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Georgepowell
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Yes or No?
And why do you think that?
And why do you think that?
jimmysnyder said:The margins of Fermat's book were not large enough to contain Wiles' proof, so it is likely that that was the proof Fermat had in mind.
Georgepowell said:Are you an idiot or are you joking?
Well?Kurdt said::rofl: Do you really have to ask?
jimmysnyder said:The margins of Fermat's book were not large enough to contain Wiles' proof, so it is likely that that was the proof Fermat had in mind.
bassplayer142 said:Wouldn't he have published it if he did find out the answer?
Fermat's Last Theorem is a mathematical conjecture proposed by French mathematician Pierre de Fermat in the 17th century. It states that no three positive integers a, b, and c can satisfy the equation an + bn = cn for any integer value of n greater than 2.
There is no conclusive evidence that Fermat had a genuine proof for his Last Theorem. In fact, he himself claimed to have a proof, but it was never found among his papers after his death. Many mathematicians have attempted to prove the theorem, but it was not until 1995 that Andrew Wiles provided a complete proof.
The complexity of Fermat's Last Theorem lies in the fact that it involves an infinite number of possible combinations of values for a, b, and c. It was considered unsolvable for so long because there was no known method or equation that could be used to solve it.
Andrew Wiles, a British mathematician, spent seven years working on a proof for Fermat's Last Theorem. He used advanced mathematical techniques, including elliptic curves and modular forms, to prove the theorem for all values of n greater than 2. His proof was published in 1995 and has been widely accepted by the mathematical community.
Fermat's Last Theorem is important because it is one of the most famous unsolved mathematical problems in history. Its proof has challenged and inspired mathematicians for centuries, and its eventual solution has provided valuable insights into number theory and mathematical techniques. It also serves as a reminder that even seemingly impossible problems can be solved with persistence and ingenuity.