Small Mersenne Prime Factors (page 4879/5130)

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
86703136511	173406273023	12	~2016
86724576623	173449153247	12	~2016
86724744521	693797956169	12	~2018
86725321103	173450642207	12	~2016
86733559103	173467118207	12	~2016
86749560119	173499120239	12	~2016
86752212311	173504424623	12	~2016
86752998011	173505996023	12	~2016
86763503641	520581021847	12	~2018
86767522619	694140180953	12	~2018
86770853639	173541707279	12	~2016
86777223419	173554446839	12	~2016
86778784199	173557568399	12	~2016
86778931073	520673586439	12	~2018
86781424283	173562848567	12	~2016
86785961897	520715771383	12	~2018
86786435843	173572871687	12	~2016
86794828343	173589656687	12	~2016
86795619191	173591238383	12	~2016
86795921783	173591843567	12	~2016
86799935561	694399484489	12	~2018
86803979543	173607959087	12	~2016
86804018153	520824108919	12	~2018
86813170259	173626340519	12	~2016
86813273171	173626546343	12	~2016

Exponent	Prime Factor	Dig.	Year
86814011021	520884066127	12	~2018
86814451079	173628902159	12	~2016
86826650303	173653300607	12	~2016
86833083503	173666167007	12	~2016
86835733739	173671467479	12	~2016
86839360319	173678720639	12	~2016
86846854931	173693709863	12	~2016
86848053839	173696107679	12	~2016
86873869163	173747738327	12	~2016
86878237139	695025897113	12	~2018
86879393519	173758787039	12	~2016
86880602723	173761205447	12	~2016
86881071383	173762142767	12	~2016
86882542919	173765085839	12	~2016
86885147039	173770294079	12	~2016
86889997213	521339983279	12	~2018
86891917537	521351505223	12	~2018
86893909631	173787819263	12	~2016
86903292779	173806585559	12	~2016
86905375883	173810751767	12	~2016
86905898921	695247191369	12	~2018
86907412283	173814824567	12	~2016
86907602363	173815204727	12	~2016
86908199531	173816399063	12	~2016
86908361411	173816722823	12	~2016

Exponent	Prime Factor	Dig.	Year
86913466537	521480799223	12	~2018
86919240923	173838481847	12	~2016
86919679139	173839358279	12	~2016
86922327491	173844654983	12	~2016
86926686191	173853372383	12	~2016
86929403051	173858806103	12	~2016
86933589863	173867179727	12	~2016
86938780477	521632682863	12	~2018
86939894291	695519154329	12	~2018
86941558883	173883117767	12	~2016
86943238661	521659431967	12	~2018
86949925883	173899851767	12	~2016
86956355963	173912711927	12	~2016
86959700519	1488...288529	15	2025
86965205297	521791231783	12	~2018
86972749463	173945498927	12	~2016
86989758071	173979516143	12	~2016
86991844931	173983689863	12	~2016
86995613759	173991227519	12	~2016
87000399617	522002397703	12	~2018
87004012211	696032097689	12	~2018
87006376559	174012753119	12	~2016
87008816003	174017632007	12	~2016
87011214551	174022429103	12	~2016
87012726191	174025452383	12	~2016

Exponent	Prime Factor	Dig.	Year
87016787771	174033575543	12	~2016
87021306083	174042612167	12	~2016
87031653497	522189920983	12	~2018
87033756983	174067513967	12	~2016
87038864903	174077729807	12	~2016
87039105947	696312847577	12	~2018
87042806183	174085612367	12	~2016
87048209639	174096419279	12	~2016
87054194543	174108389087	12	~2016
87058785371	174117570743	12	~2016
87062063999	174124127999	12	~2016
87063213719	174126427439	12	~2016
87066078383	174132156767	12	~2016
87066102377	522396614263	12	~2018
87074599211	174149198423	12	~2016
87091861943	174183723887	12	~2016
87098177531	174196355063	12	~2016
87100959131	174201918263	12	~2016
87108335453	522650012719	12	~2018
87110563103	174221126207	12	~2016
87112702823	174225405647	12	~2016
87113695147	8240...609063	14	2025
87117153077	696937224617	12	~2018
87121329923	174242659847	12	~2016
87122343491	174244686983	12	~2016

4.828.532 digits

25-06-01