Small Mersenne Prime Factors (page 3752/5145)

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
1751613179	3503226359	10	~2003
1751791403	3503582807	10	~2003
1751928911	3503857823	10	~2003
1751971691	3503943383	10	~2003
1752000053	10512000319	11	~2004
1752104129	24529457807	11	~2005
1752117791	3504235583	10	~2003
1752131159	3504262319	10	~2003
1752141119	3504282239	10	~2003
1752152819	3504305639	10	~2003
1752227579	3504455159	10	~2003
1752249133	28035986129	11	~2005
1752322499	3504644999	10	~2003
1752379199	3504758399	10	~2003
1752412223	3504824447	10	~2003
1752419113	10514514679	11	~2004
1752461723	3504923447	10	~2003
1752587423	3505174847	10	~2003
1752662519	3505325039	10	~2003
1752772019	3505544039	10	~2003
1752816917	10516901503	11	~2004
1752880427	14023043417	11	~2005
1752934919	3505869839	10	~2003
1753083803	3506167607	10	~2003
1753144691	3506289383	10	~2003

Exponent	Prime Factor	Digits	Year
1753164683	3506329367	10	~2003
1753259639	3506519279	10	~2003
1753274297	10519645783	11	~2004
1753293299	3506586599	10	~2003
1753304669	14026437353	11	~2005
1753328579	3506657159	10	~2003
1753371419	3506742839	10	~2003
1753419971	3506839943	10	~2003
1753435877	10520615263	11	~2004
1753437901	10520627407	11	~2004
1753468877	24548564279	11	~2005
1753476299	3506952599	10	~2003
1753487357	10520924143	11	~2004
1753530371	3507060743	10	~2003
1753548119	3507096239	10	~2003
1753548661	10521291967	11	~2004
1753580303	3507160607	10	~2003
1753588883	3507177767	10	~2003
1753700219	14029601753	11	~2005
1753735559	3507471119	10	~2003
1753785023	3507570047	10	~2003
1753787221	10522723327	11	~2004
1753806227	14030449817	11	~2005
1753834601	52615038031	11	~2006
1754032733	42096785593	11	~2006

Exponent	Prime Factor	Digits	Year
1754038283	3508076567	10	~2003
1754045339	3508090679	10	~2003
1754111423	3508222847	10	~2003
1754160817	10524964903	11	~2004
1754166971	3508333943	10	~2003
1754227379	3508454759	10	~2003
1754309737	10525858423	11	~2004
1754386103	3508772207	10	~2003
1754392043	3508784087	10	~2003
1754402899	42105669577	11	~2006
1754405911	31579306399	11	~2006
1754481319	17544813191	11	~2005
1754494733	10526968399	11	~2004
1754534003	3509068007	10	~2003
1754537177	14036297417	11	~2005
1754544941	14036359529	11	~2005
1754551457	52636543711	11	~2006
1754570401	10527422407	11	~2004
1754589719	3509179439	10	~2003
1754611571	3509223143	10	~2003
1754656703	3509313407	10	~2003
1754663411	3509326823	10	~2003
1754683871	14037470969	11	~2005
1754742851	3509485703	10	~2003
1754760071	3509520143	10	~2003

Exponent	Prime Factor	Digits	Year
1754763539	3509527079	10	~2003
1754781659	3509563319	10	~2003
1754832671	3509665343	10	~2003
1754864467	17548644671	11	~2005
1754874809	14038998473	11	~2005
1754923883	3509847767	10	~2003
1755042431	3510084863	10	~2003
1755088259	3510176519	10	~2003
1755134939	3510269879	10	~2003
1755159803	3510319607	10	~2003
1755165803	3510331607	10	~2003
1755180857	24572531999	11	~2005
1755194281	28083108497	11	~2005
1755201101	10531206607	11	~2004
1755264323	3510528647	10	~2003
1755341299	17553412991	11	~2005
1755367039	101811288263	12	~2007
1755404219	3510808439	10	~2003
1755428399	3510856799	10	~2003
1755510479	3511020959	10	~2003
1755511151	3511022303	10	~2003
1755536381	108843255623	12	~2007
1755547259	3511094519	10	~2003
1755621137	14044969097	11	~2005
1755670379	3511340759	10	~2003

4.843.404 digits

25-06-08