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2008-12-04, 21:24
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#111 | |
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A Sunny Moo
Aug 2007
USA (GMT-5)
186916 Posts |
Quote:
 As for Alpertron's site on Linux machines: the main problem on my machine in particular is that I think something might be broken on the backend that's causing errors whenever I try to set up the Java browser plugin in Firefox. As you said, I did have a Windows virtual machine set up that I could use, but it seems that an upgrade of the virtualization software broke that too...  (I blame Windows for requiring a reinstall due to the virtual "IDE controller" having changed ever-so-slightly...but I guess the VirtualBox people could have put in some sort of compatibility mode pretty easily if they wanted to. )However, I just found that under Linux I can use PARI/GP (a handy-dandy freeware math application that can do all sorts of stuff) to factor these numbers at least as easily as with Alpertron's applet.
Last fiddled with by mdettweiler on 2008-12-04 at 21:25 |
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2008-12-04, 23:27
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#112 |
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I quite division it
"Chris"
Feb 2005
England
31×67 Posts |
Just for fun, I also tested Riesel base 94, k=29 to 20,000. Results attached. (No sieve file. No reservation. Stopping there.)
Last fiddled with by gd_barnes on 2010-01-18 at 09:35 Reason: remove base > 100 |
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2008-12-05, 20:54
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#113 | |
May 2007
Kansas; USA
101×103 Posts |
Quote:
Thanks for the nice sieve file. I'm compiling a list of things to do while on a business trip for doing when I get back next Tuesday. I'll make sure I get the sieve file posted to the web pages after getting them updated for all of these bases. I think I've stuck a chord here...easier to prove bases. I may continue doing this for the Sierp side as well as for some bases > 125. Proving bases is fun! :-) Gary Last fiddled with by gd_barnes on 2010-01-18 at 09:35 Reason: remove base > 100 |
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2008-12-06, 00:17
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#114 |
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I quite division it
"Chris"
Feb 2005
England
31·67 Posts |
How many of the 19 ks for Reisel base 87 would you 'expect' to fall before n=20,000?
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2008-12-06, 01:41
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#115 | |
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I quite division it
"Chris"
Feb 2005
England
1000000111012 Posts |
Quote:
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2008-12-06, 09:04
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#116 | |
Jan 2006
Hungary
22×67 Posts |
Quote:
Willem. |
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2008-12-06, 09:48
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#117 | |
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I quite division it
"Chris"
Feb 2005
England
207710 Posts |
Quote:
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2008-12-06, 09:58
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#118 |
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Quasi Admin Thing
May 2005
96610 Posts |
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2008-12-07, 10:13
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#119 | |
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May 2007
Kansas; USA
242438 Posts |
Quote:
I would concur with that. I'd say it's slightly more likely that you'll get 4 primes than 2 primes so an expection of a bit more than 3. For info. purposes, here are the top 10 primes that I found up to n=10K that gives a general idea of how they have fallen: 1128*87^3171-1 1002*87^3257-1 1398*87^3699-1 1426*87^3778-1 1284*87^4444-1 1186*87^5151-1 102*87^5508-1 1586*87^6195-1 628*87^6371-1 508*87^9016-1 This is another one of those highly misleading bases. It is unlikely to be proven in several hundred CPU years; believe it or not! :-) Except for highly prime bases, any base that is not a power-of-2 that has more than 10 k's remaining at n=10K will be virtually impossible to prove anytime in the near future and for most of them, not likely in most of our lifetimes without new concepts or math on finding primes; even taking into account increases in computer speeds. So far, we've only had 2 bases proven with conjectures > 1000...Sierp bases 11 at k=1490 and 21 at k=1002. But we have two bases with only one k remaining that would shatter those records: Sierp base 9 and 10. Proving Sierp base 10 would be a great coupe! With a conjecture of k=9175, it would be an outstanding proof! :-) Gary Last fiddled with by gd_barnes on 2008-12-07 at 10:23 |
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2008-12-08, 11:06
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#120 |
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May 2007
Kansas; USA
101×103 Posts |
I have added and udpated search limits and reservations to the original post about these bases 50-100. I will continue doing so until I get my web pages updated with all of the info.
Let me know if you see any problems. Gary Last fiddled with by gd_barnes on 2010-01-18 at 09:40 Reason: remove bases > 100 |
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2008-12-08, 14:38
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#121 | |
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I quite division it
"Chris"
Feb 2005
England
207710 Posts |
Riesel Base 87
Quote:
I have tested Riesel Base 87 to 20,000. Three primes were found, good estimates guys! Verified primes: 758*87^13638-1 898*87^14455-1 958*87^17047-1 (Though Gary suggested there should be 3-and-a-bit primes, and I can't find the bit...) I have also sieved a file to p=560bn, n=100k. I estimate that this is sufficient to test further to about n=28,000. (Hopefully by then another prime will have been found making further sieving faster.) Unreserving this er, conjecture. edit: My estimate above is based on the fact that tests at n=20,000 took one minute and the sieve was rejecting candidates about every two minutes; 28^2 is about twice 20^2. edit2: The exact sieve depth is 560973747863 Last fiddled with by Flatlander on 2008-12-08 at 15:21 |
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