Small Mersenne Prime Factors (page 2889/5040)

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
262747819	11035408399	11	~2000
262748399	525496799	9	~1997
262749359	525498719	9	~1997
262758311	525516623	9	~1997
262762151	525524303	9	~1997
262767863	525535727	9	~1997
262770191	525540383	9	~1997
262778053	4204448849	10	~1999
262781171	525562343	9	~1997
262782563	525565127	9	~1997
262782623	525565247	9	~1997
262794419	525588839	9	~1997
262799809	26805580519	11	~2001
262806683	525613367	9	~1997
262811663	525623327	9	~1997
262823063	525646127	9	~1997
262828343	525656687	9	~1997
262834283	525668567	9	~1997
262838291	525676583	9	~1997
262839617	1577037703	10	~1998
262844507	2102756057	10	~1998
262854191	525708383	9	~1997
262866557	1577199343	10	~1998
262869371	2102954969	10	~1998
262877899	145108600249	12	~2003

Exponent	Prime Factor	Digits	Year
262879817	2103038537	10	~1998
262885559	525771119	9	~1997
262894319	525788639	9	~1997
262896071	525792143	9	~1997
262902239	525804479	9	~1997
262912439	525824879	9	~1997
262918763	525837527	9	~1997
262925963	525851927	9	~1997
262931219	525862439	9	~1997
262939637	1577637823	10	~1998
262953731	525907463	9	~1997
262954343	525908687	9	~1997
262956899	525913799	9	~1997
262957711	4207323377	10	~1999
262964183	525928367	9	~1997
262967363	525934727	9	~1997
262968479	525936959	9	~1997
262975151	525950303	9	~1997
262975309	5785456799	10	~1999
262977623	525955247	9	~1997
262977899	525955799	9	~1997
262983181	7889495431	10	~2000
262985077	1577910463	10	~1998
262991021	1577946127	10	~1998
263005537	6312132889	10	~1999

Exponent	Prime Factor	Digits	Year
263008019	526016039	9	~1997
263009171	526018343	9	~1997
263012303	526024607	9	~1997
263013431	526026863	9	~1997
263018669	3682261367	10	~1999
263026763	526053527	9	~1997
263028853	1578173119	10	~1998
263031299	526062599	9	~1997
263032631	526065263	9	~1997
263033297	2104266377	10	~1998
263039837	1578239023	10	~1998
263054117	1578324703	10	~1998
263064533	8418065057	10	~2000
263065057	1578390343	10	~1998
263078993	3683105903	10	~1999
263089027	6314136649	10	~1999
263095117	1578570703	10	~1998
263105543	526211087	9	~1997
263115551	526231103	9	~1997
263116559	526233119	9	~1997
263120909	2104967273	10	~1998
263125403	526250807	9	~1997
263139263	526278527	9	~1997
263141843	526283687	9	~1997
263146813	1578880879	10	~1998

Exponent	Prime Factor	Digits	Year
263147399	526294799	9	~1997
263169479	526338959	9	~1997
263173283	526346567	9	~1997
263177279	526354559	9	~1997
263190803	526381607	9	~1997
263191381	1579148287	10	~1998
263193431	526386863	9	~1997
263195287	2631952871	10	~1998
263199731	526399463	9	~1997
263202757	1579216543	10	~1998
263210273	14739775289	11	~2000
263213123	526426247	9	~1997
263215279	2632152791	10	~1998
263225971	2632259711	10	~1998
263226479	526452959	9	~1997
263231737	6317561689	10	~1999
263232059	526464119	9	~1997
263233871	526467743	9	~1997
263249771	526499543	9	~1997
263254151	526508303	9	~1997
263263463	526526927	9	~1997
263264483	526528967	9	~1997
263268737	2106149897	10	~1998
263269679	526539359	9	~1997
263270933	1579625599	10	~1998

4.739.325 digits

25-04-20