Old log (2002)


December 28, 2002

by Yvan Guillermin (y.guillermin@orange.fr), (December 19, 2002)

p(10056)= 113745068669009004441168997417014157907749951 *
647813481037380996354699313894456828118150196570728255657440007

p(10059)= 2 * 5 * 247169686795703954089958260733273655077 *
30968515581508570802882414337784755985498996308035334115728810206501

p(10706)= 7 * 29 * 149 * 2087 * 151937 * 8321009867 * 269278720093668288135943374525653 *
11531779104514217321407513073316380174227874020145890859

p(10725)= 643 * 1237 * 8237 * 1133261 * 7281557 * 124941382832785462332659219102443 *
46344749221382110323647857999251093977377204184067690829

by Alexis Michon (Euclide01@orange.fr), (December 19, 2002)

p(10368)= 2^2 * 11 * 5914457 * 5666078337997607487415263356789417218012538491 *
2542506411584698066344393859536246174158917451043678709


By Tom Hill (tomlyns@earthlink.net), (December 15, 2002)

p(10557): c106 = p33 * p74, by ecm Java applet of Dario Alpern
p33 = 130461514739759139336993518593103
p74 = 37942307482692398114363909054780297718249686244161655973127683982883678169

p(10618): c89 = p38 * p51
p38 = 51738979621934285955873111670857821249
p51 = 789366802603558818557877741548080358942972732365913

p(11316): c99 = p50 * p50
p50 = 12339601614160714099662218142068838719295884989177
p50 = 19245700213126971516389409208106584574502121911683

p(11324): c96 = p39 * p58
p39 = 128955348495239525650554668752484648123
p58 = 3907612561134084117807453707693222037501933056450070034829

p(11333): c102 = p42 * p61
p42 = 430903222511456490833038629550420816940957
p61 = 1205627002588032843160311798548225259191654605386300446750041

p(11462): c96 = p46 * p50
p46 = 2185896925708680940550189775093292323436942669
p50 = 89362102368821885480951937910718243570946299369923

December 08, 2002

By Tom Hill (tomlyns@earthlink.net), (December 04, 2002)

Factors found using ppsiqs v1.1 of S. Tomabechi, except as noted:

p(10533): c89 = p44 * p46
p44 = 11582825193264589446237674622327694110816707
p46 = 2930661722567271869599328510076462494789061493

p(10553): c89 = p39 * p51
p39 = 135648337639210555154092356582957032731
p51 = 382322340880803428361025682337280421387440333528841

p(10555): c101 = p32 * p70, by ecm Java applet of Dario Alpern
p32 = 25779536742993408063323063484593
p70 = 1973022402269041352928918662876680487859094760429598901717510827052783

p(10585): c101 = p35 * p66, by ecm Java applet of Dario Alpern
p35 = 23894813700226036010686807058317447
p66 = 768943374534874819678556584296444724418562019680794664527984971511

p(10650): c108 = p30 * p35 * p45, by ecm Java applet of Dario Alpern
p30 = 219027239568195669990732480427
p35 = 27697294436871682435921153890676213
p45 = 104560188450229156418052575776609349347774963

p(11030): c104 = p36 * p68
p36 = 657524233633866850325835869474760181
p68 = 57379272536800243343177297175367383866730418694167905064840319740331

p(11202): c99 = p47 * p52
p47 = 80686345909330529499474011730884276772999688321
p52 = 8868691499288448431937159637130428041339815327314063

p(11455): c99 = p44 * p56
p44 = 37583831639648865552448531965387795649833797
p56 = 21775778215792850762988931230210994326800516319350137379

December 02, 2002

by Yvan guillermin (y.guillermin@orange.fr) (November 23, 2002),

p(10028)= 2^6 * 7 * 43 * 20510257 * 38453964105372878328443796338854486439309976647 *
3398579017946317677057030412640367499090344141199

p(10308)= 5 * 3219389 * 167264179 * 72597883969610175779964791898842825946133 *
9050294790214537098028686585319451145164739911380651

p(10339)= 2^3 * 5^2 * 153533 * 58788269 * 51771413333189053731504508069284836177 *
27910254934385875112087466367981965567974844926042430043


by Alexis Michon (euclide01@orange.fr) (November 23, 2002),

p(10279)= 5^2 * 14867 * 19709697313 * 9673458094042426073723569484249976735181207 *
17350705696042943404710583914591089452998984187201

p(10235)= 2 * 13 * 95093 * 1502052113 * 13215406307357908496307556085220216580311389 *
14411910442636549795435161999995880215544098650777

p(10489)= 2^2 * 5 * 7 * 11 * 146207677688241558538126787141503811 *
75227964602027240873245649876068070846195999225581365331521825014848541

p(10498)= 2 * 3 * 5 * 7 * 71 * 131 * 2180727523173584887412137591911667357 *
4447189051359307340272791589178586434186802567593341464376412096047

November 23, 2002

By Tom Hill (tomlyns@earthlink.net), (November 22, 2002)

Factors found using ppsiqs v1.1 of S. Tomabechi

p(11094): c105 = p43 * p63
p43 = 1141049491694728490076841550589432043019603
p63 = 305352227782539557440034452119799734925037939184006247212281623

p(11208): c93 = p45 * p49
p45 = 301328765245438028327114868768412977247070141
p49 = 1531220114740177432221148672823733457494699571177

p(11210): c95 = p37 * p58
p37 = 5685032280618507976153884556975151521
p58 = 8789985850524829992848121637338532426982971830709682050363

p(11238): c94 = p40 * p55
p40 = 1199112285241289721598050584306933033527
p55 = 2239488548337622485014359149491295194919289895765602711

p(11278): c96 = p47 * p50
p47 = 16393958530278475798593490517635420047374520857
p50 = 20287898324715399713512926883196852827401204172247

p(11301): c96 = p45 * p51
p45 = 865833612968010647658814526989008147667552423
p51 = 603118392050906586871527407931006215364794819817661

p(11418): c96 = p40 * p56
p40 = 4314274609484382980897017313777895483889
p56 = 28812990557379463810699323748717081845062243129834389001

p(11450): c98 = p39 * p59
p39 = 431935386764102704838651069204852191271
p59 = 45118084998230090789412265604715354242965985433725810143249

November 11, 2002

By Tom Hill (tomlyns@earthlink.net), (November 05, 2002)

