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2010-05-14, 17:19
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#496 |
May 2008
Wilmington, DE
22·23·31 Posts |
More closet cleaning
R523 CK=132 Primes=40 Remain=2 R597 CK=116 Primes=54 Remain=1 1 algebraic factor R730 CK=171 Primes=112 Remain=1 R747 CK=120 Primes=54 Remain=4 1 algebraic factor R753 CK=144 Primes=64 Remain=4 1 algebraic factor Last fiddled with by MyDogBuster on 2010-05-14 at 17:23 |
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2010-05-16, 08:01
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#497 |
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May 2008
Wilmington, DE
22·23·31 Posts |
Reserving S596 and R798 as new to n=25K
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2010-05-16, 08:50
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#498 |
May 2009
Russia, Moscow
2,593 Posts |
Sierp base 666, CK=231.
Base proven. Edit: Gary, I have S369, S444 and S666 pages complete MDB Last fiddled with by MyDogBuster on 2010-05-17 at 00:33 |
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2010-05-16, 13:32
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#499 |
Mar 2010
Hampshire, UK
638 Posts |
2*869^49149+1 is prime!
Sierpinski base 869 conjecture proven. |
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2010-05-16, 23:31
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#500 | |
Jun 2008
Wollongong, .au
3·61 Posts |
Quote:
Okay, next strange thing (sorry sorry!) Having ran the new-bases-4.3 script to 2500, I have taken the pl_remain file to be the input for srsieve for the next step. First thing srsieve says is: Code:
WARNING: 1600*603^n-1 has algebraic factors. WARNING: 1600*603^n-1 has algebraic factors. WARNING: 5476*603^n-1 has algebraic factors. WARNING: 5476*603^n-1 has algebraic factors. |
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2010-05-17, 00:56
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#501 | |
"Mark"
Apr 2003
Between here and the
22×7×227 Posts |
Quote:
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2010-05-17, 01:43
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#502 | |
May 2007
Kansas; USA
2·41·127 Posts |
Quote:
Last fiddled with by gd_barnes on 2010-05-17 at 01:44 |
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2010-05-17, 01:52
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#503 | |
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May 2007
Kansas; USA
2·41·127 Posts |
Quote:
As an explanation: Because those 2 k's are perfect squares, the even n-values will always be composite due to algebraic factors but sr(x)sieve does not know to automatically remove them. It is because x^2-1 factors as (x-1)*(x+1). As a specific example here, when n is even as in 1600*603^(2n)-1, it factors to (40*603^n-1)*(40*603^n+1). Gary Last fiddled with by gd_barnes on 2010-05-17 at 05:18 |
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2010-05-17, 13:46
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#504 |
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May 2008
Wilmington, DE
B2416 Posts |
Reserving S529 and R696 and S696 as new to n=25K
Last fiddled with by MyDogBuster on 2010-05-19 at 08:03 Reason: Added S696 |
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2010-05-19, 07:57
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#505 |
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May 2007
Kansas; USA
2·41·127 Posts |
Per an Email from Mathew, he is at n=18.5K on R703. 24 k's are remaining. Continuing to n=25K.
Last fiddled with by gd_barnes on 2010-05-19 at 07:58 |
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2010-05-19, 16:04
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#506 |
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May 2008
Wilmington, DE
22×23×31 Posts |
Riesel 696
Riesel Base 696
Conjectured k = 288 Covering Set = 17, 41 Trivial Factors k == 1 mod 5(5) and k == 1 mod 39(139) Found Primes: 224k's - File emailed Remaining: 2k's - Tested to n=25K 152*696^n-1 225*696^n-1 k=169 proven composite by partial algebraic factors2 Trivial Factor Eliminations: 59k's Base Released |
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