User:Cloudy176/Croutonillion

Add to this page to define croutonillion.

Definition
$$X$$ refers to the result of the previous operation.

$$R_n(x)$$ refers to the output of step $$n$$ starting with $$x$$, and $$R_{n,m}(x)$$ refers to the output of steps $$n$$ though $$m$$ again starting with $$x$$, running in reverse if $$n>m$$.

Start with googoltriplex.

{X,X,X,…,X} with 1 X’s; …; X = {X,X,X,X,…,X} with X-1 X’s. This step is [[ … [[X … ]] ]] with X+8 ’s. X!, X→X→X→X→X, A(X,X), X###$$$, {X,X,X,X}, BH(X), Loader(X), X^2505} X + ψ(ε_(Ω+1)) + ψ(Ω^Ω^Ω^Ω) + ψ(Ω^Ω^X) + φX,X,X,X,X(X) + φ1,0,0(0) + ΓΓΓΓΓΓΓ0·X + ΓΓΓΓΓ0 + ΓΓ0 + ΓX + Γ0^Γ0^Γ0^(ω·41+X+12270) + Γ0^Γ0 + Γ0^ε0^ω + Γ0 + ζ0^ω + ζ0^3312 + ζ0·X + ζ0·ε0 + ζ0 + εεεεε2507 + εε0 + εω + εX + ε1 + ε0 + ω^ω^ω^ω^ω + ω^ω + ω^X + ω^3 + ω·X + ω·252 + ω + X + 167 (X) <!— Add more above this line! -->
 * 1) $$X\uparrow^XX$$
 * 2) $$\text{BB}(X)$$
 * 3) $$\text{megafuga}(\text{booga}(X))$$
 * 4) $$EX\#(10^{27})$$
 * 5) $$X^{\frac12X}$$
 * 6) $$\text{R}^X$$, where $$\text{R}$$ is Rayo's number
 * 7) $$\text{BB}^{=\!\!\!\!\!\!\!\!\;\;\text{Y}}(X)$$, where $$=\!\!\!\!\!\!\!\!\;\text{Y}$$ is the value of Clarkkkkson on January 1, $$10^{100\,000}$$ CE
 * 8) $$f_{\Gamma_0}(X)$$
 * 9) $$E1\#100\#(X+1)$$
 * 10) $$X!^\text{MO}$$, where $$\text{MO}$$ is meameamealokkapoowa oompa
 * 11) $$F(X)$$, where $$F(0)=100$$ and $$F(n)=(10^{F(n-1)})\&10$$
 * 12) $$\text{TREE}^X(X)$$
 * 13) $$\lceil X^\pi\rceil$$
 * 14) $$\{X,X|2\}$$
 * 15) $$\Xi^Y(X)$$, where $$Y$$ is computed with the following steps:
 * 16) Set $$Y=3$$.
 * 17) $$Y\uparrow^Y(Y+2)$$
 * 18) $$f_\beta(Y)$$, where $$\beta$$ is Goucher's ordinal (i.e., the first fixed point of the function $$\alpha\mapsto\omega_\alpha^\text{CK}$$)
 * 19) $$T(Y)$$, where $$T$$ denotes the Torian
 * 20) $$\text{Circle}^{10^{100}}(Y)$$
 * 21) $$E10^\#\#X$$ in Extended Cascading-E Notation
 * 22) * $$R_{15,1}(X)$$
 * 23) $$R_{1,15}(\text{TREE}(X))$$-th apocalyptic number
 * 24) $$R_{1,15}^\text{GB}(X)$$, where $$\text{GB}$$ is the goober bunch
 * 25) $$\{X,7\backslash2\}$$
 * 26) $$X\uparrow^5X$$
 * 27) $$X\uparrow^6X$$
 * 28) $$X\uparrow^7X$$
 * 29) $$X\uparrow^8X$$
 * 30) $$R_{1,15}(X)\uparrow^{R_{1,15}(X)}R_{1,15}(X)$$
 * 31) $$\text{SCG}(\text{TREE}(\text{SCG}(\text{TREE}(\text{SCG}(R_{1,15}(x)+3\&3)+4\&4)+5\&5)+6\&6)+7\&7)+\text{Moser}$$
 * 32) $$E(X)$$, where $$E$$ is the Exploding Tree Function
 * 33) $$\text{Rayo}^{13}(X)$$
 * Create an alternate version of Croutonillion by stopping here (using $$10^{3X+3}$$). Call this number $$C$$.
 * 1) $$\text{BB}_X(C)$$, where $$\text{BB}_n$$ is an order $$n$$ busy beaver function
 * 2) $$X\uparrow^{13}X$$
 * 3) $$X\downarrow^{13}X$$
 * 4) $$X\rightarrow X\rightarrow X\rightarrow X\rightarrow X$$
 * 5) $$\{X,X(1)2\}$$
 * 6) $$X$$$, where $$n$$$ is the superfactorial
 * 7) $$\text{gag}(X)$$
 * 8) $$X^\text{SG}$$, where $$\text{SG}$$ is the super gongulus
 * 9) $$\{X\&L\}_{10,10}$$
 * 10) $$X!$$
 * 11) $$F^X(X)$$, where $$F(n)=H^\text{G}(n)$$ and $$\text{G}$$ is the grangoldex
 * 12) $$R_{15}(X)$$
 * 13) $$\{10,100\underbrace{///\cdots/}_X2\}$$
 * 14) $$R_{1,40}^{142\,857^{1337}}(X)$$
 * 15) $$X\uparrow^\text{MO}(10^{1337})$$, where $$\text{MO}$$ is meameamealokkapoowa oompa
 * 16) $$(10^{10^{10^{100}}})\uparrow^XX$$
 * 17) $$E\underbrace{100\#100\#100\#\cdots\#100}_{10^{100}+2}\#(X+1)$$
 * 18) $$E\underbrace{100\#100\#100\#\cdots\#100}_{10^{100}}\#(X+1)$$
 * 19) $$10^{3X+3}$$
 * 20) $$X\underbrace{\&\&\&\cdots\&}_XX$$
 * 21) $$E100\#^\#X$$
 * 22) $$\text{G}^{\text{G}^X}$$, where $$\text{G}=10^{10^{10^{100}}}$$
 * 23) $$\text{Y}^X$$, where $$\text{Y}$$ is the lynz on May 1, Meameamealokkapoowa-arrowa CE
 * 24) $$F(X)$$, where $$F(0)=0$$ and $$F(n)=E100^\#(^\#\#)100\#(F(n-1)+1)$$
 * 25) $$\text{Rayo}(\text{Rayo}(X)+3)$$
 * 26) $$\text{gag}(X)$$
 * 27) $$\text{BH}(X)$$
 * 28) $$\text{Circle}^2(X)$$ using Friedman's circle theorem
 * 29) $$G(X)$$, where $$G(n)$$ is the length of the Goodstein sequence of $$n$$
 * 30) $$I^{200!}(X)$$, where $$I(n)=10^{3n+3}$$
 * 31) $$BOX\_\widetilde{M}^{X^X}$$
 * 32) $$X^{(\lfloor\pi\cdot10^X\rfloor\bmod10)+1}$$
 * 33) $$\text{Arx}(\underbrace{X,X,X,\ldots,X}_X)$$
 * 34) $$F^X(X)$$, where $$F(X)=f_X(X)$$
 * 35) $$g_X$$
 * 36) $$E(\text{Y})\text{Y}\#\uparrow^X\#^\#\text{Y}$$, where $$\text{Y}=10^{10^{100}}$$
 * 37) $$R_{1,63}^X(X)$$
 * 38) $$R_{1,64}^X(X)$$
 * 39) $$R_{1,65}^X(X)$$
 * 40) $$R_{1,66}^X(X)$$
 * 41) $$R_{1,67}^X(X)$$
 * 42) $$R_{1,68}^X(X)$$
 * 43) $$R_{1,69}^X(X)$$
 * 44) $$R_{1,70}^X(X)$$
 * 45) $$^X10$$
 * 46) $$^{10}X$$
 * 47) $$^XX$$
 * 48) $$\{\{L,X/2\},X\}_{X,X}$$
 * 49) $$X\cdot75^X$$
 * 50) $$g_{64}\cdot X\cdot O(5)$$
 * 51) $$\text{Rayo}(X)$$
 * 52) $$\text{SCG}(\text{SCG}(\text{SCG}(\text{SCG}(X)+10^{100})+10^{10^{100}})+10^{10^{10^{100}}})$$
 * 53) $$\text{TREE}(\text{TREE}(\text{TREE}(\text{TREE}(X)+10^{100})+10^{10^{100}})+10^{10^{10^{100}}})$$
 * 54) $$\text{Rayo}(\text{Rayo}(\text{Rayo}(\text{Rayo}(X)+10^{100})+10^{10^{100}})+10^{10^{10^{100}}})$$
 * 55) $$\Xi(\Xi(\Xi(\Xi(X)+10^{100})+10^{10^{100}})+10^{10^{10^{100}}})$$
 * 56) $$\text{Arx}(\text{Arx}(\text{Arx}(\text{Arx}(X)+10^{100})+10^{10^{100}})+10^{10^{10^{100}}})$$
 * 57) $$\text{BH}(X)$$
 * 58) $$R_{1,84}^{9001}(X)$$
 * 59) $$R_{85}^X(X)$$
 * 60) $$R_{86}^X(X)$$
 * 61) $$R_{87}^X(X)$$
 * 62) $$R_{88}^X(X)$$
 * 63) $$\{X,X(X)X,X\}$$
 * 64) $$(X\uparrow^XX)\&X$$
 * 65) $$1000^{X^{\text{SCG}^{\text{SCG}^{\text{SCG}^{\text{SCG}^{\text{SCG}^X(X)}(X)}(X)}(X)}(X)}}$$
 * 66) $$E100\#^{\#^\#}X$$
 * 67) $$E100^\#\#^\#X$$
 * 68) $$E100\#\uparrow^3\#^\#X$$
 * 69) $$E100\#\uparrow^{16}\#^\#X+X$$
 * 70) $$E100\#\uparrow^5\#^\#X$$
 * 71) $$E100\#\uparrow^6\#^\#X$$
 * 72) $$E100\#\uparrow^7\#^\#X$$
 * 73) $$X\uparrow^{61}X$$
 * 74) $$\text{Arx}(X,X,X,X)$$
 * 75) $$\text{Arx}(X,X,X,X,X)$$
 * 76) $$\frac{1337(10\,000^X-1)}{9999}$$
 * 77) $$X+1$$
 * 78) $$X\underbrace{\&\&\&\cdots\&}_XX$$
 * 79) $$H(X)$$, where $$H$$ is the H function
 * 80) $$H(X)$$, where $$H(n)$$ is the hyperfactorial of $$n$$
 * 81) $$m_1(X)$$
 * 82) $$\text{SCG}^X(X)$$
 * 83) $$X\rightarrow X\rightarrow X\rightarrow X\rightarrow X$$
 * 84) $$cg(X)$$
 * 85) $$C_1(X)$$, where $$C_1$$ is defined here
 * 86) $$\Xi(X)$$
 * 87) $$X!^5$$
 * 88) Least Mersenne prime greater than $$X$$, if one exists. Otherwise, the first number with abundance $$X$$.
 * 89) $$^5X$$
 * 90) $$\{10,100,1,3,3,7,X\}$$
 * 91) $$\{10,100(1337)X\}$$
 * 92) $$F^\text{H}(X)$$, where $$\text{H}$$ is the humongulus and $$F(n)=\text{TREE}^n(n)$$
 * 93) $$\text{Rayo}^{\text{H}+1}(X)$$, where $$\text{H}$$ is the humongulus
 * 94) $$\text{gag}^{\text{H}+2}(X)$$, where $$\text{H}$$ is the humongulus
 * 95) $$P^{\text{H}+3}(X)$$, where $$\text{H}$$ is the humongulus and $$P(n)=n\uparrow^3n$$
 * 96) $$E1\#100\#(X+1)$$
 * Create an alternate version of Croutonillion by stopping here. Call this number $$C_2$$.
 * 1) $$\text{SCG}(\text{SCG}(C_2+X)+X)+X^{C_2}$$
 * 2) $$C_1\cdot C_2\cdot X$$
 * 3) $$X!^X$$
 * 4) $$X\uparrow^3C_1$$
 * 5) $$X\uparrow^{100}1337$$
 * 6) $$\{9001,9001,C_1,X\}$$
 * 7) $$g_X$$
 * 8) $$g_{64}\uparrow^{C_1}X$$
 * 9) $$X^X$$
 * 10) $$X^X$$
 * 11) $$X^X$$
 * 12) $$X\uparrow^{27}X$$
 * 13) $$F^{10^6}(X)$$, where $$F(n)=10^{3n+3}$$
 * 14) $$2^{p_{\pi(\log_2(X))+1}}$$
 * 15) $$\frac{X(\text{P}^{10X}-1)}{\text{P}-1}$$, where $$\text{P}=10^{\lfloor\log_{10}(X)\rfloor+1}$$
 * 16) $$X$^{50}$$
 * 17) $$\text{Rayo}(X)$$
 * 18) $$X![X,[X,[X],X],X]$$ in hyperfactorial array notation
 * 19) $$F^\text{MO}(X)$$, where $$\text{MO}$$ is meameamealokkapoowa oompa and $$F(n)=\{X\&L,X\}_{X,X}$$
 * 20) $$F_{141}^\text{MO}(X)$$, where $$\text{MO}$$ is meameamealokkapoowa oompa, $$F_0(n)=n$$, and $$F_{m+1}(n)=R_{1,m+1}(F_m(n))$$
 * 21) $$F(G^X(X))$$, where $$F(1)=X$$, $$F(n+1)=G^{F(n)}(X)$$, and $$G(n)=n$$$
 * 22) $$g_{g_X}$$
 * 23) $$F_X(X)$$, where $$F_0(n)=R_{1,145}^n(n)$$, $$F_{m+1}(n)=G_m(F_m(n))$$, and $$G_m(n)=F_m^n(n)$$
 * 24) $$\text{A091409}(X)$$, where $\text{A091409}(n)$ is the first position of $$n$$ in Gijswijt's sequence
 * 25) Minimal $$n$$ such that $$\sum_{k=1}^n\frac1k\geq X$$
 * 26) Define the fast-growing-crouton $$C_\alpha(n)$$ as follows:
 * 27) * $$C_0(n) = R_{1,148}(n)$$
 * 28) * $$C_\alpha(n) = C_{\alpha[n]}(n)$$ iff $$\alpha$$ is a limit ordinal
 * 29) * $$C_{\alpha+1}(n) = C_\alpha^n(R_{1,148}^n(n))$$ otherwise
 * 30) * Fundamental sequences are as normal.
 * 31) * Continue with $$C_{\psi_0(\Omega_\omega)}(X)$$
 * 32) $$X\text{-gon}(X)$$
 * 33) $$R_{150}^X(X)$$
 * 34) $$F^X(X)$$, where $$F(n)=G^n(X)$$ and $$G(n)=g_n$$
 * 35) $$X$$$
 * 36) Age of Jonathan Bowers in the year $$X^3$$ CE in Planck times, rounded down (i.e., $$\left\lfloor31\,556\,952\cdot\frac{t_\text{P}}{1\;\text{s}}X^3-62\,167\,195\,440\cdot\frac{t_\text{P}}{1\;\text{s}}\right\rfloor$$)
 * 37) $$X\&\&\&\&\&X$$
 * 38) $$D^5(X)$$, where $$D$$ is defined here
 * 39) $$S(X)$$
 * 40) $$S^X(3)$$
 * 41) $$X+401$$
 * 42) $$X$[U(X)]$$ using the dollar function
 * 43) $$f_6(X^2)$$
 * 44) $$F_{161}^X(X)$$, where $$F_0(n)=n$$ and $$F_{m+1}(n)=R_{1,m+1}(F_m(n))$$
 * 45) $$(X^{100})^{100^X})^{100^{X^X}}$$
 * 46) $$\lfloor^X(10^e)\rfloor$$
 * 47) $$X\uparrow_{\uparrow_{\uparrow,\uparrow},\uparrow}X$$ using Extended Up-Arrow Notation
 * 48) $$X$here
 * 49) $$\sum_{i=1}^X\text{BB}(i)$$
 * 50) $$X^{4\,562\,645\,464\,355\,123\,322\,146\,346\,142\,342\,456}$$
 * 51) $$\sum_{j=1}^X\sum_{i=1}^j\text{BB}(i)$$
 * 52) $$R_{1,169}^{\text{Rayo}(X)}(X)$$
 * 53) $$X![1,[X],2],1$$
 * 54) $$\text{Rayo}(X)$$
 * 55) $$Gen(\underbrace{X,X,X,\ldots,X}_X)$$, where $$Gen$$ is defined here
 * 56) $$X^X$$
 * 57) $$^XX$$
 * 58) $$X\uparrow^3X$$
 * 59) $$X\uparrow^{19}X$$
 * 60) $$X\uparrow^XX$$
 * 61) $$4\&X$$
 * 62) $$X+N$$, where $$N=$$ 1647265547748373872928297383749739473947498598696869983298287329838631983917319821972197281729712891279182972917
 * 63) $$NX$$, where $$N=$$ 2762762746863717391681379173817391781739173917391791839183971308391830813918301837919389183981983719391739189779
 * 64) $$\{X,X[X/2]X\}$$ using BAN
 * 65) $$X^{X+1}$$
 * 66) $$f_{\varepsilon_X+1}(X)$$
 * 67) $$\text{Rayo}^{\text{Rayo}(X)}(\text{Rayo}(X))$$
 * 68) $$F_{185}^\text{H}(X)$$, where $$\text{H}=4\&(\Xi^{\Xi(X)}(\text{BB}_X(X))^{F_7}$[[0]_2])$$, $$F_0(n)=n$$, and $$F_{m+1}(n)=R_{1,m+1}(F_m(n))$$
 * 69) $$F_6^{63}(X)$$, where $$F_6$$ is Fish function 6
 * 70) $$X\underbrace{![X]![X]![X]\cdots![X]}_{X![X]}$$
 * 71) $$4\&(\Xi^{\Xi(X)}(\text{BB}_{X-5}(X))^{F_4}\$[[25\,134\,252\,432]_X])$$
 * 72) $$X^{C_1^{C_2}}$$
 * Create an alternate version of Croutonillion by stopping here. Call this number $$C_3$$.
 * 1) $$C_3![C_2![C_1![X]]]$$
 * 2) $$R_{191}^{^2X}(X)$$
 * 3) $$R_{192}^{^3X}(X)$$
 * 4) $$R_{193}^{^4X}(X)$$
 * 5) $$R_{194}^{^5X}(X)$$
 * 6) $$R_{195}^{^6X}(X)$$
 * 7) $$R_{196}^{^7X}(X)$$
 * 8) $$R_{197}^{^8X}(X)$$
 * 9) $$R_{198}^{^9X}(X)$$
 * 10) $$R_{199}^{^{10}X}(X)$$
 * 11) $$X![1,2,3,\ldots,X]$$
 * 12) $$X$\text{-gon}(X$)$$
 * 13) $$R_{1,202}^\text{GSZ}(X)$$, where $$\text{GSZ}$$ is Grand Sprach Zarathustra, which is defined here
 * 14) $$(X^X)\&X$$
 * 15) $$X\rightarrow X\rightarrow X\rightarrow X$$
 * 16) $$E[X]X\#\#X$$
 * 17) $$E[X]X\#\uparrow^X\#X$$
 * 18) $$E[X]X\#\uparrow^{\#\uparrow^\#\#}\#X$$
 * 19) $$X\rightarrow X\rightarrow X\rightarrow X\rightarrow X$$
 * 20) $$2X\text{-gon}(X)$$
 * 21) $$\text{BB}(X)$$
 * 22) $$\text{Rayo}^X(X)$$
 * 23) $$X+1$$
 * 24) $$2X$$
 * 25) $$X\uparrow X$$
 * 26) $$X\uparrow^XX$$
 * 27) $$X\rightarrow X$$ using this
 * 28) $$\{X,X[1\backslash1\backslash2]X\}$$
 * 29) $$R_{1,218}(X)$$
 * 30) $$R_{1,219}(X)$$
 * 31) $$R_{1,220}(X)$$
 * 32) $$R_{1,221}(X)$$
 * Create an alternate version of Croutonillion by stopping here. Call this number $$C_4$$.
 * 1) $$C_4\uparrow^{C_3\uparrow^{C_2\uparrow^{C_1}C_2}C_3}C_4$$
 * 2) $$F_{F_{F_{F_X(C_1)}(C_2)}(C_3)}(C_4)$$, where $$F_m(n)=n\underbrace{\uparrow_{\uparrow_{\uparrow_{\cdots_\uparrow}}}}_mn$$
 * 3) $$X$$$
 * 4) $$C_4+X$$
 * 5) $$C_3+X$$
 * 6) $$C_2+X$$
 * 7) $$C_1+X$$
 * 8) $$N^X$$, where $$N=$$ 10879813718738138739183827393782839273923391838173018382739284837408482740294827402849284028492849284928492849749
 * 9) $$X^{34}$$
 * 10) $$f_\omega(X)$$
 * 11) $$f_{\Gamma_0}(X)$$
 * 12) $$f_{\theta(\Omega^\omega)}(X)$$
 * 13) $$f_{\theta(\Omega^\Omega)}(X)$$
 * 14) $$f_{\theta(\varepsilon_{\Omega+1})}(X)$$
 * 15) $$f_{\theta(\theta_1(\omega))}(X)$$
 * 16) $$f_{\theta(\theta_1(\Omega))}(X)$$
 * 17) $$f_{\theta(\theta_1(\Omega_2))}(X)$$
 * 18) $$f_{\theta(\theta_I(0))}(X)$$
 * 19) $$f_{\theta(\theta_M(0))}(X)$$
 * 20) $$f_{\theta(\theta_K(0))}(X)$$
 * Create an alternate version of Croutonillion by stopping here. Call this number $$C_5$$.
 * 1) $$\text{GSZ}^{X^{\text{SCG}^{\text{SCG}^{\text{SCG}^{\text{SCG}^{\text{SCG}^X(X)}(X)}(X)}(X)}(X)}}$$, where $$\text{GSZ}$$ is Grand Sprach Zarathustra
 * 2) $$\text{BB}(X)$$
 * 3) $$EX\#(10^{27})$$
 * 4) $$\text{R}^X$$, where $$\text{R}$$ is Rayo's number
 * 5) $$R_{1,246}^{X![X]}(X)$$
 * Create an alternate version of Croutonillion by stopping here. Call this number $$C_6$$.
 * 1) $$C_6+X$$
 * 2) $$C_5+X$$
 * 3) $$C_4+X$$
 * 4) $$C_3+X$$
 * 5) $$C_2+X$$
 * 6) $$C_1+X$$
 * 7) $$N^X$$, where $$N=$$ 198387572576625287753827983872388283729832873298392839283922917391839173918817301838713482987408237422387408137409
 * 8) $$X\uparrow^{34}X$$
 * 9) $$f_\omega(X)$$
 * 10) $$f_{\Gamma_0}(X)$$
 * 11) $$f_{\theta(\Omega^\omega)}(X)$$
 * 12) $$f_{\theta(\Omega^\Omega)}(X)$$
 * 13) $$f_{\theta(\varepsilon_{\Omega+1})}(X)$$
 * 14) $$f_{\theta(\theta_1(\omega))}(X)$$
 * 15) $$f_{\theta(\theta_1(\Omega))}(X)$$
 * 16) $$f_{\theta(\theta_1(\Omega_2))}(X)$$
 * 17) $$f_{\theta(\theta_I(0))}(X)$$
 * 18) $$f_{\theta(\theta_M(0))}(X)$$
 * 19) $$f_{\theta(\theta_K(0))}(X)$$
 * 20) $$F_{266}^{(((X$)!(X$))![(X$)!(X$)])$}(X)$$, where $$F_0(n)=n$$ and $$F_{m+1}(n)=R_{1,m+1}(F_m(n))$$
 * 21) $$F^{(((X$)!(X$))![(X$)!(X$)])$}(R_{267,1}(X))$$, where $$F(n)=R_{267,1}(R_{1,267}(n))$$
 * 22) $$X\%$$ using warp notation
 * 23) $$X\%\%$$
 * 24) $$X\%_2$$
 * 25) $$X\%_\%$$
 * 26) $$X(1)$$
 * 27) $$X(1)_{(1)}$$
 * 28) $$X(2)$$
 * 29) $$X((1))$$
 * 30) $$X(0_1)$$
 * 31) $$X(0_{0_1})$$
 * 32) $$X(0\rightarrow1)$$
 * 33) $$X(0\rightarrow_21)$$
 * 34) $$X(0\rightarrow_{0_1}1)$$
 * 35) $$X(0\rightarrow_{0\rightarrow1}1)$$
 * 36) $$X(0(1)\rightarrow1)$$
 * 37) $$X(0(0\rightarrow1)\rightarrow1)$$
 * 38) $$X\uparrow^{2320}X$$
 * Define $$\text{Rayo}$$ as a fast iteration hierarchy with $${\text{Rayo}}_0(n)=\text{Rayo}(n)$$.
 * 1) $${\text{Rayo}}_0(X)$$
 * 2) $${\text{Rayo}}_\omega(X)$$
 * 3) $${\text{Rayo}}_{\varepsilon_0}(X)$$
 * 4) $${\text{Rayo}}_{\Gamma_0}(X)$$
 * 5) $${\text{Rayo}}_{\theta(\theta_I(0))}(X)$$
 * 6) $${\text{Rayo}}_{\theta(\theta_M(0))}(X)$$
 * 7) $${\text{Rayo}}_{\theta(\theta_K(0))}(X)$$
 * 8) $${\text{Rayo}}_{1,292}^{\{C_1,C_2[C_3]C_4,C_4[C_5[C_5]C_5]C_6,C_6,C_6\}}(X)$$ using BAN
 * 9) $$f_{\Omega^X}(10^{100})$$
 * 10) $$R_{294}^{\{X,X[C_1[C_2[C_3[X]C_4]C_5]C_6]2\}}(X)$$ using BAN
 * 11) $$R_{295}^{X^X}(X)$$
 * 12) $$R_{296}^{^XX}(X)$$
 * 13) $$R_{297}^{X\uparrow^4X}(X)$$
 * 14) $$R_{298}^{X\uparrow^8X}(X)$$
 * 15) $$R_{299}^{X\uparrow^{16}X}(X)$$
 * 16) $$R_{300}^{X\uparrow^{32}X}(X)$$
 * 17) $$X\uparrow^{69}X$$
 * 18) $$\{X,X,X,X,1,2,6,6,5\}$$
 * 19) $$X\rightarrow X\rightarrow X$$
 * 20) $$\text{BB}^X(X)$$
 * 21) $$(((((C_6\&C_5)\&C_4)\&C_3)\&C_2)\&C_1)\&X$$
 * 22) $$E100\{\#,\#,1,1,2\}X$$
 * 23) $$E100\{\#,\#,1,\#\}X$$
 * 24) $$E100\{\#,\#,1,3\}X$$
 * 25) $$E100\{\#,\#,\#,2\}X$$
 * 26) $$E100\{\#,\{\#,\#,1,2\},1,2\}X$$
 * 27) $$E100\{\#,\#+2,1,2\}X$$
 * 28) $$E100\#\cdot(\#\cdot^\#)X$$
 * 29) $$E100\#^2\cdot^\#X$$
 * 30) $$E100\#\cdot^\#X$$
 * 31) $$E100\&(\&(\#))X$$
 * 32) $$E100\&(\#)X$$
 * 33) $$E100\&(1)X$$
 * 34) $$E100\{\#,\#,1,2\}X$$
 * 35) $$E100\#\uparrow^3\#X$$
 * 36) $$E100^{^\#\#}\#X$$
 * 37) $$E100^{\#^2}\#X$$
 * 38) $$E100^\#\#>^\#\#X$$
 * 39) $$E100^\#\#>\#X$$
 * 40) $$E100^\#\#X$$
 * 41) $$E100\#^{\#^\#}X$$
 * 42) $$E100\#^{\#^2}X$$
 * 43) $$E100\#^\#X$$
 * 44) $$E100\#^2X$$
 * 45) $$E100\#X$$
 * 46) $$I^X(10^{100})$$, where $$I(n)=10^{3n+1}$$
 * 47) $$\text{BB}\uparrow^X(X)$$, extending on function exponentiation
 * 48) $$\text{Rayo}\uparrow^X(X)$$
 * 49) $$R_{306}^X(X)$$
 * 50) $$X^\text{A}$$, where $$\text{A}$$ is the Hamming weight of the binary representation of the UTF-8 wikitext of the Wikipedia article "Crouton", revision 589365846 (i.e., 15799)
 * 51) $$X$$$
 * 52) $$X$$@$$X$$
 * 53) $$^X\text{Rayo}(\text{Rayo}(X))$$
 * 54) $$X^N$$, where $$N=$$ 2089787328737273867287387238274927492472983287492749284827429749284928492740284928492849284028492849284927492849
 * 55) $$E[X]100\{\#,\text{GSZ}/2\}N$$, where $$\text{GSZ}$$ is Grand Sprach Zarathustra and $$N=$$ 10012345678909758492715364758699598473939893939
 * 56) $$E[X]100\{\#,\text{GSZ}/2\}N$$, where $$\text{GSZ}$$ is Grand Sprach Zarathustra and $$N=$$ 11234567890987654321746352829282765454738388272
 * 57) $$E[X]100\{\#,\text{GSZ}/2\}N$$, where $$\text{GSZ}$$ is Grand Sprach Zarathustra and $$N=$$ 11234567890987654321234567890847635424242453546
 * 58) $$E[X]100\{\#,\text{GSZ}/2\}N$$, where $$\text{GSZ}$$ is Grand Sprach Zarathustra and $$N=$$ 11234567890987654321234567890987654321848764647
 * 59) $$E[X]100\{\#,\text{GSZ}/2\}N$$, where $$\text{GSZ}$$ is Grand Sprach Zarathustra and $$N=$$ 11234567890987654321234567890987654321234567890
 * 60) $$E[X]100\{\#,\text{GSZ}/2\}N$$, where $$\text{GSZ}$$ is Grand Sprach Zarathustra and $$N=$$ 21234567890987654321234567890987654321234567890
 * 61) $$E[X]100\{\#,\text{GSZ}/2\}N$$, where $$\text{GSZ}$$ is Grand Sprach Zarathustra and $$N=$$ 21234567890987654321234567890987654321234567899
 * 62) $$E[X]100\{\#,\text{GSZ}/2\}N$$, where $$\text{GSZ}$$ is Grand Sprach Zarathustra and $$N=$$ 32123456789098765432123456789098765432123456789
 * 63) $$E[X]100\{\#,\text{GSZ}/2\}N$$, where $$\text{GSZ}$$ is Grand Sprach Zarathustra and $$N=$$ 43212345678909876543211234567890987654432123345
 * 64) $$X\uparrow^{47}N$$, where $$N=$$ 11234567890987654321234567890987654321234567890987654321234567890
 * 65) $$X\uparrow^338$$
 * 66) $$\text{BB}(X)$$
 * 67) $$\text{BB}_2(X)$$
 * 68) $$X$$-ex-grand godgahlahgong
 * 69) $$X$$-ex-horrendous godsgodgulus
 * 70) $$5\&X\&123456789$$
 * 71) $$R_{1,355}^{X![C_1,C_2,C_3,C_4,C_5,C_6]}(X)$$
 * 72) $$R_{1,356}^{X![C_1,C_3,C_4,C_5,C_6,C_2]}(X)$$
 * 73) $$R_{1,357}^{X![C_1,C_4,C_5,C_6,C_2,C_3]}(X)$$
 * 74) $$R_{1,358}^{X![C_1,C_5,C_6,C_2,C_3,C_4]}(X)$$
 * 75) $$R_{1,359}^{X![C_1,C_6,C_2,C_3,C_4,C_5]}(X)$$
 * 76) $$R_{1,360}^{X![C_2,C_3,C_4,C_5,C_6,C_1]}(X)$$
 * 77) $$R_{1,361}^{X![C_2,C_4,C_5,C_6,C_1,C_3]}(X)$$
 * 78) $$R_{1,362}^{X![C_2,C_5,C_6,C_1,C_3,C_4]}(X)$$
 * 79) $$R_{1,363}^{X![C_2,C_6,C_1,C_3,C_4,C_5]}(X)$$
 * 80) $$R_{1,364}^{X![C_2,C_1,C_3,C_4,C_5,C_6]}(X)$$
 * 81) $$R_{1,365}^{X![C_3,C_4,C_5,C_6,C_1,C_2]}(X)$$
 * 82) $$R_{1,366}^{X![C_3,C_5,C_6,C_1,C_2,C_4]}(X)$$
 * 83) $$R_{1,367}^{X![C_3,C_6,C_1,C_2,C_4,C_5]}(X)$$
 * 84) $$R_{1,368}^{X![C_3,C_1,C_2,C_4,C_5,C_6]}(X)$$
 * 85) $$R_{1,369}^{X![C_3,C_2,C_4,C_5,C_6,C_1]}(X)$$
 * 86) $$R_{1,370}^{X![C_4,C_5,C_6,C_1,C_2,C_3]}(X)$$
 * 87) $$R_{1,371}^{X![C_4,C_6,C_1,C_2,C_3,C_5]}(X)$$
 * 88) $$R_{1,372}^{X![C_4,C_1,C_2,C_3,C_5,C_6]}(X)$$
 * 89) $$R_{1,373}^{X![C_4,C_2,C_3,C_5,C_6,C_1]}(X)$$
 * 90) $$R_{1,374}^{X![C_4,C_3,C_5,C_6,C_1,C_2]}(X)$$
 * 91) $$R_{1,375}^{X![C_5,C_6,C_1,C_2,C_3,C_4]}(X)$$
 * 92) $$R_{1,376}^{X![C_5,C_1,C_2,C_3,C_4,C_6]}(X)$$
 * 93) $$R_{1,377}^{X![C_5,C_2,C_3,C_4,C_6,C_1]}(X)$$
 * 94) $$R_{1,378}^{X![C_5,C_3,C_4,C_6,C_1,C_2]}(X)$$
 * 95) $$R_{1,379}^{X![C_5,C_4,C_6,C_1,C_2,C_3]}(X)$$
 * 96) $$R_{1,380}^{X![C_6,C_1,C_2,C_3,C_4,C_5]}(X)$$
 * 97) $$R_{1,381}^{X![C_6,C_2,C_3,C_4,C_5,C_1]}(X)$$
 * 98) $$R_{1,382}^{X![C_6,C_3,C_4,C_5,C_1,C_2]}(X)$$
 * 99) $$R_{1,383}^{X![C_6,C_4,C_5,C_1,C_2,C_3]}(X)$$
 * 100) $$R_{1,384}^{X![C_6,C_5,C_1,C_2,C_3,C_4]}(X)$$
 * Create an alternate version of Croutonillion by stopping here. Call this number C7.
 * 1) C7{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C7
 * 2) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C7]}X
 * 3) X^C7^C6^C5^C4^C3^C2^C1
 * 4) ((((((((((((X$)$)$)$)$.........$)$)$) with X$ copies of $
 * 5) X^^X^^^^^^^^^^^^^^^^^^^^^^^^^^X
 * 6) X^138247384917534214561579428652481278542422422401650237490245107250015481802424042051424340805022642408080461051604040609887376465363737378378388318923787329472983297391379138913891739183917301839182918391839810189189380830189812981309
 * 7) X&&&&&&.......&&&&&&&&&X with  {(3)3[ω^(1+1)+ω^(1+1)+ω^(1)+ω^(1)+1+1]} copy of &
 * 8) repeat step 1-368 then go reverse from step 368-1 ,repeat X*E100{#&#&#&#&#&#&#&#&#&#& ... &#&#&#&#&#&#&#&#&#&#}100w/grand Sprach Zarathustra #s
 * 9) Repeat step 393
 * 10) Repeat step 393 then 394
 * 11) Repeat step 393, 394, then 395
 * 12) X-th item of Gugold series
 * 13) X-th item of Throogol series
 * 14) X-th item of Godgahlah series
 * 15) X-th item of Tethrathoth series
 * 16) Repeat step 1-400 X times.
