Small Mersenne Prime Factors (page 4905/5070)

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
130981722659	261963445319	12	~2018
131007165539	262014331079	12	~2018
131008127231	262016254463	12	~2018
131011144559	262022289119	12	~2018
131020056131	262040112263	12	~2018
131026441523	262052883047	12	~2018
131029351391	262058702783	12	~2018
131032486943	262064973887	12	~2018
131038772159	262077544319	12	~2018
131051184983	262102369967	12	~2018
131074302539	262148605079	12	~2018
131079204923	262158409847	12	~2018
131086471751	262172943503	12	~2018
131087237423	262174474847	12	~2018
131091996323	262183992647	12	~2018
131114057363	262228114727	12	~2018
131129792639	262259585279	12	~2018
131130491003	262260982007	12	~2018
131137524673	3225...069559	14	2024
131137546583	262275093167	12	~2018
131138218223	262276436447	12	~2018
131139618661	2727...681489	14	2024
131141091143	262282182287	12	~2018
131144792903	262289585807	12	~2018
131158425383	262316850767	12	~2018

Exponent	Prime Factor	Dig.	Year
131163400559	262326801119	12	~2018
131189523433	787137140599	12	~2019
131211322031	262422644063	12	~2018
131213803751	262427607503	12	~2018
131221251659	262442503319	12	~2018
131233504091	262467008183	12	~2018
131233664459	262467328919	12	~2018
131240584697	787443508183	12	~2019
131242025773	787452154639	12	~2019
131242992773	3018...337791	14	2024
131255757599	262511515199	12	~2018
131265450539	262530901079	12	~2018
131284620119	262569240239	12	~2018
131289675899	262579351799	12	~2018
131312392559	262624785119	12	~2018
131316598943	262633197887	12	~2018
131323508713	787941052279	12	~2019
131326418339	262652836679	12	~2018
131345303951	262690607903	12	~2018
131345940839	262691881679	12	~2018
131351895373	788111372239	12	~2019
131362773131	262725546263	12	~2018
131368175111	262736350223	12	~2018
131393209873	788359259239	12	~2019
131403224399	262806448799	12	~2018

Exponent	Prime Factor	Dig.	Year
131403806123	262807612247	12	~2018
131419444703	262838889407	12	~2018
131419866923	262839733847	12	~2018
131429228939	262858457879	12	~2018
131431031579	262862063159	12	~2018
131436281159	262872562319	12	~2018
131455012343	262910024687	12	~2018
131458459679	262916919359	12	~2018
131461443983	262922887967	12	~2018
131480201399	262960402799	12	~2018
131485508183	262971016367	12	~2018
131486697323	262973394647	12	~2018
131492540401	788955242407	12	~2019
131509267691	263018535383	12	~2018
131512772401	789076634407	12	~2019
131514455603	263028911207	12	~2018
131516683643	263033367287	12	~2018
131519059151	263038118303	12	~2018
131520615119	263041230239	12	~2018
131530374071	263060748143	12	~2018
131541614531	263083229063	12	~2018
131551924391	263103848783	12	~2018
131552908079	263105816159	12	~2018
131571362519	263142725039	12	~2018
131573438963	263146877927	12	~2018

Exponent	Prime Factor	Dig.	Year
131577420791	263154841583	12	~2018
131577435611	263154871223	12	~2018
131585885857	789515315143	12	~2019
131593299923	263186599847	12	~2018
131594580731	263189161463	12	~2018
131613159959	263226319919	12	~2018
131627046359	263254092719	12	~2018
131628329543	263256659087	12	~2018
131635171823	263270343647	12	~2018
131644448693	789866692159	12	~2019
131648362057	789890172343	12	~2019
131654455259	263308910519	12	~2018
131655242723	263310485447	12	~2018
131659295281	789955771687	12	~2019
131691242099	263382484199	12	~2018
131697039121	790182234727	12	~2019
131700129419	263400258839	12	~2018
131700513023	263401026047	12	~2018
131708743931	263417487863	12	~2018
131719265159	263438530319	12	~2018
131722471151	263444942303	12	~2018
131728687319	263457374639	12	~2018
131728744643	263457489287	12	~2018
131733576899	263467153799	12	~2018
131742201659	263484403319	12	~2018

4.768.925 digits

25-05-04