Small Mersenne Prime Factors (page 2961/5025)

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
311554079	623108159	9	~1997
311558003	623116007	9	~1997
311565731	623131463	9	~1997
311567071	5608207279	10	~2000
311578931	623157863	9	~1997
311583731	623167463	9	~1997
311594291	623188583	9	~1997
311595419	623190839	9	~1997
311602391	623204783	9	~1997
311611211	623222423	9	~1997
311613719	623227439	9	~1997
311614211	623228423	9	~1997
311617739	623235479	9	~1997
311627279	623254559	9	~1997
311629271	623258543	9	~1997
311645489	24931639121	11	~2001
311652479	623304959	9	~1997
311654351	623308703	9	~1997
311673419	623346839	9	~1997
311674091	623348183	9	~1997
311679349	44258467559	11	~2002
311683259	623366519	9	~1997
311685911	623371823	9	~1997
311688731	623377463	9	~1997
311702159	623404319	9	~1997

Exponent	Prime Factor	Digits	Year
311708381	1870250287	10	~1998
311726183	623452367	9	~1997
311732483	623464967	9	~1997
311742737	32421244649	11	~2002
311748659	623497319	9	~1997
311764381	1870586287	10	~1998
311783963	7482815113	10	~2000
311785811	623571623	9	~1997
311790757	7482978169	10	~2000
311808901	1870853407	10	~1998
311809691	623619383	9	~1997
311810971	3118109711	10	~1999
311821753	1870930519	10	~1998
311823851	2494590809	10	~1999
311828183	623656367	9	~1997
311837891	623675783	9	~1997
311838239	623676479	9	~1997
311842871	623685743	9	~1997
311844371	623688743	9	~1997
311845619	623691239	9	~1997
311846399	623692799	9	~1997
311848703	623697407	9	~1997
311852939	623705879	9	~1997
311853599	623707199	9	~1997
311858411	623716823	9	~1997

Exponent	Prime Factor	Digits	Year
311868863	623737727	9	~1997
311875919	623751839	9	~1997
311876197	1871257183	10	~1998
311877851	623755703	9	~1997
311908139	623816279	9	~1997
311911711	4990587377	10	~2000
311911871	623823743	9	~1997
311927879	623855759	9	~1997
311930123	623860247	9	~1997
311938871	623877743	9	~1997
311939279	623878559	9	~1997
311941379	623882759	9	~1997
311942039	2495536313	10	~1999
311950643	623901287	9	~1997
311952923	623905847	9	~1997
311954837	1871729023	10	~1998
311959513	1871757079	10	~1998
311984951	623969903	9	~1997
311992319	623984639	9	~1997
311992451	623984903	9	~1997
311999819	623999639	9	~1997
312005591	2496044729	10	~1999
312011801	1872070807	10	~1998
312016739	624033479	9	~1997
312031453	1872188719	10	~1998

Exponent	Prime Factor	Digits	Year
312032351	624064703	9	~1997
312035903	624071807	9	~1997
312065459	624130919	9	~1997
312066743	624133487	9	~1997
312069713	1872418279	10	~1998
312075571	3120755711	10	~1999
312088571	624177143	9	~1997
312112043	624224087	9	~1997
312121363	3121213631	10	~1999
312127379	624254759	9	~1997
312132659	624265319	9	~1997
312143317	7491439609	10	~2000
312143999	624287999	9	~1997
312155639	624311279	9	~1997
312156311	2497250489	10	~1999
312166919	624333839	9	~1997
312170641	1873023847	10	~1998
312172103	624344207	9	~1997
312174059	23100880367	11	~2001
312176951	624353903	9	~1997
312188699	624377399	9	~1997
312197183	624394367	9	~1997
312200831	624401663	9	~1997
312205931	624411863	9	~1997
312230003	624460007	9	~1997

4.724.182 digits

25-04-13