tl;dr.: Is there any number for which $2^{i}\mod 3 = 0$ where $i \in \mathbb{N}$
Some friends and I made a bet recently. Basically, if you are 3 persons who are to share a pizza, and you start out by cutting it into 4 even sized pieces, can you ever keep doubling the number of slices so that everyone will be able to pick up the same amount of pieces and get the same amount of pizza?
We did some mathematics on this ourselves, but seeing as we're all IT-engineers, our math skills are quite rusty :) We did come up with a small application to check it out, and it seems that there is no solution for $i < 1000$ or so. However, we're not quite satisfied with this solution. Can anyone provide a proof that it will never happen (or the opposite)? :)
English is not my first language, so I might not have been able the formulate the question clear enough. If more information is needed, please ask :)