Beal's Conjecture: #A^x +B^y = C^z#. Where #A#, #B#, #C#, #x#, #y#, #z# are positive integers and #x#, #y#, #z# are all greater than #2#, then #A#, #B#, #C#, must have a common prime factor. Can someone solve this or come up with a counter example?

1 Answer
Mar 15, 2018

If they can, then there's a prize.

Explanation:

There is a $1 million prize for an solution to this question, which is a similar level of difficulty to "Fermat's Last Theorem".

This conjecture was posed in 1997 by Andrew Beal, with the prize offered for a correct proof or counterexample.