Small Mersenne Prime Factors (page 4645/5025)

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
45366152411	90732304823	11	~2014
45366407843	90732815687	11	~2014
45366690983	90733381967	11	~2014
45369262931	90738525863	11	~2014
45371266097	272227596583	12	~2015
45374111231	90748222463	11	~2014
45374751089	362998008713	12	~2016
45377935331	90755870663	11	~2014
45377951219	90755902439	11	~2014
45378670079	90757340159	11	~2014
45379924237	272279545423	12	~2015
45379987403	90759974807	11	~2014
45381112027	453811120271	12	~2016
45382880831	90765761663	11	~2014
45383644331	90767288663	11	~2014
45385806143	90771612287	11	~2014
45388562333	272331373999	12	~2015
45390551783	3785...187023	14	2025
45394319891	90788639783	11	~2014
45397025953	272382155719	12	~2015
45398692099	453986920991	12	~2016
45402446123	90804892247	11	~2014
45403051091	90806102183	11	~2014
45410103439	454101034391	12	~2016
45410429111	90820858223	11	~2014

Exponent	Prime Factor	Dig.	Year
45412218457	272473310743	12	~2015
45415759289	363326074313	12	~2016
45416316853	272497901119	12	~2015
45416886407	363335091257	12	~2016
45417080237	272502481423	12	~2015
45417474083	90834948167	11	~2014
45417517031	2736...628807	15	2025
45418044121	272508264727	12	~2015
45418895579	90837791159	11	~2014
45419033063	90838066127	11	~2014
45419586623	90839173247	11	~2014
45424744763	90849489527	11	~2014
45425304347	363402434777	12	~2016
45425357039	90850714079	11	~2014
45426263231	90852526463	11	~2014
45431851403	90863702807	11	~2014
45434134451	90868268903	11	~2014
45435359771	90870719543	11	~2014
45437160731	90874321463	11	~2014
45440498723	90880997447	11	~2014
45442911557	363543292457	12	~2016
45442978463	90885956927	11	~2014
45446968571	90893937143	11	~2014
45449453171	363595625369	12	~2016
45450610631	90901221263	11	~2014

Exponent	Prime Factor	Dig.	Year
45451454231	90902908463	11	~2014
45452709023	90905418047	11	~2014
45454794611	90909589223	11	~2014
45455410751	90910821503	11	~2014
45455836259	90911672519	11	~2014
45456488213	272738929279	12	~2015
45459621983	90919243967	11	~2014
45462778253	272776669519	12	~2015
45463337999	90926675999	11	~2014
45463687601	272782125607	12	~2015
45466461251	90932922503	11	~2014
45470927951	90941855903	11	~2014
45474655379	90949310759	11	~2014
45475271183	90950542367	11	~2014
45475333451	90950666903	11	~2014
45479469131	90958938263	11	~2014
45480218401	272881310407	12	~2015
45481069979	90962139959	11	~2014
45483748223	90967496447	11	~2014
45486867599	90973735199	11	~2014
45487560323	90975120647	11	~2014
45488690147	363909521177	12	~2016
45489772571	90979545143	11	~2014
45490379309	636865310327	12	~2016
45490615697	272943694183	12	~2015

Exponent	Prime Factor	Dig.	Year
45491910179	90983820359	11	~2014
45492677423	90985354847	11	~2014
45496480091	90992960183	11	~2014
45496558637	272979351823	12	~2015
45497730269	363981842153	12	~2016
45499753501	272998521007	12	~2015
45502443361	273014660167	12	~2015
45503733083	91007466167	11	~2014
45507736259	91015472519	11	~2014
45508755371	91017510743	11	~2014
45509489783	91018979567	11	~2014
45511796111	91023592223	11	~2014
45514830241	273088981447	12	~2015
45516157241	364129257929	12	~2016
45517435979	91034871959	11	~2014
45518069651	91036139303	11	~2014
45518651729	364149213833	12	~2016
45521610383	91043220767	11	~2014
45525587363	91051174727	11	~2014
45526122217	273156733303	12	~2015
45534448931	91068897863	11	~2014
45535876679	91071753359	11	~2014
45539242811	91078485623	11	~2014
45546778049	364374224393	12	~2016
45546986819	91093973639	11	~2014

4.724.182 digits

25-04-13