Do you like math? Try solving this, no three positive integers a, b, and c can satisfy the equation a^n + b^n = c^n for any integer value of n greater than two. Can you find numbers that satisfy this? Good luck
Wouldn't this be unsolvable? If you hadn't discounted n=2, you could have used any of the Pythagorean triples.... Are there even numbers that prove this?
No :s (how did you figure it out?!?!), but seriously no it was just a theorem that someone mentioned to me with this same challenge.
I shall take this challenge, only because I like math. I'm sure if I asked my math teacher he would give me an answer right away. >.> He is the Dual enrollment teacher. Teaching college classes in high school and sheet
Well I just don't have the time, really. I would really like to find out the answer but it seems like it will take a while. Earlier I was thinking that I found it because I was being all stupid and thinking that a^n+b^n=c^n is the same as saying (a+b)^n=c^n but nope, that isn't one of the laws of exponents