Factors found using ppsiqs v1.1 of S. Tomabechi, except as noted:

p(11168): c100 = p38 * p62
p38 = 66921496007793452985842630471418746939
p62 = 25334738980539880072119601848820123149090213392328881772459887

p(11191): c97 = p47 * p50
p47 = 67501353040663875691601204329392211693679087543
p50 = 66791889227214830652949886200059502444264681019701

p(11215): c102 = p47 * p55
p47 = 40075625316674796882746850565693544057411526001
p55 = 3195669926827855368795800123858827960517524732412467409

p(11275): c97 = p43 * p54
p43 = 3376462097560507733455645487665816143392473
p54 = 816190035355763674332802670750900232472140945832319191

p(11298): c95 = p39 * p57
p39 = 139378195950480545306763041870471063743
p57 = 495237166550140003916980403308061235898364871020579035999

p(11306): c101 = p40 * p61
p40 = 1451134158196917370335472366418359742861
p61 = 8740228479558422163831248579883936391146521027751581333846483

p(11432): c96 = p35 * p61
p35 = 96335535229619658972293149650102929
p61 = 2013294794145360592456130869504743758856226755228313306717681

p(11498): c105 = p34 * p71, by ecm Java applet of Dario Alpern
p34 = 3372086078907470252095252229282557
p71 = 33652761351511379827992247639841048793579713692509661645019786667073429

November 04, 2002

By Alexis Michon (November 03, 2002),
p(10362)= 2 * 3^3 * 11 * 787 * 39283291 * 19591232160707699321116349583217391561 *
9667311275854446288594995003829248115453586071075213056683

by Yvan guillermin (Y.Guillermin@ifrance.com)
p(10132)= 7 * 11 * 24841 * 23627759 * 49616408205720557996963540826196601088089 *
86051914369890544181163976771455515961260654664987197

October 31, 2002

By Alexis Michon (October 22, 2002),

p(10347)= 839 * 12473 * 649137220175585868310942455509351310737783 *
424411265874465529658943413295028265817625796956972880012459

p(10465)= 86484694737421 * 83317530917245788662861339364491717 *
1744153828538396150173656899770015053431699057047937077809103

October 21, 2002

By Tom Hill (tomlyns@earthlink.net), (October 17, 2002)

Factors found using ppsiqs v1.1 of S. Tomabechi, except as noted:

p(11104): c100 = p50 * p51
p50 = 18298473887125641455670141596162598004699249704763
p51 = 129318438572886329182831996141981611983734525867969

p(11158): c98 = p45 * p53
p45 = 285329781857786027130489556880072925935613469
p53 = 39893092281837438251056742433826806231148062739661537

p(11184): c97 = p38 * p60
p38 = 35189873885455680152398085837233410727
p60 = 242240329907139160616450186003947291698517854669359008147357

p(11203): c95 = p39 * p57
p39 = 703186310706248056090411968833775033607
p57 = 138587762471648230649064287630292336939983761600871236097

p(11206): c104 = p36 * p68
p36 = 235337072207577477993080032643011019
p68 = 67870757535846748456765803938718988834412384084746069916399803449631

p(11223): c104 = p32 * p72, by ecm Java applet of Dario Alpern
p32 = 56997435494637025106532321212717
p72 = 875634971323804633455022397553251964619642051946905002066925014247099693

p(11371): c101 = p32 * p70, by ecm Java applet of Dario Alpern
p32 = 77860655442476865031756663432171
p70 = 1219702444913603340745006100788080526316178439423869433402745806935049

p(11475): c95 = p38 * p58, by ecm Java applet of Dario Alpern
p38 = 20070348897781163152780775389307423219
p58 = 1116278201186316157067082003299686511892967168830057534409

October 05, 2002

By Tom Hill (tomlyns@earthlink.net), (October 4, 2002)

Factors found using ppsiqs v1.1 of S. Tomabechi, except as noted:

p(11106): c92 = p39 * p54
p39 = 673177300720908806936562026309404678601
p54 = 147300461955883327839726302876266694630552355193812143

p(11122): c93 = p44 * p49
p44 = 31178138624770777134741025082989818363212507
p49 = 5597001258355579610362728975399151246181946698207

p(11125): c103 = p39 * p64
p39 = 255403851610170310264912919075396370473
p64 = 4116393807923278575240576022094846264844452905939357742353185073

p(11153): c93 = p36 * p58
p36 = 162386034715944321648783564215359799
p58 = 1321253631206949519609388372123625271417512551879851575239

p(11331): c96 = p31 * p66, by ecm Java applet of Dario Alpern
p31 = 1510713955714947179873226594937
p66 = 421354431830764301678364117772749048570550203306565541422455732241

p(11348): c92 = p41 * p51
p41 = 43027962642604447376313615403061031396301
p51 = 696575481838123222706636083436878231142885152134103

p(11367): c104 = p29 * p76, by ecm Java applet of Dario Alpern
p29 = 15997778629559349078078942743
p76 = 1891164035891426468565831401815360695001949445359900958450324221391737653123

p(11441): c103 = p30 * p73, by ecm Java applet of Dario Alpern
p30 = 828352783333436861810649242153
p73 = 4662077270996229765864367677782229817360365778866123086496211967466624733

By Tom Hill (tomlyns@earthlink.net), (October 03, 2002)

p(11142): c89 = p40 * p49
p40 = 9242960820357122119616195104975272618317
p49 = 2128379717747416986536784301917967258743287657459

p(11343): c89 = p40 * p50
p40 = 1800737461545670124082887344920607335239
p50 = 53011517761574972238010314560703168914198030684051

p(11359): c89 = p31 * p59
p31 = 3819263688871534691072629529069
p59 = 16258953929288849562287927786113414779698451720368973762281

p(11407): c88 = p31 * p57
p31 = 7782695457964587523100879396573
p57 = 468648118730985264851961543658187590778698659467502137423


By Alexis Michon (September 29, 2002),

He began curves with B1=4000000 for all remaining number
for partition numbers subordinate in p10500.
See
http://euclide.euclide.free.fr/partition/part101.htm

p(10021)= 3 * 7 *
129451852355551802448471446090143007 *
17377546528454345224036352673042720313285410657812224976860911594085939

p(10064)= 5 * 7^2 * 97 *
47007509548859617917722022658340615917 *
73006270230293186448543028042322883976279696323774834111308506871

p(10152)= 2 * 13 * 53 * 11897 * 53480939 *
56237346905870839119549125255950660357 *
5038733383609735389176556680028313086435314499657703877

p(10528)= 67 * 509780954662469419340046097105938643 *
804848708979911960397234182459276646037199306081189007359542775055223951


By Tom Hill (tomlyns@earthlink.net), (September 25, 2002)

He reserved the remaining c88-c105 in the range 11001-11500.

