Small Mersenne Prime Factors (page 4279/5070)

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	Dig.	Year
9947106959	19894213919	11	~2009
9947188211	19894376423	11	~2009
9947193197	59683159183	11	~2010
9947901617	79583212937	11	~2011
9948726899	19897453799	11	~2009
9948845579	19897691159	11	~2009
9949750477	298492514311	12	~2012
9949962131	19899924263	11	~2009
9950277121	218906096663	12	~2012
9950613839	19901227679	11	~2009
9950996039	19901992079	11	~2009
9951152639	19902305279	11	~2009
9951175991	19902351983	11	~2009
9951669449	79613355593	11	~2011
9952076423	19904152847	11	~2009
9952327751	19904655503	11	~2009
9952372499	19904744999	11	~2009
9952487903	19904975807	11	~2009
9952633259	19905266519	11	~2009
9952841051	19905682103	11	~2009
9953097611	19906195223	11	~2009
9954492083	19908984167	11	~2009
9954842363	19909684727	11	~2009
9955748903	19911497807	11	~2009
9955772789	79646182313	11	~2011

Exponent	Prime Factor	Dig.	Year
9955856917	59735141503	11	~2010
9956318917	59737913503	11	~2010
9956365319	19912730639	11	~2009
9956367731	19912735463	11	~2009
9956665871	19913331743	11	~2009
9957070793	59742424759	11	~2010
9957972131	19915944263	11	~2009
9958907279	19917814559	11	~2009
9959331533	59755989199	11	~2010
9959739239	19919478479	11	~2009
9959848091	19919696183	11	~2009
9960164047	159362624753	12	~2011
9961049243	19922098487	11	~2009
9961683923	19923367847	11	~2009
9962793853	59776763119	11	~2010
9962813789	79702510313	11	~2011
9962950379	19925900759	11	~2009
9963497177	59780983063	11	~2010
9963504319	179343077743	12	~2011
9963567329	79708538633	11	~2011
9963855491	19927710983	11	~2009
9963921503	19927843007	11	~2009
9964254403	159428070449	12	~2011
9965002163	19930004327	11	~2009
9966111499	99661114991	11	~2011

Exponent	Prime Factor	Dig.	Year
9967863371	19935726743	11	~2009
9968584739	19937169479	11	~2009
9968603819	19937207639	11	~2009
9968941919	19937883839	11	~2009
9968962697	79751701577	11	~2011
9969196619	19938393239	11	~2009
9969290819	19938581639	11	~2009
9969477923	19938955847	11	~2009
9970565303	19941130607	11	~2009
9970769519	19941539039	11	~2009
9970912223	19941824447	11	~2009
9971477587	99714775871	11	~2011
9971599523	19943199047	11	~2009
9971978123	19943956247	11	~2009
9972462011	19944924023	11	~2009
9973152251	19946304503	11	~2009
9973739459	19947478919	11	~2009
9974259017	139639626239	12	~2011
9974407763	19948815527	11	~2009
9974460263	19948920527	11	~2009
9975171023	19950342047	11	~2009
9975316433	139654430063	12	~2011
9975320237	79802561897	11	~2011
9975576119	19951152239	11	~2009
9975649751	19951299503	11	~2009

Exponent	Prime Factor	Dig.	Year
9976485719	19952971439	11	~2009
9976577879	19953155759	11	~2009
9976599179	19953198359	11	~2009
9977153531	19954307063	11	~2009
9977327771	19954655543	11	~2009
9977410571	319277138273	12	~2012
9977638571	19955277143	11	~2009
9977828269	239467878457	12	~2012
9977951939	19955903879	11	~2009
9978591671	19957183343	11	~2009
9978799199	19957598399	11	~2009
9978968257	59873809543	11	~2010
9979030559	19958061119	11	~2009
9979692683	19959385367	11	~2009
9979791581	59878749487	11	~2010
9979797341	79838378729	11	~2011
9979845079	179637211423	12	~2011
9979899911	19959799823	11	~2009
9980160053	59880960319	11	~2010
9980377633	59882265799	11	~2010
9980624233	59883745399	11	~2010
9980738597	79845908777	11	~2011
9981405191	19962810383	11	~2009
9982085609	139749198527	12	~2011
9982876031	19965752063	11	~2009

4.768.925 digits

25-05-04