% SBT logged output ´

% /solid/G4Tubs 0 1 1 0 90
% target =    (0,0,0)
% widths =    (1000,1000,1000)
% grids  =    (20,20,20)
% maxPoints = 10000
% maxErrors = 100
% TI: DistanceToOut(p,v) overshoots DistanceToIn = 40
1 40 80 -20 0.2202336164854 -0.77081765769891 0.59777695903181
% T02: DistanceToOut(p) should be zero DistanceToIn = 1160
2 2.8865798640254e-15 7.0588235294117 -24.705882352941 0.48006512051617 0.8754128668236 0.05647824947249
% T03: DistanceToIn(p,v) undershoots DistanceToIn = 1160
3 -640 -1160 -100 0.52762168345075 0.61859093921812 0.58220323691117
% T02: DistanceToOut(p) should be zero DistanceToIn = 500
4 1.5515366769137e-14 41.481481481482 -28.888888888889 0.71126554919467 0.68492238070598 0.15805901093215
% T03: DistanceToIn(p,v) undershoots DistanceToIn = 500
5 -500 -440 -140 0.7602154932453 0.4440862782324 -0.47419382251934
% T02: DistanceToOut(p) should be zero DistanceToIn = 1120
6 80 1.0880185641327e-14 -113.33333333333 -0.30942637387764 0.61885274775528 0.72199487238116
% T02: DistanceToIn(p) should be zero DistanceToIn = 708.80074906351
7 5.1070259132757e-15 175 -58.75 0.36323788360035 -0.86268997355084 0.35188669973784
% T0: DistanceToIn(p,v) undershoots DistanceToIn = 1280
8 460 -1280 -1740 -0.18812341189891 0.60916152424408 0.77041016301457
% T03: DistanceToIn(p,v) undershoots DistanceToIn = 1280
9 460 -1280 -1740 -0.19463063402775 0.66174415569434 0.72402595858322
% T02: DistanceToOut(p) should be zero DistanceToIn = 600
10 4.54636328584e-14 71.25 7.4999999999999 0.81097164935435 0.17740004829626 -0.55754300893112
% T02: DistanceToIn(p) should be zero DistanceToIn = 1300
11 -3.5860203695393e-14 100.29850746269 -51.641791044776 0.7286914619694 -0.36978372696955 0.5764275743937
% T02: DistanceToOut(p) should be zero (any further such errors suppressed) DistanceToIn = 1420
12 9.4368957093138e-15 35.223880597015 -22.388059701493 0.66568700642509 0.74517202211764 0.039742507846274
% T0: DistanceToIn(p,v) undershoots DistanceToIn = 1420
13 -1300 -1420 -100 0.64290193772553 0.69523116521482 0.32145096886276
% T03: DistanceToIn(p,v) undershoots DistanceToIn = 1420
14 -1300 -1420 -100 0.74552059027045 0.57103704786672 -0.3436797047346
% T02: DistanceToIn(p) should be zero DistanceToIn = 764.086165696
15 827.60344966899 561.31321924216 -577.88577684886 -0.73025917953373 -0.44626949860395 0.51726691883639
% T02: DistanceToIn(p) should be zero DistanceToIn = 764.086165696
16 785.2497702984 619.17913259921 139.76454100272 -0.49241111841448 -0.24156017129767 0.8361698237227
% T02: DistanceToIn(p) should be zero (any further such errors suppressed) DistanceToIn = 60.188662455886
17 4.6015274923761e-14 733.33333333333 -620 0.045047888836363 -0.73578218432726 0.67571833254544
% T03: DistanceToIn(p,v) undershoots (any further such errors suppressed) DistanceToIn = 0
18 340 -240 1620 0.34836917912355 0.28932355554329 -0.89158891606198
% TO2: DistanceToOut(p,v) overshoots DistanceToIn = 0
19 228.46153846154 494.61538461538 -1000 -0.17439502660379 -0.38366905852834 0.9068541383397
% T0: DistanceToIn(p,v) undershoots DistanceToIn = 500
20 700 -500 620 -0.28261210280524 0.94876920227472 0.14130605140262
% T0: DistanceToIn(p,v) undershoots DistanceToIn = 1100
21 220 -1100 -1540 -0.093135569528595 0.61055540024301 0.78647814268591
% T0: DistanceToIn(p,v) undershoots (any further such errors suppressed) DistanceToIn = 1100
22 220 -1100 -1540 0.072067509871074 0.55491982600727 0.82877636351735
% TO2: DistanceToOut(p,v) overshoots DistanceToIn = 0
23 200.28571428571 866.85714285714 1000 -0.12347086622601 -0.6061297069277 -0.78572369416554
% TO2: DistanceToOut(p,v) overshoots DistanceToIn = 0
24 358.06451612903 718.70967741935 1000 0.16605517580968 -0.74724829114356 -0.64346380626251
% TI: DistanceToOut(p,v) overshoots DistanceToIn = 200
