Small Mersenne Prime Factors (page 4224/5025)

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
9256364171	18512728343	11	~2009
9256581839	18513163679	11	~2009
9256601363	18513202727	11	~2009
9256951859	18513903719	11	~2009
9257003963	18514007927	11	~2009
9257473601	55544841607	11	~2010
9257510177	55545061063	11	~2010
9257513543	18515027087	11	~2009
9257535191	18515070383	11	~2009
9257641553	55545849319	11	~2010
9257932513	55547595079	11	~2010
9258088643	18516177287	11	~2009
9258326243	18516652487	11	~2009
9258513779	18517027559	11	~2009
9258969821	55553818927	11	~2010
9259420619	18518841239	11	~2009
9259441883	222226605193	12	~2011
9259547657	55557285943	11	~2010
9259965971	18519931943	11	~2009
9260219399	18520438799	11	~2009
9260599079	18521198159	11	~2009
9260854081	55565124487	11	~2010
9260917691	18521835383	11	~2009
9261285359	18522570719	11	~2009
9261366671	18522733343	11	~2009

Exponent	Prime Factor	Dig.	Year
9261446477	55568678863	11	~2010
9261494009	74091952073	11	~2010
9261725867	74093806937	11	~2010
9262206983	18524413967	11	~2009
9262327301	74098618409	11	~2010
9262519373	129675271223	12	~2011
9263087783	18526175567	11	~2009
9263377631	18526755263	11	~2009
9263510219	18527020439	11	~2009
9263567711	18527135423	11	~2009
9263656631	18527313263	11	~2009
9265267139	18530534279	11	~2009
9265453199	18530906399	11	~2009
9265995329	129723934607	12	~2011
9266506079	18533012159	11	~2009
9267723863	18535447727	11	~2009
9267777539	18535555079	11	~2009
9267973607	74143788857	11	~2010
9268223231	18536446463	11	~2009
9268426631	18536853263	11	~2009
9268513087	148296209393	12	~2011
9268755187	92687551871	11	~2011
9268955903	18537911807	11	~2009
9269072531	18538145063	11	~2009
9269236631	18538473263	11	~2009

Exponent	Prime Factor	Dig.	Year
9269599499	18539198999	11	~2009
9269684003	18539368007	11	~2009
9270046319	18540092639	11	~2009
9270268367	74162146937	11	~2010
9270443443	148327095089	12	~2011
9270465643	92704656431	11	~2011
9270865771	92708657711	11	~2011
9270990299	18541980599	11	~2009
9271275011	18542550023	11	~2009
9271282931	18542565863	11	~2009
9271393331	18542786663	11	~2009
9271920871	92719208711	11	~2011
9272024813	55632148879	11	~2010
9272308057	148356928913	12	~2011
9272472983	18544945967	11	~2009
9273602083	148377633329	12	~2011
9274353749	74194829993	11	~2010
9276545231	18553090463	11	~2009
9276547499	18553094999	11	~2009
9276689063	18553378127	11	~2009
9276767579	18553535159	11	~2009
9276906059	18553812119	11	~2009
9277869893	55667219359	11	~2010
9277918271	18555836543	11	~2009
9278029177	55668175063	11	~2010

Exponent	Prime Factor	Dig.	Year
9278086439	18556172879	11	~2009
9278307713	55669846279	11	~2010
9278487319	92784873191	11	~2011
9278891543	18557783087	11	~2009
9279228251	18558456503	11	~2009
9279371609	222704918617	12	~2011
9280152071	18560304143	11	~2009
9280865339	18561730679	11	~2009
9281170091	18562340183	11	~2009
9281218763	18562437527	11	~2009
9281223239	18562446479	11	~2009
9281551451	18563102903	11	~2009
9282083233	55692499399	11	~2010
9282159839	18564319679	11	~2009
9282343183	148517490929	12	~2011
9282401231	18564802463	11	~2009
9283059671	18566119343	11	~2009
9283276679	18566553359	11	~2009
9283355219	18566710439	11	~2009
9283757123	18567514247	11	~2009
9284859421	55709156527	11	~2010
9285300743	18570601487	11	~2009
9286249463	18572498927	11	~2009
9286461421	55718768527	11	~2010
9286915139	18573830279	11	~2009

4.724.182 digits

25-04-13