148428382899526212777811198132944467792004330764376905321699883663179315020730966778383238234201544317147463027711347263226731913659389<135>

49485565672041586998733670851755250709829332943434100817742227397<65>
2999427830798455535060535857115593476513217672800509841431136058898137<70>

Number: trial
N=148428382899526212777811198132944467792004330764376905321699883663179315020730966778383238234201544317147463027711347263226731913659389
  ( 135 digits)
SNFS difficulty: 152 digits.
Divisors found:
 r1=49485565672041586998733670851755250709829332943434100817742227397 (pp65)
 r2=2999427830798455535060535857115593476513217672800509841431136058898137 (pp70)
Version: GGNFS-0.77.1-20060722-pentium4
Total time: 49.49 hours.
Scaled time: 26.87 units (timescale=0.543).
Factorization parameters were as follows:
n: 148428382899526212777811198132944467792004330764376905321699883663179315020730966778383238234201544317147463027711347263226731913659389
m: 1000000000000000000000000000000
c5: 680
c0: 13
skew: 1
type: snfsFactor base limits: 2400000/2400000
Large primes per side: 3
Large prime bits: 27/27
Max factor residue bits: 48/48
Sieved algebraic special-q in [1200000, 1
)
Primes: RFBsize:176302, AFBsize:176093, largePrimes:5609088 encountered
Relations: rels:5535765, finalFF:399520
Max relations in full relation-set: 0
Initial matrix: 352462 x 399520 with sparse part having weight 27003417.
Pruned matrix : 328388 x 330214 with weight 20757565.
Total sieving time: 44.17 hours.
Total relation processing time: 0.46 hours.
Matrix solve time: 4.47 hours.
Time per square root: 0.39 hours.
Prototype def-par.txt line would be:
snfs,152,5,0,0,0,0,0,0,0,0,2400000,2400000,27,27,48,48,2.3,2.3,100000
total time: 49.49 hours.
 --------- CPU info (if available) ----------

GGNFS-0.77.1-20060722-pentium4

Pentium 4 3.20 GHz, 1 Gig RAM, Windows XP and Cygwin

49162104152158473852257356247164514014169615600587153399576969092026274841248343978397668819540045798313854721876473148828889098776674605141459<143>

61065373075425676577973996838542929633<38>
805073344781424198084009165594160318465099225536810480321303682980714430410153103765571332168602554390323<105>

Number: 75557_153
N=49162104152158473852257356247164514014169615600587153399576969092026274841248343978397668819540045798313854721876473148828889098776674605141459
  ( 143 digits)
SNFS difficulty: 154 digits.
Divisors found:
 r1=61065373075425676577973996838542929633 (pp38)
 r2=805073344781424198084009165594160318465099225536810480321303682980714430410153103765571332168602554390323 (pp105)
Version: GGNFS-0.77.1-20050930-k8
Total time: 25.50 hours.
Scaled time: 23.18 units (timescale=0.909).
Factorization parameters were as follows:
n: 49162104152158473852257356247164514014169615600587153399576969092026274841248343978397668819540045798313854721876473148828889098776674605141459
m: 2000000000000000000000000000000
c5: 2125
c0: 13
skew: 1
type: snfs
Factor base limits: 3000000/3000000
Large primes per side: 3
Large prime bits: 27/27
Max factor residue bits: 48/48
Sieved algebraic special-q in [1500000, 2700001)
Primes: RFBsize:216816, AFBsize:216466, largePrimes:5605113 encountered
Relations: rels:5534336, finalFF:522965
Max relations in full relation-set: 28
Initial matrix: 433348 x 522965 with sparse part having weight 41494477.
Pruned matrix : 379741 x 381971 with weight 27448128.
Total sieving time: 24.12 hours.
Total relation processing time: 0.10 hours.
Matrix solve time: 1.23 hours.
Time per square root: 0.05 hours.
Prototype def-par.txt line would be:
snfs,154,5,0,0,0,0,0,0,0,0,3000000,3000000,27,27,48,48,2.3,2.3,100000
total time: 25.50 hours.
 --------- CPU info (if available) ----------
CPU0: Intel(R) Core(TM)2 CPU          6300  @ 1.86GHz stepping 06
Intel(R) Core(TM)2 CPU          6300  @ 1.86GHz stepping 06
Memory: 4037276k/5242880k available (2106k kernel code, 0k reserved, 1299k data, 196k init)
Calibrating delay using timer specific routine.. 4671.63 BogoMIPS (lpj=2335817)
Calibrating delay using timer specific routine.. 4668.49 BogoMIPS (lpj=2334245)
Total of 2 processors activated (9340.12 BogoMIPS).

Core 2 Duo E6300@2.33GHz

6695928202484655635452379415298947471387647632758248358468768790611612165249036732543960482350604990882306999581263998199946873<127>

180048411580101335807564711501968399<36>
12885467681488848348054410283777960509393<41>
2886166011333284120917867347222492944354289914055239<52>

Number: 75557_154
N=6695928202484655635452379415298947471387647632758248358468768790611612165249036732543960482350604990882306999581263998199946873
  ( 127 digits)
SNFS difficulty: 156 digits.
Divisors found:
 r1=180048411580101335807564711501968399 (pp36)
 r2=12885467681488848348054410283777960509393 (pp41)
 r3=2886166011333284120917867347222492944354289914055239 (pp52)
Version: GGNFS-0.77.1-20060722-pentium4
Total time: 35.03 hours.
Scaled time: 23.96 units (timescale=0.684).
Factorization parameters were as follows:
n: 6695928202484655635452379415298947471387647632758248358468768790611612165249036732543960482350604990882306999581263998199946873
m: 10000000000000000000000000000000
c5: 34
c0: 65
skew: 1.14
type: snfs
Factor base limits: 3000000/3000000
Large primes per side: 3
Large prime bits: 27/27
Max factor residue bits: 48/48
Sieved algebraic special-q in [1500000, 2700001)
Primes: RFBsize:216816, AFBsize:216756, largePrimes:5724145 encountered
Relations: rels:5759916, finalFF:625672
Max relations in full relation-set: 32
Initial matrix: 433638 x 625672 with sparse part having weight 52507304.
Pruned matrix : 324341 x 326573 with weight 31231916.
Total sieving time: 29.41 hours.
Total relation processing time: 0.26 hours.
Matrix solve time: 5.20 hours.
Time per square root: 0.17 hours.
Prototype def-par.txt line would be:
snfs,156,5,0,0,0,0,0,0,0,0,3000000,3000000,27,27,48,48,2.3,2.3,100000
total time: 35.03 hours.
 --------- CPU info (if available) ----------

Pentium 4 2.4GHz, Windows 2000 and Cygwin

28406732477697117682136345726381636050128121431425594294290731080826521212711193096225911030485159627911792905855674723329202781314047<134>

557831249566315798418346398963812640291677422857<48>
50923523018443023950549144339844652596348663112551716875431260247044827931812945961671<86>

Number: n
N=28406732477697117682136345726381636050128121431425594294290731080826521212711193096225911030485159627911792905855674723329202781314047
  ( 134 digits)
SNFS difficulty: 156 digits.
Divisors found:
 r1=557831249566315798418346398963812640291677422857 (pp48)
 r2=50923523018443023950549144339844652596348663112551716875431260247044827931812945961671 (pp86)
Version: GGNFS-0.77.1-20051202-athlon
Total time: 25.88 hours.
Scaled time: 37.40 units (timescale=1.445).
Factorization parameters were as follows:
name: KA_7_5_154_7
n: 28406732477697117682136345726381636050128121431425594294290731080826521212711193096225911030485159627911792905855674723329202781314047
skew: 0.72
deg: 5
c5: 68
c0: 13
m: 10000000000000000000000000000000
type: snfs
rlim: 3000000
alim: 3000000
lpbr: 28
lpba: 28
mfbr: 48
mfba: 48
rlambda: 2.5
alambda: 2.5
qintsize: 100000
Factor base limits: 3000000/3000000
Large primes per side: 3
Large prime bits: 28/28
Max factor residue bits: 48/48
Sieved algebraic special-q in [100000, 1200001)
Primes: RFBsize:216816, AFBsize:217331, largePrimes:6856703 encountered
Relations: rels:6351061, finalFF:504197
Max relations in full relation-set: 28
Initial matrix: 434213 x 504197 with sparse part having weight 32033747.
Pruned matrix : 373953 x 376188 with weight 19778157.
Total sieving time: 22.57 hours.
Total relation processing time: 0.18 hours.
Matrix solve time: 3.07 hours.
Total square root time: 0.06 hours, sqrts: 1.
Prototype def-par.txt line would be:
snfs,156,5,0,0,0,0,0,0,0,0,3000000,3000000,28,28,48,48,2.5,2.5,100000
total time: 25.88 hours.
 --------- CPU info (if available) ----------

Cygwin on AMD 64 3400+

231247683272290746351897761318383850750024655083878295704574283217199386513499083511019972318292031816960657287532689240521395511754523782804014187725509<153>

31355131076919367852714514174234199910740419431555686047929<59>
7375114545207978805546688095481618474842984019533230866001850209009963716005668089754841511021<94>

Number: n
N=231247683272290746351897761318383850750024655083878295704574283217199386513499083511019972318292031816960657287532689240521395511754523782804014187725509
  ( 153 digits)
SNFS difficulty: 158 digits.
Divisors found:
 r1=31355131076919367852714514174234199910740419431555686047929 (pp59)
 r2=7375114545207978805546688095481618474842984019533230866001850209009963716005668089754841511021 (pp94)
Version: GGNFS-0.77.1-20051202-athlon
Total time: 47.14 hours.
Scaled time: 38.93 units (timescale=0.826).
Factorization parameters were as follows:
name: KA_7_5_155_7
n: 231247683272290746351897761318383850750024655083878295704574283217199386513499083511019972318292031816960657287532689240521395511754523782804014187725509
skew: 0.91
deg: 5
c5: 85
c0: 52
m: 20000000000000000000000000000000
type: snfs
rlim: 3000000
alim: 3000000
lpbr: 28
lpba: 28
mfbr: 48
mfba: 48
rlambda: 2.5
alambda: 2.5
qintsize: 100000
Factor base limits: 3000000/3000000
Large primes per side: 3
Large prime bits: 28/28
Max factor residue bits: 48/48
Sieved  special-q in [1500000, 1500000)
Primes: RFBsize:216816, AFBsize:216711, largePrimes:7114301 encountered
Relations: rels:6617701, finalFF:528432
Max relations in full relation-set: 28
Initial matrix: 433594 x 528432 with sparse part having weight 42665152.
Pruned matrix : 357775 x 360006 with weight 24579218.
Total sieving time: 42.61 hours.
Total relation processing time: 0.41 hours.
Matrix solve time: 3.98 hours.
Total square root time: 0.14 hours, sqrts: 1.
Prototype def-par.txt line would be:
snfs,158,5,0,0,0,0,0,0,0,0,3000000,3000000,28,28,48,48,2.5,2.5,100000
total time: 47.14 hours.
 --------- CPU info (if available) ----------
CPU: AMD Athlon(tm) XP 2100+ stepping 02
Memory: 904260k/917504k available (1815k kernel code, 12496k reserved, 846k data, 272k init, 0k highmem)
Calibrating delay loop... 3440.64 BogoMIPS

10021858405643136835110663638106493348996711376408485617314301858636084358685512690994172006148128480343234388008600600371800369<128>

1817556499049832315979311388016701905830557<43>
5513918500405508167982559945335390530223566166104141567423964571081382710408776663717<85>

Number: n
N=10021858405643136835110663638106493348996711376408485617314301858636084358685512690994172006148128480343234388008600600371800369
  ( 128 digits)
SNFS difficulty: 161 digits.
Divisors found:

Fri Oct 26 04:07:36 2007  prp43 factor: 1817556499049832315979311388016701905830557
Fri Oct 26 04:07:36 2007  prp85 factor: 5513918500405508167982559945335390530223566166104141567423964571081382710408776663717
Fri Oct 26 04:07:36 2007  elapsed time 01:12:41 (Msieve 1.28)

Version: GGNFS-0.77.1-20060513-athlon-xp
Total time: 35.05 hours.
Scaled time: 45.84 units (timescale=1.308).
Factorization parameters were as follows:
name: KA_7_5_158_7
n: 10021858405643136835110663638106493348996711376408485617314301858636084358685512690994172006148128480343234388008600600371800369
skew: 1.14
deg: 5
c5: 34
c0: 65
m: 100000000000000000000000000000000
type: snfs
rlim: 3000000
alim: 3000000
lpbr: 28
lpba: 28
mfbr: 48
mfba: 48
rlambda: 2.5
alambda: 2.5
qintsize: 100000
Factor base limits: 3000000/3000000
Large primes per side: 3
Large prime bits: 28/28
Max factor residue bits: 48/48
Sieved  special-q in [100000, 1700001)
Primes: RFBsize:216816, AFBsize:216756, largePrimes:7052915 encountered
Relations: rels:6510490, finalFF:471406
Max relations in full relation-set: 28
Initial matrix: 
Pruned matrix : 
Total sieving time: 34.83 hours.
Total relation processing time: 0.22 hours.
Matrix solve time: 0.00 hours.
Total square root time: 0.00 hours, sqrts: 0.
Prototype def-par.txt line would be:
snfs,161,5,0,0,0,0,0,0,0,0,3000000,3000000,28,28,48,48,2.5,2.5,100000
total time: 35.05 hours.
 --------- CPU info (if available) ----------

Cygwin on AMD 64 3200+

103550379308220275542310045522274995058308499116008352769830405684729022693055150581242133006534481024514566056854884998045901353617827387408730421871<150>

17985186201587473669314610148901419<35>
397989410018895033644398024474036815977092109203982240519<57>
14466558893742234502005420987466649404111592901097703772811<59>

GMP-ECM 6.0.1 [powered by GMP 4.1.4] [ECM]
Input number is 103550379308220275542310045522274995058308499116008352769830405684729022693055150581242133006534481024514566056854884998045901353617827387408730421871 (150 digits)
Using B1=2220000, B2=2615412089, polynomial Dickson(6), sigma=43704014
Step 1 took 35094ms
Step 2 took 17562ms
********** Factor found in step 2: 17985186201587473669314610148901419
Found probable prime factor of 35 digits: 17985186201587473669314610148901419
Composite cofactor 5757537239124070718550706302077403581327869498093808787670412687981204498446980968064332802066081638503147134728909 has 115 digits

Number: n
N=5757537239124070718550706302077403581327869498093808787670412687981204498446980968064332802066081638503147134728909
  ( 115 digits)
SNFS difficulty: 168 digits.
Divisors found:

Thu Jan 17 18:45:16 2008  prp57 factor: 397989410018895033644398024474036815977092109203982240519
Thu Jan 17 18:45:16 2008  prp59 factor: 14466558893742234502005420987466649404111592901097703772811
Thu Jan 17 18:45:16 2008  elapsed time 02:21:00 (Msieve 1.33)

Version: GGNFS-0.77.1-20051202-athlon
Total time: 92.58 hours.
Scaled time: 162.30 units (timescale=1.753).
Factorization parameters were as follows:
name: KA_7_5_165_7
n: 5757537239124070718550706302077403581327869498093808787670412687981204498446980968064332802066081638503147134728909

# n: 103550379308220275542310045522274995058308499116008352769830405684729022693055150581242133006534481024514566056854884998045901353617827387408730421871

type: snfs
skew: 0.91
deg: 5
c5: 85
c0: 52
m: 2000000000000000000000000000000000
rlim: 3200000
alim: 3200000
lpbr: 28
lpba: 28
mfbr: 48
mfba: 48
qintsize: 100000
Factor base limits: 3200000/3200000
Large primes per side: 3
Large prime bits: 28/28
Max factor residue bits: 48/48
Sieved  special-q in [100000, 4100263)
Primes: RFBsize:230209, AFBsize:229927, largePrimes:7782959 encountered
Relations: rels:7221963, finalFF:514347
Max relations in full relation-set: 28
Initial matrix: 
Pruned matrix : 
Total sieving time: 92.26 hours.
Total relation processing time: 0.32 hours.
Matrix solve time: 0.00 hours.
Total square root time: 0.00 hours, sqrts: 0.
Prototype def-par.txt line would be:
snfs,168,5,0,0,0,0,0,0,0,0,3200000,3200000,28,28,48,48,2.6,2.6,100000
total time: 92.58 hours.
 --------- CPU info (if available) ----------

