Small Mersenne Prime Factors (page 4856/5850)

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
9707545643	19415091287	11	~2009
9707573159	19415146319	11	~2009
9707778683	19415557367	11	~2009
9707830061	58246980367	11	~2010
9708239719	232997753257	12	~2012
9708897479	19417794959	11	~2009
9709472231	19418944463	11	~2009
9709605959	77676847673	11	~2011
9710189579	19420379159	11	~2009
9710203103	19420406207	11	~2009
9710515163	19421030327	11	~2009
9710631071	19421262143	11	~2009
9710802467	77686419737	11	~2011
9711080837	77688646697	11	~2011
9711887051	19423774103	11	~2009
9711896423	19423792847	11	~2009
9712206271	97122062711	11	~2011
9712328081	77698624649	11	~2011
9712803323	19425606647	11	~2009
9713147267	466231068817	12	~2012
9713317643	19426635287	11	~2009
9713402641	58280415847	11	~2010
9713561183	19427122367	11	~2009
9713610017	58281660103	11	~2010
9713615111	77708920889	11	~2011

Exponent	Prime Factor	Dig.	Year
9713692451	19427384903	11	~2009
9714010199	19428020399	11	~2009
9714204959	19428409919	11	~2009
9714859331	19429718663	11	~2009
9715175111	19430350223	11	~2009
9715829771	19431659543	11	~2009
9716090171	19432180343	11	~2009
9717674719	97176747191	11	~2011
9717823691	19435647383	11	~2009
9717887513	58307325079	11	~2010
9717948377	58307690263	11	~2010
9718162691	19436325383	11	~2009
9718351859	19436703719	11	~2009
9718490869	466487561713	12	~2012
9719328491	19438656983	11	~2009
9719548859	19439097719	11	~2009
9719761937	369350953607	12	~2012
9719981279	19439962559	11	~2009
9720681983	19441363967	11	~2009
9720768203	19441536407	11	~2009
9721650397	58329902383	11	~2010
9722031719	19444063439	11	~2009
9722235227	77777881817	11	~2011
9722359931	19444719863	11	~2009
9723023069	291690692071	12	~2012

Exponent	Prime Factor	Dig.	Year
9723040091	19446080183	11	~2009
9723749279	19447498559	11	~2009
9723763733	58342582399	11	~2010
9724442723	19448885447	11	~2009
9725446103	19450892207	11	~2009
9726107399	19452214799	11	~2009
9726205343	19452410687	11	~2009
9726538403	19453076807	11	~2009
9726813359	19453626719	11	~2009
9726856091	19453712183	11	~2009
9726857603	19453715207	11	~2009
9727128923	19454257847	11	~2009
9727355663	19454711327	11	~2009
9728061043	97280610431	11	~2011
9728069831	19456139663	11	~2009
9728111489	77824891913	11	~2011
9728208251	19456416503	11	~2009
9728256077	77826048617	11	~2011
9728369099	19456738199	11	~2009
9729715321	58378291927	11	~2010
9730143457	447586599023	12	~2012
9730691507	77845532057	11	~2011
9731089223	19462178447	11	~2009
9731139623	19462279247	11	~2009
9731484611	19462969223	11	~2009

Exponent	Prime Factor	Dig.	Year
9731550071	19463100143	11	~2009
9731594891	19463189783	11	~2009
9731810911	175172596399	12	~2011
9732077041	291962311231	12	~2012
9732165479	19464330959	11	~2009
9732276923	19464553847	11	~2009
9732488063	19464976127	11	~2009
9732549119	19465098239	11	~2009
9733220531	19466441063	11	~2009
9733412621	77867300969	11	~2011
9733550951	19467101903	11	~2009
9733695683	19467391367	11	~2009
9733728839	19467457679	11	~2009
9733858703	19467717407	11	~2009
9734061803	19468123607	11	~2009
9734692739	19469385479	11	~2009
9734987201	77879897609	11	~2011
9735573119	19471146239	11	~2009
9735871391	19471742783	11	~2009
9736954079	19473908159	11	~2009
9736962971	19473925943	11	~2009
9736984133	58421904799	11	~2010
9737180483	19474360967	11	~2009
9737186863	97371868631	11	~2011
9737337719	19474675439	11	~2009

5.546.121 digits

26-05-03