Small Mersenne Prime Factors (page 2886/5460)

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
181586063	363172127	9	~1996
181598243	363196487	9	~1996
181601839	78451994449	11	~2001
181602023	363204047	9	~1996
181605563	363211127	9	~1996
181609321	5448279631	10	~1998
181610413	2905766609	10	~1998
181616063	363232127	9	~1996
181618631	363237263	9	~1996
181622069	4358929657	10	~1998
181627679	363255359	9	~1996
181627703	363255407	9	~1996
181636207	1816362071	10	~1997
181640219	363280439	9	~1996
181642319	363284639	9	~1996
181645397	1089872383	10	~1997
181647803	363295607	9	~1996
181649711	363299423	9	~1996
181650191	363300383	9	~1996
181654337	1089926023	10	~1997
181655471	363310943	9	~1996
181657559	363315119	9	~1996
181662913	1089977479	10	~1997
181664663	363329327	9	~1996
181668023	363336047	9	~1996

Exponent	Prime Factor	Digits	Year
181668419	363336839	9	~1996
181670759	363341519	9	~1996
181673039	363346079	9	~1996
181673879	363347759	9	~1996
181674491	4723536767	10	~1998
181678499	363356999	9	~1996
181681763	363363527	9	~1996
181686359	363372719	9	~1996
181692739	3270469303	10	~1998
181695809	1453566473	10	~1997
181709399	363418799	9	~1996
181711499	363422999	9	~1996
181711559	363423119	9	~1996
181712021	1453696169	10	~1997
181714597	5451437911	10	~1998
181716863	363433727	9	~1996
181718597	1090311583	10	~1997
181723699	7632395359	10	~1999
181723859	363447719	9	~1996
181735943	363471887	9	~1996
181738883	363477767	9	~1996
181741381	3998310383	10	~1998
181742111	363484223	9	~1996
181748233	1090489399	10	~1997
181754459	363508919	9	~1996

Exponent	Prime Factor	Digits	Year
181762979	363525959	9	~1996
181763359	4362320617	10	~1998
181763459	1454107673	10	~1997
181766687	1454133497	10	~1997
181768739	363537479	9	~1996
181769053	1090614319	10	~1997
181769099	363538199	9	~1996
181772543	363545087	9	~1996
181773743	363547487	9	~1996
181774519	1817745191	10	~1997
181774961	1090649767	10	~1997
181778171	363556343	9	~1996
181779601	1090677607	10	~1997
181779617	6907625447	10	~1999
181780213	1090681279	10	~1997
181787849	1454302793	10	~1997
181790381	37448818487	11	~2000
181799363	363598727	9	~1996
181800551	363601103	9	~1996
181803019	1818030191	10	~1997
181806479	363612959	9	~1996
181807799	363615599	9	~1996
181808747	1454469977	10	~1997
181809899	363619799	9	~1996
181822499	363644999	9	~1996

Exponent	Prime Factor	Digits	Year
181823197	1090939183	10	~1997
181825823	363651647	9	~1996
181826303	363652607	9	~1996
181826699	363653399	9	~1996
181830611	363661223	9	~1996
181830851	3272955319	10	~1998
181840331	363680663	9	~1996
181842527	3273165487	10	~1998
181842937	1091057623	10	~1997
181845431	363690863	9	~1996
181846991	363693983	9	~1996
181852871	363705743	9	~1996
181857023	363714047	9	~1996
181862003	363724007	9	~1996
181864451	363728903	9	~1996
181865459	363730919	9	~1996
181874723	363749447	9	~1996
181874887	4364997289	10	~1998
181876703	363753407	9	~1996
181880063	363760127	9	~1996
181886423	363772847	9	~1996
181887191	1455097529	10	~1997
181891403	363782807	9	~1996
181897559	363795119	9	~1996
181898603	363797207	9	~1996

5.157.210 digits

25-11-02