Small Mersenne Prime Factors (page 5485/5670)

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
154160854499	308321708999	12	~2018
154166137739	308332275479	12	~2018
154167626051	308335252103	12	~2018
154168818131	308337636263	12	~2018
154169842943	308339685887	12	~2018
154188341819	308376683639	12	~2018
154203111371	308406222743	12	~2018
154205310323	308410620647	12	~2018
154212416909	1600...751543	15	2025
154225226471	308450452943	12	~2018
154233709991	308467419983	12	~2018
154235350103	308470700207	12	~2018
154242325871	308484651743	12	~2018
154252310879	308504621759	12	~2018
154262609939	308525219879	12	~2018
154276918643	308553837287	12	~2018
154283735003	308567470007	12	~2018
154287239279	308574478559	12	~2018
154290791771	308581583543	12	~2018
154291961779	7560...271711	14	2025
154292568119	308585136239	12	~2018
154296990557	7035...693993	14	2025
154311180323	308622360647	12	~2018
154315639139	308631278279	12	~2018
154319003243	308638006487	12	~2018

Exponent	Prime Factor	Dig.	Year
154337523251	308675046503	12	~2018
154350597851	308701195703	12	~2018
154369848179	308739696359	12	~2018
154375172123	308750344247	12	~2018
154378431923	308756863847	12	~2018
154382944931	308765889863	12	~2018
154385368331	308770736663	12	~2018
154392351023	308784702047	12	~2018
154400717123	308801434247	12	~2018
154412025191	308824050383	12	~2018
154417382219	308834764439	12	~2018
154418300843	308836601687	12	~2018
154440872219	308881744439	12	~2018
154452242363	308904484727	12	~2018
154465686299	308931372599	12	~2018
154504743203	309009486407	12	~2018
154513357283	309026714567	12	~2018
154517037431	309034074863	12	~2018
154518757691	309037515383	12	~2018
154535986571	309071973143	12	~2018
154560597179	309121194359	12	~2018
154569695243	309139390487	12	~2018
154570538891	309141077783	12	~2018
154572043919	309144087839	12	~2018
154575267839	309150535679	12	~2018

Exponent	Prime Factor	Dig.	Year
154575480959	309150961919	12	~2018
154576108909	3431...177799	14	2024
154593010259	309186020519	12	~2018
154606752659	309213505319	12	~2018
154609580291	309219160583	12	~2018
154627309619	309254619239	12	~2018
154632905783	309265811567	12	~2018
154647735971	309295471943	12	~2018
154658470871	309316941743	12	~2018
154665532319	309331064639	12	~2018
154670546483	309341092967	12	~2018
154678564451	309357128903	12	~2018
154704064943	309408129887	12	~2018
154710259439	309420518879	12	~2018
154729194563	309458389127	12	~2018
154740387023	309480774047	12	~2018
154741176851	309482353703	12	~2018
154761145271	309522290543	12	~2018
154769682863	309539365727	12	~2018
154834703509	2601...189513	14	2024
154860018479	309720036959	12	~2018
154865082791	309730165583	12	~2018
154886951231	309773902463	12	~2018
154891681211	309783362423	12	~2018
154905675143	309811350287	12	~2018

Exponent	Prime Factor	Dig.	Year
154908241511	309816483023	12	~2018
154916198821	7312...843513	14	2025
154922037563	309844075127	12	~2018
154936926803	309873853607	12	~2018
154938573551	309877147103	12	~2018
154945352759	309890705519	12	~2018
154961573003	309923146007	12	~2018
154962076319	309924152639	12	~2018
154972881923	309945763847	12	~2018
154974062531	309948125063	12	~2018
154977521423	309955042847	12	~2018
154979169623	309958339247	12	~2018
154984409831	309968819663	12	~2018
155008438579	1317...792151	15	2025
155035505459	310071010919	12	~2018
155036191223	310072382447	12	~2018
155057413463	310114826927	12	~2018
155070444719	310140889439	12	~2018
155075409479	310150818959	12	~2018
155076550679	310153101359	12	~2018
155085305099	310170610199	12	~2018
155101998251	310203996503	12	~2018
155107091999	310214183999	12	~2018
155107936619	310215873239	12	~2018
155111665619	310223331239	12	~2018

5.366.787 digits

26-02-08