Small Mersenne Prime Factors (page 4588/5235)

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
18597188273	111583129639	12	~2012
18597885959	37195771919	11	~2011
18598164731	37196329463	11	~2011
18598188179	37196376359	11	~2011
18598390121	111590340727	12	~2012
18598478461	111590870767	12	~2012
18598554479	37197108959	11	~2011
18599222591	37198445183	11	~2011
18599378381	111596270287	12	~2012
18600435299	37200870599	11	~2011
18600720811	334812974599	12	~2014
18601780331	37203560663	11	~2011
18601868003	37203736007	11	~2011
18602226983	37204453967	11	~2011
18602421203	37204842407	11	~2011
18603974681	148831797449	12	~2013
18604201873	111625211239	12	~2012
18605322251	37210644503	11	~2011
18606641531	148853132249	12	~2013
18608053349	148864426793	12	~2013
18609166259	37218332519	11	~2011
18609567503	37219135007	11	~2011
18610285019	37220570039	11	~2011
18610430551	186104305511	12	~2013
18610437011	37220874023	11	~2011

Exponent	Prime Factor	Dig.	Year
18611243207	148889945657	12	~2013
18611607431	37223214863	11	~2011
18611750831	37223501663	11	~2011
18612761591	37225523183	11	~2011
18613116997	111678701983	12	~2012
18613186937	260584617119	12	~2013
18614000831	37228001663	11	~2011
18614304491	37228608983	11	~2011
18615532679	37231065359	11	~2011
18615799253	111694795519	12	~2012
18616455479	37232910959	11	~2011
18616468163	37232936327	11	~2011
18616475051	37232950103	11	~2011
18616646231	37233292463	11	~2011
18616820219	37233640439	11	~2011
18618754211	37237508423	11	~2011
18619041277	111714247663	12	~2012
18619308563	37238617127	11	~2011
18619392023	37238784047	11	~2011
18620060111	37240120223	11	~2011
18620245463	37240490927	11	~2011
18620277653	111721665919	12	~2012
18620370311	37240740623	11	~2011
18620817353	111724904119	12	~2012
18621271919	37242543839	11	~2011

Exponent	Prime Factor	Dig.	Year
18622204823	37244409647	11	~2011
18622742857	111736457143	12	~2012
18622894237	111737365423	12	~2012
18622971671	148983773369	12	~2013
18624817439	37249634879	11	~2011
18625212313	447005095513	12	~2014
18626149757	111756898543	12	~2012
18626302397	111757814383	12	~2012
18626349311	149010794489	12	~2013
18626497199	149011977593	12	~2013
18627012479	37254024959	11	~2011
18627230399	37254460799	11	~2011
18627244253	111763465519	12	~2012
18627387497	111764324983	12	~2012
18628922051	37257844103	11	~2011
18629101111	298065617777	12	~2013
18630463913	111782783479	12	~2012
18632401283	37264802567	11	~2011
18634259801	111805558807	12	~2012
18634518263	37269036527	11	~2011
18634956803	37269913607	11	~2011
18635425799	37270851599	11	~2011
18636498371	37272996743	11	~2011
18637657739	37275315479	11	~2011
18637851131	37275702263	11	~2011

Exponent	Prime Factor	Dig.	Year
18639359357	111836156143	12	~2012
18639501119	149116008953	12	~2013
18639587903	37279175807	11	~2011
18639671243	37279342487	11	~2011
18640333979	37280667959	11	~2011
18641896993	111851381959	12	~2012
18642102473	260989434623	12	~2013
18643198043	37286396087	11	~2011
18643698119	37287396239	11	~2011
18644045353	111864272119	12	~2012
18644506459	186445064591	12	~2013
18645283259	37290566519	11	~2011
18645528383	37291056767	11	~2011
18647160491	37294320983	11	~2011
18647681183	37295362367	11	~2011
18649526939	37299053879	11	~2011
18650918323	298414693169	12	~2013
18651026783	37302053567	11	~2011
18651378533	111908271199	12	~2012
18654178583	37308357167	11	~2011
18654286331	37308572663	11	~2011
18654317723	37308635447	11	~2011
18655461911	37310923823	11	~2011
18655848983	37311697967	11	~2011
18656363051	37312726103	11	~2011

4.933.056 digits

25-07-20