Something I didn't think of.
I’m sorry. There is something I didn’t think of some days ago, while I was looking for a simple solution to Fermat’s statement. I had just proved ( you can click here to see it ) that any triangle that has sides a, b, c the length of positive integers satisfies Fermat’s statement ( aⁿ ≠ bⁿ + cⁿ for any positive integer value of n > 2 ). And I thought that was it… A mistake. I mean, my proof was solid and sound; but I hadn’t finished yet. Why? All triangles verify that each of its three sides is smaller than the sum (addition) of the other two. Let’s forget triangles from this point on. If we have three positive integers a, b, c … One of them could be equal to the sum of the other two as in a = (b + c) . One of them could be bigger than the sum of the other two as in a > (b + c) . I need to prove that those two possibilities actually satisfy Fermat’s statement in order to have a complete, simple solution. And that’s what...