FANDOM


The cory function is designed as such:

C[a1,a2,a3...an] = C[a1^C[a1,a2,a3...,an-1],a2^....an-1]

C[a1,a2,a3...,an, 0] = C[a1,a2,a3...,an]

C[a] = a

The key to this function is that every element of the function grows exponentially with itself except for the last element, which always decreases.


Let's run through some steps of this:

C[1,1,1] = 1

C[2,2,2]

= C[2^C[2,2,1]^C[2,2,1],1] 

= C[2^C[2^C[2,2,1]^C[2,2,1],1],2^C[2^C[2,2,1]^C[2,2,1],1],0]

C[2^C[2^C[2,2,1]^C[2,2,1],1],2^C[2^C[2,2,1]^C[2,2,1],1]]

C[2^C[2^C[2,2,1]^C[2,2,1],1]^C[2^C[2^C[2,2,1]^C[2,2,1],1],2^C[2^C[2,2,1]^C[2,2,1]]

= BIG NUMBER

this is kinda similar to the ackermann function except better

and much less famous

and much less creative

Ad blocker interference detected!


Wikia is a free-to-use site that makes money from advertising. We have a modified experience for viewers using ad blockers

Wikia is not accessible if you’ve made further modifications. Remove the custom ad blocker rule(s) and the page will load as expected.