Factors found using ppsiqs v1.1 of S. Tomabechi.

p(11032): c100 = p35 * p65
p35 = 93215834284182580247195960825916203
p65 = 16535507085438913382129998578410119650970811407240434146010289831

p(11058): c98 = p46 * p52
p46 = 7238731064178582194945568195925969067606823421
p52 = 5466631467686680237365559690409332150611272752364123

p(11061): c102 = p39 * p63
p39 = 812074485318120824904044942252692122343
p63 = 492195009402202715620435381281727258367060742529949506888027771

p(11065): c97 = p35 * p62
p35 = 29102889625738027465866314543551687
p62 = 54065446519101220395304620332616860466745523408853463039183037

p(11102): c97 = p36 * p62
p36 = 299279012126546433815269863854867771
p62 = 26751994113276122744291627098715868800402366268766845803531051

p(11129): c97 = p37 * p60
p37 = 8562957103366319793073725979651372471
p60 = 663675258313747063683874457080910264451173146051252546207001

p(11148): c94 = p47 * p48
p47 = 48424019218174015625491728892019338636015867753
p48 = 131068482637882350456511374050433785141250507319

p(11166): c91 = p40 * p52
p40 = 1357733148572166546006910710829317173153
p52 = 3989666395847071876150490602003076979635133887836289

September 15, 2002

By Tom Hill (tomlyns@earthlink.net), (September 12, 2002)

Factors found using ppsiqs v1.1 of S. Tomabechi, except as noted.

p(11001): c99 = p44 * p56
p44 = 14819872530445376860642372224356225320378199
p56 = 41574895912502336493426875211478527613752577537892883047

p(11010): c96 = p39 * p58
p39 = 142279912179551680574670976538930769869
p58 = 4551947832737562963676429512014441725747965067682721926201

p(11011): c101 = p43 * p59
p43 = 1068888722866403645886781846767810558782441
p59 = 71443962777260766433090210424801926030705678750117620382771

p(11018): c100 = p36 * p64
p36 = 400304542754152341760656319798326011
p64 = 8394961367954652501310832892090657735833765011634965651887486071

p(11025): c106 = p32 * p32 * p43, by ecm Java applet of Dario Alpern
p32 = 27711364089491070565721608024621
p32 = 49702372528663929975323153987593
p43 = 2074306723206496218899695858374665379207149

p(11075): c93 = p39 * p54
p39 = 249367622692110733365313050465705757033
p54 = 651265846742619435343521618851258009753662187709095977

p(11079): c98 = p39 * p59
p39 = 517768429255288666047695853260327283941
p59 = 97366215362226645643646054886272518302466259888522348575517

p(11428): c104 = p30 * p75, by ecm Java applet of Dario Alpern
p30 = 123849315805852386274874884307
p75 = 530515676485577992085777272900975243022106913695716998831685569365880750273

September 09, 2002

By Alexis Michon (September 07, 2002),

p(10013)= 3 * 3759251 *
944980508162202770938060555515748061561 *
4004000780900940422704201642875952292222359023278781105160229

p(10509)= 3 * 5^2 * 59 *
13072391348711312253358185559907595403 *
375402949857085249375614671991120685487622310915071271207234774767683

#p(10511)= 2^2 * 3 * 5^3 * 11 * 478813 * 17449363 *
122913327379418389149019702752373 *
1313776650882240919195361731499696339522786728556323557349697

#p(10516)= 2^6 * 9871330660223888813936456591 *
37492963917746671603800239524066229321680143332943292397241332811116116231198673

p(10897)= 2^3 * 3 * 7^2 * 613 *
6858637280377670645169541986157 *
520031893478208307863346603896912652882450271125397260432604115348988052569

p(10906)= 2 * 3^2 * 13 * 18133 *
1131926809074075776381629883 *
597429780690853650323578366907054338001343252594645303627156456589161185032933

p(10917)= 3^3 * 7 * 840144815625491851931838817 *
20663002532492025110292274746843931631634396594925546968222117718646148578236334383

p(10966)= 1303 * 40093 * 2198662761218086411193724241 *
674179363018280322819048569179711 *
76921369649493504633589135370361142669993393

p(10998)= 2^2 * 7^2 * 199 * 1229 *
179489590174095242724250420933 *
98261010978117778966189004493874601 *
10392869805914287927654849804506556175819

September 06, 2002

By Tom Hill (tomlyns@earthlink.net) using ppsiqs v1.1 of S Tomabechi (August 27, 2002)

p(11081): c91 = p38 * p53
p38 = 45403199001111215199419404342795972967
p53 = 93115259688302827517075668740577454801615367681233929

p(11205): c92 = p42 * p51
p42 = 272213291342521943539846307592866666508323
p51 = 300131053298552059005352845193198516546567709787413

p(11229): c90 = p35 * p55
p35 = 25954064062674132521010416678857789
p55 = 5087060043590889021970789220084312852922432738499525171

p(11436): c90 = p36 * p54
p36 = 491322314511274655788198481676231961
p54 = 236680035292006668196130768828151319991221703750171549

August 26, 2002

By Alexis Michon (euclide@nomade.fr) (August 24, 2002),

p(10120)= 2^3 * 7^2 * 1036250350727 *
983923839500752927679017826715285181 *
414807041305271393393136420242641807117622753696822571127

p(10830)= 2 * 3^2 * 5 * 11 * 131 * 757 * 630017 *
26690889519300614749055200459 *
687125923321137547693383016710998131069379758258252792333154190016831

p(10848)= 7^2 * 103 * 1609 *
17168964741455775529871702285633 *
10139187226621565900214517830953606808200483625209731844196627681023079817

p(10895)= 5449 * 15705163 *
107907850940804897034086731663 *
271725648041738827373598282135015252819751522346203602731673165458189977


By Tom Hill (tomlyns@earthlink.net) using ecm/siqs program of Dario Alpern, (August 20, 2002)

p(11140): c112 = p28 * p37 * p48
p28 = 2246504780726180558365544237
p37 = 6605696261377562869612048305479909953
p48 = 220053009315168285552203230252488426340578001531

p(11162): c113 = p29 * p42 * p43
p29 = 17602651005015460934267561377
p42 = 724092735508579047476718520332276086003171
p43 = 1670092098641490368490802100796410272360079

p(11169): c93 = p28 * p31 * p35
p28 = 9109681288290320759042989999
p31 = 3276784626028920284576045530789
p35 = 22875999922501484167827159676544923

p(11360): c90 = p35 * p55
p35 = 43765346799697386101213402517402913
p55 = 4160427927275799901587302039339792427507554794841347681

