Small Mersenne Prime Factors (page 4417/5025)

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
18343070783	36686141567	11	~2011
18343183619	36686367239	11	~2011
18343567513	293497080209	12	~2013
18344106101	110064636607	12	~2012
18344260427	146754083417	12	~2013
18345668417	7895...866769	14	2024
18345927541	110075565247	12	~2012
18346286951	36692573903	11	~2011
18346560923	36693121847	11	~2011
18346721483	36693442967	11	~2011
18346971971	36693943943	11	~2011
18347475983	36694951967	11	~2011
18347478239	36694956479	11	~2011
18347596523	36695193047	11	~2011
18349568483	36699136967	11	~2011
18350651681	146805213449	12	~2013
18351373933	110108243599	12	~2012
18351531911	36703063823	11	~2011
18352699199	36705398399	11	~2011
18353411183	36706822367	11	~2011
18354419591	36708839183	11	~2011
18354931649	146839453193	12	~2013
18355530239	330399544303	12	~2014
18356228251	183562282511	12	~2013
18356906159	36713812319	11	~2011

Exponent	Prime Factor	Dig.	Year
18359127863	36718255727	11	~2011
18359278243	771089686207	12	~2014
18360143597	110160861583	12	~2012
18360184523	36720369047	11	~2011
18360809171	36721618343	11	~2011
18361226887	440669445289	12	~2014
18361750871	36723501743	11	~2011
18362579663	36725159327	11	~2011
18363079331	36726158663	11	~2011
18363112331	36726224663	11	~2011
18363642877	110181857263	12	~2012
18363743939	36727487879	11	~2011
18363799451	36727598903	11	~2011
18363810539	36727621079	11	~2011
18363870383	36727740767	11	~2011
18364182719	36728365439	11	~2011
18364729199	36729458399	11	~2011
18365505419	36731010839	11	~2011
18365822353	110194934119	12	~2012
18365984333	110195905999	12	~2012
18366456301	110198737807	12	~2012
18366624359	36733248719	11	~2011
18366869231	36733738463	11	~2011
18367781423	36735562847	11	~2011
18368245691	36736491383	11	~2011

Exponent	Prime Factor	Dig.	Year
18368587103	36737174207	11	~2011
18368868179	36737736359	11	~2011
18370251143	36740502287	11	~2011
18370688183	36741376367	11	~2011
18373652573	110241915439	12	~2012
18373902551	36747805103	11	~2011
18374799203	36749598407	11	~2011
18374916773	110249500639	12	~2012
18375246143	36750492287	11	~2011
18376587431	36753174863	11	~2011
18377946281	110267677687	12	~2012
18378408947	147027271577	12	~2013
18378430331	36756860663	11	~2011
18378916511	36757833023	11	~2011
18379630271	36759260543	11	~2011
18379722191	36759444383	11	~2011
18379999831	183799998311	12	~2013
18381836401	110291018407	12	~2012
18381926197	441166228729	12	~2014
18381971171	36763942343	11	~2011
18382739923	735309596921	12	~2014
18383163853	294130621649	12	~2013
18383651339	36767302679	11	~2011
18384618191	147076945529	12	~2013
18385162709	147081301673	12	~2013

Exponent	Prime Factor	Dig.	Year
18385245083	36770490167	11	~2011
18386770739	36773541479	11	~2011
18387226223	36774452447	11	~2011
18387264047	147098112377	12	~2013
18387788437	110326730623	12	~2012
18389785679	36779571359	11	~2011
18390194519	36780389039	11	~2011
18392717221	110356303327	12	~2012
18393435407	147147483257	12	~2013
18395447951	36790895903	11	~2011
18396403121	699063318599	12	~2014
18396836851	183968368511	12	~2013
18397293203	36794586407	11	~2011
18398763983	36797527967	11	~2011
18398907341	110393444047	12	~2012
18399668603	36799337207	11	~2011
18400388399	147203107193	12	~2013
18400392971	36800785943	11	~2011
18400435871	36800871743	11	~2011
18401740163	36803480327	11	~2011
18403301291	36806602583	11	~2011
18403806131	36807612263	11	~2011
18404602631	36809205263	11	~2011
18405997391	36811994783	11	~2011
18407115539	36814231079	11	~2011

4.724.182 digits

25-04-13