20121105, 12:52  #12  
Apr 2012
993438: i1090
2×73 Posts 
Quote:
Link to the 1379 theorem: http://www.lesmathematiques.net/phorum/file.php?4,file=25534,filename=The_SOW_Theorem_1379.pdf 

20121105, 23:05  #13 
Nov 2012
E_{16} Posts 
Sow Theorem 1379 + Prime List
Dear friends,
Sorry to be late... Please find in the attachment file or the link above the SOW theorem 1379 and the update list prime numbers (12+1). Thank you in advance for your kind attention. Feel free to publish the list. http://www.onezero.eu/resources/The...eorem+1379.pdf Thank you so much Arxenar **** The SOW Theorem 1379 : After 11, all prime numbers s hall be ended by 1 or 3 or 7 or 9. Foreword The perfect series can be find between 11131719. However all numbers ended by 1 or 3 or 7 or 9 are not a prime numbers. We conclude that just numbers ended by 1 or 3 or 7 or 9 are necessary for computers and software’s prime test. The probability (nP) with (p=4) must be applicate between for example (10, 20) follow to the formula (n – 10, + 1). The official List of Thierno M. SOW Prime Numbers (12+1) P 58426759 67878511 73278467 92365877 840354041 840354259 1450177357 1450555021 1595921027 1674567637 2022200491 19008384119 37171516639 Last fiddled with by akruppa on 20121106 at 09:48 Reason: Link removed 
20121106, 07:06  #14 
"Åke Tilander"
Apr 2011
Sandviken, Sweden
2×283 Posts 
Well I don't really understand what's special with these prime numbers? Do they have a special form which I don't see through? Or are they just your special prime numbers of choice?
Last fiddled with by aketilander on 20121106 at 07:32 
20121106, 08:03  #15 
"Vincent"
Apr 2010
Over the rainbow
2685_{10} Posts 
From what I gathered, it suggest that M (number) is supposed to be prime
M58426759 M67878511 etc... 
20121106, 09:04  #16  
Feb 2012
Prague, Czech Republ
B9_{16} Posts 
Quote:
Congratulations, you are right ;) j PS: You can even "extend" your "theorem" to p > 5 

20121106, 17:13  #17  
"Åke Tilander"
Apr 2011
Sandviken, Sweden
566_{10} Posts 
Quote:
M58426759 Factored 7740026471767 M73278467 Factored 465611379319 M840354041 Factored 536145878159, 8906072126519 M1674567637 Factored 7391541549719 Last fiddled with by aketilander on 20121106 at 17:14 

20121106, 20:52  #18 
Sep 2011
2^{2}·23 Posts 
To summarize:
58426759 (factored) 67878511 (no factor below 2^71) 73278467 (factored) 92365877 (no factor below 2^68) 840354041 (factored) 840354259 (no factor below 2^72) 1450177357 (no factor below 2^63) 1450555021 (no factor below 2^63) 1595921027 (no factor below 2^63) 1674567637 (factored) 2022200491 (no factor below 2^63) 19008384119 (factored) 37171516639 (factored) M19008384119 has a factor: 38016768239 (35.1 bits, k=1) M37171516639 has a factor: 21756934747006369 (54.3 bits, k=292656 = 2^4 · 3 · 7 · 13 · 67) M37171516639 has a factor: 3048064364399 (41.5 bits, k=41) (factored by Factor5 v.5.01) Last fiddled with by dabaichi on 20121106 at 21:31 
20121108, 15:30  #19 
Nov 2012
2×7 Posts 
The Evidence is Mathematic
Greetings
I appreciate your thoughtfulness. Thank you for caring. Its brilliant, above all for the factors. Please find here the latest recorded prime numbers. Arx M 397684333 409675417 412536893 424873441 430311241 447830891 452457233 507061627 377931977 8657012671 8677273573 8683046279 8957649431 9023222179 9306204751 9431067469 9833788021 9940250029 4271474747 11200589831 13002760601 104691786799 
20121108, 15:51  #20 
"Vincent"
Apr 2010
Over the rainbow
2685_{10} Posts 
I see that the few one that are not factored got taken y you for LL. Bad move, since a afctor could be found very quickly

20121108, 20:59  #21 
Sep 2011
134_{8} Posts 
Once again:
397684333 (no factor below 2^65) 409675417 (factored) 412536893 (factored) 424873441 (factored) 430311241 (factored) 447830891 (factored) 452457233 (factored) 507061627 (factored) 377931977 (no factor below 2^73) 8657012671 (factored) 8677273573 (no factor below 2^65) 8683046279 (no factor below 2^65) 8957649431 (factored) 9023222179 (factored) 9306204751 (factored) 9431067469 (no factor below 2^65) 9833788021 (no factor below 2^65) 9940250029 (factored) 4271474747 (no factor below 2^66) 11200589831 (factored) 13002760601 (no factor below 2^65) 104691786799 (factored) M8657012671 has a factor: 323010456780353 M8957649431 has a factor: 103568342721223 M8957649431 has a factor: 2866447817921 M9023222179 has a factor: 90232221791 (k=5) M9306204751 has a factor: 13739680694376401 M9306204751 has a factor: 1042294932113 M9940250029 has a factor: 1726740713037649 M9940250029 has a factor: 9542640027841 M11200589831 has a factor: 17262976280567737 M104691786799 has a factor: 965084276537120063 Last fiddled with by dabaichi on 20121108 at 21:48 
20121109, 14:41  #22 
Nov 2012
E_{16} Posts 

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