Cygwin on AMD 64 3200+

862720191055370426409187832685236228895646134693978735857012571110151934022354543430530334015543289916386083309198010532757969931<129>

1277051303251277396745439863477632923199<40>
675556407842777457227772829257886093211284966360659547830383521551498877804611413980290869<90>

GMP-ECM 6.2.3 [powered by GMP 4.3.1] [ECM]
Input number is 862720191055370426409187832685236228895646134693978735857012571110151934022354543430530334015543289916386083309198010532757969931 (129 digits)
Using B1=3000000, B2=5706890290, polynomial Dickson(6), sigma=1210827030
Step 1 took 10042ms
Step 2 took 5075ms
********** Factor found in step 2: 1277051303251277396745439863477632923199
Found probable prime factor of 40 digits: 1277051303251277396745439863477632923199
Probable prime cofactor 675556407842777457227772829257886093211284966360659547830383521551498877804611413980290869 has 90 digits

Core 2 Quad Q6700

2065870518448222210720184306273737972536019599351086981014324864658670295574819372813802017742419067114789223438694886786057516429723926086907873394376951391291033<163>

12564720581656893961516793698787<32>
7968617766944774753846532883783787495699428027<46>
20633232290617592691462578937718847171342995492350851612982494029893918840047147814217<86>

GMP-ECM 6.2.1 [powered by GMP 4.2.1] [ECM]
Input number is 2065870518448222210720184306273737972536019599351086981014324864658670295574819372813802017742419067114789223438694886786057516429723926086907873394376951391291033 (163 digits)
Using B1=290000, B2=172085560, polynomial Dickson(3), sigma=929903015
Step 1 took 3703ms
Step 2 took 1859ms
********** Factor found in step 2: 12564720581656893961516793698787
Found probable prime factor of 32 digits: 12564720581656893961516793698787
Composite cofactor 164418341420513981191767033032572250364100248544748569751915035921047786398535014962302739673567607106739107738403172999090158859859 has 132 digits


GMP-ECM 6.2.1 [powered by GMP 4.2.1] [ECM]
Input number is 164418341420513981191767033032572250364100248544748569751915035921047786398535014962302739673567607106739107738403172999090158859859 (132 digits)
Using B1=3744000, B2=8561285470, polynomial Dickson(6), sigma=1706818246
Step 1 took 36187ms
Step 2 took 15657ms
********** Factor found in step 2: 7968617766944774753846532883783787495699428027
Found probable prime factor of 46 digits: 7968617766944774753846532883783787495699428027
Probable prime cofactor 20633232290617592691462578937718847171342995492350851612982494029893918840047147814217 has 86 digits

19716246185894239629742739170650828004511617009064522703224254501415261051607160565396940846004253345926016135263526079008582419132062151732763<143>

23839585429968260174265553579269018490660487<44>

827038131338867400594187976741748355884015349016991665314607084014181746469763768683616779908844749<99>

Using B1=3000000, B2=5706890290, polynomial Dickson(6), sigma=1694953640
Step 1 took 42454ms
Step 2 took 14836ms
********** Factor found in step 2: 23839585429968260174265553579269018490660487
Found probable prime factor of 44 digits: 23839585429968260174265553579269018490660487
Composite cofactor 827038131338867400594187976741748355884015349016991665314607084014181746469763768683616779908844749 has 99 digits

GMP-ECM 6.2.1

827038131338867400594187976741748355884015349016991665314607084014181746469763768683616779908844749<99>

3094951329199020842510313392944073185116931701059<49>
267221692159180547256882648639110381886247612020911<51>

Tue Jun 16 22:04:28 2009  Msieve v. 1.42
Tue Jun 16 22:04:28 2009  random seeds: ea0da198 42de2300
Tue Jun 16 22:04:28 2009  factoring 827038131338867400594187976741748355884015349016991665314607084014181746469763768683616779908844749 (99 digits)
Tue Jun 16 22:04:28 2009  searching for 15-digit factors
Tue Jun 16 22:04:30 2009  commencing quadratic sieve (99-digit input)
Tue Jun 16 22:04:30 2009  using multiplier of 5
Tue Jun 16 22:04:30 2009  using 32kb Intel Core sieve core
Tue Jun 16 22:04:30 2009  sieve interval: 36 blocks of size 32768
Tue Jun 16 22:04:30 2009  processing polynomials in batches of 6
Tue Jun 16 22:04:30 2009  using a sieve bound of 2642771 (96471 primes)
Tue Jun 16 22:04:30 2009  using large prime bound of 396415650 (28 bits)
Tue Jun 16 22:04:30 2009  using double large prime bound of 2996893989271350 (43-52 bits)
Tue Jun 16 22:04:30 2009  using trial factoring cutoff of 52 bits
Tue Jun 16 22:04:30 2009  polynomial 'A' values have 13 factors
Tue Jun 16 22:04:42 2009  restarting with 20829 full and 1327127 partial relations
Tue Jun 16 22:45:30 2009  96657 relations (22826 full + 73831 combined from 1456926 partial), need 96567
Tue Jun 16 22:45:42 2009  begin with 1479752 relations
Tue Jun 16 22:45:43 2009  reduce to 256034 relations in 11 passes
Tue Jun 16 22:45:43 2009  attempting to read 256034 relations
Tue Jun 16 22:45:47 2009  recovered 256034 relations
Tue Jun 16 22:45:47 2009  recovered 247013 polynomials
Tue Jun 16 22:45:47 2009  attempting to build 96657 cycles
Tue Jun 16 22:45:47 2009  found 96655 cycles in 5 passes
Tue Jun 16 22:45:47 2009  distribution of cycle lengths:
Tue Jun 16 22:45:47 2009     length 1 : 22826
Tue Jun 16 22:45:47 2009     length 2 : 16496
Tue Jun 16 22:45:47 2009     length 3 : 16148
Tue Jun 16 22:45:47 2009     length 4 : 13213
Tue Jun 16 22:45:47 2009     length 5 : 10056
Tue Jun 16 22:45:47 2009     length 6 : 7061
Tue Jun 16 22:45:47 2009     length 7 : 4484
Tue Jun 16 22:45:47 2009     length 9+: 6371
Tue Jun 16 22:45:47 2009  largest cycle: 19 relations
Tue Jun 16 22:45:47 2009  matrix is 96471 x 96655 (25.0 MB) with weight 6159330 (63.72/col)
Tue Jun 16 22:45:47 2009  sparse part has weight 6159330 (63.72/col)
Tue Jun 16 22:45:48 2009  filtering completed in 3 passes
Tue Jun 16 22:45:48 2009  matrix is 92701 x 92765 (24.1 MB) with weight 5939028 (64.02/col)
Tue Jun 16 22:45:48 2009  sparse part has weight 5939028 (64.02/col)
Tue Jun 16 22:45:48 2009  saving the first 48 matrix rows for later
Tue Jun 16 22:45:48 2009  matrix is 92653 x 92765 (13.4 MB) with weight 4416948 (47.61/col)
Tue Jun 16 22:45:48 2009  sparse part has weight 2953275 (31.84/col)
Tue Jun 16 22:45:48 2009  matrix includes 64 packed rows
Tue Jun 16 22:45:48 2009  using block size 37106 for processor cache size 2048 kB
Tue Jun 16 22:45:49 2009  commencing Lanczos iteration
Tue Jun 16 22:45:49 2009  memory use: 14.2 MB
Tue Jun 16 22:46:25 2009  lanczos halted after 1466 iterations (dim = 92652)
Tue Jun 16 22:46:25 2009  recovered 17 nontrivial dependencies
Tue Jun 16 22:46:26 2009  prp49 factor: 3094951329199020842510313392944073185116931701059
Tue Jun 16 22:46:26 2009  prp51 factor: 267221692159180547256882648639110381886247612020911
Tue Jun 16 22:46:26 2009  elapsed time 00:41:58
Tue Jun 16 22:46:26 2009  total time 07:44:45

Msieve v. 1.42

Intel Core 2 Duo / windows Vista 32bit

8834011550082961570244632107524709874248369610339476895245395710746521446283572650471917371886973695062656009852723821223435749028679163809470732622166742120828421<163>

6610570985981893588217485599928065911900503<43>
580045643086614207620043405574822802210547317327758301137<57>
2303863904620842108302141414515874627622737561828500894022443411<64>

SNFS difficulty: 174 digits.
Divisors found:
 r1=6610570985981893588217485599928065911900503
 r2=580045643086614207620043405574822802210547317327758301137
 r3=2303863904620842108302141414515874627622737561828500894022443411
Version:
Total time: 0.00 hours.
Scaled time: 0.00 units (timescale=2.596).
Factorization parameters were as follows:
n: 8834011550082961570244632107524709874248369610339476895245395710746521446283572650471917371886973695062656009852723821223435749028679163809470732622166742120828421
m: 20000000000000000000000000000000000
c5: 2125
c0: 13
skew: 0.36
type: snfs
Factor base limits: 7400000/7400000
Large primes per side: 3
Large prime bits: 27/27
Max factor residue bits: 54/54
Sieved rational special-q in [3700000, 7200001)
Primes: rational ideals reading, algebraic ideals reading,
Relations: relations
Max relations in full relation-set:
Initial matrix:
Pruned matrix : 1243431 x 1243679
Total sieving time: 0.00 hours.
Total relation processing time: 0.00 hours.
Matrix solve time: 6.00 hours.
Time per square root: 0.20 hours.
Prototype def-par.txt line would be:
snfs,174,5,0,0,0,0,0,0,0,0,7400000,7400000,27,27,54,54,2.6,2.6,100000
total time: 61.00 hours.

Msieve-1.38

Opteron-2.6GHz; Linux x86_64

22986322408474328203431858468405754957984714151921721824354069110119354382538348033287424619686476904040782619231127614975242049592409031233417483<146>

889778249324442069574412212372999625505956157674183594353874137<63>
25833765239739826393700884821527012373871080613359263121118997962265917818925168259<83>

N = 22986322408474328203431858468405754957984714151921721824354069110119354382538348033287424619686476904040782619231127614975242049592409031233417483 (146 digits)
SNFS difficulty: 177 digits.
Divisors found:
r1=889778249324442069574412212372999625505956157674183594353874137 (pp63)
r2=25833765239739826393700884821527012373871080613359263121118997962265917818925168259 (pp83)
Version: Msieve v. 1.48
Total time: 29.79 hours.
Factorization parameters were as follows:
name: (68*10^174+13)/9
n: 22986322408474328203431858468405754957984714151921721824354069110119354382538348033287424619686476904040782619231127614975242049592409031233417483
Y0: 100000000000000000000000000000000000
Y1: -1
c0: 65
c1: 0
c2: 0
c3: 0
c4: 0
c5: 34
skew: 1.14
type: snfs
Factor base limits: 6200000/6200000
Large primes per side: 3
Large prime bits: 28/28
Sieved rational special-q in [0, 0)
Total raw relations: 19891271
Relations: 2359726 relations
Pruned matrix : 1330333 x 1330558
Polynomial selection time: 0.00 hours.
Total sieving time: 27.09 hours.
Total relation processing time: 0.12 hours.
Matrix solve time: 2.20 hours.
time per square root: 0.37 hours.
Prototype def-par.txt line would be: snfs,177,5,0,0,0,0,0,0,0,0,6200000,6200000,28,28,55,55,2.5,2.5,100000
total time: 29.79 hours.
Intel64 Family 6 Model 42 Stepping 7, GenuineIntel
Windows-7-6.1.7601-SP1
processors: 4, speed: 2.29GHz

579616003064526671364672737350309639501643061906225085068535480706896349055675797567099327612021619991718511041217279904827488668827251733728646820054889697346643<162>

61499783674705715013994867994797219247<38>
9424683607511896085514355635820486485308240780823207867263952190529956822549783566102354491234555633959842493282646854643869<124>

Using B1=3000000, B2=5706890290, polynomial Dickson(6), sigma=502881092
Step 1 took 13301ms
Step 2 took 5633ms
********** Factor found in step 2: 61499783674705715013994867994797219247
Found probable prime factor of 38 digits: 61499783674705715013994867994797219247
Probable prime cofactor 9424683607511896085514355635820486485308240780823207867263952190529956822549783566102354491234555633959842493282646854643869 has 124 digits

GMP-ECM 6.3

19002560536398462986444947365434462778840557025664755805659649097974796254106347812959786916230009202093830832252798178282987778994019939674365761673640486251353<161>

3759272077685572932776755110848729<34>
5054851083855986065181001188548132398862809452516342776009237468436716997481751195363335332741767081048678706475260997317232257<127>

Using B1=1000000, B2=1045563762, polynomial Dickson(6), sigma=184370780
Step 1 took 7426ms
Step 2 took 5304ms
********** Factor found in step 2: 3759272077685572932776755110848729
Found probable prime factor of 34 digits: 3759272077685572932776755110848729
Probable prime cofactor 5054851083855986065181001188548132398862809452516342776009237468436716997481751195363335332741767081048678706475260997317232257 has 127 digits

GMP-ECM 6.3

396960053974672360629434129847333425766592325207351158388636761457353113962117256887634388606842817953411475526616527902319<123>

57629319515256167066500951939735023830699563<44>
6888161396207106342594867165412911745264595604363393849592578966611969346616013<79>

GMP-ECM 6.2.1 [powered by GMP 4.2.2] [ECM]
Using B1=11000000, B2=96175819756, polynomial Dickson(12), sigma=3760020196
Step 1 took 57202ms
Step 2 took 37064ms
********** Factor found in step 2: 57629319515256167066500951939735023830699563
Found probable prime factor of 44 digits: 57629319515256167066500951939735023830699563
Probable prime cofactor 6888161396207106342594867165412911745264595604363393849592578966611969346616013 has 79 digits

7280318259575944310948513279511057239530488713470662942504857414098138654255884718604236227922160264480070339570791420069787818540722135920829<142>

37313362308462407665244421494623790294430113<44>
3958574505158962958653960900115165284707772499<46>
49288676489914448649496313972309527029716435165810767<53>

N=7280318259575944310948513279511057239530488713470662942504857414098138654255884718604236227922160264480070339570791420069787818540722135920829
  ( 142 digits)
SNFS difficulty: 182 digits.
Divisors found:
 r1=37313362308462407665244421494623790294430113 (pp44)
 r2=3958574505158962958653960900115165284707772499 (pp46)
 r3=49288676489914448649496313972309527029716435165810767 (pp53)
Version: Msieve-1.40
Total time: 181.68 hours.
Scaled time: 304.32 units (timescale=1.675).
Factorization parameters were as follows:
n: 7280318259575944310948513279511057239530488713470662942504857414098138654255884718604236227922160264480070339570791420069787818540722135920829
m: 1000000000000000000000000000000000000
deg: 5
c5: 680
c0: 13
skew: 0.45
type: snfs
lss: 1
rlim: 7800000
alim: 7800000
lpbr: 28
lpba: 28
mfbr: 53
mfba: 53
rlambda: 2.5
alambda: 2.5
qintsize: 240000Factor base limits: 7800000/7800000
Large primes per side: 3
Large prime bits: 28/28
Max factor residue bits: 53/53
Sieved rational special-q in [3900000, 6540001)
Primes: , , 
Relations: relations 
Max relations in full relation-set: 
Initial matrix: 
Pruned matrix : 1368269 x 1368495
Total sieving time: 178.36 hours.
Total relation processing time: 0.19 hours.
Matrix solve time: 2.59 hours.
Time per square root: 0.54 hours.
Prototype def-par.txt line would be:
snfs,182.000,5,0,0,0,0,0,0,0,0,7800000,7800000,28,28,53,53,2.5,2.5,100000
total time: 181.68 hours.
 --------- CPU info (if available) ----------

65038239641646510969017418741575653433901581873970478081113945715323568764203382021927445059468824434870923028908183471231180265657810562846515540247806026857<158>

