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2010-04-28, 20:14
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#122 |
Mar 2006
Germany
32×17×19 Posts |
A new Riesel-Base-5 prime was just verified: 45742*5^303011-1.
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2010-04-28, 21:45
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#123 | |
May 2007
Kansas; USA
101·103 Posts |
Quote:
The good part is that even though it's an odd exponent, since the k is low, it eliminates k*5 from Riesel base 25 with: 228710*25^151505-1 is prime 
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2010-04-28, 23:08
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#124 | |
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A Sunny Moo
Aug 2007
USA (GMT-5)
3×2,083 Posts |
Quote:
Also, I noticed that the prime was reported as found with "PRP" instead of "LLR"--presumably, then, the old LLRnet (and therefore LLR 3.5 which was still reasonably close enough to PRP's old code to be reported as that) was used instead of the new LLRnet or manual LLR, which would be reported with the "LLR" proof code. Considering the humongous speed penalty involved in using the older LLRnet for base 5, this is definitely quite a find. I'm surprised the person who found it hasn't upgraded yet. |
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2010-04-28, 23:12
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#125 | |
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Mar 2006
Germany
32×17×19 Posts |
Quote:
The Riesel-Base-5 Stats shows 'rover' under "PRP Stats" with last results for 2010-04-28, but no new prime found (on top: "Days since last prime: 624" and bottom-table with open k-values no prime, too). Last fiddled with by kar_bon on 2010-04-28 at 23:17 |
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2010-04-29, 18:52
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#126 |
Jan 2006
Hungary
4148 Posts |
Riesel base 36 prime
Tralala:
Primality testing 25679*36^98885-1 [N+1, Brillhart-Lehmer-Selfridge] Running N+1 test using discriminant 5, base 1+sqrt(5) 25679*36^98885-1 is prime! (8375.2145s+0.0123s) Submitted too, Willem. |
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2010-04-29, 22:02
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#127 | |
"Serge"
Mar 2008
Phi(4,2^7658614+1)/2
251016 Posts |
Quote:
15572*6^50383-1 is 3-PRP! (30.6225s+0.0014s) In other words 93432*36^25191-1 is 3-PRP! (30.6225s+0.0014s) ...maybe, I'll take some of these k's... Last fiddled with by Batalov on 2010-04-29 at 22:21 Reason: (did not mean your prime, of course) |
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2010-04-30, 10:11
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#128 |
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May 2007
Kansas; USA
101×103 Posts |
Nice find Willem.
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2010-04-30, 10:15
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#129 | |
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May 2007
Kansas; USA
101·103 Posts |
Quote:
Base 36, like base 6, is a fairly "prime" base. To clarify: Many of its k's are going to be heavier weight than a lot of bases. |
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2010-05-06, 23:27
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#130 |
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A Sunny Moo
Aug 2007
USA (GMT-5)
3·2,083 Posts |
I just noticed that the instructions in the first post of this thread said to report PRPs found with LLR and proven with PFGW with the PRP proof code. The currently accepted practice is to report them with the LLR code, since by now the code involved in doing PRP tests with LLR (even that for 3.7.1c which actually did PRP tests instead of 3.8's N-1/N+1's) has changed enough that it doesn't really make sense to credit the old PRP. I've changed the instructions accordingly (Gary, just wanted to give you a heads-up on this).
Edit: I just realized that, ironically enough, I was the one to first change it to PRP back in post #11 of this thread. The discussion that ensued clarified that it really should be LLR, but somehow it never got changed back. Last fiddled with by mdettweiler on 2010-05-06 at 23:33 |
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2010-05-06, 23:48
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#131 | |
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May 2007
Kansas; USA
101·103 Posts |
Quote:
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2010-06-06, 21:59
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#132 |
May 2008
Wilmington, DE
22·23·31 Posts |
http://primes.utm.edu/primes/page.php?id=93045
648*43^194123+1 is prime This leaves 166*43^n+1 the only k left for the conjecture. k=166 will be added to the 1 k remaining thread. It has been tested to n=194.1K also. Last fiddled with by MyDogBuster on 2010-06-07 at 01:53 |
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