  ***   Warning: new stack size = 32000000 (30.518 Mbytes).
1 (lfun(2+2*I)): 0.867351829635993064984331343735080128 - 0.2751272388078576
48618660643099638784*I
1 (lfun): 1.64493406684822643647241516664602519
1 (lfuncreate): 1.64493406684822643647241516664602519
1 (lfunderiv): 1.98928023429890102342085868742151638
1 (lfunlambda): 0.523598775598298873077107230546583814
1 (lfunderivlambda): 1.75054087517561195443134301219438671
1 (lfuncheckfeq): -125
1 (lfuncheckfeq(lfundual)): -125
1 (lfunhardy): -0.962008487244040578808410995533804668
1 (lfunorderzero): 0
1 (lfuntheta): 6.97468471241799127935745572277338608 E-6
1 (lfunan): [1, 1, 1, 1, 1, 1, 1, 1, 1, 1]
1 (lfuneuler): 1/(-x + 1)
1 (lfuneuler): 1/(-x + 1)
2 (lfun(2+2*I)): 1.12333141140778335615825044285504358 - 0.20572393424008957
9168986058576242213*I
2 (lfun): 1.12668244130002057515926549006290887
2 (lfuncreate): 1.12668244130002057515926549006290887
2 (lfunderiv): -0.0739665394770796291826438851506381467
2 (lfunlambda): 307.349474824750613782011597114857345
2 (lfunderivlambda): 2028.44361211531684713029044069301716
2 (lfuncheckfeq): -135
2 (lfuncheckfeq(lfundual)): -135
2 (lfunhardy): -32.0187142459059089067720240979799474
2 (lfunorderzero): 0
2 (lfuntheta): 0.644880443922533252020549213995002683
2 (lfunan): [1, 1, -1, 1, -1, -1, -1, 1, 1, -1]
2 (lfuneuler): error("domain error in lfuneuler: L Euler product unknown")
2 (lfuneuler): error("domain error in lfuneuler: L Euler product unknown")
3 (lfun(2+2*I)): 0.867351829635993064984331343735080128 - 0.2751272388078576
48618660643099638784*I
3 (lfun): 1.64493406684822643647241516664602519
3 (lfuncreate): 1.64493406684822643647241516664602519
3 (lfunderiv): 1.98928023429890102342085868742151638
3 (lfunlambda): 0.523598775598298873077107230546583814
3 (lfunderivlambda): 1.75054087517561195443134301219438671
3 (lfuncheckfeq): -125
3 (lfuncheckfeq(lfundual)): -125
3 (lfunhardy): -0.962008487244040578808410995533804668
3 (lfunorderzero): 0
3 (lfuntheta): 6.97468471241799127935745572277338608 E-6
3 (lfunan): [1, 1, 1, 1, 1, 1, 1, 1, 1, 1]
3 (lfuneuler): 1/(-x + 1)
3 (lfuneuler): 1/(-x + 1)
4 (lfun(2+2*I)): 0.867351829635993064984331343735080128 - 0.2751272388078576
48618660643099638784*I
4 (lfun): 1.64493406684822643647241516664602519
4 (lfuncreate): 1.64493406684822643647241516664602519
4 (lfunderiv): 1.98928023429890102342085868742151638
4 (lfunlambda): 0.523598775598298873077107230546583814
4 (lfunderivlambda): 1.75054087517561195443134301219438671
4 (lfuncheckfeq): -125
4 (lfuncheckfeq(lfundual)): -125
4 (lfunhardy): -0.962008487244040578808410995533804668
4 (lfunorderzero): 0
4 (lfuntheta): 6.97468471241799127935745572277338608 E-6
4 (lfunan): [1, 1, 1, 1, 1, 1, 1, 1, 1, 1]
4 (lfuneuler): 1/(-x + 1)
4 (lfuneuler): 1/(-x + 1)
5 (lfun(2+2*I)): 0.949916475911290720435819638338837398 + 0.0358510582342774
432932879184370842385*I
5 (lfun): 1.11000100602501539293722225605953854
5 (lfuncreate): 1.11000100602501539293722225605953854
5 (lfunderiv): 0.669852609442395829160609748322498753
5 (lfunlambda): 0.411691210167071362400798524486894766
5 (lfunderivlambda): 1.02176971928729966874801188387679870
5 (lfuncheckfeq): -125
5 (lfuncheckfeq(lfundual)): -126
5 (lfunhardy): -3.64660129563929901138519608143743026
5 (lfunorderzero): 0
5 (lfuntheta): 0.0157988317398153985319166069771851730
5 (lfunan): [1, 0, 0, 0, 1, 0, 1, 1, 0, 0]
5 (lfuneuler): 1/(-x^3 + 1)
5 (lfuneuler): 1/(x^3 - x^2 - x + 1)
6 (lfun(2+2*I)): 0.960469113962719412457341069363902769 - 0.1991333185305432
04973932590620634790*I
6 (lfun): 1.44015971587760808014950643651388461
6 (lfuncreate): 1.44015971587760808014950643651388461
6 (lfunderiv): 1.20790493328953415202167654530214252
6 (lfunlambda): 15.1394857852014167637577362197215928
6 (lfunderivlambda): 33.4405872605427381564001956871118088
6 (lfuncheckfeq): -125
6 (lfuncheckfeq(lfundual)): -126
6 (lfunhardy): -4.08829338502546324257338625990485586
6 (lfunorderzero): 0
6 (lfuntheta): 1.13757137255097719624384252004385603
6 (lfunan): [1, 1, 0, 1, 0, 0, 2, 1, 2, 0]
6 (lfuneuler): 1/(x^4 - 2*x^2 + 1)
6 (lfuneuler): 1/(-x^4 + 2*x^3 - 2*x + 1)
7 (lfun(2+2*I)): 0.887051722161133224804094699195349656 - 0.0999067808584280
739437653935028589538*I
7 (lfun): 1.21998708680570001482863205426357289
7 (lfuncreate): 1.21998708680570001482863205426357289
7 (lfunderiv): 0.762796284947312317636159697617761159
7 (lfunlambda): 5.55053411599446277532809280321518335
7 (lfunderivlambda): 16.4247273107012156001650889621709003
7 (lfuncheckfeq): -125
7 (lfuncheckfeq(lfundual)): -126
7 (lfunhardy): -33.3510919076492736298184197284568787
7 (lfunorderzero): 0
7 (lfuntheta): 0.361499663398646699814328423183576477
7 (lfunan): [1, 0, 1, 1, 0, 0, 0, 0, 1, 0]
7 (lfuneuler): 1/(-x + 1)
7 (lfuneuler): 1/(x^6 - 2*x^3 + 1)
8 (lfun(2+2*I)): 1.01014959689340434127328002008544181 + 0.00460950332602321
