Small Mersenne Prime Factors (page 4928/4980)

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
268582933103	537165866207	12	~2020
268589692691	537179385383	12	~2020
268598775023	537197550047	12	~2020
268614996959	537229993919	12	~2020
268619824859	537239649719	12	~2020
268625911259	537251822519	12	~2020
268646738543	537293477087	12	~2020
268654969031	537309938063	12	~2020
268669060553	1692...148391	15	2023
268675120211	537350240423	12	~2020
268706844071	537413688143	12	~2020
268727818199	1488...282247	15	2023
268737511799	537475023599	12	~2020
268739276207	1762...191793	15	2024
268744485011	537488970023	12	~2020
268798728179	537597456359	12	~2020
268815253391	537630506783	12	~2020
268830650531	537661301063	12	~2020
268832286659	537664573319	12	~2020
268842281111	1935...239993	14	2024
268858342859	537716685719	12	~2020
268898819219	537797638439	12	~2020
268906636451	537813272903	12	~2020
268931296451	537862592903	12	~2020
268946120711	537892241423	12	~2020

Exponent	Prime Factor	Dig.	Year
268963107191	537926214383	12	~2020
268970396099	537940792199	12	~2020
269014935419	538029870839	12	~2020
269015851283	538031702567	12	~2020
269042393783	538084787567	12	~2020
269049559931	538099119863	12	~2020
269072660039	538145320079	12	~2020
269153912591	538307825183	12	~2020
269194613843	538389227687	12	~2020
269235066491	538470132983	12	~2020
269240661383	538481322767	12	~2020
269241760811	538483521623	12	~2020
269260263631	1254...852047	15	2025
269262142823	538524285647	12	~2020
269264800643	538529601287	12	~2020
269269224131	538538448263	12	~2020
269276360579	3559...685439	15	2023
269276770991	538553541983	12	~2020
269281617791	538563235583	12	~2020
269287365323	538574730647	12	~2020
269363541143	6033...216033	14	2023
269406347159	538812694319	12	~2020
269429239811	538858479623	12	~2020
269435071343	4742...556369	14	2024
269440688459	538881376919	12	~2020

Exponent	Prime Factor	Dig.	Year
269442806183	538885612367	12	~2020
269466637703	538933275407	12	~2020
269469435611	538938871223	12	~2020
269483878523	538967757047	12	~2020
269487996311	538975992623	12	~2020
269493851579	538987703159	12	~2020
269494854743	538989709487	12	~2020
269517543203	539035086407	12	~2020
269555001263	539110002527	12	~2020
269557006601	4259...042959	14	2023
269564538359	539129076719	12	~2020
269577901559	539155803119	12	~2020
269590305599	539180611199	12	~2020
269623961303	539247922607	12	~2020
269654286371	539308572743	12	~2020
269680227779	539360455559	12	~2020
269687228339	539374456679	12	~2020
269691233771	539382467543	12	~2020
269710539863	539421079727	12	~2020
269740166651	3690...978569	15	2023
269752652231	539505304463	12	~2020
269763373619	539526747239	12	~2020
269768724383	539537448767	12	~2020
269770117763	539540235527	12	~2020
269787766091	539575532183	12	~2020

Exponent	Prime Factor	Dig.	Year
269798748383	1624...526567	15	2025
269798986343	539597972687	12	~2020
269809987319	539619974639	12	~2020
269810204243	539620408487	12	~2020
269813685359	539627370719	12	~2020
269869248479	539738496959	12	~2020
269905928339	539811856679	12	~2020
269926996511	539853993023	12	~2020
269942118311	539884236623	12	~2020
269981763539	539963527079	12	~2020
270005131271	540010262543	12	~2020
270065755703	540131511407	12	~2020
270066773351	540133546703	12	~2020
270081448859	540162897719	12	~2020
270109029023	540218058047	12	~2020
270144225203	540288450407	12	~2020
270157990463	540315980927	12	~2020
270174056891	540348113783	12	~2020
270184449443	540368898887	12	~2020
270207971219	540415942439	12	~2020
270211398239	540422796479	12	~2020
270212017391	540424034783	12	~2020
270221054171	540442108343	12	~2020
270286437419	540572874839	12	~2020
270326515139	540653030279	12	~2020

4.679.597 digits

25-03-23