% SBT logged output ´

% /solid/G4Tubs 0.8 1 1 0 90
% target =    (0,0,0)
% widths =    (1000,1000,1000)
% grids  =    (20,20,20)
% maxPoints = 10000
% maxErrors = 100
% T03: DistanceToIn(p,v) undershoots DistanceToIn = 380
1 540 -220 -1380 0.34336858273021 0.209006963401 0.91564955394722
% T02: DistanceToOut(p) should be zero DistanceToIn = 1600
2 20.033450172059 799.74912370956 -60.002090635754 -0.1321592114612 0.99119408595901 0.0082599507163251
% T03: DistanceToIn(p,v) undershoots DistanceToIn = 1600
3 340 -1600 -80 0.29350362815218 0.95388679149457 0.062893634604038
% T03: DistanceToIn(p,v) undershoots DistanceToIn = 1600
4 340 -1600 -80 0.30411436850788 0.83631451339668 0.45617155276182
% T02: DistanceToIn(p) should be zero DistanceToIn = 1920
5 19.939694142227 799.75146676797 -60.074925459657 0.22629295577616 0.93260127228965 0.28115185414614
% T03: DistanceToIn(p,v) undershoots DistanceToIn = 0
6 -860 -960 -1380 0.57023751512517 0.32409182514308 0.75484678261174
% T02: DistanceToIn(p) should be zero DistanceToIn = 432.304473783
7 19.872004514673 799.75315156401 -59.670868752015 0.29706655263624 0.57291406579847 -0.76388542106463
% T02: DistanceToIn(p) should be zero DistanceToIn = 1000
8 20.005559513897 799.74982187465 -59.986101215258 -0.022182548201326 0.99821466905966 -0.055456370503315
% T02: DistanceToIn(p) should be zero DistanceToIn = 1100
9 20.044945194032 799.74883568041 -59.986780825285 -0.17591332347663 0.98304504295763 -0.051739212787244
% T03: DistanceToIn(p,v) undershoots (any further such errors suppressed) DistanceToIn = 1100
10 360 -1100 40 0.41242752456948 0.73519689162385 0.53794894509062
% T02: DistanceToOut(p) should be zero DistanceToIn = 340
11 20.238061044429 799.74397208429 -59.829314722862 -0.6119097028191 0.65809156718281 -0.4387277114552
% T02: DistanceToIn(p) should be zero (any further such errors suppressed) DistanceToIn = 1260
12 -2.4424906541753e-14 801.90476190476 -4.7619047619051 0.34026228050239 -0.032405931476418 -0.93977201281612
% T02: DistanceToOut(p) should be zero DistanceToIn = 160
13 803.33333333333 6.0368376963993e-15 273.33333333333 -0.6705396692181 0.68480647069082 -0.28533602945451
% T02: DistanceToOut(p) should be zero DistanceToIn = 880
14 333.19136971956 942.85922127559 -560.00727446455 -0.51592690076628 -0.23533507754251 0.82367277139879
% T02: DistanceToOut(p) should be zero (any further such errors suppressed) DistanceToIn = 880
15 513.40500581742 858.14643272673 558.58683520287 -0.25210538190641 -0.18007527279029 0.95079744033276
% TI: DistanceToOut(p,v) <= 0  Normal Dist =  DistanceToIn = 37.376856618333
16 540 640 -460 0.22484196353457 0.012491220196365 -0.97431517531645
% T0: DistanceToIn(p,v) undershoots DistanceToIn = 0
17 1200 -420 60 -0.46113303737741 0.77270941398377 0.43620692724891
% T0: DistanceToIn(p,v) undershoots DistanceToIn = 266.96487717695
18 1240 -260 -300 -0.74668380832814 0.64875806297363 0.14688861803177
% T0: DistanceToIn(p,v) undershoots DistanceToIn = 140
19 1080 -140 720 -0.35665519963346 0.51516862169277 -0.77935765845829
% T0: DistanceToIn(p,v) undershoots DistanceToIn = 760
20 1160 -760 240 -0.38788456246678 0.87551086956789 0.28814281783247
% T0: DistanceToIn(p,v) undershoots (any further such errors suppressed) DistanceToIn = 2000
21 1740 -2000 -80 -0.39890296711431 0.87883309942372 0.26178007216877
% TI: DistanceToOut(p,v) overshoots DistanceToIn = 37.918922335544
22 660 700 260 0.36887793184841 -0.92219482962102 -0.11612823780413
% TI: DistanceToOut(p,v) overshoots DistanceToIn = 37.918922335544
23 660 700 260 0.21793061010849 -0.89466250465592 0.38998109177309
% TI: DistanceToOut(p,v) overshoots DistanceToIn = 37.918922335544
24 660 700 260 0.29318995718003 -0.76484336655659 -0.57363252491744