477016321962871214377*I
8 (lfun): 1.02520012413454187241405609393565270
8 (lfuncreate): 1.02520012413454187241405609393565270
8 (lfunderiv): 0.290243846659575984385442888269496413
8 (lfunlambda): 49.0489852899023616549347454114196815
8 (lfunderivlambda): 122.703161456545443829561585953784387
8 (lfuncheckfeq): -125
8 (lfuncheckfeq(lfundual)): -117
8 (lfunhardy): -416.099831965089837996809818950453792
8 (lfunorderzero): 0
8 (lfuntheta): 3.44087660704865850944777670515339473
8 (lfunan): [1, 0, 0, 0, 0, 0, 0, 0, 0, 0]
8 (lfuneuler): 1/(-x^5 + 1)
8 (lfuneuler): 1/(-x^5 + 1)
9 (lfun(2+2*I)): 0.949916475911290720435819638338837398 + 0.0358510582342774
432932879184370842385*I
9 (lfun): 1.11000100602501539293722225605953854
9 (lfuncreate): 1.11000100602501539293722225605953854
9 (lfunderiv): 0.669852609442395829160609748322498753
9 (lfunlambda): 0.411691210167071362400798524486894766
9 (lfunderivlambda): 1.02176971928729966874801188387679870
9 (lfuncheckfeq): -125
9 (lfuncheckfeq(lfundual)): -126
9 (lfunhardy): -3.64660129563929901138519608143743026
9 (lfunorderzero): 0
9 (lfuntheta): 0.0157988317398153985319166069771851730
9 (lfunan): [1, 0, 0, 0, 1, 0, 1, 1, 0, 0]
9 (lfuneuler): 1/(-x^3 + 1)
9 (lfuneuler): 1/(x^3 - x^2 - x + 1)
10 (lfun(2+2*I)): 0.960469113962719412457341069363902769 - 0.199133318530543
204973932590620634790*I
10 (lfun): 1.44015971587760808014950643651388461
10 (lfuncreate): 1.44015971587760808014950643651388461
10 (lfunderiv): 1.20790493328953415202167654530214252
10 (lfunlambda): 15.1394857852014167637577362197215928
10 (lfunderivlambda): 33.4405872605427381564001956871118088
10 (lfuncheckfeq): -125
10 (lfuncheckfeq(lfundual)): -126
10 (lfunhardy): -4.08829338502546324257338625990485586
10 (lfunorderzero): 0
10 (lfuntheta): 1.13757137255097719624384252004385603
10 (lfunan): [1, 1, 0, 1, 0, 0, 2, 1, 2, 0]
10 (lfuneuler): 1/(x^4 - 2*x^2 + 1)
10 (lfuneuler): 1/(-x^4 + 2*x^3 - 2*x + 1)
11 (lfun(2+2*I)): 1.01014959689340434127328002008544181 + 0.0046095033260232
1477016321962871214377*I
11 (lfun): 1.02520012413454187241405609393565270
11 (lfuncreate): 1.02520012413454187241405609393565270
11 (lfunderiv): 0.290243846659575984385442888269496413
11 (lfunlambda): 49.0489852899023616549347454114196815
11 (lfunderivlambda): 122.703161456545443829561585953784387
11 (lfuncheckfeq): -125
11 (lfuncheckfeq(lfundual)): -117
11 (lfunhardy): -416.099831965089837996809818950453792
11 (lfunorderzero): 0
11 (lfuntheta): 3.44087660704865850944777670515339473
11 (lfunan): [1, 0, 0, 0, 0, 0, 0, 0, 0, 0]
11 (lfuneuler): 1/(-x^5 + 1)
11 (lfuneuler): 1/(-x^5 + 1)
12 (lfun(2+2*I)): 1.12532189635570715506930528561542964 - 0.1981192712402207
95548871937824100842*I
12 (lfun): 1.12646149283743545826589288741282639
12 (lfuncreate): 1.12646149283743545826589288741282639
12 (lfunderiv): -0.106643303255744149171372286269629223
12 (lfunlambda): 6.09558510278361919521104233766987484
12 (lfunderivlambda): 3.74333087979076530805010837414125948
12 (lfuncheckfeq): -145
12 (lfuncheckfeq(lfundual)): -145
12 (lfunhardy): 7.72570574643479921846538924565267674
12 (lfunorderzero): 0
12 (lfuntheta): 1.05639763494267810934038480491026780
12 (lfunan): [1, 1, -1, 1, -1, -1, -1, 1, 1, -1]
12 (lfuneuler): 1/(x + 1)
12 (lfuneuler): 1/(x + 1)
13 (lfun(2+2*I)): 1.03662732820491359322708140897279358 + 0.0859804139482783
139638913686916326391*I
13 (lfun): 0.915965594177219015054603514932384111
13 (lfuncreate): 0.915965594177219015054603514932384111
13 (lfunderiv): -0.0744152124356782349684632354196243782
13 (lfunlambda): 0.583121808061637560276768912936789838
13 (lfunderivlambda): 0.114613612706050741461087882041868999
13 (lfuncheckfeq): -161
13 (lfuncheckfeq(lfundual)): -161
13 (lfunhardy): 1.11887810622860782830935076371956226
13 (lfunorderzero): 0
13 (lfuntheta): 0.0864278365243912084432316052103232828
13 (lfunan): [1, 0, -1, 0, 1, 0, -1, 0, 1, 0]
13 (lfuneuler): 1/(x + 1)
13 (lfuneuler): 1/(x + 1)
14 (lfun(2+2*I)): 1.12333141140778335615825044285504358 - 0.2057239342400895
79168986058576242213*I
14 (lfun): 1.12668244130002057515926549006290887
14 (lfuncreate): 1.12668244130002057515926549006290887
14 (lfunderiv): -0.0739665394770796291826438851506381467
14 (lfunlambda): 307.349474824750613782011597114857345
14 (lfunderivlambda): 2028.44361211531684713029044069301716
14 (lfuncheckfeq): -135
14 (lfuncheckfeq(lfundual)): -135
14 (lfunhardy): -32.0187142459059089067720240979799474
14 (lfunorderzero): 0
14 (lfuntheta): 0.644880443922533252020549213995002683
14 (lfunan): [1, 1, -1, 1, -1, -1, -1, 1, 1, -1]
14 (lfuneuler): 1/(x + 1)
14 (lfuneuler): 1/(x + 1)
15 (lfun(2+2*I)): 1.18993474354304186202727389259331023 + 0.1328493179839900
81581393445507787175*I
15 (lfun): 0.958716122716883155391936429331178526 + 0.1455658767850895904617
04511811986454*I
