![17 Lectures on Fermat Numbers: From Number Theory to Geometry (CMS Books in Mathematics): Krizek, Michal, Luca, Florian, Somer, Lawrence, Solcova, A.: 9780387953328: Amazon.com: Books 17 Lectures on Fermat Numbers: From Number Theory to Geometry (CMS Books in Mathematics): Krizek, Michal, Luca, Florian, Somer, Lawrence, Solcova, A.: 9780387953328: Amazon.com: Books](https://m.media-amazon.com/images/I/6147CzDFo2L._AC_UF1000,1000_QL80_.jpg)
17 Lectures on Fermat Numbers: From Number Theory to Geometry (CMS Books in Mathematics): Krizek, Michal, Luca, Florian, Somer, Lawrence, Solcova, A.: 9780387953328: Amazon.com: Books
![17 lectures in Fermat numbers: from number theory to geometry, by Michal Krizek, Florian Luca, Lawrence Somer. Pp.257. £49. 2002. ISBN 0 387 95332 9 (Springer- Verlag). | The Mathematical Gazette | Cambridge Core 17 lectures in Fermat numbers: from number theory to geometry, by Michal Krizek, Florian Luca, Lawrence Somer. Pp.257. £49. 2002. ISBN 0 387 95332 9 (Springer- Verlag). | The Mathematical Gazette | Cambridge Core](https://static.cambridge.org/content/id/urn%3Acambridge.org%3Aid%3Aarticle%3AS0025557200173243/resource/name/firstPage-S0025557200173243a.jpg)
17 lectures in Fermat numbers: from number theory to geometry, by Michal Krizek, Florian Luca, Lawrence Somer. Pp.257. £49. 2002. ISBN 0 387 95332 9 (Springer- Verlag). | The Mathematical Gazette | Cambridge Core
![Product of first n-1 fermat numbers eqal to nth fermat number minus 2. Number Theory, Edler. lec36 - YouTube Product of first n-1 fermat numbers eqal to nth fermat number minus 2. Number Theory, Edler. lec36 - YouTube](https://i.ytimg.com/vi/_luCZw68pck/maxresdefault.jpg)
Product of first n-1 fermat numbers eqal to nth fermat number minus 2. Number Theory, Edler. lec36 - YouTube
![Tamás Görbe on X: "@fermatslibrary Reminds me of the Fermat numbers F(n). They are prime for n=0,1,2,3,4 and Fermat conjectured that they're prime for all n. Euler disproved this by showing that Tamás Görbe on X: "@fermatslibrary Reminds me of the Fermat numbers F(n). They are prime for n=0,1,2,3,4 and Fermat conjectured that they're prime for all n. Euler disproved this by showing that](https://pbs.twimg.com/media/Dgx-FrPW4AEJc-C.png)