9833788521482342874255027064632769811149264154283002640403<58>
6613752115938594808002514896265344659637114413510318652922135228825869100046595695320370240117766419<100>

N=65038239641646510969017418741575653433901581873970478081113945715323568764203382021927445059468824434870923028908183471231180265657810562846515540247806026857
  ( 158 digits)
SNFS difficulty: 183 digits.
Divisors found:
 r1=9833788521482342874255027064632769811149264154283002640403 (pp58)
 r2=6613752115938594808002514896265344659637114413510318652922135228825869100046595695320370240117766419 (pp100)
Version: Msieve-1.40
Total time: 167.79 hours.
Scaled time: 270.48 units (timescale=1.612).
Factorization parameters were as follows:
n: 65038239641646510969017418741575653433901581873970478081113945715323568764203382021927445059468824434870923028908183471231180265657810562846515540247806026857
m: 1000000000000000000000000000000000000
deg: 5
c5: 6800
c0: 13
skew: 0.29
type: snfs
lss: 1
rlim: 8100000
alim: 8100000
lpbr: 28
lpba: 28
mfbr: 53
mfba: 53
rlambda: 2.5
alambda: 2.5
qintsize: 240000Factor base limits: 8100000/8100000
Large primes per side: 3
Large prime bits: 28/28
Max factor residue bits: 53/53
Sieved rational special-q in [4050000, 6450001)
Primes: , , 
Relations: relations 
Max relations in full relation-set: 
Initial matrix: 
Pruned matrix : 1372226 x 1372456
Total sieving time: 164.81 hours.
Total relation processing time: 0.16 hours.
Matrix solve time: 2.62 hours.
Time per square root: 0.20 hours.
Prototype def-par.txt line would be:
snfs,183.000,5,0,0,0,0,0,0,0,0,8100000,8100000,28,28,53,53,2.5,2.5,100000
total time: 167.79 hours.
 --------- CPU info (if available) ----------

99421048839914622484443912728569273810536146547646295623724670591967423905371458650723173418815953371758938058854355382787634425905999704185474023094922742591825320078549448809<176>

566929178636491404971393930002423464962010394380735187958801890331447<69>
175367669519198054268447704632970567624214818165080562564092836944807042029550112060401792033269270693636447<108>

N=99421048839914622484443912728569273810536146547646295623724670591967423905371458650723173418815953371758938058854355382787634425905999704185474023094922742591825320078549448809
  ( 176 digits)
SNFS difficulty: 187 digits.
Divisors found:
 r1=566929178636491404971393930002423464962010394380735187958801890331447 (pp69)
 r2=175367669519198054268447704632970567624214818165080562564092836944807042029550112060401792033269270693636447 (pp108)
Version: Msieve v. 1.48
Total time:
Scaled time: 29.97 units (timescale=0.607).
Factorization parameters were as follows:
n: 99421048839914622484443912728569273810536146547646295623724670591967423905371458650723173418815953371758938058854355382787634425905999704185474023094922742591825320078549448809
m: 10000000000000000000000000000000000000
deg: 5
c5: 680
c0: 13
skew: 0.45
type: snfs
lss: 1
rlim: 9500000
alim: 9500000
lpbr: 28
lpba: 28
mfbr: 54
mfba: 54
rlambda: 2.5
alambda: 2.5
qintsize: 320000
Factor base limits: 9500000/9500000
Large primes per side: 3
Large prime bits: 28/28
Max factor residue bits: 54/54
Sieved rational special-q in [4750000, 14030001)
Primes: , , 
Relations: relations 
Max relations in full relation-set: 
Initial matrix: 
Pruned matrix : 1993110 x 1993339
Total sieving time:
Total relation processing time:
Matrix solve time:
Time per square root:
Prototype def-par.txt line would be:
snfs,187.000,5,0,0,0,0,0,0,0,0,9500000,9500000,28,28,54,54,2.5,2.5,100000
total time:

140491534853109484986754548242952399389515438770363777285457862248011616087412384135885187516878636187876872889038035235947402642391<132>

21939212661835322706547954740398530226975027089139283247<56>
6403672593843970664623379894217874074465248697575876121161699354374495764953<76>

#.poly selected by Jeff Gilchrist

Msieve v. 1.49 (SVN 575)
Sat May 28 17:09:37 2011
random seeds: 0eec8289 ec364a0b
factoring 140491534853109484986754548242952399389515438770363777285457862248011616087412384135885187516878636187876872889038035235947402642391 (132 digits)
searching for 15-digit factors
commencing number field sieve (132-digit input)
R0: -19828123453435259353602040
R1:  286324364531239
A0:  40009859384266013014481207169
A1:  104466149555195946470101054
A2:  948509336049825522348
A3: -4553911342473909
A4: -18441570302
A5:  45840
skew 206649.46, size 1.246e-12, alpha -5.219, combined = 6.909e-11 rroots = 5

commencing relation filtering
estimated available RAM is 16080.1 MB
commencing duplicate removal, pass 1
error -9 reading relation 7312431
read 10M relations
error -11 reading relation 14348644
read 20M relations
read 30M relations
error -15 reading relation 30042771
read 40M relations
skipped 1 relations with b > 2^32
found 5489816 hash collisions in 45466536 relations
added 121592 free relations
commencing duplicate removal, pass 2
found 4469164 duplicates and 41118964 unique relations
memory use: 197.2 MB
reading ideals above 720000
commencing singleton removal, initial pass
memory use: 753.0 MB
reading all ideals from disk
memory use: 1288.7 MB
keeping 40120899 ideals with weight <= 200, target excess is 214036
commencing in-memory singleton removal
begin with 41118963 relations and 40120899 unique ideals
reduce to 20226381 relations and 16199920 ideals in 16 passes
max relations containing the same ideal: 135
removing 2575640 relations and 2175640 ideals in 400000 cliques
commencing in-memory singleton removal
begin with 17650741 relations and 16199920 unique ideals
reduce to 17475912 relations and 13845443 ideals in 10 passes
max relations containing the same ideal: 117
removing 1886331 relations and 1486331 ideals in 400000 cliques
commencing in-memory singleton removal
begin with 15589581 relations and 13845443 unique ideals
reduce to 15474984 relations and 12242124 ideals in 7 passes
max relations containing the same ideal: 106
removing 1668009 relations and 1268009 ideals in 400000 cliques
commencing in-memory singleton removal
begin with 13806975 relations and 12242124 unique ideals
reduce to 13705926 relations and 10870863 ideals in 7 passes
max relations containing the same ideal: 98
removing 1532999 relations and 1132999 ideals in 400000 cliques
commencing in-memory singleton removal
begin with 12172927 relations and 10870863 unique ideals
reduce to 12071324 relations and 9633784 ideals in 7 passes
max relations containing the same ideal: 91
removing 1454610 relations and 1054610 ideals in 400000 cliques
commencing in-memory singleton removal
begin with 10616714 relations and 9633784 unique ideals
reduce to 10510662 relations and 8470318 ideals in 8 passes
max relations containing the same ideal: 84
removing 1392744 relations and 992744 ideals in 400000 cliques
commencing in-memory singleton removal
begin with 9117918 relations and 8470318 unique ideals
reduce to 9005350 relations and 7361487 ideals in 6 passes
max relations containing the same ideal: 77
removing 1350039 relations and 950039 ideals in 400000 cliques
commencing in-memory singleton removal
begin with 7655311 relations and 7361487 unique ideals
reduce to 7531769 relations and 6283263 ideals in 7 passes
max relations containing the same ideal: 67
removing 1323861 relations and 923861 ideals in 400000 cliques
commencing in-memory singleton removal
begin with 6207908 relations and 6283263 unique ideals
reduce to 6072038 relations and 5217596 ideals in 8 passes
max relations containing the same ideal: 59
removing 1280686 relations and 880686 ideals in 400000 cliques
commencing in-memory singleton removal
begin with 4791352 relations and 5217596 unique ideals
reduce to 4610408 relations and 4145154 ideals in 8 passes
max relations containing the same ideal: 48
removing 794217 relations and 577245 ideals in 216972 cliques
commencing in-memory singleton removal
begin with 3816191 relations and 4145154 unique ideals
reduce to 3725659 relations and 3473671 ideals in 7 passes
max relations containing the same ideal: 43
relations with 0 large ideals: 622
relations with 1 large ideals: 9262
relations with 2 large ideals: 94752
relations with 3 large ideals: 401693
relations with 4 large ideals: 883736
relations with 5 large ideals: 1095072
relations with 6 large ideals: 796493
relations with 7+ large ideals: 444029
commencing 2-way merge
reduce to 2410840 relation sets and 2158852 unique ideals
commencing full merge
memory use: 251.7 MB
found 1235839 cycles, need 1199052
weight of 1199052 cycles is about 84045595 (70.09/cycle)
distribution of cycle lengths:
1 relations: 112037
2 relations: 127188
3 relations: 138407
4 relations: 136732
5 relations: 129179
6 relations: 116275
7 relations: 99763
8 relations: 83305
9 relations: 67909
10+ relations: 188257
heaviest cycle: 18 relations
commencing cycle optimization
start with 6875565 relations
pruned 207488 relations
memory use: 220.1 MB
distribution of cycle lengths:
1 relations: 112037
2 relations: 130167
3 relations: 144026
4 relations: 141139
5 relations: 134096
6 relations: 119353
7 relations: 102128
8 relations: 83797
9 relations: 66977
10+ relations: 165332
heaviest cycle: 18 relations
RelProcTime: 1547

commencing linear algebra
read 1199052 cycles
cycles contain 3562864 unique relations
read 3562864 relations
using 20 quadratic characters above 536869902
building initial matrix
memory use: 462.8 MB
read 1199052 cycles
matrix is 1198867 x 1199052 (356.9 MB) with weight 113029437 (94.27/col)
sparse part has weight 80365895 (67.02/col)
filtering completed in 2 passes
matrix is 1197827 x 1198012 (356.8 MB) with weight 112980382 (94.31/col)
sparse part has weight 80346007 (67.07/col)
matrix starts at (0, 0)
matrix is 1197827 x 1198012 (356.8 MB) with weight 112980382 (94.31/col)
sparse part has weight 80346007 (67.07/col)
saving the first 48 matrix rows for later
matrix includes 64 packed rows
matrix is 1197779 x 1198012 (344.7 MB) with weight 89145598 (74.41/col)
sparse part has weight 78375256 (65.42/col)
using block size 262144 for processor cache size 6144 kB
commencing Lanczos iteration (6 threads)
memory use: 419.9 MB
linear algebra at 0.1%, ETA 1h31m1198012 dimensions (0.1%, ETA 1h31m)    
checkpointing every 730000 dimensions012 dimensions (0.2%, ETA 1h38m)    
linear algebra completed 1197680 of 1198012 dimensions (100.0%, ETA 0h 0m)    
lanczos halted after 18943 iterations (dim = 1197777)
recovered 29 nontrivial dependencies
BLanczosTime: 5817

commencing square root phase
reading relations for dependency 1
read 598715 cycles
cycles contain 1781698 unique relations
read 1781698 relations
multiplying 1781698 relations
multiply complete, coefficients have about 83.52 million bits
initial square root is modulo 989011
GCD is 1, no factor found
reading relations for dependency 2
read 599530 cycles
cycles contain 1781904 unique relations
read 1781904 relations
multiplying 1781904 relations
multiply complete, coefficients have about 83.53 million bits
initial square root is modulo 991027
GCD is 1, no factor found
reading relations for dependency 3
read 598508 cycles
cycles contain 1781520 unique relations
read 1781520 relations
multiplying 1781520 relations
multiply complete, coefficients have about 83.52 million bits
initial square root is modulo 988129
GCD is N, no factor found
reading relations for dependency 4
read 599209 cycles
cycles contain 1781294 unique relations
read 1781294 relations
multiplying 1781294 relations
multiply complete, coefficients have about 83.50 million bits
initial square root is modulo 985903
GCD is 1, no factor found
reading relations for dependency 5
read 598952 cycles
cycles contain 1780398 unique relations
read 1780398 relations
multiplying 1780398 relations
multiply complete, coefficients have about 83.46 million bits
initial square root is modulo 979163
GCD is 1, no factor found
reading relations for dependency 6
read 599385 cycles
cycles contain 1781146 unique relations
read 1781146 relations
multiplying 1781146 relations
multiply complete, coefficients have about 83.50 million bits
initial square root is modulo 985433
sqrtTime: 3715
prp56 factor: 21939212661835322706547954740398530226975027089139283247
prp76 factor: 6403672593843970664623379894217874074465248697575876121161699354374495764953
elapsed time 03:04:40

533090175750359067243246303752316042099673638112728534152925497844110638107618353680922586035158754581906443469378842566146073728235965792317415910480217854737<159>

598282339435817634115307136715542766140735894101<48>
891034450813080980775294694470774153692533166102295248377560116588903328020717696874511482282675728967080473037<111>

Using B1=43000000, B2=240490660426, polynomial Dickson(12), sigma=2092234446
Step 1 took 289469ms
Step 2 took 79104ms
********** Factor found in step 2: 598282339435817634115307136715542766140735894101
Found probable prime factor of 48 digits: 598282339435817634115307136715542766140735894101

389423286447342326376916270385521608725922115686319313694144316490260781312538587982088132331072330278593991805732299322878807063611549355478690270986493368722747170539166275668506634427<186>

14508478542484504332189649794970947412210272013<47>
26841083667526694203200809565913685827491326679360815944123769073325935064949241624197632177383965823288023617610360904570468327837895195879<140>

Number: n
N=389423286447342326376916270385521608725922115686319313694144316490260781312538587982088132331072330278593991805732299322878807063611549355478690270986493368722747170539166275668506634427
  ( 186 digits)
SNFS difficulty: 192 digits.
Divisors found:

Sat Feb 20 18:08:57 2010  prp47 factor: 14508478542484504332189649794970947412210272013
Sat Feb 20 18:08:57 2010  prp140 factor: 26841083667526694203200809565913685827491326679360815944123769073325935064949241624197632177383965823288023617610360904570468327837895195879
Sat Feb 20 18:08:57 2010  elapsed time 06:27:06 (Msieve 1.42 - dependency 2)

Version: 
Total time: 14.15 hours.
Scaled time: 11.92 units (timescale=0.842).
Factorization parameters were as follows:
name: KA_7_5_190_7
n: 389423286447342326376916270385521608725922115686319313694144316490260781312538587982088132331072330278593991805732299322878807063611549355478690270986493368722747170539166275668506634427
m: 100000000000000000000000000000000000000
deg: 5
c5: 680
c0: 13
skew: 0.45
type: snfs
lss: 1
rlim: 11500000
alim: 11500000
lpbr: 28
lpba: 28
mfbr: 56
mfba: 56
rlambda: 2.5
alambda: 2.5
qintsize: 100000
Factor base limits: 11500000/11500000
Large primes per side: 3
Large prime bits: 28/28
Max factor residue bits: 56/56
Sieved  special-q in [100000, 10353089)
Primes: , , 
Relations: 
Max relations in full relation-set: 28
Initial matrix: 
Pruned matrix : 

Msieve: found 2828211 hash collisions in 27699283 relations
Msieve: matrix is 1576788 x 1577013 (422.8 MB)

Total sieving time: 14.15 hours.
Total relation processing time: 0.00 hours.
Matrix solve time: 0.00 hours.
Total square root time: 0.00 hours, sqrts: 0.
Prototype def-par.txt line would be:
snfs,192,5,0,0,0,0,0,0,0,0,11500000,11500000,28,28,56,56,2.5,2.5,100000
total time: 14.15 hours.
 --------- CPU info (if available) ----------

2518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518519<193>

10084827411252959360121233502972739996691984935274651940807752390233804581909806438612395447<92>
249733427833209956994171060959372869772921006108776325921841891154070929004420634528685716659200605377<102>

Number: n
N=2518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518519
  ( 193 digits)
SNFS difficulty: 194 digits.
Divisors found:

