_{\varphi(10, 99)}(100)\)
Godgahlah-turreted-tethradekon E100#^^(#^10)>#^#100 \(f_{\varphi(10, \omega^\omega)}(100)\)
Tethrathoth-turreted-tethradekon E100#^^(#^10)>#^^#100 \(f_{\varphi(10, \varepsilon_0)}(100)\)
Tethracross-turreted-tethradekon E100#^^(#^10)>#^^##100 \(f_{\varphi(10, \zeta_0)}(100)\)
Tethracubor-turreted-tethradekon E100#^^(#^10)>#^^###100 \(f_{\varphi(10, \eta_0)}(100)\)
Tethrateron-turreted-tethradekon E100#^^(#^10)>#^^####100 \(f_{\varphi(10, \varphi(4,0))}(100)\)
Tethrapeton-turreted-tethradekon E100#^^(#^10)>(#^^#^5)100 \(f_{\varphi(10, \varphi(5,0))}(100)\)
Tethrahexon-turreted-tethradekon E100#^^(#^10)>(#^^#^6)100 \(f_{\varphi(10, \varphi(6,0))}(100)\)
Tethrahepton-turreted-tethradekon E100#^^(#^10)>(#^^#^7)100 \(f_{\varphi(10, \varphi(7,0))}(100)\)
Tethra-ogdon-turreted-tethradekon E100#^^(#^10)>(#^^#^8)100 \(f_{\varphi(10, \varphi(8,0))}(100)\)
Tethrennon-turreted-tethradekon E100#^^(#^10)>(#^^#^9)100 \(f_{\varphi(10, \varphi(9,0))}(100)\)
Dustaculated-tethradekon E100#^^(#^10)>(#^^#^10)100 \(f_{\varphi(10, \varphi(10,0))}(100)\)
Tristaculated-tethradekon E100#^^(#^10)>#^^(#^10)>#^^(#^10)100 \(f_{\varphi(10, \varphi(10,\varphi(10,0)))}(100)\)
Tetrastaculated-tethradekon E100(#^^#^11)4 \(f_{\varphi(11, 0)[4]}(100)\)
Pentastaculated-tethradekon E100(#^^#^11)5 \(f_{\varphi(11, 0)[5]}(100)\)
Hexastaculated-tethradekon E100(#^^#^11)6 \(f_{\varphi(11, 0)[6]}(100)\)
Heptastaculated-tethradekon E100(#^^#^11)7 \(f_{\varphi(11, 0)[7]}(100)\)
Ogdastaculated-tethradekon E100(#^^#^11)8 \(f_{\varphi(11, 0)[8]}(100)\)
Ennastaculated-tethradekon E100(#^^#^11)9 \(f_{\varphi(11, 0)[9]}(100)\)
Dekastaculated-tethradekon E100(#^^#^11)10 \(f_{\varphi(11, 0)[10]}(100)\)
Icosastaculated-tethradekon E100(#^^#^11)20 \(f_{\varphi(11, 0)[20]}(100)\)
Triantastaculated-tethradekon E100(#^^#^11)30 \(f_{\varphi(11, 0)[30]}(100)\)
Sarantastaculated-tethradekon E100(#^^#^11)40 \(f_{\varphi(11, 0)[40]}(100)\)
Penintastaculated-tethradekon E100(#^^#^11)50 \(f_{\varphi(11, 0)[50]}(100)\)
Exintastaculated-tethradekon E100(#^^#^11)60 \(f_{\varphi(11, 0)[60]}(100)\)
Ebdomintastaculated-tethradekon E100(#^^#^11)70 \(f_{\varphi(11, 0)[70]}(100)\)
Ogdontastaculated-tethradekon E100(#^^#^11)80 \(f_{\varphi(11, 0)[80]}(100)\)
Enenintastaculated-tethradekon E100(#^^#^11)90 \(f_{\varphi(11, 0)[90]}(100)\)

Some names of the numbers of this regiment are based on names of other Saibian's numbers, such as:

  • godgahlah (E100#^#100)
  • tethrathoth (E100#^^#100)
  • tethracross (E100#^^##100)
  • tethracubor (E100#^^###100)
  • tethrateron (E100#^^####100)
  • tethrapeton (E100#^^#^#5)
  • tethrahexon (E100#^^#^#6)
  • tethrahepton (E100#^^#^#7)
  • tethra-ogdon (E100#^^#^#8)
  • tethrennon (E100#^^#^#9)

Sources[]

  1. Sbiis Saibian, Extended Cascading-E Numbers Part II - Large Numbers (Accessed 2024-06-11)
Saibian's regiments

Hyper-E regiments: Guppy regiment · Grangol regiment · Greagol regiment · Gigangol regiment · Gorgegol regiment · Gulgol regiment · Gaspgol regiment · Ginorgol regiment · Gargantuul regiment · Googondol regiment
Extended Hyper-E regiments: Gugold regiment · Graatagold regiment · Greegold regiment · Grinningold regiment · Golaagold regiment · Gruelohgold regiment · Gaspgold regiment · Ginorgold regiment · Gargantuuld regiment · Googondold regiment · Gugolthra regiment · Throogol regiment · Tetroogol regiment · Pentoogol regiment · Hexoogol regiment · Heptoogol regiment · Ogdoogol regiment · Entoogol regiment · Dektoogol regiment
Cascading-E regiments: Godgahlah regiment · Gridgahlah regiment · Kubikahlah regiment · Quarticahlah regiment · Quinticahlah regiment · Sexticahlah regiment · Septicahlah regiment · Octicahlah regiment · Nonicahlah regiment · Decicahlah regiment · Godgathor regiment · Gralgathor regiment · Thraelgathor regiment · Terinngathor regiment · Pentaelgathor regiment · Hexaelgathor regiment · Heptaelgathor regiment · Octaelgathor regiment · Ennaelgathor regiment · Dekaelgathor regiment · Godtothol regiment · Godtertol regiment · Godtopol regiment · Godhathor regiment · Godheptol regiment · Godoctol regiment · Godentol regiment · Goddekathol regiment
Extended Cascading-E regiments: Tethrathoth regiment · Monster-Giant regiment · Tethriterator regiment · Tethracross regiment · Tethracubor regiment · Tethrateron regiment · Tethrapeton regiment · Tethrahexon regiment · Tethrahepton regiment · Tethra-ogdon regiment · Tethrennon regiment · Tethradekon regiment · Tethratope regiment · Pentacthulhum regiment · Pentacthulcross regiment · Pentacthulcubor regiment · Pentacthulteron regiment · Pentacthulpeton regiment · Pentacthulhexon regiment · Pentacthulhepton regiment · Pentacthul-ogdon regiment · Pentacthulennon regiment · Pentacthuldekon regiment · Pentacthultope regiment · Hexacthulhum super regiment · Heptacthulhum super regiment · Ogdacthulhum super regiment · Ennacthulhum super regiment · Dekacthulhum super regiment
Beyond...: Blasphemorgulus regiment
Redstonepillager's extensions: Extended Gridgahlah regiment · Tethratopothoth regiment · Godsgodgulus regiment · Blasphemorgulus regiment · Blasphemordeugulus regiment · Ominongulus regiment

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