Small Mersenne Prime Factors (page 3230/5460)

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
354796831	3547968311	10	~1999
354797711	709595423	9	~1998
354806411	709612823	9	~1998
354808763	709617527	9	~1998
354813083	709626167	9	~1998
354829171	6386925079	10	~2000
354834071	709668143	9	~1998
354840971	709681943	9	~1998
354851603	709703207	9	~1998
354876311	709752623	9	~1998
354876793	2129260759	10	~1999
354891811	6388052599	10	~2000
354892961	2129357767	10	~1999
354905401	2129432407	10	~1999
354917803	5678684849	10	~2000
354924539	709849079	9	~1998
354925097	2129550583	10	~1999
354932951	709865903	9	~1998
354935279	709870559	9	~1998
354941231	709882463	9	~1998
354942799	8518627177	10	~2000
354944363	709888727	9	~1998
354946079	709892159	9	~1998
354949513	2129697079	10	~1999
354951911	709903823	9	~1998

Exponent	Prime Factor	Digits	Year
354951983	709903967	9	~1998
354955439	709910879	9	~1998
354966299	709932599	9	~1998
354967031	709934063	9	~1998
354983459	2839867673	10	~1999
354985283	709970567	9	~1998
355018949	2840151593	10	~1999
355020311	710040623	9	~1998
355023131	710046263	9	~1998
355024259	710048519	9	~1998
355028939	710057879	9	~1998
355045079	710090159	9	~1998
355046831	710093663	9	~1998
355052699	710105399	9	~1998
355059281	13492252679	11	~2001
355091879	710183759	9	~1998
355107491	710214983	9	~1998
355108297	2130649783	10	~1999
355108343	710216687	9	~1998
355112123	710224247	9	~1998
355115219	710230439	9	~1998
355123597	2130741583	10	~1999
355137983	710275967	9	~1998
355141043	710282087	9	~1998
355147139	710294279	9	~1998

Exponent	Prime Factor	Digits	Year
355148483	710296967	9	~1998
355156937	4972197119	10	~2000
355157039	710314079	9	~1998
355157879	710315759	9	~1998
355160759	710321519	9	~1998
355165823	710331647	9	~1998
355168091	710336183	9	~1998
355177499	710354999	9	~1998
355180691	710361383	9	~1998
355199843	710399687	9	~1998
355201943	710403887	9	~1998
355212743	710425487	9	~1998
355220543	710441087	9	~1998
355225151	710450303	9	~1998
355232771	710465543	9	~1998
355234679	710469359	9	~1998
355247939	710495879	9	~1998
355251191	710502383	9	~1998
355260683	710521367	9	~1998
355263563	710527127	9	~1998
355274251	3552742511	10	~1999
355292471	710584943	9	~1998
355294739	710589479	9	~1998
355295939	710591879	9	~1998
355297427	2842379417	10	~1999

Exponent	Prime Factor	Digits	Year
355308119	710616239	9	~1998
355313603	710627207	9	~1998
355320599	710641199	9	~1998
355327589	2842620713	10	~1999
355330333	10659909991	11	~2001
355335481	2132012887	10	~1999
355338719	710677439	9	~1998
355358819	710717639	9	~1998
355373947	3553739471	10	~1999
355380611	710761223	9	~1998
355392203	710784407	9	~1998
355416863	710833727	9	~1998
355460219	710920439	9	~1998
355460459	2843683673	10	~1999
355463291	710926583	9	~1998
355473661	2132841967	10	~1999
355485023	710970047	9	~1998
355493291	710986583	9	~1998
355511699	711023399	9	~1998
355520339	711040679	9	~1998
355520519	711041039	9	~1998
355541603	711083207	9	~1998
355554959	2844439673	10	~1999
355577591	711155183	9	~1998
355594439	711188879	9	~1998

5.157.210 digits

25-11-02