User blog:Primussupremus/Tanjin number

In this Blog post I am going to define a salad number That may or may not prove to be interesting.
 * 1) Start with a relatively small number say 1 billion.
 * 2) Apply the up arrow notation on 1 billion,1billion times too make (10^9)↑(10^9)10^9) or 1 billion followed by 1 billion up arrows 1 billion.
 * 3) Call this number N and input it into the Ackermann function so A(N,N).
 * 4) Produce out another number and call this N.
 * 5) Input this into the Busy beaver function BB(N)=N.
 * 6) Call this number N and repeat steps 1-5 again using this new number as a starting point.
 * 7) Input this new number N into the Psi function to produce another number N.
 * 8) Input this number into the fw+w (n) function to produce an even bigger number called N.
 * 9) Input this new number N into the Busy Beaver function and produce out of it an even bigger number BB(N)=N.
 * 10) Input the number defined in step 9 into the Busy Beaver function BB(N)=N.
 * 11) Input this new number into the Foot function like so Foot(N)=N.
 * 12) Repeat steps 1-11 using the number defined in step 11 as a starting point.
 * 13) Input the number you get from doing step 12 into Rayos function to get Rayo(N)-N.
 * 14) Input N into the Xi function and produce out another number call N.
 * 15) Input this into Friedmans tree function to make Tree(N)=N.
 * 16) Continue to input the N into the tree Function ,Tree(666) number of times.
 * 17) Input this number into the Subcubic graph number function SCG(N)=N.
 * 18) Now input N into the Fepsilon nought function or Fepsilon nought(N)=N
 * 19) Repeat steps 1-18 Tree(3) times to using the number defined in step 18.
 * 20) Input this number into the Busy Beaver function BB(N)=N.
 * 21) Input this number into the Ackermann function
 * 22) Repeat steps 1-21 Big Foot number of times using the number defined in step 21.
 * 23) Input this number into the Busy Beaver function to produce a certain number N.
 * 24) After that Repeat Steps 1-23 BB(G64) number of times using the number defined in step 23.
 * 25) Repeat steos 1-24 BB(Loaders number) number of times using the output produced from step 24.
 * 26) Repeat this process a grahams number of times.
 * 27) Input the number you produced from step 26 into Rayos function. Rayo(N)=N.
 * 28) Now you are finished.