I've only ever had one factor break 90, and that was 90.3.

[QUOTE=Dubslow;293960]I've only ever had one factor break 90, and that was 90.3.[/QUOTE]
[URL="http://mersennearies.sili.net/exponent.php?exponentdetails=52038281"]M52038281[/URL] is my largest, so far, but it is small compared to the others reported on [URL="http://mersennearies.sili.net/stats.php?showuserstats=*"]James' site[/URL]. 
Heh, it says I have the largest TF factor... I need to upload some results files, apparently...
[url]http://mersennearies.sili.net/exponent.php?factordetails=3907182061566328992465817[/url] Edit: Reuploaded that line; I remember now that's how I figured out his site didn't recognize the E when a factor was found, after 27.4 came out. (James, you might wanna delete that factor line... :smile:) Edit2: Grrr, another [URL="http://mersennearies.sili.net/exponent.php?exponentdetails=49705543"]tiny one[/URL]... 
[QUOTE=Dubslow;293968]Heh, it says I have the largest TF factor... I need to upload some results files, apparently...
[URL]http://mersennearies.sili.net/exponent.php?factordetails=3907182061566328992465817[/URL] Edit: Reuploaded that line; I remember now that's how I figured out his site didn't recognize the E when a factor was found, after 27.4 came out. (James, you might wanna delete that factor line... :smile:) Edit2: Grrr, another [URL="http://mersennearies.sili.net/exponent.php?exponentdetails=49705543"]tiny one[/URL]...[/QUOTE] Still 75.[SIZE=2]643 bits... way outside 'normal' TF and above G272 TF level for that exponent.[/SIZE] 
[QUOTE=flashjh;293988]Still 75.[SIZE=2]643 bits... way outside 'normal' TF and above G272 TF level for that exponent.[/SIZE][/QUOTE]
Small comfort :razz: By the way, looking back through this thread, ckdo found a 15x size factor in the 3xx,xx range (I might have the power of ten wrong). 
[QUOTE=Dubslow;293991]Small comfort :razz:
By the way, looking back through this thread, ckdo found a 15x size factor in the 3xx,xx range (I might have the power of ten wrong).[/QUOTE] I remember one very large one, but it was composite... is that the one? 
[QUOTE=flashjh;293992]I remember one very large one, but it was composite... is that the one?[/QUOTE]
...Crap. That's what I get for skimming :P Anyone know what the smallest notfullyfactored Mersenneprimeexponent number is? (PrimeNet's database would be almost impossible to go through. James, can you implement a "Next" button on your site?) 
[QUOTE=Dubslow;293993]...Crap. That's what I get for skimming :P
Anyone know what the smallest notfullyfactored Mersenneprimeexponent number is? (PrimeNet's database would be almost impossible to go through. James, can you implement a "Next" button on your site?)[/QUOTE] [URL="http://mersennearies.sili.net/exponent.php?exponentdetails=947"][COLOR=#000080]M947[/COLOR][/URL] is the smallest one that has at least 4 known factors so far, but I know M929 is not fully factored. There is likely smaller, but you'd probably need James to find it. 
[QUOTE=Dubslow;293993]Anyone know what the smallest notfullyfactored Mersenneprimeexponent number is?[/QUOTE]
See the Cunningham Project's "First Five Holes": [URL="http://homes.cerias.purdue.edu/%7Essw/cun/champ"]http://homes.cerias.purdue.edu/~ssw/cun/champ[/URL] 2^9291 is the smallest Mersenne Number that's not completely factored. But probably not for too long. See the reservations page: [URL="http://homes.cerias.purdue.edu/%7Essw/cun/who"]http://homes.cerias.purdue.edu/~ssw/cun/who[/URL] Or click below if you want to see the current five "holes" in Sid's database [URL="http://www.factordb.com/index.php?query=2%5Ek1&use=k&k=929&VP=on&EV=on&OD=on&CF=on&C=on&perpage=5&format=1&sent=Show"]http://www.factordb.com/...[/URL] 
What's the smallest one that isn't reserved by some other project?

[QUOTE=flashjh;293965][URL="http://mersennearies.sili.net/exponent.php?exponentdetails=52038281"]M52038281[/URL] is my largest, so far, but it is small compared to the others reported on [URL="http://mersennearies.sili.net/stats.php?showuserstats=*"]James' site[/URL].[/QUOTE]
Just curious why James' site doesn't have my factor of M56226553 listed under the Top 10. Looks like it would be #3, at 126+ bits. (see post #196 in this thread) 
[QUOTE=drh;294021]Just curious why James' site doesn't have my factor of M56226553 listed under the Top 10. Looks like it would be #3, at 126+ bits. (see post #196 in this thread)[/QUOTE]
Did you upload your results file to his site? 
[Sun Mar 25 10:56:00 2012]
P1 found a factor in stage #2, B1=535000, B2=5751250. UID: wreck2002/wreck_wyl, M55970573 has a factor: 1772243243359193295946580551, AID: 88E5D86EC28A7E487811BAF66AA785F7 k = 3 * 5^2 * 643 * 743 * 193463 * 2283887 This is my first P1 factor. 
