Prove that there are no positive integers a, b, and c that can satisfy the equality a³+b³=c³. Generalize for any power greater than three. You have one whiteboard and forty five minutes.
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DonaldDump Nov 30, 2018
This looks super easy. I solved it in 1994 when i was in 5th grade. I was asked to prove that all the non trivial zeros of Riemann zeta function lie on -1/2. Aced it :). Now I have the job :). TC 75k but need to pay for food.
Prove that there are no positive integers a, b, and c that can satisfy the equality a³+b³=c³. Generalize for any power greater than three. You have one whiteboard and forty five minutes.
This looks super easy. I solved it in 1994 when i was in 5th grade. I was asked to prove that all the non trivial zeros of Riemann zeta function lie on -1/2. Aced it :). Now I have the job :). TC 75k but need to pay for food.
Nice!