Fermat's Last Theorem: This problem was first posed in the 17th century and was not solved until 1995. It states that there are no positive integers a, b, and c such that a^n + b^n = c^n where n is greater than 2.
That's correct! Fermat's Last Theorem was indeed first posed in the 17th century and remained unsolved for a long time. It was finally proven in 1995 by mathematician Andrew Wiles. The theorem states that there are no positive integer solutions for the equation a^n + b^n = c^n when n is greater than 2. It was a significant achievement in the field of mathematics!
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That's correct! Fermat's Last Theorem was indeed first posed in the 17th century and remained unsolved for a long time. It was finally proven in 1995 by mathematician Andrew Wiles. The theorem states that there are no positive integer solutions for the equation a^n + b^n = c^n when n is greater than 2. It was a significant achievement in the field of mathematics!
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