Mon Sep 01 20:42:16 2008  prp92 factor: 10084827411252959360121233502972739996691984935274651940807752390233804581909806438612395447
Mon Sep 01 20:42:16 2008  prp102 factor: 249733427833209956994171060959372869772921006108776325921841891154070929004420634528685716659200605377
Mon Sep 01 20:42:17 2008  elapsed time 06:18:29 (Msieve 1.36)

Version: GGNFS-0.77.1-20051202-athlon
Total time: 160.26 hours.
Scaled time: 327.72 units (timescale=2.045).
Factorization parameters were as follows:
name: KA_7_5_191_7
n: 2518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518518519
type: snfs
skew: 0.57
deg: 5
c5: 425
c0: 26
m: 200000000000000000000000000000000000000
rlim: 9500000
alim: 9500000
lpbr: 28
lpba: 28
mfbr: 50
mfba: 50
rlambda: 2.5
alambda: 2.5
qintsize: 100000
Factor base limits: 9500000/9500000
Large primes per side: 3
Large prime bits: 28/28
Max factor residue bits: 50/50
Sieved  special-q in [100000, 12500001)
Primes: RFBsize:633578, AFBsize:634283, largePrimes:11118249 encountered
Relations: rels:11173345, finalFF:1300777
Max relations in full relation-set: 28
Initial matrix: 
Pruned matrix : 
Total sieving time: 159.88 hours.
Total relation processing time: 0.38 hours.
Matrix solve time: 0.00 hours.
Total square root time: 0.00 hours, sqrts: 0.
Prototype def-par.txt line would be:
snfs,194,5,0,0,0,0,0,0,0,0,9500000,9500000,28,28,50,50,2.5,2.5,100000
total time: 160.26 hours.
 --------- CPU info (if available) ----------

5104438707839302026497348126931151740000540945479539992216674365071161846304410708610372504397919230428365918521154640334085925706090175420980025964606592646501407297317241<172>

301310125490661025663101056346312124859<39>
16940813719841326245350927656463530090427039437402144978894734916648377383776609280238089051242335465325137747656400922730552611191899<134>

Using B1=11000000, B2=35133391030, polynomial Dickson(12), sigma=1698427156
Step 1 took 99624ms
Step 2 took 34462ms
********** Factor found in step 2: 301310125490661025663101056346312124859
Found probable prime factor of 39 digits: 301310125490661025663101056346312124859

66497978841653099544218942332044297714724370800424008354822179961204140012375992891868364554583123415925138077699225782879305682409787145345065407263<149>

6108391922352461640749990350806420226603335451897423585751<58>
10886331408814289456478019339258723896665063680302654229544231791125272431886721307570667513<92>

66497978841653099544218942332044297714724370800424008354822179961204140012375992891868364554583123415925138077699225782879305682409787145345065407263=6108391922352461640749990350806420226603335451897423585751*10886331408814289456478019339258723896665063680302654229544231791125272431886721307570667513

cado polynomial
n: 66497978841653099544218942332044297714724370800424008354822179961204140012375992891868364554583123415925138077699225782879305682409787145345065407263
skew: 1.11
type: snfs
c0: 65
c6: 34
Y0: 1000000000000000000000000000000000
Y1: -1
# f(x) = 34*x^6+65
# g(x) = -x+1000000000000000000000000000000000

cado parameters (extracts)
tasks.lim0 = 14800000
tasks.lim1 = 14800000
tasks.lpb0 = 28
tasks.lpb1 = 28
tasks.sieve.mfb0 = 55
tasks.sieve.mfb1 = 55
tasks.sieve.lambda0 = 2.5
tasks.sieve.lambda1 = 2.5
tasks.I = 12
tasks.linalg.m = 64
tasks.linalg.n = 64
tasks.linalg.characters.nchar = 50

cado log (extracts)
Info:Square Root: Factors: 6108391922352461640749990350806420226603335451897423585751 10886331408814289456478019339258723896665063680302654229544231791125272431886721307570667513
Info:Square Root: Total cpu/real time for sqrt: 1835.64/543.543
Info:Filtering - Duplicate Removal, splitting pass: Total cpu/real time for dup1: 146.48/180.005
Info:Filtering - Duplicate Removal, splitting pass: Aggregate statistics:
Info:Filtering - Duplicate Removal, splitting pass: CPU time for dup1: 179.10000000000005s
Info:Linear Algebra: Total cpu/real time for bwc: 196335/50252.6
Info:Linear Algebra: Aggregate statistics:
Info:Linear Algebra: Krylov: CPU time 126359.07, WCT time 32242.89, iteration CPU time 0.3, COMM 0.01, cpu-wait 0.0, comm-wait 0.0 (102400 iterations)
Info:Linear Algebra: Lingen CPU time 733.28, WCT time 186.11
Info:Linear Algebra: Mksol: CPU time 67971.9,  WCT time 17351.4, iteration CPU time 0.32, COMM 0.01, cpu-wait 0.0, comm-wait 0.0 (51200 iterations)
Info:Generate Factor Base: Total cpu/real time for makefb: 9.68/3.82769
Info:Square Root: Total cpu/real time for sqrt: 1835.64/543.543
Info:Filtering - Merging: Merged matrix has 3269338 rows and total weight 556027795 (170.1 entries per row on average)
Info:Filtering - Merging: Total cpu/real time for merge: 923.43/255.164
Info:Filtering - Merging: Total cpu/real time for replay: 130.96/114.849
Info:Filtering - Singleton removal: Total cpu/real time for purge: 592.46/674.694
Info:Lattice Sieving: Aggregate statistics:
Info:Lattice Sieving: Total number of relations: 33490808
Info:Lattice Sieving: Average J: 1894 for 7641578 special-q, max bucket fill -bkmult 1.0,1s:1.194930
Info:Lattice Sieving: Total time: 1.63817e+06s
Info:Quadratic Characters: Total cpu/real time for characters: 113.93/49.0582
Info:Generate Free Relations: Total cpu/real time for freerel: 182.9/52.5876
Info:Filtering - Duplicate Removal, removal pass: Total cpu/real time for dup2: 673.81/706.96
Info:Filtering - Duplicate Removal, removal pass: Aggregate statistics:
Info:Filtering - Duplicate Removal, removal pass: CPU time for dup2: 575.0999999999998s
Info:HTTP server: Shutting down HTTP server
Info:Complete Factorization / Discrete logarithm: Total cpu/elapsed time for entire factorization: 3.31036e+06/254473
6108391922352461640749990350806420226603335451897423585751 10886331408814289456478019339258723896665063680302654229544231791125272431886721307570667513

cado-nfs-3.0.0

Linux Ubuntu 20.04.1 LTS [5.4.0-72-generic|libc 2.31 (Ubuntu GLIBC 2.31-0ubuntu9.3)]
GenuineIntel Intel(R) Core(TM) i5-3470S CPU @ 2.90GHz [Family 6 Model 58 Stepping 9] (4 processeurs)

6498284643980008218418814445304511529677092590999875768087688617489941993253251531397226761465172061198551264776430339344246629014840935370736695240006498284643980008218418814445304511529677092591<196>

50307999854964441981662075510463030601157386542912433751841965547556032141553576193<83>
129170006017218973530218567545992463356237593706038677587012844140789989547158025701107996191493959798364456136687<114>

Number: n
N=6498284643980008218418814445304511529677092590999875768087688617489941993253251531397226761465172061198551264776430339344246629014840935370736695240006498284643980008218418814445304511529677092591
  ( 196 digits)
SNFS difficulty: 200 digits.
Divisors found:

Tue Apr 20 12:47:11 2010  prp83 factor: 50307999854964441981662075510463030601157386542912433751841965547556032141553576193
Tue Apr 20 12:47:11 2010  prp114 factor: 129170006017218973530218567545992463356237593706038677587012844140789989547158025701107996191493959798364456136687
Tue Apr 20 12:47:11 2010  elapsed time 06:25:21 (Msieve 1.42 - dependency 1)

Version: 
Total time: 0.00 hours.
Scaled time: 0.00 units (timescale=1.831).
Factorization parameters were as follows:
name: KA_7_5_198_7
n: 6498284643980008218418814445304511529677092590999875768087688617489941993253251531397226761465172061198551264776430339344246629014840935370736695240006498284643980008218418814445304511529677092591
m: 2000000000000000000000000000000000000000
deg: 5
c5: 21250
c0: 13
skew: 0.23
type: snfs
lss: 1
rlim: 15600000
alim: 15600000
lpbr: 28
lpba: 28
mfbr: 56
mfba: 56
rlambda: 2.6
alambda: 2.6
qintsize: 100000
Factor base limits: 15600000/15600000
Large primes per side: 3
Large prime bits: 28/28
Max factor residue bits: 56/56
Sieved  special-q in [100000, 17400000)
Primes: , , 
Relations: 
Max relations in full relation-set: 28
Initial matrix: 
Pruned matrix : 

Msieve: found 4748752 hash collisions in 32329481 relations
Msieve: matrix is 1951109 x 1951333 (552.3 MB)

Total sieving time: 0.00 hours.
Total relation processing time: 0.00 hours.
Matrix solve time: 0.00 hours.
Total square root time: 0.00 hours, sqrts: 0.
Prototype def-par.txt line would be:
snfs,200,5,0,0,0,0,0,0,0,0,15600000,15600000,28,28,56,56,2.6,2.6,100000
total time: 0.00 hours.
 --------- CPU info (if available) ----------
CPU0: Intel(R) Core(TM) i7 CPU         930  @ 2.80GHz stepping 05
CPU1: Intel(R) Core(TM) i7 CPU         930  @ 2.80GHz stepping 05
CPU2: Intel(R) Core(TM) i7 CPU         930  @ 2.80GHz stepping 05
CPU3: Intel(R) Core(TM) i7 CPU         930  @ 2.80GHz stepping 05
CPU4: Intel(R) Core(TM) i7 CPU         930  @ 2.80GHz stepping 05
CPU5: Intel(R) Core(TM) i7 CPU         930  @ 2.80GHz stepping 05
CPU6: Intel(R) Core(TM) i7 CPU         930  @ 2.80GHz stepping 05
CPU7: Intel(R) Core(TM) i7 CPU         930  @ 2.80GHz stepping 05
Memory: 6060216k/7077888k available (3972k kernel code, 787972k absent, 229700k reserved, 2498k data, 1292k init)
Calibrating delay loop (skipped), value calculated using timer frequency.. 5596.79 BogoMIPS (lpj=2798398)
Calibrating delay using timer specific routine.. 5595.11 BogoMIPS (lpj=2797555)
Calibrating delay using timer specific routine.. 5595.10 BogoMIPS (lpj=2797554)
Calibrating delay using timer specific routine.. 5595.11 BogoMIPS (lpj=2797555)
Calibrating delay using timer specific routine.. 5595.10 BogoMIPS (lpj=2797551)
Calibrating delay using timer specific routine.. 5595.11 BogoMIPS (lpj=2797556)
Calibrating delay using timer specific routine.. 5595.11 BogoMIPS (lpj=2797555)
Calibrating delay using timer specific routine.. 5595.11 BogoMIPS (lpj=2797555)
Total of 8 processors activated (44762.55 BogoMIPS).

46926226705553490757659914071114832718287064930295851621687655386365073273088366538990155755496348274349858480285999826334984123356936035203320352929<149>

5713300423165557674689955979704021<34>
8213505894996007252782290696718425412872960192377077858254867550044760932375691776271056821425561829203567547297949<115>

Using B1=11000000, B2=35133391030, polynomial Dickson(12), sigma=859142330
Step 1 took 68515ms
Step 2 took 35678ms
********** Factor found in step 2: 5713300423165557674689955979704021
Found probable prime factor of 34 digits: 5713300423165557674689955979704021
Probable prime cofactor 8213505894996007252782290696718425412872960192377077858254867550044760932375691776271056821425561829203567547297949 has 115 digits

GMP-ECM 6.3

228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956229<201>

769814796707197195599511590595782548187492691677419795279235397799168485035116810648570639576543<96>
297417287814634683072048656557033582505236462387054701618732540546133498363914695159154925528472953626203<105>

Number: n
N=228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956229
  ( 201 digits)
SNFS difficulty: 202 digits.
Divisors found:

Thu Jun  7 20:58:41 2012  prp96 factor: 769814796707197195599511590595782548187492691677419795279235397799168485035116810648570639576543
Thu Jun  7 20:58:41 2012  prp105 factor: 297417287814634683072048656557033582505236462387054701618732540546133498363914695159154925528472953626203
Thu Jun  7 20:58:41 2012  elapsed time 07:10:43 (Msieve 1.44 - dependency 1)

Version: GGNFS-0.77.1-20060513-nocona
Total time: 0.00 hours.
Scaled time: 0.00 units (timescale=2.095).
Factorization parameters were as follows:
name: KA_75557_201
n: 228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956228956229
m: 10000000000000000000000000000000000000000
#  c201, diff: 202.83
skew: 0.45
deg: 5
c5: 680
c0: 13
type: snfs
lss: 1
rlim: 16800000
alim: 16800000
lpbr: 28
lpba: 28
mfbr: 56
mfba: 56
rlambda: 2.6
alambda: 2.6
qintsize: 100000
Factor base limits: 16800000/16800000
Large primes per side: 3
Large prime bits: 28/28
Max factor residue bits: 56/56
Sieved  special-q in [100000, 19800000)
Primes: RFBsize:1079266, AFBsize:1078979, 
Relations: 
Max relations in full relation-set: 28
Initial matrix: 
Pruned matrix : 

Msieve: found 4936554 hash collisions in 32312532 relations (28192198 unique)
Msieve: matrix is 2245284 x 2245509 (637.4 MB)

Total sieving time: 0.00 hours.
Total relation processing time: 0.00 hours.
Matrix solve time: 0.00 hours.
Total square root time: 0.00 hours, sqrts: 0.
Prototype def-par.txt line would be:
snfs,202,5,0,0,0,0,0,0,0,0,16800000,16800000,28,28,56,56,2.6,2.6,100000
total time: 0.00 hours.
 --------- CPU info (if available) ----------
CPU0: Intel(R) Core(TM)2 Quad  CPU   Q9550  @ 2.83GHz stepping 07
CPU1: Intel(R) Core(TM)2 Quad  CPU   Q9550  @ 2.83GHz stepping 07
CPU2: Intel(R) Core(TM)2 Quad  CPU   Q9550  @ 2.83GHz stepping 07
CPU3: Intel(R) Core(TM)2 Quad  CPU   Q9550  @ 2.83GHz stepping 07
Memory: 8109188k/9175040k available (3972k kernel code, 787464k absent, 278388k reserved, 2498k data, 1292k init)
Calibrating delay loop (skipped), value calculated using timer frequency.. 5661.11 BogoMIPS (lpj=2830559)
Calibrating delay using timer specific routine.. 5660.89 BogoMIPS (lpj=2830449)
Calibrating delay using timer specific routine.. 5660.91 BogoMIPS (lpj=2830459)
Calibrating delay using timer specific routine.. 5660.91 BogoMIPS (lpj=2830459)
Total of 4 processors activated (22643.85 BogoMIPS).

303133604446287704139333498052342244093516651250257704960127235210831886571035640304208217148795171283815131136163216481536015134940820738283444831735382436593564784517486966366011<180>

456726678632180569777068825144989023133691952759925819274038472855859<69>
663708994083992996119989302884955861547721525086951484312424738728146611163600415669433614784263424671008147929<111>

Number: n
N=303133604446287704139333498052342244093516651250257704960127235210831886571035640304208217148795171283815131136163216481536015134940820738283444831735382436593564784517486966366011  ( 180 digits)
SNFS difficulty: 206 digits.
Divisors found:

Tue Nov  2 12:36:45 2021  p69 factor: 456726678632180569777068825144989023133691952759925819274038472855859
Tue Nov  2 12:36:45 2021  p111 factor: 663708994083992996119989302884955861547721525086951484312424738728146611163600415669433614784263424671008147929
Tue Nov  2 12:36:45 2021  elapsed time 02:07:42 (Msieve 1.54 - dependency 1)

Version: 
Total time: 0.00 hours.
Scaled time: 0.00 units (timescale=2.328).
Factorization parameters were as follows:
#
# N = 68x10^204+13 = 75(203)7
#
n: 303133604446287704139333498052342244093516651250257704960127235210831886571035640304208217148795171283815131136163216481536015134940820738283444831735382436593564784517486966366011
m: 100000000000000000000000000000000000000000
deg: 5
c5: 34
c0: 65
skew: 1.14
# Murphy_E = 1.023e-11
type: snfs
lss: 1
rlim: 19400000
alim: 19400000
lpbr: 29
lpba: 29
mfbr: 56
mfba: 56
rlambda: 2.6
alambda: 2.6
Factor base limits: 19400000/19400000
Large primes per side: 3
Large prime bits: 29/29
Max factor residue bits: 56/56
Sieved  special-q in [100000, 36900000)
Primes: , , 
Relations: 
Max relations in full relation-set: 28
Initial matrix: 
Pruned matrix : 

Msieve: found 9138356 hash collisions in 62836024 relations (56145215 unique)
Msieve: matrix is 2313405 x 2313632 (800.5 MB)

Sieving start time : 2021/11/01 21:48:39
Sieving end time  : 2021/11/02 10:27:37

Total sieving time: 12hrs 38min 58secs.

