Small Mersenne Prime Factors (page 4502/5025)

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	Dig.	Year
25258532713	606204785113	12	~2015
25258671419	50517342839	11	~2012
25259971571	50519943143	11	~2012
25260785681	151564714087	12	~2013
25260905101	151565430607	12	~2013
25261815247	252618152471	12	~2014
25262974211	50525948423	11	~2012
25264912481	151589474887	12	~2013
25265287937	757958638111	12	~2015
25267237559	50534475119	11	~2012
25267328291	50534656583	11	~2012
25267762061	151606572367	12	~2013
25269010751	50538021503	11	~2012
25269174191	50538348383	11	~2012
25270427951	50540855903	11	~2012
25272532391	50545064783	11	~2012
25273368313	151640209879	12	~2013
25273408763	50546817527	11	~2012
25273535663	50547071327	11	~2012
25273577363	50547154727	11	~2012
25275127571	50550255143	11	~2012
25275750011	50551500023	11	~2012
25277087881	151662527287	12	~2013
25277210831	50554421663	11	~2012
25278064979	50556129959	11	~2012

Exponent	Prime Factor	Dig.	Year
25279832327	455036981887	12	~2015
25280349719	50560699439	11	~2012
25281579331	252815793311	12	~2014
25283151449	202265211593	12	~2014
25283373623	50566747247	11	~2012
25284021023	50568042047	11	~2012
25284862139	50569724279	11	~2012
25285717043	50571434087	11	~2012
25286828321	151720969927	12	~2013
25287028271	50574056543	11	~2012
25287048851	50574097703	11	~2012
25287253679	50574507359	11	~2012
25289659751	50579319503	11	~2012
25290104659	252901046591	12	~2014
25291619063	50583238127	11	~2012
25294874459	202358995673	12	~2014
25295096531	50590193063	11	~2012
25296580097	151779480583	12	~2013
25296987721	151781926327	12	~2013
25297195691	50594391383	11	~2012
25299143711	50598287423	11	~2012
25300218997	759006569911	12	~2015
25301670941	202413367529	12	~2014
25302381743	50604763487	11	~2012
25303725203	50607450407	11	~2012

Exponent	Prime Factor	Dig.	Year
25304099783	50608199567	11	~2012
25304180669	202433445353	12	~2014
25304939183	50609878367	11	~2012
25305696659	50611393319	11	~2012
25305815891	50611631783	11	~2012
25307723579	50615447159	11	~2012
25310055847	253100558471	12	~2014
25310686211	50621372423	11	~2012
25311073919	50622147839	11	~2012
25311627239	202493017913	12	~2014
25311719819	50623439639	11	~2012
25312614577	151875687463	12	~2013
25312651163	50625302327	11	~2012
25312829159	50625658319	11	~2012
25313733359	50627466719	11	~2012
25314706799	50629413599	11	~2012
25315513439	50631026879	11	~2012
25315979891	50631959783	11	~2012
25319769551	50639539103	11	~2012
25320110639	50640221279	11	~2012
25320924719	50641849439	11	~2012
25321145233	151926871399	12	~2013
25321988309	202575906473	12	~2014
25323354239	50646708479	11	~2012
25323495929	607763902297	12	~2015

Exponent	Prime Factor	Dig.	Year
25324984703	50649969407	11	~2012
25325301377	151951808263	12	~2013
25325568959	50651137919	11	~2012
25325674147	253256741471	12	~2014
25326241877	151957451263	12	~2013
25326794161	405228706577	12	~2014
25326912059	50653824119	11	~2012
25328321047	253283210471	12	~2014
25329538277	202636306217	12	~2014
25330110983	50660221967	11	~2012
25330797911	50661595823	11	~2012
25332572411	50665144823	11	~2012
25333100651	50666201303	11	~2012
25333665443	50667330887	11	~2012
25333687193	152002123159	12	~2013
25335318377	152011910263	12	~2013
25336245359	50672490719	11	~2012
25336426769	354709974767	12	~2014
25337075831	50674151663	11	~2012
25337169419	50674338839	11	~2012
25338686603	50677373207	11	~2012
25338891427	253388914271	12	~2014
25341764621	152050587727	12	~2013
25342363499	50684726999	11	~2012
25342620323	50685240647	11	~2012

4.724.182 digits

25-04-13