Titlebook: 17 Lectures on Fermat Numbers; From Number Theory t Michal K?í?ek,Florian Luca,Lawrence Somer Book 2001 Springer-Verlag New York 2001 Ferma

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,Fermat’s Little Theorem, Pseudoprimes, and Superpseudoprimes,978-1-4614-7397-8

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Euclidean Construction of the Regular Heptadecagon,978-3-642-60521-5

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Book 2001acting the attention of amateur and professional mathematicians for over 350 years. This book was written in honor of the 400th anniversary of his birth and is based on a series of lectures given by the authors. The purpose of this book is to provide readers with an overview of the many properties o

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Matthew Suarez,Frederic Parke,Filipe Castro [Williams, 1988]. In 1878, F. Proth stated the following theorem (see [Proth, 1878b, 1978c] and see [Robinson, 1957b], [Sierpiński, 1964a] for proofs of this theorem), which can be applied to verify easily the primality of divisors of Fermat numbers for . < 2. (see [Robinson, 1957a] and [Robinson, 1958]; also compare with Suyama’s Theorem 4.22).

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The Minerals, Metals & Materials Series7 equal parts by geometric means (see Figure 17.3 and (17.3)). Here he essentially used the fact that 17 is a Fermat prime. This fundamental discovery is presented on the base of his statue in Brunswick (in German .), where he was born (see Figure 17.4).

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