August 14, 2002

By Reto Keiser (August 13, 2002),

p10890:
4210945478215203912820639247932570619976136377703161393347491514163448656301110397681170245692494313
= P42 * P59
P42 = 169655194455970180535790467686761773231809
P59 = 24820610366327751351235742825938664641093323856956316226857

by thunderbird 1.4 Ghz, 512M DDR with SIQS
cputime 221:29:36:53


By Tom Hill (tomlyns@earthlink.net) using ecm/siqs program of Dario Alpern, (August 6, 2002)

p(11234): c96 = p29 * p67
p29 = 90404412670951411010030339449
p67 = 7436381501413578737433452308235867325253267704459857043511280779519

p(11244): c90 = p30 * p60
p30 = 550187403504919835862038208397
p60 = 669599360394934173215933307047017613618471492950950952034693

p(11249): c97 = p28 * p33 * p37
p28 = 3196176378026175974655116789
p33 = 650226493527201862873656833605109
p37 = 1810476028675987502754282859199714791

p(11250): c104 = p26 * p78
p26 = 31163600905900927146212921
p78 = 331965754912531561299182728638087953540837964943308463564547516652471730419743

July 22, 2002

By Alexis Michon (euclide@nomade.fr),

(July 21, 2002),

p(10708)= 3^4 * 7 * 6353 * 142650478964387 *
82844213559961584431241591101 *
5966648005938404609620626582732579496764319178754316993618603

p(10731)= 3 * 5 * 11 * 4611571 *
188516040596724686963063878567 *
29526849180762612729348028412663143 *
79567651814017427025992301705858099667

p(10750)= 7^2 * 11 * 13 * 59 * 1373 * 3049 * 38791 *
90631 * 1468214854135882840186765090307 *
47640484862906005408918081502854534481030643302564613601781

p(10772)= 2^3 * 3 * 17 * 2557 * 4587447281 *
13160520279836893333574535131 *
8851017248314589518946731037039950534509865948344253417871865021293

(July 20, 2002),
10083 : 2^5 * 3 * 3983029468163 *
62436798058362643188997536938911389358338791 *
4346768931436325621699666714376883063322736943301

July 18, 2002

By Alexis Michon (euclide@nomade.fr), (July 16, 2002),

p(10078)= 2 * 7^3 * 1620241382561 *
65900577916246118773690537602680465558399 *
1329765363193462520210817330289774367113346839627247

p(10113)= 3^2 * 5 * 7^2 * 4398342880709 *
959198167223078418928086966040830593 *
16311242207202650087204931305632854802733602869417322259

p(10534)= 3^2 * 5^3 * 195658548089 *
103941212297143335879870604517 *
1294355059004428195147991331732173461935399816320414347830926473669

p(10572)= 277 * 118575451019017 *
327239307043626213271133709491 *
4411978737954340670909453214812074457416119681390269538003631481

p(10573)= 2 * 83 * 139677179 * 9567005443 *
46482028490722689480833579279 *
4656449949485333041748672888643777382056421740914786275585933

p(10611)= 2^5 * 71 * 151 * 192229042066349139860687779 *
3848988522092178563677370397471373 *
302625573639308746477254253153523815798673479

p(10619)= 5 * 11 * 283 * 13171 *
10271472057178481413583490033349 *
40269811444951679630445580368866365249479232090987842287173008994550011

p(10624)= 5^4 * 7^2 * 11^2 * 23 * 1220333 *
37565181217525722473688481747 *
23085864423537965016031186496825401512074288832973639762676877400411

p(10632)= 11 * 104098030817579597571280448651 *
86948415207417784072658362665914213809921686816327391461881272014831223603465577

p(10660)= 2 * 5^2 * 7 * 449 * 109133501 *
3694216714412733268396180814801 *
2219819051308855930582211232138854097704217546166970096010343813097

p(10662)= 2^2 * 19 * 23 * 41 * 10979 *
169151861318141001369282267009887 *
1083067378227193490054199956150511225603312530633273166578578208104277

p(10680)= 3^2 * 7^2 * 29 * 4664321 *
69630088211119304721464579047 *
43323619963602784100486678104876284777583442267140863103634403033245303

p(10696)= 3^2 * 5 * 7 * 233 * 1259 * 2857 *
677595109099141744627322610277 *
1224982345369448445707206044333162826077466796186176749469398835924519

p(10795)= 2^4 * 43 * 107 *
2459759775822071060383520980529 *
4081390449523823829001837629554904087678159930859051433585363218904330584619

July 01, 2002

Announcement.
From July 1 to 11, I will visit to China and Korea as business trips.
Last update will be on June 30, and Next update will be July 13.

By Alexis Michon (euclide@nomade.fr), (June 29, 2002),

He has run 1200 curves with B1=1000000 for all remaining number, see
http://euclide.euclide.free.fr/partition/part101.htm
http://euclide.euclide.free.fr/partition/part102.htm

p(10167)= 5 * 7 * 13 * 5741 * 24109 *
1859543694792089782171306554261413 *
2563892300270773154118109510273909944042404265578383125829568261

p(10255)= 2^3 * 3 * 7 * 3793 * 248891 * 410383 *
372809080279598567429157300575683 *
37484061595144493428966078107076260196587228399960888627073

p(10258)= 5^3 * 11 * 349 * 40288849397 *
44873238173572527102726804647 *
1088670638836018124152766481163442965097010134064695567294253803

p(10342)= 2^2 * 3 * 11 * 2148153607 *
31359024033256451124717402981299 *
162524647562914177910601859253381 *
1873968020214845878546107443538697

p(10444)= 2^2 * 3 * 5 * 151 * 406687157067809 *
79648760365026271841425092071149875551 *
32973357168653181599444621178371691181398465069403003

p(10506)= : 2 * 7 * 146146265998402157 *
335120543481364472373070273431809 *
30512045069951060301530262692751859350745567894925504370931

p(10510)= 2 * 23 * 51449 * 466697668301 *
690290731600190132776477291 *
111816268800907142851022369026877 *
257899601648893802406882764475751

p(10522)= 3 * 11^2 * 67 *
38336453024616382494376897274351 *
27368454422835426449242027443924663368533116057288304067372206779976333993

June 20, 2002

By Hisanori Mishima (June 17, 2002)

New factor of RSA challenge number R16763 :
419181464755718896986589563020844144799467712554746846239020739499916470162928530640113025771734993055603651909616916869600748048425726387 (c138)=
1737268684890488600694497053 (p28) *
241287642148538839467656382056897340350739110800051919487838604800063168362084986251050242636335436340492446479 (c111)

with GMP-ECM4c, B1=50000 (!)

