Small Mersenne Prime Factors (page 3681/5070)

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	Digits	Year
1643983837	26303741393	11	~2005
1644132323	3288264647	10	~2003
1644147611	3288295223	10	~2003
1644159563	3288319127	10	~2003
1644219911	3288439823	10	~2003
1644258191	3288516383	10	~2003
1644278633	9865671799	10	~2004
1644355679	3288711359	10	~2003
1644464083	16444640831	11	~2005
1644474113	9866844679	10	~2004
1644536819	3289073639	10	~2003
1644552857	13156422857	11	~2004
1644562763	3289125527	10	~2003
1644604733	9867628399	10	~2004
1644628633	9867771799	10	~2004
1644892021	9869352127	10	~2004
1644926771	3289853543	10	~2003
1644927059	3289854119	10	~2003
1644938303	3289876607	10	~2003
1644939011	3289878023	10	~2003
1644962603	3289925207	10	~2003
1645016179	29610291223	11	~2005
1645055603	3290111207	10	~2003
1645157939	3290315879	10	~2003
1645202411	3290404823	10	~2003

Exponent	Prime Factor	Digits	Year
1645210559	3290421119	10	~2003
1645279451	3290558903	10	~2003
1645309271	3290618543	10	~2003
1645316663	3290633327	10	~2003
1645323269	13162586153	11	~2004
1645347833	9872086999	10	~2004
1645433423	3290866847	10	~2003
1645445423	3290890847	10	~2003
1645490243	3290980487	10	~2003
1645517123	3291034247	10	~2003
1645527881	13164223049	11	~2004
1645564439	3291128879	10	~2003
1645568063	3291136127	10	~2003
1645586963	3291173927	10	~2003
1645647611	3291295223	10	~2003
1645681571	3291363143	10	~2003
1645704059	3291408119	10	~2003
1645707527	29622735487	11	~2005
1645739143	148116522871	12	~2007
1645765739	3291531479	10	~2003
1645803083	3291606167	10	~2003
1645818899	3291637799	10	~2003
1645819859	3291639719	10	~2003
1645842371	3291684743	10	~2003
1645845023	3291690047	10	~2003

Exponent	Prime Factor	Digits	Year
1645928639	3291857279	10	~2003
1645929899	3291859799	10	~2003
1645951259	3291902519	10	~2003
1645973663	3291947327	10	~2003
1646051293	9876307759	10	~2004
1646087831	13168702649	11	~2004
1646130727	29630353087	11	~2005
1646157143	3292314287	10	~2003
1646303843	3292607687	10	~2003
1646418071	3292836143	10	~2003
1646455873	9878735239	10	~2004
1646457431	42807893207	11	~2006
1646477597	13171820777	11	~2004
1646487611	3292975223	10	~2003
1646661899	3293323799	10	~2003
1646689931	3293379863	10	~2003
1646748599	3293497199	10	~2003
1646790239	13174321913	11	~2004
1646908037	9881448223	10	~2004
1646953751	3293907503	10	~2003
1646955239	3293910479	10	~2003
1646978899	16469788991	11	~2005
1647066419	3294132839	10	~2003
1647159497	49414784911	11	~2006
1647185483	3294370967	10	~2003

Exponent	Prime Factor	Digits	Year
1647225851	3294451703	10	~2003
1647248803	56006459303	11	~2006
1647295619	3294591239	10	~2003
1647343679	3294687359	10	~2003
1647380081	9884280487	10	~2004
1647416651	3294833303	10	~2003
1647426779	3294853559	10	~2003
1647451931	3294903863	10	~2003
1647602219	3295204439	10	~2003
1647708947	13181671577	11	~2004
1647743491	29659382839	11	~2005
1647744491	3295488983	10	~2003
1647781823	3295563647	10	~2003
1647802463	3295604927	10	~2003
1647811369	36251850119	11	~2006
1647861191	3295722383	10	~2003
1647862873	9887177239	10	~2004
1647900179	3295800359	10	~2003
1647902077	9887412463	10	~2004
1647992471	3295984943	10	~2003
1648004951	3296009903	10	~2003
1648006091	3296012183	10	~2003
1648030739	3296061479	10	~2003
1648183297	9889099783	10	~2004
1648191653	39556599673	11	~2006

4.768.925 digits

25-05-04