Small Mersenne Prime Factors (page 4818/5025)

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
102213785759	204427571519	12	~2017
102218002223	204436004447	12	~2017
102228335459	204456670919	12	~2017
102228380183	204456760367	12	~2017
102265892411	204531784823	12	~2017
102270986473	3109...887793	14	2024
102279918263	204559836527	12	~2017
102282058451	204564116903	12	~2017
102287325923	204574651847	12	~2017
102288855299	204577710599	12	~2017
102297479351	204594958703	12	~2017
102317254079	204634508159	12	~2017
102317404859	204634809719	12	~2017
102332851199	204665702399	12	~2017
102336389423	204672778847	12	~2017
102336571643	204673143287	12	~2017
102361614857	614169689143	12	~2018
102370444703	204740889407	12	~2017
102383010563	204766021127	12	~2017
102383030411	204766060823	12	~2017
102397275803	204794551607	12	~2017
102398453221	4730...388103	14	2024
102408283091	204816566183	12	~2017
102418489091	204836978183	12	~2017
102420186971	204840373943	12	~2017

Exponent	Prime Factor	Dig.	Year
102429084311	204858168623	12	~2017
102435724211	204871448423	12	~2017
102437065883	204874131767	12	~2017
102445422923	204890845847	12	~2017
102449679179	204899358359	12	~2017
102461030363	204922060727	12	~2017
102469018271	204938036543	12	~2017
102477937321	614867623927	12	~2018
102494926739	204989853479	12	~2017
102500254091	205000508183	12	~2017
102503458697	615020752183	12	~2018
102505772279	205011544559	12	~2017
102508249163	205016498327	12	~2017
102508461793	615050770759	12	~2018
102512749799	205025499599	12	~2017
102517176323	205034352647	12	~2017
102519727259	205039454519	12	~2017
102519930671	205039861343	12	~2017
102520053193	615120319159	12	~2018
102520436339	205040872679	12	~2017
102521944139	205043888279	12	~2017
102528646691	205057293383	12	~2017
102533404619	205066809239	12	~2017
102538257539	205076515079	12	~2017
102550361317	615302167903	12	~2018

Exponent	Prime Factor	Dig.	Year
102550733783	205101467567	12	~2017
102552099311	205104198623	12	~2017
102554247023	205108494047	12	~2017
102554497319	205108994639	12	~2017
102556207703	205112415407	12	~2017
102561490151	205122980303	12	~2017
102563844791	205127689583	12	~2017
102565818983	205131637967	12	~2017
102568855043	205137710087	12	~2017
102572154913	615432929479	12	~2018
102576576877	615459461263	12	~2018
102597902243	205195804487	12	~2017
102600763613	9993...759063	14	2025
102605977559	205211955119	12	~2017
102606247813	615637486879	12	~2018
102609735383	205219470767	12	~2017
102613611059	205227222119	12	~2017
102621870563	205243741127	12	~2017
102626902753	615761416519	12	~2018
102634767803	205269535607	12	~2017
102639713471	205279426943	12	~2017
102648338399	205296676799	12	~2017
102648976019	205297952039	12	~2017
102653105873	615918635239	12	~2018
102653254139	205306508279	12	~2017

Exponent	Prime Factor	Dig.	Year
102656391503	205312783007	12	~2017
102661759979	205323519959	12	~2017
102662481001	1962...673913	15	2025
102663493613	615980961679	12	~2018
102664466939	205328933879	12	~2017
102673341059	205346682119	12	~2017
102675477731	205350955463	12	~2017
102676951043	205353902087	12	~2017
102677507123	205355014247	12	~2017
102680811899	205361623799	12	~2017
102683199431	205366398863	12	~2017
102683699843	205367399687	12	~2017
102691295411	205382590823	12	~2017
102698521883	205397043767	12	~2017
102706789463	205413578927	12	~2017
102710604937	4354...493289	14	2023
102721749899	205443499799	12	~2017
102722521763	205445043527	12	~2017
102727987679	205455975359	12	~2017
102728647811	205457295623	12	~2017
102734506151	205469012303	12	~2017
102736748651	205473497303	12	~2017
102747187297	616483123783	12	~2018
102747905759	205495811519	12	~2017
102755779559	205511559119	12	~2017

4.724.182 digits

25-04-13