June 16, 2002

By Reto Keiser (June 11, 2002),

p(10827)
132261016068756497356944674185862235831042103162519131422643733117904975790642379994014051= P33 * P57
P33 = 789930056874780297374344436829253
P57 = 167433831536964179540616516756632336184601140890135909767

p(10938)
18239255559375497566935257662189481548357945268760544286656240865672309897194677940949194245391= P43 * P52
P43 = 8532560275533114370296376187500573250435567
P52 = 2137606412424189862571376898003020080077250242447073


By Tom Hill (tomlyns@earthlink.net) using ecm/siqs program of Dario Alpern, (June 11, 2002)

p(11056): c109 = p26 * p84
p26 = 32961169075741926493709437
p84 = 106338898515613466187621775235776334067474944883909594354956594165655896557527941851

p(11097): c92 = p27 * p32 * p34
p27 = 140283723849242860311315809
p32 = 43000453990612344906230699021399
p34 = 3020422227897316579029239185052737

p(11392): c92 = p35 * p57
p35 = 62617980908535277567136044503848657
p57 = 699248918697320808667044917856083089798783828463565680767

p(11440): c108 = p25 * p83
p25 = 2142986283456582122164391
p83 = 51281521345019454888194846644552160712323036327846304824363399916964862836678288031

June 09, 2002

By Alexis Michon (euclide@nomade.fr), (June 08, 2002),

p(10040)= 2^2 * 13^2 * 59 * 1898549 *
638060084295080167684317529189757 *
1244752220207619581154575170813329776634115954725549236905182491

p(10117)= 3^2 * 43 * 199 * 26959 *
73608165760895214246406601665204069 *
1044434069034716018299567916398330991280722583017648936134207783

p(10125)= 3 * 19 * 109 * 601 *
5241455734352938166512287453542767619 *
9023972254317481213260691500960311642413956316951205160203489267

p(10248)= 3 * 112118896520143 *
758961125058386820765120907495346821 *
3262804422525558003673240494205759957361579008427323427711

p(10261)= 2551 * 44087 *
66148724746476615227206829728863771559 *
131833311172652386139002316843492080793727631700348829400359041

p(10370)= 2 * 3^2 * 5 * 1451 * 2081 *
692625020517046246134659932630928539 *
20421540202742533336306946930174129757419908069319359071203384063

p(10479)= 5 * 893326350513269 *
1607942432826332774154733825813 *
2082732018119030059074456266686695846224698865901907512493383821

May 23, 2002

By Tom Hill (tomlyns@earthlink.net) using ecm/siqs program of Dario Alpern, (May 21, 2002)

p(11307): c91 = p28 * p64
p28 = 1450518082103203950767081527
p64 = 2344235263688406162826050232616034835144159489801509113352029513

p(11344): c114 = p29 * p85
p29 = 11789070673235231596337907943
p85 = 9625557881952336942033317259343364138973894946729292102277563121907383227399281672681

p(11377): c107 = p27 * p35 * p46
p27 = 403989411591011472696354317
p35 = 15679948951812087013035078737253859
p46 = 7453929014616395449422022126905573319952185943

p(11396): c110 = p33 * p78
p33 = 122007216917881381616841070688953
p78 = 264771818388326354071870651325073749155171771191193395140903175235395977561467

May 19, 2002

By Alexis Michon (euclide@nomade.fr), (May 19, 2002),

p(10129)= 5 * 31 * 1663 * 37217 * 3609329 *
1861733588596309204046908329690052667 *
2881940767863683458888701686483762424467931784143093617

p(10209)= 5 * 29 * 149 * 387156133313 *
172362216428409830977790588033 *
1837097771848248813139170205871 *
192511429721375251510387997494447

p(10262)= 2^3 * 3^2 * 13063 * 335295374363 *
2843209461562770772459408885368407891 *
1107674566075027294759352463010236721064782777658214077

p(10265)= 8287361 * 89664890333 *
174008017033945464923968667461286282423 *
7975972606575299822882570020245979940095920712132861


By Reto Keiser (rkeiser@ee.ethz.ch), (May 17, 2002),

p(10699) : 136902997343820773770170906981855602585681033465176529581177281408767502932334707 = P38 * P43
P38 = 27035641053347329923829761017954189063
P43 = 5063796973546169145947483802908502691828789

May 06, 2002

By Alexis Michon (euclide@nomade.fr), (May 01, 2002),

p(10320)= 3^2 * 193 * 111153015438138190140019403615527 *
10649348731166052195429713511161200804985607972227626220286513099786075497

May 01, 2002

By Tom Hill (tomlyns@earthlink.net) using ecm/siqs program of Dario Alpern, (April 30, 2002)

p(11408): c105 = p25 * p28 * p54
p25 = 1152916503409957589431433
p28 = 1417962919272822854927256553
p54 = 168952394401085770164702913241826402328218179581697321

p(11460): c101 = p36 * p66
p36 = 306420337506730455053235502344745079
p66 = 119564874063293852876715820107234249734876978217194252036497280483

p(11482): c98 = p25 * p73
p25 = 6447508999608304813455251
p73 = 2104840067759875427896649102589952322083717037166028710073057618650810709

p(11496): c108 = p24 * p85
p24 = 652175459751935603616653
p85 = 1246490642770669371851789411471468743382722888787572810749904451066009846020445012903

April 25, 2002

By Tom Hill (tomlyns@earthlink.net) using ecm/siqs program of Dario Alpern, (April 23, 2002)

p(11387): c102 = p26 * p29 * p47
p26 = 85763263264457439584208473
p29 = 99550475911773650959734199513
p47 = 43134502865450255411158816262432857385292455113

p(11395): c103 = p23 * p30 * p50
p23 = 62598039821059624247111
p30 = 198881127427039782487068800359
p50 = 94199745972923842574629866425357337470581309502939

p(11410): c96 = p24 * p73
p24 = 107292562955748825016493
p73 = 2321478357148149797095570912593518539525943303607536229902698041906933497

p(11412): c113 = p26 * p88
p26 = 14156066578646678784602941
p88 = 1504106795896290293416953500783213285171635149582889739513022910735037870542801541316131

April 19, 2002

By Tom Hill (tomlyns@earthlink.net) using ecm/siqs program of Dario Alpern, (April 16, 2002)

p(11074): c107 = p25 * p32 * p51
p25 = 3425681850105733923735889
p32 = 54186078597427412631767950982513
p51 = 534658488540207346514022483783930908726482930134431

p(11194): c96 = p30 * p66
p30 = 829116607685378891978644440107
p66 = 136343528677781541463693636186633248698436882608894062962461434381

p(11201): c90 = p29 * p61
p29 = 38185798606413425241573021469
p61 = 2853573452428670747059843976327705248784560490796845925060097

p(11390): c110 = p27 * p84
p27 = 142120805611381612965601511
p84 = 287474121695878170934066564786181823527056097098950997764584524880005743126701349203

