User blog:Primussupremus/My next attempt at an array notation.

After looking over my notation for a while I started to see that it wasn't going anywhere so I decided to rethink my ideas and start anew.

{A+B}={A,1,B} The 1 stands for addition. {A*B}={A,2,B} The 2 stands for multiplication. {A^B}={A,3,B} The 3 stands for exponentiation. To give some examples of this {3,3,3}=3^3=27 and {2,2,5}=2*5=10. {A^^B}={A,4,B} : : {A,400,B} Or A and B seperated by 398 up arrows. The rule of this part of the notation is very simple it is mearly just: A and B seperated by n-2 up arrows when n is a Hyperoperator. {A,^(n-2),B} Now that we have this rule down we can start to think about expressing some numbers in this fashion. {4,5,6}=4^^^6 {10,10,10}=10^(8)10. {1000,1000,1000}=1000^(998)1000. As you can see this rule of having A and B with n-2 up arrows can take us to the realm beyond everyday or commonly used large numbers. I would like some feedback on what people think about this idea.