Herk, remarkably low size for remarkably high B2 saturation
[url]http://mersennearies.sili.net/exponent.php?factordetails=15536852122405273877641[/url] k=2^2 × 3 × 5 × 282,239 × 9,234,991 73.7 bits B2=9,700,000, B2 saturation = 9,234,991/9,700,000 = 95.21% 
M56355547 has a factor: 5109242810232110450137
k = 2^2 * 3 * 211 * 17903015017 = 45330434023044 M67604689 has a factor: 793400402485575837791 k = 5 * 61 * 3259 * 5903389 = 5867939149055 M67604389 has a factor: 676273206848992081873 k = 2^3 * 3 * 41 * 283 * 811 * 22147 = 5001696020424 M369111439 has a factor: 248870925861776838239 k = 337121665121 is prime M369111331 has a factor: 2395448792646190676561 k = 2^3 * 5 * 11^2 * 227 * 761 * 3881 = 3244886557880 
M91200101 has a factor: 2[COLOR=#990000]^2[/COLOR] × 3 × 11 × 41 × 127 × 429409 x p
M91200713 has a factor: 3 × 11 × 12074873471 x p M91200743 has a factor: 23^2 × 926869513 x p M91201171 has a factor: 2[COLOR=#990000]^2[/COLOR] × 5 × 21569 × 1335239 x p M91204657 has a factor: 2[COLOR=#990000]^3[/COLOR] × 3 × 5 × 11 × 383 × 577 × 761 x p M91206281 has a factor: 3[COLOR=#990000]^2[/COLOR] × 7 × 11 × 373 × 1304227 x p M91207357 has a factor: 369391100747 x p M91210027 has a factor: 2[COLOR=#990000]^4[/COLOR] × 13 × 41 × 1093 × 25117 x p M91210813 has a factor: 3[COLOR=#990000]^2[/COLOR] × 17 × 787 × 2085841 x P M91211117 has a factor: 2[COLOR=#990000]^5[/COLOR] × 5[COLOR=#990000]^2[/COLOR] × 19[COLOR=#990000]^2[/COLOR] × 61 × 20399 x P M91211513 has a factor: 3469 × 4651 × 20353 x p I'll spare you the other ~890 for larger exponets :) 
The factors are two times more plus 1, really.

Found a nice 'k' today:
[URL="http://mersennearies.sili.net/exponent.php?exponentdetails=79943021"]M79943021[/URL] Factor = 2217770314776436337081 k = 2^[SIZE=2]2 * 5 * 227 * [COLOR=red]3055273981[/COLOR][/SIZE] Digits = 22 Bits = 70.910 Another interesting k [URL="http://mersennearies.sili.net/exponent.php?exponentdetails=79943693"]M79943693[/URL] Factor = 6794411101274465993903 k = 43 × 1009 × 979440361 Digits = 22 Bits = 72.525 
Are those P1 or TF?

With k factors near 3 billion and 1 billion  my guess would be TF

[QUOTE=cheesehead;295351]With k factors near 3 billion and 1 billion  my guess would be TF[/QUOTE]
I've had a k factor up at 346M with the BS extension, and as we know Mr. Hallet has a [i]ton[/i] of memory. So I just wanted to be sure, though I agree TF is more likely. (Also those expos are outside of his P1 work size, if [URL="http://gpu72.com/reports/worker/b49e80e9382626afc7ebe2f81662dadb/"]this[/URL] or [URL="http://gpu72.com/reports/workers/p1/graph/110/"]this[/URL] are anything to go by. :smile:) 
I'm willing to be amazed by being wrong. :)

[QUOTE=Dubslow;295347]Are those P1 or TF?[/QUOTE]
Yes, they're both TF. I wish they were P1 since I still haven't seen a BS factor. 
Got my 100th factor for GPU72.
Now I need to overtake Greg before he employs the same strategem (which is too easy) 
P1 found a factor in stage #2, B1=135000, B2=2733750, E=6.
M4421467 has a factor: 8546596152478901798249 (73 bits) k=2^2 × 11 × 541 × 3,301 × 12,299,893 
I believe that's the first E=6 BS factor I've seen. Nice going!

Found a nice stage1 factor: 405845656468221226445605471
[URL="http://mersennearies.sili.net/exponent.php?exponentdetails=50647693"]M50647693[/URL] bits: 88.391 digits: 27 k = 3 × 5 × 907 × 17959 × 55229 × 296909 
Found some factors while running some 50 random exponents at 98M from 65 to 67.
found 1 factor for M98071543 from 2^65 to 2^67 [mfaktc 0.18 barrett79_mul32] M98071543 has a factor: 146536851648186392249 [TF:65:67:mfaktc 0.18 barrett79_mul32] k = 2[SUP]2[/SUP] × 83 × [COLOR="Red"]2250275899[/COLOR] M98073133 has a factor: 55134581081542102081 [TF:65:67:mfaktc 0.18 barrett79_mul32] found 1 factor for M98073133 from 2^65 to 2^67 [mfaktc 0.18 barrett79_mul32] k = 2[SUP]5[/SUP] × 3[SUP]2[/SUP] × 5 × 757 × 257861 M98071789 has a factor: 101395775139293311447 [TF:65:67:mfaktc 0.18 barrett79_mul32] found 1 factor for M98071789 from 2^65 to 2^67 [mfaktc 0.18 barrett79_mul32] k = 3 × 7 × 11[SUP]2[/SUP] × 203442227 M98174059 has a factor: 126812702311349093167 [TF:65:67:mfaktc 0.18 barrett79_mul32] found 1 factor for M98174059 from 2^65 to 2^67 [mfaktc 0.18 barrett79_mul32] k = 3 × 10949 × 19662571 
Found a P1 factor in the standard LL range with k not having a factor of 2.
