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2009-08-18, 03:01
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#12 | |
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6809 > 6502
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Aug 2003
101×103 Posts
2B3B16 Posts |
Quote:
I post the following about factoring cut-off limits, final bit depths, end level of trial factoring, how far to search, so that others might find it by searching (thus all of the synonym terms): Code:
Exponents up to Trial factored to 29690000 2^66 37800000 2^67 47450000 2^68 58520000 2^69 75670000 2^70 96830000 2^71 |
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2009-08-18, 03:14
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#13 |
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Random Account
Aug 2009
Not U. + S.A.
3×953 Posts |
These are also being sent to the PrimeNet server
Code:
M98024831 no factor from 2^65 to 2^66 M98024837 no factor from 2^65 to 2^66 M98024881 no factor from 2^65 to 2^66 M98024887 no factor from 2^65 to 2^66 M98024897 no factor from 2^65 to 2^66 M98024957 no factor from 2^65 to 2^66 M98024957 no factor from 2^65 to 2^66 M98000059 no factor from 2^65 to 2^66 M98025013 no factor from 2^65 to 2^66 M98000069 no factor from 2^65 to 2^66 M98025119 no factor from 2^65 to 2^66 |
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2009-08-18, 03:17
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#14 | |
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6809 > 6502
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Aug 2003
101×103 Posts
3·7·17·31 Posts |
Quote:
Glad you have things rolling. |
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2009-08-18, 04:40
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#15 |
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Random Account
Aug 2009
Not U. + S.A.
3·953 Posts |
Okay, you've got me confused now.
A factor is a value that evenly divides into another number. That would suggest to me that an exponent cannot be prime. What am I missing? 
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2009-08-18, 05:38
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#16 | |
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6809 > 6502
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Aug 2003
101×103 Posts
101011001110112 Posts |
Quote:
Here is how we can find these monsterously large primes so effciently: First, we are working on a special form of number, that elimates us worrying about any number that is not expressible in this form. 2x-1 This eliminates most numbers. (This step requires no effort) Second, this class has a special property, it can only be prime if the exponent is prime. 2[COLOR="Blue"]p[/COLOR]-1 This eliminates most of the remaining numbers. (This step requires effort that is so slight that it is of no consequence.) Third, this class has a second special property, all factors of these numbers must fall into a pattern. 2kp+1 This eliminates many, many numbers that we might otherwise have to do try and divide the number by. We can eliminate a full 1/2 of the numbers that remain by checking for these factors. (This is the first step that requires real work, but the benefit is huge.) Third and a half, there is a second type of test that can be done that can find more factors that are larger (P-1 testing), this can eliminate ~5-8% of those numbers that still remain. (This step requires more work, but yields good reward and data). Lastly, these numbers can be tested by a 'tricky' test to check to see if they are prime, without having to try and divide the number by all primes below it's square root. (LL testing) This type of test makes it conceivable to test numbers that have 10 million digits. (This step requires the most work per number, but is the only step that can prove a number prime.) Thus, finding a factor of a single number speeds this project on to finding the next prime.  edit: in the 100m digit range, we have already eliminater 56% of the numbers in the first group, 28600 of 51080 Last fiddled with by Uncwilly on 2009-08-18 at 05:51 |
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2009-08-18, 06:32
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#17 |
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Random Account
Aug 2009
Not U. + S.A.
54538 Posts |
It is really about saving time, and that's something I can go along with. It would be horrible to spend four or five month working on something that is not prime that could have been eliminated much sooner.
What does k represent in 2kp+1? |
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2009-08-18, 06:57
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#18 | |
Nov 2008
2·33·43 Posts |
Quote:
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2009-08-18, 07:32
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#19 | ||||
"Richard B. Woods"
Aug 2002
Wisconsin USA
22×3×641 Posts |
storm5510,
I think you may have been confused by Uncwilly's using a piece of forum jargon. Quote:
Example: 211-1 has a factor (two of them actually), even though 11 is prime. It is quite possible for a Mersenne number with a prime exponent to be composite -- in fact, the vast majority (99.99+%) are. Perhaps you have confused that fact with the (different) statement that a Mersenne number cannot be prime unless its exponent is prime. As for confusion: it is a common jargon practice in this forum to use the unqualified word "exponent" to mean the Mersenne number having that exponent (p in 2p-1). If p = 9876553, for instance, some folks here will refer to 29876553-1 by writing merely "9876553", as in "I'm testing 9876553" -- because all long-time members understand that shortcut. They know that really meant "I'm testing 29876553-1." Quote:
Quote:
Quote:
Last fiddled with by cheesehead on 2009-08-18 at 07:47 |
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2009-08-18, 07:43
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#20 | |
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Nov 2008
1001000100102 Posts |
Quote:
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2009-08-18, 07:48
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#21 | |
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"Richard B. Woods"
Aug 2002
Wisconsin USA
1E0C16 Posts |
Quote:
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2009-08-18, 19:33
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#22 |
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Random Account
Aug 2009
Not U. + S.A.
3×953 Posts |
211-1 is 2047. It has a factor? I believe George's phrase goes, "If p is prime, then 2p-1 is prime." Well, 11 is not prime. 2047 is odd, but that doesn't mean much. What is the factor?
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