 * 17) $$X +C1*23+C2*18+C3*14+C4*12+C5*11+C6*10+C7*10$$
 * 18) $$X * {C1}^{23}*{C2}^{18}*{C3}^{14}*{C4}^{10}*{C5}^{11}*C6*C7$$
 * 19) $$X^{{C1}^{23}*{C2}^{18}*{C3}^{14}*{C4}^{10}*{C5}^{11}*C6*C7}$$
 * 20) $$X^{C1^{C1+C2+C3+C4+C5+C6+C7}}$$
 * 21) X$[...[X]...] with X pairs of brackets in dollar function
 * 22) X$[X,X,X...X,X,X] with X X's
 * 23) M(X,X)f(X) where f(n) is the function of the previous steps and M(m,n) is the M(m,n) map
 * 24) Repeat all the steps before this X times
 * 25) the largest number definable in the English language in X symbols that doesn't cause contradictions
 * 26) in A modified FGH Ctheta(K)(X) where in C0(n), you run the steps before this with n as the input. Other rules are the same as the FGH
 * 27) The largest number definable in some KX(X) system. See this page or Oblivion if the link doesn't work
 * 28) Reapeat all the steps before this X times and in reverse X times
 * 29) Repeat step 414 {C7, C6 ,C5,C4,C3,C2,C1} more times where {} means BEAF
 * 30) Repeat step 415 X times then X-yllion times in reverse
 * 31) The largest number definable in C with X symbols that does halt
 * 32) s(X,X,X,X) in Strong array notation
 * 33) s(C1,C2,C3,C4,C5,C6,C7,X)
 * 34) Put all of the ways to order C1-C7 and X in strong array notation in lexicographic order and do all of those steps
 * 35) s(X,X{1}2)
 * 36) s(X,X{1}1{1}2)
 * 37) s(X,X{X}2)
 * 38) s(X,X{C7}1{C6}1{C5}1{C4}1{C3}1{C2}1{C1}2)
 * 39) s(X,X{1{2}2}2)
 * 40) s(X,X{1`2}2)
 * 41) s(X,X{1`1`2}2)
 * 42) s(X,X{X`X`X`X}2)
 * 43) s(X,X{1{1``2`}2}2)
 * 44) s(X,X{1{1{1```2``}2 ` }2}2)
 * 45) s(X,X{1,,1,2}2)
 * 46) s( X,X{1,,1,,2}2)
 * 47) s( X,X{1{1,2,,}2}2)
 * 48) s( X,X{1{1,,,3}2}2)
 * 49) s(X,X{1{1,,,1,2}2}2)
 * 50) s(X,X{1{1,,,1,,,2}2}2)
 * 51) s(X,X{1{1{1,,,,1,2}2}2}2)
 * 52) s(X,X{1{1{1,,,,1,2}2}2}2)
 * 53) s(X,X{1,,,,,,,,,...,,,,,}2) with X commas
 * 54) XR{0,,,, ... ,,,,1} with X commas in a modified R function, where nR0 means you apply the steps before this to n and the other rules remain unchanged
 * 55) Apply the previous step X times
 * 56) X * C
 * 57) X * C1
 * 58) X * C2
 * 59) X * C3
 * 60) X * C4
 * 61) X * C5
 * 62) X * C6
 * 63) X * C7
 * 64) X * (C*C1)
 * 65) X * (C*C2)
 * 66) X * (C*C3)
 * 67) X * (C*C4)
 * 68) X * (C*C5)
 * 69) X * (C*C6)
 * 70) X * (C*C7)
 * 71) X * (C*C1*C2)
 * 72) X * (C*C1*C3)
 * 73) X * (C*C1*C4)
 * 74) X * (C*C1*C5)
 * 75) X * (C*C1*C6)
 * 76) X * (C*C1*C7)
 * 77) X * (C*C1*C2*C3)
 * 78) X * (C*C1*C2*C4)
 * 79) X * (C*C1*C2*C5)
 * 80) X * (C*C1*C2*C6)
 * 81) X * (C*C1*C2*C7)
 * 82) X * (C*C1*C2*C3*C4)
 * 83) X * (C*C1*C2*C3*C5)
 * 84) X * (C*C1*C2*C3*C6)
 * 85) X * (C*C1*C2*C3*C7)
 * 86) X * (C*C1*C2*C3*C4*C5)
 * 87) X * (C*C1*C2*C3*C4*C6)
 * 88) X * (C*C1*C2*C3*C4*C7)
 * 89) X * (C*C1*C2*C3*C4*C5*C6)
 * 90) X * (C*C1*C2*C3*C4*C5*C7)
 * 91) X * (C*C1*C2*C3*C4*C5*C6*C7)
 * 92) X ^ C
 * 93) X ^ C1
 * 94) X ^ C2
 * 95) X ^ C3
 * 96) X ^ C4
 * 97) X ^ C5
 * 98) X ^ C6
 * 99) X ^ C7
 * 100) X ^ (C^C1)
 * 101) X ^ (C^C2)
 * 102) X ^ (C^C3)
 * 103) X ^ (C^C4)
 * 104) X ^ (C^C5)
 * 105) X ^ (C^C6)
 * 106) X ^ (C^C7)
 * 107) X ^ (C^C1^C2)
 * 108) X ^ (C^C1^C3)
 * 109) X ^ (C^C1^C4)
 * 110) X ^ (C^C1^C5)
 * 111) X ^ (C^C1^C6)
 * 112) X ^ (C^C1^C7)
 * 113) X ^ (C^C1^C2^C3)
 * 114) X ^ (C^C1^C2^C4)
 * 115) X ^ (C^C1^C2^C5)
 * 116) X ^ (C^C1^C2^C6)
 * 117) X ^ (C^C1^C2^C7)
 * 118) X ^ (C^C1^C2^C3^C4)
 * 119) X ^ (C^C1^C2^C3^C4^C5)
 * 120) X ^ (C^C1^C2^C3^C4^C6)
 * 121) X ^ (C^C1^C2^C3^C4^C7)
 * 122) X ^ (C^C1^C2^C3^C4^C5^C6)
 * 123) X ^ (C^C1^C2^C3^C4^C5^C7)
 * 124) X ^ (C^C1^C2^C3^C4^C5^C6^C7)
 * 125) X ^ (C+C1+C2+C3+C4+C5+C6+C7)
 * 126) X ^ (C*C1*C2*C3*C4*C5*C6*C7)
 * 127) X ^ (C^C1^C2^C3^C4^C5^C6^C7)$
 * 128) X ^ (C+C1+C2+C3+C4+C5+C6^C7)$
 * 129) X ^ (C*C1*C2*C3*C4*C5*C6*C7)$
 * 130) X^(C1^C2^C3)!
 * 131) X^(C1^C2^C4)!
 * 132) X^(C1^C2^C5)!
 * 133) X^(C1^C2^C6)!
 * 134) X^(C1^C2^C7)!
 * 135) X^(C1^C2^C3^C4)!
 * 136) X^(C1^C2^C3^C5)!
 * 137) X^(C1^C2^C3^C6)!
 * 138) X^(C1^C2^C3^C7)!
 * 139) X^(C1^C2^C3^C4^C5)!
 * 140) X^(C1^C2^C3^C4^C6)!
 * 141) X^(C1^C2^C3^C4^C7)!
 * 142) X^(C1^C2^C3^C4^C5^C6)!
 * 143) X^(C1^C2^C3^C4^C5^C7)!
 * 144) X^(C1^C2^C3^C4^C5^C6^C7)!
 * Create an alternate version of Croutonillion by stopping here. Call this number C8.
 * 1) X![C1,C2,C3,C4,C5,C6,C7,C8]
 * 2) repeat step 1 to 355 X^^^^^^^^^^(X Times ^)^^^^^^^^^^^^^X
 * 3) repeat step 356 to 531 X^^^^^^^^^^(X Times ^)^^^^^^^^^^^^^X
 * 4) repeat step 1 to 532, go reverse from 532 to 1, all for X^C8^C7^C6^C5^C4^C3^C2^C1 times
 * 5) repeat steps 100 to 200
 * 6) repeat steps 200 to 100
 * 7) Do the following steps in order: 1, 2, 1, 3, 1, 2, 1, 4, 1, 2, 1, 3, 1, 2, 1, ... according to the ruler sequence, up to step 535.
 * 8) X&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&X
 * 9) {((X,X)!)![((X,X)!),((X,X)!),....((X,X)!) Times terms ((X,X)!)....((X,X)!),((X,X)!)]}
 * 10) [(X&&&&&&&&&&X)^(X&&&&&&&&&X)]^[(Fish number 7)#$$\text{googolplex} \downarrow\downarrow \text{googolplex}$$]
 * 11) X-acthul-x-on (example: 7-acthul-9-on would be heptacthulennon)
 * {X,X\\\\.....\\\\\X} with {X,X\\\\.....\\\\\X} with {X,X\\\\.....\\\\\X}...[continue X times]... with {X,X\\\\.....\\\\\X} with X^^^X \s
 * 1) E100#****.....*****^^^^^.....^^^^^###.......######100,000,000,000 with X *s, X ^s, and X #s
 * 2) X-icahlah
 * 3) X-ongulus
 * 4) X![XX]
 * 5) X-ee-x-ol
 * 6) X-th prime
 * 7) First odd composite number after X
 * 8) Repeat step 529 and 530 googolplex  googolplex times (X {}'s)
 * 9) $$f_{X}(X)$$
 * Create an alternate version of Croutonillion by stopping here. Call this number C9.
 * 1) C1^C2^^C3^^^C4^^^^C5^^^^^C6^^^^^^C7^^^^^^^C8^^^^^^^^C9^^^^^^^^^X
 * 2) C1^X+C2^X+C3^X+C4^X+C5^X+C6^X+C7^X+C8^X+C9l
 * 3) {X^{E100.000.000.000.000.000.000.000{#&#&#&#&#&#..........((443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) Times # elements)..........#&#&#&#&#&#}$}^{E100.000.000.000.000.000.000.000{#&#&#&#&#&#..........((443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) Times # elements)..........#&#&#&#&#&#}$}^..........{{X^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^(443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) Times {E100.000.000.000.000.000.000.000{#&#&#&#&#&#..........((443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) times # elements)..........#&#&#&#&#&#}$}}..........^{E100.000.000.000.000.000.000.000{#&#&#&#&#&#..........((443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) Times # elements)}$}..........#&#&#&#&#&#}$}E100.000.000.000.000.000.000.000}![C1,C2,C3,C4,C5,C6,C7,C8,C9]
 * 4) Repeat step 1, 1-2, 1-2-3, 1-2-3-4,........, 1-2-3-......-552, 1-2-3......-553, then go in reverse order: step 553, 553-552, 553-552-551,......, 553-552-551-........-3-2-1 for X![X,X,X......(X copies of Xs).....X,X,X] times
 * 5) $$X^{X^{SCG^{SCG^{SCG^{SCG^{SCG^X(X)}(X)}(X)}(X)}(X)}}$$
 * 6) $$X\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C9\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C8\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C7\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C6\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C5\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C4\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C3\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C2\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C1}C2}C3}C4}C5}C6}C7}C8}C9}X$$
 * 7) f^{f^^{f^^^{X}(X)}(X)}(X), where f(n) = n+1.
 * 8) X{X{X{X}X}X}X
 * 9) X^X^X^X^X^X^X
 * 10) X*X*X*X*X*X*X
 * 11) X+X+X+X+X+X+X
 * 12) E100 #*{#,#,1,2}# X
 * 13) X ↑X ↑ ...X ↑ X ↑ X X X... X X w/ the amount of Xs being X  on each side
 * 14) (X^GRAND SPRACH ZARATHUSTRA)#***...***^^^...^^^###...###(X^GRAND SPRACH ZARATHUSTRA) with X *s, X ^s, and X #s
 * 15) (XXXXXXXXXXXXXXXXXXXXXXXXXXXXXX)^E100%100#2)![(grand grand grand grand transmorgrifihgh = E100*(*(*( ... *(*(*(#))) ... )))100 w/grand grand grand transmorgrifihgh *'s),.....((grand grand grand grand transmorgrifihgh = E100*(*(*( ... *(*(*(#))) ... )))100 w/grand grand grand transmorgrifihgh *'s) times (grand grand grand grand transmorgrifihgh = E100*(*(*( ... *(*(*(#))) ... )))100 w/grand grand grand transmorgrifihgh *'s)elements.....,(grand grand grand grand transmorgrifihgh = E100*(*(*( ... *(*(*(#))) ... )))100 w/grand grand grand transmorgrifihgh *'s)]
 * 16) Repeat previous step X Times
 * 17) Repeat previous step X^X Times
 * 18) Repeat previous step X^X^X Times
 * 19) Repeat previous step X^X Times
 * 20) Repeat previous step X Times
 * 21) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1]}X
 * 22) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2]}X
 * 23) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3]}X
 * 24) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4]}X
 * 25) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5]}X
 * 26) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6]}X
 * 27) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7]}X
 * 28) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8]}X
 * 29) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9]}X
 * 30) repeat step 1-579 X Times
 * 31) repeat step 1-580 X Times
 * 32) repeat step 1-581 X Times
 * 33) repeat step 1-582 X Times
 * 34) repeat step 1-583 X Times
 * 35) repeat step 1-584 X Times
 * 36) repeat step 1-585 X Times
 * 37) repeat step 1-586 X Times
 * 38) repeat step 1-587 X Times
 * 39) repeat step 1-588 X Times
 * 40) repeat step 1-589 X Times
 * 41) repeat step 1-590 X Times
 * 42) $$\Xi^{\Xi(X)}(\Sigma_{X-1}(X))^{\text{Fish number 7}}\$[[9876543210123456789]_X]$$bracewah
 * 43) repeat step 1-592 then 592-1 for X%X#X
 * 44) X times e100{#,#(0,1)2}100 according to http://googology.wikia.com/wiki/User:Wythagoras/Extended_Cascading-E_Notation
 * Create an alternate version of Croutonillion by stopping here. Call this number C10.
 * 1) 2048{X}C1{X}C2{X}C3{X}C4{X}C5{X}C6{X}C7{X}C8{X}C9{X}
 * 2) C10^C9^C8^C7^C6^C5^C4^C3^C2^C1^X
 * 3) X-ex-terrible tethrathoth
 * 4) 5^17^257^65537^X
 * 5) X(0->0->11) on Warp Notation
 * 6) X(0[2]1)
 * 7) X(0(X+1)->{X+1})X = X(0(X)->{0(X)->{...0(X)->{0(X)->{1}(X+1)->{X}}{1}( X+1)->{X}...}{1}(X+1)->{X}}{1}(X+1)->{X})/w X nested
 * 8) {X(0(X+1)->{X+1})X}***...***^^^...^^^###...###\\\...\\\///...///{X(0(X+1)->{X+1})X} with {X(0(X+1)->{X+1})X} *'s and ^'s and #'s and \'s and /'s
 * 9) {X(0(X+1)->{X+1})X}%%%%%....%%%%%{X(0(X+1)->{X+1})X} reply of step 568-569
 * 10) {X(0->0->0->1X+1)X}{#&#&#&...{X(0->0->0->1X+1)X} Times #& ...&#&#&#&#}{X(0->0->0->1X+1)X}
 * 11) Repeat step 100, 200, 300, 400,500 and 600 X times
 * 12) X$ [ [0(0,0/0...0/1 1)1]]/w X 0's
 * 13) E100 {#,#(1)2} X
 * 14) E100 {#,#,1,1,2} X
 * 15) E100 {#,#,1,#} X
 * 16) E100 {#,#,1,3} X
 * 17) E100 {#,#,#,2} X
 * 18) E100 {#,{#,#,1,2},1,2} X
 * 19) E100 {#,#+2,1,2} X
 * 20) E100 #*(#*^#)# X
 * 21) E100 #**^# X
 * 22) E100 #*^# X
 * 23) E100 &(&(#)) X
 * 24) E100 &(#) X
 * 25) E100 &(1) Xp
 * 26) E100 {#,#,1,2} X
 * 27) E100 #^^^# X
 * 28) E100 #^^#^^# X
 * 29) E100 #^^## X
 * 30) E100 #^^#>#^^# X
 * 31) E100 #^^#># X
 * 32) E100 #^^# X
 * 33) E100 #^#^# X
 * 34) E100 #^## X
 * 35) E100 #^# X
 * 36) E100 ## X
 * 37) E100 # X
 * EX
 * 1) X*27138617371381631973286329738239273827392739273891839813983928392839283028302830283082302930293029302930930909320!
 * Create an alternate version of Croutonillion by stopping here. Call this number C11.
 * 1) X#783783772638237873927382739273927387329738273927392839273982398239273928392830283928392839283923928323928392839889
 * 2) X+Finaloogol
 * 3) X+C11
 * 4) E100 # ^{1337}X
 * 5) m1(X), normalized fusible margin function
 * 6) TREEX(X)
 * 7) EX###################################################################################X!
 * 8) X%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%81389283028993928302839932989287/8273873287382738273928392839283928398813982983928392839839283928392839283928392839283982392839823982398239283982398398239823928398989898989998999898988989
 * 9) 2987654346374676438643868274286428732864286482748264827827382748724872487284728472874927429982482984X
 * {X,C11 [1[1][1] ... [1] [2]  2] 2}/w C10^C9^C8^C7^C6^C5^C4^C3^C2^C1^X nested
 * 1) EX { #,# [1[1][1] ... [1] [2]   2] 2} C11/w C10^C9^C8^C7^C6^C5^C4^C3^C2^C1^X
 * 2) X^^^^^^^^^B1, where B1 is the binary data of this image interpreted as an integer (Big-endian with the most significant bit first): [[File:Extreme_facepalm.jpg]]
 * 3) X^C1^B1^C2^C11
 * 4) X(1 -> 3 -> 3 ->1337 7)
 * 5) 203^431,112,937#^^^^########^^^^######>#^##(203^431,112,937#^^^^########^^^^######>#^#203,431,112,937#203,431,111,937)
 * 6) 427886755455754365436553765486779887989664221244668€9&980987989798878687979797989798989798979786799887665536646464^X
 * 7) 698376465757839939393948747484858588494849585958^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^X
 * 8) 420{420}X
 * 9) {666,X(1)2}
 * 10) {1337,1337(X,X)1337}
 * 11) {9001,X/2}
 * 12) {L(X),Graham's number}Graham's number, Graham's number
 * 13) 100(100[X]100)
 * 14) 10(100*X)
 * 15) E(10^X)X #^^# G64
 * 16) 10^^^^^X
 * 17) X^^^^^10
 * 18) X^^^^^X
 * 19) C11+C1+X
 * {X, B2, B2}, where B2 is the binary data of the raw wiki code of this page interpreted as an integer (MSB first)
 * 1) repeat step 1-663 for X![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11] times
 * 2) repeat step 1-664 for X![C1,C3,C4,C5,C6,C7,C8,C9,C10,C11,C2] times
 * 3) repeat step 1-665 for X![C1,C4,C5,C6,C7,C8,C9,C10,C11,C2,C3] times
 * 4) repeat step 1-666 for X![C1,C5,C6,C7,C8,C9,C10,C11,C2,C3,C4] times
 * 5) repeat step 1-667 for X![C1,C6,C7,C8,C9,C10,C11,C2,C3,C4,C5] times
 * 6) repeat step 1-668 for X![C1,C7,C8,C9,C10,C11,C2,C3,C4,C5,C6] times
 * 7) repeat step 1-669 for X![C1,C8,C9,C10,C11,C2,C3,C4,C5,C6,C7] times
 * 8) repeat step 1-670 for X![C1,C9,C10,C11,C2,C3,C4,C5,C6,C7,C8] times
 * 9) repeat step 1-671 for X![C1,C10,C11,C2,C3,C4,C5,C6,C7,C8,C9] times
 * 10) repeat step 1-672 for X![C1,C11,C2,C3,C4,C5,C6,C7,C8,C9,C10] times
 * 11) repeat step 1-673 for X![C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C1] times
 * 12) repeat step 1-674 for X![C2,C4,C5,C6,C7,C8,C9,C10,C11,C1,C3] times
 * 13) repeat step 1-675 for X![C2,C5,C6,C7,C8,C9,C10,C11,C1,C3,C4] times
 * 14) repeat step 1-676 for X![C2,C6,C7,C8,C9,C10,C11,C1,C3,C4,C5] times
 * 15) repeat step 1-677 for X![C2,C7,C8,C9,C10,C11,C1,C3,C4,C5,C6] times
 * 16) repeat step 1-678 for X![C2,C8,C9,C10,C11,C1,C3,C4,C5,C6,C7] times
 * 17) repeat step 1-679 for X![C2,C9,C10,C11,C1,C3,C4,C5,C6,C7,C8] times
 * 18) repeat step 1-680 for X![C2,C10,C11,C1,C3,C4,C5,C6,C7,C8,C9] times
 * 19) repeat step 1-681 for X![C2,C11,C1,C3,C4,C5,C6,C7,C8,C9,C10] times
 * 20) repeat step 1-682 for X![C3,C4,C5,C6,C7,C8,C9,C10,C11,C1,C2] times
 * 21) repeat step 1-683 for X![C3,C5,C6,C7,C8,C9,C10,C11,C1,C2,C4] times
 * 22) repeat step 1-684 for X![C3,C6,C7,C8,C9,C10,C11,C1,C2,C4,C5] times
 * 23) repeat step 1-685 for X![C3,C7,C8,C9,C10,C11,C1,C2,C4,C5,C6] times
 * 24) repeat step 1-686 for X![C3,C8,C9,C10,C11,C1,C2,C4,C5,C6,C7] times
 * 25) repeat step 1-687 for X![C3,C9,C10,C11,C1,C2,C4,C5,C6,C7,C8] times
 * 26) repeat step 1-688 for X![C3,C10,C11,C1,C2,C4,C5,C6,C7,C8,C9] times
 * 27) repeat step 1-689 for X![C3,C11,C1,C2,C4,C5,C6,C7,C8,C9,C10] times
 * 28) repeat step 1-690 for X![C4,C5,C6,C7,C8,C9,C10,C11,C1,C2,C3] times
 * 29) repeat step 1-691 for X![C4,C6,C7,C8,C9,C10,C11,C1,C2,C3,C5] times
 * 30) repeat step 1-692 for X![C4,C7,C8,C9,C10,C11,C1,C2,C3,C5,C6] times
 * 31) repeat step 1-693 for X![C4,C8,C9,C10,C11,C1,C2,C3,C5,C6,C7] times
 * 32) repeat step 1-694 for X![C4,C9,C10,C11,C1,C2,C3,C5,C6,C7,C8] times
 * 33) repeat step 1-695 for X![C4,C10,C11,C1,C2,C3,C5,C6,C7,C8,C9] times
 * 34) repeat step 1-696 for X![C4,C11,C1,C2,C3,C5,C6,C7,C8,C9,C10] times
 * 35) repeat step 1-697 for X![C5,C6,C7,C8,C9,C10,C11,C1,C2,C3,C4] times
 * 36) repeat step 1-698 for X![C5,C7,C8,C9,C10,C11,C1,C2,C3,C4,C6] times
 * 37) repeat step 1-699 for X![C5,C8,C9,C10,C11,C1,C2,C3,C4,C6,C7] times
 * 38) repeat step 1-700 for X![C5,C9,C10,C11,C1,C2,C3,C4,C6,C7,C8] times
 * 39) repeat step 1-701 for X![C5,C10,C11,C1,C2,C3,C4,C6,C7,C8,C9] times
 * 40) repeat step 1-702 for X![C5,C11,C1,C2,C3,C4,C6,C7,C8,C9,C10] times
 * 41) repeat step 1-703 for X![C6,C7,C8,C9,C10,C11,C1,C2,C3,C4,C5] times
 * 42) repeat step 1-704 for X![C6,C8,C9,C10,C11,C1,C2,C3,C4,C5,C7] times
 * 43) repeat step 1-705 for X![C6,C9,C10,C11,C1,C2,C3,C4,C5,C7,C8] times
 * 44) repeat step 1-706 for X![C6,C10,C11,C1,C2,C3,C4,C5,C7,C8,C9] times
 * 45) repeat step 1-707 for X![C6,C11,C1,C2,C3,C4,C5,C7,C8,C9,C10] times
 * 46) repeat step 1-708 for X![C7,C8,C9,C10,C11,C1,C2,C3,C4,C5,C6] times
 * 47) repeat step 1-709 for X![C7,C9,C10,C11,C1,C2,C3,C4,C5,C6,C8] times
 * 48) repeat step 1-710 for X![C7,C10,C11,C1,C2,C3,C4,C5,C6,C8,C9] times
 * 49) repeat step 1-711 for X![C7,C11,C1,C2,C3,C4,C5,C6,C8,C9,C10] times
 * 50) repeat step 1-712 for X![C8,C9,C10,C11,C1,C2,C3,C4,C5,C6,C7] times
 * 51) repeat step 1-713 for X![C8,C10,C11,C1,C2,C3,C4,C5,C6,C7,C9] times
 * 52) repeat step 1-714 for X![C8,C11,C1,C2,C3,C4,C5,C6,C7,C9,C10] times
 * 53) repeat step 1-715 for X![C9,C10,C11,C1,C2,C3,C4,C5,C6,C7,C8] times
 * 54) repeat step 1-716 for X![C9,C11,C1,C2,C3,C4,C5,C6,C7,C8,C10] times
 * 55) repeat step 1-717 for X![C10,C11,C1,C2,C3,C4,C5,C6,C7,C8,C9] times
 * 56) repeat step 1-718 for X![C11,C1,C2,C3,C4,C5,C6,C7,C8,C9,C10] times
 * 57) {((X,X)!)![((X,X)!),((X,X)!),....((X,X)!) Times terms ((X,X)!)....((X,X)!),((X,X)!)]}
 * 58) X + C1
 * 59) X + C2
 * 60) X + C3
 * 61) X + C4
 * 62) X + C5
 * 63) X + C6
 * 64) X + C7
 * 65) X + C8
 * 66) X + C9
 * 67) X + C10
 * 68) X + C11
 * 69) X + (C1+C2)
 * 70) X + (C1+C3)
 * 71) X + (C1+C4)
 * 72) X + (C1+C5)
 * 73) X + (C1+C6)
 * 74) X + (C1+C7)
 * 75) X + (C1+C8)
 * 76) X + (C1+C9)
 * 77) X + (C1+C10)
 * 78) X + (C1+C11)
 * 79) X + (C1+C2+C3)
 * 80) X + (C1+C2+C4)
 * 81) X + (C1+C2+C5)
 * 82) X + (C1+C2+C6)
 * 83) X + (C1+C2+C7)
 * 84) X + (C1+C2+C8)
 * 85) X + (C1+C2+C9)
 * 86) X + (C1+C2+C10)
 * 87) X + (C1+C2+C11)
 * 88) X + (C1+C2+C3+C4)
 * 89) X + (C1+C2+C3+C5)
 * 90) X + (C1+C2+C3+C6)
 * 91) X + (C1+C2+C3+C7)
 * 92) X + (C1+C2+C3+C8)
 * 93) X + (C1+C2+C3+C9)
 * 94) X + (C1+C2+C3+C10)
 * 95) X + (C1+C2+C3+C11)
 * 96) X + (C1+C2+C3+C4+C5)
 * 97) X + (C1+C2+C3+C4+C6)
 * 98) X + (C1+C2+C3+C4+C7)
 * 99) X + (C1+C2+C3+C4+C8)
 * 100) X + (C1+C2+C3+C4+C9)
 * 101) X + (C1+C2+C3+C4+C10)
 * 102) X + (C1+C2+C3+C4+C11)
 * 103) X + (C1+C2+C3+C4+C5+C6)
 * 104) X + (C1+C2+C3+C4+C5+C7)
 * 105) X + (C1+C2+C3+C4+C5+C8)
 * 106) X + (C1+C2+C3+C4+C5+C9)
 * 107) X + (C1+C2+C3+C4+C5+C10)
 * 108) X + (C1+C2+C3+C4+C5+C11)
 * 109) X + (C1+C2+C3+C4+C5+C6+C7)
 * 110) X + (C1+C2+C3+C4+C5+C6+C8)
 * 111) X + (C1+C2+C3+C4+C5+C6+C9)
 * 112) X + (C1+C2+C3+C4+C5+C6+C10)
 * 113) X + (C1+C2+C3+C4+C5+C6+C11)
 * 114) X + (C1+C2+C3+C4+C5+C6+C7+C8)
 * 115) X + (C1+C2+C3+C4+C5+C6+C7+C9)
 * 116) X + (C1+C2+C3+C4+C5+C6+C7+C10)
 * 117) X + (C1+C2+C3+C4+C5+C6+C7+C11)
 * 118) X + (C1+C2+C3+C4+C5+C6+C7+C8+C9)
 * 119) X + (C1+C2+C3+C4+C5+C6+C7+C8+C10)
 * 120) X + (C1+C2+C3+C4+C5+C6+C7+C8+C11)
 * 121) X + (C1+C2+C3+C4+C5+C6+C7+C8+C9+C10)
 * 122) X + (C1+C2+C3+C4+C5+C6+C7+C8+C9+C11)
 * 123) X + (C+C2+C3+C4+C5+C6+C7+C8+C9+C10+C11)
 * 124) X * C1
 * 125) X * C2
 * 126) X * C3
 * 127) X * C4
 * 128) X * C5
 * 129) X * C6
 * 130) X * C7
 * 131) X * C8
 * 132) X * C9
 * 133) X * C10
 * 134) X * C11
 * 135) X * (C1*C2)
 * 136) X * (C1*C3)
 * 137) X * (C1*C4)
 * 138) X * (C1*C5)
 * 139) X * (C1*C6)
 * 140) X * (C1*C7)
 * 141) X * (C1*C8)
 * 142) X * (C1*C9)
 * 143) X * (C1*C10)
 * 144) X * (C1*C11)
 * 145) X * (C1*C2*C3)
 * 146) X * (C1*C2*C4)
 * 147) X * (C1*C2*C5)
 * 148) X * (C1*C2*C6)
 * 149) X * (C1*C2*C7)
 * 150) X * (C1*C2*C8)
 * 151) X * (C1*C2*C9)
 * 152) X * (C1*C2*C10)
 * 153) X * (C1*C2*C11)
 * 154) X * (C1*C2*C3*C4)
 * 155) X * (C1*C2*C3*C5)
 * 156) X * (C1*C2*C3*C6)
 * 157) X * (C1*C2*C3*C7)
 * 158) X * (C1*C2*C3*C8)
 * 159) X * (C1*C2*C3*C9)
 * 160) X * (C1*C2*C3*C10)
 * 161) X * (C1*C2*C3*C11)
 * 162) X * (C1*C2*C3*C4*C5)
 * 163) X * (C1*C2*C3*C4*C6)
 * 164) X * (C1*C2*C3*C4*C7)
 * 165) X * (C1*C2*C3*C4*C8)
 * 166) X * (C1*C2*C3*C4*C9)
 * 167) X * (C1*C2*C3*C4*C10)
 * 168) X * (C1*C2*C3*C4*C11)
 * 169) X * (C1*C2*C3*C4*C5*C6)
 * 170) X * (C1*C2*C3*C4*C5*C7)
 * 171) X * (C1*C2*C3*C4*C5*C8)
 * 172) X * (C1*C2*C3*C4*C5*C9)
 * 173) X * (C1*C2*C3*C4*C5*C10)
 * 174) X * (C1*C2*C3*C4*C5*C11)
 * 175) X * (C1*C2*C3*C4*C5*C6*C7)
 * 176) X * (C1*C2*C3*C4*C5*C6*C8)
 * 177) X * (C1*C2*C3*C4*C5*C6*C9)
 * 178) X * (C1*C2*C3*C4*C5*C6*C10)
 * 179) X * (C1*C2*C3*C4*C5*C6*C11)
 * 180) X * (C1*C2*C3*C4*C5*C6*C7*C8)
 * 181) X * (C1*C2*C3*C4*C5*C6*C7*C9)
 * 182) X * (C1*C2*C3*C4*C5*C6*C7*C10)
 * 183) X * (C1*C2*C3*C4*C5*C6*C7*C11)
 * 184) X * (C1*C2*C3*C4*C5*C6*C7*C8*C9)
 * 185) X * (C1*C2*C3*C4*C5*C6*C7*C8*C10)
 * 186) X * (C1*C2*C3*C4*C5*C6*C7*C8*C11)
 * 187) X * (C1*C2*C3*C4*C5*C6*C7*C8*C9*C10)
 * 188) X * (C1*C2*C3*C4*C5*C6*C7*C8*C9*C11)
 * 189) X * (C1*C2*C3*C4*C5*C6*C7*C8*C9*C10*C11)
 * 190) X^C1
 * 191) X^C2
 * 192) X^C3
 * 193) X^C4
 * 194) X^C5
 * 195) X^C6
 * 196) X^C7
 * 197) X^C8
 * 198) X^C9
 * 199) X^C10
 * 200) X^C11
 * 201) X^(C1+C2)
 * 202) X^(C1+C3)
 * 203) X^(C1+C4)
 * 204) X^(C1+C5)
 * 205) X^(C1+C6)
 * 206) X^(C1+C7)
 * 207) X^(C1+C8)
 * 208) X^(C1+C9)
 * 209) X^(C1+C10)
 * 210) X^(C1+C11)
 * 211) X^(C1+C2+C3)
 * 212) X^(C1+C2+C4)
 * 213) X^(C1+C2+C5)
 * 214) X^(C1+C2+C6)
 * 215) X^(C1+C2+C7)
 * 216) X^(C1+C2+C8)
 * 217) X^(C1+C2+C9)
 * 218) X^(C1+C2+C10)
 * 219) x^(C1+C2+C11)
 * 220) X^(C1+C2+C3+C4)
 * 221) X^(C1+C2+C3+C5)
 * 222) X^(C1+C2+C3+C6)
 * 223) X^(C1+C2+C3+C7)
 * 224) X^(C1+C2+C3+C8)
 * 225) X^(C1+C2+C3+C9)
 * 226) X^(C1+C2+C3+C10)
 * 227) X^(C1+C2+C3+C11)
 * 228) X^(C1+C2+C3+C4+C5)
 * 229) X^(C1+C2+C3+C4+C6)
 * 230) X^(C1+C2+C3+C4+C7)
 * 231) X^(C1+C2+C3+C4+C8)
 * 232) X^(C1+C2+C3+C4+C9)
 * 233) X^(C1+C2+C3+C4+C10)
 * 234) X^(C1+C2+C3+C4+C11)
 * 235) X^(C1+C2+C3+C4+C5+C6)
 * 236) X^(C1+C2+C3+C4+C5+C7)
 * 237) X^(C1+C2+C3+C4+C5+C8)
 * 238) X^(C1+C2+C3+C4+C5+C9)
 * 239) X^(C1+C2+C3+C3+C5+C10)
 * 240) X^(C1+C2+C3+C4+C5+C11)
 * 241) X^(C1+C2+C3+C4+C5+C6+C7)
 * 242) X^(C1+C2+C3+C4+C5+C6+C8)
 * 243) X^(C1+C2+C3+C4+C5+C6+C9)
 * 244) X^(C1+C2+C3+C4+C5+C6+C10)
 * 245) X^(C1+C2+C3+C4+C5+C6+C11)
 * 246) X^(C1+C2+C3+C4+C5+C6+C7+C8)
 * 247) X^(C1+C2+C3+C4+C5+C6+C7+C9)
 * 248) X^(C1+C2+C3+C4+C5+C6+C7+C10)
 * 249) X^(C1+C2+C3+C4+C5+C6+C7+C11)
 * 250) X^(C1+C2+C3+C4+C5+C6+C7+C8+C9)
 * 251) X^(C1+C2+C3+C4+C5+C6+C7+C8+C10)
 * 252) X^(C1+C2+C3+C4+C5+C6+C7+C8+C11)
 * 253) X^(C1+C2+C3+C4+C5+C6+C7+C8+C9+C10)
 * 254) X^(C1+C2+C3+C4+C5+C6+C7+C8+C9+C11)
 * 255) X^(C1+C2+C3+C4+C5+C6+C7+C8+C9+C10+C11)
 * 256) X^(C1*C1)
 * 257) X^(C1*C2)
 * 258) X^(C1*C3)
 * 259) X^(C1*C4)
 * 260) X^(C1*C5)
 * 261) X^(C1*C6)
 * 262) X^(C1*C7)
 * 263) X^(C1*C8)
 * 264) X^(C1*C9)
 * 265) X^(C1*C10)
 * 266) X^(C1*C11)
 * 267) X^(C1*C2*C3)
 * 268) X^(C1*C2*C4)
 * 269) X^(C1*C2*C5)
 * 270) X^(C1*C2*C6)
 * 271) X^(C1*C2*C7)
 * 272) X^(C1*C2*C8)
 * 273) X^(C1*C2*C9)
 * 274) X^(C1*C2*C10)
 * 275) X^(C1*C2*C11)
 * 276) X^(C1*C2*C3*C4)
 * 277) X^(C1*C2*C3*C5)
 * 278) X^(C1*C2*C3*C6)
 * 279) X^(C1*C2*C3*C7)
 * 280) X^(C1*C2*C3*C8)
 * 281) X^(C1*C2*C3*C9)
 * 282) X^(C1*C2*C3*C10)
 * 283) X^(C1*C2*C3*C11)
 * 284) X^(C1*C2*C3*C4*C5)
 * 285) X^(C1*C2*C3*C4*C6)
 * 286) X^(C1*C2*C3*C4*C7)
 * 287) X^(C1*C2*C3*C4*C8)
 * 288) X^(C1*C2*C3*C4*C9)
 * 289) X^(C1*C2*C3*C4*C10)
 * 290) X^(C1*C2*C3*C4*C11)
 * 291) X^(C1*C2*C3*C4*C5*C6)
 * 292) X^(C1*C2*C3*C4*C5*C7)
 * 293) X^(C1*C2*C3*C4*C5*C8)
 * 294) X^(C1*C2*C3*C4*C5*C9)
 * 295) X^(C1*C2*C3*C4*C5*C10)
 * 296) X^(C1*C2*C3*C4*C5*C11)
 * 297) X^(C1*C2*C3*C4*C5*C6*C7)
 * 298) X^(C1*C2*C3*C4*C5*C6*C8)
 * 299) X^(C1*C2*C3*C4*C5*C6*C9)
 * 300) X^(C1*C2*C3*C4*C5*C6*C10)
 * 301) X^(C1*C2*C3*C4*C5*C6*C11)
 * 302) X^(C1*C2*C3*C4*C5*C6*C7*C8)
 * 303) X^(C1*C2*C3*C4*C5*C6*C7*C9)
 * 304) X^(C1*C2*C3*C4*C5*C6*C7*C10)
 * 305) X^(C1*C2*C3*C4*C5*C6*C7*C11)
 * 306) X^(C1*C2*C3*C4*C5*C6*C7*C8*C9)
 * 307) X^(C1*C2*C3*C4*C5*C6*C7*C8*C10)
 * 308) X^(C1*C2*C3*C4*C5*C6*C7*C8*C11)
 * 309) X^(C1*C2*C3*C4*C5*C6*C7*C8*C9*C10)
 * 310) X^(C1*C2*C3*C4*C5*C6*C7*C8*C9*C11)
 * 311) X^(C1*C2*C3*C4*C5*C6*C7*C8*C9*C10*C11)
 * 312) X^(C1^C1)
 * 313) X^(C1^C2)
 * 314) X^(C1^C3)
 * 315) X^(C1^C4)
 * 316) X^(C1^C5)
 * 317) X^(C1^C6)
 * 318) X^(C1^C7)
 * 319) X^(C1^C8)
 * 320) X^(C1^C9)
 * 321) X^(C1^C10)
 * 322) X^(C1^C11)
 * 323) X^(C1^C2^C3)
 * 324) X^(C1^C2^C4)
 * 325) X^(C1^C2^C5)
 * 326) X^(C1^C2^C6)
 * 327) X^(C1^C2^C7)
 * 328) X^(C1^C2^C8)
 * 329) X^(C1^C2^C9)
 * 330) X^(C1^C2^C10)
 * 331) X^(C1^C2^C11)
 * 332) X^(C1^C2^C3^C4)
 * 333) X^(C1^C2^C3^C5)
 * 334) X^(C1^C2^C3^C6)
 * 335) X^(C1^C2^C3^C7)
 * 336) X^(C1^C2^C3^C8)
 * 337) X^(C1^C2^C3^C9)
 * 338) X^(C1^C2^C3^C10)
 * 339) X^(C1^C2^C3^C11)
 * 340) X^(C1^C2^C3^C4^C5)
 * 341) X^(C1^C2^C3^C4^C6)
 * 342) X^(C1^C2^C3^C4^C7)
 * 343) X^(C1^C2^C3^C4^C8)
 * 344) X^(C1^C2^C3^C4^C9)
 * 345) X^(C1^C2^C3^C4^C10)
 * 346) X^(C1^C2^C3^C4^C11)
 * 347) X^(C1^C2^C3^C4^C5^C6)
 * 348) X^(C1^C2^C3^C4^C5^C7)
 * 349) X^(C1^C2^C3^C4^C5^C8)
 * 350) X^(C1^C2^C3^C4^C5^C9)
 * 351) X^(C1^C2^C3^C4^C5^C10)
 * 352) X^(C1^C2^C3^C4^C5^C11)
 * 353) X^(C1^C2^C3^C4^C5^C6^C7)
 * 354) X^(C1^C2^C3^C4^C5^C6^C8)
 * 355) X^(C1^C2^C3^C4^C5^C6^C9)
 * 356) X^(C1^C2^C3^C4^C5^C6^C10)
 * 357) X^(C1^C2^C3^C4^C5^C6^C11)
 * 358) X^(C1^C2^C3^C4^C5^C6^C7^C8)
 * 359) X^(C1^C2^C3^C4^C5^C6^C7^C9)
 * 360) X^(C1^C2^C3^C4^C5^C6^C7^C10)
 * 361) X^(C1^C2^C3^C4^C5^C6^C7^C11)
 * 362) X^(C1^C2^C3^C4^C5^C6^C7^C8^C9)
 * 363) X^(C1^C2^C3^C4^C5^C6^C7^C8^C10)
 * 364) X^(C1^C2^C3^C4^C5^C6^C7^C8^C11)
 * 365) X^(C1^C2^C3^C4^C5^C6^C7^C8^C9^C10)
 * 366) X^(C1^C2^C3^C4^C5^C6^C7^C8^C9^C11)
 * 367) X^(C1^C2^C3^C4^C5^C6^C7^C8^C9^C10^C11)
 * Create an alternate version of Croutonillion by stopping here. Call this number C12.
