Small Mersenne Prime Factors (page 2881/5040)

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
258534253	1551205519	10	~1998
258548357	32577092983	11	~2001
258553199	517106399	9	~1997
258568151	517136303	9	~1997
258569159	517138319	9	~1997
258579311	517158623	9	~1997
258584057	1551504343	10	~1998
258589129	6206139097	10	~1999
258589403	517178807	9	~1997
258594277	1551565663	10	~1998
258599017	1551594103	10	~1998
258602219	517204439	9	~1997
258612131	2068897049	10	~1998
258623759	517247519	9	~1997
258631151	517262303	9	~1997
258636809	3620915327	10	~1999
258657067	2586570671	10	~1998
258659183	517318367	9	~1997
258668759	517337519	9	~1997
258671183	517342367	9	~1997
258673631	517347263	9	~1997
258676931	2069415449	10	~1998
258688679	517377359	9	~1997
258690863	517381727	9	~1997
258690917	2069527337	10	~1998

Exponent	Prime Factor	Digits	Year
258691493	3621680903	10	~1999
258706061	2069648489	10	~1998
258707159	517414319	9	~1997
258707639	517415279	9	~1997
258713963	517427927	9	~1997
258717973	1552307839	10	~1998
258719603	517439207	9	~1997
258723811	2587238111	10	~1998
258726491	517452983	9	~1997
258728441	1552370647	10	~1998
258729083	517458167	9	~1997
258734699	517469399	9	~1997
258739823	517479647	9	~1997
258750491	517500983	9	~1997
258750539	517501079	9	~1997
258751991	517503983	9	~1997
258757643	517515287	9	~1997
258764003	517528007	9	~1997
258773231	2070185849	10	~1998
258785537	1552713223	10	~1998
258785843	517571687	9	~1997
258787871	517575743	9	~1997
258791471	517582943	9	~1997
258799259	517598519	9	~1997
258801239	517602479	9	~1997

Exponent	Prime Factor	Digits	Year
258813959	517627919	9	~1997
258818587	4658734567	10	~1999
258820931	517641863	9	~1997
258822383	517644767	9	~1997
258823787	2070590297	10	~1998
258823813	1552942879	10	~1998
258831659	517663319	9	~1997
258858709	16566957377	11	~2000
258863291	2070906329	10	~1998
258863401	1553180407	10	~1998
258866921	2070935369	10	~1998
258868523	517737047	9	~1997
258872963	517745927	9	~1997
258876613	1553259679	10	~1998
258878051	517756103	9	~1997
258879979	2588799791	10	~1998
258891313	1553347879	10	~1998
258896567	4660138207	10	~1999
258901943	517803887	9	~1997
258918743	517837487	9	~1997
258931451	517862903	9	~1997
258932537	1553595223	10	~1998
258935711	517871423	9	~1997
258936719	517873439	9	~1997
258960731	517921463	9	~1997

Exponent	Prime Factor	Digits	Year
258962051	517924103	9	~1997
258962771	517925543	9	~1997
258965039	517930079	9	~1997
258966863	517933727	9	~1997
258970757	2071766057	10	~1998
258976103	517952207	9	~1997
258979093	1553874559	10	~1998
258982523	517965047	9	~1997
258998713	4143979409	10	~1999
259005179	8288165729	10	~2000
259023211	2590232111	10	~1998
259027337	2072218697	10	~1998
259030091	518060183	9	~1997
259038203	518076407	9	~1997
259039321	1554235927	10	~1998
259040063	518080127	9	~1997
259049699	518099399	9	~1997
259065311	518130623	9	~1997
259069691	518139383	9	~1997
259069931	518139863	9	~1997
259072403	518144807	9	~1997
259078871	518157743	9	~1997
259082459	518164919	9	~1997
259098299	518196599	9	~1997
259098509	2072788073	10	~1998

4.739.325 digits

25-04-20