Small Mersenne Prime Factors (page 4465/5130)

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
16138535929	355047790439	12	~2013
16139026811	32278053623	11	~2011
16139048351	32278096703	11	~2011
16139103923	32278207847	11	~2011
16140102431	32280204863	11	~2011
16140637451	32281274903	11	~2011
16141297391	32282594783	11	~2011
16141578919	290548420543	12	~2013
16141597553	96849585319	11	~2012
16143152041	96858912247	11	~2012
16143422111	32286844223	11	~2011
16143557999	32287115999	11	~2011
16143959939	32287919879	11	~2011
16144021139	32288042279	11	~2011
16144055351	32288110703	11	~2011
16144323523	387463764553	12	~2013
16144587001	96867522007	11	~2012
16144681523	32289363047	11	~2011
16145089739	32290179479	11	~2011
16145157911	32290315823	11	~2011
16145249339	32290498679	11	~2011
16145733479	32291466959	11	~2011
16145884871	32291769743	11	~2011
16146289633	355218371927	12	~2013
16147438271	32294876543	11	~2011

Exponent	Prime Factor	Dig.	Year
16147948991	32295897983	11	~2011
16148910307	161489103071	12	~2012
16148924471	32297848943	11	~2011
16148950379	32297900759	11	~2011
16149039971	32298079943	11	~2011
16149211943	32298423887	11	~2011
16149752303	32299504607	11	~2011
16151299091	32302598183	11	~2011
16152458053	96914748319	11	~2012
16153039559	32306079119	11	~2011
16153598663	32307197327	11	~2011
16154770283	32309540567	11	~2011
16155336557	96932019343	11	~2012
16155661139	32311322279	11	~2011
16156382017	96938292103	11	~2012
16156850159	32313700319	11	~2011
16158311159	32316622319	11	~2011
16158586319	32317172639	11	~2011
16158678923	32317357847	11	~2011
16158739319	32317478639	11	~2011
16159280843	32318561687	11	~2011
16159357771	161593577711	12	~2012
16160060531	32320121063	11	~2011
16160107283	32320214567	11	~2011
16160385523	549453107783	12	~2014

Exponent	Prime Factor	Dig.	Year
16161988763	32323977527	11	~2011
16162946183	32325892367	11	~2011
16163324921	96979949527	11	~2012
16163450903	32326901807	11	~2011
16163816939	32327633879	11	~2011
16164716387	129317731097	12	~2012
16165986497	129327891977	12	~2012
16166736557	97000419343	11	~2012
16166804963	32333609927	11	~2011
16167136759	161671367591	12	~2012
16170462131	129363697049	12	~2012
16171122323	32342244647	11	~2011
16174390853	97046345119	11	~2012
16175680601	129405444809	12	~2012
16176038783	32352077567	11	~2011
16178563463	32357126927	11	~2011
16179063731	32358127463	11	~2011
16179116771	32358233543	11	~2011
16180234463	32360468927	11	~2011
16180237027	161802370271	12	~2012
16180846217	97085077303	11	~2012
16181094263	32362188527	11	~2011
16181438111	32362876223	11	~2011
16182630791	32365261583	11	~2011
16182959063	32365918127	11	~2011

Exponent	Prime Factor	Dig.	Year
16183011431	32366022863	11	~2011
16183037159	32366074319	11	~2011
16183037891	32366075783	11	~2011
16184261399	32368522799	11	~2011
16185688451	32371376903	11	~2011
16185722653	97114335919	11	~2012
16186402181	97118413087	11	~2012
16187700779	32375401559	11	~2011
16187844083	32375688167	11	~2011
16191154559	32382309119	11	~2011
16191366421	97148198527	11	~2012
16191368101	97148208607	11	~2012
16191879443	32383758887	11	~2011
16192098311	32384196623	11	~2011
16192285297	259076564753	12	~2013
16192829561	97156977367	11	~2012
16192921973	97157531839	11	~2012
16193255339	32386510679	11	~2011
16193433299	32386866599	11	~2011
16193469443	32386938887	11	~2011
16193700203	32387400407	11	~2011
16193798303	32387596607	11	~2011
16195245119	32390490239	11	~2011
16195407863	32390815727	11	~2011
16195476487	259127623793	12	~2013

4.828.532 digits

25-06-01