 * 1) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1]}X
 * 2) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2]}X
 * 3) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3]}X
 * 4) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4]}X
 * 5) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5]}X
 * 6) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6]}X
 * 7) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7]}X
 * 8) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8]}X
 * 9) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9]}X
 * 10) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10]}X
 * 11) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11]}X
 * 12) X{(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12]}X
 * 13) 9876543210123456789{X}C1{X}C2{X}C3{X}C4{X}C5{X}C6{X}C7{X}C8{X}C9{X}C10{X}C11{X}C12{X}
 * 14) C12^C11^C10^C9^C8^C7^C6^C5^C4^C3^C2^C1^X
 * 15) X^C1^C2^C3^C4^C5^C6^C7^C8^C9^C10^C11^C12
 * 16) {X(0(X+1)->{X+1})X}%%%%%....%%%%%{X(0(X+1)->{X+1})X} reply of step 1,1-2,1-2-3,1-2-....-1043-1044,1-2-...-1044-1045
 * 17) {X(0(X+1)->{X+1})X}%%%%%....%%%%%{X(0(X+1)->{X+1})X} reply of step 1046,1046-1045,1046-1045-1044,.......,1046-1045-1044-....-3-2-1.
 * 18) X^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^B1
 * 19) X&&&X
 * 20) X!!!!!!!!!!!!!!!!!! (multifactorial)
 * 21) X!!!!!!!!!!!!!!!!!! (nested factorial)
 * 22) !!!!!!!!!!!X (nested subfactorial)
 * 23) TREE(TREE(X))
 * 24) X^BB(Rayo(Xi(X)))
 * 25) X^(103*10 3*10 3*10 3*10 3*10 3*10 3*10 3000000      +3 )
 * 26) X^(E100#####100)
 * 27) X^{10,10 (100) 2}2
 * 28) X^{10,10 (100) 2}3
 * 29) X^{10,10 (100) 2}gongulus
 * 30) X^X + C12 - repeat this step [25*8+12/12]!^123 times
 * 31) X^(104)
 * 32) X^(685410196625)
 * 33) X^(745627189362583526)
 * 34) X^(314151617181912921222324252627)
 * 35) X^(103*10 3*10 90+3 +3 )
 * 36) X^(103*10 3*10 93+3 +3 )
 * 37) X^(1010 10 100-1 -1 -1)
 * 38) X![{10,10 (100) 2}2]
 * 39) X![{10,10 (100) 2}3]
 * 40) X![{10,10 (100) 2}gongulus]
 * 41) (X#{10,10 (100) 2}2)#######......(X#{10,10 (100) 2}3 times #)......######(X#{10,10 (100) 2}gongulus)
 * 42) X^^^^^^^^(X^4)
 * 43) 1234218492548476396739648483215434254518184155243664758217545266434286615357616487456487665798786078789686188068779898515526023615566485866408897512853491356X
 * 44) X^^^^^^DRESSING27 (base 27 with A = 1, B = 2, etc.)
 * 45) X^^^^^^^^LETTUCE27 (same)
 * {X, X (TOMATOES27) 2} (same)
 * {X, X (CROUTONS27) 3} (same)
 * {X, X, X, X, (0, DRESSING27) 5} (same)
 * 1) X![X,X,X,X,......X^(E100*(*(*( ... *(*(*(#))) ... )))100 w/grand grand grand transmorgrifihgh *'s)...,X,X,X,X)
 * 2) X%(616^666 {{ #,#,#,#,#,#}&#&#}666)
 * 3) repeat step 1,1-2,1-2-3,....,1-2-3-.....-1079-1080, go back in reverse order from 1080,1079-1078,1080-1079-1078,......,1080-1079-1078-........-3,2-1, repeat this process for {(X$)^{L&L...L&L100,10}10,10 (L L's)}!{X, X, X, X,.....((E100{#,#(1)2}44,435,622#2) copies of X...., X, X, X} times
 * 4) $$C12\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C11\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C10\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C9\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C8\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C7\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C6\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C5\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C4\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C3\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C2\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C1\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{X}C1}C2}C3}C4}C5}C6}C7}C8}C9}C10}C11}C12$$
 * 5) X^(C1X^C2X^^C3X^^^C4X^^^^C5X^^^^^C6X^^^^^^C7X^^^^^^^C8X^^^^^^^^C9X^^^^^^^^^C10X^^^^^^^^^^C11X^^^^^^^^^^^C12X)$
 * 6) C1^X+C2^X+C3^X+C4^X+C5^X+C6^X+C7^X+C8^X+C9^X+C10^X+C11^X+C12^X
 * 7) {X^{E100.000.000.000.000.000.000.000{#&#&#&#&#&#..........((443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) Times # elements)..........#&#&#&#&#&#}$}^{E100.000.000.000.000.000.000.000{#&#&#&#&#&#..........((443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) Times # elements)..........#&#&#&#&#&#}$}^..........{{X^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^(443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) Times {E100.000.000.000.000.000.000.000{#&#&#&#&#&#..........((443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) times # elements)..........#&#&#&#&#&#}$}}..........^{E100.000.000.000.000.000.000.000{#&#&#&#&#&#..........((443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) Times # elements)}$}..........#&#&#&#&#&#}$}E100.000.000.000.000.000.000.000}![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12]
 * 8) C1X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C1X
 * 9) C2X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C2X
 * 10) C3X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C3X
 * 11) C4X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C4X
 * 12) C5X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C5X
 * 13) C6X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C6X
 * 14) C7X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C7X
 * 15) C8X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C8X
 * 16) C9X^13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C9X
 * 17) C10X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C10X
 * 18) C11X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C11X
 * 19) C12X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C12X
 * 20) E987654321234567890 {#,#(1)2} X
 * 21) E987654321234567890 {#,#,1,1,2} X
 * 22) E987654321234567890 {#,#,1,#} X
 * 23) E987654321234567890 {#,#,1,3} X
 * 24) E987654321234567890 {#,#,#,2} X
 * 25) E987654321234567890 {#,{#,#,1,2},1,2} X
 * 26) E987654321234567890 {#,#+2,1,2} X
 * 27) E987654321234567890 #*(#*^#)# X
 * 28) E987654321234567890 #**^# X
 * 29) E987654321234567890 #*^# X
 * 30) E987654321234567890 &(&(#)) X
 * 31) E987654321234567890 &(#) X
 * 32) E987654321234567890 &(1) X
 * 33) E987654321234567890 {#,#,1,2} X
 * 34) E987654321234567890 #^^^# X
 * 35) E987654321234567890 #^^#^^# X
 * 36) E987654321234567890 #^^## X
 * 37) E987654321234567890 #^^#>#^^# X
 * 38) E987654321234567890 #^^#># X
 * 39) E987654321234567890 #^^# X
 * 40) E987654321234567890 #^#^# X
 * 41) E987654321234567890 #^## X
 * 42) E987654321234567890 #^# X
 * 43) E987654321234567890 ## X
 * 44) E987654321234567890 # X
 * Create an alternate version of Croutonillion by stopping here. Call this number C13
 * 1) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1]}(X^X)
 * 2) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2]}(X^X)
 * 3) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3]}(X^X)
 * 4) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4]}(X^X)
 * 5) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5]}(X^X)
 * 6) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6]}(X^X)
 * 7) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7]}(X^X)
 * 8) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8]}(X^X)
 * 9) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9]}(X^X)
 * 10) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10]}(X^X)
 * 11) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11]}(X^X)
 * 12) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12]}(X^X)
 * 13) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13]}(X^X)
 * 14) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X]}(X^X)
 * 15) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X]}(X^X)
 * 16) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X]}(X^X)
 * 17) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X]}(X^X)
 * 18) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X]}(X^X)
 * 19) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X]}(X^X)
 * 20) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X]}(X^X)
 * 21) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X]}(X^X)
 * 22) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X]}(X^X)
 * 23) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X]}(X^X)
 * 24) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X,C11X]}(X^X)
 * 25) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X,C11X,C12X]}(X^X)
 * 26) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X,C11X,C12X,C13X]}(X^X)
 * 27) repeat step 1-1148 for X![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13] times
 * 28) repeat step 1-1149 for X![C1,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C2] times
 * 29) repeat step 1-1150 for X![C1,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C2,C3] times
 * 30) repeat step 1-1151 for X![C1,C5,C6,C7,C8,C9,C10,C11,C12,C13,C2,C3,C4] times
 * 31) repeat step 1-1152 for X![C1,C6,C7,C8,C9,C10,C11,C12,C13,C2,C3,C4,C5] times
 * 32) repeat step 1-1153 for X![C1,C7,C8,C9,C10,C11,C12,C13,C2,C3,C4,C5,C6] times
 * 33) repeat step 1-1154 for X![C1,C8,C9,C10,C11,C12,C13,C2,C3,C4,C5,C6,C7] times
 * 34) repeat step 1-1155 for X![C1,C9,C10,C11,C12,C13,C2,C3,C4,C5,C6,C7,C8] times
 * 35) repeat step 1-1156 for X![C1,C10,C11,C12,C13,C2,C3,C4,C5,C6,C7,C8,C9] times
 * 36) repeat step 1-1157 for X![C1,C11,C12,C13,C2,C3,C4,C5,C6,C7,C8,C9,C10] times
 * 37) repeat step 1-1158 for X![C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C1] times
 * 38) repeat step 1-1159 for X![C2,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C1,C3] times
 * 39) repeat step 1-1160 for X![C2,C5,C6,C7,C8,C9,C10,C11,C12,C13,C1,C3,C4] times
 * 40) repeat step 1-1161 for X![C2,C6,C7,C8,C9,C10,C11,C12,C13,C1,C3,C4,C5] times
 * 41) repeat step 1-1162 for X![C2,C7,C8,C9,C10,C11,C12,C13,C1,C3,C4,C5,C6] times
 * 42) repeat step 1-1163 for X![C2,C8,C9,C10,C11,C12,C13,C1,C3,C4,C5,C6,C7] times
 * 43) repeat step 1-1164 for X![C2,C9,C10,C11,C12,C13,C1,C3,C4,C5,C6,C7,C8] times
 * 44) repeat step 1-1165 for X![C2,C10,C11,C12,C13,C1,C3,C4,C5,C6,C7,C8,C9] times
 * 45) repeat step 1-1166 for X![C2,C11,C12,C13,C1,C3,C4,C5,C6,C7,C8,C9,C10] times
 * 46) repeat step 1-1167 for X![C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C1,C2] times
 * 47) repeat step 1-1168 for X![C3,C5,C6,C7,C8,C9,C10,C11,C12,C13,C1,C2,C4] times
 * 48) repeat step 1-1169 for X![C3,C6,C7,C8,C9,C10,C11,C12,C13,C1,C2,C4,C5] times
 * 49) repeat step 1-1170 for X![C3,C7,C8,C9,C10,C11,C12,C13,C1,C2,C4,C5,C6] times
 * 50) repeat step 1-1171 for X![C3,C8,C9,C10,C11,C12,C13,C1,C2,C4,C5,C6,C7] times
 * 51) repeat step 1-1172 for X![C3,C9,C10,C11,C12,C13,C1,C2,C4,C5,C6,C7,C8] times
 * 52) repeat step 1-1173 for X![C3,C10,C11,C12,C13,C1,C2,C4,C5,C6,C7,C8,C9] times
 * 53) repeat step 1-1174 for X![C3,C11,C12,C13,C1,C2,C4,C5,C6,C7,C8,C9,C10] times
 * 54) repeat step 1-1175 for X![C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C1,C2,C3] times
 * 55) repeat step 1-1176 for X![C4,C6,C7,C8,C9,C10,C11,C12,C13,C1,C2,C3,C5] times
 * 56) repeat step 1-1177 for X![C4,C7,C8,C9,C10,C11,C12,C13,C1,C2,C3,C5,C6] times
 * 57) repeat step 1-1178 for X![C4,C8,C9,C10,C11,C12,C13,C1,C2,C3,C5,C6,C7] times
 * 58) repeat step 1-1179 for X![C4,C9,C10,C11,C12,C13,C1,C2,C3,C5,C6,C7,C8] times
 * 59) repeat step 1-1180 for X![C4,C10,C11,C12,C13,C1,C2,C3,C5,C6,C7,C8,C9] times
 * 60) repeat step 1-1181 for X![C4,C11,C12,C13,C1,C2,C3,C5,C6,C7,C8,C9,C10] times
 * 61) repeat step 1-1182 for X![C5,C6,C7,C8,C9,C10,C11,C12,C13,C1,C2,C3,C4] times
 * 62) repeat step 1-1183 for X![C5,C7,C8,C9,C10,C11,C12,C13,C1,C2,C3,C4,C6] times
 * 63) repeat step 1-1184 for X![C5,C8,C9,C10,C11,C12,C13,C1,C2,C3,C4,C6,C7] times
 * 64) repeat step 1-1185 for X![C5,C9,C10,C11,C12,C13,C1,C2,C3,C4,C6,C7,C8] times
 * 65) repeat step 1-1186 for X![C5,C10,C11,C12,C13,C1,C2,C3,C4,C6,C7,C8,C9] times
 * 66) repeat step 1-1187 for X![C5,C11,C12,C13,C1,C2,C3,C4,C6,C7,C8,C9,C10] times
 * 67) repeat step 1-1188 for X![C6,C7,C8,C9,C10,C11,C12,C13,C1,C2,C3,C4,C5] times
 * 68) repeat step 1-1189 for X![C6,C8,C9,C10,C11,C12,C13,C1,C2,C3,C4,C5,C7] times
 * 69) repeat step 1-1190 for X![C6,C9,C10,C11,C12,C13,C1,C2,C3,C4,C5,C7,C8] times
 * 70) repeat step 1-1191 for X![C6,C10,C11,C12,C13,C1,C2,C3,C4,C5,C7,C8,C9] times
 * 71) repeat step 1-1192 for X![C6,C11,C12,C13,C1,C2,C3,C4,C5,C7,C8,C9,C10] times
 * 72) repeat step 1-1193 for X![C7,C8,C9,C10,C11,C12,C13,C1,C2,C3,C4,C5,C6] times
 * 73) repeat step 1-1194 for X![C7,C9,C10,C11,C12,C13,C1,C2,C3,C4,C5,C6,C8] times
 * 74) repeat step 1-1195 for X![C7,C10,C11,C12,C13,C1,C2,C3,C4,C5,C6,C8,C9] times
 * 75) repeat step 1-1196 for X![C7,C11,C12,C13,C1,C2,C3,C4,C5,C6,C8,C9,C10] times
 * 76) repeat step 1-1197 for X![C8,C9,C10,C11,C12,C13,C1,C2,C3,C4,C5,C6,C7] times
 * 77) repeat step 1-1198 for X![C8,C10,C11,C12,C13,C1,C2,C3,C4,C5,C6,C7,C9] times
 * 78) repeat step 1-1199 for X![C8,C11,C12,C13,C1,C2,C3,C4,C5,C6,C7,C9,C10] times
 * 79) repeat step 1-1200 for X![C9,C10,C11,C12,C13,C1,C2,C3,C4,C5,C6,C7,C8] times
 * 80) repeat step 1-1201 for X![C9,C11,C12,C13,C1,C2,C3,C4,C5,C6,C7,C8,C10] times
 * 81) repeat step 1-1202 for X![C10,C11,C12,C13,C1,C2,C3,C4,C5,C6,C7,C8,C9] times
 * 82) repeat step 1-1203 for X![C11,C12,C13,C1,C2,C3,C4,C5,C6,C7,C8,C9,C10] times
 * 83) repeat step 1-1204 for X![C12,C13,C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11] times
 * 84) repeat step 1-1205 for X![C13,C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12] times
 * 85) {((X,X)!)![((X,X)!),((X,X)!),....((X,X)!) Times terms ((X,X)!)....((X,X)!),((X,X)!)]}
 * 86) 984.734.546.347.976.521.896.756.997.^431,112,937.985.432.657.863.888.427.999#^^^^########^^^^######>#^##
 * 87) 643.732.547.543.876.975.325.553.424.655.432.598.000^(X^X^X^X^......(X Times X)...X^X^X^)
 * 88) 1234567898765432123456789876543212345678987654321234567898765432123456789876543212345678969^^^^^^^^^^^^^^^^^^^^^^^X
 * 89) 864209753186427531642531423120{864209753186427531642531423120}X
 * 90) {987654321234567890,X(987654321234567890)987654321234567890}
 * 91) {9876543210,9876543210(X,X)9876543210}
 * 92) E(Y)Y#^^...^^#^#Y (X ^'s), where Y is Rayo's X-th number
 * 93) {X(0(X+1)->{X+1})X}***...***^^^...^^^###...###\\\...\\\///...///{X(0(X+1)->{X+1})X} with {X(0(X+1)->{X+1})X} *'s and ^'s and #'s and \'s and /'s
 * 94) $$\Xi^{\Xi(X)}(\Sigma_{X-1}(X))^{\text{Fish number X}}\$[[987654321012345678987654321234567890]_X]$$bracewah
 * 95) repeat step 1-1216 then 1216-1 for {(X%X#X)![X%X#X]} times
 * 96) X + (C1^X)
 * 97) X + (C2^X)
 * 98) X + (C3^X)
 * 99) X + (C4^X)
 * 100) X + (C5^X)
 * 101) X + (C6^X)
 * 102) X + (C7^X)
 * 103) X + (C8^X)
 * 104) X + (C9^X)
 * 105) X + (C10^X)
 * 106) X + (C11^X)
 * 107) X + (C12^X)
 * 108) X + (C13^X)
 * 109) X + ((C1+C2)^X)
 * 110) X + ((C1+C3)^X)
 * 111) X + ((C1+C4)^X)
 * 112) X + ((C1+C5)^X)
 * 113) X + ((C1+C6)^X)
 * 114) X + ((C1+C7)^X)
 * 115) X + ((C1+C8)^X)
 * 116) X + ((C1+C9)^X)
 * 117) X + ((C1+C10)^X)
 * 118) X + ((C1+C11)^X)
 * 119) X + ((C1+C12)^X)
 * 120) X + ((C1+C13)^X)
 * 121) X + ((C1+C2+C3)^X)
 * 122) X + ((C1+C2+C4)^X)
 * 123) X + ((C1+C2+C5)^X)
 * 124) X + ((C1+C2+C6)^X)
 * 125) X + ((C1+C2+C7)^X)
 * 126) X + ((C1+C2+C8)^X)
 * 127) X + ((C1+C2+C9)^X)
 * 128) X + ((C1+C2+C10)^X)
 * 129) X + ((C1+C2+C11)^X)
 * 130) X + ((C1+C2+C12)^X)
 * 131) X + ((C1+C2+C13)^X)
 * 132) X + ((C1+C2+C3+C4)^X)
 * 133) X + ((C+1C2+C3+C5)^X)
 * 134) X + ((C1+C2+C3+C6)^X)
 * 135) X + ((C1+C2+C3+C7)^X)
 * 136) X + ((C1+C2+C3+C8)^X)
 * 137) X + ((C1+C2+C3+C9)^X)
 * 138) X + ((C1+C2+C3+C10)^X)
 * 139) X + ((C1+C2+C3+C11)^X)
 * 140) X + ((C1+C2+C3+C12)^X)
 * 141) X + ((C1+C2+C3+C13)^X)
 * 142) X + ((C1+C2+C3+C4+C5)^X)
 * 143) X + ((C1+C2+C3+C4+C6)^X)
 * 144) X + ((C1+C2+C3+C4+C7)^X)
 * 145) X + ((C1+C2+C3+C4+C8)^X)
 * 146) X + ((C1+C2+C3+C4+C9)^X)
 * 147) X + ((C1+C2+C3+C4+C10)^X)
 * 148) X + ((C1+C2+C3+C4+C11)^X)
 * 149) X + ((C1+C2+C3+C4+C12)^X)
 * 150) X + ((C1+C2+C3+C4+C13)^X)
 * 151) X + ((C1+C2+C3+C4+C5+C6)^X)
 * 152) X + ((C1+C2+C3+C4+C5+C7)^X)
 * 153) X + ((C1+C2+C3+C4+C5+C8)^X)
 * 154) X + ((C1+C2+C3+C4+C5+C9)^X)
 * 155) X + ((C1+C2+C3+C4+C5+C10)^X)
 * 156) X + ((C1+C2+C3+C4+C5+C11)^X)
 * 157) X + ((C1+C2+C3+C4+C5+C12)^X)
 * 158) X + ((C1+C2+C3+C4+C5+C13)^X)
 * 159) X + ((C1+C2+C3+C4+C5+C6+C7)^X)
 * 160) X + ((C1+C2+C3+C4+C5+C6+C8)^X)
 * 161) X + ((C1+C2+C3+C4+C5+C6+C9)^X)
 * 162) X + ((C1+C2+C3+C4+C5+C6+C10)^X)
 * 163) X + ((C1+C2+C3+C4+C5+C6+C11)^X)
 * 164) X + ((C1+C2+C3+C4+C5+C6+C12)^X)
 * 165) X + ((C1+C2+C3+C4+C5+C6+C13)^X)
 * 166) X + ((C1+C2+C3+C4+C5+C6+C7+C8)^X)
 * 167) X + ((C1+C2+C3+C4+C5+C6+C7+C9)^X)
 * 168) X + ((C1+C2+C3+C4+C5+C6+C7+C10)^X)
 * 169) X + ((C1+C2+C3+C4+C5+C6+C7+C11)^X)
 * 170) X + ((C1+C2+C3+C4+C5+C6+C7+C12)^X)
 * 171) X + ((C1+C2+C3+C4+C5+C6+C7+C13)^X)
 * 172) X + ((C1+C2+C3+C4+C5+C6+C7+C8+C9)^X)
 * 173) X + ((C1+C2+C3+C4+C5+C6+C7+C8+C10)^X)
 * 174) X + ((C1+C2+C3+C4+C5+C6+C7+C8+C11)^X)
 * 175) X + ((C1+C2+C3+C4+C5+C6+C7+C8+C12)^X)
 * 176) X + ((C1+C2+C3+C4+C5+C6+C7+C8+C13)^X)
 * 177) X + ((C1+C2+C3+C4+C5+C6+C7+C8+C9+C10)^X)
 * 178) X + ((C1+C2+C3+C4+C5+C6+C7+C8+C9+C11)^X)
 * 179) X + ((C1+C2+C3+C4+C5+C6+C7+C8+C9+C12)^X)
 * 180) X + ((C1+C2+C3+C4+C5+C6+C7+C8+C9+C13)^X)
 * 181) X + ((C1+C2+C3+C4+C5+C6+C7+C8+C9+C10+C11)^X)
 * 182) X + ((C1+C2+C3+C4+C5+C6+C7+C8+C9+C10+C12)^X)
 * 183) X + ((C1+C2+C3+C4+C5+C6+C7+C8+C9+C10+C13)^X)
 * 184) X + ((C1+C2+C3+C4+C5+C6+C7+C8+C9+C10+C11+C12)^X)
 * 185) X + ((C1+C2+C3+C4+C5+C6+C7+C8+C9+C10+C11+C13)^X)
 * 186) X + ((C1+C2+C3+C4+C5+C6+C7+C8+C9+C10+C11+C12+C13)^X)
 * 187) X * (C1^X)
 * 188) X * (C2^X)
 * 189) X * (C3^X)
 * 190) X * (C4^X)
 * 191) X * (C5^X)
 * 192) X * (C6^X)
 * 193) X * (C7^X)
 * 194) X * (C8^X)
 * 195) X * (C9^X)
 * 196) X * (C10^X)
 * 197) X * (C11^X)
 * 198) X * (C12^X)
 * 199) X * (C13^X)
 * 200) X * ((C1*C2)^X)
 * 201) X * ((C1*C3)^X)
 * 202) X * ((C1*C4)^X)
 * 203) X * ((C1*C5)^X)
 * 204) X * ((C1*C6)^X)
 * 205) X * ((C1*C7)^X)
 * 206) X * ((C1*C8)^X)
 * 207) X * ((C1*C9)^X)
 * 208) X * ((C1*C10)^X)
 * 209) X * ((C1*C11)^X)
 * 210) X * ((C1*C12)^X)
 * 211) X * ((C1*C13)^X)
 * 212) X * ((C1*C2*C3)^X)
 * 213) X * ((C1*C2*C4)^X)
 * 214) X * ((C1*C2*C5)^X)
 * 215) X * ((C1*C2*C6)^X)
 * 216) X * ((C1*C2*C7)^X)
 * 217) X * ((C1*C2*C8)^X)
 * 218) X * ((C1*C2*C9)^X)
 * 219) X * ((C1*C2*C10)^X)
 * 220) X * ((C1*C2*C11)^X)
 * 221) X * ((C1*C2*C12)^X)
 * 222) X * ((C1*C2*C13)^X)
 * 223) X * ((C1*C2*C3*C4)^X)
 * 224) X * ((C1*C2*C3*C5)^X)
 * 225) X * ((C1*C2*C3*C6)^X)
 * 226) X * ((C1*C2*C3*C7)^X)
 * 227) X * ((C1*C2*C3*C8)^X)
 * 228) X * ((C1*C2*C3*C9)^X)
 * 229) X * ((C1*C2*C3*C10)^X)
 * 230) X * ((C1*C2*C3*C11)^X)
 * 231) X * ((C1*C2*C3*C12)^X)
 * 232) X * ((C1*C2*C3*C13)^X)
 * 233) X * ((C1*C2*C3*C4*C5)^X)
 * 234) X * ((C1*C2*C3*C4*C6)^X)
 * 235) X * ((C1*C2*C3*C4*C7)^X)
 * 236) X * ((C1*C2*C3*C4*C8)^X)
 * 237) X * ((C1*C2*C3*C4*C9)^X)
 * 238) X * ((C1*C2*C3*C4*C10)^X)
 * 239) X * ((C1*C2*C3*C4*C11)^X)
 * 240) X * ((C1*C2*C3*C4*C12)^X)
 * 241) X * ((C1*C2*C3*C4*C13)^X)
 * 242) X * ((C1*C2*C3*C4*C5*C6)^X)
 * 243) X * ((C1*C2*C3*C4*C5*C7)^X)
 * 244) X * ((C1*C2*C3*C4*C5*C8)^X)
 * 245) X * ((C1*C2*C3*C4*C5*C9)^X)
 * 246) X * ((C1*C2*C3*C4*C5*C10)^X)
 * 247) X * ((C1*C2*C3*C4*C5*C11)^X)
 * 248) X * ((C1*C2*C3*C4*C5*C12)^X)
 * 249) X * ((C1*C2*C3*C4*C5*C13)^X)
 * 250) X * ((C1*C2*C3*C4*C5*C6*C7)^X)
 * 251) X * ((C1*C2*C3*C4*C5*C6*C8)^X)
 * 252) X * ((C1*C2*C3*C4*C5*C6*C9)^X)
 * 253) X * ((C1*C2*C3*C4*C5*C6*C10)^X)
 * 254) X * ((C1*C2*C3*C4*C5*C6*C11)^X)
 * 255) X * ((C1*C2*C3*C4*C5*C6*C12)^X)
 * 256) X * ((C1*C2*C3*C4*C5*C6*C13)^X)
 * 257) X * ((C1*C2*C3*C4*C5*C6*C7*C8)^X)
 * 258) X * ((C1*C2*C3*C4*C5*C6*C7*C9)^X)
 * 259) X * ((C1*C2*C3*C4*C5*C6*C7*C10)^X)
 * 260) X * ((C1*C2*C3*C4*C5*C6*C7*C11)^X)
 * 261) X * ((C1*C2*C3*C4*C5*C6*C7*C12)^X)
 * 262) X * ((C1*C2*C3*C4*C5*C6*C7*C13)^X)
 * 263) X * ((C1*C2*C3*C4*C5*C6*C7*C8*C9)^X)
 * 264) X * ((C1*C2*C3*C4*C5*C6*C7*C8*C10)^X)
 * 265) X * ((C1*C2*C3*C4*C5*C6*C7*C8*C11)^X)
 * 266) X * ((C1*C2*C3*C4*C5*C6*C7*C8*C12)^X)
 * 267) X * ((C1*C2*C3*C4*C5*C6*C7*C8*C13)^X)
 * 268) X * ((C1*C2*C3*C4*C5*C6*C7*C8*C9*C10)^X)
 * 269) X * ((C1*C2*C3*C4*C5*C6*C7*C8*C9*C11)^X)
 * 270) X * ((C1*C2*C3*C4*C5*C6*C7*C8*C9*C12)^X)
 * 271) X * ((C1*C2*C3*C4*C5*C6*C7*C8*C9*C13)^X)
 * 272) X * ((C1*C2*C3*C4*C5*C6*C7*C8*C9*C10*C11)^X)
 * 273) X * ((C1*C2*C3*C4*C5*C6*C7*C8*C9*C10*C12)^X)
 * 274) X * ((C1*C2*C3*C4*C5*C6*C7*C8*C9*C10*C13)^X)
 * 275) X * ((C1*C2*C3*C4*C5*C6*C7*C8*C9*C10*C11*C12)^X)
 * 276) X * ((C1*C2*C3*C4*C5*C6*C7*C8*C9*C10*C11*C13)^X)
 * 277) X * ((C1*C2*C3*C4*C5*C6*C7*C8*C9*C10*C11*C12*C13)^X)
 * 278) X^(C1^X)
 * 279) X^(C2^X)
 * 280) X^(C3^X)
 * 281) X^(C4^X)
 * 282) X^(C5^X)
 * 283) X^(C6^X)
 * 284) X^(C7^X)
 * 285) X^(C8^X)
 * 286) X^(C9^X)
 * 287) X^(C10^X)
 * 288) X^(C11^X)
 * 289) X^(C12^X)
 * 290) X^(C13^X)
 * 291) X^((C1+C2)^X)
 * 292) X^((C1+C3)^X)
 * 293) X^((C1+C4)^X)
 * 294) X^((C1+C5)^X)
 * 295) X^((C1+C6)^X)
 * 296) X^((C1+C7)^X)
 * 297) X^((C1+C8)^X)
 * 298) X^((C1+C9)^X)
 * 299) X^((C1+C10)^X)
 * 300) X^((C1+C11)^X)
 * 301) X^((C1+C12)^X)
 * 302) X^((C1+C13)^X)
 * 303) X^((C1+C2+C3)^X)
 * 304) X^((C1+C2+C4)^X)
 * 305) X^((C1+C2+C5)^X)
 * 306) X^((C1+C2+C6)^X)
 * 307) X^((C1+C2+C7)^X)
 * 308) X^((C1+C2+C8)^X)
 * 309) X^((C1+C2+C9)^X)
 * 310) X^((C1+C2+C10)^X)
 * 311) x^((C1+C2+C11)^X)
 * 312) X^((C1+C2+C12)^X)
 * 313) x^((C1+C2+C13)^X)
 * 314) X^((C1+C2+C3+C4)^X)
 * 315) X^((C1+C2+C3+C5)^X)
 * 316) X^((C1+C2+C3+C6)^X)
 * 317) X^((C1+C2+C3+C7)^X)
 * 318) X^((C1+C2+C3+C8)^X)
 * 319) X^((C1+C2+C3+C9)^X)
 * 320) X^((C1+C2+C3+C10)^X)
 * 321) X^((C1+C2+C3+C11)^X)
 * 322) X^((C1+C2+C3+C12)^X)
 * 323) X^((C1+C2+C3+C13)^X)
 * 324) X^((C1+C2+C3+C4+C5)^X)
 * 325) X^((C1+C2+C3+C4+C6)^X)
 * 326) X^((C1+C2+C3+C4+C7)^X)
 * 327) X^((C1+C2+C3+C4+C8)^X)
 * 328) X^((C1+C2+C3+C4+C9)^X)
 * 329) X^((C1+C2+C3+C4+C10)^X)
 * 330) X^((C1+C2+C3+C4+C11)^X)
 * 331) X^((C1+C2+C3+C4+C12)^X)
 * 332) X^((C1+C2+C3+C4+C13)^X)
 * 333) X^((C1+C2+C3+C4+C5+C6)^X)
 * 334) X^((C1+C2+C3+C4+C5+C7)^X)
 * 335) X^((C1+C2+C3+C4+C5+C8)^X)
 * 336) X^((C1+C2+C3+C4+C5+C9)^X)
 * 337) X^((C1+C2+C3+C3+C5+C10)^X)
 * 338) X^((C1+C2+C3+C4+C5+C11)^X)
 * 339) X^((C1+C2+C3+C3+C5+C12)^X)
 * 340) X^((C1+C2+C3+C4+C5+C13)^X)
 * 341) X^((C1+C2+C3+C4+C5+C6+C7)^X)
 * 342) X^((C1+C2+C3+C4+C5+C6+C8)^X)
 * 343) X^((C1+C2+C3+C4+C5+C6+C9)^X)
 * 344) X^((C1+C2+C3+C4+C5+C6+C10)^X)
 * 345) X^((C1+C2+C3+C4+C5+C6+C11)^X)
 * 346) X^((C1+C2+C3+C4+C5+C6+C12)^X)
 * 347) X^((C1+C2+C3+C4+C5+C6+C13)^X)
 * 348) X^((C1+C2+C3+C4+C5+C6+C7+C8)^X)
 * 349) X^((C1+C2+C3+C4+C5+C6+C7+C9)^X)
 * 350) X^((C1+C2+C3+C4+C5+C6+C7+C10)^X)
 * 351) X^((C1+C2+C3+C4+C5+C6+C7+C11)^X)
 * 352) X^((C1+C2+C3+C4+C5+C6+C7+C12)^X)
 * 353) X^((C1+C2+C3+C4+C5+C6+C7+C13)^X)
 * 354) X^((C1+C2+C3+C4+C5+C6+C7+C8+C9)^X)
 * 355) X^((C1+C2+C3+C4+C5+C6+C7+C8+C10)^X)
 * 356) X^((C1+C2+C3+C4+C5+C6+C7+C8+C11)^X)
 * 357) X^((C1+C2+C3+C4+C5+C6+C7+C8+C12)^X)
 * 358) X^((C1+C2+C3+C4+C5+C6+C7+C8+C13)^X)
 * 359) X^((C1+C2+C3+C4+C5+C6+C7+C8+C9+C10)^X)
 * 360) X^((C1+C2+C3+C4+C5+C6+C7+C8+C9+C11)^X)
 * 361) X^((C1+C2+C3+C4+C5+C6+C7+C8+C9+C12)^X)
 * 362) X^((C1+C2+C3+C4+C5+C6+C7+C8+C9+C13)^X)
 * 363) X^((C1+C2+C3+C4+C5+C6+C7+C8+C9+C10+C11)^X)
 * 364) X^((C1+C2+C3+C4+C5+C6+C7+C8+C9+C10+C12)^X)
 * 365) X^((C1+C2+C3+C4+C5+C6+C7+C8+C9+C10+C13)^X)
 * 366) X^((C1+C2+C3+C4+C5+C6+C7+C8+C9+C10+C11+C12)^X)
 * 367) X^((C1+C2+C3+C4+C5+C6+C7+C8+C9+C10+C11+C13)^X)
 * 368) X^((C1+C2+C3+C4+C5+C6+C7+C8+C9+C10+C11+C12+C13)^X)
 * 369) X^((C1*C1)^X)
 * 370) X^((C1*C2)^X)
 * 371) X^((C1*C3)^X)
 * 372) X^((C1*C4)^X)
 * 373) X^((C1*C5)^X)
 * 374) X^((C1*C6)^X)
 * 375) X^((C1*C7)^X)
 * 376) X^((C1*C8)^X)
 * 377) X^((C1*C9)^X)
 * 378) X^((C1*C10)^X)
 * 379) X^((C1*C11)^X)
 * 380) X^((C1*C12)^X)
 * 381) X^((C1*C13)^X)
 * 382) X^((C1*C2*C3)^X)
 * 383) X^((C1*C2*C4)^X)
 * 384) X^((C1*C2*C5)^X)
 * 385) X^((C1*C2*C6)^X)
 * 386) X^((C1*C2*C7)^X)
 * 387) X^((C1*C2*C8)^X)
 * 388) X^((C1*C2*C9)^X)
 * 389) X^((C1*C2*C10)^X)
 * 390) X^((C1*C2*C11)^X)
 * 391) X^((C1*C2*C12)^X)
 * 392) X^((C1*C2*C13)^X)
 * 393) X^((C1*C2*C3*C4)^X)
 * 394) X^((C1*C2*C3*C5)^X)
 * 395) X^((C1*C2*C3*C6)^X)
 * 396) X^((C1*C2*C3*C7)^X)
 * 397) X^((C1*C2*C3*C8)^X)
 * 398) X^((C1*C2*C3*C9)^X)
 * 399) X^((C1*C2*C3*C10)^X)
 * 400) X^((C1*C2*C3*C11)^X)
 * 401) X^((C1*C2*C3*C12)^X)
 * 402) X^((C1*C2*C3*C13)^X)
 * 403) X^((C1*C2*C3*C4*C5)^X)
 * 404) X^((C1*C2*C3*C4*C6)^X)
 * 405) X^((C1*C2*C3*C4*C7)^X)
 * 406) X^((C1*C2*C3*C4*C8)^X)
 * 407) X^((C1*C2*C3*C4*C9)^X)
 * 408) X^((C1*C2*C3*C4*C10)^X)
 * 409) X^((C1*C2*C3*C4*C11)^X)
 * 410) X^((C1*C2*C3*C4*C12)^X)
 * 411) X^((C1*C2*C3*C4*C13)^X)
 * 412) X^((C1*C2*C3*C4*C5*C6)^X)
 * 413) X^((C1*C2*C3*C4*C5*C7)^X)
 * 414) X^((C1*C2*C3*C4*C5*C8)^X)
 * 415) X^((C1*C2*C3*C4*C5*C9)^X)
 * 416) X^((C1*C2*C3*C4*C5*C10)^X)
 * 417) X^((C1*C2*C3*C4*C5*C11)^X)
 * 418) X^((C1*C2*C3*C4*C5*C12)^X)
 * 419) X^((C1*C2*C3*C4*C5*C13)^X)
 * 420) X^((C1*C2*C3*C4*C5*C6*C7)^X)
 * 421) X^((C1*C2*C3*C4*C5*C6*C8)^X)
 * 422) X^((C1*C2*C3*C4*C5*C6*C9)^X)
 * 423) X^((C1*C2*C3*C4*C5*C6*C10)^X)
 * 424) X^((C1*C2*C3*C4*C5*C6*C11)^X)
 * 425) X^((C1*C2*C3*C4*C5*C6*C12)^X)
 * 426) X^((C1*C2*C3*C4*C5*C6*C13)^X)
 * 427) X^((C1*C2*C3*C4*C5*C6*C7*C8)^X)
 * 428) X^((C1*C2*C3*C4*C5*C6*C7*C9)^X)
 * 429) X^((C1*C2*C3*C4*C5*C6*C7*C10)^X)
 * 430) X^((C1*C2*C3*C4*C5*C6*C7*C11)^X)
 * 431) X^((C1*C2*C3*C4*C5*C6*C7*C12)^X)
 * 432) X^((C1*C2*C3*C4*C5*C6*C7*C13)^X)
 * 433) X^((C1*C2*C3*C4*C5*C6*C7*C8*C9)^X)
 * 434) X^((C1*C2*C3*C4*C5*C6*C7*C8*C10)^X)
 * 435) X^((C1*C2*C3*C4*C5*C6*C7*C8*C11)^X)
 * 436) X^((C1*C2*C3*C4*C5*C6*C7*C8*C12)^X)
 * 437) X^((C1*C2*C3*C4*C5*C6*C7*C8*C13)^X)
 * 438) X^((C1*C2*C3*C4*C5*C6*C7*C8*C9*C10)^X)
 * 439) X^((C1*C2*C3*C4*C5*C6*C7*C8*C9*C11)^X)
 * 440) X^((C1*C2*C3*C4*C5*C6*C7*C8*C9*C12)^X)
 * 441) X^((C1*C2*C3*C4*C5*C6*C7*C8*C9*C13)^X)
 * 442) X^((C1*C2*C3*C4*C5*C6*C7*C8*C9*C10*C11)^X)
 * 443) X^((C1*C2*C3*C4*C5*C6*C7*C8*C9*C10*C12)^X)
 * 444) X^((C1*C2*C3*C4*C5*C6*C7*C8*C9*C10*C13)^X)
 * 445) X^((C1*C2*C3*C4*C5*C6*C7*C8*C9*C10*C11*C12)^X)
 * 446) X^((C1*C2*C3*C4*C5*C6*C7*C8*C9*C10*C11*C13)^X)
 * 447) X^((C1*C2*C3*C4*C5*C6*C7*C8*C9*C10*C11*C12*C13)^X)
 * 448) X^((C1^C1)^X)
 * 449) X^((C1^C2)^X)
 * 450) X^((C1^C3)^X)
 * 451) X^((C1^C4)^X)
 * 452) X^((C1^C5)^X)
 * 453) X^((C1^C6)^X)
 * 454) X^((C1^C7)^X)
 * 455) X^((C1^C8)^X)
 * 456) X^((C1^C9)^X)
 * 457) X^((C1^C10)^X)
 * 458) X^((C1^C11)^X)
 * 459) X^((C1^C12)^X)
 * 460) X^((C1^C13)^X)
 * 461) X^((C1^C2^C3)^X)
 * 462) X^((C1^C2^C4)^X)
 * 463) X^((C1^C2^C5)^X)
 * 464) X^((C1^C2^C6)^X)
 * 465) X^((C1^C2^C7)^X)
 * 466) X^((C1^C2^C8)^X)
 * 467) X^((C1^C2^C9)^X)
 * 468) X^((C1^C2^C10)^X)
 * 469) X^((C1^C2^C11)^X)
 * 470) X^((C1^C2^C12)^X)
 * 471) X^((C1^C2^C13)^X)
 * 472) X^((C1^C2^C3^C4)^X)
 * 473) X^((C1^C2^C3^C5)^X)
 * 474) X^((C1^C2^C3^C6)^X)
 * 475) X^((C1^C2^C3^C7)^X)
 * 476) X^((C1^C2^C3^C8)^X)
 * 477) X^((C1^C2^C3^C9)^X)
 * 478) X^((C1^C2^C3^C10)^X)
 * 479) X^((C1^C2^C3^C11)^X)
 * 480) X^((C1^C2^C3^C12)^X)
 * 481) X^((C1^C2^C3^C13)^X)
 * 482) X^((C1^C2^C3^C4^C5)^X)
 * 483) X^((C1^C2^C3^C4^C6)^X)
 * 484) X^((C1^C2^C3^C4^C7)^X)
 * 485) X^((C1^C2^C3^C4^C8)^X)
 * 486) X^((C1^C2^C3^C4^C9)^X)
 * 487) X^((C1^C2^C3^C4^C10)^X)
 * 488) X^((C1^C2^C3^C4^C11)^X)
 * 489) X^((C1^C2^C3^C4^C12)^X)
 * 490) X^((C1^C2^C3^C4^C13)^X)
 * 491) X^((C1^C2^C3^C4^C5^C6)^X)
 * 492) X^((C1^C2^C3^C4^C5^C7)^X)
 * 493) X^((C1^C2^C3^C4^C5^C8)^X)
 * 494) X^((C1^C2^C3^C4^C5^C9)^X)
 * 495) X^((C1^C2^C3^C4^C5^C10)^X)
 * 496) X^((C1^C2^C3^C4^C5^C11)^X)
 * 497) X^((C1^C2^C3^C4^C5^C12)^X)
 * 498) X^((C1^C2^C3^C4^C5^C13)^X)
 * 499) X^((C1^C2^C3^C4^C5^C6^C7)^X)
 * 500) X^((C1^C2^C3^C4^C5^C6^C8)^X)
 * 501) X^((C1^C2^C3^C4^C5^C6^C9)^X)
 * 502) X^((C1^C2^C3^C4^C5^C6^C10)^X)
 * 503) X^((C1^C2^C3^C4^C5^C6^C11)^X)
 * 504) X^((C1^C2^C3^C4^C5^C6^C12)^X)
 * 505) X^((C1^C2^C3^C4^C5^C6^C13)^X)
 * 506) X^((C1^C2^C3^C4^C5^C6^C7^C8)^X)
 * 507) X^((C1^C2^C3^C4^C5^C6^C7^C9)^X)
 * 508) X^((C1^C2^C3^C4^C5^C6^C7^C10)^X)
 * 509) X^((C1^C2^C3^C4^C5^C6^C7^C11)^X)
 * 510) X^((C1^C2^C3^C4^C5^C6^C7^C12)^X)
 * 511) X^((C1^C2^C3^C4^C5^C6^C7^C13)^X)
 * 512) X^((C1^C2^C3^C4^C5^C6^C7^C8^C9)^X)
 * 513) X^((C1^C2^C3^C4^C5^C6^C7^C8^C10)^X)
 * 514) X^((C1^C2^C3^C4^C5^C6^C7^C8^C11)^X)
 * 515) X^((C1^C2^C3^C4^C5^C6^C7^C8^C12)^X)
 * 516) X^((C1^C2^C3^C4^C5^C6^C7^C8^C13)^X)
 * 517) X^((C1^C2^C3^C4^C5^C6^C7^C8^C9^C10)^X)
 * 518) X^((C1^C2^C3^C4^C5^C6^C7^C8^C9^C11)^X)
 * 519) X^((C1^C2^C3^C4^C5^C6^C7^C8^C9^C12)^X)
 * 520) X^((C1^C2^C3^C4^C5^C6^C7^C8^C9^C13)^X)
 * 521) X^((C1^C2^C3^C4^C5^C6^C7^C8^C9^C10^C11)^X)
 * 522) X^((C1^C2^C3^C4^C5^C6^C7^C8^C9^C10^C12)^X)
 * 523) X^((C1^C2^C3^C4^C5^C6^C7^C8^C9^C10^C13)^X)
 * 524) X^((C1^C2^C3^C4^C5^C6^C7^C8^C9^C10^C11^C12)^X)
 * 525) X^((C1^C2^C3^C4^C5^C6^C7^C8^C9^C10^C11^C13)^X)
 * 526) X^((C1^C2^C3^C4^C5^C6^C7^C8^C9^C10^C11^C12^C13)^X)
 * Create an alternate version of Croutonillion by stopping here. Call this number C14.