Total relation processing time: 1hrs 49min 15sec.
Matrix solve time: 0.00 hours.
Total square root time: 0hrs 2min 38sec.

Prototype def-par.txt line would be:
snfs,206,5,0,0,0,0,0,0,0,0,19400000,19400000,29,29,56,56,2.6,2.6,100000
total time: 0.00 hours.
 --------- CPU info (if available) ----------
[    0.118892] smpboot: CPU0: AMD Ryzen 7 2700 Eight-Core Processor (family: 0x17, model: 0x8, stepping: 0x2)
[    0.000000] Memory: 16239956K/16727236K available (14339K kernel code, 2400K rwdata, 5016K rodata, 2728K init, 4972K bss, 487280K reserved, 0K cma-reserved)
[    0.152618] x86/mm: Memory block size: 128MB
[    0.000004] Calibrating delay loop (skipped), value calculated using timer frequency.. 6399.04 BogoMIPS (lpj=12798084)
[    0.150210] smpboot: Total of 16 processors activated (102384.67 BogoMIPS)

9384921822199978218316531057330792845884004763617478165417808979282812013662246439822309183556079240576185402055273132847506180058727315953567833580141619126156527460914145859646817<181>

3513950294988734362431378706621251892861964741714576411387869705484251<70>
2670761119069860390588233270374991115083689288429030373032889221354943051768104260558325025311300390581648702067<112>

10/01/24 23:48:20 v1.34.5 @ TRIGKEY,
10/01/24 23:48:20 v1.34.5 @ TRIGKEY, ****************************
10/01/24 23:48:20 v1.34.5 @ TRIGKEY, Starting factorization of 68000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000013
10/01/24 23:48:20 v1.34.5 @ TRIGKEY, using pretesting plan: normal
10/01/24 23:48:20 v1.34.5 @ TRIGKEY, no tune info: using qs/gnfs crossover of 100 digits
10/01/24 23:48:20 v1.34.5 @ TRIGKEY, ****************************
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, div: found prime factor = 3
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, div: found prime factor = 3
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, div: found prime factor = 3
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, div: found prime factor = 3
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, div: found prime factor = 11
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, div: found prime factor = 61
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, rho: x^2 + 3, starting 1000 iterations on C205
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, rho: x^2 + 2, starting 1000 iterations on C205
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, rho: x^2 + 1, starting 1000 iterations on C205
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, pm1: starting B1 = 150K, B2 = gmp-ecm default on C205
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, prp9 = 413651687
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, current ECM pretesting depth: 0.00
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, scheduled 30 curves at B1=2000 toward target pretesting depth of 60.31
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, prp15 = 322281899424197 (curve 26 stg2 B1=2000 sigma=4021755009 thread=0)
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, Finished 26 curves using Lenstra ECM method on C196 input, B1=2K, B2=gmp-ecm default
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, current ECM pretesting depth: 0.00
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, scheduled 4 curves at B1=2000 toward target pretesting depth of 55.69
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, Finished 4 curves using Lenstra ECM method on C181 input, B1=2K, B2=gmp-ecm default
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, current ECM pretesting depth: 15.18
10/01/24 23:48:21 v1.34.5 @ TRIGKEY, scheduled 74 curves at B1=11000 toward target pretesting depth of 55.69
10/01/24 23:48:23 v1.34.5 @ TRIGKEY, Finished 74 curves using Lenstra ECM method on C181 input, B1=11K, B2=gmp-ecm default
10/01/24 23:48:23 v1.34.5 @ TRIGKEY, current ECM pretesting depth: 20.24
10/01/24 23:48:23 v1.34.5 @ TRIGKEY, scheduled 214 curves at B1=50000 toward target pretesting depth of 55.69
10/01/24 23:48:56 v1.34.5 @ TRIGKEY, nfs: commencing nfs on c209: 68000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000013
10/01/24 23:48:56 v1.34.5 @ TRIGKEY, nfs: input divides 68*10^207 + 13
10/01/24 23:48:56 v1.34.5 @ TRIGKEY, nfs: using supplied cofactor: 9384921822199978218316531057330792845884004763617478165417808979282812013662246439822309183556079240576185402055273132847506180058727315953567833580141619126156527460914145859646817
10/01/24 23:48:56 v1.34.5 @ TRIGKEY, nfs: commencing snfs on c181: 9384921822199978218316531057330792845884004763617478165417808979282812013662246439822309183556079240576185402055273132847506180058727315953567833580141619126156527460914145859646817
10/01/24 23:48:57 v1.34.5 @ TRIGKEY, gen: best 3 polynomials:
n: 9384921822199978218316531057330792845884004763617478165417808979282812013662246439822309183556079240576185402055273132847506180058727315953567833580141619126156527460914145859646817
# 68*10^207+13, difficulty: 210.83, anorm: 5.95e+032, rnorm: 1.87e+047
# scaled difficulty: 213.25, suggest sieving rational side
# size = 1.989e-014, alpha = -1.714, combined = 7.169e-012, rroots = 1
type: snfs
size: 210
skew: 0.2859
c5: 6800
c0: 13
Y1: -1
Y0: 100000000000000000000000000000000000000000
m: 100000000000000000000000000000000000000000
n: 9384921822199978218316531057330792845884004763617478165417808979282812013662246439822309183556079240576185402055273132847506180058727315953567833580141619126156527460914145859646817
# 68*10^207+13, difficulty: 209.74, anorm: 2.10e+032, rnorm: 2.64e+047
# scaled difficulty: 212.25, suggest sieving rational side
# size = 1.989e-014, alpha = -1.021, combined = 7.103e-012, rroots = 1
type: snfs
size: 209
skew: 0.5719
c5: 425
c0: 26
Y1: -1
Y0: 200000000000000000000000000000000000000000
m: 200000000000000000000000000000000000000000
n: 9384921822199978218316531057330792845884004763617478165417808979282812013662246439822309183556079240576185402055273132847506180058727315953567833580141619126156527460914145859646817
# 68*10^207+13, difficulty: 209.74, anorm: 4.70e+038, rnorm: 2.89e+040
# scaled difficulty: 209.74, suggest sieving algebraic side
# size = 1.215e-010, alpha = -0.072, combined = 3.864e-012, rroots = 0
type: snfs
size: 209
skew: 0.4800
c6: 2125
c0: 26
Y1: -1
Y0: 20000000000000000000000000000000000
m: 20000000000000000000000000000000000
10/01/24 23:48:58 v1.34.5 @ TRIGKEY, test: fb generation took 1.7340 seconds
10/01/24 23:48:58 v1.34.5 @ TRIGKEY, test: commencing test sieving of polynomial 0 on the rational side over range 22600000-22602000
skew: 0.2859
c5: 6800
c0: 13
Y1: -1
Y0: 100000000000000000000000000000000000000000
m: 100000000000000000000000000000000000000000
rlim: 22600000
alim: 22600000
mfbr: 58
mfba: 58
lpbr: 29
lpba: 29
rlambda: 2.60
alambda: 2.60
10/01/24 23:52:03 v1.34.5 @ TRIGKEY, nfs: parsing special-q from .dat file
10/01/24 23:52:04 v1.34.5 @ TRIGKEY, test: fb generation took 1.6023 seconds
10/01/24 23:52:04 v1.34.5 @ TRIGKEY, test: commencing test sieving of polynomial 1 on the rational side over range 21400000-21402000
skew: 0.5719
c5: 425
c0: 26
Y1: -1
Y0: 200000000000000000000000000000000000000000
m: 200000000000000000000000000000000000000000
rlim: 21400000
alim: 21400000
mfbr: 56
mfba: 56
lpbr: 28
lpba: 28
rlambda: 2.60
alambda: 2.60
10/01/24 23:55:02 v1.34.5 @ TRIGKEY, nfs: parsing special-q from .dat file
10/01/24 23:55:04 v1.34.5 @ TRIGKEY, test: fb generation took 2.3141 seconds
10/01/24 23:55:04 v1.34.5 @ TRIGKEY, test: commencing test sieving of polynomial 2 on the algebraic side over range 21400000-21402000
skew: 0.4800
c6: 2125
c0: 26
Y1: -1
Y0: 20000000000000000000000000000000000
m: 20000000000000000000000000000000000
rlim: 21400000
alim: 21400000
mfbr: 56
mfba: 56
lpbr: 28
lpba: 28
rlambda: 2.60
alambda: 2.60
10/01/24 23:57:49 v1.34.5 @ TRIGKEY, nfs: parsing special-q from .dat file
10/01/24 23:57:49 v1.34.5 @ TRIGKEY, gen: selected polynomial:
n: 9384921822199978218316531057330792845884004763617478165417808979282812013662246439822309183556079240576185402055273132847506180058727315953567833580141619126156527460914145859646817
# 68*10^207+13, difficulty: 209.74, anorm: 2.10e+032, rnorm: 2.64e+047
# scaled difficulty: 212.25, suggest sieving rational side
# size = 1.989e-014, alpha = -1.021, combined = 7.103e-012, rroots = 1
type: snfs
size: 209
skew: 0.5719
c5: 425
c0: 26
Y1: -1
Y0: 200000000000000000000000000000000000000000
m: 200000000000000000000000000000000000000000
10/03/24 06:33:45 v1.34.5 @ TRIGKEY, nfs: commencing msieve filtering
10/03/24 06:35:40 v1.34.5 @ TRIGKEY, nfs: raising min_rels by 5.00 percent to 22214120
10/03/24 08:16:41 v1.34.5 @ TRIGKEY, nfs: commencing msieve filtering
10/03/24 08:18:44 v1.34.5 @ TRIGKEY, nfs: raising min_rels by 5.00 percent to 23348364
10/03/24 10:16:55 v1.34.5 @ TRIGKEY, nfs: commencing msieve filtering
10/03/24 10:19:03 v1.34.5 @ TRIGKEY, nfs: raising min_rels by 5.00 percent to 24659504
10/03/24 12:16:54 v1.34.5 @ TRIGKEY, nfs: commencing msieve filtering
10/03/24 12:19:08 v1.34.5 @ TRIGKEY, nfs: raising min_rels by 5.00 percent to 25950663
10/03/24 14:35:24 v1.34.5 @ TRIGKEY, nfs: commencing msieve filtering
10/03/24 14:39:21 v1.34.5 @ TRIGKEY, nfs: commencing msieve linear algebra
10/03/24 17:04:43 v1.34.5 @ TRIGKEY, nfs: commencing msieve sqrt
10/03/24 17:14:07 v1.34.5 @ TRIGKEY, prp70 = 3513950294988734362431378706621251892861964741714576411387869705484251
10/03/24 17:14:07 v1.34.5 @ TRIGKEY, prp112 = 2670761119069860390588233270374991115083689288429030373032889221354943051768104260558325025311300390581648702067
10/03/24 17:14:08 v1.34.5 @ TRIGKEY, NFS elapsed time = 149111.1132 seconds.
10/03/24 17:14:08 v1.34.5 @ TRIGKEY,
10/03/24 17:14:08 v1.34.5 @ TRIGKEY,
10/01/24 23:57:49 v1.34.5 @ TRIGKEY, test: test sieving took 532.53 seconds

YAFU

5701297551121523686369932200001526229203670077711137994658900019586102245842142927943841087867122499742652932156475490402867577497999405272053382701101623813466807009336030199349<178>

509806110478092788948219022895913<33>
11183266410390578996150835011279666767541921782868834318882733422124358173368185145487957535887540053684800262049181851422300843295072398205052973<146>

Using B1=1000000, B2=1045563762, polynomial Dickson(6), sigma=3078206464
Step 1 took 8768ms
Step 2 took 5210ms
********** Factor found in step 2: 509806110478092788948219022895913
Found probable prime factor of 33 digits: 509806110478092788948219022895913
Probable prime cofactor 11183266410390578996150835011279666767541921782868834318882733422124358173368185145487957535887540053684800262049181851422300843295072398205052973 has 146 digits

GMP-ECM 6.3

1628340114552638678069545399668600228502827239511142158698517317187407279575455503714709998270834949753724611270259630819496473817857821325485614650959351608958345733182137<172>

171024682158655697016524307707290255356760616209291792913429131215441430563110692017723721422292566136977876170154480892687200763535051645722311761780220083907572064718807315081052229383649077180191<198>

8777693107683550365759069467456502678824659<43>
19484012491727388567419616529266109681968510850723310962698098856963144135183448193680174410010385261451484386233459848869374988591909077003822393292134149<155>

Using B1=43000000, B2=240490660426, polynomial Dickson(12), sigma=2462669995
Step 1 took 382507ms
Step 2 took 98406ms
********** Factor found in step 2: 8777693107683550365759069467456502678824659
Found probable prime factor of 43 digits: 8777693107683550365759069467456502678824659

23664843773251551849771316510078791484493189796354654665271948891413034719654797655347039637011871496476235629497909276322360426472433725136487648555835363691753041353197965547120343448910582027992739935383<206>

32882982782128810064933347147308041644971844530001753084540459914894589503859<77>
719668405084981603533591560769227398425198051069750030612741387675961031394290753263679955342959918412336668893575153356937711437<129>

Number: n
N=23664843773251551849771316510078791484493189796354654665271948891413034719654797655347039637011871496476235629497909276322360426472433725136487648555835363691753041353197965547120343448910582027992739935383
  ( 206 digits)
SNFS difficulty: 216 digits.
Divisors found:

Thu Jan 30 13:11:50 2020  p77 factor: 32882982782128810064933347147308041644971844530001753084540459914894589503859
Thu Jan 30 13:11:50 2020  p129 factor: 719668405084981603533591560769227398425198051069750030612741387675961031394290753263679955342959918412336668893575153356937711437
Thu Jan 30 13:11:50 2020  elapsed time 06:11:18 (Msieve 1.54 - dependency 6)

Version:
Total time: 0.00 hours.
Scaled time: 0.00 units (timescale=2.131).
Factorization parameters were as follows:
#
# N = 68x10^214+13 = 75(213)7
#
n: 23664843773251551849771316510078791484493189796354654665271948891413034719654797655347039637011871496476235629497909276322360426472433725136487648555835363691753041353197965547120343448910582027992739935383
m: 10000000000000000000000000000000000000000000
deg: 5
c5: 34
c0: 65
skew: 1.14
# Murphy_E = 3.396e-12
type: snfs
lss: 1
rlim: 28000000
alim: 28000000
lpbr: 29
lpba: 29
mfbr: 58
mfba: 58
rlambda: 2.6
alambda: 2.6
Factor base limits: 28000000/28000000
Large primes per side: 3
Large prime bits: 29/29
Max factor residue bits: 58/58
Sieved  special-q in [100000, 54000000)
Primes: , ,
Relations:
Max relations in full relation-set: 28
Initial matrix:
Pruned matrix :

Msieve: found 8686538 hash collisions in 58297852 relations (51657927 unique)
Msieve: matrix is 3611620 x 3611845 (1268.2 MB)

Sieving start time: 2020/01/29 05:24:13
Sieving end time  : 2020/01/30 06:58:54

Total sieving time: 25hrs 34min 41secs.

