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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
15148143680330296287360712 ~2018
15148344211130296688422312 ~2018
15148840592330297681184712 ~2018
15149134940330298269880712 ~2018
1514941021133201...05614316 2025
1514987604193060...60463914 2024
15150202195390901213171912 ~2020
15150527491130301054982312 ~2018
15153211943930306423887912 ~2018
15153862099130307724198312 ~2018
15154142972330308285944712 ~2018
15154274017130308548034312 ~2018
15154667385790928004314312 ~2020
15155161453130310322906312 ~2018
15156147443930312294887912 ~2018
15156784559390940707355912 ~2020
15157109309930314218619912 ~2018
15157482019390944892115912 ~2020
15157799483930315598967912 ~2018
15158031353930316062707912 ~2018
15158187153790949122922312 ~2020
15158530367930317060735912 ~2018
15159142471130318284942312 ~2018
1515969427939459...30283314 2024
15161968315790971809894312 ~2020
Exponent Prime Factor Dig. Year
15162918017930325836035912 ~2018
15163509329930327018659912 ~2018
15163853981390983123887912 ~2020
15164710379930329420759912 ~2018
15165532280330331064560712 ~2018
15165697016330331394032712 ~2018
15166342808330332685616712 ~2018
15166437164330332874328712 ~2018
15166742909930333485819912 ~2018
15166989877130333979754312 ~2018
15168045824330336091648712 ~2018
15169639088330339278176712 ~2018
15171161237391026967423912 ~2020
15171565118330343130236712 ~2018
15172354421391034126527912 ~2020
15172801484330345602968712 ~2018
15172920097130345840194312 ~2018
15173856493130347712986312 ~2018
15174045884330348091768712 ~2018
15174048659391044291955912 ~2020
15174222626330348445252712 ~2018
15175385989130350771978312 ~2018
15175948339130351896678312 ~2018
15176137126191056822756712 ~2020
15179691389930359382779912 ~2018
Exponent Prime Factor Dig. Year
15181648195130363296390312 ~2018
15182243450330364486900712 ~2018
15182942405391097654431912 ~2020
15183635420330367270840712 ~2018
15184324874330368649748712 ~2018
15185153174330370306348712 ~2018
15185195879930370391759912 ~2018
15186372655130372745310312 ~2018
15187889558330375779116712 ~2018
15187939910330375879820712 ~2018
15189459181130378918362312 ~2018
15189720617930379441235912 ~2018
15190175713130380351426312 ~2018
1519145597331102...36615915 2025
15191685986330383371972712 ~2018
15192121079930384242159912 ~2018
15194312641130388625282312 ~2018
15197073596330394147192712 ~2018
15197517223130395034446312 ~2018
15198025013930396050027912 ~2018
15198081131930396162263912 ~2018
15198318323930396636647912 ~2018
15198401108330396802216712 ~2018
15198414921791190489530312 ~2020
15199211777930398423555912 ~2018
Exponent Prime Factor Dig. Year
15199685089130399370178312 ~2018
15200437556330400875112712 ~2018
1520062285937904...86836114 2025
15201737731130403475462312 ~2018
15202091717930404183435912 ~2018
15202243685930404487371912 ~2018
1520277946438148...92864914 2023
15202848179930405696359912 ~2018
15204329522330408659044712 ~2018
15205619479130411238958312 ~2018
15206505476330413010952712 ~2018
15206662703930413325407912 ~2018
15207357605930414715211912 ~2018
15207880309130415760618312 ~2018
15208880225930417760451912 ~2018
15209406475130418812950312 ~2018
15209420203130418840406312 ~2018
15211857914330423715828712 ~2018
15212695033130425390066312 ~2018
15212789773130425579546312 ~2018
15213074678330426149356712 ~2018
15213321734330426643468712 ~2018
15213530849930427061699912 ~2018
15213742343930427484687912 ~2018
15213791546330427583092712 ~2018
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26-07-05