-127
-127
-127
1
1
x - 2*x^2 + 8*x^3 - 52*x^4 + O(x^5)
-1 + 2.3316439815971242033635360621684008764*x - 1.8121878856393634902401916
475684416652*x^2 + 1.9366311144923597553632774576683830638*x^3 - 2.353551201
8816145168215435615164839701*x^4 + 3.0668589010506319128931489227040074985*x
^5 - 4.1753356002581771388549841774603735734*x^6 + 5.85802372987477414881505
38461186213042*x^7 - 8.4010322175239773709841616885138862869*x^8 + O(x^10)
   realprecision = 115 significant digits
-376
-5.3402596700949534941383668225555610985116172433805954782315993056895856593
63371478458597643249567847856769658260138 - 20.16142319411729957052660761663
9900799892307588217464341143516460929255818314114185848396736787490164559224
53507938*I
-4.9880136260605828005616558438145653171651930088796221871134876787550777308
24303513524813324318790229759607448463585 - 13.79009856365686552397559158400
6611900218963961468842433717889077888873574776280275593805359695000142386074
92412155*I
-4.4490981787008898640867157232460451274645883248560292243219377121537983732
39181560278546205925643712909055768051551 - 7.307060789217608631014416845535
8639797400912986829032801724659855526522573777510811321213152295822684446665
25409901*I
-3.5771520639572972184093919635119948804017962577930759236835277557916872363
50575462861463655620846808017732465627597
-0.1118325591589629648335694568202658422726453622912658633296897727621943319
600088273854870109175450158342884320482618
-4.4490981787008898640867157232460451274645883248560292243219377121537983732
39181560278546205925643712909055768051551 + 7.307060789217608631014416845535
8639797400912986829032801724659855526522573777510811321213152295822684446665
25409901*I
-4.9880136260605828005616558438145653171651930088796221871134876787550777308
24303513524813324318790229759607448463585 + 13.79009856365686552397559158400
6611900218963961468842433717889077888873574776280275593805359695000142386074
92412155*I
-5.3402596700949534941383668225555610985116172433805954782315993056895856593
63371478458597643249567847856769658260138 + 20.16142319411729957052660761663
9900799892307588217464341143516460929255818314114185848396736787490164559224
53507938*I
-5.6014109903427322096167650220733623490356358844594914803619168843779914275
42038373624026462955940523347054962339599 + 26.49519305147605343386793972471
1257766439571616373780373344156828463901168909519710293826814383985153180447
87219294*I
1
1
-1.0000000000000000000000000000000000000000000000000000000000000000000000000
00000000000000000000000000100000000000000 E-100
-235.72115887568531366046060613052381904089474941552282678480126614915620456
73087957949162547505515081005140328081624
-127
   realprecision = 38 significant digits
2294.8466716835068696527927859936167900
[80756, 143546, 206207, 268880, 331575, 394291, 457025, 519772, 582530, 6452
97]
[645297, 1273229, 1901362, 2529568, 3157809, 3786071, 4414346, 5042630, 5670
920, 6299215]
-124
-125
-124
-0.11183255915896296483356945682026584227 + 1.259138243719728965715054006070
5240031*x - 1.6852428384809363610210659367818340853*x^2 + 3.4291673226261904
583853755123230321787*x^3 - 8.3124278935896423816322275264661558589*x^4 + 22
.192041045064393615638086769981588715*x^5 - 62.98871981557945627008906176672
5915063*x^6 + 186.51177668554172322377457555088051806*x^7 - 569.652409554563
39671619044006869748162*x^8 + 1781.5472885816549140607351235777129833*x^9 - 
5676.7252711861651241033436836863691051*x^10 + 18363.79942204727076369120249
6303983962*x^11 - 60151.619699528575339208972954882737287*x^12 + 199105.5264
9949197207531959345366339638*x^13 - 664959.24537741790849323213330675990009*
x^14 + 2237932.4714533367844314248148604297082*x^15 + O(x^16)
-3.5771520639572972184093919635119948804 - 13.880252213229780748699361486619
519025*x - 58.951959272161933194695044664902424002*x^2 + O(x^3)
(-0.31813150520476413531265425158766451720 + 1.33723570143068940890116214319
37106125*I) + (-0.69737020568869652814336849691964576475 - 0.593497673464482
61340594535025574132226*I)*x + (-0.33297334840180772560161645925109511009 - 
0.49935253218764022307275247549263486578*I)*x^2 + (-0.2168636246943983568828
3040756615878561 - 0.49469441527649194153909613354792024339*I)*x^3 + (-0.160
20988127571126017705750236841905251 - 0.532578770626109204090740710366128680
73*I)*x^4 + (-0.12677288710193265638699448893876408203 - 0.60627151593817740
035089226627833359509*I)*x^5 + (-0.10475327844045706942259679324196057640 - 
0.72014724453603639046705025073100163687*I)*x^6 + (-0.0891764685999430439009
80705138917501307 - 0.88540404532387013537890293079186615007*I)*x^7 + (-0.07
7586192554111070194946545325347354324 - 1.1203123602733012827902280837251262
279*I)*x^8 + (-0.068631600653858547181071490834145680710 - 1.452342481900855
3333227724598860306772*I)*x^9 + (-0.061508999455518349081010553357784107267 
- 1.9219122678369782834401795177329475913*I)*x^10 + (-0.05571062741146945249
8696189575810912902 - 2.5881755204709353605112547694582420543*I)*x^11 + (-0.