15 (lfuncreate): 0.958716122716883155391936429331178526 + 0.1455658767850895
90461704511811986454*I
15 (lfunderiv): -0.0591413218047954564398507937923812557 + 0.006118657582823
76156782087453731118700*I
15 (lfunlambda): 0.762922049761440418690870666154443650 + 0.1158376441792639
10717418476709550389*I
15 (lfunderivlambda): 0.199288892380239436881894010302036366 + 0.01413439818
96183761935888318063581707*I
15 (lfuncheckfeq): -149
15 (lfuncheckfeq(lfundual)): -150
15 (lfunhardy): 1.55917777033017611725882089543272526
15 (lfunorderzero): 0
15 (lfuntheta): 0.144901841935081749386909416583014010 + 0.00015402754051112
9979340854596822260595*I
15 (lfunan): [1, I, -I, -1, 0, 1, I, -I, -1, 0]
15 (lfuneuler): 1/(I*x + 1)
15 (lfuneuler): 1/(-I*x + 1)
16 (lfun(2+2*I)): 0.812604478837615264081041441696081495 + 0.514416651333746
378091008370108662656*I
16 (lfun): 0.546048036215013518334126660433444339
16 (lfuncreate): 0.546048036215013518334126660433444339
16 (lfunderiv): -0.0959573119238136060007138805040959715
16 (lfunlambda): 0.304294283451836098972454594957268991
16 (lfunderivlambda): 0.0952662577295564170986337258946811760
16 (lfuncheckfeq): -133
16 (lfuncheckfeq(lfundual)): -133
16 (lfunhardy): 0.976135045322300085894183747108898238
16 (lfunorderzero): 0
16 (lfuntheta): 0.0431719735280827499438273571824780835
16 (lfunan): [1, -2, -1, 2, 1, 2, -2, 0, -2, -2]
16 (lfuneuler): 1/(3*x^2 + x + 1)
16 (lfuneuler): 1/(7*x^2 + 2*x + 1)
17 (lfun(2+2*I)): 1.05441088967025847639700174582678268 - 0.0437965218308543
972243790110054896863*I
17 (lfun): 0.854150990582710704905318842265811791
17 (lfuncreate): 0.854150990582710704905318842265811791
17 (lfunderiv): -0.563680254369571457961650191778685453
17 (lfunlambda): 21.4628101650286568303423166010642305
17 (lfunderivlambda): 84.6860027256230673814304478704976471
17 (lfuncheckfeq): -133
17 (lfuncheckfeq(lfundual)): -133
17 (lfunhardy): 7.74311970300071112878317906422293686
17 (lfunorderzero): 1
17 (lfuntheta): 0.845217473227940738281482088078284970
17 (lfunan): [1, 0, 0, 0, -3, 0, 3, 0, -3, 0]
17 (lfuneuler): 1/(3*x^2 + 1)
17 (lfuneuler): 1/(7*x^2 - 3*x + 1)
18 (lfun(2+2*I)): 0.983123026966600972235271763464832152 - 0.142795067389383
410657238079666789672*I
18 (lfun): 0.827575260744555627007653592699965500
18 (lfuncreate): 0.827575260744555627007653592699965500
18 (lfunderiv): -0.875121181243473933259520819418902910
18 (lfunlambda): 378.670686852444160289127394423531793
18 (lfunderivlambda): 4720.96654358276176337631662799998913
18 (lfuncheckfeq): -146
18 (lfuncheckfeq(lfundual)): -146
18 (lfunhardy): -15.1496471038025101587073549412310555
18 (lfunorderzero): 2
18 (lfuntheta): -7.66887438046223655192193159814085172
18 (lfunan): [1, 0, 0, 0, 1, 0, -5, 0, -3, 0]
18 (lfuneuler): 1/(3*x^2 + 1)
18 (lfuneuler): 1/(7*x^2 + 5*x + 1)
19 (lfun(2+2*I)): 0.986272530104809525931751893853141579 + 0.380194362558928
269127554603798823940*I
19 (lfun): 0.661475187921069742727520633979626890
19 (lfuncreate): 0.661475187921069742727520633979626890
19 (lfunderiv): -0.143841395493176354263568656394993696
19 (lfunlambda): 0.502660867426504462749745133338672589
19 (lfunderivlambda): 0.194423310221159541633508034175323825
19 (lfuncheckfeq): -135
19 (lfuncheckfeq(lfundual)): -135
19 (lfunhardy): 1.40769352445571988754639305252078288
19 (lfunorderzero): 0
19 (lfuntheta): 0.0748042148252653877260316447816012193
19 (lfunan): [1, -1, -1, -1, 1, 1, 0, 3, 1, -1]
19 (lfuneuler): error("domain error in lfuneuler: L Euler product unknown")
19 (lfuneuler): error("domain error in lfuneuler: L Euler product unknown")
20 (lfun(2+2*I)): 0.942554443220049051278304920516580006 + 0.312677821809173
216264955458380123548*I
20 (lfun): 0.715646128860824975496114129546066520
20 (lfuncreate): 0.715646128860824975496114129546066520
20 (lfunderiv): -0.104078945840239040164684535929948910
20 (lfunlambda): 0.217530338535707305284341997050366540
20 (lfunderivlambda): 0.0892378811863639550977544016344157046
20 (lfuncheckfeq): -128
20 (lfuncheckfeq(lfundual)): -128
20 (lfunhardy): 0.918363811092074652593939091596159437
20 (lfunorderzero): 0
20 (lfuntheta): 0.0376306737026613074168498659517336581
20 (lfunan): [1, -1, -1, 1, 0, 1, 0, -1, 1, 0]
20 (lfuneuler): 1/(x + 1)
20 (lfuneuler): -1/(x^2 - 1)
21 (lfun(2+2*I)): 0.983156882878079938487282171360591884 + 0.353194962261196
002564857765328902644*I
21 (lfun): 0.674799694647841558297090873047044024
21 (lfuncreate): 0.674799694647841558297090873047044024
21 (lfunderiv): -0.144459052073310639849294659026575599
21 (lfunlambda): 0.786272293506885181814790577878794421
21 (lfunderivlambda): 0.439600775028143260430643207576823695
21 (lfuncheckfeq): -135
21 (lfuncheckfeq(lfundual)): -135
21 (lfunhardy): 3.79061239478881621189127455732904238
21 (lfunorderzero): 0
21 (lfuntheta): 0.134200875056831888281326006943741896
21 (lfunan): [1, -1, -1, 0, 0, 1, 0, 1, 0, 0]