[url]http://www.mersennearies.sili.net/exponent.php?exponentdetails=52996729[/url] 3 × 5 × 53 × 4397 × 18911 × 61231 78.* bits. 
[QUOTE=Dubslow;295980]with k not having a factor of 2.[/QUOTE]
Wow! What are the chances of that? [SPOILER]... 50% ?[/SPOILER] 
It's the first one I can recall, out of 25.

[QUOTE=Batalov;296001]Wow! What are the chances of that? [SPOILER]... 50% ?[/SPOILER][/QUOTE]
Across all factors, it should be 50%. But across P1 factors, it should be much less. Why? :smile: 
In Stage 1 factors, should be 100%! [SPOILER]Proof: I have only one of these in results.txt and it has an odd k: M52361579 has a factor: 3833960913376723923372391[/SPOILER] :missingteeth:

[QUOTE=Dubslow;295980]Found a P1 factor in the standard LL range with k not having a factor of 2.
[URL]http://www.mersennearies.sili.net/exponent.php?exponentdetails=52996729[/URL] 3 × 5 × 53 × 4397 × 18911 × 61231 78.* bits.[/QUOTE] [QUOTE=Batalov;296001]Wow! What are the chances of that? [SPOILER]... 50% ?[/SPOILER][/QUOTE] [QUOTE=axn;296028]Across all factors, it should be 50%. But across P1 factors, it should be much less. Why? :smile:[/QUOTE] [QUOTE=Batalov;296044]In Stage 1 factors, should be 100%! [SPOILER]Proof: I have only one of these in results.txt and it has an odd k: M52361579 has a factor: 3833960913376723923372391[/SPOILER] :missingteeth:[/QUOTE] The chance of k being odd is higher then 50%. Factors fall in two categories: (1) of the form f=2kp+1 and f=8x+1 (2) of the form d=2kp+1 and d=8x1 By solving each pair of conditions, factors of the form (1) are always 2kp+1=8x+1, so k is a multiple of 4 and we have in fact only factors of the form [B]8zp+1[/B]. These are the only factors with "even k" in the "classical" sense, not only even, but "quadruple k" too. There is no factor where k is equal to 2 (mod 4). Same as above, factors of the form (2) will always be (by renotation of k) of the form [B]8zp+sp+1[/B], where s=8(p (mod 4)). So s=6 if p=4q+1, but s=2 if p=4q+3 for some q. We can factor a two out of it and we get the "k in the classical sense" is always odd, and the form 4z+t, where t=p (mod 4). So we have: (1) factors of the form [B]f=2*[4*z]*p+1[/B]. (2) factors of the form [B]d=2*[4*z+t]*p+1[/B], t=p (mod 4). where the brackets were used to show the decomposition of k. So, the "dfactors" always exists, for any composite Mp=2^p1, for an odd prime p, because in this case Mp is 7 (mod 8), and it can't have only factors of the form f, because f is 1 (mod 8) and their set is close to multiplication (their product is always 1 (mod 8)). The conclusion is that a composite Mp may have any number of ffactors, but it MUST have an ODD number of dfactors, as the product of an even number of dfactors is also 1 (mod 8). This shows that all composite Mp will have a factor with odd k, but some composites may exists which have no ffactors (they can be a product of 3, 5, 7, etc dfactors). There are more dfactors (odd k) then ffactors (quadruple k). There is no factor where k is 2 (mod 4). 
This ...
[QUOTE=LaurV;296082]The chance of k being odd is higher then 50%. [/quote] Does not follow from this ... [QUOTE=LaurV;296082]So, the "dfactors" always exists, for any composite Mp=2^p1, for an odd prime p, because in this case Mp is 7 (mod 8), and it can't have only factors of the form f, because f is 1 (mod 8) and their set is close to multiplication (their product is always 1 (mod 8)). The conclusion is that a composite Mp may have any number of ffactors, but it MUST have an ODD number of dfactors, as the product of an even number of dfactors is also 1 (mod 8). This shows that all composite Mp will have a factor with odd k, but some composites may exists which have no ffactors (they can be a product of 3, 5, 7, etc dfactors). There are more dfactors (odd k) then ffactors (quadruple k). There is no factor where k is 2 (mod 4).[/QUOTE] 
M343111009 has a factor: 101147794026026459897
k = 2^2 * 103 * 357762281 = 147398059772 
M36118457 has a factor: 204726728570332673759 [TF:67:68:mfaktc 0.18 barrett79_mul32]
found 1 factor for M36118457 from 2^67 to 2^68 [mfaktc 0.18 barrett79_mul32] k = [COLOR="Red"]2834101254247[/COLOR] (21 digits) 
Just noticed this in the "Recent cleared"
[CODE]Member Name Computer Name Exponent Type UTC Time Received Days GHzdays Result         PPed72 Unimib 56261729 FPM1 Apr 17 2012 9:20PM 10.9 4.0290 1531076005907436082137874576376865534182896705073 [/CODE] (160.06 bits... Composite of course: = p24*p25) 
M55255747 has a factor: 2214689268597166059044783
k = 59 * 101 * 257 * 12323 * 1061897 = 20040352260527453 A tiny Intel Atom CPU powered computer found it on its first PM1 assignemnt. 
