Small Mersenne Prime Factors (page 4412/5070)

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	Dig.	Year
15821843423	31643686847	11	~2011
15822757481	94936544887	11	~2012
15823634999	31647269999	11	~2011
15823910939	31647821879	11	~2011
15825036881	94950221287	11	~2012
15825709811	31651419623	11	~2011
15825750013	379818000313	12	~2013
15825931867	1519...592321	14	2023
15826057613	1063...715937	14	2023
15826873589	221576230247	12	~2013
15826902493	94961414959	11	~2012
15826910081	94961460487	11	~2012
15827154911	31654309823	11	~2011
15827732699	31655465399	11	~2011
15831504749	221641066487	12	~2013
15832461719	31664923439	11	~2011
15833337743	31666675487	11	~2011
15833433283	158334332831	12	~2012
15835773731	31671547463	11	~2011
15836837123	31673674247	11	~2011
15837056093	95022336559	11	~2012
15840427931	31680855863	11	~2011
15841412117	95048472703	11	~2012
15841507739	31683015479	11	~2011
15841983097	95051898583	11	~2012

Exponent	Prime Factor	Dig.	Year
15842083391	31684166783	11	~2011
15842444591	31684889183	11	~2011
15842999591	31685999183	11	~2011
15844794071	126758352569	12	~2012
15846269909	126770159273	12	~2012
15846394757	95078368543	11	~2012
15846883499	31693766999	11	~2011
15846933419	31693866839	11	~2011
15847462517	95084775103	11	~2012
15848804681	95092828087	11	~2012
15849875711	31699751423	11	~2011
15849916991	31699833983	11	~2011
15851302471	285323444479	12	~2013
15851779379	31703558759	11	~2011
15852776279	31705552559	11	~2011
15853891967	126831135737	12	~2012
15854300233	95125801399	11	~2012
15854510123	31709020247	11	~2011
15855399971	31710799943	11	~2011
15855858671	31711717343	11	~2011
15855920237	95135521423	11	~2012
15856367291	31712734583	11	~2011
15857171873	95143031239	11	~2012
15858010331	31716020663	11	~2011
15858034211	126864273689	12	~2012

Exponent	Prime Factor	Dig.	Year
15858348911	31716697823	11	~2011
15858559001	126868472009	12	~2012
15859440983	31718881967	11	~2011
15859754369	126878034953	12	~2012
15859829429	222037612007	12	~2013
15859863611	31719727223	11	~2011
15862512551	31725025103	11	~2011
15862574159	31725148319	11	~2011
15862836293	95177017759	11	~2012
15863509243	158635092431	12	~2012
15863580071	126908640569	12	~2012
15863593859	31727187719	11	~2011
15863684519	31727369039	11	~2011
15863865659	31727731319	11	~2011
15864536483	31729072967	11	~2011
15865057919	31730115839	11	~2011
15865409977	95192459863	11	~2012
15865911923	31731823847	11	~2011
15866404987	158664049871	12	~2012
15866659057	475999771711	12	~2014
15866950139	31733900279	11	~2011
15867439463	31734878927	11	~2011
15867681503	31735363007	11	~2011
15868236179	31736472359	11	~2011
15868647323	31737294647	11	~2011

Exponent	Prime Factor	Dig.	Year
15869244827	126953958617	12	~2012
15869685959	31739371919	11	~2011
15871085099	31742170199	11	~2011
15871425263	31742850527	11	~2011
15871716023	31743432047	11	~2011
15872228969	126977831753	12	~2012
15872413379	31744826759	11	~2011
15872807243	31745614487	11	~2011
15872833451	31745666903	11	~2011
15873373643	31746747287	11	~2011
15874454639	31748909279	11	~2011
15874563737	126996509897	12	~2012
15875577461	127004619689	12	~2012
15876687119	31753374239	11	~2011
15877218011	31754436023	11	~2011
15877567691	31755135383	11	~2011
15878155151	31756310303	11	~2011
15878224163	31756448327	11	~2011
15879080879	31758161759	11	~2011
15879994379	31759988759	11	~2011
15881217899	508198972769	12	~2014
15881657279	31763314559	11	~2011
15881694929	127053559433	12	~2012
15881797697	127054381577	12	~2012
15882769499	31765538999	11	~2011

4.768.925 digits

25-05-04