April 11, 2002

By Tom Hill (tomlyns@earthlink.net) using ecm program of Dario Alpern, (April 9, 2002)

p(11356): c114 = p27 * p87
p27 = 953810550987505392903113891
p87 = 114430955486044869745259307203060759626353004476199717705207795929975093308979150924071

p(11357): c93 = p30 * p64
p30 = 125832087590082647789876969389
p64 = 7663187832380878639468858756315313748633728276920626555746759209

p(11409): c96 = p26 * p71
p26 = 29252746965279062002342127
p71 = 26874070085293327410202392483318502297104702997074566529975502376826973

p(11430): c90 = p27 * p64
p27 = 246535238259703494647044007
p64 = 1222459548351329231737267814444521404102110544985465411879096447

April 06, 2002

By Alexis Michon (euclide@nomade.fr), (April 05, 2002),

p(10115)= 3 * 11 * 19 * 41 * 479 * 739 * 2139089377 *
719160433371168949664030422287120528923 *
11117276898974385578805393182481710657317692967159

p(10180)= 2 * 3 * 11411 * 1603731368660737 *
44090261122015650192291967838782247905639 *
73075497875512943807461473611059085087549310749

p(10201)= 31723 * 411013 * 482259199 *
20622874384698942275378152141858807 *
3555010999199664906277330393927675826672681118058686277

p(10307)= 2^3 * 6675078695652918489857141937703313 *
32714661141945024995686733634159809027395118783888702254127299552618908817

p(10319)= 2 * 3 * 5 * 7 * 71 * 107 * 1619 * 9689 *
206150207 * 49144876726076155881230734649 *
8008546832719899007812499633007235365556494747966095504973

p(10380)= 2 * 109 * 799865314604773819 *
845364563629284868760069783131 *
29547321956751353804428023707771265186285114218013855499229

p(10386)= 2^2 * 7^2 * 149 * 18860341 * 373041349 *
241617076316180952081776004841177802896313 *
94559834311699536547474849648443280872324847151

p(10396)= 2 * 3 * 593 * 1964617 * 11049761969 *
140310356672672406748857876290126945264951 *
490774582563208036157671436525211560081976320413

p(10495)= 2 * 7 * 8999 * 3406189 * 1189754941 *
83685723079472967192493301831057491 *
427119832578956522327763673808249489466945924861020291


By Tom Hill (tomlyns@earthlink.net) using ecm program of Dario Alpern, (April 2, 2002)

p(11124): c106 = p27 * p80
p27 = 208096999533014264815594381
p80 = 13265358903565154633556530197307840425493261097820829987347178730565795154171837

p(11232): c102 = p27 * p75
p27 = 486923293507059832713544253
p75 = 726877482962191589458207830678544238544830087280174611690848992878621190841

p(11271): c97 = p30 * p68
p30 = 183431090279670892167944326237
p68 = 36426962613366073806788990340927883681616689386201007356763878818323

p(11320): c110 = p23 * p87
p23 = 75983840702097096868753
p87 = 701017888931710518222958582412401832726242246393802939103205392316496857224991391648183

March 29, 2002

By Tom Hill (tomlyns@earthlink.net) using ecm/siqs program of Dario Alpern, (March 26, 2002)

p(11007): c111 = p30 * p82
p30 = 432129272109698526293937967231
p82 = 1511992327069903037446982064961949476967908958085949930104785839862744069525219881

p(11026): c108 = p27 * p82
p27 = 275699738904427902535221347
p82 = 2322236761272731066879342463126253203677645715403509241902743142212927358359545061

p(11141): c109 = p30 * p38 * p42
p30 = 125810230527150658877552084209
p38 = 38297427490118223993065340435689857661
p42 = 556463765637104202977008145371827189824461

p(18251): Correction for one of the RSA Challenge Numbers: The final "p94" shown in the factor list is composite.
R18251 (revised) =  7 * 23 * p33 * p50 * p62
p33 = 651966600340428593632996025625121
p50 = 23565662132249150390316565016523448200856980084787
p62 = 10040086117410728714373325028468511494222242135361853305165981


By Alexis Michon (euclide@nomade.fr), (March 24, 2002),

p(10138)= 2^5 * 7 * 12255472367210894537 *
2430998355229215634530808329571263337 *
31192188353030433830753268900268304134573032468019

p(10204)= 3 * 5 * 7 * 47 * 79 * 211 * 1135368694153 *
11624687326729954332571349766891271259888969 *
440962462319462887108471224017486886252249149

p(10233)= 797 * 2909 * 1536709032929537 *
81245355164026419796987749174667 *
2382810138994999045500503697737225277324819749543238373

p(10419)= 5 * 11 * 101 * 14695400452761009263 *
418513154056997351648649506809031 *
207421698090019176310020901806841907306963058776125639

p(10432)= 2^2 * 109 * 419 * 1319 * 1368099607787569 *
266305393276246029195673526901045199406873 *
94921140230127733766510071062291856936978621

March 21, 2002

By Tom Hill (tomlyns@earthlink.net) using ecm/siqs program of Dario Alpern, (March 19, 2002)

p(11096): c102 = p26 * p35 * p42
p26 = 48754109097337983952534547
p35 = 35263650161032438442409074946466909
p42 = 330374209192857210038483783483003728594849

p(11144): c90 = p26 * p64
p26 = 71072836201249656730468517
p64 = 6885732986214469291593232853281941734835691407035286607993886753

p(11150): c92 = p27 * p65
p27 = 411686622518461574676831259
p65 = 49719999831664613717901056365911229890660244391888071789561578827

p(11200), no known factors: c114 = p25 * p28 * p61
p25 = 9743578771477031391263489
p28 = 1981273673869494101235744289
p61 = 5227204031029143373068448699158441020956602547358529718963673

p(11217): c95 = p26 * p69
p26 = 26650716335396113328827259
p69 = 626496563889427481985321726036052828551176181839413467487823864706799

p(11253): c90 = p26 * p28 * p37
p26 = 33778341993163136680973939
p28 = 9672005231735225709204289781
p37 = 2783003129021793884661198280255929211

p(11255): c92 = p24 * p69
p24 = 161677892212185932585753
p69 = 606596549170466477745315460959506470279587950400390756103413980754221


By Alexis Michon (euclide@nomade.fr), (March 18, 2002),

p(10108)= 2^3 * 37337 *
12159277472323184724429086388659592041 *
39216837639748258569642017677058927023128831968498415480139939507

p(10316)= 2 * 3 * 7^2 * 269 * 43159 * 11230143463391 *
2265932042595668101862343530432631178667 *
22515147387165383550884715307729048872464495503

March 17, 2002

Now I came back from a long journey (March 5 to 16, Singapore, Toronto, Canada).