 * 1) {((X,X)!)![((X,X)!),((X,X)!),....((X,X)!) Times terms ((X,X)!)....((X,X)!),((X,X)!)]}
 * 2) $$C14\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C13\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C12\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C11\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C10\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C9\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C8\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C7\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C6\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C5\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C4\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C3\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C2\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C1\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{X}C1}C2}C3}C4}C5}C6}C7}C8}C9}C10}C11}C12}C13}C14$$
 * 3) X^((C1X^C2X^^C3X^^^C4X^^^^C5X^^^^^C6X^^^^^^C7X^^^^^^^C8X^^^^^^^^C9X^^^^^^^^^C10X^^^^^^^^^^C11X^^^^^^^^^^^C12X^^^^^^^^^^^^C13X^^^^^^^^^^^^^C14X^^^^^^^^^^^^^^^X)$)
 * 4) (X$)![C1^X+C2^X+C3^X+C4^X+C5^X+C6^X+C7^X+C8^X+C9^X+C10^X+C11^X+C12^X+C13^X+C14^X]
 * 5) X^(103*10 3*10 3*10 3*10 3*10 3*10 3*10 3,000,000      +3 )
 * 6) X^(103*10 3*10 3*10 3*10 3*10 3*10 3*10 3,000,000,000      +3 )
 * 7) X*(103*10 3*10 3*10 3*10 3*10 3*10 3*10 3,000,000      +3 )
 * 8) X*[(103*10 3*10 3*10 3*10 3*10 3*10 3*10 3,000,000,000      +3 )]
 * 9) X!(103*10 3*10 3*10 3*10 3*10 3*10 3*10 3,000,000      +3 )
 * 10) X!(103*10 3*10 3*10 3*10 3*10 3*10 3*10 3,000,000,000      +3 )
 * 11) X#(103*10 3*10 3*10 3*10 3*10 3*10 3*10 3,000,000      +3 )
 * 12) X#(103*10 3*10 3*10 3*10 3*10 3*10 3*10 3,000,000,000      +3 )
 * 13) X%(103*10 3*10 3*10 3*10 3*10 3*10 3*10 3,000,000      +3 )
 * 14) X%(103*10 3*10 3*10 3*10 3*10 3*10 3*10 3,000,000,000      +3 )
 * 15) X^(203,542*10138,732,019,349)
 * 16) X^(Picillion)
 * 17) X^($$2 \lfloor 10^{20} / 9\rfloor$$)
 * 18) X^(103,000,000,000,003)
 * 19) X^(Femtillion)
 * 20) X^($$10^{3\times 10^{15}+3}$$)
 * 21) X^($$10^{3\times 10^{3,000,000}+3}$$)
 * 22) X^(Gigillion)
 * 23) X^($$10^{3\times 10^{3,000,000,000}+3}$$)
 * 24) X^($$2 \lfloor 10,000,000,000^{96,543,220,765,693} / 2\rfloor$$)
 * 25) X^($$2 \lfloor 10,000,000,000,000,000^{457,748,896,324,123,446,6720} / 3\rfloor$$)
 * 26) X + 1
 * 27) X + 1
 * 28) X + 1
 * 29) X^($$\lbrace \underbrace{13,13,13,\cdots,13,13,13}_{98546372819073826354217927}\rbrace$$)
 * 30) X^($$\lbrace \underbrace{3333,3333,3333,\cdots,3333,3333,3333}_{63524162738926354273890825127}\rbrace$$)
 * 31) X^($$\lbrace \underbrace{123,123,123,\cdots,123,123,123}_{23415367892635423123425648983762534327}\rbrace$$)
 * 32) X^($$\lbrace \underbrace{5673,5673,5673,\cdots,5673,5673,5673}_{87437281984736546378190928746535362784984}\rbrace$$)
 * 33) X^($$\lbrace \underbrace{4763,4763,4763,\cdots,4763,4763,4763}_{67354264736547389028190362737487463521185}\rbrace$$)
 * 34) X^($$\lbrace \underbrace{3333,3333,3333,\cdots,3333,3333,3333}_{83256174839847569378213546748373647589335}\rbrace$$)
 * 35) X^($$\lbrace \underbrace{173,173,173,\cdots,173,173,173}_{43627489574864783647382918746352474859973835236}\rbrace$$)
 * 36) X^($$\lbrace \underbrace{579,579,579,\cdots,579,579,579}_{46378291874653748957382984765374637987382989978}\rbrace$$)
 * 37) X^($$\lbrace \underbrace{698,698,698,\cdots,698,698,698}_{25362537485904736654738490536478987645794874674}\rbrace$$)
 * 38) X^($$\lbrace \underbrace{999,999,999,\cdots,999,999,999}_{99999999999999999999999999999999999999999999999}\rbrace$$)
 * 39) X^($$\lbrace \underbrace{888,888,888,\cdots,888,888,888}_{88888888888888888888888888888888888888888888888}\rbrace$$)
 * 40) X^($$\lbrace \underbrace{777,777,777,\cdots,777,777,777}_{77777777777777777777777777777777777777777777777}\rbrace$$)
 * 41) X^($$\lbrace \underbrace{666,666,666,\cdots,666,666,666}_{66666666666666666666666666666666666666666666666}\rbrace$$)
 * 42) X^($$\lbrace \underbrace{555,555,555,\cdots,555,555,555}_{55555555555555555555555555555555555555555555555}\rbrace$$)
 * 43) X^($$\lbrace \underbrace{444,444,444,\cdots,444,444,444}_{44444444444444444444444444444444444444444444444}\rbrace$$)
 * 44) X^($$\lbrace \underbrace{333,333,333,\cdots,333,333,333}_{33333333333333333333333333333333333333333333333}\rbrace$$)
 * 45) X^($$\lbrace \underbrace{222,222,222,\cdots,222,222,222}_{22222222222222222222222222222222222222222222222}\rbrace$$)
 * 46) X^($$\lbrace \underbrace{111,111,111,\cdots,111,111,111}_{1111111111111111111111111111111111111111111111}\rbrace$$)
 * 47) X^($$\lbrace \underbrace{987654321,987654321,987654321,\cdots,987654321,987654321,987654321}_{9876543210}\rbrace$$)
 * 48) X^($$\lbrace \underbrace{97531,97531,97531,\cdots,97531,97531,97531}_{9753197531975319753197531975319753}\rbrace$$)
 * 49) X^($$\lbrace \underbrace{8642,8642,8642,\cdots,8642,8642,8642}_{8642864286428642864286428642864286428642}\rbrace$$)
 * 50) X^($$\lbrace \underbrace{999999999,999999999,999999999,\cdots,999999999,999999999,999999999}_{9999999999}\rbrace$$)
 * 51) X^($$\lbrace \underbrace{88888888,88888888,88888888,\cdots,88888888,88888888,88888888}_{8888888888888888}\rbrace$$)
 * 52) X^($$\lbrace \underbrace{7777777,7777777,7777777,\cdots,7777777,7777777,7777777}_{7777777777777777777777}\rbrace$$)
 * 53) X^($$\lbrace \underbrace{666666,666666,666666,\cdots,666666,666666,666666}_{6666666666666666666666666666}\rbrace$$)
 * 54) X^($$\lbrace \underbrace{55555,55555,55555,\cdots,55555,55555,55555}_{5555555555555555555555555555555555}\rbrace$$)
 * 55) X^($$\lbrace \underbrace{4444,4444,4444,\cdots,4444,4444,4444}_{4444444444444444444444444444444444444444}\rbrace$$)
 * 56) X^($$\lbrace \underbrace{333,333,333,\cdots,333,333,333}_{3333333333333333333333333333333333333333333333}\rbrace$$)
 * 57) X^($$\lbrace \underbrace{22,22,22,\cdots,22,22,22}_{2222222222222222222222222222222222222222222222222222}\rbrace$$)
 * 58) X^($$\lbrace \underbrace{10,10,10,\cdots,10,10,10}_{1010101010101010101010101010101010101010101010101010}\rbrace$$)
 * 59) X^($$\lbrace \underbrace{12,12,12,\cdots,12,12,12}_{1212121212121212121212121212121212121212121212121212}\rbrace$$)
 * 60) X^($$\lbrace \underbrace{23,23,23,\cdots,23,23,23}_{2323232323232323232323232323232323232323232323232323}\rbrace$$)
 * 61) X^($$\lbrace \underbrace{34,34,34,\cdots,34,34,34}_{3434343434343434343434343434343434343434343434343434}\rbrace$$)
 * 62) X^($$\lbrace \underbrace{45,45,45,\cdots,45,45,45}_{4545454545454545454545454545454545454545454545454545}\rbrace$$)
 * 63) X^($$\lbrace \underbrace{56,56,56,\cdots,56,56,56}_{5656565656565656565656565656565656565656565656565656}\rbrace$$)
 * 64) X^($$\lbrace \underbrace{67,67,67,\cdots,67,67,67}_{6767676767676767676767676767676767676767676767676767}\rbrace$$)
 * 65) X^($$\lbrace \underbrace{78,78,78,\cdots,78,78,78}_{7878787878787878787878787878787878787878787878787878}\rbrace$$)
 * 66) X^($$\lbrace \underbrace{89,89,89,\cdots,89,89,89}_{8989898989898989898989898989898989898989898989898989}\rbrace$$)
 * 67) X^($$\lbrace \underbrace{90,90,90,\cdots,90,90,90}_{9090909090909090909090909090909090909090909090909090}\rbrace$$)
 * 68) X^($$\lbrace \underbrace{987,987,987,\cdots,987,987,987}_{9879879879879879879879879879879879879879879879}\rbrace$$)
 * 69) X^($$\lbrace \underbrace{876,876,876,\cdots,876,876,876}_{8768768768768768768768768768768768768768768768}\rbrace$$)
 * 70) X^($$\lbrace \underbrace{765,765,765,\cdots,765,765,765}_{7657657657657657657657657657657657657657657657}\rbrace$$)
 * 71) X^($$\lbrace \underbrace{654,654,654,\cdots,654,654,654}_{6546546546546546546546546546546546546546546546}\rbrace$$)
 * 72) X^($$\lbrace \underbrace{543,543,543,\cdots,543,543,543}_{5435435435435435435435435435435435435435435435}\rbrace$$)
 * 73) X^($$\lbrace \underbrace{432,432,432,\cdots,432,432,432}_{4324324324324324324324324324324324324324324324}\rbrace$$)
 * 74) X^($$\lbrace \underbrace{321,321,321,\cdots,321,321,321}_{3213213213213213213213213213213213213213213213}\rbrace$$)
 * 75) X^($$\lbrace \underbrace{210,210,210,\cdots,210,210,210}_{2102102102102102102102102102102102102102102102}\rbrace$$)
 * 76) X^($$\lbrace \underbrace{109,109,109,\cdots,109,109,109}_{1091091091091091091091091091091091091091091091}\rbrace$$)
 * 77) X^($$\lbrace \underbrace{246,246,246,\cdots,246,246,246}_{2462462462462462462462462462462462462462462462}\rbrace$$)
 * 78) X^($$\lbrace \underbrace{468,468,468,\cdots,468,468,468}_{4684684684684684684684684684684684684684684684}\rbrace$$)
 * 79) X^($$\lbrace \underbrace{680,680,680,\cdots,689,680,680}_{6806806806806806806806806806806806806806806806}\rbrace$$)
 * 80) X^($$\lbrace \underbrace{135,135,135,\cdots,135,135,135}_{1351351351351351351351351351351351351351351351}\rbrace$$)
 * 81) X^($$\lbrace \underbrace{357,357,357,\cdots,357,357,357}_{3573573573573573573573573573573573573573573573}\rbrace$$)
 * 82) X^($$\lbrace \underbrace{579,579,579,\cdots,579,579,579}_{5795795795795795795795795795795795795795795795}\rbrace$$)
 * 83) X^($$\lbrace \underbrace{791,791,791,\cdots,791,791,791}_{7917917917917917917917917917917917917917917917}\rbrace$$)
 * 84) X^($$\lbrace \underbrace{913,913,913,\cdots,913,913,913}_{9139139139139139139139139139139139139139139139}\rbrace$$)
 * 85) X^($$\lbrace \underbrace{136,136,136,\cdots,136,136,136}_{1361361361361361361361361361361361361361361361}\rbrace$$)
 * 86) X^($$\lbrace \underbrace{350,350,350,\cdots,350,350,350}_{3503503503503503503503503503503503503503503503}\rbrace$$)
 * 87) X^($$\lbrace \underbrace{572,572,572,\cdots,572,572,572}_{5725725725725725725725725725725725725725725725}\rbrace$$)
 * 88) X^($$\lbrace \underbrace{727,727,727,\cdots,727,727,727}_{7277277277277277277277277277277277277277277277}\rbrace$$)
 * 89) X^($$\lbrace \underbrace{275,275,275,\cdots,275,275,275}_{2752752752752752752752752752752752752752752752}\rbrace$$)
 * 90) X^($$\lbrace \underbrace{755,755,755,\cdots,755,755,755}_{7557557557557557557557557557557557557557557557}\rbrace$$)
 * 91) X^($$\lbrace \underbrace{1030,1030,1030,\cdots,1030,1030,1030}_{1030103010301030103010301030103010301030}\rbrace$$)
 * 92) X^($$\lbrace \underbrace{1785,1785,1785,\cdots,1785,1785,1785}_{1785178517851785178517851785178517851785}\rbrace$$)
 * 93) X^($$\lbrace \underbrace{2815,2815,2815,\cdots,2815,2815,2815}_{2815281528152815281528152815281528152815}\rbrace$$)
 * 94) X^($$\lbrace \underbrace{4600,4600,4600,\cdots,4600,4600,4600}_{4600460046004600460046004600460046004600}\rbrace$$)
 * 95) X^($$\lbrace \underbrace{7415,7415,7415,\cdots,7415,7415,7415}_{7415741574157415741574157415741574157415}\rbrace$$)
 * 96) X^($$\lbrace \underbrace{12015,12015,12015,\cdots,12015,12015,12015}_{1201512015120151201512015120151201}\rbrace$$)
 * 97) X^($$\lbrace \underbrace{17430,17430,17430,\cdots,17430,17430,17430}_{1743017430174301743017430174301743}\rbrace$$)
 * 98) X^($$\lbrace \underbrace{29445,29445,29445,\cdots,29445,29445,29445}_{2944529445294452944529445294452944}\rbrace$$)
 * 99) X^($$\lbrace \underbrace{46875,46875,46875,\cdots,46875,46875,46875}_{4687546875468754687546875468754687}\rbrace$$)
 * 100) X^($$\lbrace \underbrace{75315,75315,75315,\cdots,75315,75315,75315}_{7531575315753157531575315753157531}\rbrace$$)
 * 101) X^($$\lbrace \underbrace{121190,121190,121190\cdots,121190,121190,121190}_{12119012119012119012119012119}\rbrace$$)
 * 102) X^($$\lbrace \underbrace{196405,196405,196405\cdots,196405,196405,196405}_{19640519640519640519640519640}\rbrace$$)
 * Create an alternate version of Croutonillion by stopping here. Call this number C15.
 * 1) $$C15\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C14\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C13\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C12\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C11\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C10\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C9\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C8\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C7\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C6\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C5\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C4\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C3\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C2\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C1\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{X}C1}C2}C3}C4}C5}C6}C7}C8}C9}C10}C11}C12}C13}C14}C15$$
 * 2) X^((C1X^C2X^^C3X^^^C4X^^^^C5X^^^^^C6X^^^^^^C7X^^^^^^^C8X^^^^^^^^C9X^^^^^^^^^C10X^^^^^^^^^^C11X^^^^^^^^^^^C12X^^^^^^^^^^^^C13X^^^^^^^^^^^^^C14X^^^^^^^^^^^^^^^C15^^^^^^^^^^^^^^^X)$)
 * 3) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1]}(X^X)
 * 4) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2]}(X^X)
 * 5) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3]}(X^X)
 * 6) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4]}(X^X)
 * 7) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5]}(X^X)
 * 8) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6]}(X^X)
 * 9) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7]}(X^X)
 * 10) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8]}(X^X)
 * 11) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9]}(X^X)
 * 12) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10]}(X^X)
 * 13) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11]}(X^X)
 * 14) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12]}(X^X)
 * 15) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13]}(X^X)
 * 16) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C14]}(X^X)
 * 17) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C14,C15]}(X^X)
 * 18) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X]}(X^X)
 * 19) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X]}(X^X)
 * 20) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X]}(X^X)
 * 21) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X]}(X^X)
 * 22) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X]}(X^X)
 * 23) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X]}(X^X)
 * 24) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X]}(X^X)
 * 25) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X]}(X^X)
 * 26) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X]}(X^X)
 * 27) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X]}(X^X)
 * 28) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X,C11X]}(X^X)
 * 29) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X,C11X,C12X]}(X^X)
 * 30) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X,C11X,C12X,C13X]}(X^X)
 * 31) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X,C11X,C12X,C13X,C14X]}(X^X)
 * 32) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X,C11X,C12X,C13X,C14X,C15X]}(X^X)
 * 33) C1X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C1X
 * 34) C2X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C2X
 * 35) C3X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C3X
 * 36) C4X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C4X
 * 37) C5X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C5X
 * 38) C6X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C6X
 * 39) C7X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C7X
 * 40) C8X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C8X
 * 41) C9X^13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C9X
 * 42) C10X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C10X
 * 43) C11X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C11X
 * 44) C12X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C12X
 * 45) C13X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C13X
 * 46) C14X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C14X
 * 47) C15X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C15X
 * 48) X^X+C1^X+C2^X+C3^X+C4^X+C5^X+C6^X+C7^X+C8^X+C9^X+C10^X+C11^X+C12^X+C13^X+C14^X+C15^X
 * 49) {X^{E100.000.000.000.000.000.000.000{#&#&#&#&#&#..........((443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) Times # elements)..........#&#&#&#&#&#}$}^{E100.000.000.000.000.000.000.000{#&#&#&#&#&#..........((443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) Times # elements)..........#&#&#&#&#&#}$}^..........{{X^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^(443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) Times {E100.000.000.000.000.000.000.000{#&#&#&#&#&#..........((443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) times # elements)..........#&#&#&#&#&#}$}}..........^{E100.000.000.000.000.000.000.000{#&#&#&#&#&#..........((443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) Times # elements)}$}..........#&#&#&#&#&#}$}E100.000.000.000.000.000.000.000}![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C14,C15]
 * 50) XE100{#&#&#&#w/grand Sprach Zarathustra #s... &#&#&#&#&#&#&#&#&#&#}10012345678909758492715364758699598473939893939
 * 51) XE100{#&#&#&#w/grand Sprach Zarathustra #s... &#&#&#&#&#&#&#&#&#&#}11234567890987654321746352829282765454738388272
 * 52) XE100{#&#&#&#w/grand Sprach Zarathustra #s... &#&#&#&#&#&#&#&#&#&#}11234567890987654321234567890847635424242453546
 * 53) XE100{#&#&#&#w/grand Sprach Zarathustra #s... &#&#&#&#&#&#&#&#&#&#}11234567890987654321234567890987654321848764647
 * 54) XE100{#&#&#&#w/grand Sprach Zarathustra #s... &#&#&#&#&#&#&#&#&#&#}11234567890987654321234567890987654321234567890
 * 55) XE100{#&#&#&#w/grand Sprach Zarathustra #s... &#&#&#&#&#&#&#&#&#&#}21234567890987654321234567890987654321234567890
 * 56) XE100{#&#&#&#w/grand Sprach Zarathustra #s... &#&#&#&#&#&#&#&#&#&#}21234567890987654321234567890987654321234567899
 * 57) XE100{#&#&#&#w/grand Sprach Zarathustra #s... &#&#&#&#&#&#&#&#&#&#}32123456789098765432123456789098765432123456789
 * 58) XE100{#&#&#&#w/grand Sprach Zarathustra #s... &#&#&#&#&#&#&#&#&#&#}43212345678909876543211234567890987654432123345
 * 59) Repeat step 1,1-2,1-2-3,....1-2-3-....-1-2-3-....1807-1808 for (X^X)^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^((X^X)![9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999]) times
 * 60) Repeat step 1,1-2,1-2-3,....1-2-3-....-1808-1809,then to into reverse order from 1809,1809-1808,......1809-1808.....3-2-1 for (X^X)################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################################((X^X)! [999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999]) times
 * 61) Repeat previous step (X^X)****************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************************((X^X)! [9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999]) times
 * 62) repeat previous step (X^X)%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%((X^X)! [9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999]) times
 * 63) repeat previous step (X^X)&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&((X^X)! [9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999]) times
 * 64) repeat previous step (X^X)&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#&#((X^X)! [99999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999])times
 * 65) Repeat step 1-1814 for Crouton(1) times
 * 66) Crouton(n) = Crouton(n, googoltriplex)
 * 67) Crouton(0, n) = n
 * 68) Crouton(1, n) = {n,n,n}
 * 69) Crouton(2, n) = BB({n,n,n})
 * 70) Crouton(3, n) = megafuga(booga(BB({n,n,n})))
 * 71) Crouton(4, n) = E(megafuga(booga(BB({n,n,n})))) # (10^27+1)
 * 72) Repeat step 1-1815 for Crouton(2) times
 * 73) Repeat step 1-1816 for Crouton(3) times
 * 74) Repeat step 1-1817 for Crouton(4) times
 * 75) Repeat step 1-1818 for Crouton(5) times
 * 76) Repeat step 1-1819 for Crouton(6) times
 * 77) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{99999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 78) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 79) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 80) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{99999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 81) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 82) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 83) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{99999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 84) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 85) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 86) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{99999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 87) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 88) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 89) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{99999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 90) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 91) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 92) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{99999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 93) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 94) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 95) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{99999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 96) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 97) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 98) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{99999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 99) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 100) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 101) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{99999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 102) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 103) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 104) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{99999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 105) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 106) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 107) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{99999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 108) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 109) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 110) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{99999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 111) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 112) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 113) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{99999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 114) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 115) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 116) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{99999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 117) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 118) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 119) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{99999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 120) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{99999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 121) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999998}\rbrace$$)
 * 122) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999997}\rbrace$$)
 * 123) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999996}\rbrace$$)
 * 124) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999995}\rbrace$$)
 * 125) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999994}\rbrace$$)
 * 126) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999993}\rbrace$$)
 * 127) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999992}\rbrace$$)
 * 128) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999991}\rbrace$$)
 * 129) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999990}\rbrace$$)
 * 130) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999989}\rbrace$$)
 * 131) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999988}\rbrace$$)
 * 132) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999987}\rbrace$$)
 * 133) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999986}\rbrace$$)
 * 134) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999985}\rbrace$$)
 * 135) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999984}\rbrace$$)
 * 136) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999983}\rbrace$$)
 * 137) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999982}\rbrace$$)
 * 138) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999981}\rbrace$$)
 * 139) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999980}\rbrace$$)
 * 140) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999979}\rbrace$$)
 * 141) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999978}\rbrace$$)
 * 142) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999977}\rbrace$$)
 * 143) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999976}\rbrace$$)
 * 144) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999975}\rbrace$$)
 * 145) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999974}\rbrace$$)
 * 146) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999973}\rbrace$$)
 * 147) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999972}\rbrace$$)
 * 148) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999971}\rbrace$$)
 * 149) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999970}\rbrace$$)
 * 150) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999969}\rbrace$$)
 * 151) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999968}\rbrace$$)
 * 152) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999967}\rbrace$$)
 * 153) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999966}\rbrace$$)
 * 154) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999965}\rbrace$$)
 * 155) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999964}\rbrace$$)
 * 156) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999963}\rbrace$$)
 * 157) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999962}\rbrace$$)
 * 158) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999961}\rbrace$$)
 * 159) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999960}\rbrace$$)
 * 160) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999959}\rbrace$$)
 * 161) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999958}\rbrace$$)
 * 162) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999957}\rbrace$$)
 * 163) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999956}\rbrace$$)
 * 164) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999955}\rbrace$$)
 * 165) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999954}\rbrace$$)
 * 166) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999955}\rbrace$$)
 * 167) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999954}\rbrace$$)
 * 168) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999953}\rbrace$$)
 * 169) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999952}\rbrace$$)
 * 170) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999984}\rbrace$$)
 * 171) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999951}\rbrace$$)
 * 172) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999950}\rbrace$$)
 * 173) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999949}\rbrace$$)
 * 174) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999948}\rbrace$$)
 * 175) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999947}\rbrace$$)
 * 176) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999946}\rbrace$$)
 * 177) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999945}\rbrace$$)
 * 178) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999944}\rbrace$$)
 * 179) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999943}\rbrace$$)
 * 180) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999942}\rbrace$$)
 * 181) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999941}\rbrace$$)
 * 182) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999940}\rbrace$$)
 * 183) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999939}\rbrace$$)
 * 184) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999938}\rbrace$$)
 * 185) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999937}\rbrace$$)
 * 186) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999936}\rbrace$$)
 * 187) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999935}\rbrace$$)
 * 188) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999934}\rbrace$$)
 * 189) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999933}\rbrace$$)
 * 190) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999932}\rbrace$$)
 * 191) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999931}\rbrace$$)
 * 192) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999930}\rbrace$$)
 * 193) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999929}\rbrace$$)
 * 194) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999928}\rbrace$$)
 * 195) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999927}\rbrace$$)
 * 196) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999926}\rbrace$$)
 * 197) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999925}\rbrace$$)
 * 198) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999924}\rbrace$$)
 * 199) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999923}\rbrace$$)
 * 200) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999922}\rbrace$$)
 * 201) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999921}\rbrace$$)
 * 202) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999920}\rbrace$$)
 * 203) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999919}\rbrace$$)
 * 204) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999918}\rbrace$$)
 * 205) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999917}\rbrace$$)
 * 206) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999984}\rbrace$$)
 * 207) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999916}\rbrace$$)
 * 208) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999915}\rbrace$$)
 * 209) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999914}\rbrace$$)
 * 210) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999913}\rbrace$$)
 * 211) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999912}\rbrace$$)
 * 212) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999911}\rbrace$$)
 * 213) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999910}\rbrace$$)
 * 214) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999909}\rbrace$$)
 * 215) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999908}\rbrace$$)
 * 216) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999907}\rbrace$$)
 * 217) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999906}\rbrace$$)
 * 218) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999905}\rbrace$$)
 * 219) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999904}\rbrace$$)
 * 220) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999903}\rbrace$$)
 * 221) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999902}\rbrace$$)
 * 222) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999901}\rbrace$$)
 * 223) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{9999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999900}\rbrace$$)
 * 224) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999}\rbrace$$)
 * 225) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999998}\rbrace$$)
 * 226) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999997}\rbrace$$)
 * 227) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999996}\rbrace$$)
 * 228) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999995}\rbrace$$)
 * 229) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999994}\rbrace$$)
 * 230) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999993}\rbrace$$)
 * 231) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999992}\rbrace$$)
 * 232) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999991}\rbrace$$)
 * 233) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999990}\rbrace$$)
 * 234) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999989}\rbrace$$)
 * 235) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999988}\rbrace$$)
 * 236) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999987}\rbrace$$)
 * 237) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999986}\rbrace$$)
 * 238) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999985}\rbrace$$)
 * 239) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999984}\rbrace$$)
 * 240) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999983}\rbrace$$)
 * 241) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999982}\rbrace$$)
 * 242) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999981}\rbrace$$)
 * 243) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999980}\rbrace$$)
 * 244) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999979}\rbrace$$)
 * 245) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999978}\rbrace$$)
 * 246) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999977}\rbrace$$)
 * 247) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999976}\rbrace$$)
 * 248) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999975}\rbrace$$)
 * 249) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999974}\rbrace$$)
 * 250) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999973}\rbrace$$)
 * 251) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999972}\rbrace$$)
 * 252) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999971}\rbrace$$)
 * 253) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999970}\rbrace$$)
 * 254) X^($$\lbrace \underbrace{9,9,9,\cdots,9,9,9}_{999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999969}\rbrace$$)
 * Create an alternate version of Croutonillion by stopping here. Call this number C16.