Total relation processing time: 5hrs 20min 55sec.
Matrix solve time: 0.00 hours.
Total square root time: 0hrs 32min 17sec.

Prototype def-par.txt line would be:
snfs,216,5,0,0,0,0,0,0,0,0,28000000,28000000,29,29,58,58,2.6,2.6,100000
total time: 0.00 hours.
 --------- CPU info (if available) ----------
[    0.149937] smpboot: CPU0: AMD Ryzen 7 1700 Eight-Core Processor (family: 0x17, model: 0x1, stepping: 0x1)
[    0.000000] Memory: 16283572K/16703460K available (12300K kernel code, 2481K rwdata, 4264K rodata, 2428K init, 2388K bss, 419888K reserved, 0K cma-reserved)
[    0.184567] x86/mm: Memory block size: 128MB
[    0.024000] Calibrating delay loop (skipped), value calculated using timer frequency.. 5988.57 BogoMIPS (lpj=11977148)
[    0.182215] smpboot: Total of 16 processors activated (95817.18 BogoMIPS)

4550542897270078561559583295832271486911689335609909373301721115314435876178933943107056598282258149369628649304660267264077772338112296611423796328839920239676379309229770139656958418081018757<193>

245983627277093291786272139131000461894791934396623<51>

18499373099104788683948572667894660351495885596184642515260426491588795192400752900771314125590537602619592697959675803033072057868213081566059<143>

Using B1=43000000, B2=240490660426, polynomial Dickson(12), sigma=2037802617
Step 1 took 370130ms
Step 2 took 93148ms
********** Factor found in step 2: 245983627277093291786272139131000461894791934396623
Found probable prime factor of 51 digits: 245983627277093291786272139131000461894791934396623

18499373099104788683948572667894660351495885596184642515260426491588795192400752900771314125590537602619592697959675803033072057868213081566059<143>

1485066116129329171121223326461651420414606836552643<52>
12456935686689483067350945408626015877203852011372929350369514187414554863187079922674521913<92>

Number: 75557_215
N = 18499373099104788683948572667894660351495885596184642515260426491588795192400752900771314125590537602619592697959675803033072057868213081566059 (143 digits)
Divisors found:
r1=1485066116129329171121223326461651420414606836552643 (pp52)
r2=12456935686689483067350945408626015877203852011372929350369514187414554863187079922674521913 (pp92)
Version: Msieve v. 1.51 (SVN 845)
Total time: 417.38 hours.
Factorization parameters were as follows:
# Murphy_E = 1.565e-11, selected by Erik Branger
# expecting poly E from 1.50e-011 to > 1.72e-011
n: 18499373099104788683948572667894660351495885596184642515260426491588795192400752900771314125590537602619592697959675803033072057868213081566059
Y0: -5751240435883615502505845408
Y1: 1485435554581831
c0: -567217008640576705950552913003977795
c1: 4807239401301851680960557393995
c2: -2420883105837850610853817
c3: -141745234742838295
c4: 54012190572
c5: 2940
skew: 6047321.46
type: gnfs
# selected mechanically
rlim: 21000000
alim: 21000000
lpbr: 28
lpba: 28
mfbr: 56
mfba: 56
rlambda: 2.6
alambda: 2.6
Factor base limits: 21000000/21000000
Large primes per side: 3
Large prime bits: 28/28
Sieved algebraic special-q in [0, 0)
Total raw relations: 23451301
Relations: 4368838 relations
Pruned matrix : 2680612 x 2680836
Polynomial selection time: 0.00 hours.
Total sieving time: 409.60 hours.
Total relation processing time: 0.22 hours.
Matrix solve time: 6.80 hours.
time per square root: 0.76 hours.
Prototype def-par.txt line would be: gnfs,142,5,65,2000,1e-05,0.28,250,20,50000,3600,21000000,21000000,28,28,56,56,2.6,2.6,100000
total time: 417.38 hours.
Intel64 Family 6 Model 58 Stepping 9, GenuineIntel
Windows-post2008Server-6.2.9200
processors: 8, speed: 2.29GHz

GGNFS, Msieve

39065985559196961387089013275556103251955877686710055274413785569594637470355963679285447909514732685139853779483419982240485790959581072576889591844197309455257688382967133497525539179735688269<194>

99252556212371552845195577167223<32>

393601807852758313354896730571854380944957869721684814523437526077929455140697361270980716182512677140438445352725602497320702714528433129192437006948191480954203<162>

Using B1=1000000, B2=1045563762, polynomial Dickson(6), sigma=4189937884
Step 1 took 10093ms
Step 2 took 5959ms
********** Factor found in step 2: 99252556212371552845195577167223
Found probable prime factor of 32 digits: 99252556212371552845195577167223
Composite cofactor 393601807852758313354896730571854380944957869721684814523437526077929455140697361270980716182512677140438445352725602497320702714528433129192437006948191480954203 has 162 digits

GMP-ECM 6.3

3051875474568549047142932247633360431160029755382796101997400045027648203169428270520490581687818469484864765387593930715265969147897485461626959223558596233485376629376446087084767091852958428980563769301859<208>

182691815641083376741305412805875794652808308073034320414090898565265453500377406928721639643352321<99>
16705047589894603267196695710476428712791517405221285207612068944486657736917701484793318719817063389708948579<110>

Number: n
N=3051875474568549047142932247633360431160029755382796101997400045027648203169428270520490581687818469484864765387593930715265969147897485461626959223558596233485376629376446087084767091852958428980563769301859
  ( 208 digits)
SNFS difficulty: 219 digits.
Divisors found:

Fri Dec 13 17:03:02 2019  p99 factor: 182691815641083376741305412805875794652808308073034320414090898565265453500377406928721639643352321
Fri Dec 13 17:03:02 2019  p110 factor: 16705047589894603267196695710476428712791517405221285207612068944486657736917701484793318719817063389708948579
Fri Dec 13 17:03:02 2019  elapsed time 10:57:49 (Msieve 1.54 - dependency 3)

Version:
Total time: 0.00 hours.
Scaled time: 0.00 units (timescale=2.129).
Factorization parameters were as follows:
#
# N = 68x10^218+13 = 75(217)7
#
n: 3051875474568549047142932247633360431160029755382796101997400045027648203169428270520490581687818469484864765387593930715265969147897485461626959223558596233485376629376446087084767091852958428980563769301859
m: 20000000000000000000000000000000000000000000
deg: 5
c5: 2125
c0: 13
skew: 0.36
# Murphy_E = 2.026e-12
type: snfs
lss: 1
rlim: 32000000
alim: 32000000
lpbr: 29
lpba: 29
mfbr: 58
mfba: 58
rlambda: 2.6
alambda: 2.6
Factor base limits: 32000000/32000000
Large primes per side: 3
Large prime bits: 29/29
Max factor residue bits: 58/58
Sieved  special-q in [100000, 92000000)
Primes: , ,
Relations:
Max relations in full relation-set: 28
Initial matrix:
Pruned matrix :

Msieve: found 9407636 hash collisions in 56969594 relations (49194485 unique)
Msieve: matrix is 4762913 x 4763138 (1672.6 MB)

Sieving start time: 2019/12/11 07:44:31
Sieving end time  : 2019/12/13 06:03:33

Total sieving time: 46hrs 19min 2secs.

Total relation processing time: 10hrs 12min 46sec.
Matrix solve time: 0.00 hours.
Total square root time: 0hrs 25min 15sec.

Prototype def-par.txt line would be:
snfs,219,5,0,0,0,0,0,0,0,0,32000000,32000000,29,29,58,58,2.6,2.6,100000
total time: 0.00 hours.
 --------- CPU info (if available) ----------
[    0.149711] smpboot: CPU0: AMD Ryzen 7 1700 Eight-Core Processor (family: 0x17, model: 0x1, stepping: 0x1)
[    0.000000] Memory: 16283564K/16703460K available (12300K kernel code, 2481K rwdata, 4264K rodata, 2432K init, 2388K bss, 419896K reserved, 0K cma-reserved)
[    0.184572] x86/mm: Memory block size: 128MB
[    0.024000] Calibrating delay loop (skipped), value calculated using timer frequency.. 5988.54 BogoMIPS (lpj=11977084)
[    0.182221] smpboot: Total of 16 processors activated (95816.67 BogoMIPS)

882437028417703591815879306388404164931477531926928556068420170262850609263722703611086746765216195839145900619967813628469069213078863929287310245380691963774454649698907943948586208056875869516787735080413307031<213>

195528188342554701734850870323616400560426456389913736923990098473<66>
646344906955834983884286961906610965923852763681850584943431615487663<69>
6982485075480551366696608735036524083705234980657167059696737317544783085936369<79>

Number: n
N=882437028417703591815879306388404164931477531926928556068420170262850609263722703611086746765216195839145900619967813628469069213078863929287310245380691963774454649698907943948586208056875869516787735080413307031
  ( 213 digits)
SNFS difficulty: 221 digits.
Divisors found:

Sat Jun 16 17:28:03 2018  found factor: 646344906955834983884286961906610965923852763681850584943431615487663
Sat Jun 16 17:38:58 2018  p66 factor: 195528188342554701734850870323616400560426456389913736923990098473
Sat Jun 16 17:38:58 2018  p69 factor: 646344906955834983884286961906610965923852763681850584943431615487663
Sat Jun 16 17:38:58 2018  p79 factor: 6982485075480551366696608735036524083705234980657167059696737317544783085936369
Sat Jun 16 17:38:58 2018  elapsed time 11:27:44 (Msieve 1.53 - dependency 2)

Version:
Total time: 0.00 hours.
Scaled time: 0.00 units (timescale=2.128).
Factorization parameters were as follows:
#
# 68x10^219+13 = 75(218)7
#
n: 882437028417703591815879306388404164931477531926928556068420170262850609263722703611086746765216195839145900619967813628469069213078863929287310245380691963774454649698907943948586208056875869516787735080413307031
m: 2000000000000000000000000000000000000
deg: 6
c6: 2125
c0: 26
skew: 0.48
# Murphy_E = 1.716e-12
type: snfs
lss: 1
rlim: 34000000
alim: 34000000
lpbr: 29
lpba: 29
mfbr: 58
mfba: 58
rlambda: 2.6
alambda: 2.6
Factor base limits: 34000000/34000000
Large primes per side: 3
Large prime bits: 29/29
Max factor residue bits: 58/58
Sieved  special-q in [100000, 104200000)
Primes: , ,
Relations:
Max relations in full relation-set: 28
Initial matrix:
Pruned matrix :

Msieve: found 15815205 hash collisions in 71885151 relations (57221243 unique)
Msieve: matrix is 5120758 x 5120983 (1455.8 MB)

Sieving start time: 2018/06/13 11:48:43
Sieving end time  : 2018/06/16 06:09:25

Total sieving time: 66hrs 20min 42secs.

Total relation processing time: 10hrs 44min 2sec.
Matrix solve time: 0.00 hours.
Total square root time: 0hrs 21min 52sec.

Prototype def-par.txt line would be:
snfs,221,6,0,0,0,0,0,0,0,0,34000000,34000000,29,29,58,58,2.6,2.6,100000
total time: 0.00 hours.
 --------- CPU info (if available) ----------
[    0.036000] smpboot: CPU0: AMD Ryzen 7 1700 Eight-Core Processor (family: 0x17, model: 0x1, stepping: 0x1)
[    0.000000] Memory: 16286860K/16703460K available (12300K kernel code, 2470K rwdata, 4240K rodata, 2404K init, 2416K bss, 416600K reserved, 0K cma-reserved)
[    0.068658] x86/mm: Memory block size: 128MB
[    0.024000] Calibrating delay loop (skipped), value calculated using timer frequency.. 5988.63 BogoMIPS (lpj=11977272)
[    0.066211] smpboot: Total of 16 processors activated (95818.17 BogoMIPS)

1372636544185964669816992687728954892440089375514381667174511909268175374690060939228856544040990027753116242749166047097892992609900462837095892596890896272942769507915107783024620410434031288535446282826660988473<214>

3300505295566857637518082644319381<34>

415886787404840708802347064442342979053792622591286720330105351053346726536419047249164135704874129706120659399239564632497847509486256417740506502062490415125448356361397649126933<180>

Using B1=3000000, B2=5706890290, polynomial Dickson(6), sigma=2329806246
Step 1 took 43003ms
Step 2 took 14104ms
********** Factor found in step 2: 3300505295566857637518082644319381
Found probable prime factor of 34 digits: 3300505295566857637518082644319381

415886787404840708802347064442342979053792622591286720330105351053346726536419047249164135704874129706120659399239564632497847509486256417740506502062490415125448356361397649126933<180>

1426699377717441927634734420646199165223779983<46>
291502746759596024030732201083009422330394767996992910824891337733618275290446076413599952241738651612753120539588487119249505253626651<135>

Using B1=43000000, B2=240490660426, polynomial Dickson(12), sigma=2901240081
Step 1 took 353318ms
Step 2 took 89432ms
********** Factor found in step 2: 1426699377717441927634734420646199165223779983
Found probable prime factor of 46 digits: 1426699377717441927634734420646199165223779983

1935997906740201001813604420985563766654114195107782209511304093005179038161317843163577712486846373279334634271548963103120845381870493049249236206406391325849424895822644361951332268104044726935723867256481<208>

51160106920475794177157679340271009454698620925254765934857<59>
37841944109881387737213050291993019192504323928394992969992160687834503124839855666741758437320921987170544091225576615352813466356123724819250556633<149>

Number: 75557_221
N = 1935997906740201001813604420985563766654114195107782209511304093005179038161317843163577712486846373279334634271548963103120845381870493049249236206406391325849424895822644361951332268104044726935723867256481 (208 digits)
SNFS difficulty: 223 digits.
Divisors found:
r1=51160106920475794177157679340271009454698620925254765934857 (pp59)
r2=37841944109881387737213050291993019192504323928394992969992160687834503124839855666741758437320921987170544091225576615352813466356123724819250556633 (pp149)
Version: Msieve v. 1.52 (SVN unknown)
Total time: 101.45 hours.
Factorization parameters were as follows:
n: 1935997906740201001813604420985563766654114195107782209511304093005179038161317843163577712486846373279334634271548963103120845381870493049249236206406391325849424895822644361951332268104044726935723867256481
m: 10000000000000000000000000000000000000000000000000000000
deg: 4
c4: 680
c0: 13
skew: 1.00
type: snfs
lss: 1
rlim: 536870912
alim: 44739242
lpbr: 29
lpba: 28
mfbr: 58
mfba: 56
rlambda: 2.8
alambda: 2.8
side: 1
Factor base limits: 536870912/44739242
Large primes per side: 3
Large prime bits: 29/28
Relations: 9098906 relations
Pruned matrix : 7847227 x 7847452
Total pre-computation time approximately 1000 CPU-days.
Pre-computation saved approximately 18 G relations.
Total batch smoothness checking time: 52.84 hours.
Total relation processing time: 0.42 hours.
Matrix solve time: 47.92 hours.
time per square root: 0.28 hours.
Prototype def-par.txt line would be: snfs,223,4,0,0,0,0,0,0,0,0,536870912,44739242,29,28,58,56,2.8,2.8,100000
total time: 101.45 hours.
Intel64 Family 6 Model 60 Stepping 3, GenuineIntel
Windows-10-10.0.17763-SP0
processors: 8, speed: 3.50GHz

GGNFS, NFS_factory, Msieve

2336506962636126871365980039427180578624266762023639059428126863944134393406542281344094872078477221445161855163163263458374595874491504787107621881566379149176795338448703003267020860505964397887481590129055244061381<217>

14860316657252782142765288463080935006875110604737783554970807<62>
157231303782195144476330572349577257242608307259985705608792262937837193989494679061340424437960272720115545906608988418585770891968484697109847347226589283<156>

Number: n
N=2336506962636126871365980039427180578624266762023639059428126863944134393406542281344094872078477221445161855163163263458374595874491504787107621881566379149176795338448703003267020860505964397887481590129055244061381
  ( 217 digits)
SNFS difficulty: 223 digits.
Divisors found:

Fri Jun 28 02:54:14 2019  p62 factor: 14860316657252782142765288463080935006875110604737783554970807
Fri Jun 28 02:54:14 2019  p156 factor: 157231303782195144476330572349577257242608307259985705608792262937837193989494679061340424437960272720115545906608988418585770891968484697109847347226589283
Fri Jun 28 02:54:14 2019  elapsed time 09:44:14 (Msieve 1.54 - dependency 2)

Version:
Total time: 0.00 hours.
Scaled time: 0.00 units (timescale=2.123).
Factorization parameters were as follows:
#
# N = 68x10^222+13 = 75(221)7
#
n: 2336506962636126871365980039427180578624266762023639059428126863944134393406542281344094872078477221445161855163163263458374595874491504787107621881566379149176795338448703003267020860505964397887481590129055244061381
m: 10000000000000000000000000000000000000
deg: 6
c6: 68
c0: 13
skew: 0.76
# Murphy_E = 1.991e-12
type: snfs
lss: 1
rlim: 38000000
alim: 38000000
lpbr: 29
lpba: 29
mfbr: 58
mfba: 58
rlambda: 2.6
alambda: 2.6
Factor base limits: 38000000/38000000
Large primes per side: 3
Large prime bits: 29/29
Max factor residue bits: 58/58
Sieved  special-q in [100000, 73400000)
Primes: , ,
Relations:
Max relations in full relation-set: 28
Initial matrix:
Pruned matrix :

Msieve: found 13569929 hash collisions in 70172991 relations (58649522 unique)
Msieve: matrix is 4576007 x 4576233 (1596.4 MB)

Sieving start time: 2019/06/26 07:20:48
Sieving end time  : 2019/06/27 17:07:54

Total sieving time: 33hrs 47min 6secs.

