Small Mersenne Prime Factors (page 2927/5205)

Small Mersenne Prime Factors
Prime numbers of the form M_p= 2^p − 1 are called Mersenne primes. For M_p to be prime, p must also be prime.
Any factor q of a Mersenne number 2^p − 1 must be of the form 2kp + 1, where integer k ≥ 0. Furthermore, q must be 1 or 7 mod 8.

Exponent	Prime Factor	Digits	Year
242923403	485846807	9	~1996
242924639	485849279	9	~1996
242929123	2429291231	10	~1998
242935487	1943483897	10	~1998
242939531	485879063	9	~1996
242940011	485880023	9	~1996
242944199	485888399	9	~1996
242944343	485888687	9	~1996
242957483	485914967	9	~1996
242958323	485916647	9	~1996
242967521	1457805127	10	~1998
242972003	485944007	9	~1996
242972111	485944223	9	~1996
242982191	485964383	9	~1996
242987819	485975639	9	~1996
242992313	1457953879	10	~1998
242995211	485990423	9	~1996
242998673	3401981423	10	~1999
243000731	486001463	9	~1996
243001211	486002423	9	~1996
243002603	486005207	9	~1996
243005783	486011567	9	~1996
243011063	486022127	9	~1996
243015743	486031487	9	~1996
243019499	486038999	9	~1996

Exponent	Prime Factor	Digits	Year
243027557	1944220457	10	~1998
243037199	486074399	9	~1996
243042277	1458253663	10	~1998
243049091	486098183	9	~1996
243049199	1944393593	10	~1998
243051323	486102647	9	~1996
243057359	486114719	9	~1996
243058499	486116999	9	~1996
243059279	486118559	9	~1996
243061811	486123623	9	~1996
243069863	486139727	9	~1996
243077123	486154247	9	~1996
243080819	486161639	9	~1996
243083783	486167567	9	~1996
243093373	5834240953	10	~1999
243099011	486198023	9	~1996
243101291	486202583	9	~1996
243109439	486218879	9	~1996
243113891	486227783	9	~1996
243117341	1458704047	10	~1998
243117551	486235103	9	~1996
243123299	486246599	9	~1996
243124643	486249287	9	~1996
243126461	1458758767	10	~1998
243126743	486253487	9	~1996

Exponent	Prime Factor	Digits	Year
243136343	486272687	9	~1996
243137801	1458826807	10	~1998
243142507	3890280113	10	~1999
243150119	486300239	9	~1996
243152603	486305207	9	~1996
243163139	486326279	9	~1996
243167159	486334319	9	~1996
243173291	4377119239	10	~1999
243174143	486348287	9	~1996
243180401	1945443209	10	~1998
243185521	1459113127	10	~1998
243187331	486374663	9	~1996
243193343	486386687	9	~1996
243204119	486408239	9	~1996
243208139	486416279	9	~1996
243215579	486431159	9	~1996
243216971	486433943	9	~1996
243227903	486455807	9	~1996
243228311	486456623	9	~1996
243230423	486460847	9	~1996
243239471	7783663073	10	~1999
243242609	1945940873	10	~1998
243246623	486493247	9	~1996
243246779	486493559	9	~1996
243255959	486511919	9	~1996

Exponent	Prime Factor	Digits	Year
243257951	486515903	9	~1996
243265679	486531359	9	~1996
243266603	486533207	9	~1996
243273959	1946191673	10	~1998
243274457	1459646743	10	~1998
243287279	486574559	9	~1996
243299897	772720472873	12	~2004
243303773	3406252823	10	~1999
243311413	1459868479	10	~1998
243311483	486622967	9	~1996
243311899	2433118991	10	~1998
243327439	5839858537	10	~1999
243330623	486661247	9	~1996
243330803	486661607	9	~1996
243336077	1460016463	10	~1998
243336673	1460020039	10	~1998
243341699	486683399	9	~1996
243341981	7300259431	10	~1999
243344351	486688703	9	~1996
243348359	486696719	9	~1996
243361379	486722759	9	~1996
243363301	1460179807	10	~1998
243364871	486729743	9	~1996
243367963	2433679631	10	~1998
243368137	1460208823	10	~1998

4.903.097 digits

25-07-08