Small Mersenne Prime Factors (page 3176/5190)

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	Digits	Year
418141931	836283863	9	~1998
418149551	836299103	9	~1998
418149841	6690397457	10	~2001
418150171	4181501711	10	~2000
418152619	14217189047	11	~2001
418157281	2508943687	10	~1999
418163639	836327279	9	~1998
418166213	2508997279	10	~1999
418168607	10036046569	11	~2001
418186991	836373983	9	~1998
418194251	836388503	9	~1998
418199399	836398799	9	~1998
418231181	2509387087	10	~1999
418239911	836479823	9	~1998
418240961	62736144151	11	~2003
418253063	836506127	9	~1998
418267163	836534327	9	~1998
418275779	836551559	9	~1998
418284803	836569607	9	~1998
418288259	836576519	9	~1998
418306151	836612303	9	~1998
418306697	3346453577	10	~2000
418313191	7529637439	10	~2001
418319197	2509915183	10	~1999
418328483	836656967	9	~1998

Exponent	Prime Factor	Digits	Year
418328831	836657663	9	~1998
418332973	2509997839	10	~1999
418337099	836674199	9	~1998
418370819	836741639	9	~1998
418396859	836793719	9	~1998
418400579	836801159	9	~1998
418406603	836813207	9	~1998
418412411	836824823	9	~1998
418414571	836829143	9	~1998
418414583	836829167	9	~1998
418424603	836849207	9	~1998
418450199	836900399	9	~1998
418453681	2510722087	10	~1999
418456331	836912663	9	~1998
418460051	836920103	9	~1998
418462571	836925143	9	~1998
418463399	836926799	9	~1998
418474883	836949767	9	~1998
418475129	5858651807	10	~2000
418477177	2510863063	10	~1999
418492703	836985407	9	~1998
418501073	10044025753	11	~2001
418502521	2511015127	10	~1999
418554431	837108863	9	~1998
418588931	837177863	9	~1998

Exponent	Prime Factor	Digits	Year
418600453	2511602719	10	~1999
418608611	837217223	9	~1998
418620611	10884135887	11	~2001
418626839	837253679	9	~1998
418631159	837262319	9	~1998
418644683	837289367	9	~1998
418644731	837289463	9	~1998
418657859	837315719	9	~1998
418663171	4186631711	10	~2000
418671179	3349369433	10	~2000
418717147	7536908647	10	~2001
418724279	837448559	9	~1998
418745711	837491423	9	~1998
418751423	837502847	9	~1998
418760681	3350085449	10	~2000
418785071	837570143	9	~1998
418791683	837583367	9	~1998
418793737	2512762423	10	~1999
418804697	2512828183	10	~2000
418822841	2512937047	10	~2000
418831913	2512991479	10	~2000
418835903	23454810569	11	~2002
418848709	30157107049	11	~2002
418851623	837703247	9	~1998
418861813	2513170879	10	~2000

Exponent	Prime Factor	Digits	Year
418869323	837738647	9	~1998
418869719	837739439	9	~1998
418871617	2513229703	10	~2000
418878191	837756383	9	~1998
418879199	837758399	9	~1998
418880521	9215371463	10	~2001
418887277	2513323663	10	~2000
418903993	2513423959	10	~2000
418911131	837822263	9	~1998
418912139	837824279	9	~1998
418915481	2513492887	10	~2000
418915823	837831647	9	~1998
418917839	837835679	9	~1998
418929239	837858479	9	~1998
418931543	837863087	9	~1998
418933103	837866207	9	~1998
418939739	837879479	9	~1998
418944809	5865227327	10	~2000
418949171	837898343	9	~1998
418949831	837899663	9	~1998
418971073	2513826439	10	~2000
418980817	2513884903	10	~2000
418984651	4189846511	10	~2000
418988543	837977087	9	~1998
418993319	3351946553	10	~2000

4.888.230 digits

25-06-29