This is where you can find my referenced documents.
We have learned that Euclid stands out amongst old world Greek philosophers and mathematicians because of the way he PROVED his assumptions. With numbers so infinite, this concept is instinctually impossible!
Fermat's Last Theorem was, until recently, the most famous unsolved problem in mathematics. In the mid-17th century Pierre de Fermat wrote that "no value of n greater than 2 could satisfy the equation x^n + y^n = z^n, where n, x, y and z are all integers." He claimed that he had a simple proof of this theorem, but no record of it has ever been found. Ever since that time, countless professional and amateur mathematicians have tried to find a valid proof (and wondered whether Fermat really ever had one). Then in 1994, Andrew Wiles of Princeton University announced that he had discovered a proof while working on a more general problem in geometry.
Fermat's Last Theorem was, until recently, the most famous unsolved problem in mathematics. In the mid-17th century Pierre de Fermat wrote that "no value of n greater than 2 could satisfy the equation x^n + y^n = z^n, where n, x, y and z are all integers." He claimed that he had a simple proof of this theorem, but no record of it has ever been found. Ever since that time, countless professional and amateur mathematicians have tried to find a valid proof (and wondered whether Fermat really ever had one). Then in 1994, Andrew Wiles of Princeton University announced that he had discovered a proof while working on a more general problem in geometry.
Great article written by Max Tegmark and John Wheeler