21 (lfuneuler): 1/(x^2 + x + 1)
21 (lfuneuler): -1/(x^2 - 1)
22 (lfun(2+2*I)): 0.962982168489679880431392035586407118 - 0.234200959048951
882935348716027476470*I
22 (lfun): 1.43188245144643874656760459657418548
22 (lfuncreate): 1.43188245144643874656760459657418548
22 (lfunderiv): 1.14223041230261295333309858024639521
22 (lfunlambda): 1.17597438698744354816129454894324752
22 (lfunderivlambda): 2.40842648438108841366598888487879842
22 (lfuncheckfeq): -125
22 (lfuncheckfeq(lfundual)): -126
22 (lfunhardy): -7.51839897592411690553818137933108261
22 (lfunorderzero): 0
22 (lfuntheta): 0.0829263329333191552592027164591883916
22 (lfunan): [1, 1, 0, 1, 1, 0, 0, 1, 0, 1]
22 (lfuneuler): 1/(-x^4 + 1)
22 (lfuneuler): 1/(-x^4 + 1)
23 (lfun(2+2*I)): 1.05544984319374660163990598385147237 - 0.0278463853956589
702737996317036817484*I
23 (lfun): 0.933168362869390134471259026110368548
23 (lfuncreate): 0.933168362869390134471259026110368548
23 (lfunderiv): -0.201338426294825303502241188844208367
23 (lfunlambda): 22.1507381280721352570462243870431034
23 (lfunderivlambda): 67.8562437546532253473488720592101670
23 (lfuncheckfeq): -132
23 (lfuncheckfeq(lfundual)): -132
23 (lfunhardy): 34.2647536056616554131134077735811003
23 (lfunorderzero): 0
23 (lfuntheta): 1.46158125463504108062419125651124102
23 (lfunan): [1, 0, 0, 0, -1, 0, -1, 0, 0, 0]
23 (lfuneuler): 1/(-x^3 + 1)
23 (lfuneuler): 1/(x^3 + x^2 + x + 1)
24 (lfun(2+2*I)): 0.314725764042099582234904322115508057 - 0.231679648750520
683224464505823069849*I
24 (lfun): -0.500000000000000000000000000000000000
24 (lfuncreate): -0.500000000000000000000000000000000000
24 (lfunderiv): -2.00635645590858485121010002672996044
24 (lfunlambda): -1.00000000000000000000000000000000000*x^-1 + O(x^0)
24 (lfunderivlambda): -2.00000000000000000000000000000000000*x^-3 + O(x^0)
24 (lfuncheckfeq): -127
24 (lfuncheckfeq(lfundual)): -127
  *** lfunhardy: Warning: lfuninit: insufficient initialization.
24 (lfunhardy): -0.560030581473544907895266753611346294
  *** lfunorderzero: Warning: lfuninit: insufficient initialization.
24 (lfunorderzero): 0
24 (lfuntheta): 1.74367117810449781983936393069334652 E-6
24 (lfunan): [1, 4, 9, 16, 25, 36, 49, 64, 81, 100]
24 (lfuneuler): -1/(9*x - 1)
24 (lfuneuler): -1/(49*x - 1)
25 (lfun(2+2*I)): 4.50220519384937626303186082099696243 - 4.3298635928705556
4202429968242321878*I
25 (lfun): 9.86960440108935861883449099987615114*x^-1 + O(x^0)
25 (lfuncreate): 9.86960440108935861883449099987615114*x^-1 + O(x^0)
25 (lfunderiv): 19.7392088021787172376689819997523023*x^-3 + O(x^0)
25 (lfunlambda): 2*x^-1 + O(x^0)
25 (lfunderivlambda): 4.00000000000000000000000000000000000*x^-3 + O(x^0)
25 (lfuncheckfeq): -132
25 (lfuncheckfeq(lfundual)): -132
25 (lfunhardy): -2.54691134661967700629333850455933015
25 (lfunorderzero): 0
25 (lfuntheta): 0.0300468935207456941605384111157272271
25 (lfunan): [8, 24, 32, 24, 48, 96, 64, 24, 104, 144]
25 (lfuneuler): error("domain error in lfuneuler: L Euler product unknown")
25 (lfuneuler): error("domain error in lfuneuler: L Euler product unknown")
26 (lfun(2+2*I)): 1.05241064477041873318193519537236185 - 0.1608955747037985
03038741351081641405*I
26 (lfun): 2.01462456214967463058325687359239722*x^-1 + O(x^0)
26 (lfuncreate): 2.01462456214967463058325687359239722*x^-1 + O(x^0)
26 (lfunderiv): 4.02924912429934926116651374718479443*x^-3 + O(x^0)
26 (lfunlambda): 4.89897948556635619639456814941178278*x^-1 + O(x^0)
26 (lfunderivlambda): 9.79795897113271239278913629882356557*x^-3 + O(x^0)
26 (lfuncheckfeq): -133
26 (lfuncheckfeq(lfundual)): -134
26 (lfunhardy): -0.364668424109818965684669507657798407 + 1.3830788993347127
3245200290438392433*I
26 (lfunorderzero): 0
26 (lfuntheta): 0.824318881419642678102693112376337799
26 (lfunan): [2, 2, 6, 8, 8, 16, 16, 14, 22, 24]
26 (lfuneuler): error("domain error in lfuneuler: L Euler product unknown")
26 (lfuneuler): error("domain error in lfuneuler: L Euler product unknown")
27 (lfun(2+2*I)): 1.18804693262527074421402024152657566 + 0.0169467905017687
700998086956426426175*I
27 (lfun): 0.931057660663704589501110472460906969
27 (lfuncreate): 0.931057660663704589501110472460906969
27 (lfunderiv): -0.198753013038428814612884126426729362
27 (lfunlambda): 2.21689280911624649967055487226065461
27 (lfunderivlambda): 1.88357514427291640029859388228010041
27 (lfuncheckfeq): -127
27 (lfuncheckfeq(lfundual)): -127
27 (lfunhardy): 7.17395993078952418346611051537992346
27 (lfunorderzero): 0
27 (lfuntheta): 0.337407342909411940137856153550159686
27 (lfunan): [1, 0.618033988749894848204586834365638118, -1.6180339887498948
4820458683436563812, -0.618033988749894848204586834365638118, 0, -1, 0.61803
3988749894848204586834365638118, -1, 1.61803398874989484820458683436563812, 
0]
27 (lfuneuler): (x^2 + 1.61803398874989484820458683436563812*x + 1)/(x^4 + (
