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2013-09-04, 02:45
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#67 |
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Romulan Interpreter
Jun 2011
Thailand
226138 Posts |
Nice work. However, extending the sequence to higher starters is not big deal, as the most of them are "easy".
Both "with initial 3" and "without" were discussed before, this does not change the things too much, so we decided to let the 3 out of it. Also, the problem asks for primes which "extends" the initial starting number. There is not so much fun to say that the prime starting with 3 is 3, or the one starting with 17 is 17. (see post #45, onwards). The only interesting case remaining after Batalov's work is actually "20". Who can solve the 20 gets a bonus...  Beside of it, the 10, 17, 80, 81, 84, 96 need to be proved prime in factorDB (they are only PRP; the 54, 62, 73, 97 were already proved prime). This is secondary. The main goal remains 20. Last fiddled with by LaurV on 2013-09-04 at 03:30 Reason: Link to the "true" 17 :P |
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2013-09-04, 05:18
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#68 | ||||
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"Dana Jacobsen"
Feb 2011
Bangkok, TH
22×227 Posts |
Quote:
Quote:
I don't think this was discussed. People seem to have just picked something and sometimes mention what they chose. The original poster twice indicated the 3 should be included. I think it's a terrible sequence if we have 4 different versions. Quote:
What I meant by saying that if we extend the series this becomes less important, is that sure, we find "7" for 7, but go a little farther and we'll find each 7x, and later 7xx, etc. I don't particularly care which one is chosen, but it would be nice if we all actually worked on the same sequence. Quote:
I got most of what I wanted from it -- a nice speedup of my pretest for large (50k+ digit) numbers. I'll probably run a(20) farther later, but someone else will likely beat me to it. I can run primo on 17, 81, and 84, but 10, 80, and 96 look daunting. |
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2013-09-04, 05:43
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#69 |
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Romulan Interpreter
Jun 2011
Thailand
7×1,373 Posts |
Grrr... I have to write you down in my book under the chapter "people not to argue with, ever!".
(that was a compliment, told with much respect. don't get fussy about it!) |
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2013-09-04, 05:57
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#70 |
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"Dana Jacobsen"
Feb 2011
Bangkok, TH
22·227 Posts |
:( Sorry.
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2013-09-04, 10:03
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#71 |
Sep 2013
23×7 Posts |
Danaj, errors corrected, thanks!
The list in the first post doesn't include the leading 3, and for 2 and 3 results are equal to the number, so I just used this ruleset. Appending digits to prime starting numbers or not doesn't really matter, the information is still there. Example: result for a(2) is either 2, or the same als a(26). No need to calculate anything new, just rearrange the list. |
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2013-09-04, 11:04
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#72 |
Mar 2006
Germany
23·3·112 Posts |
The value "31415926" occurs at position 50366471 ("3." not counted) of pi.
No longer value of this pi-like number in the first 1e9 decimal digits of pi. |
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2013-09-04, 16:11
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#73 |
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"Dana Jacobsen"
Feb 2011
Bangkok, TH
22·227 Posts |
"314159265" occurs at position 1660042750. I didn't find the next value in the first 5000M digits.
The current list in the first post may or may not include the first 3 -- the only number starting with 3 listed is "3" with no starting position noted. It looks like almost all the OEIS pi/prime related series include the beginning 3, e.g. Pi-Prime (OEIS A005042) and all the crossref'd entries it has. I agree with you (JF) on the uninteresting bit. At first I thought it was a good change, but now I think it just adds complication that doesn't really add value. As you point out if a(2) is boring, just go to a(26) for the interesting part. If a(41) is boring, look at a(415). Last fiddled with by danaj on 2013-09-04 at 16:11 |
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2013-11-06, 18:59
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#74 |
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Sep 2013
708 Posts |
some Update: Increasing run time and decreasing chance
per PRP-test have dampened my enthusiasm a bit, so I did cut back from 3-4 cores nearly 24/7 to 2 cores part-time. #20 passed 356K digits, still no luck. A friend is donating 1 core part-time working on #196, passed 250K digits. The other 6 unsolved up to 1111 (#380, #422, #861, #899, #955 and #988) are brought to 200K digits and parked for now. Topic leading 3 or not: for most starting values this will do nothing except shifting their offset by 1. The others will lead to OEIS A005042. Again, not really information gained/lost. |
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2013-11-08, 00:40
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#75 | |
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∂2ω=0
Sep 2002
República de California
103·113 Posts |
Quote:
If normality holds, the digits will further be "as random as can be", but note the above 2 properties will be true of all normal reals, which are (provably) a dense subset of the reals. Interestingly, the normals likely include both irrationals and transcendentals - for example, sqrt(2), pi and e are all generally believed (but not proven) to be normal. I find it interesting that is far easier to prove that almost all reals are normal than to prove that a selected one, even one as well-studied as sqrt(2), is. |
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2014-08-17, 11:28
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#76 |
May 2004
New York City
2×29×73 Posts |
Just wondering if any progress has been made in this series,
especially a(20)? |
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2014-09-23, 20:10
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#77 |
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Sep 2013
5610 Posts |
a(20) neares 450k digits, still nothing
a(196) finished with a 312306-digit PRP |
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