User blog:Gyrorealm/Rc function

Rc stands for rubik’s cube

Rc(X)is equal to:

Number of combinations on a rubik's X’th dimension with X side length is equal to a

Number of combinations on a rubik’s a’th dimension with a side length is equal to b

…

Number of combinations on a rubik’s z’th dimension with z side length is equal to aa

Number of combinations on a rubik’s aa’th dimension with aa side length is equal to ab

…

Number of combinations on a rubik’s az’th dimension with az side length is equal to ba

Number of combinations on a rubik’s ba’th dimension with ba side length is equal to bb

…

Number of combinations on a rubik’s zz’th dimension with zz side length is equal to A

Number of combinations on a rubik’s A’th dimention with A side length is equal to Aa

…

Number of combinations on a rubik’s Azz’th dimension with Azz side length is equal to B

Number of combinations on a rubik’s B’th dimension with B side length is equal to Ba

...

Number of combinations on a rubik’s Rbz’th dimension with Rbz side length is equal to Rc

Number of combinations on a rubik’s Rc’th dimension with Rc side length is equal to Rc(X)

Keep in mind:

1 dimension has 0 faces

2 dimension has 1 face

3 dimension has 6 faces

4 dimension has 24 faces

5 dimension has 80 faces

1 dimension with 1 side length has 1 combinations = ((1^0)*0)!

2th dimension with 2 side length has 24 combinations = ((2^1)*2)!

3rd dimension with 3 side length has 2.30843697339241380472E+71 combinations = ((3^2) * 6)!

4th dimension with 4 side length has 1.632646677641749692966e+4229 combinations = ((4^3) * 24)!

5th dimension with 5 side length has 3.347320509597144836852E+213236 combinations = ((5^4) * 80)!

Rc(-2) = 0

Rc(-1) = 1

Rc(0) = 1

Rc(1) = 1

Rc(2) = really big

Rc(X>1) = really really big