3.23606797749978969640917366873127624 + 0.E-38*I)*x^3 + (4.61803398874989484
820458683436563812 + 0.E-38*I)*x^2 + (3.23606797749978969640917366873127624 
+ 0.E-38*I)*x + 1)
27 (lfuneuler): (x^2 - 0.618033988749894848204586834365638118*x + 1)/(x^4 + 
(-1.23606797749978969640917366873127624 + 0.E-38*I)*x^3 + (2.381966011250105
15179541316563436188 + 0.E-38*I)*x^2 + (-1.236067977499789696409173668731276
24 + 0.E-38*I)*x + 1)
28 (lfun(2+2*I)): 1.18804693262527074421402024152657566 + 0.0169467905017687
700998086956426426175*I
28 (lfun): 0.931057660663704589501110472460906969
28 (lfuncreate): 0.931057660663704589501110472460906969
28 (lfunderiv): -0.198753013038428814612884126426729362
28 (lfunlambda): 2.21689280911624649967055487226065461
28 (lfunderivlambda): 1.88357514427291640029859388228010041
28 (lfuncheckfeq): -127
28 (lfuncheckfeq(lfundual)): -127
28 (lfunhardy): 7.17395993078952418346611051537992346
28 (lfunorderzero): 0
28 (lfuntheta): 0.337407342909411940137856153550159686
28 (lfunan): [1, 0.618033988749894848204586834365638118, -1.6180339887498948
4820458683436563812, -0.618033988749894848204586834365638118, 0, -1, 0.61803
3988749894848204586834365638118, -1, 1.61803398874989484820458683436563812, 
0]
28 (lfuneuler): 1/(x^2 + (-a^3 - a^2)*x + 1)
28 (lfuneuler): 1/(x^2 + (a^3 + a^2 + 1)*x + 1)
29 (lfun(2+2*I)): 1.97095478109473626151409334076430269 + 0.7212505424211209
88811935651764296371*I
29 (lfun): 1.34216766218391027978149727736401520
29 (lfuncreate): 1.34216766218391027978149727736401520
29 (lfunderiv): -0.289467129078272588184009850230335970
29 (lfunlambda): 2.51581529931044805567467206281524710
29 (lfunderivlambda): 2.15023979597284392004555238774529014
29 (lfuncheckfeq): -133
29 (lfuncheckfeq(lfundual)): -134
29 (lfunhardy): 2.88457710220275832832906417483001595 + 3.320248804244026470
40570818421869110*I
29 (lfunorderzero): 0
29 (lfuntheta): 0.434382085569470197082039266150814022
29 (lfunan): [2, -2, -2, 0, -2, 6, -2, 0, 4, 4]
29 (lfuneuler): error("domain error in lfuneuler: L Euler product unknown")
29 (lfuneuler): error("domain error in lfuneuler: L Euler product unknown")
30 (lfun(2+2*I)): 1.05215766525546270424075156084210888 + 0.1480552710648707
84313251753406970236*I
30 (lfun): 0.809751106609671408144793153947935896
30 (lfuncreate): 0.809751106609671408144793153947935896
30 (lfunderiv): -0.230553499342620968412594228080737767
30 (lfunlambda): 2.84508677060152583795233609110032793
30 (lfunderivlambda): 5.72042597506703362142231570977928228
30 (lfuncheckfeq): -138
30 (lfuncheckfeq(lfundual)): -138
30 (lfunhardy): 4.82759945264842489400079344115231836
30 (lfunorderzero): 0
30 (lfuntheta): 0.255529558843879352779494600248601708
30 (lfunan): [1, 0, -2, 0, 0, 0, 6, 0, -3, 0]
30 (lfuneuler): 1/(9*x^4 + 6*x^3 + 7*x^2 + 2*x + 1)
30 (lfuneuler): 1/(49*x^4 - 42*x^3 + 23*x^2 - 6*x + 1)
31 (lfun(2+2*I)): 0.892533520461485310267532602120606649 + 0.369759130949347
052877510442839011849*I
31 (lfun): 0.661750897709297254765646777699396229
31 (lfuncreate): 0.661750897709297254765646777699396229
31 (lfunderiv): -0.100198907838435439279351895772703391
31 (lfunlambda): 0.195570681343254990332946430943753302
31 (lfunderivlambda): 0.0749239012411173053088561775689436985
31 (lfuncheckfeq): -127
31 (lfuncheckfeq(lfundual)): -127
31 (lfunhardy): 0.864451108504179190697182277329149391
31 (lfunorderzero): 0
31 (lfuntheta): 0.0335249955311935737808002279532091786
31 (lfunan): [1.00000000000000000000000000000000000, -1.41421356237309504880
168872420969808, -0.577350269189625764509148780501957456, 1.0000000000000000
0000000000000000000, 0.447213595499957939281834733746255247, 0.8164965809277
26032732428024901963797, -0.755928946018454454429033072468360122, 0, -0.6666
66666666666666666666666666666667, -0.632455532033675866399778708886543707]
31 (lfuneuler): error("domain error in lfuneuler: L Euler product unknown")
31 (lfuneuler): error("domain error in lfuneuler: L Euler product unknown")
32 (lfun(2+2*I)): 0.716831782196234821238761071490633231 - 0.067015070703718
6429975753420765617769*I
32 (lfun): 0.927063680000812502070566529520225006 - 0.4636493814548368227024
67503091703650*I
32 (lfuncreate): 0.927063680000812502070566529520225006 - 0.4636493814548368
22702467503091703650*I
32 (lfunderiv): -0.143256874145152423514415023225143850 - 0.3961647536892626
60173591777551018604*I
32 (lfunlambda): 12.9155385383067700070237257032678171 - 6.45940681705575277
494114466734634465*I
32 (lfunderivlambda): 35.1193413454993176171736719370452213 - 7.613089348635
93293431041048800849801*I
32 (lfuncheckfeq): -135
32 (lfuncheckfeq(lfundual)): -135
32 (lfunhardy): -6.06894730215816312163990422182951797
32 (lfunorderzero): 0
32 (lfuntheta): 0.791380404145982157820251519960134007 - 0.69357279218782834
8143705402400363936*I
32 (lfunan): [1, -2*I, I, -2, 0, 2, -2*I, 0, 2, 0]
