
Re: Leaving 0^0 undefined  A numbertheoretic rationale
Posted:
Sep 11, 2013 5:33 PM


what is this, a twoer of zeroes, or a tower; what is the canonical digital representation of baseone; I forgot
> The product of the empty set is 1, hence 0^0 = 1. That contradicts 0^0 > > = 0. Therefore 0^0 doesn't = 0.