Today my computer found a 132bit prime:
[Fri Apr 20 08:12:57 2012] P1 found a factor in stage #1, B1=10000000. M798257 has a factor: 4593821825255405094261984523461159901759 k = 3 × 83 × 149 × 1163 × 1223 × 16561 × 794033 × 1425649 × 2908519 I'm running B1 = 10M, B2 = 200M for all numbers in the range 790K to 800K and this is the 7th prime found so far. 
New P1 all time high in this thread
[QUOTE=Brain;284711]How could I miss that... Sorry. Beat this![/QUOTE]
[QUOTE=alpertron;296925]Today my computer found a 132bit prime: [Fri Apr 20 08:12:57 2012] P1 found a factor in stage #1, B1=10000000. M798257 has a factor: 4593821825255405094261984523461159901759 k = 3 × 83 × 149 × 1163 × 1223 × 16561 × 794033 × 1425649 × 2908519 I'm running B1 = 10M, B2 = 200M for all numbers in the range 790K to 800K and this is the 7th prime found so far.[/QUOTE] It is prime. So, we have a new thread local record... Congrats! 
[FONT="]Found a notable one starting out my 84M run...
M84004787 has a factor: [B]12824399621243547529430624238490771516609 [/B] k=2 ^ 5 x 3 x 313 x 4657 x [B]545482978807033815692147 [/B]Factors were[/FONT][FONT="][B]130229148576592177313 [/B]and [/FONT][FONT="][B]98475646669079490593[/B], both found while taking to 67 bits. [B]XD[/B] [/FONT] 
[QUOTE=c10ck3r;297146][FONT="]Found a notable one starting out my 84M run...
M84004787 has a factor: [B]12824399621243547529430624238490771516609 [/B] k=2 ^ 5 x 3 x 313 x 4657 x [B]545482978807033815692147 [/B]Factors were[/FONT][FONT="][B]130229148576592177313 [/B]and [/FONT][FONT="][B]98475646669079490593[/B], both found while taking to 67 bits. [B]XD[/B] [/FONT][/QUOTE] The notable part is that your misunderstanding of the "k" concept. :devil: 
[QUOTE=c10ck3r;297146][FONT="]Found a notable one starting out my 84M run...
M84004787 has a factor: [B]12824399621243547529430624238490771516609 [/B] < snip > Factors were[/FONT][FONT="][B]130229148576592177313[/B][/FONT][/QUOTE][FONT="]k = [/FONT] 2[sup]4[/sup] [COLOR=green]×[/COLOR] 48445583143[FONT="] [/FONT][QUOTE]and [FONT="][B]98475646669079490593[/B][/FONT][/QUOTE][FONT="]k = [/FONT] 2[sup]4[/sup] [COLOR=green]×[/COLOR] 36633197563 [QUOTE=ckdo;297175]The notable part is that your misunderstanding of the "k" concept. :devil:[/QUOTE] But [FONT="][B]12824399621243547529430624238490771516609[/B][/FONT] = 2 [COLOR=green]×[/COLOR] (2[sup]5[/sup][COLOR=green]×[/COLOR]3[COLOR=green]×[/COLOR]313[COLOR=green]×[/COLOR]4657[COLOR=green]×[/COLOR][URL="http://wims.unice.fr/wims/wims.cgi?session=NK0946EC05.16&cmd=reply&calc=check&check=545482978807033815692147"]545482978807033815692147[/URL]) [COLOR=green]×[/COLOR] 84004787 + 1, so that k does have meaning, too. Even though composite, this factor is of the form 2kp + 1. (Now, that last k should not be compared to either of the preceding k's on some equal basis, because it's algebraically derivable from them, as Dubslow shows below.) 
[tex](2kp+1)*(2mp+1) = 4(km)(p^2)+2p(m+k)+1 = 2(2kmp+m+k)p+1 = 2(m[2kp+1]+k)p+1 = 2(k[2mp+1]+m)p+1[/tex]
[/sm88] 
The guy made a joke (he is the joker, remember? see his id is "ciocker") and you all jumped to [strike]kill[/strike] adnotate (@cheesehead: :razz:) him, first of you saying nonsense, the second of you forgetting duplicated phrases in the text, and the third [B]losing a "p" on the way[/B] in that calculus, hehe, THAT is really funny :razz: :smile:
And by the way, you don't need to close the \tex box to write subscripts and superscripts...[TEX]x_1^2+x^3_4=x^{2^3}_{1_4}[/TEX] 
[QUOTE=LaurV;297179]The guy made a joke (he is the joker, remember? see his id is "ciocker") and you all jumped to kill him,[/QUOTE]"kill" ???
How about "annotate" ? 
Now it looks much better, last 3 posts could be deleted (my two including this one, and cheesehead's one in between). Well, we lose the fun, but the thread would be clearer. Or well... the thread would be clearer, but we will lose the fun...

