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Sorry William for the late reply.
We need candidates that passed ECM to t55. |
My latest result:
21767^47-1 [code] r1=82518836895947206027655167455403750447187815354479754439495778799829619381178181 (pp80) r2=418987829982602215703955385081838625167290709409833286858042023167138009259006589364483379053437868040085589747211632757 (pp120) [/code] At least this wasn't an ECM miss. Chris |
[QUOTE=pinhodecarlos;395730]Sorry William for the late reply.
We need candidates that passed ECM to t55.[/QUOTE] To begin with, do you want SNFS 235-250? 260-280? 290-300? |
SNFS 235-250
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1 Attachment(s)
Here are the SNFS 235 to 250 from Pascal's current Most Wanted List. At the top are numbers that I know have had ECM, with the amount known to me in shown in the old ecmserver.ini format. Note that many of these are close to ready for SNFS, but they also are mostly smaller numbers. Below these are the numbers with no ECM that I am aware of - as discussed elsewhere on the board, these appear to have had a t25.
[B]WARNING: the numbers with no ECM indicated are NOT ready for NFS.[/B] These are supplied in response to Carlos' request for setting up an ECM server. |
At least some of them don't look too hot:
[CODE]Input number is 35721388774678269868793276385502010519079245280791966600623775634479441028590576877407600157534185109866242133461104335120524884711801644809959561805474567956570416303274626598665668789075306314480668798564175314698152705192821 (227 digits) Using B1=43000000, B2=582162027730, polynomial Dickson(30), sigma=1059591068 Step 1 took 289154ms ********** Factor found in step 1: 3103497524668699026642463582459981 Found probable prime factor of 34 digits: 3103497524668699026642463582459981 Probable prime cofactor 11510042618284852085267177674319753759806922851065905755935787064025440476022205222550848754597499107839883042071856789043801875793887310823019710777879474453013296113881117315041102351913245641 has 194 digits[/CODE] There would have been some weeping and gnashing of teeth if this one went on into snfs... |
[QUOTE=Batalov;395812]There would have been some weeping and gnashing of teeth if this one went on into snfs...[/QUOTE]
[B]Yes[/B] - these are in response to Carlos' inquiry about setting up an ECM server, not as current NFS candidates. I added a clarifying warning to the listing message. |
I am passing through 300 @ 11e7 on these.
7487^61-1 7673^61-1 8111^61-1 8447^61-1 |
I've found these factors, all but that last of which I've previously reported (I'm pretty certain).
[code]prp33 = 349157269696963342797035080620271 | 29567^43-1 prp15 = 953311714314151 | 828277^37-1 prp14 = 50056208995151 | 171634701455943275693670846531537378210379003^5-1 prp31 = 4427846691936399890015802742591 | 171634701455943275693670846531537378210379003^5-1 prp37 = 1415174572937984635943881666247304821 | 237250154152941828313706973109892307074156361791^5-1 prp45 = 258068286408471734706262111416169098030943727 | (1394714501^23-1)/642963384500[/code] That means of the list I had, I will be NFSing these numbers: [code](58789^37-1)/913624308 (46733917^23-1)/46733916 (4851463^29-1)/4851462 (29501^43-1)/29500 (29573^43-1)/29572 (29581^43-1)/29580 (621011411269^17-1)/621011411268 (39097262657^19-1)/39097262656 (1394714501^23-1)/642963384500 (751410597400064602523400427092397^7-1)/10167336793420274136744131178987210276 (828277^37-1)/789605213485267733676[/code] (828277^37-1)/(828276) has a P15 factor, is that sufficient for OPN purposes? |
[URL="http://www.factordb.com/index.php?query=%28852030810084611^17-1%29%2F852030810084610"]852030810084611^17-1[/URL] = p40 * p200
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[QUOTE=RichD;395858]I am passing through 300 @ 11e7 on these.
7487^61-1 7673^61-1 8111^61-1 8447^61-1[/QUOTE] Now passing though 800 @ 11e7 - each. What is needed before sending to NFS? |
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