Total relation processing time: 9hrs 5min 41sec.
Matrix solve time: 0.00 hours.
Total square root time: 0hrs 17min 1sec.

Prototype def-par.txt line would be:
snfs,223,6,0,0,0,0,0,0,0,0,38000000,38000000,29,29,58,58,2.6,2.6,100000
total time: 0.00 hours.
 --------- CPU info (if available) ----------
[    0.048000] smpboot: CPU0: AMD Ryzen 7 1700 Eight-Core Processor (family: 0x17, model: 0x1, stepping: 0x1)
[    0.000000] Memory: 16284120K/16703460K available (12300K kernel code, 2473K rwdata, 4272K rodata, 2408K init, 2416K bss, 419340K reserved, 0K cma-reserved)
[    0.080565] x86/mm: Memory block size: 128MB
[    0.032000] Calibrating delay loop (skipped), value calculated using timer frequency.. 5988.83 BogoMIPS (lpj=11977660)
[    0.078217] smpboot: Total of 16 processors activated (95821.28 BogoMIPS)

270441955956826259461724710734917894434895936895058692436710814441078601627062139996754045019053887602325754770069714138452397900620193286208793408443632624771775254744198784093283<180>

143592556112550944379841571092051<33>

1883398159893804090529743091618157604676703522597129604321128645357953990957922150592828283426467715180382264710375123706656936137574298787929075633<148>

Using B1=3000000, B2=5706890290, polynomial Dickson(6), sigma=1941098106
Step 1 took 31372ms
Step 2 took 11204ms
********** Factor found in step 2: 143592556112550944379841571092051
Found probable prime factor of 33 digits: 143592556112550944379841571092051

1883398159893804090529743091618157604676703522597129604321128645357953990957922150592828283426467715180382264710375123706656936137574298787929075633<148>

16847740483561130719522264375687866937574682478235788423872109468763<68>
111789362005634808981559165190904717741244270906545305350743911375708141771051491<81>

Number: 75557_223
N = 1883398159893804090529743091618157604676703522597129604321128645357953990957922150592828283426467715180382264710375123706656936137574298787929075633 (148 digits)
SNFS difficulty: 225 digits.
Divisors found:
r1=16847740483561130719522264375687866937574682478235788423872109468763 (pp68)
r2=111789362005634808981559165190904717741244270906545305350743911375708141771051491 (pp81)
Version: Msieve v. 1.52 (SVN unknown)
Total time: 69.07 hours.
Factorization parameters were as follows:
n: 1883398159893804090529743091618157604676703522597129604321128645357953990957922150592828283426467715180382264710375123706656936137574298787929075633
m: 10000000000000000000000000000000000000000000000000000000
deg: 4
c4: 68000
c0: 13
skew: 1.00
type: snfs
lss: 1
rlim: 536870912
alim: 22369621
lpbr: 29
lpba: 28
mfbr: 58
mfba: 56
rlambda: 2.8
alambda: 2.8
side: 1
Number of cores used: 6
Number of threads per core: 1
Factor base limits: 536870912/22369621
Large primes per side: 3
Large prime bits: 29/28
Total raw relations: 32401047
Relations: 10233494 relations
Total pre-computation time approximately 1000 CPU-days.
Pre-computation saved approximately 18 G rational relations.
Total batch smoothness checking time: 31.80 hours.
Total relation processing time: 0.39 hours.
Pruned matrix : 8719725 x 8719950
Matrix solve time: 36.26 hours.
time per square root: 0.62 hours.
Prototype def-par.txt line would be: snfs,225,4,0,0,0,0,0,0,0,0,536870912,22369621,29,28,58,56,2.8,2.8,100000
total time: 69.07 hours.
Intel64 Family 6 Model 158 Stepping 10, GenuineIntel
Windows-10-10.0.17763-SP0
processors: 12, speed: 3.19GHz

GGNFS, NFS_factory, msieve

367595111221728006875786921070015795700002981527653391060584502038801061393582279471327075303233440613339655210922639251348915010966176103566469725522399194681437777499060023105749468505844311644411<198>

8479860331712183564035415887267739119590971442823294675146526998378850230702082553934405786257638109489961341813193665045516897368749220601072452924304776156628008479860331712183564035415887267739119590971442823294675146527<223>

2808159749868806009680953650049026218084619624114836880594277863<64>
3019721485612901073518032972458629277948991170493070572253057602070078452278990430796698236447567358668325372283196928826035493695064738245599492665561018539529<160>

Number: n
N=8479860331712183564035415887267739119590971442823294675146526998378850230702082553934405786257638109489961341813193665045516897368749220601072452924304776156628008479860331712183564035415887267739119590971442823294675146527
  ( 223 digits)
SNFS difficulty: 227 digits.
Divisors found:

Sun Sep  9 19:57:12 2018  p64 factor: 2808159749868806009680953650049026218084619624114836880594277863
Sun Sep  9 19:57:12 2018  p160 factor: 3019721485612901073518032972458629277948991170493070572253057602070078452278990430796698236447567358668325372283196928826035493695064738245599492665561018539529
Sun Sep  9 19:57:12 2018  elapsed time 24:12:42 (Msieve 1.54 - dependency 1)

Version:
Total time: 0.00 hours.
Scaled time: 0.00 units (timescale=2.124).
Factorization parameters were as follows:
#
# N = 68x10^225+13 = 75(224)7
#
n: 8479860331712183564035415887267739119590971442823294675146526998378850230702082553934405786257638109489961341813193665045516897368749220601072452924304776156628008479860331712183564035415887267739119590971442823294675146527
m: 20000000000000000000000000000000000000
deg: 6
c6: 2125
c0: 26
skew: 0.48
# Murphy_E = 1.073e-12
type: snfs
lss: 1
rlim: 43000000
alim: 43000000
lpbr: 30
lpba: 30
mfbr: 59
mfba: 59
rlambda: 2.7
alambda: 2.7
Factor base limits: 43000000/43000000
Large primes per side: 3
Large prime bits: 30/30
Max factor residue bits: 59/59
Sieved  special-q in [100000, 90300000)
Primes: , ,
Relations:
Max relations in full relation-set: 28
Initial matrix:
Pruned matrix :

Msieve: found 18428262 hash collisions in 101467118 relations (84934990 unique)
Msieve: matrix is 6795086 x 6795311 (2399.3 MB)

Sieving start time: 2018/09/06 22:58:38
Sieving end time  : 2018/09/08 19:41:12

Total sieving time: 44hrs 42min 34secs.

Total relation processing time: 23hrs 19min 56sec.
Matrix solve time: 0.00 hours.
Total square root time: 0hrs 17min 37sec.

Prototype def-par.txt line would be:
snfs,227,6,0,0,0,0,0,0,0,0,43000000,43000000,30,30,59,59,2.7,2.7,100000
total time: 0.00 hours.
 --------- CPU info (if available) ----------
[    0.052000] smpboot: CPU0: AMD Ryzen 7 1700 Eight-Core Processor (family: 0x17, model: 0x1, stepping: 0x1)
[    0.000000] Memory: 16285132K/16703460K available (12300K kernel code, 2470K rwdata, 4244K rodata, 2408K init, 2416K bss, 418328K reserved, 0K cma-reserved)
[    0.084569] x86/mm: Memory block size: 128MB
[    0.032000] Calibrating delay loop (skipped), value calculated using timer frequency.. 5988.70 BogoMIPS (lpj=11977408)
[    0.082216] smpboot: Total of 16 processors activated (95819.26 BogoMIPS)

6806327160436752944591332553717450702782221755631972734840317517082376604297251693613123386364857638493989532615984883870238634316592610526926267106481075582934727777097146760463240767912065097873686169495358576751<214>

25964108438335242458953799159984726995036273386788850706376479572355861015654830087819778541428025964108438335242458953799159984726995036273386788850706376479572355861015654830087819778541428025964108438335242458953799159984727<227>

27224323272335305348568170475307833418335757349187<50>
6094239710121236742432032327642301604460054223801205781423353057909<67>
156493674674504406217486383615730536199882461013828620092825069824077578334867985069993122975603644512874167369<111>

Number: n
N=25964108438335242458953799159984726995036273386788850706376479572355861015654830087819778541428025964108438335242458953799159984726995036273386788850706376479572355861015654830087819778541428025964108438335242458953799159984727
  ( 227 digits)
SNFS difficulty: 229 digits.
Divisors found:

Sat Dec  1 12:43:03 2018  found factor: 6094239710121236742432032327642301604460054223801205781423353057909
Sat Dec  1 12:56:34 2018  p50 factor: 27224323272335305348568170475307833418335757349187
Sat Dec  1 12:56:34 2018  p67 factor: 6094239710121236742432032327642301604460054223801205781423353057909
Sat Dec  1 12:56:34 2018  p111 factor: 156493674674504406217486383615730536199882461013828620092825069824077578334867985069993122975603644512874167369
Sat Dec  1 12:56:34 2018  elapsed time 19:03:17 (Msieve 1.54 - dependency 2)

Version:
Total time: 0.00 hours.
Scaled time: 0.00 units (timescale=2.123).
Factorization parameters were as follows:
#
# N = 68x10^228+13 = 75(227)7
#
n: 25964108438335242458953799159984726995036273386788850706376479572355861015654830087819778541428025964108438335242458953799159984726995036273386788850706376479572355861015654830087819778541428025964108438335242458953799159984727
m: 100000000000000000000000000000000000000
deg: 6
c6: 68
c0: 13
skew: 0.76
# Murphy_E = 1.242e-12
type: snfs
lss: 1
rlim: 47000000
alim: 47000000
lpbr: 30
lpba: 30
mfbr: 59
mfba: 59
rlambda: 2.7
alambda: 2.7
Factor base limits: 47000000/47000000
Large primes per side: 3
Large prime bits: 30/30
Max factor residue bits: 59/59
Sieved  special-q in [100000, 85100000)
Primes: , ,
Relations:
Max relations in full relation-set: 28
Initial matrix:
Pruned matrix :

Msieve: found 19140658 hash collisions in 111937014 relations (95538645 unique)
Msieve: matrix is 6065863 x 6066088 (2134.0 MB)

Sieving start time: 2018/11/29 00:01:20
Sieving end time  : 2018/11/30 17:48:29

Total sieving time: 41hrs 47min 9secs.

Total relation processing time: 17hrs 57min 40sec.
Matrix solve time: 0.00 hours.
Total square root time: 0hrs 27min 0sec.

Prototype def-par.txt line would be:
snfs,229,6,0,0,0,0,0,0,0,0,47000000,47000000,30,30,59,59,2.7,2.7,100000
total time: 0.00 hours.
 --------- CPU info (if available) ----------
[    0.044000] smpboot: CPU0: AMD Ryzen 7 1700 Eight-Core Processor (family: 0x17, model: 0x1, stepping: 0x1)
[    0.000000] Memory: 16285108K/16703460K available (12300K kernel code, 2472K rwdata, 4248K rodata, 2408K init, 2416K bss, 418352K reserved, 0K cma-reserved)
[    0.076577] x86/mm: Memory block size: 128MB
[    0.024000] Calibrating delay loop (skipped), value calculated using timer frequency.. 5988.57 BogoMIPS (lpj=11977156)
[    0.074209] smpboot: Total of 16 processors activated (95817.24 BogoMIPS)

38689855231037238952365201213175012112831259291851339967810937735135361160275871071395322415043482611230220389373397771922286537812743676387345148628571926082081993402304360423904151<182>

5694903011044905623991543733031030106305657697640026000708377970652402462512759734840871415448904429698493751494175244042951424101150577980011675365025386216266738216306807683924598432382711404356811361240887<208>

56929867677406235042828423174106353867183121030973113111861078397367295013337077309337059225732032284927959857075892787998782035713278079547936664852445736417559146993002063456542125046286912635508782646034947738800074109292453<227>

207772698380131139512564449811660232796700704342519459808147833085943301817290562592846492857422036644608456649114932338420255583050845351825715816809284292025532660504282330199<177>

162327697551577232000402560241711323<36>

1279958389812770113925440904650778232295085836799543487869496035055265727873140705096506789262754465313658470794741011297443132120585090121013<142>

Using B1=3000000, B2=5706890290, polynomial Dickson(6), sigma=544167467
Step 1 took 31501ms
Step 2 took 11153ms
********** Factor found in step 2: 162327697551577232000402560241711323
Found probable prime factor of 36 digits: 162327697551577232000402560241711323

1279958389812770113925440904650778232295085836799543487869496035055265727873140705096506789262754465313658470794741011297443132120585090121013<142>

3949018609607251498508840292308243788077443<43>
324120627514608751029455857612690018973820591400360423108595810113971315003253691722293672475125991<99>

Using B1=43000000, B2=240490660426, polynomial Dickson(12), sigma=1511871231
Step 1 took 238251ms
Step 2 took 69617ms
********** Factor found in step 2: 3949018609607251498508840292308243788077443
Found probable prime factor of 43 digits: 3949018609607251498508840292308243788077443

39133915936065432501203607239262894950107421414961490454673629728292792440277164016230375977015070966697520992703141166078632492877703515734397278291764892383153099051507740359848627553178236478759907285017219001<212>

44659384992110061432689197679173<32>

876275298976445617828809544523593747983103109544252700030152916263449936684985961705682630412526757794702360724258665876808160241837061035219412004032087423786862930557034299435237<180>

Using B1=1000000, B2=1045563762, polynomial Dickson(6), sigma=2950860670
Step 1 took 9796ms
Step 2 took 5960ms
********** Factor found in step 2: 44659384992110061432689197679173
Found probable prime factor of 32 digits: 44659384992110061432689197679173
Composite cofactor 876275298976445617828809544523593747983103109544252700030152916263449936684985961705682630412526757794702360724258665876808160241837061035219412004032087423786862930557034299435237 has 180 digits

GMP-ECM 6.3

876275298976445617828809544523593747983103109544252700030152916263449936684985961705682630412526757794702360724258665876808160241837061035219412004032087423786862930557034299435237<180>

66951594590330173593729208278250799598093071611861<50>
13088191615723013096462678056780106343344111906251359886795815344215425123281507934153072248565911850935404532221838763372820497617<131>

Using B1=11000000, B2=35133391030, polynomial Dickson(12), sigma=2638345053
Step 1 took 85991ms
Step 2 took 29432ms
********** Factor found in step 2: 66951594590330173593729208278250799598093071611861
Found probable prime factor of 50 digits: 66951594590330173593729208278250799598093071611861