[QUOTE=LaurV;297183]Now it looks much better, last 3 posts could be deleted (my two including this one, and cheesehead's one in between). Well, we lose the fun, but the thread would be clearer. Or well... the thread would be clearer, but we will lose the fun...[/QUOTE]
Since when was clarity ever our first goal? :razz::smile: (Shows how little Tex I know :P) 
(easy warmup) M1091 has a prime factor 2·k·1091+1, where
[CODE]k = 179 · 69737 · 4086974693 · 7727500822367 · 10227820166017 · 196164761709907 · 8326159283085775335016522402181511923674994349944795840347158060798548700472189268029761648871175757465278359531733261197555258091948229635309347779196749685783 [/CODE] M10169 has a prime factor 2·k·10169+1, where [CODE]k = 2^4 · 3^3 · 11 · 18196183 · 967157656641434911 · 8437886386...17[SUB]<2988>[/SUB][/CODE] :popcorn: 
[QUOTE=Batalov;297187](easy warmup) M1091 has a prime factor 2·k·1091+1
M10169 has a prime factor 2·k·10169+1[/QUOTE] Question: Is it the largest factors of M1091 and M10169 which you have proved being prime? 
for M1091, yup this is the largest factor and for 10169 has only 2 factor, a P41 and a PRP3022

[QUOTE=firejuggler;297219]for M1091, yup this is the largest factor and for 10169 has only 2 factor, a P41 and a PRP3022[/QUOTE]
Anybody started a certification with primo on it? Luigi 
M10169: I've factored k yesterday (arguably not hard, and probably had been done before, but it wasn't in the FactorDB anyway) and left a certification on an old primo3.0.9. It is really slow.
For the fun of it, I've started a 4thread certification with primo4.0a14 and it will probably take only a couple hours. I'll d/l it. (EDIT: DB is going to immediately certify the cofactor obviously, as soon as prp2988 cert is d/led.) (EDIT2: M10169 FF wasn't new  search the forum; I took a few fully factored Mp with p>10,000 and ran a few curves on their k values for the largest factor  just to instigate a :popcorn: conversation) 
Close to B2!
P1 found a factor in stage #2, B1=505000, B2=9595000.
M52182167 has a factor: 2029482487582610831696273 k = 2^3 x 1049 x 242677 x 9548587 9548587 / 9595000 = 0.9952... 
I found another large prime factor of a Mersenne number. Its length is 130 bits.
P1 found a factor in stage #1, B1=10000000. M799417 has a factor: 737227711675437329857373483171104386487 k = 3[SUP]2[/SUP] × 61 × 619 × 14207 × 202387 × 580687 × 791663 × 1026521 
M344111197 has a factor: 462638685260988598273
k = 2^10 * 3 * 218822479 = 672222655488 
Anybody interested in my list of 1041 factors found thus far? I can sort for certain ranges of exponents if needed... shoot me a PM with your email and which ranges you are interested in. Thanks!

M746199263 has a factor: 91476779052406004953 [TF:65:66:mfaktc 0.18 barrett79_mul32]
M746199263 has a factor: 88811032749292964359 [TF:65:66:mfaktc 0.18 barrett79_mul32] found 2 factors for M746199263 from 2^65 to 2^66 [mfaktc 0.18 barrett79_mul32] Stats [URL="http://mersennearies.sili.net/exponent.php?exponentdetails=746199263"]link[/URL]. k = 3[SUP]4[/SUP] × 734678093 k = 2[SUP]2[/SUP] × 3 × 191 × 26743081 
Found a nice K:
[URL="http://mersennearies.sili.net/exponent.php?exponentdetails=58453471"]M58453471[/URL] Factor: 3893338465413479482783 Digits: 22 Bits: 71.722 [B]K = 3 × 11100961724507[/B] 
Smooth
M54676967 has a factor: 420411039467695302913223737
89 bits, but so smooth* 2^2 × 3 × 7 × 167 × 293 × 569 × 593 × 1327 × 2089 [SIZE="1"][COLOR="Silver"]* I'd cue davieddy but he might choose Mancini over Santana.[/COLOR][/SIZE] 
[QUOTE=markr;298623]M54676967 has a factor: 420411039467695302913223737
89 bits, but so smooth* 2^2 × 3 × 7 × 167 × 293 × 569 × 593 × 1327 × 2089 [SIZE="1"][COLOR="Silver"]* I'd cue davieddy but he might choose Mancini over Santana.[/COLOR][/SIZE][/QUOTE] Wow! Indeed, that is ridiculously awesome. Here's the complete opposite: A [URL="http://mersennearies.sili.net/exponent.php?exponentdetails=56028041"]factor[/URL] so bumpy it's only by fluke that P1 found it and not TF. M56,028,041, k = 2^3 × 247309 × 13133213 
I just found my first GPUfactor:
[CODE]M976212067 has a factor: 513655278767372311447 [TF:65:70:mfaktc 0.18 barrett79_mul32] found 1 factor for M976212067 from 2^65 to 2^70 [mfaktc 0.18 barrett79_mul32][/CODE] 
Welcome to the club! We wish you thousands of factors! :razz:
Be careful, is addictive! 
[SIZE=2]554808873006599188633 is a factor of M[/SIZE][SIZE=2]31954267!
K= 2^2 x 3 x 760367 x 951437 My first DCTF factor found :) [/SIZE] 
New personal record (9.83 "bits" bigger than my previous record): P1 found a factor in stage #2, B1=515000, B2=10042500.
M55501499 has a factor: 4185864995365978016690272528312914075119 (131.62 Bits; k = 37709476958144662153091329373941 = 149 * 8623 * 17807 * 79579 * 145807 * 147139 * 965407) Oliver 
[QUOTE=TheJudger;299338]New personal record (9.83 "bits" bigger than my previous record): P1 found a factor in stage #2, B1=515000, B2=10042500.
M55501499 has a factor: 4185864995365978016690272528312914075119 (131.62 Bits; k = 37709476958144662153091329373941 = 149 * 8623 * 17807 * 79579 * 145807 * 147139 * 965407)[/QUOTE] Nice!!! A new record for [URL="http://www.gpu72.com/reports/largest_factors/"]GPU 72[/URL] too. 