 * 1) $$C16\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C15\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C14\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C13\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C12\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C11\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C10\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C9\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C8\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C7\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C6\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C5\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C4\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C3\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C2\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{C1\underbrace{\uparrow_{\uparrow_{..._{\uparrow_{\uparrow}}}}}_{X}C1}C2}C3}C4}C5}C6}C7}C8}C9}C10}C11}C12}C13}C14}C15}C16$$
 * 2) X^((C1X^C2X^^C3X^^^C4X^^^^C5X^^^^^C6X^^^^^^C7X^^^^^^^C8X^^^^^^^^C9X^^^^^^^^^C10X^^^^^^^^^^C11X^^^^^^^^^^^C12X^^^^^^^^^^^^C13X^^^^^^^^^^^^^C14X^^^^^^^^^^^^^^^C15^^^^^^^^^^^^^^^C16^^^^^^^^^^^^^^^^X)$)
 * 3) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1]}(X^X)
 * 4) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2]}(X^X)
 * 5) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3]}(X^X)
 * 6) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4]}(X^X)
 * 7) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5]}(X^X)
 * 8) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6]}(X^X)
 * 9) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7]}(X^X)
 * 10) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8]}(X^X)
 * 11) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9]}(X^X)
 * 12) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10]}(X^X)
 * 13) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11]}(X^X)
 * 14) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12]}(X^X)
 * 15) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13]}(X^X)
 * 16) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C14]}(X^X)
 * 17) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C14,C15,]}(X^X)
 * 18) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C14,C15,C16]}(X^X)
 * 19) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X]}(X^X)
 * 20) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X]}(X^X)
 * 21) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X]}(X^X)
 * 22) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X]}(X^X)
 * 23) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X]}(X^X)
 * 24) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X]}(X^X)
 * 25) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X]}(X^X)
 * 26) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X]}(X^X)
 * 27) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X]}(X^X)
 * 28) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X]}(X^X)
 * 29) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X,C11X]}(X^X)
 * 30) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X,C11X,C12X]}(X^X)
 * 31) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X,C11X,C12X,C13X]}(X^X)
 * 32) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X,C11X,C12X,C13X,C14X]}(X^X)
 * 33) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X,C11X,C12X,C13X,C14X,C15X]}(X^X)
 * 34) (X^X){(7625597484987((7625597484987)↑7625597484987(7625597484986)↑7625597484987(7625597484985)↑7625597484987    (7625597484984)....↑7625597484987(3)↑7625597484987(2))![C1X,C2X,C3X,C4X,C5X,C6X,C7X,C8X,C9X,C10X,C11X,C12X,C13X,C14X,C15X,C16X]}(X^X)
 * 35) C1X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C1X
 * 36) C2X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C2X
 * 37) C3X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C3X
 * 38) C4X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C4X
 * 39) C5X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C5X
 * 40) C6X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C6X
 * 41) C7X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C7X
 * 42) C8X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C8X
 * 43) C9X^13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C9X
 * 44) C10X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C10X
 * 45) C11X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C11X
 * 46) C12X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C12X
 * 47) C13X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C13X
 * 48) C14X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C14X
 * 49) C15X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C15X
 * 50) C16X{13407807929942597099574024998205846127479365820592393377723561443721764030073546976801874298166903427690031858186486050853753882811946569946433649006084096}C16X
 * 51) X^X+C1^X+C2^X+C3^X+C4^X+C5^X+C6^X+C7^X+C8^X+C9^X+C10^X+C11^X+C12^X+C13^X+C14^X+C15^X+C16^X
 * 52) {X^{E100.000.000.000.000.000.000.000{#&#&#&#&#&#..........((443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) Times # elements)..........#&#&#&#&#&#}$}^{E100.000.000.000.000.000.000.000{#&#&#&#&#&#..........((443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) Times # elements)..........#&#&#&#&#&#}$}^..........{{X^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^(443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) Times {E100.000.000.000.000.000.000.000{#&#&#&#&#&#..........((443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) times # elements)..........#&#&#&#&#&#}$}}..........^{E100.000.000.000.000.000.000.000{#&#&#&#&#&#..........((443,426,488,243,037,769,948,249,630,619,149,892,803^443,426,488,243,037,769,948,249,630,619,149,892,803) Times # elements)}$}..........#&#&#&#&#&#}$}E100.000.000.000.000.000.000.000}![C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C14,C15,C16]
 * Create an alternate version of Croutonillion by stopping here. Let's call this number C17
 * 1) X^C1^C2^C3^C4^C5^C6^C7^C8^C9^C10^C11^C12^C13^C14^C15^C16^C17
 * 2) X^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^(Repeat step 1-2051 9001 times)^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^ X^C1^C2^C3^C4^C5^C6^C7^C8^C9^C10^C11^C12^C13^C14^C15^C16^C17*X^C1^C2^C3^C4^C5^C6^C7^C8^C9^C10^C11^C12^C13^C14^C15^C16^C17*X^C1^C2^C3^C4^C5^C6^C7^C8^C9^C10^C11^C12^C13^C14^C15^C16^C17*X^C1^C2^C3^C4^C5^C6^C7^C8^C9^C10^C11^C12^C13^C14^C15^C16^C17*X^C1^C2^C3^C4^C5^C6^C7^C8^C9^C10^C11^C12^C13^C14^C15^C16^C17*X^C1^C2^C3^C4^C5^C6^C7^C8^C9^C10^C11^C12^C13^C14^C15^C16^C17
 * 3) Rayo(Rayo(Rayo(Rayo...(Rayo(X)))))...))), with X Number of (Rayo function) things.
 * X^N, where N is the number of pixels in this box (at ordinary zoom level):
 * {X,X,N}, where N is the number of pixels in this box (at ordinary zoom level):
 * X^N, where N is croutonillion in Andre Joyce's merology system, rounded to the nearest whole number
 * 1) X's decimal expansion (e.g. 123,456,789) in base X (e.g. 123,456,789 in base 16)
 * 2) Repeat step 1-2057 (Rayo's number)![ X ] times
 * 3) X&(Repeat step 1-2058 (Rayo's number)![ X ] times)^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^(Repeat step 1-2058 (Rayo's number)![ X ] times)&(Repeat step 1-2058 (Rayo's number)![ X ] times)&(Repeat step 1-2058 (Rayo's number)![ X ] times)&(Repeat step 1-2058 (Rayo's number)![ X ] times)&(Repeat step 1-2058 (Rayo's number)![ X ] times)&(Repeat step 1-2058 (Rayo's number)![ X ] times)&(Repeat step 1-2058 (Rayo's number)![ X ] times)&... with (Repeat step 1-2058 (Rayo's number)![ X ] times) times that the (Repeat step 1-2058 (Rayo's number)![ X ] times)& repeats.
 * 4) $$F_7(F_6(F_5(F_4(F_3(F_2(F_1(X)))))))$$
 * 5) Repeat step 1,1-2,1-2-3,.....,1-....2060,go into reverse order 2060,2060-2059,......,2059-....2-1 $$F_7(F_6(F_5(F_4(F_3(F_2(F_1(X)))))))$$)times
 * 6) X+{[1(X+1)]![X^X]}$
 * 7) Multillion*53^X+Rayo's number
 * 8) Worm(X)+Hydra(X)+fφ(C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C14,C15,C16,C17)(X)
 * 9) Repeat all previous prime-numbered steps in order (C2+C3+C5+C7+C11+C13+C17) times
 * 10) Repeat all previous composite-numbered steps in order (C4+C6+C8+C9+C10+C12+C14+C15+C16) times
 * 11) Repeat step 1 C1 times
 * 12) f(g(sg(g(f(TREE(Rayo(17,438,957,203,458+X))))))), where f, g, and sg are defined in Billy-bob Mario's function to extend upon gigoombaverse
 * 13) A(A(A(A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),X),A(X,X))))),A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))))),A(A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))))),A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))))))),A(A(A(X,X),A(X,X)),A(A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),X),A(X,X))))
 * 14) A(A(A(A(A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),X),A(X,X))))),A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))))),A(A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))))),A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))))))),A(A(A(X,X),A(X,X)),A(A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),X),A(X,X)))),A(A(A(A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),X),A(X,X))))),A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))))),A(A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))))),A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))))))),A(A(A(X,X),A(X,X)),A(A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),X),A(X,X)))))
 * 15) Arx(Arx(Arx(X,X,X)))
 * 16) X#FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(10^100))))))))))X
 * 17) repeat step 1,1-2,1-2-3,....,1-2-....-2073,then go into reverse order repeat step 2073,2073-2072,....,2073-2072-...-2-1 for X#FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(X))))))))))X
 * 18) Let ZZ(n) denote the value obtaineded from the above process with initial value n. Using the definitions given here, [ZZ,ZZ,10100,2](X+1).
 * 19) (X#FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(X))))))))))$) in a poligon of (X#FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(FOOT(X))))))))))$) sides
 * 20) ((FOOT(X^^^^^^X))^^^(X^X+X^3))^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^X
 * 21) X^^^^N, where N is the number of pixels in this box (at ordinary zoom level):
 * 22) FOOT(X)^^X
 * {X,6(1)2}
 * 1) Let C be the largest Costas array with the following properties: the size of C is less than the current step number, and C is lexicographically the smallest Costas array of its size. Then for each member of C in order (interpreting C as a list of 1-indexed positive integers) execute step C.
 * 2) Rayo(TREE(GX))
 * [X,X YX X X,X]HC
 * 1) Similate step 10100based on the operation's law of step from 1 to 2083.
 * 2) Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(...(5,000 repeats)...))))...))*C17*X*X*G(Arx(Rayo(tree(busybeaver(X))))
 * 3) repeat step 1-2085 of croutonillion 420,420,420,420,420,420,420*G(420) and call it number B  G(G(G(G(G(G(G(G(G(G(G(G(G(GRayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(G(G(G(G(G(G(G(G(Rayo(Rayo(Rayo(Rayo(Tree(Tree(Tree(Tree(G(G(G(G(Rayo(X)*B (G(B))
 * 4) X^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^X
 * 5) Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(...((X$)![X$] inside a poligono of ((X$)![X$])repeats)...))))...))*C17*X*X*G(Arx(Rayo(tree(busybeaver(X))))
 * 6) repeat step 1-2088 and go back 2088-1 of croutonillion 999,999,999,999,999,999,999,999,999,999,999,999,999,999,999,999,999,999*G(999,999,999,999,999,999,999,999,999,999,999,999,999,999,999,999,999,999)and call it number Y G(G(G(G(G(G(G(G(G(G(G(G(G(GRayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(Rayo(Tree(G(G(G(G(G(G(G(G(Rayo(Rayo(Rayo(Rayo(Tree(Tree(Tree(Tree(G(G(G(G(Rayo(X)*Y (G(Y))
 * 7) Nasty satanic smashing unbeatable godawful gargantuan nasty satanic smashing unbeatable godawful gargantuan nasty satanic smashing unbeatable godawful gargantuan nasty satanic smashing unbeatable godawful gargantuan nasty satanic smashing unbeatable godawful gargantuan nasty satanic smashing unbeatable godawful gargantuan nasty satanic smashing unbeatable godawful gargantuan nasty satanic smashing unbeatable godawful gargantuan nasty satanic smashing unbeatable godawful gargantuan nasty satanic smashing unbeatable godawful gargantuan Bostguitarguitarflickerflickersickersicker bostguitarguitarflickerflickersickersicker bostguitarguitarflickerflickersickersicker bostguitarguitarflickerflickersickersicker bostguitarguitarflickerflickersickersicker bostguitarguitarflickerflickersickersicker bostguitarguitarflickerflickersickersicker bostguitarguitarflickerflickersickersicker bostguitarguitarflickerflickersickersicker bostguitarguitarflickerflickersickersicker + X
 * 8) N(X[X]), where N is the norminal function
 * 9) Rayo(FOOT(N(X[Rayo(FOOT(Rayo(Rayo(n)))]))) where N is the norminal function
 * 10) Repeat steps 1-2092 X times
 * 11) Fake step #1 is N(X[X]), where N is the norminal function. At Fake step #2, X is replaced with X from fake step #1, and so on. Number is resulting X from fake step #X, where the last X is from step 2093
 * 12) BIG FOOT + X
 * 13) Lots and lots and lots of words with (Extreamly perfection destroy all of the whole universe%) + X
 * 14) Lib(X^^^^^X)
 * 15) Naidderhoustering(X^^^^^^^^^^^^^^^^X) With Lots and lots and lots and lots and lots and lots of words with (Extreamly perfection Naidderhoustering(X^^^^^^^^^^^^^^^^X%) With lots and lots and lots and lots and lots of Naidderhoustering(X^^^^^^^^^^^^^^^^X)'s) #Naidderhoustering(X^^^^^^^^^^^^^^^^X) With Lots and lots and lots and lots and lots and lots of words with (Extreamly perfection Naidderhoustering(X^^^^^^^^^^^^^^^^X%) With lots and lots and lots and lots and lots of Naidderhoustering(X^^^^^^^^^^^^^^^^X)'s)
 * 16) Lib(Foot(N(Rayo(Xi(Sigma(D(10^(10,000X)))))[Meameamealokkapoowa oompa]))) where N is the norminal function, and D is loader's function
 * 17) JEANHERGTYUIOPKINGERSLIZZERS(Footiest(NESTEST(Rayoest(Xiest(Sigmaest)(Libberedwerest)(DESTEST(10^JEANHERGTYUIOPKINGERSLIZZERS(X^^^^^^^^^^^^^^^^^^^^^^^^^X)))))[JEANHERGTYUIOPKINGERSLIZZERS(X^^^^^^^^^^^^^^^^^^^^^^^^^X)]))) JEANHERGTYUIOPKINGERSLIZZERS(Footiest(NESTEST(Rayoest(Xiest(Sigmaest)(Libberedwerest)(DESTEST(10^JEANHERGTYUIOPKINGERSLIZZERS(X^^^^^^^^^^^^^^^^^^^^^^^^^X)))))[JEANHERGTYUIOPKINGERSLIZZERS(X^^^^^^^^^^^^^^^^^^^^^^^^^X)]))) JEANHERGTYUIOPKINGERSLIZZERS(Footiest(NESTEST(Rayoest(Xiest(Sigmaest)(Libberedwerest)(DESTEST(10^JEANHERGTYUIOPKINGERSLIZZERS(X^^^^^^^^^^^^^^^^^^^^^^^^^X)))))[JEANHERGTYUIOPKINGERSLIZZERS(X^^^^^^^^^^^^^^^^^^^^^^^^^X)]))) where NESTEST is the norminalest functionest everest, and DESTEST is JEANHERGTYUIOPKINGERSLIZZERS worldest's functionest everest!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!
 * 18) N(X)
 * N<0,0,0,...,0,X>(X) (X zeroes)
 * 1) N<0<0<01>1>1>(X)
 * 2) UBAF(UBAF(UBAF(UBAF(UBAF(X)))))
 * 3) X^^(Repeat step 1-2100 n times)^^X
 * X+1
 * 1) $${X,X,X,X,X ... X,X,X}$$ (Number of "x's" is equal to X.)
 * 2) $$\text{O}^X$$, where $$\text{O}$$ is Oblivion
 * 3) Take the definition of Utter Oblivion, replacing Oblivion with $$X$$.
 * 4) $$1+X$$
 * X+1
 * 2*X
 * 1) g(x) (Graham's number sequence)
 * 2) E100#^^^^^#X
 * 3) Rayo(X)
 * 4) FOOT(X)
 * 5) BB(BB(X))
 * 6) X^^^^^X
 * 7) X->X->X->...X->X (Conway chain arrows, X X's)
 * $$|(f_{\omega^\omega}(X))$$
 * X^X
 * 1) X+1232312
 * 2) 10^^X
 * 3) Copy all the previous steps and paste them below this one, X times, then start over from step 1 but delete this step.
 * 4) Copy all the previous steps and paste them below each nonpasted step, X times, then start over from step 1 but delete this step.
 * 5) Copy all the previous steps and paste them X times below each nonpasted step, X times, then start over from step 1 but delete this step.
 * 6) 10^10^X
 * 7) E100#{X}#100
 * XA+
 * 1) \(FOOT_{\varepsilon_0}(X)\) where FOOT_a(x) is a variant of the FGH where f_0(n) = FOOT(n)
 * 2) BB_X(X)
 * 3) The value of Lynz on January 1, year X
 * 4) The value of Clarkkkson on January 1, year X
 * 5) TREE(tree(X))
 * 6) X{FOOT(X){Rayo(X)}FOOT(x)}X
 * 7) Utter Oblivion, but the result in KX-system
 * 8) The average amount of Planck times it would take before a ball of solid lead X km in radius perfectly quantum tunnels through a sheet of iron X^X km thick
 * 9) The Poincare Recurrence Time of a universe X^^^^X times larger than the RL observable universe, with the same average density (using the highest end method of estimating Poincare Recurrence Time, measured in units equal to 1 Planck time/X)
 * 10) The concatenation of all decimal digits of all numbers from 1 to X, X times.
 * 11) TREE(X) ^ TREE(TREE(X)) ^^ TREE(TREE(X)) ^^^ TREE(TREE(TREE(X))) ^^^^ TREE(TREE(TREE(TREE(X)))) ^^^^^ ... TREE(TREE(...(X)...) up to X arrows and TREEs, plus one.
 * 12) X multiplied by the average number of random keystrokes that a monkey would take to type X in binary using a 103 keys keyboard, assuming the '0' key is broken so it has to type 'zero' instead (no caps allowed).
 * 13) Repeat step 1 X^X times, step 2 X^^X times, step 3 X^^^X times, etc. until step 2140. Call this number X1. Repeat step 1 X1^X1 times, step 2 X1^^X1 times, step 3 X1^^^X1 times, etc. until step 2140. Call this number X2. Repeat step 1 X2^X2 times, step 2 X2^^X2 times, step 3 X2^^X2 times, etc. until step 2140. Call this number X3. Procede this way until you reach X7777777.
 * 14) Goodstein(Rayo(TREE(gag(BB(FGH_1729(FOOT(booga(Arx(Graham(Loader(Hydra(SCG(BOX_M(Huford(megafuga(UBAF(X!)))))))))))))))))+1
 * 15) The number of steps making X decimal counters would take, according Jonathan Bower's "Forever Endeavor" tale.
 * 16) Write BB(X) 1's and interpret that number in base X+42.
 * 17) fω1CK(X)
 * 18) fω1CK+1(X)
 * 19) fω1CK+ω(X)
 * 20) fω1CK+ε0(X)
 * 21) fω1CK+ζ0(X)
 * 22) fω1CK+Γ0(X)
 * 23) fω1CK+Γ0+ζ0+ε0+ω +1 (X+1)+1
 * 24) X!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!
 * 25) Repeat steps 1 to 2152 applying the Rayo function X times after each step.
 * 26) Repeat steps 1 to 2153 applying the TREE function Rayo(X) times after each step.
 * 27) Repeat steps 1 to 2154 applying the Hydra function TREE(Rayo(X)) times after each step.
 * 28) Repeat steps 1 to 2155 applying the BB function Hydra(TREE(Rayo(X))) times after each step.
 * X+1
 * 1) Repeat steps 1 to 2157 applying the FOOT function BB(Hydra(TREE(Rayo(X)))) times after each step.
 * 2) X+2159
 * 3) X times 2160
 * 4) X^2161
 * 5) 2162^^X
 * 6) X 2163-ated to X
 * 7) fω+2164216421642164216421642164(X)
 * 8) SCG2165(X)
 * 9) X^2+X^1+X^6+X^6
 * 10) The largest number produced by a halting C program with X characters or less, plus 2167.
 * 11) X { { ... { { X } } ... } } X with 2168^^X pairs of { }.
 * 12) X $ $ $ ... $ $ $ with 21^69 $'s.
 * 13) Repeat last step 2170 times.
 * 14) Take the description of steps 1 to 2170 in binary (big endian). Replace each 0 with 'Worm(' and each 1 with 'Hydra('. Put X at the end, and then close all the parentheses.
 * 15) X ^^ X ^ X ^^^^^^^ X ^^ X.
 * 16) Take the hexadecimal representation of X. Replace all 0's, 1's and 2's by D's, E's and F's respectively. Put n up arrows ^ between each digit, where n is the Ackermann function taking the digit on the left and the digit on the right as arguments. Repeat the operation with the result, then with the new result, again and again, X times.
 * 17) Compute Graham number starting with X and doing 2174 times X steps.
 * 18) X^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^X
 * 19) X ^ (X^1) ^^ (X^^2) ^^^ (X^^^3) ^^^^ (X^^^^4) ^^... ...^^ (X^^...^^X)
 * 20) X { (X{X}X) (X{X}X) } X, with X curly brackets in the middle.
 * 21) EX#(EX#X)##(EX##X)###(EX###X)##...##(EX##...##X) with X+2178 #'s in the last entry.
 * 22) EX#(EX#X)##(EX##X##X)###(EX###X###X###X)##...##(EX##...##X##... ...##X) with X+2179 X's in the last entry.
 * 23) Next prime number after X.
 * 24) X 2181-ated to N, where N is the number of computer cycles it took to compute X in step 2180, including of course the verification that X was indeed a prime number.
 * 25) The number of books in the Aleph library if each book may have up to X pages with up to X characters in each page from an alphabet of 21,822,182 symbols.
 * 26) X->X->...->X with X arrows, then X->X->...->X with that number of arrows, then... X times.
 * 27) X inside X X-gons in Steinhaus-Moser notation.
 * 28) SCGSCG^2815(X)(X)
 * 29) The first value of n where g(n)=(1+1/X)n is greater than f(n)=n2186X.
 * 30) fΓ0Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(Ξ(X)))))))))))))))))))))))(X)+7812
 * 31) The number of wheat grains in a X·X chess board (2X^2-1).
 * 32) The number of chess games in a X·X chess board with 2X pieces by each side: 1 king, 1 queen, 2 rooks, 2 bishops, X-6 knights and X pawns, playing with F.I.D.E. rules (including two-step first pawn moves, en-passant captures, castling, pawn promotion and draw by repetition), but assuming that the 50 moves rule is replaced by a X^2-14 moves rule (since 50=8·8-14).
 * 33) X 2190-ated to N, where N is the number of all possible closed paths of any size that a knight can perform in a X·X chess board.
 * 34) In base X, the number formed by Loader(X) 1's, Loader2(X) 2's, Loader3(X) 3's, ..., Loader2191(X) "2191" digits, ..., LoaderX-1(X) "X-1" digits, and LoaderX(X) zeroes.
 * 35) Starting with X, repeat each previous step s1[n] times, where n is the step number and s1[n] is the result of applying the step n s2[n] times, where s2[n] is the result of applying the step n s3[n] times, where ... where s2192[n] is the result of applying the step n s2193[n] times, where ... where sX-1[n] is the result of applying step n sX[n] times, where sX[n] is the result of applying step n X->21->92->Rayo(X) times.
 * 36) Repeat all previous even-numbered steps Graham(Graham(X)) times each, and then repeat all previous odd-numbered steps 2193 times each.
 * 37) Next even number greater than X.
 * 38) Next multiple of three greater than X.
 * 39) Next multiple of 2196 greater than X.
 * 40) Next square greater than X.
 * 41) Next cube greater than X.
 * 42) Next Fibonacci number greater than X.
 * 43) Next prime power of 2200 greater than X.
 * 44) Write X in decimal. Then, write the names of all digits in english and concatenate them, making a string of letters. Convert letters back into digits by coding them like this: a=01, b=02, c=03, ..., z=26, and concatenate all digits in a string of digits forming again a new number. Repeat these last two steps (digits-to-letters, then letters-to-digits) X-1 more times.
 * 45) 220222022202...2202 with X^^X^^X^^^^^^^^^^X^^X 2202's.
 * 46) Plug X into every function listed here, then plug the result of each into the next function, going from the slowest to the fastest growing (ignoring functions like the Weary Wombat that don't increase the number)
 * 47) The number of X-cell polyminoes, counting rotations and reflections.
 * 48) The number of X-cell polycubes, counting rotations and reflections.
 * 49) The number of X-cell X-dimensional polyhypercubes, counting rotations, reflections and whatever kind of movement or any other thing you can do in X dimensions.
 * 50) (X+N)^N, where N is the number of different descriptions in English which yield to the same number X up to X characters long.
 * 51) {X in step 1, X in step 2, X in step 3, ..., X in step 666, ..., X in step 2206, X in step 2207} using Bower's Linear Array Notation.
 * 52) The concatenation of the binary outputs (lexicographically sorted) of all halting Turing machines having from 1 to X states and with inputs from 1 to X bits long.
 * 53) 22->X->10.
 * 54) The largest number produced by a halting Brainfuck program with X characters or less, plus 2211^X.
 * 55) If there are infinitely many twin prime numbers, or X is still below the last ones, take the next prime number after X so that X+2 is also prime; otherwise, take BB(X) just to keep going.
 * 56) The number of possible positions of a X-sided Rubik cube.
 * 57) The number of ways you can cover a YxY square grid with pentominoes, counting rotations and reflections, where Y is the next multiple of 60 after X.
 * 58) The number of possible Go games on a X·X board.
 * 59) Ξ2(Ξ2(Ξ1(Ξ6(X))))
 * 60) fΓ0+2(fΓ0+2(fΓ0+1(fΓ0+7(X))))
 * 61) The number of possible chess games in a X·X·...·X X-dimensional board with the following pieces: the king, which can move to any adjacent cell; the prince, which is a non-royal king; the knight, which jumps moving one cell in any direction and two cells in any orthogonal direction; and the queen, which can move any number of cells in any linear direction. Each side has a king and any number of the other pieces, and every possible initial setup, symmetric or not, having the same number of pieces or ot, must be considerated (avoiding checkmate and stalemate initial positions). Draw by repetition and X^X-14 moves rules hold, in order to avoid infinitely long games.
 * 62) TREEX(X)^^^......^^SCGX(X) with 2219 up arrows ==> TREEX(X)^^^^^......^^^^^SCGX(X) with the former number of up arrows ==> TREEX(X)^^^^^^^^^......^^^^^^^SCGX(X) with the above number of up arrows ==> ... ( repeat Rayo(2219^^^^^^TREELoader(X)(SCG(Hydra(X)))) times ) ... ==> TREEX(X)^^^^^^^^^^^^^^^^^^^......^^^^^^^^^^^^^SCGX(X) with the above number of arrows.
 * 63) 22222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222220X*FGH_2220(X).
 * 64) Circle(X in a circle)
 * 65) Take 2222 2's in X base; that number of 2's in X^X base; that number of 2's in X^^X base; that number of 2's in X^^^X base; ... (repeat 2222-in-X-base times) ... ; and multiply by 10000 add 2222 to the result (so that the result ends with 2222 in decimal).
 * 66) Declare KILO FOOT as \(FOOT^{1000}(10^{100})\). Add it to X.
 * 67) Declare MEGA FOOT as \(FOOT^{million}(10^{100})\). Add it to X.
 * 68) Declare GIGA FOOT as \(FOOT^{billion}(10^{100})\). Add it to X.
 * 69) Declare META FOOT as \(FOOT^{FOOT(10^{100})}(10^{100})\). Add it to X.
 * 70) Declare META META FOOT as \(FOOT^{FOOT^{FOOT(10^{100})}(10^{100})}(10^{100})\). Add it to X.
 * 71) Declare 3-META FOOT as META META META FOOT. Follow the patttern as before. Add it to X.
 * 72) Declare META FOOT-META FOOT. Add it to X.
 * 73) Declare X-META FOOT. Add it to X.
 * 74) Declare X-FOOT-FOOT-FOOT-\(\underbrace{...}_{\text{X times}}\)-FOOT. Add it to X.
 * 75) Run 1-2231 X-FOOT-FOOT-FOOT-\(\underbrace{...}_{\text{X times}}\)-FOOT times. Add it to X.
 * F(X, X) as defined here
 * 1) FGHAckermannOrdinal(X).
 * 2) E[X](X+1)#X+1(X+2)#X+2(X+3)#X+3...(XX-1)#X^X-1#XX.
 * 3) Let X_0 = X. Write all possible books having 1 to X_0 characters. Among all those texts, select the ones describing strictly monotonic everywhere abundant f:N->N functions in English, and choose the one which produces the largest result when applied to X_0. Call this result X_1. Repeat the procedure on X_1, and let X_2 be the new result. Repeat again obtaining X_3, X_4, ..., X_X = X_X_0, X_X_1, X_X_2, ..., X_X_X = X_X_X_0, X_X_X_1, X_X_X_2, ..., X_X_X_X = X_X_X_X_0, ..., X_X_X_X_X, ..., X_X_X_X_X_X, ... until X_X_..._X having X X's.
 * 4) CircleX(X in X circles)
 * X^Y, where Y is the number of bits in this page's source code
 * 1) X ->X X, where a ->2 b = a -> a -> a -> ... -> a b times, a ->3 b = a ->2 a ->2 a ->2 ... ->2 a  b times and, in general, a ->n b = a ->n-1 a ->n-1 a ->n-1 ... ->n-1 a  b times (Peter Hurford's Extensions to Conway Chain Arrows).
 * 2) The Xth solution to the Archimedes' cattle problem.
 * 3) X^^Googol^^Googolplex^^LittleGrahamsNumber^^GrahamsNumber^^Mega^^GrahamConwaysNumber^^RayosNumber^^Corporalplex^^Pentacthulennon^^Guapamongaplex^^SkewesNumber^^Moser^^BigFoot^^C15^^MeameamealokkapoowaOompa^^GoogolDuplex^^Tridecal^^42^^Oblivion^^EnglishTrillion^^SpanishTrillion^^Emperal^^DustaculatedOgdacthulcubor^^PentacthulPentacthuldekon^^Gongulus^^Musol^^Megiston^^SuperPerfectGiygas^^Beengulus^^BigBoowa^^SprachZarathustra^^GrandAgoraphobia^^Ectossolplex^^Septemoctogintaquingentillion^^Fzmilliplexion^^Boogahundred^^ThreeDozens^^Duohectaicosihenillion^^TheBigHoss^^23^^^^^^^^Loader(10!100!)^^^^^^^^^^^^^^^^^^^^X.
 * R1,2240X(X)->R2,2240X(X)->...->R2239,2240X(X)->R2240X(X).
 * 1) {LLL...L,X}X,X with X L's in BEAF notation.
 * 2) {LLL...L,X}X,X with {LLL...L,X}X,X L's with X L's.
 * 3) {LLL...L,X}X,X with {LLL...L,X}X,X L's with {LLL...L,X}X,X L's with X L's.
 * 4) {LLL...L,X}X,X with {LLL...L,X}X,X L's with {LLL...L,X}X,X L's with ... (repeat X times) ... with {LLL...L,X}X,X L's with X L's.
 * 5) FGHα2246(X), where α is the Xth ordinal for which FGHα grows faster than steps 1 to 2245 altogether.
 * 6) X!X.
 * 7) 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 * 8) FOFT^X(X)
 * 9) FOFT_e_0(X) (where FOFT_a(x) is like FGH but with FOFT_0(x) = FOFT(x))
 * 10) X in X X-gons.
 * 11) Let CROU(n) be the application of last 2252 steps from slowest to fastest (slowest applies first). Let FGH_CROUα(n) a Fast Growing Hierarchy where FGH_CROU0(n) = CROU(n+CROU(X)) and FGH_CROUα+1(n) = FGH_CROUαFGH_CROU_α^FGH_CROU_α^...^FGH_CROU_α(n)...(n)(n)(n) with a functional exponent tower FGH_CROUα(n) high. Then, this step is FGH_CROUΓ0^X+X(X).
 * 12) The largest number defined by a formula φ, such that ZFC proves φ defines a unique number with a proof of length X
 * 13) X![1,2,3,...,X-1,X]![1,2,3,...,X,X-1]!...![X,X-1,...,3,2,1] using all permutations of all numbers from 1 to X in order.
 * 14) Let A be an alphabet of X symbols so that one can express numbers in every base from 2 to X. Form all X-digit numbers in base 2 and concatenate them. Join that to the concatenation all the permutations of those numbers. Then, form all X-digit numbers in base 3 and all their permutations, and concatenate them to the base 2 ones. Continue this way with base 4, base 5, etc. until base X. Then, repeat these steps again with every base from 2 to X but changing their order, and do it again with all possible permutations of the bases. This step is the resulting string interpreted in base X.
 * 15) Hydra42(FGH42(((((X+42)·42)42)^^42)↑4242)![42, 42, … (42 42’s) …, 42])
 * 16) Repeat steps 1-2257 replacing each mentioned number (except step numbers) by the current value of X.
 * 17) X inside X triangles inside X squares inside X pentagones inside … inside X X-gons.
 * 18) Loader(X·Loader(X·Loader(X·…Loader(X)…))) with X Loader’s.
 * 19) Loader(X^Loader(X^Loader(X^…Loader(X)…))) with Loader(X) Loader’s.
 * 20) Loader(X^Loader(X^Loader(X^…Loader(X)…))) with  Loader(X^Loader(X^Loader(X^…Loader(X)…)))  with  Loader(X^Loader(X^Loader(X^…Loader(X)…)))  with  Loader(X^Loader(X^Loader(X^…Loader(X)…)))  with  … (R2261(X) times) … Loader(X^Loader(X^Loader(X^…Loader(X)…)))  with  Loader(X^Loader(X^Loader(X^…Loader(X)…)))  with X Loaders
 * 21) X!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!X$$X!!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 * 22) Let OX = {αi} the set of all countable ordinals which can be defined in ZFC with X or less symbols, and take each FGHαi for all αi in OX. Compose all these functions from slowest (rightmost) to fastest (leftmost) and apply them to X.
 * 23) Repeat step 2264, but this time using a new fast growing hierarchy FGH’ which starts with FGH’0(n) = FGHsup({αi})(n).  Repeat this procedure again using  FGH’’0(n) = FGH’sup({αi})(n),  FGH’’’0(n) = FGH’’sup({αi})(n), and so on (where OX also grows with each new result) X times.
 * 24) Let n!=Factorial(n), n$=Superfactorial(n), nT=TREE(n), nL=Loader(n), nH=Hydra(n), nΞ=Ξ(n) and, in general, nFm=Fm(n) and nFmGp=Gp(Fm(n)). Then, this step is: 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 * 25) Apply steps 1 to 2266 in every possible order (2266! permutations sorted as usual).
 * 26) Apply steps 1 to 2267 in every possible sequence with repetition of X elements taken from 2267 (2267X sequences lexicographycally sorted).
 * 27) Apply steps 1 to 2268 in every posible order, sorting the 2268! permutations themselves in every possible way.
 * 28) Apply steps 1 to 2269 in every posible order, sorting the 2269! permutations in every possible way, sorting those 2269!! permutations in every possible way, sorting those 2269!!! permutations in every possible way, sorting… (X times) … in every possible way.
 * 29) Apply step 2270 X!2270! times.
 * 30) The number of ways of fitting 1-cell, 2-cell, 3-cell, … up to X-cell polycubes (there can be repeated ones and/or missing ones) in a XX·XX·XX box, counting rotations, reflections and repeated polycubes permutations (just assume that repeated polycubes are painted with different colors).
 * 31) The number of distinct figures you can make with a X long Rubik Twist.
 * 32) Ξ(fΓ0(Ξ(fΓ0(Ξ(fΓ0(Ξ(fΓ0(Ξ(fΓ0(Ξ(fΓ0(Ξ(fΓ0(Ξ(fΓ0(Ξ(fΓ0(Ξ(fΓ0(X))))))))))))))))))))
 * 33) ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(ΞX(fΓ0X(X))))))))))))))))))))))))))))))))))))))))
 * 34) CircleWorm(X)(WormCircle(x)(CircleWorm(X)(WormCircle(x)(X))))
 * 35) Let An=Arx(n); Bn=BB(n); Cn=Circle(n); Dn=Devil(n)=n^666n; En=E100#^^^^#n; Fn=FOOT(n); Gn=Goodstein(n); Hn=Hydra(n); In=Increment(n)=n+1; Jn=Ξ(n); Kn=Graham(n); Ln=Loader(n); Mn=103n+3; Nn=N(n); Ñn=fΓ0(n); On=OblivionX; Pn=n n; Qn=n!n; Rn=Rayo(n); Sn=SCG(n); Tn=TREE(n); Un=UtterOblivionX; Vn=n@n; Wn=Worm(n); Yn=n-th-prime; and Zn=Step1205(n). And, as usual, let FGn=F(G(n)). Then: GQTUYQPOKMNJGGFGCAFGDSAFGTYZWERWPOPJKOIYYIGSDETIIIIIHEYWEBNMFDNMWHJKGÑGÑGÑGÑGÑGÑGÑGÑGÑGÑGÑGÑGÑGÑGÑEEEEEEEYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYARRRRRRRIBAARRIBAYAHOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOMEAMEAMEALOKKAPOWAOOMPAAAAAAAAAOOOOOOOOWWWWWWWWWWWWWWWWYEEEEEEEEEEEEEEEEEEHAAAAAAAAAAAAAAAATHISISABSOLUTELYINSANEOHMYGODZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZZQZQZQZQZQZQZQZQZQZQZQVOLAREOHOHCANTAREOHOHOHOHOHOHOHOHOHOHOHOHOHBANZAIIIIIIIIIIIIIIIIIIIIIIIIIIOOOOOUUUUUIIIEEEEAAAAAAAAAAAAAAAAAAJAJAJAJAJAJAJAJAJAJAJAJAJAJAJAHOHOHOKAMEHAMEHAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYAYMAMASITAFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFZZZZZZZZZFZFZZZFZFZFZFZFZFZFZFZFZFZFZFZFZQQQQQQQQQQQQQQQQQQQQQQQQQQQQQQQQQQQQQQGGGGGGGGGGRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRROOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOAAAAAAAAAAAAAAAAAAAAAAAAAAAARRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRBIPBIPBIPBIIIIIIIIIIIIIIIIIIIIIIIIIIIIIIIIIIIIIIIIIIIIIPPIRIPIRIPIRIPPPPPPPIIIILOCUROOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOOONNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNNCUCKOOCUCKOOCUCKOOCUCKOOCUCKOOCUCKOOCUCKOOCUCKOOCUCKOOCUCKOOCUCKOOCUCKOOEVERYBODYSHEARDABOUTTHEBIRDAWELLAEVERYBODYSHEARDABOUTTHEBIRDBBBBIRDBIRDBIRDBBIRDSTHEWORDAWELLABIRDBIRDBIRDTHEBIRDISTHEWORDAWELLABIRDBIRDBIRDWELLTHEBIRDISTHEWORDAWELLABIRDBIRDBIRDBBIRDSTHEWORDAWELLABIRDBIRDBIRDWELLTHEBIRDISTHEWORDAWELLABIRDBIRDBBIRDSTHEWORDAWELLABIRDBIRDBIRDBBIRDSTHEWORDAWELLABIRDBIRDBIRDWELLTHEBIRDISTHEWORDAWELLABIRDBIRDBBIRDSTHEWORDAWELLADONTYOUKNOWABOUTTHEBIRDWELLEVERYBODYKNOWSTHATTHEBIRDISTHEWORDAWELLABIRDBIRDBBIRDSTHEWORDAWELLAAWELLAEVERYBODYSHEARDABOUTTHEBIRDBIRDBIRDBIRDBBIRDSTHEWORDAWELLABIRDBIRDBIRDBBIRDSTHEWORDAWELLABIRDBIRDBIRDBBIRDSTHEWORDAWELLABIRDBIRDBBIRDSTHEWORDAWELLABIRDBIRDBIRDBBIRDSTHEWORDAWELLABIRDBIRDBIRDBBIRDSTHEWORDAWELLABIRDBIRDBIRDBBIRDSTHEWORDAWELLABIRDBIRDBIRDBBIRDSTHEWORDAWELLADONTYOUKNOWABOUTTHEBIRDWELLEVERYBODYSTALKINGABOUTTHEBIRDAWELLABIRDBIRDBBIRDSTHEWORDAWELLABIRDSURFINBIRDBBBBBBBBBBBBBBBBBBAAAHPAPAPAPAPAPAPAPAPAPAPAPAPAPAPAPAPAPAPAPAPAPAPAPAPAPAPAPAPAPAOOMAMOWMOWPAPAOOMAMOWMOWPAPAOOMAMOWMOWPAPAOOMAMOWMOWPAPAOOMAMOWMOWPAPAOOMAMOWMOWOOMAMOWMOWPAPAOOMAMOWMOWPAPAOOMAMOWMOWPAPAOOMAMOWMOWPAPAOOMAMOWMOWPAPAOOMAMOWMOWOOMOOMOOMOOMOOMAMOWMOWPAPAOOMAMOWMOWPAPAOOMOOMOOMOOMOOMAMOWMOWPAPAOOMAMOWMOWOOMAMOWMOWPAPAOOMAMOWMOWPAPAAMOWMOWPAPAOOMAMOWMOWPAPAOOMAMOWMOWOOMAMOWMOWPAPAOOMAMOWMOWOOMAMOWMOWPAPAOOMOOMOOMOOMOOMAMOWMOWOOMOOMOOMOOMOOMAMOWMOWOOMAMOWMOWPAPAOOMAMOWMOWPAPAOOMAMOWMOWOOMAMOWMOWWELLDONTYOUKNOWABOUTTHEBIRDWELLEVERYBODYKNOWSTHATTHEBIRDISTHEWORDAWELLABIRDBIRDBBIRDSTHEWORDPAPAOOMAMOWMOWPAPAOOMAMOWMOWX
 * 36) Repeat step 1 R1(X) times; then repeat step 2 R2(Step1(X)) times; then repeat step 3 R3(R2(R1(X))) times; …; then, finally, repeat step 2277 R2277(R2276(…(R2(R1(X)))…)) times (Rn is step n).