679928265348491836956806998206705815040394749715156850001696606427268428573423360476861013471592923837026495859636088960859216438998481275171356370043057211048091116852832856737478895315487<189>

39125178134039317844059327493694284891<38>
17378279097391433246355690350396838278983065278203377004209932293781085130814320232984715227632154806063297301015074639663441673337843482689586172783757<152>

Using B1=3000000, B2=5706890290, polynomial Dickson(6), sigma=1700350533
Step 1 took 32059ms
Step 2 took 11642ms
********** Factor found in step 2: 39125178134039317844059327493694284891
Found probable prime factor of 38 digits: 39125178134039317844059327493694284891

89428886004546314408204627730797699123318178759406833813362735463255376544784794407386945863923266935067144768915625597965272250741620744664528960913916334450631575859916562369150943057774185626270727958137475640858652950378437<227>

1999532946001827364067665515787<31>
44724887471028739806475629929164110353099683135830125183232382522977359976139087512516215871694381115429263485965774232118719184128071678322942199686912093281114794060655980113779328933777407395951<197>

Using B1=1000000, B2=1045563762, polynomial Dickson(6), sigma=3169138684
Step 1 took 11481ms
Step 2 took 6552ms
********** Factor found in step 2: 1999532946001827364067665515787
Found probable prime factor of 31 digits: 1999532946001827364067665515787
Probable prime cofactor 44724887471028739806475629929164110353099683135830125183232382522977359976139087512516215871694381115429263485965774232118719184128071678322942199686912093281114794060655980113779328933777407395951 has 197 digits

GMP-ECM 6.3

443324653406122890941523237865631746865294127723007789522654807001848425266891681060044097331472085890528075027217603702551136933658779461541691687680340089<156>

217048012078610382788337413614076259020057448797<48>
2042518837931396041717010000902953678359229362479556429802414535174728578819455985695510721760075992537701837<109>

GMP-ECM 7.0.5-dev [configured with GMP 6.1.0, --enable-assert] [ECM]
Tuned for default
Running on Dhiblang
Input number is 443324653406122890941523237865631746865294127723007789522654807001848425266891681060044097331472085890528075027217603702551136933658779461541691687680340089 (156 digits)
[Fri Apr 26 03:42:05 2024]
Using MODMULN [mulredc:0, sqrredc:0]
Using B1=110000000, B2=776278396540, polynomial Dickson(30), sigma=0:1725668175225425482
dF=131072, k=4, d=1345890, d2=11, i0=71
Expected number of curves to find a factor of n digits:
35        40      45      50      55      60      65      70      75      80
34      135     614     3135    17884   111314  752662  5482978 4.3e+07 3.6e+08
Writing checkpoint to checkpnt at p = 28929323
Writing checkpoint to checkpnt at p = 57918373
Writing checkpoint to checkpnt at p = 86976919
Writing checkpoint to checkpnt at p = 110000000
Step 1 took 2279356ms
Using 20 small primes for NTT
Estimated memory usage: 472.25MB
Initializing tables of differences for F took 2111ms
Computing roots of F took 61686ms
Building F from its roots took 30344ms
Computing 1/F took 14171ms
Initializing table of differences for G took 1723ms
Computing roots of G took 52104ms
Building G from its roots took 31931ms
Computing roots of G took 51692ms
Building G from its roots took 32019ms
Computing G * H took 7269ms
Reducing  G * H mod F took 8215ms
Computing roots of G took 51750ms
Building G from its roots took 32223ms
Computing G * H took 7738ms
Reducing  G * H mod F took 8183ms
Computing roots of G took 52592ms
Building G from its roots took 32485ms
Computing G * H took 7646ms
Reducing  G * H mod F took 8224ms
Computing polyeval(F,G) took 59609ms
Computing product of all F(g_i) took 313ms
Step 2 took 556546ms
********** Factor found in step 2: 217048012078610382788337413614076259020057448797
Found prime factor of 48 digits: 217048012078610382788337413614076259020057448797
Prime cofactor 2042518837931396041717010000902953678359229362479556429802414535174728578819455985695510721760075992537701837 has 109 digits
Peak memory usage: 570MB

GMP-ECM 7.0.5-dev [configured with GMP 6.1.0, --enable-assert]

11841303862655090033499849888277158258649188271481712608717475744967120566829492982671206410564430170290537136336973134379646393458566953492841115809788845611090887776664569066763882105829078882862654223541221046059171<218>

178818106845561546959490012499<30>
66219825673928968900189098788953936945478826090458423636651080953534370246699928776377149918414137721903751876165944860866780630233494862083712576435637762270987205659557691057428080553329<188>

Using B1=2000000, B2=5705781910, polynomial Dickson(6), sigma=473048321
Step 1 took 11889ms
Step 2 took 7720ms
********** Factor found in step 2: 178818106845561546959490012499
Found probable prime factor of 30 digits: 178818106845561546959490012499
Probable prime cofactor 662198256739... has 188 digits

5514377738268935974414578090947394796581170404903116162536043673588090689689998101143751463885549686011264453338173113138595760737234405194712235016049540901052906631412983330196467386066642040627987554264425661<211>

102374254912027152595622789805790531<36>

53864887641991470564522471966396188068155213399557380202520052719049381576343396723606561022567854748061279757848276832053650327373875308024758715979573625925184226101246623231<176>

Using B1=3000000, B2=5706890290, polynomial Dickson(6), sigma=2792878606
Step 1 took 37615ms
Step 2 took 13491ms
********** Factor found in step 2: 102374254912027152595622789805790531
Found probable prime factor of 36 digits: 102374254912027152595622789805790531

21469946857776978337991838199702016081684812402708383278586547518565110408096645323960817473278362060280096295237533230662784521393365451742363542464192312123520140499332237292546243818589178849993238545412363323660175070366961490082510584447<242>

156395589741486327234113265141831423999383<42>
137279746144157068048315555075003444353129179049127850009338471609612351861483806607306853267505775012899770666460452220353929645999870725992121240533155002433939833392950894750591601192214401815730009<201>

Using B1=43000000, B2=240490660426, polynomial Dickson(12), sigma=2625718579
Step 1 took 445405ms
********** Factor found in step 1: 156395589741486327234113265141831423999383
Found probable prime factor of 42 digits: 156395589741486327234113265141831423999383

2170567094712233935840102896867229795920384693928139139138447517030104747281655991440775409803206887075032252002232449911654645451658272375294000786282363356305451<163>

11429239505077671848577465495254933307569676102628481660174111525288430376507505576624711486517794357869627560143955527277398402912997971757240882875183418515530999350416987727240432107658108767605890256439246857267095281334044056558107351271<242>

243435597250674605326659039440887500529271445003352901656652892905844642015350589247377703236291207807861397<108>

1525909342501216834965035089671526302449<40>
159534770821734108256424344930126692379426805721050652887295889748453<69>

N = 243435597250674605326659039440887500529271445003352901656652892905844642015350589247377703236291207807861397 (108 digits)
Divisors found:
r1=1525909342501216834965035089671526302449 (pp40)
r2=159534770821734108256424344930126692379426805721050652887295889748453 (pp69)
Version: Msieve v. 1.48
Total time: 3.05 hours.
Factorization parameters were as follows:
n: 243435597250674605326659039440887500529271445003352901656652892905844642015350589247377703236291207807861397
Y0: -819163659822863262518
Y1: 144279100103
c0: 3756003367090719557091489
c1: 1297660189141069579973
c2: 112297790882711654
c3: 1684116927143
c4: -114229015
c5: 660
skew: 31882.99  
type: gnfs
Factor base limits: 2500000/2500000
Large primes per side: 3
Large prime bits: 26/26
Sieved algebraic special-q in [0, 0)
Total raw relations: 4872524
Relations: 509626 relations
Pruned matrix : 302060 x 302285
Polynomial selection time: 0.00 hours.
Total sieving time: 2.92 hours.
Total relation processing time: 0.02 hours.
Matrix solve time: 0.10 hours.
time per square root: 0.01 hours.
Prototype def-par.txt line would be: gnfs,107,5,59,2000,0.0006,0.25,200,15,15000,2000,2500000,2500000,26,26,49,49,2.6,2.6,150000
total time: 3.05 hours.
Intel64 Family 6 Model 42 Stepping 7, GenuineIntel
Windows-7-6.1.7601-SP1
processors: 4, speed: 2.29GHz

4514925492848521399820215032300509604647935205917867727248659067053137970971431329970687475562209978250475996122097095187775532934942965630159460608266003242795657502191651135845379340245837841476223711470224575161431582911709703<229>

50716755517876100264729053102393278833476201069198800970984910739537520859800991767102604500442220097170032730326367620622891113502654844400757280836801554828541952647886212964686746915643243492718694939<203>

138733895677861256407689789813456728387297941710630367240873420469949784316412616728226682518604958975047382446262733757023604912899611713804153288765086461577763810402502947295917793319002029849081400806356276931<213>

216100143989995132056082569956924265202676670623004074208787879685857300572332908523424777603814940751716483995658589692029778114929089416927895504109408461422748375412777265661081227292153171525652177442092800260788995927570501291621680069<240>

25020147832820125382179295482976865675958762757867867276846373358957463327678126024734108818526230537334720932879070836161482616384652589865259965313448726019382241823194828212769701022079345327269463639812563063227477<218>

6938067544128150188756249362309968370574431180491786552392612998673604734210794816855422916028976635037241097847158453219059279665340271400877461483522089582695643301703907764513825119885725946332006938067544128150188756249362309968370574431180491786552392613<259>

2035713558154446409523892873008307538164243880580273808075297081468625157223618788579208163214569359069500551395995029469380828870958973514138314816642279749715181480889389144285273615380248717506307174261366224656952522217<223>

9421844444892578840692741732436954211578012224494109710171538722149209095088121231885440897791468358784149554512114637915896472437878147650841609212550493748336559608854477030697043710111291351478089902499367337304580574993<223>

573538940271435668919247526905032249703907552280873038183177745715235300609415892016584619560991925324210081611193960375252078967102941942968186482615541271061331974014311312915275128151226500227956724052973947<210>

1680276923639796481561154991262162245892632797450600257817059230943545763154883901080496470435667774283019663168754913029251660756250987268620333267503971802062524564260590758026864760204606561948918672721050054819588932702108289248997<235>

2357235538146211589647034374859991030633931<43>

712816728090400279134116679329566067925926182903913136794604603452508677601334128758889022791131862790610259897785885626515937751810711219192442364233084003035116728231140289839011613709187087<192>

GMP-ECM 7.0.4 [configured with GMP 6.1.0, --enable-asm-redc] [ECM]
Input number is 1680276923639796481561154991262162245892632797450600257817059230943545763154883901080496470435667774283019663168754913029251660756250987268620333267503971802062524564260590758026864760204606561948918672721050054819588932702108289248997 (235 digits)
Run 719 out of 2100:
Using B1=11000000, B2=35133391030, polynomial Dickson(12), sigma=1:4144640909
Step 1 took 191024ms
Step 2 took 60580ms
********** Factor found in step 2: 2357235538146211589647034374859991030633931
Found prime factor of 43 digits: 2357235538146211589647034374859991030633931
Composite cofactor 712816728090400279134116679329566067925926182903913136794604603452508677601334128758889022791131862790610259897785885626515937751810711219192442364233084003035116728231140289839011613709187087 has 192 digits

GMP-ECM 7.0.4

Linux Ubuntu 18.04 LTS
Intel(R) Core(TM) i5-2520M CPU @ 2.50GHz

234002042944003341182510896832590297607248381498064185674376579072101671436083775460989064748543450137530444011716947602443858375968421561372598596216610022674887682937543966099728102837098506751302209469810223989941648009500452870596911<237>

724427861038590888533109649536408334181788276702697068392472525148109993741410040069344564246707602282807191043039931579444496936138421289180465698373479587462423531770245888753785954170131051742781458432982252783093<216>

1332510381750195750988829303150846173427819<43>
543656447979854148138860582260170238287062001980412458727718171383900380712301790960503005802336529323864594158237061356517448970001913961325547706781176441009587501364892447<174>

GMP-ECM 7.0.4 [configured with GMP 6.1.0, --enable-asm-redc] [ECM]
Input number is 724427861038590888533109649536408334181788276702697068392472525148109993741410040069344564246707602282807191043039931579444496936138421289180465698373479587462423531770245888753785954170131051742781458432982252783093 (216 digits)
Run 1601 out of 2100:
Using B1=11000000, B2=35133391030, polynomial Dickson(12), sigma=1:3510449639
Step 1 took 151240ms
Step 2 took 54524ms
********** Factor found in step 2: 1332510381750195750988829303150846173427819
Found prime factor of 43 digits: 1332510381750195750988829303150846173427819
Prime cofactor 543656447979854148138860582260170238287062001980412458727718171383900380712301790960503005802336529323864594158237061356517448970001913961325547706781176441009587501364892447 has 174 digits

GMP-ECM 7.0.4

Linux Ubuntu 18.04 LTS
Intel(R) Core(TM) i5-2520M CPU @ 2.50GHz

683672797022726347493071652447843010839715654100212432208445402979829314240626611262411877187199888814056687307872716402602496521627526009327346858692781509228965197724332176055338857558327770670349194447529709<210>

1374951795321358198381724892175676063093444503<46>

497234011657067672930918128387793239344192563121270180273417115692020910632353269270719559689084483830726339609135514685309747178741474451480301173446489235948965403<165>

GMP-ECM 7.0.4 [configured with GMP 6.1.0, --enable-asm-redc] [ECM]
Input number is 683672797022726347493071652447843010839715654100212432208445402979829314240626611262411877187199888814056687307872716402602496521627526009327346858692781509228965197724332176055338857558327770670349194447529709 (210 digits)
Run 1265 out of 2100:
Using B1=11000000, B2=35133391030, polynomial Dickson(12), sigma=1:3026611392
Step 1 took 140100ms
Step 2 took 53244ms
********** Factor found in step 2: 1374951795321358198381724892175676063093444503
Found prime factor of 46 digits: 1374951795321358198381724892175676063093444503
Composite cofactor 497234011657067672930918128387793239344192563121270180273417115692020910632353269270719559689084483830726339609135514685309747178741474451480301173446489235948965403 has 165 digits

GMP-ECM 7.0.4

Linux Ubuntu 18.04 LTS
Intel(R) Core(TM) i5-2520M CPU @ 2.50GHz

487616343714501287194802176639586879472920690595105116002456663567213587914345341778415285004658714359957510998856530537891955214291132916912418951372404860892141159337984494031222227504157811848252707996643756602851162615027213978198943489552521<246>

24984793896196920895237307503236253715175012541842957489353103934485525989421252348089760815868685913753349036636372063955071614647754431336021683194473415323381543811597949483414970908563920999887953854655306658471713056464420605783877422799300709862710023559922123<266>

439463911658139644406269212812925397<36>

56852891064312626541709894962303425974840477238439396781545757263973010796506336471876358474129057812673040197875806799468000832028717002005842890068680763150213616066446135159858077830065679998059946743420923392680336957054672159<230>

GMP-ECM 7.0.4 [configured with GMP 6.2.0, --enable-asm-redc] [ECM]
Input number is 24984793896196920895237307503236253715175012541842957489353103934485525989421252348089760815868685913753349036636372063955071614647754431336021683194473415323381543811597949483414970908563920999887953854655306658471713056464420605783877422799300709862710023559922123 (266 digits)
Run 22 out of 2100:
Using B1=11000000, B2=35133391030, polynomial Dickson(12), sigma=1:2836217605
Step 1 took 202476ms
Step 2 took 68184ms
********** Factor found in step 2: 439463911658139644406269212812925397
Found prime factor of 36 digits: 439463911658139644406269212812925397
Composite cofactor 56852891064312626541709894962303425974840477238439396781545757263973010796506336471876358474129057812673040197875806799468000832028717002005842890068680763150213616066446135159858077830065679998059946743420923392680336957054672159 has 230 digits

GMP-ECM 7.0.4

Linux Ubuntu 18.04 LTS
Intel(R) Core(TM) i5-2520M CPU @ 2.50GHz

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