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The proof of Fermat's last theorem was met with disbelief and awe from "summary" of Fermat's last theorem by Simon Singh

When the proof of Fermat's last theorem was finally revealed to the world, it was met with a combination of disbelief and awe. For over 350 years, mathematicians had grappled with the enigmatic puzzle left behind by Pierre de Fermat, a seemingly simple statement that had eluded the brightest minds in the field. The theorem, which asserted that there are no whole number solutions to the equation x^n + y^n = z^n when n is greater than 2, had become a symbol of mathematical mystery and frustration. As Andrew Wiles stood before his peers and presented his proof, the mathematical community held its breath. Wiles had spent seven years working in secrecy, pouring over complex equations and intricate proofs in pursuit of a solution to Fermat's riddle. When he finally unveiled his work, it was a moment of reckoning for the field of mathematics. The proof was not only elegant and profound, but it also represented a triumph of human intellect and perseverance. The reaction to Wiles' proof was immediate and intense. Mathematicians around the world scrutinized his work, searching for errors or oversights that could unravel the delicate fabric of his argument. But as days turned into weeks and weeks turned into months, it became clear that Wiles had achieved the impossible. Fermat's last theorem had finally been laid to rest, its secrets unlocked by the sheer force of human ingenuity. The significance of Wiles' proof cannot be overstated. It not only solved one of the most enduring mysteries in mathematics, but it also opened up new avenues of exploration and discovery for future generations of mathematicians. The proof stands as a testament to the power of human curiosity and the boundless potential of the human mind. And as the world grappled with the implications of Wiles' work, it became clear that the legacy of Fermat's last theorem would endure for centuries to come.
    oter

    Fermat's last theorem

    Simon Singh

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