Yes, the famous Fermat's Last Theorem, a conjecture by Fermat, that an equation of the form an + bn = cn has no integer solution, for n > 2. This was conjectured by Fermat in 1637, but it was only… Full Answer
He was a mathematician who contributed to the fields of calculus and algebra. His theorem an + bn = cn called, "Fermat's Last Theorem" was a challenge for the mathematical world to prove for a long time.
But it was. That is why we know about it. If you mean why the PROOF was not written- Fermat wrote that he had found a wonderful proof for the theorem, but unfortunately the margin was too small to contain… Full Answer
Fermat's last theorem says there does not exist three positive integers a, b, and c which can satisfy the equation an + bn = cn for any integer value of n greater than 2. (2 with be pythagoran triples so… Full Answer
It's important as a theorem that's very simple to explain; most school children know Pythagoras's theorem about right angle triangles (a2 + b2 = c2), Fermat proposed that there were no whole number solutions for an + bn = cn… Full Answer
He never discovered that theorem, especially since it was his own. Nobody discovers their own theorems, they derive them. Anyways, he was either 35 or 36, no one knows for sure since only the year is known.
Fermat's Last Theorem, which took 358 years to prove, was that "no three positive integers a, b, and c can satisfy the equation an + bn = cn for any integer value of n greater than two." The theorem was… Full Answer
A Fermat Prime refers to a proof that the mathematician Fermat discovered. It refers to a integer that is subject to an equation and the predictable result. Below is a webpage that explains it with examples.
Pierre de Fermat has written: 'Osservazioni su Diofanto' 'Bemerkungen zu Diophant' 'Varia opera mathematica Petri de Fermat' -- subject(s): Geometry, Early works to 1800, Number theory 'Oeuvres de Pierre Fermat' -- subject(s): Mathematics
The equation a^n+b^n=c^n, n>2 , where n is a positive integer , has no non trivial integer solution (a,b,c). First by Andrew Wiles-Very difficult proof Now simple proofs are available;A simple and short analytical proof of Fermat's last theorem, CNMSEM,Vol.2,No.3… Full Answer
Pierre de Fermat's contributed to number theory, analytic geometry, probability, and calculus. He also made contributions in the field of optics. Fermat's Last Theorem, which went unsolved for centuries, is attributed with prompting the interest in mathematics of some more… Full Answer
Pythagoras' theorem proves that if you draw a square on the longest side (the hypotenuse) of a right-angled triangle, its area is the same as the areas of the squares drawn on the two shorter sides, added together. See 'Pythagoras'… Full Answer
There are a great number of different proofs of the Pythagorean Theorem. Unfortunately, many of them require diagrams which are hard to reproduce here. Check out the link to Wikipedia's page on the theorem for several different proofs.
You may be referencing Fermat's Last Theorum. In number theory, Fermat's Last Theorem 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… Full Answer
The practical value of Fermat's Last Theorem resides in the manner it attracts the attention of many thinking people, not just mathematicians. The practical value of Wile's proof is in the manner it demonstrates how mathematicians still cannot simply explain… Full Answer