32 (lfuneuler): -1/(3*x^2 + I*x - 1)
32 (lfuneuler): -1/(7*x^2 - 2*I*x - 1)
33 (lfun(2+2*I)): 1.54401367148723047739869917809075892 - 0.3066196072551902
92880025893390189371*I
33 (lfun): 1.05759924459095784934751165232316747
33 (lfuncreate): 1.05759924459095784934751165232316747
33 (lfunderiv): -0.408747886435859247722794694061668411
33 (lfunlambda): 2.06360650643378826421061953416975612
33 (lfunderivlambda): 1.51184826781495430006436436989704103
33 (lfuncheckfeq): -126
33 (lfuncheckfeq(lfundual)): -126
33 (lfunhardy): 2.51411164942405476920599343563372085
33 (lfunorderzero): 0
33 (lfuntheta): 0.232890677512561985703253016507150509
33 (lfunan): [1, 2, -2, 0, -4, -4, -3, 0, 10, -8]
33 (lfuneuler): 1/(-27*x^3 - 6*x^2 + 2*x + 1)
33 (lfuneuler): 1/(-343*x^3 - 21*x^2 + 3*x + 1)
34 (lfun(2+2*I)): 0.303405850109043665303356963374313989 - 0.800773835388083
237102945790893273292*I
34 (lfun): 1.14023086836473321650196653022065102
34 (lfuncreate): 1.14023086836473321650196653022065102
34 (lfunderiv): -1.11674975027352774622605153706610075
34 (lfunlambda): 24.4732268476097591351989671678990237
34 (lfunderivlambda): 30.7386834367153126705397075456521323
34 (lfuncheckfeq): -137
34 (lfuncheckfeq(lfundual)): -137
34 (lfunhardy): 2.78976423040565601454207435285880273
34 (lfunorderzero): 0
34 (lfuntheta): 1.77200139530428063034309080843969445
34 (lfunan): [1, 0, 5, 0, -9, 0, 20, 0, -5, 0]
34 (lfuneuler): 1/(729*x^4 - 135*x^3 + 30*x^2 - 5*x + 1)
34 (lfuneuler): 1/(117649*x^4 - 6860*x^3 + 210*x^2 - 20*x + 1)
35 (lfun(2+2*I)): 0.916730350303318103087486334081602257 + 0.080000921063523
1270096399584387902400*I
35 (lfun): 0.799218743638286290089171295296216843 - 0.1018472971194699401517
35406675991017*I
35 (lfuncreate): 0.799218743638286290089171295296216843 - 0.1018472971194699
40151735406675991017*I
35 (lfunderiv): -0.142644286962673512538005313505213032 + 0.0239818528768680
814484997672610144396*I
35 (lfunlambda): 1.78079459126418558682748985336301658 - 0.22693301087957631
7134137455805333488*I
35 (lfunderivlambda): 0.520810035426246155331958340245976692 - 0.02937583896
18095965013489026034308737*I
35 (lfuncheckfeq): -128
35 (lfuncheckfeq(lfundual)): -127
35 (lfunhardy): 3.39451744115290048505005314356062885
35 (lfunorderzero): 0
35 (lfuntheta): 0.331428687131746195426755630905940924 - 0.00131804792398201
159878026645787272537*I
35 (lfunan): [1, -1/2 - 0.866025403784438646763723170752936183*I, -1/2 + 0.8
66025403784438646763723170752936183*I, -1/2 + 0.8660254037844386467637231707
52936183*I, -1/2 - 0.866025403784438646763723170752936183*I, 1, 0, 1, -1/2 -
 0.866025403784438646763723170752936183*I, -1/2 + 0.866025403784438646763723
170752936183*I]
35 (lfuneuler): error("domain error in lfuneuler: L Euler product unknown")
35 (lfuneuler): error("domain error in lfuneuler: L Euler product unknown")
36 (lfun(2+2*I)): [1.18804693262527074421402024152657566 + 0.016946790501768
7700998086956426426175*I, 0.858815082305618950606114011932380802 + 0.2713868
68570736704398072891146763810*I]
36 (lfun): [0.931057660663704589501110472460906969, 0.7013814207493952044164
48062960213334]
36 (lfuncreate): [0.931057660663704589501110472460906969, 0.7013814207493952
04416448062960213334]
36 (lfunderiv): [-0.198753013038428814612884126426729362, -0.109593360553515
446882197953836578605]
36 (lfunlambda): [2.21689280911624649967055487226065461, 1.67002269977422131
348428067946990593]
36 (lfunderivlambda): [1.88357514427291640029859388228010041, 1.681303352669
11476544927983377647771]
36 (lfuncheckfeq): -127
36 (lfuncheckfeq(lfundual)): -127
36 (lfunhardy): [7.17395993078952418346611051537992346, 3.623083436410096146
49157084927233504]
36 (lfunorderzero): 0
36 (lfuntheta): [0.337407342909411940137856153550159686, 0.24422397199610032
0515432582659385598]
36 (lfunan): [[1, 1], [0.618033988749894848204586834365638118 + 0.E-38*I, -1
.61803398874989484820458683436563812 + 0.E-38*I], [-1.6180339887498948482045
8683436563812 + 0.E-38*I, 0.618033988749894848204586834365638118 + 0.E-38*I]
, [-0.618033988749894848204586834365638118 + 0.E-38*I, 1.6180339887498948482
0458683436563812 + 0.E-38*I], [0, 0], [-1.0000000000000000000000000000000000
0 + 0.E-38*I, -1.00000000000000000000000000000000000 + 0.E-38*I], [0.6180339
88749894848204586834365638118 + 0.E-38*I, -1.6180339887498948482045868343656
3812 + 0.E-38*I], [-1.00000000000000000000000000000000000 + 0.E-38*I, -1.000
00000000000000000000000000000000 + 0.E-38*I], [1.618033988749894848204586834
36563812 + 0.E-38*I, -0.618033988749894848204586834365638118 + 0.E-38*I], [0
, 0]]
36 (lfuneuler): error("domain error in lfuneuler: L Euler product unknown")
36 (lfuneuler): error("domain error in lfuneuler: L Euler product unknown")
37 (lfun(2+2*I)): [1.34832050269383270105539305256058035 + 0.207876261877455