By Alexis Michon (euclide@nomade.fr), (March 06, 2002),

p(10143)= 3 * 64333127 *
861453684189486604800821053462663631 *
1333716959496320516501062092059745717716675670053227723888384453

p(10464)= 2 * 5 * 109 * 26410177799 *
100672552233992829722641878139 *
4282998532468323300906256480938709564496525788015249546092472345861

p(10483)= 3 * 816162887 * 1360577642297377297227356081 *
968202704916901665715702707673 *
4874093488809056414199473802935584710684961

and

http://euclide.euclide.free.fr/partition/part101.htm
http://euclide.euclide.free.fr/partition/part102.htm


By Tom Hill (tomlyns@earthlink.net) using ecm/siqs program of Dario Alpern, (March 5, 2002).

p(11062): c104 = p27 * p78
p27 = 165204858440600684582055493
p78 = 498327635521687297251407332424370347075751108382914724250123800953527282768101

p(11101): c101 = p28 * p31 * p43
p28 = 8581205462721389648244154351
p31 = 1739874522503611066244375615347
p43 = 6251304177871959207251807275548927115779751

p(11118): c90 = p30 * p61
p30 = 253378840796827440424916890871
p61 = 1539138938632193742650564913346818614683360942545106186737199

p(11145): c105 = p22 * p29 * p55
p22 = 5707668375129562553087
p29 = 29451929854088652164268611309
p55 = 5560144636883782498816638725645646278929890201402255031

March 01, 2002

By Alexis Michon (euclide@nomade.fr), (February 26, 2002),

p(10415)= 17 * 19 * 1009 * 17140361521802630201112522359 *
1206845981470314330705675702099642681093522742258879140884479946104543802201
p(10420)= 23 * 29 * 1741 * 12736936657 *
17139866872124225467796004169 *
28303941705457061262535897398348285151058647205636185388917369379
p(10438)= 743 * 17903 * 325735183054454174768272681945933
* 739791080581843322365195138997717 *
2801461331281942462470363301395086719


By Tom Hill (tomlyns@earthlink.net) using ECM-Java program of Dario Alpern, (February 26, 2002).

p(11023) = 2 * 3^2 * 7^2 * 17 * 2879 * p28 * p31 * p46
p28 = 9859352878962758763388076051
p31 = 8847190042940344387789831935323
p46 = 3160293804300033644622660088784785539727793971

p(11024) = 2^2 * 3 * 5^3 * 13 * 103 * 163 * p29 * p31 * p45
p29 = 21871341099988014350564176501
p31 = 1939684807830286932885611205733
p45 = 867241855058350949856904975788002524338060253

p(11090) = 2^2 * 3 * 443 * 206977651 * p26 * p33 * p43
p26 = 25135107103198905091536923
p33 = 227823874780156275910454975258503
p43 = 4250513135751751040522782657670875838554973

p(11105) = 3 * 11 * p27 * p85
p27 = 495496563112598399286846949
p85 = 1963365240535802585170226649115205734493733548709500210813107151443325603898930027361

February 23, 2002

By Alexis Michon (euclide@nomade.fr),

(February 22, 2002),
p(10346)= 2 * 7 * 11 * 443 * 11093 *
38132898852360129731624370721 *
98661774065327052170150021525257798419147039080290253704191271214490001
p(10393)= 7 * 36947 * 82939 * 780986933 *
25611336933949079779075633 *
11940750630435247434972564059641424384483531845084836746619589169
p(10409)= 2 * 5^2 * 82311013 * 8874092081 *
7490188883274114699575726356189 *
22867475094469381449383473116420715563902298523239632517899

(February 19, 2002),
p(10338)= 3 * 303452073298171413600246165061 *
2829623691191001928473697094157357305625700118969607010865077295870477631563743

February 19, 2002

By Alexis Michon (euclide@nomade.fr), (February 17, 2002),

p(10306)=11 * 79062992538637473615546299141 *
1460588485406923548288564593058017807 *
1358158473236824236154434501580288678866299

February 17, 2002

By Tom Hill (tomlyns@earthlink.net) (February 15, 2002).
All factors found using the Java implementation of ecm with APRT-CLE prime test, by Dario Alpern.

p(10016) = 3 * 11 * 29 * 1531381561328888741 * p41 * p45
p41 = 46996358308141247519401061497147298035703
p45 = 643647729610548919330932736510875242710062509

p(10017) = 103 * 168322978639 * p35 * p59
p35 = 59673646821002910035104487224084873
p59 = 43397706572626753922163481142613164928435871154645221007081

p(10033) = 2^4 * 11 * 19 * p35 * p69
p35 = 66119019561919332272766042456091613
p69 = 248860070923238601771991454524992262243907850553966611846058756782661

p(10085) = 2 * 7^2 * 17 * 37 * 333615474149 * p33 * p59
p33 = 111130481678538424355203008792809
p59 = 46573992760970668686795149283246250746882564141529747595509

p(10090) = 2^5 * 11 * 271 * p31 * p72
p31 = 1291443327321908876189723793421
p72 = 920506046745100006721390328727311069780929948545566568646723916037972129

p(10326) = 11131 * 34603 * p34 * p66
p34 = 9601236043946645847220243038437003
p66 = 599391275291823980204932980461130502934338731838666540968416352541

p(10476) = 2 * 31 * 49477 * 3817084651319 * p22 * p69
p22 = 7414650581755928281591
p69 = 165983788752623332489455008989652185388809137682868897451517486603663

p(10504) = 5 * 261791 * 813221 * 1370533 * p30 * p62
p30 = 369069450553979402647626094337
p62 = 37902749253104138738674415598230860178518378290239117811696389

