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. (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</sup(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</sup(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)X!X!·(X-1)!(X-1)!·(X-2)!(X-2)!·…·3!3!·2!2!·1!1! <!— 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 $$C_1$$.
 * 1) $$\text{BB}_X(C_1)$$, 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) $$C(X)$$, where $$C$$ 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
 * IS
 * A
 * 1) BIG
 * 2) GAP!!
 * 3) X^(C1^C2^C3)
 * 4) X^(C1^C2^C4)
 * 5) X^(C1^C2^C5)
 * 6) X^(C1^C2^C6)
 * 7) X^(C1^C2^C7)
 * 8) X^(C1^C2^C3^C4)
 * 9) X^(C1^C2^C3^C5)
 * 10) X^(C1^C2^C3^C6)
 * 11) X^(C1^C2^C3^C7)
 * 12) X^(C1^C2^C3^C4^C5)
 * 13) X^(C1^C2^C3^C4^C6)
 * 14) X^(C1^C2^C3^C4^C7)
 * 15) X^(C1^C2^C3^C4^C5^C6)
 * 16) X^(C1^C2^C3^C4^C5^C7)
 * 17) 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) ZEEBX (see step 2277).
 * 2) (((20 →X 30) →X 30) →X 90) →X 2339
 * 3) C2^^(C3^^^(C4^^^^(C10^^^^^^^^^^X)))
 * 4) 123412431324134214231432213421432314234124132431312431423214324134123421412341324213423143124321!X
 * 5) (X&X&X&…(X times)…&X) & (X&X&X&…(X times)…&X) & … (X times) … & (X&X&X&…(X times)…&X)
 * 6) BBBB(X)BB(X)(X)
 * 7) 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.
 * 8) Repeat steps 1 to 2344 sorting step index number names in alphabetic order.
 * 9) 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) { {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
 * 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)

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