649951134053600745676*I, 0.933816175747323073621884899011650668 - 0.27699630
6235557539430032763400061965*I]
37 (lfun): [0.809970291234109778603393108722237662 + 0.274868381256949337697
808122344748406*I, 1.22609858506160642391001983506463949 - 0.097943275553695
0139409741113095949733*I]
37 (lfuncreate): [0.809970291234109778603393108722237662 + 0.274868381256949
337697808122344748406*I, 1.22609858506160642391001983506463949 - 0.097943275
5536950139409741113095949733*I]
37 (lfunderiv): [-0.151725351265238354012778234115126335 + 0.121278626383396
639830241868278505889*I, 0.0860039446936686061214916577333550524 - 0.0329727
397312519111641605043367341386*I]
37 (lfunlambda): [1.41801853168239696679659210810911885 + 0.4812132773438227
86213432506969817576*I, 2.14653615583586699350404921918811073 - 0.1714697209
16803689341181529635105309*I]
37 (lfunderivlambda): [1.04409022907556005671891067171186296 + 0.09023102195
18981718710179327549961148*I, 1.19880071012498724644182489498516045 - 0.0368
918047255747193704447063223973550*I]
37 (lfuncheckfeq): -125
37 (lfuncheckfeq(lfundual)): -126
37 (lfunhardy): [3.15670832622568771988604638363873313, 1.747310103751590027
90095927917174677]
37 (lfunorderzero): 0
37 (lfuntheta): [0.376968591177380458225059441997225895 + 0.0238441032386768
986906444291026655063*I, 0.405052050048118311474278559671515764 - 0.01457362
59061798298691418574839721961*I]
37 (lfunan): [[1, 1], [-0.309016994374947424102293417182819059 + 0.951056516
295153572116439333379382143*I, 0.809016994374947424102293417182819059 - 0.58
7785252292473129168705954639072769*I], [-0.809016994374947424102293417182819
059 + 0.587785252292473129168705954639072769*I, 0.30901699437494742410229341
7182819059 + 0.951056516295153572116439333379382143*I], [-0.8090169943749474
24102293417182819059 - 0.587785252292473129168705954639072769*I, 0.309016994
374947424102293417182819059 - 0.951056516295153572116439333379382143*I], [0.
309016994374947424102293417182819059 + 0.95105651629515357211643933337938214
3*I, -0.809016994374947424102293417182819059 - 0.587785252292473129168705954
639072769*I], [-0.309016994374947424102293417182819059 - 0.95105651629515357
2116439333379382143*I, 0.809016994374947424102293417182819059 + 0.5877852522
92473129168705954639072769*I], [0.809016994374947424102293417182819059 + 0.5
87785252292473129168705954639072769*I, -0.3090169943749474241022934171828190
59 + 0.951056516295153572116439333379382143*I], [0.8090169943749474241022934
17182819059 - 0.587785252292473129168705954639072769*I, -0.30901699437494742
4102293417182819059 - 0.951056516295153572116439333379382143*I], [0.30901699
4374947424102293417182819059 - 0.951056516295153572116439333379382143*I, -0.
809016994374947424102293417182819059 + 0.58778525229247312916870595463907276
9*I], [-1.00000000000000000000000000000000000 + 0.E-38*I, -1.000000000000000
00000000000000000000 + 0.E-38*I]]
37 (lfuneuler): 1/([0.809016994374947424102293417182819059 - 0.5877852522924
73129168705954639072769*I, -0.309016994374947424102293417182819059 - 0.95105
6516295153572116439333379382143*I]*x + 1)
37 (lfuneuler): 1/([-0.809016994374947424102293417182819059 - 0.587785252292
473129168705954639072769*I, 0.309016994374947424102293417182819059 - 0.95105
6516295153572116439333379382143*I]*x + 1)
38 (lfun(2+2*I)): 0.725489894813037832162274170792454244 - 0.230820567349391
064333654403353070547*I
38 (lfun): 0.785398163397448309615660845819875721*x^-1 + O(x^0)
38 (lfuncreate): 0.785398163397448309615660845819875721*x^-1 + O(x^0)
38 (lfunderiv): 1.57079632679489661923132169163975144*x^-3 + O(x^0)
38 (lfunlambda): 1.00000000000000000000000000000000000*x^-1 + O(x^0)
38 (lfunderivlambda): 2.00000000000000000000000000000000000*x^-3 + O(x^0)
38 (lfuncheckfeq): -126
38 (lfuncheckfeq(lfundual)): -126
38 (lfunhardy): -0.970151315570594793182470517189156371
38 (lfunorderzero): 0
38 (lfuntheta): 0.00374186017254235308169191833938384906
38 (lfunan): [1, 2, 0, 4, 10, 0, 0, 8, 9, 20]
38 (lfuneuler): -1/(9*x^2 - 1)
38 (lfuneuler): -1/(49*x^2 - 1)
39 (lfun(2+2*I)): 0.969884912304406412386573423640615706 - 0.164391551765859
140234467892395315007*I
39 (lfun): 1.27256455841637073641435038298551047
39 (lfuncreate): 1.27256455841637073641435038298551047
39 (lfunderiv): 0.447141087190784579702256562219019062
39 (lfunlambda): 0.136759133221372121585038561415947144
39 (lfunderivlambda): 0.170136363411355997746638367056411693
39 (lfuncheckfeq): -125
39 (lfuncheckfeq(lfundual)): -125
39 (lfunhardy): -1.24231704732035088396643971851259267
39 (lfunorderzero): 0
39 (lfuntheta): 0.00374186017254235308169191833938384906
39 (lfunan): [1, 0.707106781186547524400844362104849039, 0, 0.50000000000000
0000000000000000000000, 0.894427190999915878563669467492510494, 0, 0, 0.3535
53390593273762200422181052424520, 0.333333333333333333333333333333333333, 0.
