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Nonitetrom (also called zeraddep, uniphi and uninphi) is equal to \(f_{\omega\uparrow\uparrow9}(10) = f_{\varepsilon_0}(10) = f_{\varphi(1,0)}(10) = f_{\varphi(\varphi(0,0),0)}(10)\) using the fast-growing hierarchy and CNF's fundamental sequences.[1] The term was coined by wiki user Denis Maksudov. The number is comparable to Saibian's dekaelheptol.

Etymology[]

The 3 parts of the name "nonitetrom", "noni", "tetr" and "om", mean 9, tetration and \(\omega\) respectively, which form \(\omega\uparrow\uparrow9\) when concatenated backwards. So the full name indicates the ordinal index of the FGH.

The 3 parts of the name "zeraddep", "zero", "add" and "ep", mean 0, addition and \(\varepsilon_0\) respectively, which form \(\varepsilon_0\) when concatenated backwards. So the full name indicates the ordinal index of the FGH.

The 2 parts of the name "uniphi", "uni" and "phi", mean 1 and \(\varphi\) function respectively, which form \(\varphi(1,0)\) when concatenated backwards. So the full name indicates the ordinal index of the FGH.

The 3 parts of the name "uninphi", "uni", "in" and "phi", mean 1, the "in-" operation and \(\varphi\) function respectively, which form \(\varphi(\varphi(0,0),0)\) (i.e. one more insertion of \(\varphi\)) when concatenated backwards. So the full name indicates the ordinal index of the FGH.

Approximations in other notations[]

Notation Approximation
BEAF \(X \uparrow\uparrow 8 \& 10\)
Bird's array notation \(\{10,10 [1 [1 [1 [1,2] 2] 2] 2] 2\}\)
Hyperfactorial array notation \(10![1,1,2,8]\)
Extended Cascading-E Notation \(\textrm E10\#\text{^^}\#9\)

\(= \textrm{E}10\#\text{^}\#\text{^}\#\text{^}\#\text{^}\#\text{^}\#\text{^}\#\text{^}\#\text{^}\#10\)

Hardy hierarchy \(H_{\omega \uparrow \uparrow 10}(10)\)
Slow-growing hierarchy \(g_{\vartheta(\Omega \uparrow \uparrow 9)}(10)\)

Sources[]

Numbers by Denis Maksudov
Zeralum · Unalum · Balum · Tralum · Quadralum · Quintalum · Sextalum · Septalum · Octalum · Nonalum · Dekalum · Ununalum · Bunalum · Trunalum · Quadrunalum · Quintunalum · Sextunalum · Septunalum · Octunalum · Nonunalum · Zeribalum · Unibalum · Bibalum · Tribalum · Quadribalum · Quintibalum · Sextibalum · Septibalum · Octibalum · Nonibalum · Zeritralum · Unitralum · Bitralum · Tritralum · Quadritralum · Quintitralum · Sextitralum · Septitralum · Octitralum · Nonitralum · Zeriquadralum · Uniquadralum · Biquadralum · Triquadralum · Quadriquadralum · Quintiquadralum · Sextiquadralum · Septiquadralum · Octiquadralum · Noniquadralum · Zeriquintalum · Uniquintalum · Biquintalum · Triquintalum · Quadriquintalum · Quintiquintalum · Sextiquintalum · Septiquintalum · Octiquintalum · Noniquintalum · Zerisextalum · Unisextalum · Bisextalum · Trisextalum · Quadrisextalum · Quintisextalum · Sextisextalum · Septisextalum · Octisextalum · Nonisextalum · Zeriseptalum · Uniseptalum · Biseptalum · Triseptalum · Quadriseptalum · Quintiseptalum · Sextiseptalum · Septiseptalum · Octiseptalum · Noniseptalum · Zeroctalum · Unoctalum · Boctalum · Troctalum · Quadroctalum · Quintoctalum · Sextoctalum · Septoctalum · Octoctalum · Nonoctalum · Zerinonalum · Uninonalum · Binonalum · Trinonalum · Quadrinonalum · Quintinonalum · Sextinonalum · Septinonalum · Octinonalum · Noninonalum · Hektalum · Kilalum · Megalum · Gigalum · Teralum · Petalum · Exalum · Zettalum · Yottalum
Epsilon series
Epsilon(0)-addition series: Zeraddep · Unaddep · Baddep · Traddep · Quadraddep · Quintaddep · Sextaddep · Septaddep · Octaddep · Nonaddep · Dekaddep · Hektaddep · Kiladdep · Megaddep · Gigaddep · Teraddep · Petaddep · Exaddep · Zettaddep · Yottaddep
Epsilon(0)-multiplication series: Bultep · Trultep · Quadrultep · Quintultep · Sextultep · Septultep · Octultep · Nonultep · Dekultep · Hektultep · Kilultep · Megultep · Gigultep · Terultep · Petultep · Exultep · Zettultep · Yottultep
Epsilon(0)-exponentiation series: Bexep · Trexep · Quadrexep · Quintexep · Sextexep · Septexep · Octexep · Nonexep · Dekexep · Hektexep · Kilexep · Megexep · Gigexep · Terexep · Petexep · Exexep · Zettexep · Yottexep
Epsilon(0)-tetration series: Bitetrep · Tritetrep · Quadritetrep · Quintitetrep · Sextitetrep · Septitetrep · Octitetrep · Nonitetrep · Dekotetrep · Hektotetrep · Kilotetrep · Megotetrep · Gigotetrep · Terotetrep · Petotetrep · Exotetrep · Zettotetrep · Yottotetrep
Epsilon(1)-addition series: Unaddunep · Baddunep · Traddunep · Quadraddunep · Quintaddunep · Sextaddunep · Septaddunep · Octaddunep · Nonaddunep · Dekaddunep · Hektaddunep · Kiladdunep · Megaddunep · Gigaddunep · Teraddunep · Petaddunep · Exaddunep · Zettaddunep · Yottaddunep
Inserted epsilon series: Uninep · Binep · Trinep · Quadrinep · Quintinep · Sextinep · Septinep · Octinep · Noninep · Dekinep · Hektinep · Kilinep · Meginep · Giginep · Terinep · Petinep · Exinep · Zettinep · Yottinep
Inserted eta series
Phi series
Initial phi series: Uniphi · Biphi · Triphi · Quadriphi · Quintiphi · Sextiphi · Septiphi · Octiphi · Noniphi · Dekophi · Hektophi · Kilophi · Megophi · Gigophi · Terophi · Petophi · Exophi · Zettophi · Yottophi
Inserted phi series: Uninphi · Binphi · Trinphi · Quadrinphi · Quintinphi · Sextinphi · Septinphi · Octinphi · Noninphi · Dekinphi · Hektinphi · Kilinphi · Meginphi · Giginphi · Terinphi · Petinphi · Exinphi · Zettinphi · Yottinphi
\(I(\alpha,\beta)\) series
Initial \(I(\alpha,\beta)\) series: Unimah · Bimah · Trimah · Quadrimah · Quintimah · Sextimah · Septimah · Octimah · Nonimah · Dekimah · Hektimah · Kilimah · Megimah · Gigimah · Terimah · Petimah · Eximah · Zettimah · Yottimah
Inserted \(I(\alpha,\beta)\) series: Uninimah · Binimah · Trinimah · Quadrinimah · Quintinimah · Sextinimah · Septinimah · Octinimah · Noninimah · Dekinimah · Hektinimah · Kilinimah · Meginimah · Giginimah · Terinimah · Petinimah · Exinimah · Zettinimah · Yottinimah

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