If we observe the number of occurrences of the Empty Set Ø in the finite ordinals, it is clearly 2^(n-1) for n>1: 1 = {Ø} 2 = {{Ø}, Ø} 3 = {{{Ø}, Ø,}, {Ø}, Ø} etc. Does this hold for the infinite set $ \omega$ of all finite ordinals? It seems the number would approachRead more