% TI: DistanceToOut(p,v) overshoots DistanceToIn = 37.918922335544
25 660 700 260 0.27608785737034 -0.92316877308208 -0.26746011182752
% TO2: DistanceToOut(p,v) overshoots DistanceToIn = 0
26 641.75097594071 766.9130882174 196.12841579248 0.19354838709677 -0.70967741935484 0.67741935483871
% TI: DistanceToOut(p,v) <= 0  Normal Dist =  DistanceToIn = 0.24996094970231
27 20 800 60 -0.35649591466915 0.033951991873252 0.93367977651444
% TI: DistanceToOut(p,v) <= 0  Normal Dist =  DistanceToIn = 0.24996094970231
28 20 800 60 -0.19540705719605 0.08495959008524 -0.97703528598026
% TI: DistanceToOut(p,v) overshoots (any further such errors suppressed) DistanceToIn = 59.069263796581
29 840 180 -600 0.052526598324808 -0.99800536817135 -0.035017732216539
% TO2: DistanceToOut(p,v) overshoots DistanceToIn = 0
30 840 542.58639865002 -448.10569786283 0 -0.92233770985337 -0.38638471628992
% TO2: DistanceToOut(p,v) overshoots DistanceToIn = 0
31 736.59766958169 676.33118600788 -103.66881399212 0.14574100933227 -0.69955684479491 -0.69955684479491
% TO2: DistanceToOut(p,v) overshoots DistanceToIn = 0
32 889.65287565867 456.63745009829 -394.29522941409 -0.14256057383714 -0.7942660542355 -0.59060809161101
% T02: DistanceToOut(p,v) < 0 DistanceToIn = 0
33 260.86956521739 830.21739130435 1000 0.04343466334571 0.010858665836428 -0.99899725695134
% TO2: DistanceToOut(p,v) overshoots (any further such errors suppressed) DistanceToIn = 0
34 685.98240028016 727.61813233719 -976.48746598182 0.22577744852354 -0.80276426141703 0.55190042972421
% TI: DistanceToOut(p,v) <= 0  Normal Dist =  DistanceToIn = 0.99937578003141
35 800 40 260 0.097976686741393 -0.33747525433146 0.93622167330664
% TI: DistanceToOut(p,v) <= 0  Normal Dist =  (any further such errors suppressed) DistanceToIn = 0.99937578003141
36 800 40 260 0.1084298001222 -0.45179083384249 0.88551003433127
% T02: DistanceToOut(p,v) < 0 DistanceToIn = 0
37 825.9649122807 151.9298245614 -1000 0.034980219905593 0.069960439811185 0.99693626730939
% T02: DistanceToOut(p,v) < 0 DistanceToIn = 0
38 447.2972972973 794.59459459459 1000 0.013507348307885 0.02701469661577 -0.9995437747835
% T02: DistanceToOut(p,v) < 0 DistanceToIn = 0
39 814.46808510638 205.53191489362 -1000 0.063571307843719 -0.063571307843719 0.9959504895516
% T02: DistanceToOut(p,v) < 0 (any further such errors suppressed) DistanceToIn = 0
40 780 311.05263157895 -1000 0 0.13045451257139 0.99145429554254
% T02: SurfaceNormal and DistanceToOut disagree on normal DistanceToIn = 0
41 4.4908521346088e-14 800 -86.875 -0.5970107693202 0 -0.80223322127402
% T02: SurfaceNormal and DistanceToOut disagree on normal DistanceToIn = 0
42 7.9380946260699e-14 1000 -15.789473684211 -0.82356098790466 0.41178049395233 -0.39010783637589
% T02: DistanceToIn(p,v) == kInfinity DistanceToIn = 0
43 600 800 -1000 -0.079555728417573 -0.47733437050544 0.8751130125933
% T02: SurfaceNormal and DistanceToOut disagree on normal DistanceToIn = 0
44 1.088573675645e-13 1000 -969.5652173913 -0.57653345632715 0.28826672816358 -0.76453349643383
% T02: SurfaceNormal and DistanceToOut disagree on normal DistanceToIn = 0
45 4.1855408028368e-14 800 -24.666666666667 -0.49259821985177 0 0.87025685507146
% T02: SurfaceNormal and DistanceToOut disagree on normal (any further such errors suppressed) DistanceToIn = 0
46 7.6827433304061e-14 1000 -785 -0.98442757550848 0.14063251078693 0.10547438309019
% T02: Outgoing surfaceNormal is incorrect DistanceToIn = 0
47 -3.2751579226442e-15 800 316.84210526316 -0.93015522133132 0 -0.36716653473605
% End of test (maximum number points) ´

% Statistics: points=10000 errors=592986 errors reported=47
%             inside=203 outside=9785 surface=12
%             cpu time=68
%(End of file)