632455532033675866399778708886543707]
39 (lfuneuler): -1/(0.333333333333333333333333333333333333*x^2 - 1)
39 (lfuneuler): -1/(0.142857142857142857142857142857142857*x^2 - 1)
40 (lfun(2+2*I)): 0.620847243123242295812028241845979768 - 0.365805033975834
317719684857084415038*I
40 (lfun): 1.18336177677891977912152512046892098*x^-1 + O(x^0)
40 (lfuncreate): 1.18336177677891977912152512046892098*x^-1 + O(x^0)
40 (lfunderiv): 2.36672355355783955824305024093784196*x^-3 - 0.4188957893279
36286661350187945149060 + O(x)
40 (lfunlambda): 0.305321864725739671684867838310794704*x^-1 - 0.64177482324
8850026374436209391618772 + O(x)
40 (lfunderivlambda): 0.610643729451479343369735676621589407*x^-3 - 3.074744
34600977474530204293108686963 + O(x)
40 (lfuncheckfeq): -124
40 (lfuncheckfeq(lfundual)): -124
40 (lfunhardy): 0.924063648607020890354673611620642808
40 (lfunorderzero): 0
40 (lfuntheta): 0.000715683516278074649423960686323379227
40 (lfunan): [1, 3, 0, 7, 12, 0, 0, 15, 10, 36]
40 (lfuneuler): 1/(9*x^4 - 10*x^2 + 1)
40 (lfuneuler): 1/(49*x^4 - 50*x^2 + 1)
41 (lfun(2+2*I)): 0.947476363904759011895872697580416691 - 0.937145822198315
234814555289003751548*I
41 (lfun): 1.56524441379265684860349952571396221
41 (lfuncreate): 1.56524441379265684860349952571396221
41 (lfunderiv): -0.0974822416674753490684194328018108908
41 (lfunlambda): 1.98240520868786396417643970464304061
41 (lfunderivlambda): 1.08018240929281875388539242602951370
41 (lfuncheckfeq): -136
41 (lfuncheckfeq(lfundual)): -136
41 (lfunhardy): 0.584670414132644129762485183849883879
41 (lfunorderzero): 0
41 (lfuntheta): 0.181970361533588665307802750449858661
41 (lfunan): [1, 1, 7, -7, 0, 7, 6, -15, 22, 0]
41 (lfuneuler): 1/(27*x^2 - 7*x + 1)
41 (lfuneuler): 1/(343*x^2 - 6*x + 1)
42 (lfun(2+2*I)): 0.688796624095670797678023602799082159 - 0.298757462204177
557256046622289626725*I
42 (lfun): 1.18318926859330917506683903887866332 - 0.38252792464848934659370
2399747808619*I
42 (lfuncreate): 1.18318926859330917506683903887866332 - 0.38252792464848934
6593702399747808619*I
42 (lfunderiv): -0.118329715605221747397085260355516201 - 0.0919652026746179
455278413210043897764*I
42 (lfunlambda): 4.61546228092126059525204769648824689 - 1.49219001091282947
415105294611888620*I
42 (lfunderivlambda): 4.90100616091992349220087455477620192 - 0.720094486207
843870455149704475144848*I
42 (lfuncheckfeq): -127
42 (lfuncheckfeq(lfundual)): -127
42 (lfunhardy): 2.17694800910455842894576460335817262
42 (lfunorderzero): 0
42 (lfuntheta): 0.593734546170982628749761158168210536 - 0.17011441672449623
9840795353091106978*I
42 (lfunan): [1, 1.03957970587853882155090730295295895 - 1.43085871205996099
826797658241904256*I, 0, -0.348596700253486245653200720135778009 - 1.0728703
2548377110294699280762148618*I, 0, 0, -2.51625902488442472836131592547899775
 + 0.817582118008756363016428134480589156*I, 1.46663068900338109385778755450
141613 + 0.476537197956836693591651688282474718*I, -2.4270509831248422723068
8025154845718 - 1.76335575687741938750611786391721831*I, 0]
42 (lfuneuler): 1/((2.42705098312484227230688025154845718 + 1.76335575687741
938750611786391721831*I)*x^2 + 1)
42 (lfuneuler): 1/((2.51625902488442472836131592547899775 - 0.81758211800875
6363016428134480589156*I)*x + 1)
43 (lfun(2+2*I)): 0.950842141038857147019313517864687157 - 0.023775765925741
7614418889362270233083*I
43 (lfun): 1.08100935077967627123631266500166221
43 (lfuncreate): 1.08100935077967627123631266500166221
43 (lfunderiv): 0.383532859067516452595974615402567726
43 (lfunlambda): 911.287408029371706721339813363300659
43 (lfunderivlambda): 4588.00070538359061716794387044059306
43 (lfuncheckfeq): -125
43 (lfuncheckfeq(lfundual)): -123
43 (lfunhardy): -321.162572791313788196329570908841935
43 (lfunorderzero): 0
43 (lfuntheta): 43.5317192042439188629460340100838749
43 (lfunan): [1, 0, 0, 1, 0, 0, 0, 0, 0, 0]
43 (lfuneuler): 1/(x^6 - 2*x^3 + 1)
43 (lfuneuler): 1/(x^6 - 2*x^3 + 1)
44 (lfun(2+2*I)): 0.867351829635993064984331343735080128 - 0.275127238807857
648618660643099638784*I
44 (lfun): 1.64493406684822643647241516664602519
44 (lfuncreate): 1.64493406684822643647241516664602519
error("sorry, domain = [] for derivatives in lfuninit is not yet implemented
.")
44 (lfunlambda): 0.523598775598298873077107230546583814
error("sorry, domain = [] for derivatives in lfuninit is not yet implemented
.")
44 (lfuncheckfeq): -125
44 (lfuncheckfeq(lfundual)): -125
44 (lfunhardy): -0.962008487244040578808410995533804668
44 (lfunorderzero): 0
44 (lfuntheta): 6.97468471241799127935745572277338608 E-6
44 (lfunan): [1, 1, 1, 1, 1, 1, 1, 1, 1, 1]
44 (lfuneuler): 1/(-x + 1)
44 (lfuneuler): 1/(-x + 1)
45 (lfun(2+2*I)): 0.922776163650349305999729933896297615 - 0.210629145130885
436777484004430146615*I
45 (lfun): 1.50670300992298503088656504818207140
45 (lfuncreate): 1.50670300992298503088656504818207140
45 (lfunderiv): 1.54673238030356925747170841068625513
45 (lfunlambda): 0.305321864725739671684867838310794704
45 (lfunderivlambda): 1.54673238030356925747170841068625513
45 (lfuncheckfeq): -125
45 (lfuncheckfeq(lfundual)): -125
45 (lfunhardy): -1.07637023438345995368832251445133622
45 (lfunorderzero): 0
45 (lfuntheta): 0.00374186017254235308169191833938384906
45 (lfunan): [1, 1, 0, 1, 2, 0, 0, 1, 1, 2]
45 (lfuneuler): 1/(-x^2 + 1)
45 (lfuneuler): 1/(-x^2 + 1)
Total time spent: 9317