504927967098232939441 is a factor of M[SIZE=2]6,687,383.
Found as part of the rerun of poorly factored exponents. k=2^3x3x5x37x56,543x150,377 [/SIZE] 
Only a few days after my new personal "factor size record" for P1 factoring I've a new number two in my list:
P1 found a factor in stage #2, B1=545000, B2=11581250. M54945109 has a factor: 248355809127166139921362845673542274151 (127.54 Bits; k = 2260035639634149601208024227175 = 5 * 5 * 31 * 89 * 107 * 353 * 9437 * 60013 * 446951 * 3427093) 
A few cases of BrentSuyama paying off:
[CODE]P1 found a factor in stage #2, B1=80000, B2=[COLOR=Red][B]1500000[/B][/COLOR]. UID: lorgix, M2139539 has a factor: 50417810253342889667777 k= 2^5*719*46747*[COLOR=Red][B]10954717[/B][/COLOR] P1 found a factor in stage #2, B1=85000, B2=[B][COLOR=Red]1742500[/COLOR][/B]. UID: lorgix, M2294807 has a factor: 4743377217925125644071 k= 3^3*5*751*3851*[B][COLOR=Red]2647063[/COLOR][/B] P1 found a factor in stage #2, B1=95000, B2=[COLOR=Red][B]1947500[/B][/COLOR]. UID: lorgix, M2442719 has a factor: 27573814760148300857 k= 2^2*37*907*[COLOR=Red][B]42045967[/B][/COLOR] P1 found a factor in stage #2, B1=95000, B2=[B][COLOR=Red]1947500[/COLOR][/B]. UID: lorgix, M2477309 has a factor: 412991649168730738883201 k= 2^6*5^2*1723*8167*[B][COLOR=Red]3702229[/COLOR][/B] P1 found a factor in stage #2, B1=95000, B2=[B][COLOR=Red]1947500[/COLOR][/B]. UID: lorgix, M2492143 has a factor: 189868506369595443867609863 k= 109*269*8663*74831*[COLOR=Red][B]2004109[/B][/COLOR] P1 found a factor in stage #2, B1=95000, B2=[B][COLOR=Red]1971250[/COLOR][/B]. UID: lorgix, M2492389 has a factor: 65384728464585460900369 k= 2^3*3*7*1847*4703*[COLOR=Red][B]8988337[/B][/COLOR] P1 found a factor in stage #2, B1=95000, B2=[B][COLOR=Red]1923750[/COLOR][/B]. UID: lorgix, M2433979 has a factor: 103825801661835930049 k= 2^5*3^2*47*193*[B][COLOR=Red]8164147[/COLOR][/B] P1 found a factor in stage #2, B1=160000, B2=[B][COLOR=Red]3680000[/COLOR][/B]. UID: lorgix, M8186687 has a factor: 1321002082390776639208561 k= 2^3*3^2*5*2687*14771*[COLOR=Red][B]5646577[/B][/COLOR][/CODE]And then a case of highly saturated B2: P1 found a factor in stage #2, B1=95000, B2=1947500. UID: lorgix, M2444359 has a factor: 1588994437060952149274017 k= 2^4*3*31*41*197*13901*1945487 [B][COLOR=Red]1945487/1947500 ~= 0.999[/COLOR][/B] 
[Mon May 21 06:54:00 2012]
P1 found a factor in stage #2, B1=285000, B2=[B]6341250[/B], E=6. M43787581 has a factor: 4003395812858544808108690252822256209  M43787581 has factor 4003395812858544808108690252822256209 (121.59 bits) k = 2^3 * 3^2 * 41 * 47 * 67 * 14083 * 22159 * 165601 * [B]95159089[/B] :max: Caught this during my sweep of doing P1 on curtisc exponents that didn't get any in their first time around. I usually set tests saved to 1.1 and let slower machine pick them off. It only saves the doublecheck (assuming the first check was valid) but the bounds are adjusted downward, as appropriate... sometimes, you get lucky and find a factor anyway. 
late game success
This one was almost finished ...
Sure, each class has the same chances, but so far I had not noticed a success in the almostfinal round. [code] got assignment: exp=57347131 bit_min=71 bit_max=72 Starting trial factoring M57347131 from 2^71 to 2^72 (8.34GHzdays) k_min = 20586759963000  k_max = 41173519934847 Using GPU kernel "barrett15_75" No checkpoint file "M57347131.ckp" found. [date time] exp[TF bits]: percent class #, seq GHz time  ETA  #FCs  rate SieveP.  CPU idle [May 25 02:14] M57347131[7172]: 99.17% 4581/4620,952/960 48.96 15.330s  2m03s  855.64M  55.81M/s  101050  0us = 0.00% Result[00]: M57347131 has a factor: 2858577001937559485743 found 1 factor for M57347131 from 2^71 to 2^72 (partially tested) [mfakto 0.11 barrett15_75_4] tf(): total time spent: 3h 59m 32.548s [/code] 
[CODE]P1 found a factor in stage #2, B1=810000, B2=21060000.
UID: PageFault/boxen_01, M70002167 has a factor: 23343692938910511396401,[/CODE] k is pretty rough: 2^3 * 5^2 * 714223 * 1167251 
[CODE]P1 found a factor in stage #1, B1=95000.
