Small Mersenne Prime Factors (page 2789/5460)

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
151235713	907414279	9	~1996
151235891	302471783	9	~1995
151236343	1512363431	10	~1997
151237379	302474759	9	~1995
151241099	302482199	9	~1995
151244399	302488799	9	~1995
151247711	302495423	9	~1995
151250851	6050034041	10	~1998
151251239	302502479	9	~1995
151258243	6352846207	10	~1998
151260427	1512604271	10	~1997
151271171	302542343	9	~1995
151272469	4538174071	10	~1998
151276457	907658743	9	~1996
151278991	1512789911	10	~1997
151285583	302571167	9	~1995
151291781	907750687	9	~1996
151292279	302584559	9	~1995
151294499	302588999	9	~1995
151298363	302596727	9	~1995
151299959	302599919	9	~1995
151301543	302603087	9	~1995
151315331	302630663	9	~1995
151317431	302634863	9	~1995
151317923	302635847	9	~1995

Exponent	Prime Factor	Digits	Year
151318463	302636927	9	~1995
151318571	1210548569	10	~1996
151319621	907917727	9	~1996
151320557	1210564457	10	~1996
151324451	302648903	9	~1995
151325513	2118557183	10	~1997
151326359	302652719	9	~1995
151328783	302657567	9	~1995
151328999	2723921983	10	~1997
151334483	302668967	9	~1995
151340459	302680919	9	~1995
151352219	302704439	9	~1995
151354163	302708327	9	~1995
151354319	302708639	9	~1995
151356371	302712743	9	~1995
151359781	908158687	9	~1996
151365743	302731487	9	~1995
151369199	302738399	9	~1995
151370591	302741183	9	~1995
151371263	302742527	9	~1995
151376171	302752343	9	~1995
151376843	302753687	9	~1995
151377263	302754527	9	~1995
151378481	908270887	9	~1996
151379933	908279599	9	~1996

Exponent	Prime Factor	Digits	Year
151383899	302767799	9	~1995
151383959	302767919	9	~1995
151387199	302774399	9	~1995
151390931	302781863	9	~1995
151394063	302788127	9	~1995
151403471	302806943	9	~1995
151403521	908421127	9	~1996
151411451	302822903	9	~1995
151417697	1211341577	10	~1996
151421981	908531887	9	~1996
151422353	908534119	9	~1996
151424579	302849159	9	~1995
151431403	6360118927	10	~1998
151433003	302866007	9	~1995
151433291	2725799239	10	~1997
151433531	302867063	9	~1995
151435103	302870207	9	~1995
151436513	2120111183	10	~1997
151445711	302891423	9	~1995
151449131	302898263	9	~1995
151450049	1211600393	10	~1996
151451737	908710423	9	~1996
151452683	302905367	9	~1995
151452737	1211621897	10	~1996
151453657	908721943	9	~1996

Exponent	Prime Factor	Digits	Year
151457651	302915303	9	~1995
151457903	302915807	9	~1995
151465799	302931599	9	~1995
151475843	302951687	9	~1995
151478779	24236604641	11	~2000
151483511	302967023	9	~1995
151483823	302967647	9	~1995
151488979	6362537119	10	~1998
151489571	302979143	9	~1995
151492163	302984327	9	~1995
151499849	1211998793	10	~1996
151508087	1212064697	10	~1996
151510717	27877971929	11	~2000
151519859	303039719	9	~1995
151520189	1212161513	10	~1996
151521151	2424338417	10	~1997
151523093	4848738977	10	~1998
151523641	909141847	9	~1996
151534391	303068783	9	~1995
151541759	303083519	9	~1995
151546331	303092663	9	~1995
151548191	1212385529	10	~1996
151553771	303107543	9	~1995
151556183	303112367	9	~1995
151560371	303120743	9	~1995

5.157.210 digits

25-11-02