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 2022-01-21, 16:40 #23 chris2be8     Sep 2009 44358 Posts What model is your CPU and how many cores has it got? Just saying it's i9 isn't enough (there are several models of i9). What polynomial did you find for the 100 digit test number? That will tell us how well you have things working. To use CUDA you will need a Nvidia GPU and a fair amount of time to get it working. A one off job will probably take longer to get CUDA working than it will save factoring the number. Or you could post the number to the "Polynomial Request Thread" in the Msieve forum and ask someone else to find a polynomial for you. Last fiddled with by chris2be8 on 2022-01-21 at 16:51 Reason: Mention Polynomial Request Thread
2022-01-21, 19:32   #24
Lessiv

Jan 2022

1316 Posts

Quote:
 Originally Posted by chris2be8 What model is your CPU and how many cores has it got? Just saying it's i9 isn't enough (there are several models of i9). What polynomial did you find for the 100 digit test number? That will tell us how well you have things working. To use CUDA you will need a Nvidia GPU and a fair amount of time to get it working. A one off job will probably take longer to get CUDA working than it will save factoring the number. Or you could post the number to the "Polynomial Request Thread" in the Msieve forum and ask someone else to find a polynomial for you.
factoring 7048255804446147360759582326970320505599311083620093110726332070045097740376050077776245582227730657 (100 digits)

p50 factor: 78150410244532086207477976585474103072228479860491
p50 factor: 90188340437269674235154778537705218377404620911427

 2022-01-22, 11:01 #25 Lessiv   Jan 2022 238 Posts Another question arises: how does RAM affect search? And does it affect at all?
 2022-01-22, 13:33 #26 charybdis     Apr 2020 19·37 Posts Factorization speed does not depend on RAM, but for large numbers the postprocessing phase is RAM-intensive and this puts an upper limit on the size of numbers that can be run on a given machine. 16GB is enough to handle up to ~190 digits, and 32GB gets you over 200 digits. But such large numbers would take a long time to sieve anyway; I'd guess ~6 months for 190-digit GNFS on your i9-9900k using CADO, slightly longer with GGNFS/msieve.
 2022-01-22, 17:21 #27 Lessiv   Jan 2022 19 Posts I have 128 GB of RAM And I need to look for a 154-digit number.
 2022-01-22, 19:09 #28 charybdis     Apr 2020 19·37 Posts You'll never have any RAM issues with 128GB.
 2022-01-25, 19:18 #29 bur     Aug 2020 79*6581e-4;3*2539e-3 503 Posts As mentioned earlier you can roughly go by the rule that sieiving times double per 5 additional digits. I have a i10-10900k that takes about 3-4 days for a 155 digit number. Should be similar in your case. Actually if you only want to factor this one number and that's it, I would just go for it. If there's trouble you loose a few days, nothing too dramatic. Maybe you'll find yourself get hooked by factorization though... Last fiddled with by bur on 2022-01-25 at 19:18
 2022-01-26, 12:39 #30 Lessiv   Jan 2022 19 Posts Thank you all very much. Found it in 4 days.
 2022-01-27, 16:00 #31 LaurV Romulan Interpreter     "name field" Jun 2011 Thailand 996310 Posts Ok, now you know how it's done, come and factor few numbers here, for example, aliquot sequences, or other stuff...
 2022-01-27, 21:55 #32 Stargate38     "Daniel Jackson" May 2011 14285714285714285714 12768 Posts @Lessiv: Could you please post the number (if you factored it)?
2022-01-28, 11:14   #33
Lessiv

Jan 2022

19 Posts

Quote:
 Originally Posted by Stargate38 @Lessiv: Could you please post the number (if you factored it)?
If you need such a number for statistics or some other reason, I can create new keys and find you two prime numbers.
Unfortunately, these numbers are confidential, this is used. for business.
And I want to warn6 I don’t use anything criminal, I don’t hack anyone and I don’t harm anyone.
I honor and respect the laws!

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