UID: PageFault/boxen_01, M8360353 has a factor: 123253905513130626056631481[/CODE] This one should have been found in the original run. k: 2^2 * 3^2 * 5 * 7 * 41 * 431 * 1289 * 4073 * 63059 
[CODE][Mon Jun 04 09:47:31 2012]
P1 found a factor in stage #1, B1=545000. UID: flashjh/TF3, [URL="http://mersennearies.sili.net/exponent.php?exponentdetails=54885641"]M54885641[/URL] has a factor: 10917788677651143296532439[/CODE] 10917788677651143296532439 is [URL="http://mersennearies.sili.net/factor.php?n=10917788677651143296532439"]Prime[/URL] 
[SIZE=2]45999635683923857777
[/SIZE][SIZE=2]263130442175552567999 are both factors of 2^3400124171. Found running 6568 bits, continuing on up. [/SIZE] 
Quick Q?
[QUOTE=c10ck3r;301253][SIZE=2]45999635683923857777
[/SIZE][SIZE=2]263130442175552567999 are both factors of 2^3400124171. Found running 6568 bits, continuing on up. [/SIZE][/QUOTE] Anyone else obsessed/as fanatical as me about finding multiple factors for numbers outside of the LL/DC wavefront? 
[QUOTE=c10ck3r;301270]Anyone else obsessed/as fanatical as me about finding multiple factors for numbers outside of the LL/DC wavefront?[/QUOTE]
Personally, no. I'm just waiting until quantum computers get under way, with their polynomialfactoringalgorithms. The current record holder is 143=11*13. 
[QUOTE=c10ck3r;301270]Anyone else obsessed/as fanatical as me about finding multiple factors for numbers outside of the LL/DC wavefront?[/QUOTE]
:smile: I am not alone... But I'm satisfied to find the first known factor. Currently upping 2M to 2^62. 
You are not alone ... I'm getting all sort of crazy ideas for P1. Can't act out on this at the moment  current machine is crap. When I do replace it, I will be going for a minimum of 64 GB of ram (even that is too low). All depends on the next job I find ... that is not too far off and I found that I am worth far more than I imagined, and my sector is booming ...
[QUOTE=c10ck3r;301270]Anyone else obsessed/as fanatical as me about finding multiple factors for numbers outside of the LL/DC wavefront?[/QUOTE] 
[CODE]
got assignment: exp=57606359 bit_min=71 bit_max=72 Starting trial factoring M57606359 from 2^71 to 2^72 k_min = 20494119764580 k_max = 40988239535062 Using GPU kernel "barrett79_mul32" class  candidates  time  ETA  avg. rate  SievePrimes  CPU wait 429/4620  1.03G  10.415s  2h31m  98.87M/s  10816  3.62% M57606359 has a factor: 3086670355345499795863 found 1 factor for M57606359 from 2^71 to 2^72 (partially tested) [mfaktc 0.18 barrett79_mul32] [B]tf(): total time spent: 15m 40.284s[/B] [/CODE] Always nice to find a factor fast 
Right on mate. I remember back in the day, we often found 58 or 59 bit factors within minutes. I once did this with a pentium 133 ... three minutes into the run, which took close to a month if no factor was found.
Let's see ... M15xxxxxx, 58 to 65 bits, these days might take half an hour ... no idea, but maybe a good gpu in minutes ... 
[QUOTE=PageFault;301900]Right on mate. I remember back in the day, we often found 58 or 59 bit factors within minutes. I once did this with a pentium 133 ... three minutes into the run, which took close to a month if no factor was found.[/QUOTE]
Though finding one in a few minutes isn't saving anywhere close to that much time, I have another one in as many days... [CODE] got assignment: exp=57620203 bit_min=71 bit_max=72 Starting trial factoring M57620203 from 2^71 to 2^72 k_min = 20489195787060 k_max = 40978391579682 Using GPU kernel "barrett79_mul32" found 0 factor(s) already class  candidates  time  ETA  avg. rate  SievePrimes  CPU wait 876/4620  1.07G  11.111s  2h23m  96.07M/s  7396  6.06% M57620203 has a factor: 3169216471470499491337 found 1 factor for M57620203 from 2^71 to 2^72 (partially tested) [mfaktc 0.18 barrett79_mul32] [B]estimated total time spent: 3m 24.699s[/B] [/CODE] [QUOTE]Let's see ... M15xxxxxx, 58 to 65 bits, these days might take half an hour ... no idea, but maybe a good gpu in minutes ...[/QUOTE] Just for giggles I setup [URL="http://www.mersenne.org/report_exponent/?exp_lo=15000607&exp_hi=&B1=Get+status"]M15000607[/URL]: ~ 15 minutes on my 580 (with 4 other workers running concurrently) [CODE] got assignment: exp=15000607 bit_min=58 bit_max=65 Starting trial factoring M15000607 from 2^58 to 2^65 k_min = 9607290000 k_max = 1229733175044 Using GPU kernel "75bit_mul32" class  candidates  time  ETA  avg. rate  SievePrimes  CPU wait 89/4620  60.82M  0.956s  [B]14m58s[/B]  63.62M/s  11896  3.01% [/CODE] 
I just saved my first 2 LL tests near the wavefront. (GPU272)
M61665733 has a factor: 1242867428216309008697 k= 2*2*11*229033092049 
M995699 has a factor: 714989201981049862823489485269929
k=2^2 x 13 x 61 x 3301 x 24001 x 2033287 x !702,642,949! I *THINK* this is a BS factor since it was found with B1=10M B2=250M E=12 109.14 bits :) My first above 100 bits! 
