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Small Mersenne Prime Factors
Prime numbers of the form Mp= 2p − 1 are called Mersenne primes. For Mp to be prime, p must also be prime.
Any factor q of a Mersenne number 2p − 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
9619442890776955543125712 ~2018
9619520891919239041783912 ~2017
9619692073119239384146312 ~2017
9620287757919240575515912 ~2017
9622734196157736405176712 ~2018
9622934623119245869246312 ~2017
9623393905119246787810312 ~2017
9623750617119247501234312 ~2017
9623909947757743459686312 ~2018
9623912269119247824538312 ~2017
9623996632157743979792712 ~2018
9624009014319248018028712 ~2017
9625188703777001509629712 ~2018
9625751035119251502070312 ~2017
9627513374319255026748712 ~2017
9627765665919255531331912 ~2017
9628645597757771873586312 ~2018
9629046391119258092782312 ~2017
9629654000319259308000712 ~2017
9630055016319260110032712 ~2017
9630115681119260231362312 ~2017
9630428788157782572728712 ~2018
9630741322777045930581712 ~2018
9630881424157785288544712 ~2018
9631018982319262037964712 ~2017
Exponent Prime Factor Dig. Year
9631250263119262500526312 ~2017
9631365650319262731300712 ~2017
9631615537119263231074312 ~2017
9632218661357793311967912 ~2018
9632271245919264542491912 ~2017
9632398436319264796872712 ~2017
9632690155119265380310312 ~2017
9633622622319267245244712 ~2017
9634128312157804769872712 ~2018
9634380491919268760983912 ~2017
9634450376319268900752712 ~2017
9634727615357808365691912 ~2018
9635269652319270539304712 ~2017
9636988784319273977568712 ~2017
9637144807177097158456912 ~2018
9637197547119274395094312 ~2017
9637704811357826228867912 ~2018
9638322106177106576848912 ~2018
9638620526319277241052712 ~2017
963943208572833...33195914 2024
9639536693977116293551312 ~2018
9640132034319280264068712 ~2017
9640967975357845807851912 ~2018
9642386567357854319403912 ~2018
9643879919919287759839912 ~2017
Exponent Prime Factor Dig. Year
9644078495919288156991912 ~2017
9644341400319288682800712 ~2017
9644534609919289069219912 ~2017
9646606235919293212471912 ~2017
9646961591919293923183912 ~2017
9647771281757886627690312 ~2018
9648217087119296434174312 ~2017
9648350071757890100430312 ~2018
9648474176319296948352712 ~2017
9648543224319297086448712 ~2017
9648614390977188915127312 ~2018
9648716055757892296334312 ~2018
9649033246157894199476712 ~2018
9649154792319298309584712 ~2017
9649235351919298470703912 ~2017
9649393213119298786426312 ~2017
9649417519119298835038312 ~2017
9649564153119299128306312 ~2017
9650438890777203511125712 ~2018
9650909311119301818622312 ~2017
9651718517357910311103912 ~2018
9651754699119303509398312 ~2017
9652148875119304297750312 ~2017
9652767926319305535852712 ~2017
9654395155119308790310312 ~2017
Exponent Prime Factor Dig. Year
9655464569919310929139912 ~2017
9655943891919311887783912 ~2017
9656276162319312552324712 ~2017
9656508623919313017247912 ~2017
9657238913919314477827912 ~2017
9657291590977258332727312 ~2018
9657360739357944164435912 ~2018
9657870391119315740782312 ~2017
9659641387119319282774312 ~2017
9659816624319319633248712 ~2017
9660232655919320465311912 ~2017
9661202525919322405051912 ~2017
966135662335468...48787914 2025
9661494773919322989547912 ~2017
9661765027119323530054312 ~2017
9662097161919324194323912 ~2017
9662254726177298037808912 ~2018
9662678537919325357075912 ~2017
9663613069119327226138312 ~2017
9665015773119330031546312 ~2017
9665426948319330853896712 ~2017
9665475380319330950760712 ~2017
9665704747119331409494312 ~2017
9665995829919331991659912 ~2017
9666245024319332490048712 ~2017
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26-07-05