February 10, 2002

By Alexis Michon (euclide@nomade.fr), (February 02, 2002),

p(10100) = 2^3 * 3 * 7 * 29 * 283 * 15619 * 1151471 *
24934769441337476385089427851 *
208169510257214512068321903897275675365679637798713478371445709

p(10105) = 2 * 86209 * 33990860061071428788070572209 *
216717283010392374266044371041 *
107963814493974785615514870594494356919707171

p(10106) = 7 * 29 * 71 * 225583 *
796546302663229366358134372417 *
53621968601596199476096400593992631143850993256885087687773989582737

p(10118) = 2 * 16001 * 2767534771613 *
2985387754310663704123931 * 3637510831085294318266391663 *
168071614107531321986431068358840622273

p(10130) = 239 * 1343755901 * 9861631155092627759015719 *
59404434937889905972412459384981508320536369057339368885633636073523723

p(10134) = 2 * 3 * 5 * 7^2 * 41 * 331 * 1663 *
27971923965565363469243261983 *
16716737838953668817300783689277 *
12757162612063742201445286078506965119

p(10146) = 3 * 79 * 193 * 347 * 2180798870843 *
80638923217580634942678067423 *
82512282565397533926571794178511422117674550917982531456241

p(10147) = 11 * 19 * 767337264694807 *
344179669652913790448111 *
4225550077463951763855466511769323199656615671697040462137699732927

p(10166) = 2 * 5 * 17 * 683 * 2837 * 300517781604017 *
74607627947956349654268435973 *
40143969985462822931292277283244943897465155472007342231

p(10173) = 2 * 331 * 409 * 1423 * 70481 *
161932720046807192026242298559 *
73650473269287889664041606236330757847247637016817757754318702539

p(10206) = 199 * 390088577 * 205658629097 *
2763236435418752461393224929 *
11129558251312279790461144799608439030649731181393251297527

p(10224) = 2 * 5^3 * 90756493447820159548060133 *
2603957525041551265601792797 *
10424231992272497301051163494626053463862104714679367

p(10256) = 2^3 * 1320265943 * 3676316408213 *
27656454552561315779815654637 *
857671492656610324484210553090098990598262446893768264779

p(10257) = 3^3 * 7 * 117050030142348330842793361 *
42160537416179123952576468398411554639694225871396387111287813132011650399841541

January 28, 2002

Announcement.
From January 29 to 31, I will visit to Taipei, Taiwan as a business trip.
Next update will be on February 1 or 2.


By Alexis Michon (euclide@nomade.fr),

(January 26, 2002),
#p(10155) = 7 * 13 * 540713 * 13355396614783957 *
62350642993676497351564842766800595161691 *
6297689975038947081380787782979886261371149

(January 25, 2002),
#p(10127) = 2 * 7^4 * 29 * 131 * 151 * 2081 * 4079 *
266539043 * 71929988481563118217505071 *
404059631710945711328605228100231169367603861729296079313

#p(10191) = 3 * 73643 * 282086359 * 338527026457 *
8301340968329152880220895639128592507 *
2320526914030395678755552372043107395083005953

#p(10388) = 3 * 7 * 349 * 6755334971769911908526839 *
2679619729488778611086356466201 *
36279855608959927791989444723395796032305534023063

#p(10398) = 13^2 * 157 * 421 * 761 * 52399448304720757 *
7671646627793022257930044479211 *
1595813408056876148491945314313509938434896000533779

January 23, 2002

By euclide@nomade.fr (January 20, 2002),

p(10082) = 2 * 7 * 11 * 1637 * 152357844682633 *
991802385171340339369166351 *
4585930780690027147123257407 *
586544324209980800817187596493727

p(10407) = 3^2 * 7^2 * 29 * 457 *
198437369491412245878782827 *
19058241002104180239680201825616397 *
276037141130579144670665463933659553114733

p(10449) = 2^2 * 5^3 * 7 * 13 * 557 * 2609 * 7321 *
7087431789373566467237717 *
3001732546361380195818132615416373716150834087432930646123187215077443

p(10486) = 2^6 * 3 * 13 * 383 * 75901657781 *
17898110158520465218488371 *
235879932154673696766582245669 *
53270191087953556769622865037661457783

By euclide@nomade.fr (January 19, 2002),

p(10269) = 3 * 5 * 11 * 157 * 27804878443 *
2711448175136252739280481 *
4929550933391719794283527043643 *
112641404388560697105775648948478088569

p(10356) = 13 * 3571 * 333836722156084910229415877 *
208201633984573646373837159971739810825447625354328124909598963314124465943561

p(10054) = 2 * 3 * 5 * 23 * 29 *
59756127149415581809462283461 *
60079961136314194659342353622956932292427777589893011536433389285236350489

p(10055) = 2 * 43 * 46670844454009 *
97003494523925889068318444887 *
186869968495937984039267109175185313921325061360815876341796459

p(10242) = 2 * 183389 * 29380721 * 36354134169859607543861 *
1971635659644260731871797116333371867872538392083041923747726319391665521

p(10254) = 5 * 17^2 * 448207 * 1523366608825602950513827 *
910363127439057941205028714792619077733163424348555488495776273112928411409


By euclide@nomade.fr (January 15, 2002),

p(10038) = 3 * 5 * 11^3 * 37 * 61 * 35232816947 *
25311057531996460580144825485837 *
1459064113140691008255549240797436026306626675485721894117

p(10116) = 3 * 13 * 17 * 97757662511 *
7519980076268373039419179 * 33449291901974359839406609 *
9667448038723243634695249406291749825031711

p(10121) = 3 * 5341241 * 12663569 * 95505749 *
235532796227393721851929 *
36783400366403479822357361746745736526154373459832968854683801

p(10124) = 3 * 5^3 * 3035565691000865949776539 *
9200734158825244906534020779 *
16650957950895874184208631972031603083960809793722643

January 14, 2002

Announcement.
From January 15 to 19, I will visit to Beijing, China as a business trip.
Next update will be on January 20.

By euclide@nomade.fr (January 13, 2002),

p(10011) = 2^3 * 3^2 * 11 * 263843 *
1345410054261668577566775173171 *
635758280063012174606364588992749 *
232742280177444501954750159747053929

p(10019) = 5 * 7 * 163 * 241 * 269 * 563 *
11666997027432884377096547 *
18957501585029218910619303846449501763298342486126656510673207164473519

January 10, 2002

By euclide@nomade.fr (January 09, 2002),

p(10001) = 7 * 47 * 3153783057104074183545720448060964239 *
35303223603435325973139571194984291656523715914744577210509767434573

p(10003) = 2 * 13 * 117844492284167992071641115239 *
12263424541877097730442783501156628476692224596959021563676096490477134683101

January 09, 2002

By euclide@nomade.fr
(January 07, 2002),
p(12888) = 31 * 239 * 397 * 1009 * 731369 * 185462339 *
25630543393861654602979 * 49944494436282790914712231151 *
63622730682863189695845719762916235087535375771

(January 06, 2002),
p(10044) : 2^5 * 5 * 11 * 109 * 1112689 * 45200144383 *
168508719341106991540906777799691103501 *
38918022711623996965212079442253648493433887447

January 01, 2002

Unofficially open of this page.
I'm now trying under 90 digits composites with PPSIQS.
So please notice for duplication.

index
E-mail : kc2h-msm@asahi-net.or.jp
Hisanori Mishima