I know it is useless but still
M8803577 completed P1, B1=105000, B2=1916250, E=6 P1 found a factor in stage #1, B1=105000. UID: firejuggler, M8803573 has a factor: 589495498411470532681 k=2^2*3*5*2857*4831*40429 last pm1 was @ B1=40000, B2=B1, so it didn't need 'much' more to get it 
[QUOTE=firejuggler;302622]I know it is useless but still
M8803577 completed P1, B1=105000, B2=1916250, E=6 P1 found a factor in stage #1, B1=105000. UID: firejuggler, M8803573 has a factor: 589495498411470532681 k=2^2*3*5*2857*4831*40429 last pm1 was @ B1=40000, B2=B1, so it didn't need 'much' more to get it[/QUOTE] Wow, that wasn't missed by much at all the first time! 
M115674281 has a factor: 40339344939109680617
M115661719 has a factor: 40122317215718082599 found consecutively on a system that takes 129 mins for these assignments for full length, 17 mins apart :) 
[code]
[Sun Jun 24 21:24:31 2012] P1 found a factor in stage #2, B1=100000, B2=1925000. UID: firejuggler, M7930861 has a factor: 6680754188444328044071639, [/code] factor is 82.466 bit. Rather large for this exponent. k=3 × 19 × 137 × 2161 × 80789 × 308939 
M3243839 has a factor: 802301222696287988092559711
M3244867 has a factor: 556924867429225023624318383 M3245537 has a factor: 25502181971466624689 90 bits k=5 x 71 x 97 x 2837 x 233159 x 5429209 89 bits k=59 x 89 x 1433 x 518717 x 21986243 , and 65 bits, k=2 ^ 3 x 11 x 47 x 53 x 17922739 , respectively. Found using P1 bounds B1=1M B2=30M, all found stage 2, no BS. 
[Sat Jun 30 02:28:44 2012]
P1 found a factor in stage #1, B1=110000. UID: firejuggler, M9251881 has a factor: 126328218334013927786152730351 96.673 bit, k=5^2*31*139*1867*9247*56827*95621 
Bad TF results?
1 Attachment(s)
[URL="http://www.mersenne.org/report_exponent/?exp_lo=601983997&exp_hi=10000&B1=Get+status"]M601983997[/URL] has a factor: 60136908979114760311 (65.705 bits)
[URL="http://www.mersenne.org/report_exponent/?exp_lo=601986001&exp_hi=&B1=Get+status"]M601986001[/URL] has a factor: 41955526838838866881 (65.185 bits) Both were found by trial factoring using Prime 95. However, the interesting part is that both had been TFed using mfakto up to 67 bits, but reported no factors. It leads me to think is it necessary to double check trial factoring results? 
[QUOTE=dabaichi;303932]It leads me to think is it necessary to double check trial factoring results?[/QUOTE]
It depends. If it is a reproducible error (i.e. bug) in mfakto, then maybe. If it is a hardware issue, then no. AFAICT, "gpu 2 72" has been finding the expected number of factors. 
So someone should rerun those with mfakto, but I'd only be worried if they were different users.

Good points axn and Dubslow.
It may be a hardware error, or some guys who love the credit more than the truth. FWIW, mfaktc v0.18 finds both factors in a blink of an eye, with three different settings: 0 to 70, 65 to 70 and 65 to 66 bits (the difference is important, as for example in the first case he is sieving all 069 range in a single step). 
Found another one ... [URL="http://mersennearies.sili.net/exponent.php?exponentdetails=70002461"]M70002461[/URL]
[CODE]P1 found a factor in stage #2, B1=810000, B2=21060000. UID: PageFault/boxen_01, M70002461 has a factor: 10006641404605893135455599[/CODE] k = 3 * 7 * 11 *17 * 1063 * 4931 * 3472289 
[QUOTE=dabaichi;303932][URL="http://www.mersenne.org/report_exponent/?exp_lo=601983997&exp_hi=10000&B1=Get+status"]M601983997[/URL] has a factor: 60136908979114760311 (65.705 bits)
[URL="http://www.mersenne.org/report_exponent/?exp_lo=601986001&exp_hi=&B1=Get+status"]M601986001[/URL] has a factor: 41955526838838866881 (65.185 bits) Both were found by trial factoring using Prime 95. However, the interesting part is that both had been TFed using mfakto up to 67 bits, but reported no factors. It leads me to think is it necessary to double check trial factoring results?[/QUOTE] Good catch. I had already asked James to go over his factor DB to see if there are P1 results that fall into a range that mfakto cleared as NF. I did not think of someone rechecking using prime95 ... [QUOTE=axn;303937]It depends. If it is a reproducible error (i.e. bug) in mfakto, then maybe. If it is a hardware issue, then no. AFAICT, "gpu 2 72" has been finding the expected number of factors.[/QUOTE] In GPU272 I'm even 5% ahead of the expected (I know, law of small numbers). [QUOTE=Dubslow;303939]So someone should rerun those with mfakto, but I'd only be worried if they were different users.[/QUOTE] I'll definitely check different settings for that tomorrow. Would it be useful to add a checksum in the result lines, just to make sure it's not modified before submittal but we (I) really have to deal with a bug? At first, that checksum would only be recorded, but later the server could also verify it ... 
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