 * 37) ÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑÑX (see step 2277).
 * 38) R222280(R802280(X))
 * 39) R22281(R22281(R82281(R12281(X))))
 * 40) THEQUICKBROWNFOÑJUMPSOVERTHELAZYDOGX (see step 2277).
 * 41) X in Circle(X in Circle(X in Circle(X in Circle(X) circles) circles) circles) circles.
 * 42) X↑(X·X)↑↑(X↑X)↑↑↑(X↑↑X)X↑4(X↑↑↑X)↑5(X↑4X)↑6(X↑5X)↑7…↑X(X↑X-1X)
 * 43) X {1} X X  X …  X  X {{…{X-1}}…}} … X  X  X {1} X
 * [1,2,3,…,X-1,X,1,2,3,…,X,X-1,…,27,192,X,1024,…,X,X-1,…,3,2,1] (including all permutations of numbers 1 to X).
 * 1) X↑X↑↑X↑↑↑X↑4X↑5X↑6…↑X‑2X↑X‑1X↑XX↑X+1X↑X+2…↑2X‑1X↑2XX↑2X+1…↑3XX…↑4XX…↑X^2X…↑X↑3X…↑X↑XX…↑X↑X↑XX…↑X↑↑4X…↑X↑↑XX…↑X↑↑↑XX…↑X↑↑↑↑XX…↑X(↑X)XX
 * 2) ((…(((((X!)!!)!!!)!4)!5)…)!X-1)!X
 * 3) (…(((…(((((X!)!!)!!!)!4)!5)…)!X-1)!X)!X+1…)!X!
 * 4) (…(…(((…(((((X!)!!)!!!)!4)!5)…)!X-1)!X)!X+1…)!X!…)!X!!
 * 5) (…(…(…(((…(((((X!)!!)!!!)!4)!5)…)!X-1)!X)!X+1…)!X!…)!X!!…)!X!!!
 * 6) (…(…(…(…(((…(((((X!)!!)!!!)!4)!5)…)!X-1)!X)!X+1…)!X!…)!X!!…)!X!!!…)!X!!...(X times)…!!
 * 7) (…(…(…(…(((…(((((X!)!!)!!!)!4)!5)…)!X-1)!X)!X+1…)!X!…)!X!!…)!X!!!…)!X!!...(X! times)…!!
 * 8) (…(…(…(…(((…(((((X!)!!)!!!)!4)!5)…)!X-1)!X)!X+1…)!X!…)!X!!…)!X!!!…)!X!!...(X!! times)…!!
 * 9) (…(…(…(…(((…(((((X!)!!)!!!)!4)!5)…)!X-1)!X)!X+1…)!X!…)!X!!…)!X!!!…)!X!!...(X!!...(X times)…!! times)…!!
 * 10) (…(…(…(…(((…(((((X!)!!)!!!)!4)!5)…)!X-1)!X)!X+1…)!X!…)!X!!…)!X!!!…)!X!!...(X!!...(X! times)…!! times)…!!
 * 11) (…(…(…(…(((…(((((X!)!!)!!!)!4)!5)…)!X-1)!X)!X+1…)!X!…)!X!!…)!X!!!…)!X!!...(X!!...(X!! times)…!! times)…!!
 * 12) (…(…(…(…(((…(((((X!)!!)!!!)!4)!5)…)!X-1)!X)!X+1…)!X!…)!X!!…)!X!!!…)!X!!...(X!!...(X!!! times)…!! times)…!!
 * 13) (…(…(…(…(((…(((((X!)!!)!!!)!4)!5)…)!X-1)!X)!X+1…)!X!…)!X!!…)!X!!!…)!X!!...(X!!...(X!!! times)…!! times)…!!
 * 14) (…(…(…(…(((…(((((X!)!!)!!!)!4)!5)…)!X-1)!X)!X+1…)!X!…)!X!!…)!X!!!…)!X!!...(X!!...(X!!...(X times)…!! times)…!! times)…!!
 * 15) FGHLargeVeblenOrdinal(X)
 * 16) Let f0(n)=TREE(n), f1(n)=f0TREE(n+7)(n), f2(n)=f1TREE(n+49)(n) and, in general, fk+1(n)=fkTREE(n+7^k)(n). Then, this step is fDEFINITIONREFERSTOTHERESULTOFTHEPREVIOUSOPERATIONRNREFERSTOTHEOUTPUTOFSTEPNSTARTINGWITHANDRNMREFERSTOTHEOUTPUTOFSTEPSNTHOUGHMAGAINSTARTINGWITHRUNNINGINREVERSEIFNMSTARTWITHGOOGOLTRIPLEUPARROWTETBBTETMEGAFUGATETBOOGAEFRACTETRWHERETETRISRAYOSNUMBERTETBBTETYWHERETETYISTHEVALUEOFCLARKKKKSONONJANUARYCEFGAMMAETETMOWHERETETMOISMEAMEAMEALOKKAPOOWAOOMPAFWHEREFANDFNFNTETTREELCEILPIRCEILIYWHEREYISCOMPUTEDWITHTHEFOLLOWINGSTEPSSETYYUPARROWYYFBETAYWHEREBETAISGOUCHERSORDINALIETHEFIRSTFIEDPOINTOFTHEFUNCTIONALPHAMAPSTOOMEGAALPHATETCKTYWHERETDENOTESTHETORIANTETCIRCLEYEINETENDEDCASCADINGENOTATIONRRTETTREETHAPOCALYPTICNUMBERRTETGBWHERETETGBISTHEGOOBERBUNCHBACKSLASHUPARROWUPARROWUPARROWUPARROWRUPARROWRRTETSCGTETTREETETSCGTETTREETETSCGRTETMOSEREWHEREEISTHEEPLODINGTREEFUNCTIONTETRAYOCREATEANALTERNATEVERSIONOFCROUTONILLIONBYSTOPPINGHEREUSINGCALLTHISNUMBERCTETBBCWHERETETBBNISANORDERNBUSYBEAVERFUNCTIONUPARROWDOWNARROWRIGHTARROWRIGHTARROWRIGHTARROWRIGHTARROWWHERENISTHESUPERFACTORIALTETGAGTETSGWHERETETSGISTHESUPERGONGULUSLFWHEREFNHTETGNANDTETGISTHEGRANGOLDERUNDERBRACECDOTSRUPARROWTETMOWHERETETMOISMEAMEAMEALOKKAPOOWAOOMPAUPARROWEUNDERBRACECDOTSEUNDERBRACECDOTSUNDERBRACECDOTSETETGTETGWHERETETGTETYWHERETETYISTHELYNZONMAYMEAMEAMEALOKKAPOOWAARROWACEFWHEREFANDFNEFNTETRAYOTETRAYOTETGAGTETBHTETCIRCLEUSINGFRIEDMANSCIRCLETHEOREMGWHEREGNISTHELENGTHOFTHEGOODSTEINSEQUENCEOFNIWHEREINNBOWIDETILDEMLFLOORPICDOTRFLOORBMODTETARUNDERBRACELDOTSFWHEREFFGETETYTETYUPARROWTETYWHERETETYRRRRRRRRLCDOTGCDOTCDOTOTETRAYOTETSCGTETSCGTETSCGTETSCGTETTREETETTREETETTREETETTREETETRAYOTETRAYOTETRAYOTETRAYOIIIITETARTETARTETARTETARTETBHRRRRRUPARROWTETSCGTETSCGTETSCGTETSCGTETSCGEEEUPARROWEUPARROWEUPARROWEUPARROWEUPARROWUPARROWTETARTETARFRACUNDERBRACECDOTSHWHEREHISTHEHFUNCTIONHWHEREHNISTHEHYPERFACTORIALOFNMTETSCGRIGHTARROWRIGHTARROWRIGHTARROWRIGHTARROWCGCWHERECISDEFINEDHEREILEASTMERSENNEPRIMEGREATERTHANIFONEEISTSOTHERWISETHEFIRSTNUMBERWITHABUNDANCEFTETHWHERETETHISTHEHUMONGULUSANDFNTETTREENNTETRAYOTETHWHERETETHISTHEHUMONGULUSTETGAGTETHWHERETETHISTHEHUMONGULUSPTETHWHERETETHISTHEHUMONGULUSANDPNNUPARROWNECREATEANALTERNATEVERSIONOFCROUTONILLIONBYSTOPPINGHERECALLTHISNUMBERCTETSCGTETSCGCCCCDOTCCDOTUPARROWCUPARROWCGGUPARROWCUPARROWFWHEREFNNPPILOGFRACTETPTETPWHERETETPLFLOORLOGRFLOORTETRAYOINHYPERFACTORIALARRAYNOTATIONFTETMOWHERETETMOISMEAMEAMEALOKKAPOOWAOOMPAANDFNLFTETMOWHERETETMOISMEAMEAMEALOKKAPOOWAOOMPAFNNANDFMNRMFMNFGWHEREFFNGFNANDGNNGGFWHEREFNRNNFMNGMFMNANDGMNFMNNTETAWHERETETANISTHEFIRSTPOSITIONOFNINGIJSWIJTSSEQUENCEMINIMALNSUCHTHATSUMKNFRACKGEQDEFINETHEFASTGROWINGCROUTONCALPHANASFOLLOWSCNRNCALPHANCALPHANNIFFALPHAISALIMITORDINALCALPHANCALPHANRNNOTHERWISEFUNDAMENTALSEQUENCESAREASNORMALCONTINUEWITHCPSIOMEGAOMEGATETGONRFWHEREFNGNANDGNGNAGEOFJONATHANBOWERSINTHEYEARCEINPLANCKTIMESROUNDEDDOWNIELEFTLFLOORCDOTFRACTTETPTETSCDOTFRACTTETPTETSRIGHTRFLOORDWHEREDISDEFINEDHERESSUUSINGTHEDOLLARFUNCTIONFFWHEREFNNANDFMNRMFMNLFLOORERFLOORUPARROWUPARROWUPARROWUPARROWUPARROWUSINGETENDEDUPARROWNOTATIONTETSTETSCGKAIWIDETILDEUWHEREKAIWIDETILDEUISDEFINEDHERESUMITETBBISUMJSUMIJTETBBIRTETRAYOTETRAYOGENUNDERBRACELDOTSWHEREGENISDEFINEDHEREUPARROWUPARROWUPARROWNWHERENNWHERENUSINGBANFVAREPSILONTETRAYOTETRAYOTETRAYOFTETHWHERETETHIITETBBFFNNANDFMNRMFMNFWHEREFISFISHFUNCTIONUNDERBRACECDOTSIITETBBFCCCREATEANALTERNATEVERSIONOFCROUTONILLIONBYSTOPPINGHERECALLTHISNUMBERCCCCRRRRRRRRRLDOTSTETGONRTETGSZWHERETETGSZISGRANDSPRACHZARATHUSTRAWHICHISDEFINEDHERERIGHTARROWRIGHTARROWRIGHTARROWEEUPARROWEUPARROWUPARROWRIGHTARROWRIGHTARROWRIGHTARROWRIGHTARROWTETGONTETBBTETRAYOUPARROWUPARROWRIGHTARROWUSINGTHISBACKSLASHBACKSLASHRRRRCREATEANALTERNATEVERSIONOFCROUTONILLIONBYSTOPPINGHERECALLTHISNUMBERCCUPARROWCUPARROWCUPARROWCCCCFFFFCCCCWHEREFMNNUNDERBRACEUPARROWUPARROWUPARROWCDOTSUPARROWMNCCCCNWHERENFOMEGAFGAMMAFTHETAOMEGAOMEGAFTHETAOMEGAOMEGAFTHETAVAREPSILONOMEGAFTHETATHETAOMEGAFTHETATHETAOMEGAFTHETATHETAOMEGAFTHETATHETAIFTHETATHETAMFTHETATHETAKCREATEANALTERNATEVERSIONOFCROUTONILLIONBYSTOPPINGHERECALLTHISNUMBERCTETGSZTETSCGTETSCGTETSCGTETSCGTETSCGWHERETETGSZISGRANDSPRACHZARATHUSTRATETBBETETRWHERETETRISRAYOSNUMBERRCREATEANALTERNATEVERSIONOFCROUTONILLIONBYSTOPPINGHERECALLTHISNUMBERCCCCCCCNWHERENUPARROWFOMEGAFGAMMAFTHETAOMEGAOMEGAFTHETAOMEGAOMEGAFTHETAVAREPSILONOMEGAFTHETATHETAOMEGAFTHETATHETAOMEGAFTHETATHETAOMEGAFTHETATHETAIFTHETATHETAMFTHETATHETAKFWHEREFNNANDFMNRMFMNFRWHEREFNRRNUSINGWARPNOTATIONRIGHTARROWRIGHTARROWRIGHTARROWRIGHTARROWRIGHTARROWRIGHTARROWRIGHTARROWRIGHTARROWUPARROWDEFINETETRAYOASAFASTITERATIONHIERARCHYWITHTETRAYONTETRAYONTETRAYOTETRAYOOMEGATETRAYOVAREPSILONTETRAYOGAMMATETRAYOTHETATHETAITETRAYOTHETATHETAMTETRAYOTHETATHETAKTETRAYOCCCCCCCCCCCUSINGBANFOMEGARCCCCCCUSINGBANRRRUPARROWRUPARROWRUPARROWRUPARROWUPARROWRIGHTARROWRIGHTARROWTETBBCCCCCCEEEEEEECDOTCDOTECDOTECDOTEEEEEUPARROWEEEEEEEEEEIWHEREINNTETBBUPARROWETENDINGONFUNCTIONEPONENTIATIONTETRAYOUPARROWRTETAWHERETETAISTHEHAMMINGWEIGHTOFTHEBINARYREPRESENTATIONOFTHEUTFWIKITETOFTHEWIKIPEDIAARTICLECROUTONREVISIONIETETRAYOTETRAYONWHERENETETGSZNWHERETETGSZISGRANDSPRACHZARATHUSTRAANDNETETGSZNWHERETETGSZISGRANDSPRACHZARATHUSTRAANDNETETGSZNWHERETETGSZISGRANDSPRACHZARATHUSTRAANDNETETGSZNWHERETETGSZISGRANDSPRACHZARATHUSTRAANDNETETGSZNWHERETETGSZISGRANDSPRACHZARATHUSTRAANDNETETGSZNWHERETETGSZISGRANDSPRACHZARATHUSTRAANDNETETGSZNWHERETETGSZISGRANDSPRACHZARATHUSTRAANDNETETGSZNWHERETETGSZISGRANDSPRACHZARATHUSTRAANDNETETGSZNWHERETETGSZISGRANDSPRACHZARATHUSTRAANDNUPARROWNWHERENUPARROWTETBBTETBBEGRANDGODGAHLAHGONGEHORRENDOUSGODSGODGULUSRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCRCCCCCCCREATEANALTERNATEVERSIONOFCROUTONILLIONBYSTOPPINGHERECALLTHISNUMBERCCCCCCCCCCCWITHCOPIESOFWITHCOPYOFREPEATSTEPTHENGOREVERSEFROMSTEPREPEATEWGRANDSPRACHZARATHUSTRASREPEATSTEPREPEATSTEPTHENREPEATSTEPTHENTHITEMOFGUGOLDSERIESTHITEMOFTHROOGOLSERIESTHITEMOFGODGAHLAHSERIESTHITEMOFTETHRATHOTHSERIESREPEATSTEPTIMESCCCCCCCCCCCCCCCCCCCCCCCCCCCCCWITHPAIRSOFBRACKETSINDOLLARFUNCTIONWITHSMFWHEREFNISTHEFUNCTIONOFTHEPREVIOUSSTEPSANDMMNISTHEMMNMAPREPEATALLTHESTEPSBEFORETHISTIMESTHELARGESTNUMBERDEFINABLEINTHEENGLISHLANGUAGEINSYMBOLSTHATDOESNTCAUSECONTRADICTIONSINAMODIFIEDFGHCTHETAKWHEREINCNYOURUNTHESTEPSBEFORETHISWITHNASTHEINPUTOTHERRULESARETHESAMEASTHEFGHTHELARGESTNUMBERDEFINABLEINSOMEKSYSTEMSEETHISPAGEOROBLIVIONIFTHELINKDOESNTWORKREAPEATALLTHESTEPSBEFORETHISTIMESANDINREVERSETIMESREPEATSTEPCCCCCCCMORETIMESWHEREMEANSBEAFREPEATSTEPTIMESTHENYLLIONTIMESINREVERSETHELARGESTNUMBERDEFINABLEINCWITHSYMBOLSTHATDOESHALTSINSTRONGARRAYNOTATIONSCCCCCCCPUTALLOFTHEWAYSTOORDERCCANDINSTRONGARRAYNOTATIONINLEICOGRAPHICORDERANDDOALLOFTHOSESTEPSSSSSCCCCCCCSSSSSSSSSSSSSSSWITHCOMMASRWITHCOMMASINAMODIFIEDRFUNCTIONWHERENRMEANSYOUAPPLYTHESTEPSBEFORETHISTONANDTHEOTHERRULESREMAINUNCHANGEDAPPLYTHEPREVIOUSSTEPTIMESISABIGGAPCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCREATEANALTERNATEVERSIONOFCROUTONILLIONBYSTOPPINGHERECALLTHISNUMBERCCCCCCCCCREPEATSTEPTOTIMESREPEATSTEPTOTIMESREPEATSTEPTOGOREVERSEFROMTOALLFORCCCCCCCCTIMESREPEATSTEPSTOREPEATSTEPSTODOTHEFOLLOWINGSTEPSINORDERACCORDINGTOTHERULERSEQUENCEUPTOSTEPTIMESTERMSFISHNUMBERTETGOOGOLPLEDOWNARROWDOWNARROWTETGOOGOLPLEACTHULONEAMPLEACTHULONWOULDBEHEPTACTHULENNONWITHWITHCONTINUETIMESWITHWITHSEWITHSSANDSICAHLAHONGULUSEEOLTHPRIMEFIRSTODDCOMPOSITENUMBERAFTERREPEATSTEPANDGOOGOLPLEGOOGOLPLEGOOGOLPLETIMESSFCREATEANALTERNATEVERSIONOFCROUTONILLIONBYSTOPPINGHERECALLTHISNUMBERCCCCCCCCCCCCCCCCCCCLETIMESELEMENTSETIMESELEMENTSTIMESETIMESELEMENTSETIMESELEMENTSECCCCCCCCCREPEATSTEPTHENGOINREVERSEORDERSTEPFORCOPIESOFSTIMESSCGSCGSCGSCGSCGUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCCCCCCCCCFFFWHEREFNNEWTHEAMOUNTOFSBEINGONEACHSIDEGRANDSPRACHZARATHUSTRAGRANDSPRACHZARATHUSTRAWITHSSANDSEGRANDGRANDGRANDGRANDTRANSMORGRIFIHGHEWGRANDGRANDGRANDTRANSMORGRIFIHGHSGRANDGRANDGRANDGRANDTRANSMORGRIFIHGHEWGRANDGRANDGRANDTRANSMORGRIFIHGHSTIMESGRANDGRANDGRANDGRANDTRANSMORGRIFIHGHEWGRANDGRANDGRANDTRANSMORGRIFIHGHSELEMENTSGRANDGRANDGRANDGRANDTRANSMORGRIFIHGHEWGRANDGRANDGRANDTRANSMORGRIFIHGHSREPEATPREVIOUSSTEPTIMESREPEATPREVIOUSSTEPTIMESREPEATPREVIOUSSTEPTIMESREPEATPREVIOUSSTEPTIMESREPEATPREVIOUSSTEPTIMESCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCREPEATSTEPTIMESREPEATSTEPTIMESREPEATSTEPTIMESREPEATSTEPTIMESREPEATSTEPTIMESREPEATSTEPTIMESREPEATSTEPTIMESREPEATSTEPTIMESREPEATSTEPTIMESREPEATSTEPTIMESREPEATSTEPTIMESREPEATSTEPTIMESIISIGMATETFISHNUMBERBRACEWAHREPEATSTEPTHENFORTIMESEACCORDINGTOHTTPGOOGOLOGYWIKIACOMWIKIUSERWYTHAGORASETENDEDCASCADINGENOTATIONCREATEANALTERNATEVERSIONOFCROUTONILLIONBYSTOPPINGHERECALLTHISNUMBERCCCCCCCCCCCCCCCCCCCCETERRIBLETETHRATHOTHONWARPNOTATIONWNESTEDWITHSANDSANDSANDSANDSREPLYOFSTEPTIMESREPEATSTEPANDTIMESWSEEEEEEEEEEEEEPEEEEEEEEEEEEECREATEANALTERNATEVERSIONOFCROUTONILLIONBYSTOPPINGHERECALLTHISNUMBERCFINALOOGOLCEMNORMALIZEDFUSIBLEMARGINFUNCTIONTREEECWCCCCCCCCCCNESTEDECWCCCCCCCCCCBWHEREBISTHEBINARYDATAOFTHISIMAGEINTERPRETEDASANINTEGERBIGENDIANWITHTHEMOSTSIGNIFICANTBITFIRSTETREMEFACEPALMCBCCLGRAHAMSNUMBERGRAHAMSNUMBERGRAHAMSNUMBEREGCCBBWHEREBISTHEBINARYDATAOFTHERAWWIKICODEOFTHISPAGEINTERPRETEDASANINTEGERMSBFIRSTREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCTIMESTIMESTERMSCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCREATEANALTERNATEVERSIONOFCROUTONILLIONBYSTOPPINGHERECALLTHISNUMBERCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCREPLYOFSTEPREPLYOFSTEPBMULTIFACTORIALNESTEDFACTORIALNESTEDSUBFACTORIALTREETREEBBRAYOIEGONGULUSCREPEATTHISSTEPTIMESGONGULUSTIMESGONGULUSDRESSINGBASEWITHABETCLETTUCESAMETOMATOESSAMECROUTONSSAMEDRESSINGSAMEEWGRANDGRANDGRANDTRANSMORGRIFIHGHSREPEATSTEPGOBACKINREVERSEORDERFROMREPEATTHISPROCESSFORLLLLLLSECOPIESOFTIMESCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCETIMESELEMENTSETIMESELEMENTSTIMESETIMESELEMENTSETIMESELEMENTSECCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCEEEEEEEEEEEEEEEEEEEEEEEEECREATEANALTERNATEVERSIONOFCROUTONILLIONBYSTOPPINGHERECALLTHISNUMBERCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESREPEATSTEPFORCCCCCCCCCCCCCTIMESTIMESTERMSTIMESEYYYSWHEREYISRAYOSTHNUMBERWITHSANDSANDSANDSANDSIISIGMATETFISHNUMBERBRACEWAHREPEATSTEPTHENFORTIMESCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCREATEANALTERNATEVERSIONOFCROUTONILLIONBYSTOPPINGHERECALLTHISNUMBERCTIMESTERMSCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCUNDERBRACEUPARROWUPARROWUPARROWUPARROWCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCCPICILLIONLFLOORRFLOORFEMTILLIONTIMESTIMESGIGILLIONTIMESLFLOORRFLOORLFLOORRFLOORLBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTSRBRACELBRACEUNDERBRACECDOTS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ESTIMESTIMESTIMESFGHLARGEVEBLENORDINALADDMOREABOVETHISLINETHEFINALVALUEOFISTHECROUTONTHECROUTONILLIONISEQUALTOX(X) (see step 2277).
 * 17) X→(X+1)→(X+2)→(X+3)→…→(X+E(107^^312)#^^#X!!!!!X)
 * 18) X→2X→3X→…→(X·E(12893^^^199182)#^^#X$$$XX)
 * 19) X→X2→X3→…→(XEX#^X#^X#^X#^X#^X#^X#^X#^X#^X#^X#^X#^X#^X#^X#^X#^X#^X#^X#^X#^X#^X)
 * 20) X→2X→3X→…→(EX#^##############################################XX)
 * 21) X→(X→X)→(X→X→X)→…→(X→X→…(X →’s)…→X)
 * 22) Repeat step 1 X times, step 2 (X→X)2 times, step 3 (X→X→X)3 times, …, step 2307 (X→X→…(2307)…→X)2307 times.
 * 23) X^^2678^^^^^^^^^3278972189^^^265856821^^^^^X^^^^^^^^^^^2818092928932^X^X^11515765215677125^X!^1192001011192800000100010^^^^^^(X X)^^TREE(X104)^^^^^9991919198298111^^^^^^^^^^^^^^^^^^^^777777777777777777777!^^(X‑900)^^^^^^Worm(X+4)^^^^^^^^(X→X→2X2→34X37)^^^^^^^(E73##X)^37^71111111111111111111111111111113^^^^^^^^^^(ΞLoader(810)(X)→42X)^^^^^^^^^^^^^^^^^^^^^^^^18^18^18^18^90^18^18^2425^18^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^18^9000^^18^^1772672^X^X^X^(XX)!^^^^^5^^^^^^^^C9^^g6400000064^TREE(X)^^TREE(X)^^TREE(18)^^42^^43^^^^^^(X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X→X)^^^^^^^^(8→9→10→11→Circle(X)→1001)^^^(114X+4)^667^^^^^^^189919928818199191919191919191972727617717177178288717173563556742372358129000000000000000000000000^222222219189812789222222222222982978622222222200000222222222222222222222222222222222222222222222222222^^^^^^^^^^^^^^^^45673456753752735273525723572576235675326725376527523525272372437623457623^^^^^^7^^^^^^^^^^^^^^^^^^^^^^^^^^^(Circle(Circle(SCG(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(Circle(X+3))))))))))))))))))))))))))))))^^^^^^^^^fω^881107298+19(1762782·X+33311567267567038020010231000093939038930333333303)^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^((X+1)!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!$$$!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!)^17^6^4^2^80^3^112^^11122^^^^1111111111111111111111111111111111111112222222222222222222222222222222222222222222^13^21^34^55^89^^^^^^9000000000000000000000000009!^^X^^^^^^E99999999999###################################################X^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^8888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888888^^^^^^^^^^^^Hydra(3X+14)^^^^^^^^^^^^^^^^^^(R334(R21(X))Hydra(Hydra(X^X)))^^^^^^^^^^^^^^^^^^^^^^^^^^^Hydra(X)^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^SCG(TREE(SCG(SCG(TREE(SCG(SCG(X)))))))^^^SCG(X)^^^(SCG(X)^^^^^^^^TREEX(TREE25(TREE171897198(TREE(TREETREE(6167861861·X)(TREE(TREE(TREE(TREE(TREE(TREE(TREE(TREE(TREE991891678(TREE(TREE(TREEX+117162(TREE(TREE(TREE(X))))))))))))))))))))^^^^^^616161616161616161616169^^^^^^[52317,31798,231657,31289,X^^32157,23168,123798,127890,0192809,123798721398,326739863872,23676387267832687,234742367862378686,24368762378682376,267861238637216871687,21398712398719823798213,3278732872387238823787328,1111,11111,111111,1111111,11111111,111111111,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X90000000,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,1818181818,42,42,42,4242]^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^Loader32(X→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX→XX)^^^^^^^^^^^^^^^^^^^^SCGX+2727(4X3)^^(X^^^^^^^^^^^^^^^^^^^^^^^^^^X)^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^X^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^X^^^^^^^^^^^X^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^X^^^^^^^^^^^^^^X^^^^^^^^^^^^^^^^^^^^^X^X^^^^^^^^^^^^^^^^^^^^^^^^X^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^X^X^X^X^X^^^X^X^X^X^^^X!^X^^^X^X^X^^^^^^^X^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^X^^^^^^^^^^^^^^^^^^^^^^^^^^^X^^^^^^^^^^^^^^^^X^^^^^776^^^^^^^^^^^^^^^^^^^^^^^^^X^^^^^^^^^^^X^^^^^^^^^X^^X^^^^^^^^^^^^^^^X^^^^^^^^^^^^^^^^^^^^^^X^^^^^^^^^^^^^^^^^^^^^^^^X^^^^^^^^^^^^^^^^^^^^^X^X^X^X^X^^^^^^^^^^^^X^3033333333030330000000000033333333330000000000000000821823132686321876213782318962303123127891623265356675555512369321953296868437437037100930097132873489719869869798643756195653261666666666666666666662356723195535701575320513278572381578123578235875231875238752738152310963486413684736738468436^^^347897384927837973897320708937923798739723893333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333333^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^fX(X+5)^^^^^^^^^^^^^^^^X![X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X,X]^^^^^^^^^^^^^^^^X
 * 24) Repeat steps 1 to 2309 from fastest to slowest (in case of tie, sort by step number).
 * 25) F(X), where F(n) is the fastest-growing function defined on Googology wiki in a potential future where Googology wiki has X pages, all defining functions that grow faster than the FOOT function
 * 26) fα(1,1)(fα(1,2)(fα(1,3)(…(fα(1,N1)(fα(2,1)(fα(2,2)(fα(2,3)(…(fα(2,N2)(fα(3,1)(fα(3,2)(fα(3,3)(…(fα(3,N3)(…(fα(K,1)(fα(K,2)(fα(K,3)(…(fα(K,NK)(X))…))))…))…)))))…)))))…))), where α(i,j) is the j-th finite or countable ordinal of the i-th decreasing sequence of finite or countable ordinals expressibles in ZFC with X or less characters, and fα(n) is FGH.
 * 27) fα1(fα2(…(fαN(X)…)) where fαi are all the possible permutations of every function present in step 2312.
 * 28) Repeat steps 2312 and 2313 X times.
 * 29) Repeat steps 2312, 2313 and 2314 X2315 times.
 * 30) X![X!,X!!,X!!!,X!4,X!5,…,X!X]
 * 31) X![X!,X!4,X!9,X!16,…,X!X^2]
 * 32) FOOT(X·FOOT2(X·FOOT4(X·…FOOT2^X(X·TREE(X))…)))
 * 33) ((C14C3)X+C1+C5+C10)·Moser42+X
 * 34) The Meameamealokkapoowa oompa number based on X: replace “10” by “X” and “100” by “X2” in its definition. That is: {LLL....a.....LLL,X}X,X where a = {LX2,X}X,X array of L's.
 * 35) X-duplex = 1010^X.
 * 36) Repeat steps 1 to 2321 replacing every number less than X by X (excepting step numbers, sequence indexes and numbers involved in decreasing functions like substractions).
 * 37) Let fα(n) = FGHα(n); LVO = Large Veblen Ordinal; f0,LVO(n) = fLVO(n); f1,LVO(n) like FGHLVO, but starting with f0,LVO(n); f2,LVO(n) like FGHLVO, but starting with f1,LVO; and so on. Then this step is fX,LVO(X).
 * 38) ABXBCXCDXDEXEFXFGXGHXHIXIJXJKXKLXLMXMNXNÑXÑOXOPXPQXQRXRSXSTXTUXUVXVWXWYXYZXZAXX (see step 2277).
 * 39) AABCDEFGHIJKLMNÑOPQRSTUVWYZXBABCDEFGHIJKLMNÑOPQRSTUVWYZXCABCDEFGHIJKLMNÑOPQRSTUVWYZXDABCDEFGHIJKLMNÑOPQRSTUVWYZXEABCDEFGHIJKLMNÑOPQRSTUVWYZXFABCDEFGHIJKLMNÑOPQRSTUVWYZXGABCDEFGHIJKLMNÑOPQRSTUVWYZXHABCDEFGHIJKLMNÑOPQRSTUVWYZXIABCDEFGHIJKLMNÑOPQRSTUVWYZXJABCDEFGHIJKLMNÑOPQRSTUVWYZXKABCDEFGHIJKLMNÑOPQRSTUVWYZXLABCDEFGHIJKLMNÑOPQRSTUVWYZXMABCDEFGHIJKLMNÑOPQRSTUVWYZXNABCDEFGHIJKLMNÑOPQRSTUVWYZXÑABCDEFGHIJKLMNÑOPQRSTUVWYZXOABCDEFGHIJKLMNÑOPQRSTUVWYZXPABCDEFGHIJKLMNÑOPQRSTUVWYZXQABCDEFGHIJKLMNÑOPQRSTUVWYZXRABCDEFGHIJKLMNÑOPQRSTUVWYZXSABCDEFGHIJKLMNÑOPQRSTUVWYZXTABCDEFGHIJKLMNÑOPQRSTUVWYZXUABCDEFGHIJKLMNÑOPQRSTUVWYZXVABCDEFGHIJKLMNÑOPQRSTUVWYZXWABCDEFGHIJKLMNÑOPQRSTUVWYZXYABCDEFGHIJKLMNÑOPQRSTUVWYZXZABCDEFGHIJKLMNÑOPQRSTUVWYZXX (see step 2277).
 * 40) ABC…WYZABC…WZYABC…ZWY…(26! permutations)…ZYW…CBAX (see step 2277).
 * 41) LoaderLoader(TREE(X))(TREELoader(TREE(X))(X))
 * 42) LoaderLoader(TREE(Loader(Loader(TREE(X)))))(TREELoader(TREE(Loader(Loader(TREE(X)))))(LoaderLoader(TREE(Loader(Loader(TREE(X)))))(LoaderLoader(TREE(Loader(Loader(TREE(X)))))(TREELoader(TREE(Loader(Loader(TREE(X)))))(X)))))
 * 43) Loader 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 * 44) 23X + X30
 * X!X
 * [23,3,3,3,3,3,3,3,3,3,3,3,3,3,3,3,3,3,3,3,3,3,X,3,3,3,3,3,3,3,3,3,3,3,3,3,3,3,3,3,3,3,3,3,32]
 * 1) {L2333,2333}X,X
 * 2) 7 inside 30 trinagles inside 40 squares inside … inside 10X X-gons.
 * 3) X!!$$$!!!$$$$$
 * 4) (X→X)→(X→X→X)→(X→X→X)→(X→X→X→X→X→X)
 * 5) X↑23[X,23,37,23,37,23,37,23,37,23,37,23,37,23,37,23,37,23,37,23,37,X]
 * 6) ZEEBX (see step 2277).
 * 7) (((20 →X 30) →X 30) →X 90) →X 2339
 * 8) C2^^(C3^^^(C4^^^^(C10^^^^^^^^^^X)))
 * 9) 123412431324134214231432213421432314234124132431312431423214324134123421412341324213423143124321!X
 * 10) (X&X&X&…(X times)…&X) & (X&X&X&…(X times)…&X) & … (X times) … & (X&X&X&…(X times)…&X)
 * 11) BBBB(X)BB(X)(X)
 * 12) Repeat step 1 R1(X) times, step 2 R1,22(X) times, step 3 R1,33(X) times, step 4 R1,44(X) times, …, step 2343 R1,23432343(X) times.
 * 13) Repeat steps 1 to 2344 sorting step index number names in alphabetic order.
 * 14) X!·(X-1)!·(X-2)!·(X-3)!·…·3!·2!·1!
 * {X!, X!·(X+1)!, X!·(X+1)!·(X+2)!, …, X!·(X+1)!·(X+2)!·…·(X+X!)!}
 * 1) X!X·(X-1)!(X-1)·(X-2)!(X-2)·…·3!!!·2!!·1!
 * 2) X![X, X, … (X times) …, X] · (X-1)![(X-1), (X-1), … (X-1 times) …, (X-1)] · (X-2)![(X-2), (X-2), … (X-2 times) …, (X-2)] · … · 3![3,3,3] · 2![2,2] · 1![1]
 * 3) (X!X!) ↑X ((X-1)!(X-1)!) ↑(X-1) ((X-2)!(X-2)!) ↑(X-2) … ↑↑↑↑ (3!!!) ↑↑↑ (2!!) ↑↑ (1!)
 * 4) { {X, X, … (X times) …, X}, {X-1, X-1, … (X-1 times), X-1, X-1}, {X-2, X-2, … (X-2 times), X-2, X-2}, …, {3, 3, 3}, {2, 2}, {1} }
 * 5) { {X!, X!, … (X! times) …, X!}, {(X-1)!, (X-1)!, … ((X-1)! times), (X-1)!, (X-1)!}, {(X-2)!, (X-2)!, … ((X-2)! times), (X-2)!, (X-2)!}, …, {3!, 3!, 3!, 3!, 3!, 3!}, {2!, 2!}, {1!} }
 * 6) FACTORIALX (see step 2277).
 * 7) Arx(Arx(X, X-1, X-2, …, 3, 2, 1), Arx(X-1, X-2, X-3, …, 3, 2, 1), Arx(X-2, X-3, X-4, …, 3, 2, 1), …, Arx(3, 2, 1), Arx(2, 1))
 * 8) Arx( Arx(Arx(X, X-1, X-2, …, 3, 2, 1), Arx(X-1, X-2, X-3, …, 3, 2, 1), Arx(X-2, X-3, X-4, …, 3, 2, 1), …, Arx(3, 2, 1), Arx(2, 1)), Arx(Arx(X-1, X-2, X-3, …, 3, 2, 1), Arx(X-2, X-3, X-4, …, 3, 2, 1), Arx(X-3, X-4, X-5, …, 3, 2, 1), …, Arx(3, 2, 1), Arx(2, 1)), …, Arx(Arx(4, 3, 2, 1), Arx(3, 2, 1), Arx(2, 1)) )
 * 9) {XX}
 * 10) BH(BB(BH(BB(BH(BB(BH(BB(BH(BB(BH(BB(X))))))))))))
 * 11) The number of distinct paths of length 1 to X of all possible graphs having X vertices (vertices and edges can be visited multiple times).
