Small Mersenne Prime Factors (page 2888/5040)

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
262197697	1573186183	10	~1998
262198117	1573188703	10	~1998
262208413	1573250479	10	~1998
262211843	524423687	9	~1997
262212551	524425103	9	~1997
262235003	524470007	9	~1997
262239917	2097919337	10	~1998
262242131	524484263	9	~1997
262252439	524504879	9	~1997
262254803	524509607	9	~1997
262269263	524538527	9	~1997
262279343	524558687	9	~1997
262302827	2098422617	10	~1998
262303091	524606183	9	~1997
262306223	524612447	9	~1997
262316363	524632727	9	~1997
262324091	524648183	9	~1997
262327181	2098617449	10	~1998
262328063	524656127	9	~1997
262330979	524661959	9	~1997
262332131	524664263	9	~1997
262333013	1573998079	10	~1998
262337279	524674559	9	~1997
262337723	524675447	9	~1997
262341479	524682959	9	~1997

Exponent	Prime Factor	Digits	Year
262344241	5771573303	10	~1999
262351913	1574111479	10	~1998
262353359	524706719	9	~1997
262359821	2098878569	10	~1998
262366631	524733263	9	~1997
262369979	524739959	9	~1997
262372457	6296938969	10	~1999
262378169	2099025353	10	~1998
262380383	524760767	9	~1997
262387451	524774903	9	~1997
262401119	2099208953	10	~1998
262405439	524810879	9	~1997
262411139	524822279	9	~1997
262415903	524831807	9	~1997
262417279	2624172791	10	~1998
262429031	524858063	9	~1997
262431551	524863103	9	~1997
262453319	524906639	9	~1997
262453951	4724171119	10	~1999
262454123	524908247	9	~1997
262458923	524917847	9	~1997
262469531	4724451559	10	~1999
262473479	524946959	9	~1997
262478591	524957183	9	~1997
262487581	1574925487	10	~1998

Exponent	Prime Factor	Digits	Year
262494061	1574964367	10	~1998
262510739	525021479	9	~1997
262513943	525027887	9	~1997
262524551	525049103	9	~1997
262526723	525053447	9	~1997
262528319	525056639	9	~1997
262531273	1575187639	10	~1998
262535303	8401129697	10	~2000
262540079	525080159	9	~1997
262541063	6300985513	10	~1999
262543559	2100348473	10	~1998
262544543	525089087	9	~1997
262545973	1575275839	10	~1998
262548691	2625486911	10	~1998
262556951	525113903	9	~1997
262559711	2100477689	10	~1998
262566617	3675932639	10	~1999
262568303	525136607	9	~1997
262573271	525146543	9	~1997
262581127	6301947049	10	~1999
262583627	29934533479	11	~2001
262584011	525168023	9	~1997
262594147	48317323049	11	~2002
262602443	525204887	9	~1997
262606523	525213047	9	~1997

Exponent	Prime Factor	Digits	Year
262616723	525233447	9	~1997
262626491	525252983	9	~1997
262628969	2101031753	10	~1998
262633463	525266927	9	~1997
262634579	525269159	9	~1997
262635563	525271127	9	~1997
262639931	525279863	9	~1997
262640831	525281663	9	~1997
262654163	525308327	9	~1997
262654333	1575925999	10	~1998
262655579	525311159	9	~1997
262657537	1575945223	10	~1998
262659623	525319247	9	~1997
262659671	525319343	9	~1997
262673219	525346439	9	~1997
262678523	525357047	9	~1997
262685711	525371423	9	~1997
262686493	1576118959	10	~1998
262695743	525391487	9	~1997
262698599	525397199	9	~1997
262705463	525410927	9	~1997
262707611	525415223	9	~1997
262721533	4203544529	10	~1999
262722973	1576337839	10	~1998
262744043	525488087	9	~1997

4.739.325 digits

25-04-20