Small Mersenne Prime Factors (page 4531/5130)

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	Dig.	Year
20456326463	40912652927	11	~2012
20457816479	40915632959	11	~2012
20457955631	40915911263	11	~2012
20458428143	40916856287	11	~2012
20462202863	40924405727	11	~2012
20462405921	122774435527	12	~2013
20462605979	40925211959	11	~2012
20463893789	163711150313	12	~2013
20464190003	40928380007	11	~2012
20464503079	204645030791	12	~2013
20464921723	204649217231	12	~2013
20465117831	40930235663	11	~2012
20465225203	204652252031	12	~2013
20466119339	40932238679	11	~2012
20466751499	40933502999	11	~2012
20468677319	40937354639	11	~2012
20468734463	40937468927	11	~2012
20470030859	40940061719	11	~2012
20470238471	40940476943	11	~2012
20470831091	40941662183	11	~2012
20472149363	40944298727	11	~2012
20472831623	40945663247	11	~2012
20472976943	40945953887	11	~2012
20476832339	40953664679	11	~2012
20476945337	122861672023	12	~2013

Exponent	Prime Factor	Dig.	Year
20477260873	122863565239	12	~2013
20477919431	40955838863	11	~2012
20480566877	163844535017	12	~2013
20481000077	122886000463	12	~2013
20481146087	1083...508057	15	2023
20482455131	40964910263	11	~2012
20484457159	491626971817	12	~2014
20485178303	40970356607	11	~2012
20485251401	122911508407	12	~2013
20486477237	163891817897	12	~2013
20487659903	40975319807	11	~2012
20488212683	40976425367	11	~2012
20488533371	40977066743	11	~2012
20489054101	122934324607	12	~2013
20489271577	327828345233	12	~2014
20491158839	40982317679	11	~2012
20492551633	3836...656977	14	2023
20493035153	122958210919	12	~2013
20493112103	40986224207	11	~2012
20493969959	40987939919	11	~2012
20494975103	40989950207	11	~2012
20495040971	40990081943	11	~2012
20495098751	40990197503	11	~2012
20498178017	163985424137	12	~2013
20498903699	40997807399	11	~2012

Exponent	Prime Factor	Dig.	Year
20498915471	40997830943	11	~2012
20499793943	40999587887	11	~2012
20500120379	41000240759	11	~2012
20500911611	41001823223	11	~2012
20500946911	369017044399	12	~2014
20501163671	41002327343	11	~2012
20501199401	164009595209	12	~2013
20502588971	41005177943	11	~2012
20503146101	164025168809	12	~2013
20504652719	41009305439	11	~2012
20505025559	41010051119	11	~2012
20505603143	41011206287	11	~2012
20505940913	123035645479	12	~2013
20507457653	123044745919	12	~2013
20508627239	41017254479	11	~2012
20509810019	41019620039	11	~2012
20510180843	41020361687	11	~2012
20510688371	41021376743	11	~2012
20511761843	41023523687	11	~2012
20512174583	41024349167	11	~2012
20512316771	41024633543	11	~2012
20512539731	41025079463	11	~2012
20512757231	41025514463	11	~2012
20513370851	41026741703	11	~2012
20516100179	41032200359	11	~2012

Exponent	Prime Factor	Dig.	Year
20516367719	41032735439	11	~2012
20516556023	41033112047	11	~2012
20518326131	41036652263	11	~2012
20518326827	164146614617	12	~2013
20518860337	492452648089	12	~2014
20518868761	123113212567	12	~2013
20520017647	205200176471	12	~2013
20520122039	41040244079	11	~2012
20520215777	123121294663	12	~2013
20520468481	328327495697	12	~2014
20521409387	164171275097	12	~2013
20522489639	41044979279	11	~2012
20522829053	123136974319	12	~2013
20522948597	123137691583	12	~2013
20523113423	41046226847	11	~2012
20523393563	41046787127	11	~2012
20524117931	41048235863	11	~2012
20524965743	41049931487	11	~2012
20525673173	123154039039	12	~2013
20526519911	41053039823	11	~2012
20527877939	41055755879	11	~2012
20528759243	41057518487	11	~2012
20530143479	41060286959	11	~2012
20530307117	123181842703	12	~2013
20530579799	41061159599	11	~2012

4.828.532 digits

25-06-01