 * 12) A(A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))),A(A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X))),A(A(A(X,X),A(X,X)),A(A(X,X),A(X,X)))))
 * 13) A(A(A(A(A(A(A(X,X),X),A(X,X)),A(A(X,X),X)),A(A(A(X,X),X),A(X,X))),A(A(A(A(X,X),X),A(X,X)),A(A(X,X),X))),A(A(A(A(A(X,X),X),A(X,X)),A(A(X,X),X)),A(A(A(X,X),X),A(X,X))))
 * 14) H(H(H(H(X,X,X),H(X,X,X),H(X,X,X)),H(H(X,X,X),H(X,X,X),H(X,X,X)),H(H(X,X,X),H(X,X,X),H(X,X,X))),H(H(H(X,X,X),H(X,X,X),H(X,X,X)),H(H(X,X,X),H(X,X,X),H(X,X,X)),H(H(X,X,X),H(X,X,X),H(X,X,X))),H(H(H(X,X,X),H(X,X,X),H(X,X,X)),H(H(X,X,X),H(X,X,X),H(X,X,X)),H(H(X,X,X),H(X,X,X),H(X,X,X)))), where H(a,b,c) is the hyper-operator.
 * 15) The average number of times (rounded up to integer) you have to roll a dice in order to write randomly all digits of X in base 6 (sixes are zeroes).
 * 16) Let f0(n) = n! and fk+1(n) = fk(n)·fk(n-1)·…·fk(1). Then this step is fX(X).
 * 17) Let f0(n) = n! and fk+1(n) = (fk(n)·fk-1(n)·…·f0(n)) · (fk(n-1)·fk-1(n-1)·…·f0(n-1)) · … · (fk(1)·fk‑1(1)·…·f0(1)). Then this step is fX(X).
 * 18) Let f0(n) = n! and fk+1(n) = fkn(fk-1n(…(f1n(f0n(n)))…)). Then this step is fX(X).
 * 19) Let f0(n) = n! and fk+1(n) = fkn(fk‑1n(fk‑2n( … (f2n(f1n(f0n(fkn‑1(fk‑1n‑1(fk‑2n‑1( … (f2n‑1(f1n‑1(f0n‑1(fkn‑2(fk‑1n‑2(fk‑2n‑2( … (f2n‑2(f1n‑2(f0n‑2( … (fk2(fk‑12(fk‑22( … (f22(f12(f02(fk(fk‑1(fk‑2( … (f2(f1(f0(n)))) … ))))))) … )))) … )))) … ))))))) … ))))))) … ))). Then this step is fX(X).
 * 20) Let g!(n) be the functional factorial: g!(1)=g(1), g!(2)=gg(1)(2), g!(3)=gg^[g(1)](2)(3) and, in general, g!(n)=g^[g^[g^…(n-2)](n-1)](n). Then this step is Loader!(X).
 * X!!, where the first “!” is the factorial function and the second “!” is the functional factorial.
 * 1) TREE!!!...!!!(X) with X !’s, where all “!” are functional factorials.
 * 2) Let mg(n) = g^^[m](n) be the functional tetration: 1g(n) = g(n), 2g(n) = gg(n)(n), 3g(n) = gg^[g(n)](n)(n) and, in general, mg(n) = g^[g^[g^[…](n)](n)](n) m times. Then this step is Loader(X)Loader(X).
 * 3) Let g^^^[m](n) be the functional pentation: g^^^[1](n) = g(n), g^^^[2](n) = g^^[g(n)](n), g^^^[3](n) = g^^[g^^[g(n)](n)](n) and, in general, g^^^[m](n) = g^^[g^^[…[g(n)]…](n)](n) m times. Then this step is Loader^^^[Loader(X)](X).
 * 4) Let g↑p[m](n) be the functional hyper-operator: g↑1[m](n) = g↑[m](n) = gm(n), the functional power; g↑2[m](n) = g^^[m](n), the functional tetration; g↑3[m](n) = g^^^[m](n), the functional pentation; and, in general, g↑p[m](n) = g↑p-1[g↑p-1[…[g(n)]…](n)](n) m times. Then this step is Loader↑Loader(X)[Loader(X)](X).
 * 5) X!↑X[X], i.e., the factorial functionally X-ted to X of X.
 * 6) Let fα(n) be a FGH based on functional hyper-operators: f0(n) = nn, fk+1(n) = fk↑fk(n)[fk(n)](n) (see step 2372), and fα(n) = fα[n](n) where α is a countable limit ordinal and α[n] is its fundamental sequence. Call this FHFGH (Functional Hyper-operators Fast Growing Hierarchy). Then this step is FHFGHLVO(X), where LVO is the Large Veblen Ordinal.
 * 7) TREE↑SCG(X)[Hydra(X)](X) (see step 2372).
 * 8) FHFGHX(X) (see step 2374).
 * 9) FHFGHFHFGHω(X)(X) (see step 2374).
 * 10) FHFGHX (see step 2277).
 * 11) Rayo↑Rayo(X)[Rayo(X)](X)
 * 12) Rayo↑Rayo!(X)[Rayo!(X)]!(X)
 * 13) Rayo↑Rayo!!!...(X times)…!!!(X)[Rayo!!!...(X times)…!!!(X)]!!!...(X times)…!!!(X)
 * 14) Rayo↑Rayo!!!...(X! times)…!!!(X!)[Rayo!!!...(X! times)…!!!(X!)]!!!...(X! times)…!!!(X!)
 * R1,2382↑R1,2382(X)[R1,2382(X)](X)
 * 1) X!!!!!!… (X pairs of !’s) …!!!!, where the first “!”, the third “!” and all odd-numbered “!”s are ordinary integer factorials, and the second “!”, the forth “!” and all even-numbered “!”s are functional factorials applied to the “!” on their left.
 * 2) 23  [PUSH]  X  [PUSH]  42  [PUSH]  X  [PUSH]  Loader  X  [PUSH]  ^   !  SCG  TREE  X  [PUSH]  X  [PUSH]  Ackermann  Ackermann  X  [PUSH]  ^^^  Goodstein  Rayo  Rayo  Rayo  Hydra  Worm  Hydra  FOOT  Arx  1  [PUSH]  +  (a tribute to RPN notation).
 * 3) Hydra(Worm(Hydra(FOOT!(Hydra(Worm(Hydra(FOOT!(Hydra(Hydra(Hydra(Worm!(Hydra(Hydra(Hydra(FOOT!(Loader(Loader(Loader(Loader(Loader(Loader(Loader(Worm!(Loader(Loader(Loader(Loader(Loader(Loader(FOOT!(FOOT!(X))))))))))))))))))))))))))))))))
 * 4) XX! (not the factorial of X to the power of X, but factorial functionally tetrated to X of X).
 * 5) FHFGHω(FHFGHε0(FHFGHεX(FHFGHζ0(FHFGHζX(FHFGHΓ0(X)))))) (see step 2374).
 * 6) Ξ!(Ξ!(Ξ!(Ξ!(Ξ!(Ξ!(Ξ!(Ξ!(Ξ!(Ξ!(Ξ!(Ξ!(Ξ!(Ξ!(Ξ!(Ξ!(X))))))))))))))))
 * 7) If g!(n)=g^[g^[g^[...^[g^[g(1)](2)]...](n-2)](n-1)](n) (see step 2367), then g!!(n)=g!^[g!^[g!^[...^[g!^[g!(1)](2)]...](n-2)](n-1)](n) and, in general, g!k+1(n)=g!k^[g!k^[g!k^[...^[g!k^[g!k(1)](2)]...](n-2)](n-1)](n). Then, this step is Goodstein!X(X).
 * 8) Goodstein!X(Goodstein!X-1(…(Goodstein!!(Goodstein!(X)))…))
 * 9) Like Graham’s number, but starting with g1=X^^^(X ^’s)^^^X and continuing up to step gX. (In other words, if Graham’s number were “G(3,4,3,64)”, this one would be “G(X,X,X,X)”.)
 * 10) Goodstein!Goodstein(X)(Goodstein!Goodstein(X)-1(…(Goodstein!!(Goodstein!(X)))…))
 * 11) Goodstein!Goodstein!(X)(Goodstein!Goodstein!(X)-1(…(Goodstein!!(Goodstein!(X)))…))
 * 12) Ξ!X$(Ξ!X$-1(Ξ!X$-2(…(Ξ!!!(Ξ!!(Ξ!(X)))…)))
 * 13) X!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)!Ξ!(X$)$Ξ!(X!)
 * 14) X!!X (first “!” is integer factorial, second “!” is functional factorial which is functionally powered to X).
 * 15) X!!↑X[X] (first “!” is integer factorial, second “!” is functional factorial which is functionally X‑ated to X).
 * 16) X$!↑X[X]
 * 17) Rayo2000(Loader400(Rayo!2000(Loader!400(Rayo!2000!(Loader!400!(X)))) + 2400!!!!!!!!!!!!!!!!!!!
 * 18) Repeat steps 1 to 2400 Ξ!i(Xi!) times each, where i is the step number.
 * 19) Repeat steps 1 to 2401 BBi!i(Ξ!i(Xi!)) times each, where i is the step number.
 * 20) Repeat steps 1 to 2402 FGHεi!i!(BBi!i(Ξ!i(Xi!))) times each, where i is the step number.
 * 21) Repeat steps 1 to 2403 FOOT!i!(FGHεi!i!(BBi!i(Ξ!i(Xi!)))) times each, where i is the step number.
 * 22) Repeat steps 1 to 2404 FHFGHεi!!i!(FOOT!i!(FGHεi!i!(BBi!i(Ξ!i(Xi!))))) times each, where i is the step number.
 * 23) Repeat steps 1 to 2405 SCGi!!i!(FHFGHεi!!i!(FOOT!i!(FGHεi!i!(BBi!i(Ξ!i(Xi!)))))) times each, where i is the step number.
 * R1,2382↑R1,2382(X!)[R1,2382!R1,2382!(X!)(X!)](X!)
 * 1) Let 1 = {X,X,…,X} (BEAF) with X X’s; 2 =
 * 1) Let 1 = {X,X,…,X} (BEAF) with X X’s; 2 =
 * 1) { {X!}, {X!,X!!}, {X!,X!!,X!!!}, …, {X!,X!!,X!!!,…,X!X} }
 * 2) { {X}, {{X, X}, {X, X}}, {{X, X, X}, {X, X, X}, {X, X, X}}, {{X, X, … (X X’s) …, X}, {X, X, … (X X’s) …, X}, … (X {X…X}’s) …, {X, X, … (X X’s) …, X}} }
 * 3) G(G(G(G(X,X,X,X),G(X,X,X,X),G(X,X,X,X),G(X,X,X,X)),G(G(X,X,X,X),G(X,X,X,X),G(X,X,X,X),G(X,X,X,X)),G(G(X,X,X,X),G(X,X,X,X),G(X,X,X,X),G(X,X,X,X)),G(G(X,X,X,X),G(X,X,X,X),G(X,X,X,X),G(X,X,X,X))),G(G(G(X,X,X,X),G(X,X,X,X),G(X,X,X,X),G(X,X,X,X)),G(G(X,X,X,X),G(X,X,X,X),G(X,X,X,X),G(X,X,X,X)),G(G(X,X,X,X),G(X,X,X,X),G(X,X,X,X),G(X,X,X,X)),G(G(X,X,X,X),G(X,X,X,X),G(X,X,X,X),G(X,X,X,X))),G(G(G(X,X,X,X),G(X,X,X,X),G(X,X,X,X),G(X,X,X,X)),G(G(X,X,X,X),G(X,X,X,X),G(X,X,X,X),G(X,X,X,X)),G(G(X,X,X,X),G(X,X,X,X),G(X,X,X,X),G(X,X,X,X)),G(G(X,X,X,X),G(X,X,X,X),G(X,X,X,X),G(X,X,X,X))),G(G(G(X,X,X,X),G(X,X,X,X),G(X,X,X,X),G(X,X,X,X)),G(G(X,X,X,X),G(X,X,X,X),G(X,X,X,X),G(X,X,X,X)),G(G(X,X,X,X),G(X,X,X,X),G(X,X,X,X),G(X,X,X,X)),G(G(X,X,X,X),G(X,X,X,X),G(X,X,X,X),G(X,X,X,X)))) (see step 2392).
 * 4) Arx(Arx(X,X),Arx(X,X,X),Arx(X,X,X,X),…,Arx(X,X,… (X X’s) …,X))
 * 5) Arx(Arx(X!, X!!), Arx(X!, X!!, X!!!), Arx(X!, X!!, X!!!, X!!!!), …, Arx(X!, X!!, … (X X’s) …, X!X))
 * 6) (…(((Ξ↑X[X])↑X![X!])↑X!![X!!])…)↑X!^X[X!X](X)
 * 7) TREE↑TREE!(X)[TREEX$(X)](Loader↑Loader!(X)[LoaderX$(X)](Hydra↑Hydra!(X)[HydraX$(X)](FOOT↑FOOT!(X)[FOOTX$(X)](BB↑BB!(X)[BBX$(X)](tree↑tree!(X)[treeX$(X)](SCG↑SCG!(X)[SCGX$(X)](Goodstein↑Goodstein!(X)[GoodsteinX$(X)](Ξ↑Ξ!(X)[ΞX$(X)](fΓ0↑fΓ0!(X)[fΓ0X$(X)](Rayo↑Rayo!(X)[RayoX$(X)](Circle↑Circle!(X)[CircleX$(X)](BH↑BH!(X)[BHX$(X)](Worm↑Worm!(X)[WormX$(X)](BirdU↑BirdU!(X)[BirdUX$(X)](X)))))))))))))))
 * 8) {d1+3, d2+3, …, dN+3} (using BEAF), where di are the digits of X in decimal.
 * {3, 3, 3, … (X 3’s) …, 3, 4, 4, 4, … (X 4’s) …, 4, 5, 5, 5, … (X 5’s) …, 5, …, X, X, X, … (X X’s) …, X}
 * 1) Let “0”, “1”, …, “9” be function names, let 0n denote “0”(n), etc., let the concatenation of two degits denote function composition (e.g. 42n=“4”(“2”(n))), and let 0n=n^^^^^57, 1n=SCG98(n!), 2n=Rayo(Rayo(n)), 3n=n->n7->n3->n2148->n, 4n={n, n, n, … (4444·n! times) …, n}, 5n=n+n2+n5, 6n=n!n$, 7n=Circle777771977(n-in-a-heptagon), 8n=Ξ!(n!+BB(n!)) and 9n=9·n. Then, this step is X written in decimal applied to X.
 * 2) The number of sides of the next constructible polygon with compass and straightedge after X, multiplied by the number of steps it takes to be constructed.
 * 3) The position of the X-th occurrence of the decimal digits of X in the decimal expansion of π, assuming that π is a normal number. If it didn’t occur, then this step is just X314159…(X digits).
 * 4) The largest finite (halting) output of X connected Sunway TaihuLight computers.
 * 5) Let B0={X,X,…,X} with X X’s, B1={B0,B0,…,B0} with B0 B0’s and Bk+1={Bk,Bk,…,Bk} with Bk Bk’s; then, let B[n]=Bn and C0=B[B[B[…[B0]…]]] with B0 B’s, C1={C0,C0,…,C0} with C0 C0’s and Ck+1={Ck,Ck,…Ck} with Ck Ck’s; let D0=C[C[C[…[C0]…]]] with C0 C’s, and so on. Then this step is ZX.
 * 6) 24232221201918171615141312111009080706050403020100X
 * 7) 24^2424^242424^24242424^2424242424^…^2424…(X 24’s)…24^X
 * 8) {d1+3, d1+3, … (X times) …, d1+3, d2+3, d2+3, … (X times) …, d2+3, …, dN+3, dN+3, … (X times) …, dN+3} (BEAF), where di are the digits of X in decimal.
 * 9) (X↑XX) ↑X (X↑X(X-1)) ↑X (X↑X(X-2)) ↑X … ↑X (X↑X3) ↑X (X↑X2) ↑X (X↑X1) ↑X (X↑X-1X) ↑X (X↑X-1(X-1)) ↑X (X↑X-1(X-2)) ↑X … ↑X (X↑X-13) ↑X (X↑X-12) ↑X (X↑X-11) ↑X (X↑X-2X) ↑X (X↑X-2(X-1)) ↑X (X↑X-2(X-2)) ↑X … ↑X (X↑X-23) ↑X (X↑X-22) ↑X (X↑X-21) ↑X … ↑X (X↑3X) ↑X (X↑3(X-1)) ↑X (X↑3(X-2)) ↑X … ↑X (X↑33) ↑X (X↑32) ↑X (X↑31) ↑X (X↑2X) ↑X (X↑2(X-1)) ↑X (X↑2(X-2)) ↑X … ↑X (X↑23) ↑X (X↑22) ↑X (X↑21) ↑X (X↑1X) ↑X (X↑1(X-1)) ↑X (X↑1(X-2)) ↑X … ↑X (X↑13) ↑X (X↑12) ↑X (X↑11) ↑X-1 (X↑XX) ↑X-1 (X↑X(X-1)) ↑X-1 (X↑X(X-2)) ↑X-1 … ↑X-1 (X↑X3) ↑X-1 (X↑X2) ↑X-1 (X↑X1) ↑X-1 (X↑X-1X) ↑X-1 (X↑X-1(X-1)) ↑X-1 (X↑X-1(X-2)) ↑X-1 … ↑X-1 (X↑X-13) ↑X-1 (X↑X-12) ↑X-1 (X↑X-11) ↑X-1 (X↑X-2X) ↑X-1 (X↑X-2(X-1)) ↑X-1 (X↑X-2(X-2)) ↑X-1 … ↑X-1 (X↑X-23) ↑X-1 (X↑X-22) ↑X-1 (X↑X-21) ↑X-1 … ↑X-1 (X↑3X) ↑X-1 (X↑3(X-1)) ↑X-1 (X↑3(X-2)) ↑X-1 … ↑X-1 (X↑33) ↑X-1 (X↑32) ↑X-1 (X↑31) ↑X-1 (X↑2X) ↑X-1 (X↑2(X-1)) ↑X-1 (X↑2(X-2)) ↑X-1 … ↑X-1 (X↑23) ↑X-1 (X↑22) ↑X-1 (X↑21) ↑X-1 (X↑1X) ↑X-1 (X↑1(X-1)) ↑X-1 (X↑1(X-2)) ↑X-1 … ↑X-1 (X↑13) ↑X-1 (X↑12) ↑X-1 (X↑11) ↑X-2 (X↑XX) ↑X-2 (X↑X(X-1)) ↑X-2 (X↑X(X-2)) ↑X-2 … ↑X-2 (X↑X3) ↑X-2 (X↑X2) ↑X-2 (X↑X1) ↑X-2 (X↑X-1X) ↑X-2 (X↑X-2(X-1)) ↑X-2 (X↑X-2(X-2)) ↑X-2 … ↑X-2 (X↑X-13) ↑X-2 (X↑X-12) ↑X-2 (X↑X-11) ↑X-2 (X↑X-2X) ↑X-2 (X↑X-2(X-1)) ↑X-2 (X↑X-2(X-2)) ↑X-2 … ↑X-2 (X↑X-23) ↑X-2 (X↑X-22) ↑X-2 (X↑X-21) ↑X-2 … ↑X-2 (X↑3X) ↑X-2 (X↑3(X-1)) ↑X-2 (X↑3(X-2)) ↑X-2 … ↑X-2 (X↑33) ↑X-2 (X↑32) ↑X-2 (X↑31) ↑X-2 (X↑2X) ↑X-2 (X↑2(X-1)) ↑X-2 (X↑2(X-2)) ↑X-2 … ↑X-2 (X↑23) ↑X-2 (X↑22) ↑X-2 (X↑21) ↑X-2 (X↑1X) ↑X-2 (X↑1(X-1)) ↑X-2 (X↑1(X-2)) ↑X-2 … ↑X-2 (X↑13) ↑X-2 (X↑12) ↑X-2 (X↑11) … ↑3 (X↑XX) ↑3 (X↑X(X-1)) ↑3 (X↑X(X-2)) ↑3 … ↑3 (X↑X3) ↑3 (X↑X2) ↑3 (X↑X1) ↑3 (X↑X-1X) ↑3 (X↑X-2(X-1)) ↑3 (X↑X-2(X-2)) ↑3 … ↑3 (X↑X-13) ↑3 (X↑X-12) ↑3 (X↑X-11) ↑3 (X↑X-2X) ↑3 (X↑X-2(X-1)) ↑3 (X↑X-2(X-2)) ↑3 … ↑3 (X↑X-23) ↑3 (X↑X-22) ↑3 (X↑X-21) ↑3 … ↑3 (X↑3X) ↑3 (X↑3(X-1)) ↑3 (X↑3(X-2)) ↑3 … ↑3 (X↑33) ↑3 (X↑32) ↑3 (X↑31) ↑3 (X↑2X) ↑3 (X↑2(X-1)) ↑3 (X↑2(X-2)) ↑3 … ↑3 (X↑23) ↑3 (X↑22) ↑3 (X↑21) ↑3 (X↑1X) ↑3 (X↑1(X-1)) ↑3 (X↑1(X-2)) ↑3 … ↑3 (X↑13) ↑3 (X↑12) ↑3 (X↑11) ↑2 (X↑XX) ↑2 (X↑X(X-1)) ↑2 (X↑X(X-2)) ↑2 … ↑2 (X↑X3) ↑2 (X↑X2) ↑2 (X↑X1) ↑2 (X↑X-1X) ↑2 (X↑X-2(X-1)) ↑2 (X↑X-2(X-2)) ↑2 … ↑2 (X↑X-13) ↑2 (X↑X-12) ↑2 (X↑X-11) ↑2 (X↑X-2X) ↑2 (X↑X-2(X-1)) ↑2 (X↑X-2(X-2)) ↑2 … ↑2 (X↑X-23) ↑2 (X↑X-22) ↑2 (X↑X-21) ↑2 … ↑2 (X↑2X) ↑2 (X↑2(X-1)) ↑2 (X↑3(X-2)) ↑2 … ↑2 (X↑33) ↑2 (X↑32) ↑2 (X↑31) ↑2 (X↑2X) ↑2 (X↑2(X-1)) ↑2 (X↑2(X-2)) ↑2 … ↑2 (X↑23) ↑2 (X↑22) ↑2 (X↑21) ↑2 (X↑1X) ↑2 (X↑1(X-1)) ↑2 (X↑1(X-2)) ↑2 … ↑2 (X↑13) ↑2 (X↑12) ↑2 (X↑11) ↑1 (X↑XX) ↑1 (X↑X(X-1)) ↑1 (X↑X(X-2)) ↑1 … ↑1 (X↑X3) ↑1 (X↑X2) ↑1 (X↑X1) ↑1 (X↑X-1X) ↑1 (X↑X-2(X-1)) ↑1 (X↑X-2(X-2)) ↑1 … ↑1 (X↑X-13) ↑1 (X↑X-12) ↑1 (X↑X-11) ↑1 (X↑X-2X) ↑1 (X↑X-2(X-1)) ↑1 (X↑X-2(X-2)) ↑1 … ↑1 (X↑X-23) ↑1 (X↑X-22) ↑1 (X↑X-21) ↑1 … ↑1 (X↑2X) ↑1 (X↑2(X-1)) ↑1 (X↑3(X-2)) ↑1 … ↑1 (X↑33) ↑1 (X↑32) ↑1 (X↑31) ↑1 (X↑2X) ↑1 (X↑2(X-1)) ↑1 (X↑2(X-2)) ↑1 … ↑1 (X↑23) ↑1 (X↑22) ↑1 (X↑21) ↑1 (X↑1X) ↑1 (X↑1(X-1)) ↑1 (X↑1(X-2)) ↑1 … ↑1 (X↑13) ↑1 (X↑12) ↑1 (X↑11) ↑ ((X-1)↑XX) ↑X ((X-1)↑X(X-1)) ↑X ((X-1)↑X(X-2)) ↑X … ↑X ((X-1)↑X3) ↑X ((X-1)↑X2) ↑X ((X-1)↑X1) ↑X ((X-1)↑X-1X) ↑X ((X-1)↑X-1(X-1)) ↑X ((X-1)↑X-1(X-2)) ↑X … ↑X ((X-1)↑X-13) ↑X ((X-1)↑X-12) ↑X ((X-1)↑X-11) ↑X ((X-1)↑X-2X) ↑X ((X-1)↑X-2(X-1)) ↑X ((X-1)↑X-2(X-2)) ↑X … ↑X ((X-1)↑X-23) ↑X ((X-1)↑X-22) ↑X ((X-1)↑X-21) ↑X … ↑X ((X-1)↑3X) ↑X ((X-1)↑3(X-1)) ↑X ((X-1)↑3(X-2)) ↑X … ↑X ((X-1)↑33) ↑X ((X-1)↑32) ↑X ((X-1)↑31) ↑X ((X-1)↑2X) ↑X ((X-1)↑2(X-1)) ↑X ((X-1)↑2(X-2)) ↑X … ↑X ((X-1)↑23) ↑X ((X-1)↑22) ↑X ((X-1)↑21) ↑X ((X-1)↑1X) ↑X ((X-1)↑1(X-1)) ↑X ((X-1)↑1(X-2)) ↑X … ↑X ((X-1)↑13) ↑X ((X-1)↑12) ↑X ((X-1)↑11) ↑X-1 ((X-1)↑XX) ↑X-1 ((X-1)↑X(X-1)) ↑X-1 ((X-1)↑X(X-2)) ↑X-1 … ↑X-1 ((X-1)↑X3) ↑X-1 ((X-1)↑X2) ↑X-1 ((X-1)↑X1) ↑X-1 ((X-1)↑X-1X) ↑X-1 ((X-1)↑X-1(X-1)) ↑X-1 ((X-1)↑X-1(X-2)) ↑X-1 … ↑X-1 ((X-1)↑X-13) ↑X-1 ((X-1)↑X-12) ↑X-1 ((X-1)↑X-11) ↑X-1 ((X-1)↑X-2X) ↑X-1 ((X-1)↑X-2(X-1)) ↑X-1 ((X-1)↑X-2(X-2)) ↑X-1 … ↑X-1 ((X-1)↑X-23) ↑X-1 ((X-1)↑X-22) ↑X-1 ((X-1)↑X-21) ↑X-1 … ↑X-1 ((X-1)↑3X) ↑X-1 ((X-1)↑3(X-1)) ↑X-1 ((X-1)↑3(X-2)) ↑X-1 … ↑X-1 ((X-1)↑33) ↑X-1 ((X-1)↑32) ↑X-1 ((X-1)↑31) ↑X-1 ((X-1)↑2X) ↑X-1 ((X-1)↑2(X-1)) ↑X-1 ((X-1)↑2(X-2)) ↑X-1 … ↑X-1 ((X-1)↑23) ↑X-1 ((X-1)↑22) ↑X-1 ((X-1)↑21) ↑X-1 ((X-1)↑1X) ↑X-1 ((X-1)↑1(X-1)) ↑X-1 ((X-1)↑1(X-2)) ↑X-1 … ↑X-1 ((X-1)↑13) ↑X-1 ((X-1)↑12) ↑X-1 ((X-1)↑11) ↑X-2 ((X-1)↑XX) ↑X-2 ((X-1)↑X(X-1)) ↑X-2 ((X-1)↑X(X-2)) ↑X-2 … ↑X-2 ((X-1)↑X3) ↑X-2 ((X-1)↑X2) ↑X-2 ((X-1)↑X1) ↑X-2 ((X-1)↑X-1X) ↑X-2 ((X-1)↑X-2(X-1)) ↑X-2 ((X-1)↑X-2(X-2)) ↑X-2 … ↑X-2 ((X-1)↑X-13) ↑X-2 ((X-1)↑X-12) ↑X-2 ((X-1)↑X-11) ↑X-2 ((X-1)↑X-2X) ↑X-2 ((X-1)↑X-2(X-1)) ↑X-2 ((X-1)↑X-2(X-2)) ↑X-2 … ↑X-2 ((X-1)↑X-23) ↑X-2 ((X-1)↑X-22) ↑X-2 ((X-1)↑X-21) ↑X-2 … ↑X-2 ((X-1)↑3X) ↑X-2 ((X-1)↑3(X-1)) ↑X-2 ((X-1)↑3(X-2)) ↑X-2 … ↑X-2 ((X-1)↑33) ↑X-2 ((X-1)↑32) ↑X-2((X-1)↑31) ↑X-2 ((X-1)↑2X) ↑X-2 ((X-1)↑2(X-1)) ↑X-2 ((X-1)↑2(X-2)) ↑X-2 … ↑X-2 ((X-1)↑23) ↑X-2 ((X-1)↑22) ↑X-2 ((X-1)↑21) ↑X-2 ((X-1)↑1X) ↑X-2 ((X-1)↑1(X-1)) ↑X-2 ((X-1)↑1(X-2)) ↑X-2 … ↑X-2 ((X-1)↑13) ↑X-2 ((X-1)↑12) ↑X-2 ((X-1)↑11) … ↑3 ((X-1)↑XX) ↑3 ((X-1)↑X(X-1)) ↑3 ((X-1)↑X(X-2)) ↑3 … ↑3 ((X-1)↑X3) ↑3 ((X-1)↑X2) ↑3 ((X-1)↑X1) ↑3 ((X-1)↑X-1X) ↑3 ((X-1)↑X-2(X-1)) ↑3 ((X-1)↑X-2(X-2)) ↑3 … ↑3 ((X-1)↑X-13) ↑3 ((X-1)↑X-12) ↑3 ((X-1)↑X-11) ↑3 ((X-1)↑X-2X) ↑3 ((X-1)↑X-2(X-1)) ↑3 ((X-1)↑X-2(X-2)) ↑3 … ↑3 ((X-1)↑X-23) ↑3 ((X-1)↑X-22) ↑3 ((X-1)↑X-21) ↑3 … ↑3 ((X-1)↑3X) ↑3 ((X-1)↑3(X-1)) ↑3 ((X-1)↑3(X-2)) ↑3 … ↑3 ((X-1)↑33) ↑3 ((X-1)↑32) ↑3 ((X-1)↑31) ↑3 ((X-1)↑2X) ↑3 ((X-1)↑2(X-1)) ↑3 ((X-1)↑2(X-2)) ↑3 … ↑3 ((X-1)↑23) ↑3 ((X-1)↑22) ↑3 ((X-1)↑21) ↑3 ((X-1)↑1X) ↑3 ((X-1)↑1(X-1)) ↑3 ((X-1)↑1(X-2)) ↑3 … ↑3 ((X-1)↑13) ↑3 ((X-1)↑12) ↑3 ((X-1)↑11) ↑2 ((X-1)↑XX) ↑2 ((X-1)↑X(X-1)) ↑2 ((X-1)↑X(X-2)) ↑2 … ↑2 ((X-1)↑X3) ↑2 ((X-1)↑X2) ↑2 ((X-1)↑X1) ↑2 ((X-1)↑X-1X) ↑2 ((X-1)↑X-2(X-1)) ↑2 ((X-1)↑X-2(X-2)) ↑2 … ↑2 ((X-1)↑X-13) ↑2 ((X-1)↑X-12) ↑2 ((X-1)↑X-11) ↑2 ((X-1)↑X-2X) ↑2 ((X-1)↑X-2(X-1)) ↑2 ((X-1)↑X-2(X-2)) ↑2 … ↑2 ((X-1)↑X-23) ↑2 ((X-1)↑X-22) ↑2 ((X-1)↑X-21) ↑2 … ↑2 ((X-1)↑2X) ↑2 ((X-1)↑2(X-1)) ↑2 ((X-1)↑3(X-2)) ↑2 … ↑2 ((X-1)↑33) ↑2 ((X-1)↑32) ↑2 ((X-1)↑31) ↑2 ((X-1)↑2X) ↑2 ((X-1)↑2(X-1)) ↑2 ((X-1)↑2(X-2)) ↑2 … ↑2 ((X-1)↑23) ↑2 ((X-1)↑22) ↑2 ((X-1)↑21) ↑2 ((X-1)↑1X) ↑2 ((X-1)↑1(X-1)) ↑2 ((X-1)↑1(X-2)) ↑2 … ↑2 ((X-1)↑13) ↑2 ((X-1)↑12) ↑2 ((X-1)↑11) ↑1 ((X-1)↑XX) ↑1 ((X-1)↑X(X-1)) ↑1 ((X-1)↑X(X-2)) ↑1 … ↑1 ((X-1)↑X3) ↑1 ((X-1)↑X2) ↑1 ((X-1)↑X1) ↑1 ((X-1)↑X-1X) ↑1 ((X-1)↑X-2(X-1)) ↑1 ((X-1)↑X-2(X-2)) ↑1 … ↑1 ((X-1)↑X-13) ↑1 ((X-1)↑X-12) ↑1 ((X-1)↑X-11) ↑1 ((X-1)↑X-2X) ↑1 ((X-1)↑X-2(X-1)) ↑1 ((X-1)↑X-2(X-2)) ↑1 … ↑1 ((X-1)↑X-23) ↑1 ((X-1)↑X-22) ↑1 ((X-1)↑X-21) ↑1 … ↑1 ((X-1)↑2X) ↑1 ((X-1)↑2(X-1)) ↑1 ((X-1)↑3(X-2)) ↑1 … ↑1 ((X-1)↑33) ↑1 ((X-1)↑32) ↑1 ((X-1)↑31) ↑1 ((X-1)↑2X) ↑1 ((X-1)↑2(X-1)) ↑1 ((X-1)↑2(X-2)) ↑1 … ↑1 ((X-1)↑23) ↑1 ((X-1)↑22) ↑1 ((X-1)↑21) ↑1 ((X-1)↑1X) ↑1 ((X-1)↑1(X-1)) ↑1 ((X-1)↑1(X-2)) ↑1 … ↑1 ((X-1)↑13) ↑1 ((X-1)↑12) ↑1 ((X-1)↑11) ↑ ((X-2)↑XX) ↑X ((X-2)↑X(X-1)) ↑X ((X-2)↑X(X-2)) ↑X … ↑X ((X-2)↑X3) ↑X ((X-2)↑X2) ↑X ((X-2)↑X1) ↑X ((X-2)↑X-1X) ↑X ((X-2)↑X-1(X-1)) ↑X ((X-2)↑X-1(X-2)) ↑X … ↑X ((X-2)↑X-13) ↑X ((X-2)↑X-12) ↑X ((X-2)↑X-11) ↑X ((X-2)↑X-2X) ↑X ((X-2)↑X-2(X-1)) ↑X ((X-2)↑X-2(X-2)) ↑X … ↑X ((X-2)↑X-23) ↑X ((X-2)↑X-22) ↑X ((X-2)↑X-21) ↑X … ↑X ((X-2)↑3X) ↑X ((X-2)↑3(X-1)) ↑X ((X-2)↑3(X-2)) ↑X … ↑X ((X-2)↑33) ↑X ((X-2)↑32) ↑X((X-2)↑31) ↑X ((X-2)↑2X) ↑X ((X-2)↑2(X-1)) ↑X ((X-2)↑2(X-2)) ↑X … ↑X ((X-2)↑23) ↑X ((X-2)↑22) ↑X ((X-2)↑21) ↑X ((X-2)↑1X) ↑X ((X-2)↑1(X-1)) ↑X ((X-2)↑1(X-2)) ↑X … ↑X ((X-2)↑13) ↑X ((X-2)↑12) ↑X ((X-2)↑11) ↑X-1 ((X-2)↑XX) ↑X-1 ((X-2)↑X(X-1)) ↑X-1 ((X-2)↑X(X-2)) ↑X-1 … ↑X-1 ((X-2)↑X3) ↑X-1 ((X-2)↑X2) ↑X-1 ((X-2)↑X1) ↑X-1 ((X-2)↑X-1X) ↑X-1 ((X-2)↑X-1(X-1)) ↑X-1 ((X-2)↑X-1(X-2)) ↑X-1 … ↑X-1 ((X-2)↑X-13) ↑X-1 ((X-2)↑X-12) ↑X-1 ((X-2)↑X-11) ↑X-1 ((X-2)↑X-2X) ↑X-1 ((X-2)↑X-2(X-1)) ↑X-1 ((X-2)↑X-2(X-2)) ↑X-1 … ↑X-1 ((X-2)↑X-23) ↑X-1 ((X-2)↑X-22) ↑X-1 ((X-2)↑X-21) ↑X-1 … ↑X-1 ((X-2)↑3X)X-1 ((X-2)↑3(X-1)) ↑X-1 ((X-2)↑3(X-2))↑X-1 … ↑X-1 ((X-2)↑33) ↑X-1 ((X-2)↑32) ↑X-1 ((X-2)↑31) ↑X-1 ((X-2)↑2X) ↑X-1 ((X-2)↑2(X-1)) ↑X-1 ((X-2)↑2(X-2)) ↑X-1 … ↑X-1 ((X-2)↑23) ↑X-1 ((X-2)↑22) ↑X-1 ((X-2)↑21) ↑X-1 ((X-2)↑1X) ↑X-1 ((X-2)↑1(X-1)) ↑X-1 ((X-2)↑1(X-2)) ↑X-1 … ↑X-1 ((X-2)↑13) ↑X-1 ((X-2)↑12) ↑X-1 ((X-2)↑11) ↑X-2 ((X-2)↑XX) ↑X-2 ((X-2)↑X(X-1)) ↑X-2 ((X-2)↑X(X-2)) ↑X-2 … ↑X-2 ((X-2)↑X3) ↑X-2 ((X-2)↑X2) ↑X-2 ((X-2)↑X1) ↑X-2 ((X-2)↑X-1X) ↑X-2 ((X-2)↑X-2(X-1)) ↑X-2 ((X-2)↑X-2(X-2)) ↑X-2 … ↑X-2 ((X-2)↑X-13) ↑X-2 ((X-2)↑X-12) ↑X-2 ((X-2)↑X-11) ↑X-2 ((X-2)↑X-2X) ↑X-2 ((X-2)↑X-2(X-1)) ↑X-2 ((X-2)↑X-2(X-2)) ↑X-2 … ↑X-2 ((X-2)↑X-23) ↑X-2 ((X-2)↑X-22) ↑X-2 ((X-2)↑X-21) ↑X-2 … ↑X-2 ((X-2)↑3X) ↑X-2 ((X-2)↑3(X-1)) ↑X-2 ((X-2)↑3(X-2)) ↑X-2 … ↑X-2 ((X-2)↑33) ↑X-2 ((X-2)↑32) ↑X-2 ((X-2)↑31) ↑X-2 ((X-2)↑2X) ↑X-2 ((X-2)↑2(X-1)) ↑X-2 ((X-2)↑2(X-2)) ↑X-2 … ↑X-2 ((X-2)↑23) ↑X-2 ((X-2)↑22) ↑X-2 ((X-2)↑21) ↑X-2 ((X-2)↑1X) ↑X-2 ((X-2)↑1(X-1)) ↑X-2 ((X-2)↑1(X-2)) ↑X-2 … ↑X-2 ((X-2)↑13) ↑X-2 ((X-2)↑12) ↑X-2 ((X-2)↑11) … ↑3 ((X-2)↑XX) ↑3 ((X-2)↑X(X-1)) ↑3 ((X-2)↑X(X-2)) ↑3 … ↑3 ((X-2)↑X3) ↑3 ((X-2)↑X2) ↑3 ((X-2)↑X1) ↑3 ((X-2)↑X-1X) ↑3 ((X-2)↑X-2(X-1)) ↑3 ((X-2)↑X-2(X-2)) ↑3 … ↑3 ((X-2)↑X-13) ↑3 ((X-2)↑X-12) ↑3 ((X-2)↑X-11) ↑3 ((X-2)↑X-2X) ↑3 ((X-2)↑X-2(X-1)) ↑3 ((X-2)↑X-2(X-2)) ↑3 … ↑3 ((X-2)↑X-23) ↑3 ((X-2)↑X-22) ↑3 ((X-2)↑X-21) ↑3 … ↑3 ((X-2)↑3X) ↑3 ((X-2)↑3(X-1)) ↑3 ((X-2)↑3(X-2)) ↑3 … ↑3 ((X-2)↑33) ↑3 ((X-2)↑32) ↑3 ((X-2)↑31) ↑3 ((X-2)↑2X) ↑3 ((X-2)↑2(X-1)) ↑3 ((X-2)↑2(X-2)) ↑3 … ↑3 ((X-2)↑23) ↑3 ((X-2)↑22) ↑3 ((X-2)↑21) ↑3 ((X-2)↑1X) ↑3 ((X-2)↑1(X-1)) ↑3 ((X-2)↑1(X-2)) ↑3 … ↑3 ((X-2)↑13) ↑3 ((X-2)↑12) ↑3 ((X-2)↑11) ↑2 ((X-2)↑XX) ↑2 ((X-2)↑X(X-1)) ↑2 ((X-2)↑X(X-2)) ↑2 … ↑2 ((X-2)↑X3) ↑2 ((X-2)↑X2) ↑2 ((X-2)↑X1) ↑2 ((X-2)↑X-1X) ↑2 ((X-2)↑X-2(X-1)) ↑2 ((X-2)↑X-2(X-2)) ↑2 … ↑2 ((X-2)↑X-13) ↑2 ((X-2)↑X-12) ↑2 ((X-2)↑X-11) ↑2 ((X-2)↑X-2X) ↑2 ((X-2)↑X-2(X-1)) ↑2 ((X-2)↑X-2(X-2)) ↑2 … ↑2 ((X-2)↑X-23) ↑2 ((X-2)↑X-22) ↑2 ((X-2)↑X-21) ↑2 … ↑2 ((X-2)↑2X) ↑2 ((X-2)↑2(X-1)) ↑2 ((X-2)↑3(X-2)) ↑2 … ↑2 ((X-2)↑33) ↑2 ((X-2)↑32) ↑2 ((X-2)↑31) ↑2 ((X-2)↑2X) ↑2 ((X-2)↑2(X-1)) ↑2 ((X-2)↑2(X-2)) ↑2 … ↑2 ((X-2)↑23) ↑2 ((X-2)↑22) ↑2 ((X-2)↑21) ↑2 ((X-2)↑1X) ↑2 ((X-2)↑1(X-1)) ↑2 ((X-2)↑1(X-2)) ↑2 … ↑2 ((X-2)↑13) ↑2 ((X-2)↑12) ↑2 ((X-2)↑11) ↑1 ((X-2)↑XX) ↑1 ((X-2)↑X(X-1)) ↑1 ((X-2)↑X(X-2)) ↑1 … ↑1 ((X-2)↑X3) ↑1 ((X-2)↑X2) ↑1 ((X-2)↑X1) ↑1 ((X-2)↑X-1X) ↑1 ((X-2)↑X-2(X-1)) ↑1 ((X-2)↑X-2(X-2)) ↑1 … ↑1 ((X-2)↑X-13) ↑1 ((X-2)↑X-12) ↑1 ((X-2)↑X-11) ↑1 ((X-2)↑X-2X) ↑1 ((X-2)↑X-2(X-1)) ↑1 ((X-2)↑X-2(X-2)) ↑1 … ↑1 ((X-2)↑X-23) ↑1 ((X-2)↑X-22) ↑1 ((X-2)↑X-21) ↑1 … ↑1 ((X-2)↑2X) ↑1 ((X-2)↑2(X-1)) ↑1 ((X-2)↑3(X-2)) ↑1 … ↑1 ((X-2)↑33) ↑1 ((X-2)↑32) ↑1 ((X-2)↑31) ↑1 ((X-2)↑2X) ↑1 ((X-2)↑2(X-1)) ↑1 ((X-2)↑2(X-2)) ↑1 … ↑1 ((X-2)↑23) ↑1 ((X-2)↑22) ↑1 ((X-2)↑21) ↑1 ((X-2)↑1X) ↑1 ((X-2)↑1(X-1)) ↑1 ((X-2)↑1(X-2)) ↑1 … ↑1 ((X-2)↑13) ↑1 ((X-2)↑12) ↑1 ((X-2)↑11) ↑ … ↑ (3↑XX) ↑X (3↑X(X-1)) ↑X (3↑X(X-2)) ↑X … ↑X (3↑X3) ↑X (3↑X2) ↑X (3↑X1) ↑X (3↑X-1X) ↑X (3↑X-1(X-1)) ↑X (3↑X-1(X-2)) ↑X … ↑X (3↑X-13) ↑X (3↑X-12) ↑X (3↑X-11) ↑X (3↑X-2X) ↑X (3↑X-2(X-1)) ↑X (3↑X-2(X-2)) ↑X … ↑X (3↑X-23) ↑X (3↑X-22) ↑X (3↑X-21) ↑X … ↑X (3↑3X) ↑X (3↑3(X-1)) ↑X (3↑3(X-2)) ↑X … ↑X (3↑33) ↑X (3↑32) ↑X (3↑31) ↑X (3↑2X) ↑X (3↑2(X-1)) ↑X (3↑2(X-2)) ↑X … ↑X (3↑23) ↑X (3↑22) ↑X (3↑21) ↑X (3↑1X) ↑X (3↑1(X-1)) ↑X (3↑1(X-2)) ↑X … ↑X (3↑13) ↑X (3↑12) ↑X (3↑11) ↑X-1 (3↑XX) ↑X-1 (3↑X(X-1)) ↑X-1 (3↑X(X-2)) ↑X-1 … ↑X-1 (3↑X3) ↑X-1 (3↑X2) ↑X-1 (3↑X1) ↑X-1 (3↑X-1X) ↑X-1 (3↑X-1(X-1)) ↑X-1 (3↑X-1(X-2)) ↑X-1 … ↑X-1 (3↑X-13) ↑X-1 (3↑X-12) ↑X-1 (3↑X-11) ↑X-1 (3↑X-2X) ↑X-1 (3↑X-2(X-1)) ↑X-1 (3↑X-2(X-2)) ↑X-1 … ↑X-1 (3↑X-23) ↑X-1 (3↑X-22) ↑X-1 (3↑X-21) ↑X-1 … ↑X-1 (3↑3X) ↑X-1 (3↑3(X-1)) ↑X-1 (3↑3(X-2)) ↑X-1 … ↑X-1 (3↑33) ↑X-1 (3↑32) ↑X-1 (3↑31) ↑X-1 (3↑2X) ↑X-1 (3↑2(X-1)) ↑X-1 (3↑2(X-2)) ↑X-1 … ↑X-1 (3↑23) ↑X-1 (3↑22) ↑X-1 (3↑21) ↑X-1 (3↑1X) ↑X-1 (3↑1(X-1)) ↑X-1 (3↑1(X-2)) ↑X-1 … ↑X-1 (3↑13) ↑X-1 (3↑12) ↑X-1 (3↑11) ↑X-2 (3↑XX) ↑X-2 (3↑X(X-1)) ↑X-2 (3↑X(X-2)) ↑X-2 … ↑X-2(3↑X3) ↑X-2 (3↑X2) ↑X-2 (3↑X1) ↑X-2 (3↑X-1X) ↑X-2 (3↑X-2(X-1)) ↑X-2 (3↑X-2(X-2)) ↑X-2 … ↑X-2 (3↑X-13) ↑X-2(3↑X-12) ↑X-2 (3↑X-11) ↑X-2 (3↑X-2X) ↑X-2 (3↑X-2(X-1)) ↑X-2 (3↑X-2(X-2)) ↑X-2 … ↑X-2 (3↑X-23) ↑X-2 (3↑X-22) ↑X-2 (3↑X-21) ↑X-2 … ↑X-2 (3↑3X)↑X-2 (3↑3(X-1)) ↑X-2 (3↑3(X-2)) ↑X-2 … ↑X-2 (3↑33) ↑X-2 (3↑32) ↑X-2 (3↑31) ↑X-2 (3↑2X) ↑X-2 (3↑2(X-1)) ↑X-2 (3↑2(X-2)) ↑X-2 … ↑X-2 (3↑23) ↑X-2 (3↑22) ↑X-2 (3↑21) ↑X-2 (3↑1X) ↑X-2 (3↑1(X-1)) ↑X-2 (3↑1(X-2)) ↑X-2 … ↑X-2 (3↑13) ↑X-2 (3↑12) ↑X-2 (3↑11) … ↑3 (3↑XX) ↑3 (3↑X(X-1)) ↑3 (3↑X(X-2)) ↑3 … ↑3 (3↑X3) ↑3 (3↑X2) ↑3 (3↑X1) ↑3 (3↑X-1X) ↑3 (3↑X-2(X-1)) ↑3 (3↑X-2(X-2)) ↑3 … ↑3 (3↑X-13) ↑3 (3↑X-12) ↑3 (3↑X-11) ↑3 (3↑X-2X) ↑3 (3↑X-2(X-1)) ↑3 (3↑X-2(X-2)) ↑3 … ↑3 (3↑X-23) ↑3 (3↑X-22) ↑3 (3↑X-21) ↑3 … ↑3 (3↑3X) ↑3 (3↑3(X-1)) ↑3 (3↑3(X-2)) ↑3 … ↑3 (3↑33) ↑3 (3↑32) ↑3 (3↑31) ↑3 (3↑2X) ↑3 (3↑2(X-1)) ↑3 (3↑2(X-2)) ↑3 … ↑3 (3↑23) ↑3 (3↑22) ↑3 (3↑21) ↑3 (3↑1X) ↑3 (3↑1(X-1)) ↑3 (3↑1(X-2)) ↑3 … ↑3 (3↑13) ↑3 (3↑12) ↑3 (3↑11) ↑2 (3↑XX) ↑2 (3↑X(X-1)) ↑2 (3↑X(X-2)) ↑2 … ↑2 (3↑X3) ↑2 (3↑X2) ↑2 (3↑X1) ↑2 (3↑X-1X) ↑2 (3↑X-2(X-1)) ↑2 (3↑X-2(X-2)) ↑2 … ↑2 (3↑X-13) ↑2 (3↑X-12) ↑2 (3↑X-11) ↑2 (3↑X-2X) ↑2 (3↑X-2(X-1)) ↑2 (3↑X-2(X-2)) ↑2 … ↑2 (3↑X-23) ↑2 (3↑X-22) ↑2 (3↑X-21) ↑2 … ↑2 (3↑2X) ↑2 (3↑2(X-1)) ↑2 (3↑3(X-2)) ↑2 … ↑2 (3↑33) ↑2 (3↑32) ↑2 (3↑31) ↑2 (3↑2X) ↑2 (3↑2(X-1)) ↑2 (3↑2(X-2)) ↑2 … ↑2 (3↑23) ↑2 (3↑22) ↑2 (3↑21) ↑2 (3↑1X) ↑2 (3↑1(X-1)) ↑2 (3↑1(X-2)) ↑2 … ↑2 (3↑13) ↑2 (3↑12) ↑2 (3↑11) ↑1 (3↑XX) ↑1 (3↑X(X-1)) ↑1 (3↑X(X-2)) ↑1 … ↑1 (3↑X3) ↑1 (3↑X2) ↑1 (3↑X1) ↑1 (3↑X-1X) ↑1 (3↑X-2(X-1)) ↑1 (3↑X-2(X-2)) ↑1 … ↑1 (3↑X-13) ↑1 (3↑X-12) ↑1 (3↑X-11) ↑1 (3↑X-2X) ↑1 (3↑X-2(X-1)) ↑1 (3↑X-2(X-2)) ↑1 … ↑1 (3↑X-23) ↑1 (3↑X-22) ↑1 (3↑X-21) ↑1 … ↑1 (3↑2X) ↑1 (3↑2(X-1)) ↑1 (3↑3(X-2)) ↑1 … ↑1 (3↑33) ↑1 (3↑32) ↑1 (3↑31) ↑1 (3↑2X) ↑1 (3↑2(X-1)) ↑1 (3↑2(X-2)) ↑1 … ↑1 (3↑23) ↑1 (3↑22) ↑1 (3↑21) ↑1 (3↑1X) ↑1 (3↑1(X-1)) ↑1 (3↑1(X-2)) ↑1 … ↑1 (3↑13) ↑1 (3↑12) ↑1 (3↑11) ↑ (2↑XX) ↑X (2↑X(X-1)) ↑X (2↑X(X-2)) ↑X … ↑X (2↑X3) ↑X (2↑X2) ↑X (2↑X1) ↑X (2↑X-1X) ↑X (2↑X-1(X-1)) ↑X (2↑X-1(X-2)) ↑X … ↑X (2↑X-13) ↑X (2↑X-12) ↑X (2↑X-11) ↑X (2↑X-2X) ↑X (2↑X-2(X-1)) ↑X (2↑X-2(X-2)) ↑X … ↑X (2↑X-23) ↑X (2↑X-22) ↑X (2↑X-21) ↑X … ↑X (2↑3X) ↑X (2↑3(X-1)) ↑X (2↑3(X-2)) ↑X … ↑X (2↑33) ↑X (2↑32) ↑X (2↑31) ↑X (2↑2X) ↑X (2↑2(X-1)) ↑X (2↑2(X-2)) ↑X … ↑X (2↑23) ↑X (2↑22) ↑X (2↑21) ↑X (2↑1X) ↑X (2↑1(X-1)) ↑X (2↑1(X-2)) ↑X … ↑X (2↑13) ↑X (2↑12) ↑X (2↑11) ↑X-1 (2↑XX) ↑X-1 (2↑X(X-1)) ↑X-1 (2↑X(X-2)) ↑X-1 … ↑X-1 (2↑X3) ↑X-1 (2↑X2) ↑X-1 (2↑X1) ↑X-1 (2↑X-1X) ↑X-1 (2↑X-1(X-1)) ↑X-1 (2↑X-1(X-2)) ↑X-1 … ↑X-1 (2↑X-13) ↑X-1 (2↑X-12) ↑X-1 (2↑X-11) ↑X-1 (2↑X-2X) ↑X-1 (2↑X-2(X-1)) ↑X-1 (2↑X-2(X-2)) ↑X-1 … ↑X-1 (2↑X-23) ↑X-1 (2↑X-22) ↑X-1 (2↑X-21) ↑X-1 … ↑X-1 (2↑3X) ↑X-1 (2↑3(X-1)) ↑X-1 (2↑3(X-2)) ↑X-1 … ↑X-1 (2↑33) ↑X-1 (2↑32) ↑X-1 (2↑31) ↑X-1 (2↑2X) ↑X-1 (2↑2(X-1)) ↑X-1 (2↑2(X-2)) ↑X-1 … ↑X-1 (2↑23) ↑X-1 (2↑22) ↑X-1 (2↑21) ↑X-1 (2↑1X) ↑X-1 (2↑1(X-1)) ↑X-1 (2↑1(X-2)) ↑X-1 … ↑X-1 (2↑13) ↑X-1 (2↑12) ↑X-1 (2↑11) ↑X-2 (2↑XX) ↑X-2 (2↑X(X-1)) ↑X-2 (2↑X(X-2)) ↑X-2 … ↑X-2 (2↑X3) ↑X-2 (2↑X2) ↑X-2 (2↑X1) ↑X-2 (2↑X-1X) ↑X-2 (2↑X-2(X-1)) ↑X-2 (2↑X-2(X-2)) ↑X-2 … ↑X-2 (2↑X-13) ↑X-2 (2↑X-12) ↑X-2 (2↑X-11) ↑X-2 (2↑X-2X) ↑X-2 (2↑X-2(X-1)) ↑X-2 (2↑X-2(X-2)) ↑X-2 … ↑X-2 (2↑X-23) ↑X-2 (2↑X-22) ↑X-2 (2↑X-21) ↑X-2 … ↑X-2 (2↑3X) ↑X-2 (2↑3(X-1)) ↑X-2 (2↑3(X-2)) ↑X-2 … ↑X-2 (2↑33) ↑X-2 (2↑32) ↑X-2 (2↑31) ↑X-2 (2↑2X) ↑X-2 (2↑2(X-1)) ↑X-2 (2↑2(X-2)) ↑X-2 … ↑X-2 (2↑23) ↑X-2 (2↑22) ↑X-2 (2↑21) ↑X-2 (2↑1X) ↑X-2 (2↑1(X-1)) ↑X-2 (2↑1(X-2)) ↑X-2 … ↑X-2 (2↑13) ↑X-2 (2↑12) ↑X-2 (2↑11) … ↑3 (2↑XX) ↑3 (2↑X(X-1)) ↑3 (2↑X(X-2)) ↑3 … ↑3(2↑X3) ↑3 (2↑X2) ↑3 (2↑X1) ↑3 (2↑X-1X) ↑3 (2↑X-2(X-1)) ↑3 (2↑X-2(X-2)) ↑3 … ↑3 (2↑X-13) ↑3 (2↑X-12) ↑3 (2↑X-11) ↑3 (2↑X-2X) ↑3 (2↑X-2(X-1)) ↑3 (2↑X-2(X-2)) ↑3 … ↑3 (2↑X-23) ↑3 (2↑X-22) ↑3 (2↑X-21) ↑3 … ↑3 (2↑3X) ↑3 (2↑3(X-1)) ↑3 (2↑3(X-2)) ↑3 … ↑3 (2↑33) ↑3 (2↑32) ↑3 (2↑31) ↑3 (2↑2X) ↑3 (2↑2(X-1)) ↑3 (2↑2(X-2)) ↑3 … ↑3 (2↑23) ↑3 (2↑22) ↑3 (2↑21) ↑3 (2↑1X) ↑3 (2↑1(X-1)) ↑3 (2↑1(X-2)) ↑3 … ↑3 (2↑13) ↑3 (2↑12) ↑3 (2↑11) ↑2 (2↑XX) ↑2 (2↑X(X-1)) ↑2 (2↑X(X-2)) ↑2 … ↑2 (2↑X3) ↑2 (2↑X2) ↑2 (2↑X1) ↑2 (2↑X-1X) ↑2 (2↑X-2(X-1)) ↑2 (2↑X-2(X-2)) ↑2 … ↑2 (2↑X-13) ↑2 (2↑X-12) ↑2 (2↑X-11) ↑2 (2↑X-2X) ↑2 (2↑X-2(X-1)) ↑2 (2↑X-2(X-2)) ↑2 … ↑2 (2↑X-23) ↑2 (2↑X-22) ↑2 (2↑X-21) ↑2 … ↑2 (2↑2X) ↑2 (2↑2(X-1)) ↑2 (2↑3(X-2)) ↑2 … ↑2 (2↑33) ↑2 (2↑32) ↑2 (2↑31) ↑2 (2↑2X) ↑2 (2↑2(X-1)) ↑2 (2↑2(X-2)) ↑2 … ↑2 (2↑23) ↑2 (2↑22) ↑2 (2↑21) ↑2 (2↑1X) ↑2 (2↑1(X-1)) ↑2 (2↑1(X-2)) ↑2 … ↑2 (2↑13) ↑2 (2↑12) ↑2 (2↑11) ↑1 (2↑XX) ↑1 (2↑X(X-1)) ↑1 (2↑X(X-2)) ↑1 … ↑1 (2↑X3) ↑1 (2↑X2) ↑1 (2↑X1) ↑1 (2↑X-1X) ↑1 (2↑X-2(X-1)) ↑1 (2↑X-2(X-2)) ↑1 … ↑1 (2↑X-13) ↑1 (2↑X-12) ↑1 (2↑X-11) ↑1 (2↑X-2X) ↑1 (2↑X-2(X-1)) ↑1 (2↑X-2(X-2)) ↑1 … ↑1 (2↑X-23) ↑1 (2↑X-22) ↑1 (2↑X-21) ↑1 … ↑1 (2↑2X) ↑1 (2↑2(X-1)) ↑1 (2↑3(X-2)) ↑1 … ↑1 (2↑33) ↑1 (2↑32) ↑1 (2↑31) ↑1 (2↑2X) ↑1 (2↑2(X-1)) ↑1 (2↑2(X-2)) ↑1 … ↑1 (2↑23) ↑1 (2↑22) ↑1 (2↑21) ↑1 (2↑1X) ↑1 (2↑1(X-1)) ↑1 (2↑1(X-2)) ↑1 … ↑1 (2↑13) ↑1 (2↑12) ↑1 (2↑11)
 * 10) X!X!·(X-1)!(X-1)!·(X-2)!(X-2)!·…·3!3!·2!2!·1!1!
 * A(X,A(X-1,A(X-2,A(…A(3,A(2,A(1,1)))…)))) (Ackermann function).
 * {X, X, … (X times) …, X, {X-1, X-1, … (X-1 times) …, X-1, {X-2, X-2, … (X-2 times) …, X-2, { …, {5, 5, 5, 5, 5, {4, 4, 4, 4, {3, 3, 3}, 4, 4, 4, 4}, 5, 5, 5, 5, 5}, …}, X-2, X-2, … (X-2 times)…, X-2}, X-1, X-1, … (X-1 times)…, X-1}, X, X, … (X times) …, X} (BEAF).
 * 1) X & (X-1) & (X-2) & … 5 & 4 & 3 & (X-1) & (X-2) & (X-3) & … 5 & 4 & 3 & (X-2) & (X-3) & (X-4) & … & 5 & 4 & 3 & … & 6 & 5 & 4 & 3 & 5 & 4 & 3 & 4 & 3 & 3
 * 2) Let H(n) = H(n, n, n) = n ^^^^^…(n-2)…^^ n. Then this step is H↑H(X)[H(X)](X).
 * 3) Ξ({Ξ(X), Ξ(X), … (Ξ(X) times) …, Ξ(X)})
 * 4) Write X in base 2432, interpret each digit di as the di-th step (the 0 meaning step 2432) and apply all those steps again starting with the current value of X (rightmost digit/step first).
 * 5) Write X in decimal digits together with all the permutations of all those digits and intepret them as in step 2418 (applied to X).
 * 6) Repeat step 2434 but writing the names of the digits of current X in letters, concatenate them and interpret them as in step 2277 (applied to current X). (Just in case: replace “X” letters by “Z” ones if necessary.)
 * 7) Let f0(n)=Rayo!Rayo(n)(n!Rayo(n)), f1(n)=f0!f0(n)(n!f0(n)) and fk+1(n)=fk!fk(n)(n!fk(n)). Then this step is fX(FOOT(X)+TREE(BB(X))).
 * 8) BHBB(BH(X))(BBBH(BB(X))(BHBB(BH(X))(BBBH(BB(X))(BHBB(BH(X))(BBBH(BB(X))(BHBB(BH(X))(BBBH(BB(X))(BHBB(BH(X))(BBBH(BB(X))(BHBB(BH(X))(BBBH(BB(X))(BHBB(BH(X))(BBBH(BB(X))(BHBB(BH(X))(BBBH(BB(X))(BHBB(BH(X))(BBBH(BB(X))(BHBB(BH(X))(BBBH(BB(X))(BHBB(BH(X))(BBBH(BB(X))(BHBB(BH(X))(BBBH(BB(X))(BHBB(BH(X))(BBBH(BB(X))(BHBB(BH(X))(BBBH(BB(X))(BHBB(BH(X))(BBBH(BB(X))(BHBB(BH(X))(BBBH(BB(X))(X))))))))))))))))))))))))))))))))
 * 9) FOOT(FOOT(10100+X))
 * 10) Let (f o g)(n) = f(g(n)), Ñ0(n)=(SCG o Hydra o TREE)↑(Loader o SCG)(n!)[(BB o BH)(n)](n) and Ñk+1(n)=(Ñk o Loader o Ñk)↑n[n](Ñk(Ñko Ξ)!(n)(n$n)). Then this step is ÑX!·Ξ(X)(X$ÑX!(X)).
 * 11) tree(TREE!(tree(TREE(tree!(TREE(tree(TREE!(tree(TREE(tree!(TREE(tree(TREE!(tree(TREE(tree!(TREE(tree(TREE!(tree(TREE(tree!(TREE(tree(TREE!(tree(TREE(tree!(TREE(tree(TREE!(X))))))))))))))))))))))))))))))))
 * A(X,X) · A(X,X-1) · … · A(X,3) · A(X,2) · A(X,1) · A(X-1,X) · A(X-1,X-1) · … · A(X-1,3) · A(X-1,2) · A(X-1,1) · … · A(3,X) · A(3,X-1) · … · A(3,3) · A(3,2) · A(3,1) · A(2,X) · A(2,X-1) · … · A(2,3) · A(2,2) · A(3,1) · A(1,X) · A(1,X-1) · … · A(1,3) · A(1,2) · A(1,1)
 * 1) 24→X→X!→X!X!→Ξ(X)→Ξ!(X!)→Ξ!Ξ!(X!)(XΞ!(X!)!Ξ!(X!))→Ξ!(X!)→Ξ(X)→X!X!→X!→X→42
 * 2) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!)→Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!) →Ξ!(X!) XΞ!(X!)
 * 3) 2444 → 44444 → 444444 → 4444444 → … → 444… (X 4’s) …44 → X
 * 4) {111… (X 1’s) …11,  222… (X 2’s) …22,  333… (X 3’s) …33,  444… (X 4’s) …44,  555… (X 5’s) …55,  666… (X 6’s) …66,  777… (X 7’s) …77,  888… (X 8’s) …88,  999… (X 9’s) …99}
 * 5) 24242424242424242424242424242424242424242424242424242424242424242424242424242424242424242424→X→464646464646464646464646464646464646464646464646 (there are 46 24’s and 24 46’s).
 * 6) GB1={3,3,3,3}, GB2={3,3,3,…,3} with GB1 3’s, GB3={3,3,3,…,3} with GB2 3’s, …, GB64={3,3,3,…,3} with GB63 3’s is the Graham-Bowers number, …, GBGB64 is the Graham-Bowers-plex, etc. This step is GBX.
 * 7) The largest number k such that there is some unary formula φ in the language of L={∈,T} of quantifier rank X such that  ∃!a(φ(a))∧φ(k) (using the definition of Little Bigeddon)
 * 8) {X31!79·X79$31, X31$79·X79!31, 31X!79·79X$31, 31X$79·79X!31}
 * 9) pete7(marxen(X))
 * 10) BBω+BB(X)(BBBB(X)(X))
 * 11) (SCG!)(SCG!)^[(SCG!)^[(SCG!)^[…[SCG!(X)]…](X)](X)](X)(X), with SCG!(X) SCG!’s.
 * 12) The next number after X which is palindromic in all bases from 2 to X, if it exists; if not, then just the next palindromic number in decimal after X.
 * 13) (X#)X = primorial(X)X = 2X·3X·5X·7X·11X·…·(last-prime-before-X)X
 * 14) X![X![X,…,X], X![X,…,X], …, X![X,…,X]], where “…” means “X times”.
 * 15) { R1,2455(X), R1,2455(X), … (R1,2455(X) times) …, R1,2455(X) }
 * 16) { R2456(X), R2456(X), … (R2456(X) times) …, R2456(X) }
 * 17) X![ {X![X,…,X], …, X![X,…,X] }, …, {X![X,…,X], …, X![X,…,X] } ], where “…” means “X times”.
 * 18) { R2457!X!(X!), R2457!X!(X!), … (R2457!X!(X!) times) …, R2457!X!(X!) }
 * 19) { X![ {X![X,…,X], …, X![X,…,X] }, …, {X![X,…,X], …, X![X,…,X] } ], …, X![ {X![X,…,X], …, X![X,…,X] }, …, {X![X,…,X], …, X![X,…,X] } ] }, where “…” means “X times”.
 * 20) X! [{ X![ {X![X,…,X], …, X![X,…,X] }, …, {X![X,…,X], …, X![X,…,X] } ], …, X![ {X![X,…,X], …, X![X,…,X] }, …, {X![X,…,X], …, X![X,…,X] } ] }, …, { X![ {X![X,…,X], …, X![X,…,X] }, …, {X![X,…,X], …, X![X,…,X] } ], …, X![ {X![X,…,X], …, X![X,…,X] }, …, {X![X,…,X], …, X![X,…,X] } ] } ], where “…” means “X times”.
 * 21) { { R2459(X), R2459(X), … (R2459(X) times) …, R2459(X) }, { R2459(X), R2459(X), … (R2459(X) times) …, R2459(X) }, … ({ R2459(X), R2459(X), … (R2459(X) times) …, R2459(X) } times) …, { R2459(X), R2459(X), … (R2459(X) times) …, R2459(X) } }
 * 22) R2462↑R2462(X ↑X X)[R2462(X↑XX)](X↑XX)
 * 23) AAAAAAXXAXAXXAAXAXXAAXXAXAXXAAAXAXXAAXXAXAXXAAAXXAXAXXAAXAXXAAXXAXAXXAAAAXAXXAAXXAXAXXAAAXXAXAXXAAXAXXAAXXAXAXXAAAAXXAXAXXAAXAXXAAXXAXAXXAAAXAXXAAXXAXAXXAAAXXAXAXXAAXAXXAAXXAXAXXAAAAAXAXXAAXXAXAXXAAAXXAXAXXAAXAXXAAXXAXAXXAAAAXXAXAXXAAXAXXAAXXAXAXXAAAXAXXAAXXAXAXXAAAXXAXAXXAAXAXXAAXXAXAXXAAAAAXXAXAXXAAXAXXAAXXAXAXXAAAXAXXAAXXAXAXXAAAXXAXAXXAAXAXXAAXXAXAXXAAAAXAXXAAXXAXAXXAAAXXAXAXXAAXAXXAAXXAXAXXAAAAXXAXAXXAAXAXXAAXXAXAXXAAAXAXXAAXXAXAXXAAAXXAXAXXAAXAXXAAXXAXAXX, where Anm = Ackermann(n, m).
 * 24) R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!R!X, where Rn = R1,2464(n) and ! is functional factorial.
 * 25) Repeat steps 246 to 2460 C12 times.
 * 26) Repeat steps 77 to 777 7777 times.
 * 27) HOWMUCHWOODCOULDAWOODCHUCKCHUCKIFAWOODCHUCKCOULDCHUCKWOODASMUCHWOODASAWOODCHUCKCOULDCHUCKIFAWOODCHUCKCOULDCHUCKWOODX (see step 2277).
 * 28) X!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#!X$#X!$X#, where “!” is integer factorial, “#” is integer primorial, “$” is integer superfactorial, and exponents are functional powers.
 * 29) X#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!#!$!, where “!” is functional factorial and “#” and “$” are integer primorial and superfactorial.
 * 30) X!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!!X$!#X!!$X#!, where big “!” is integer factorial, superscript “!” after “X” is also integer factorial, superscript “!” after “!”, “#” or “$” is functional factorial, and exponents are functional powers.
 * 31) X![X$,X$,…,X$] with X# X$’s.
 * 32) X![X#,X#,…,X#] with X$ X#’s.
 * 33) X![X!,X#,X$,X!,X#,X$,…,X!,X#,X$] with X!#$ X!’s, X#’s and X$’s.
 * 34) X !#$ !$# #!$ #$! $!# $#! (six permutations of “!”, “#” and “$”), where all the symbols are integer functions.
 * 35) X !#$ !$# #!$ #$! $!# $#! !#$ !$# #!$ #$! $#! $!# … $#! $!# #$! #!$ !$# !#$ (720 permutations of “!#$”, “!$#”, “#!$”, “#$!”, “$!#” and “$#!”), where all the symbols are integer functions.
 * 36) (((((500DX)!500)#500)$500)↑500500)·500500·500DX·500 + 500!!! + DX, where D = 500.
 * 37) GGGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGXGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGGXXXGXXXXGXXGXXXXGXXXGXXXXGXGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGXGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGGXXGXXXXGXXXGXXXXGXGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGXGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGGXXXGXXXXGXXGXXXXGXXXGXXXXGXGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGXGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGGXGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGXGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGGXXXGXXXXGXXGXXXXGXXXGXXXXGXGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGXGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGGXXGXXXXGXXXGXXXXGXGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGXGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGGXXXGXXXXGXXGXXXXGXXXGXXXXGXGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXXGXGXXXXGXXXGXXXXGXXGXXXXGXXXGXXXX, where Gmnpq = Graham(m, n, p, q) (see step 2392).
 * 38) Graham(X→X→X→X, X→X→X→X, X→X→X→X, X→X→X→X)
 * 39) Graham(X, X, X, X) → Graham(X, X, X, X) → Graham(X, X, X, X) → Graham(X, X, X, X)
 * 40) Graham({X,X,X,X}, {X,X,X,X}, {X,X,X,X}, {X,X,X,X})
 * 41) {Graham(X, X, X, X), Graham(X, X, X, X), Graham(X, X, X, X), Graham(X, X, X, X)}
 * 42) {X!} → {X!!, X!!} →2 {X!!!, X!!!, X!!!} →3 {X!!!!, X!!!!, X!!!!, X!!!!} →4 … →X {X!X, X!X, … (X times) …, X!X}
 * G(3, 4, 5, G(6, 7, 8, G(9, 10, 11, G( … G(X-6, X-5, X-4, G(X-3, X-2, X-1, X)) … ))))
 * 1) { (X+1),  (X$+X$) → (X$+X$),  (X$$·X$$) →2undefined(X$$·X$$) →2 (X$$·X$$),  (X$$$X$$) →3undefined(X$$$X$$) →3 (X$$$X$$) →3 (X$$$X$$),  (X$$X$$$$) →4 (X$$X$$$$) →4 (X$$X$$$$) →4 (X$$X$$$$) →4 (X$$X$$$$),  …,  (X$k k-ated to X$k) →k (X$k k-ated to X$k) →k … (k →k’s) … →k (X$k k-ated to X$k),  …,  (X$X X-ated to X$X) →X (X$X X-ated to X$X) →X … (X →X’s) … →X (X$X X-ated to X$X) }
 * 2) X →X→X X
 * 3) X  →X→X  X  →X→X  X  →X→X  …  (X→X  →X→X’s)  …  →X→X  X
 * 4) Let Dn be the decreasing sequence of numbers from n to 1. E.g.: D4 = 4, 3, 2, 1. Let D1n be the “decreasing sequence with one level of recursion”, i.e., from Dn to D1. E.g.: D14 = D4, D3, D2, D1 = 4,3,2,1, 3,2,1, 2,1, 1. Let Dk+1n = Dkn, Dkn-1, …, Dk1. E.g.: D24 = 4,3,2,1,3,2,1,2,1,1, 3,2,1,2,1,1, 2,1,1, 1; D34 = 4,3,2,1,3,2,1,2,1,1,3,2,1,2,1,1,2,1,1,1, 3,2,1,2,1,1,2,1,1,1, 2,1,1,1, 1; etc. Now, apply this to BEAF: {D4} = {{4}, {3}, {2}, {1}} = {4, 3, 2, 1}; {D1n} = {{D4}, {D3}, {D2}, {D1}} = {{4,3,2,1}, {3,2,1}, {2,1}, {1}} ; {D2n} = {{ D14}, {D13}, {D12}, {D11 }} ; etc. Then, this step is {DXX}.
 * 5) Let n!0 = n!; n!1 = n!·(n-1)!·…·3!·2!·1!; and, in general, n!k+1 = n!k·(n-1)!k·…·3!k·2!k·1!k. Then, this step is X!X.
 * 6) X!XX = (the exponent is functional power applied to “!X”).
 * 7) X!X↑X[X]
 * 8) ΞX(X), where Ξk(n) are “oracle” Ξ functions.
 * 9) ΞX(ΞX-1(…(Ξ3(Ξ2(Ξ(X))))…))
 * 10) ΞXX(ΞX-1X-1(…(Ξ33(Ξ22(Ξ(X))))…))
 * 11) ΞXX(BBXX(ΞX-1X-1(BBX-1X-1(…(Ξ33(BB33(Ξ22(BB22(Ξ(BB(X)))))))…))))
 * 12) ΞBB(X)BB(X)(BBΞ(X)Ξ(X)(ΞBB(X‑1)BB(X‑1)(BBΞ(X‑1)Ξ(X‑1)(…(ΞBB(3)BB(3)(BBΞ(3)Ξ(3)(ΞBB(2)BB(2)(BBΞ(2)Ξ(2)(ΞBB(1)BB(1)(BBΞ(1)Ξ(1)(X)))))))…))))
 * 13) ΞBB_X(X)BB_X(X)(BBΞ_X(X)Ξ_X(X)(ΞBB_X(X)BB_X(X)(BBΞ_X(X)Ξ_X(X)(…(X)…))), with X times “ΞBB_X(X)BB_X(X)(BBΞ_X(X)Ξ_X(X)(”s and “)”s.
 * 14) BB_BB_BB_..._BB(X) with X BB’s, where “_” means subscript.
 * 15) Ξ_Ξ_Ξ_..._Ξ(X) with X Ξ’s, where “_” means subscript.
 * 16) MMDMMDMMDMMDMMDMMDMMDMMDMMDMMDX (see step 2277).
 * 17) {4161, X2501, 6141, 25, 25, 25, 25, 25, 25, 25, 25, 25, 2501, X}
 * 18) OSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSOSOOSOSOOSOOSOSOOSOOSX, where On = FOOT(n), Sn = FOST(n), and O’s and S’s follow a Fibonacci pattern.
 * 19) Arx(C1,C2,C3,C4,C5,C6,C7,C8,C9,C10,C11,C12,C13,C14,C15,C16,C17,X)
 * 20) Arx({C1,C2,C3,C4,C5,C6},{C7,C8,C9,C10,C11,C12},{C13,C14,C15,C16,C17,X})
 * 21) X ↑ {X+3, Rayo(X), SCG(X), TREE(X), BB(X),
 * 1) X·ceil( |(1+1/X)X – e|-1)
 * 2) f ψ(ψ(ψ(Ω^Ω^Ω))^Ω+Ω) + ψ(ε_ε_ε_ε_(Ω^Ω+X))

The final value of X is the Crouton. The Croutonillion is equal to $$10^{3X+3}$$.