Small Mersenne Prime Factors (page 2605/5730)

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
91889387	735115097	9	~1995
91890431	735123449	9	~1995
91892519	183785039	9	~1993
91894559	183789119	9	~1993
91895339	183790679	9	~1993
91895653	551373919	9	~1994
91897453	11579079079	11	~1998
91898531	183797063	9	~1993
91899023	183798047	9	~1993
91899281	551395687	9	~1994
91901837	551411023	9	~1994
91903403	183806807	9	~1993
91905239	183810479	9	~1993
91906043	183812087	9	~1993
91908539	183817079	9	~1993
91910243	183820487	9	~1993
91910519	183821039	9	~1993
91911119	183822239	9	~1993
91913603	183827207	9	~1993
91916653	551499919	9	~1994
91918579	919185791	9	~1995
91919479	919194791	9	~1995
91920539	183841079	9	~1993
91921799	183843599	9	~1993
91922297	735378377	9	~1995

Exponent	Prime Factor	Digits	Year
91923983	183847967	9	~1993
91924103	183848207	9	~1993
91924799	183849599	9	~1993
91925303	183850607	9	~1993
91926337	1470821393	10	~1995
91927597	551565583	9	~1994
91927813	551566879	9	~1994
91929757	551578543	9	~1994
91930199	735441593	9	~1995
91933043	183866087	9	~1993
91934477	1287082679	10	~1995
91936283	183872567	9	~1993
91937113	1470993809	10	~1995
91939811	183879623	9	~1993
91940111	183880223	9	~1993
91941191	183882383	9	~1993
91941851	183883703	9	~1993
91942139	183884279	9	~1993
91943459	183886919	9	~1993
91946843	183893687	9	~1993
91947731	183895463	9	~1993
91949731	1655095159	10	~1996
91952123	183904247	9	~1993
91953181	1471250897	10	~1995
91954763	183909527	9	~1993

Exponent	Prime Factor	Digits	Year
91960727	735685817	9	~1995
91964003	183928007	9	~1993
91964231	183928463	9	~1993
91964263	1471428209	10	~1995
91965551	183931103	9	~1993
91966139	183932279	9	~1993
91970563	1471529009	10	~1995
91974787	11036974441	11	~1998
91975223	183950447	9	~1993
91977659	183955319	9	~1993
91981283	183962567	9	~1993
91981391	183962783	9	~1993
91987403	183974807	9	~1993
91988843	183977687	9	~1993
91991183	183982367	9	~1993
91992533	1287895463	10	~1995
91993157	735945257	9	~1995
91994663	183989327	9	~1993
91998161	551988967	9	~1994
92001491	184002983	9	~1993
92002193	552013159	9	~1994
92003447	1656062047	10	~1996
92004911	184009823	9	~1993
92010251	184020503	9	~1993
92012881	1472206097	10	~1995

Exponent	Prime Factor	Digits	Year
92013791	184027583	9	~1993
92013893	552083359	9	~1994
92013959	184027919	9	~1993
92014987	1472239793	10	~1995
92016227	736129817	9	~1995
92016251	184032503	9	~1993
92020139	184040279	9	~1993
92025589	2208614137	10	~1996
92028203	184056407	9	~1993
92029043	184058087	9	~1993
92029643	184059287	9	~1993
92030563	1472489009	10	~1995
92030681	2760920431	10	~1996
92032991	184065983	9	~1993
92036479	3681459161	10	~1996
92036621	552219727	9	~1994
92039471	184078943	9	~1993
92041583	184083167	9	~1993
92042459	184084919	9	~1993
92044163	184088327	9	~1993
92048903	184097807	9	~1993
92049367	920493671	9	~1995
92049563	184099127	9	~1993
92052791	184105583	9	~1993
92052899	184105799	9	~1993

5.426.516 digits

26-03-08