Small Mersenne Prime Factors (page 4539/5130)

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
21054173303	42108346607	11	~2012
21054308287	336868932593	12	~2014
21054365653	126326193919	12	~2013
21054626711	42109253423	11	~2012
21054876877	126329261263	12	~2013
21057149387	379028688967	12	~2014
21059489117	126356934703	12	~2013
21060093997	2729...820113	14	2023
21060844019	42121688039	11	~2012
21060937333	126365623999	12	~2013
21061015991	42122031983	11	~2012
21061600223	42123200447	11	~2012
21062583863	42125167727	11	~2012
21063041903	42126083807	11	~2012
21063281797	126379690783	12	~2013
21063417191	42126834383	11	~2012
21065273473	126391640839	12	~2013
21065521721	631965651631	12	~2015
21068463023	42136926047	11	~2012
21069378133	337110050129	12	~2014
21069817609	1011...452321	14	2023
21073046783	42146093567	11	~2012
21073076039	42146152079	11	~2012
21073112191	337169795057	12	~2014
21073294139	42146588279	11	~2012

Exponent	Prime Factor	Dig.	Year
21073721171	42147442343	11	~2012
21074936951	42149873903	11	~2012
21075343259	42150686519	11	~2012
21075422531	42150845063	11	~2012
21075628319	42151256639	11	~2012
21076400519	42152801039	11	~2012
21076687799	42153375599	11	~2012
21076770023	42153540047	11	~2012
21077023391	42154046783	11	~2012
21077373419	42154746839	11	~2012
21077576483	42155152967	11	~2012
21078106559	42156213119	11	~2012
21078201299	42156402599	11	~2012
21078782159	168630257273	12	~2013
21080914271	42161828543	11	~2012
21081066977	126486401863	12	~2013
21083080619	42166161239	11	~2012
21083168369	168665346953	12	~2013
21084134221	126504805327	12	~2013
21084802133	126508812799	12	~2013
21085778891	42171557783	11	~2012
21086043311	42172086623	11	~2012
21086134627	210861346271	12	~2013
21086890343	42173780687	11	~2012
21087761039	42175522079	11	~2012

Exponent	Prime Factor	Dig.	Year
21091318019	42182636039	11	~2012
21093793271	42187586543	11	~2012
21094228019	42188456039	11	~2012
21094446427	210944464271	12	~2013
21096354959	42192709919	11	~2012
21098349119	42196698239	11	~2012
21098677403	42197354807	11	~2012
21099035591	42198071183	11	~2012
21100513463	42201026927	11	~2012
21101050823	42202101647	11	~2012
21102049643	506449191433	12	~2014
21102089159	42204178319	11	~2012
21103011311	42206022623	11	~2012
21103743623	42207487247	11	~2012
21104324963	42208649927	11	~2012
21107710703	42215421407	11	~2012
21110713931	42221427863	11	~2012
21111379931	42222759863	11	~2012
21112149119	42224298239	11	~2012
21112150463	42224300927	11	~2012
21114839639	168918717113	12	~2013
21116098331	42232196663	11	~2012
21116750471	42233500943	11	~2012
21116874137	126701244823	12	~2013
21117514037	126705084223	12	~2013

Exponent	Prime Factor	Dig.	Year
21119331817	126715990903	12	~2013
21120461699	42240923399	11	~2012
21120821219	42241642439	11	~2012
21123969059	42247938119	11	~2012
21124249417	337987990673	12	~2014
21125058719	42250117439	11	~2012
21125285963	42250571927	11	~2012
21125840399	42251680799	11	~2012
21126676331	42253352663	11	~2012
21127738799	42255477599	11	~2012
21129431179	211294311791	12	~2013
21132143531	42264287063	11	~2012
21133761749	295872664487	12	~2014
21134777063	42269554127	11	~2012
21134777857	126808667143	12	~2013
21136810111	338188961777	12	~2014
21137904253	126827425519	12	~2013
21139639739	42279279479	11	~2012
21139866563	42279733127	11	~2012
21140207639	42280415279	11	~2012
21141648959	42283297919	11	~2012
21142002671	42284005343	11	~2012
21142293299	42284586599	11	~2012
21142509683	42285019367	11	~2012
21142809419	42285618839	11	~2012

4.828.532 digits

25-06-01