2019-09-05, 10:43 | #1 |
May 2004
2^{2}·79 Posts |
Another generalisation of Euler's generalisation of Fermat's theorem
Let x be a Gaussian integer. Then
((x-1)^(k*eulerphi(norm of x)-1) is congruent to 0 (mod x). Here k belongs to N. Last fiddled with by devarajkandadai on 2019-09-05 at 10:44 |
Thread Tools | |
Similar Threads | ||||
Thread | Thread Starter | Forum | Replies | Last Post |
modified Euler's generalisation of Fermat's theorem | devarajkandadai | Number Theory Discussion Group | 1 | 2017-07-07 13:56 |
Riemann theorem/Euler product | MisterBitcoin | Number Theory Discussion Group | 4 | 2017-05-05 18:27 |
Fermat's Theorem-tip of the iceberg? | devarajkandadai | Miscellaneous Math | 2 | 2006-06-16 08:50 |
Fermat's Theorem | Crook | Math | 5 | 2005-05-05 17:18 |
Fermat,s Theorem | devarajkandadai | Miscellaneous Math | 3 | 2004-06-05 10:15 |