050900098566873235057129781731068364461 - 3.53771093391828492695126969994227
46099*I)*x^12 + (-0.046845820129709063433619277861998722536 - 4.897479321691
1263872928749155211431733*I)*x^13 + (-0.043383187504440321433413244752801483
734 - 6.8541325989233120421465180303974100232*I)*x^14 + (-0.0403920297091715
56525032384691785928830 - 9.6828191677170351499970157871737049292*I)*x^15 + 
O(x^16)
(-0.31813150520476413531265425158766451720 - 1.33723570143068940890116214319
37106125*I) + (-0.69737020568869652814336849691964576475 + 0.593497673464482
61340594535025574132226*I)*x + (-0.33297334840180772560161645925109511009 + 
0.49935253218764022307275247549263486578*I)*x^2 + (-0.2168636246943983568828
3040756615878561 + 0.49469441527649194153909613354792024339*I)*x^3 + (-0.160
20988127571126017705750236841905251 + 0.532578770626109204090740710366128680
73*I)*x^4 + (-0.12677288710193265638699448893876408203 + 0.60627151593817740
035089226627833359509*I)*x^5 + (-0.10475327844045706942259679324196057640 + 
0.72014724453603639046705025073100163687*I)*x^6 + (-0.0891764685999430439009
80705138917501307 + 0.88540404532387013537890293079186615007*I)*x^7 + (-0.07
7586192554111070194946545325347354324 + 1.1203123602733012827902280837251262
279*I)*x^8 + (-0.068631600653858547181071490834145680710 + 1.452342481900855
3333227724598860306772*I)*x^9 + (-0.061508999455518349081010553357784107267 
+ 1.9219122678369782834401795177329475913*I)*x^10 + (-0.05571062741146945249
8696189575810912902 + 2.5881755204709353605112547694582420543*I)*x^11 + (-0.
050900098566873235057129781731068364461 + 3.53771093391828492695126969994227
46099*I)*x^12 + (-0.046845820129709063433619277861998722536 + 4.897479321691
1263872928749155211431733*I)*x^13 + (-0.043383187504440321433413244752801483
734 + 6.8541325989233120421465180303974100232*I)*x^14 + (-0.0403920297091715
56525032384691785928830 + 9.6828191677170351499970157871737049292*I)*x^15 + 
O(x^16)
x^3 + O(x^4)
x^2 + O(x^4)
x^2 - x^4 + O(x^5)
3 + 2*3^2 + 2*3^6 + 3^8 + 3^9 + O(3^10)
O(3^10)
2*3 + 2*3^2 + 2*3^3 + 3^4 + 3^5 + 2*3^9 + 3^10 + O(3^11)
O(3^10)
  ***   at top-level: lambertw(1/x)
  ***                 ^-------------
  *** lambertw: domain error in lambertw: valuation < 0
  ***   at top-level: lambertw(0,-1)
  ***                 ^--------------
  *** lambertw: domain error in glambertW: argument out of range
  ***   at top-level: lambertw(mie+x+O(x^2))
  ***                 ^----------------------
  *** lambertw: odd valuation at branch point.
Total time spent: 1730