25 200 620 -160 0.20064776152657 -0.79347069330961 -0.57458222618972
% TI: DistanceToOut(p,v) overshoots DistanceToIn = 200
26 200 620 -160 0.10463814582353 -0.7646633733258 -0.63587796308146
% TI: DistanceToOut(p,v) overshoots DistanceToIn = 200
27 200 620 -160 0.34398603390016 -0.77052871593637 0.53661821288425
% TI: DistanceToOut(p,v) overshoots (any further such errors suppressed) DistanceToIn = 200
28 200 620 -160 0.10336678645736 -0.64973408630338 0.75310087276074
% TO2: DistanceToOut(p,v) overshoots DistanceToIn = 0
29 209.09090909091 774.54545454545 1000 0.45591623620355 -0.72317747811597 -0.51880123430059
% TO2: DistanceToOut(p,v) overshoots (any further such errors suppressed) DistanceToIn = 0
30 381.36338302865 924.42521064981 -630.86079068284 -0.31126635188256 -0.76997465992002 0.55700294547406
% TO3: DistanceToIn(p,v) overshoots DistanceToIn = 1400
31 -1400 -280 600 0.91287092917528 0.18257418583506 -0.36514837167011
% TO: DistanceToIn(p,v) overshoots DistanceToIn = 600
32 -600 -600 -140 0.67036798492931 0.67036798492931 0.31814073861052
% TO: DistanceToIn(p,v) overshoots DistanceToIn = 1380
33 -360 -1380 300 0.24701609087779 0.94689501503151 -0.20584674239815
% TO: DistanceToIn(p,v) overshoots DistanceToIn = 520
34 -520 -520 -260 0.64791130926102 0.64791130926102 0.40052699117954
% TO: DistanceToIn(p,v) overshoots DistanceToIn = 1920
35 -320 -1920 620 0.16222142113076 0.97332852678458 0.16222142113076
% TO3: DistanceToIn(p,v) overshoots DistanceToIn = 80
36 -80 300 100 0.23488808780588 -0.88083032927206 0.41105415366029
% TO: DistanceToIn(p,v) overshoots (any further such errors suppressed) DistanceToIn = 540
37 -540 -60 720 0.62600544043169 0.069556160047966 -0.77671045386895
% TO3: DistanceToIn(p,v) overshoots DistanceToIn = 300
38 80 -300 -660 -0.16302782918784 0.61135435945442 0.77438218864226
% TO3: DistanceToIn(p,v) overshoots DistanceToIn = 0
39 200 -240 -1520 -0.3118914307759 0.37426971693108 0.87329600617253
% T02: DistanceToOut(p,v) undershoots DistanceToIn = 0
40 653.87755102041 544.89795918367 -1000 -0.3314068624434 -0.2761723853695 0.90216312554036
% T02: SurfaceNormal and DistanceToOut disagree on normal DistanceToIn = 0
41 1000 3.7053693446865e-14 -213.33333333333 0.75931119532883 -0.15186223906577 0.63275932944069
% TO3: DistanceToIn(p,v) overshoots (any further such errors suppressed) DistanceToIn = 560
42 -560 -80 -40 0.48012543690803 0.068589348129719 0.87451418865391
% T02: SurfaceNormal and DistanceToOut disagree on normal DistanceToIn = 0
43 9.7200025805932e-14 1000 -31.578947368421 -0.7896888281453 0.26322960938177 0.55416759869846
% TI: DistanceToOut(p,v) undershoots DistanceToIn = 289.78876381741
44 600 380 -580 -0.47957049716568 -0.30372798153827 0.82326268680109
% T02: SurfaceNormal and DistanceToOut disagree on normal DistanceToIn = 0
45 9.9420471855183e-14 1000 -282 -0.67381712052921 0.67381712052921 0.30321770423814
% T02: SurfaceNormal and DistanceToOut disagree on normal DistanceToIn = 0
46 8.5736973076678e-14 1000 613.33333333333 -0.69159816803572 0.29639921487245 -0.65866492193878
% T02: DistanceToOut(p,v) undershoots DistanceToIn = 0
47 554.70019622523 832.05029433784 -555.9500794245 -0.54122632809805 -0.81183949214708 0.21906779946826
% TI: DistanceToOut(p,v) undershoots DistanceToIn = 60
48 80 60 640 -0.79991837983961 -0.59993878487971 -0.01428425678285
% TI: DistanceToOut(p,v) undershoots DistanceToIn = 80
49 80 80 700 -0.36825563988497 -0.36825563988497 -0.85368352882425
% T02: DistanceToOut(p,v) undershoots DistanceToIn = 0
50 278.18181818182 556.36363636364 1000 -0.42350435586038 -0.84700871172076 -0.32127916651477
% T02: SurfaceNormal and DistanceToOut disagree on normal (any further such errors suppressed) DistanceToIn = 0
51 1000 5.4900528567714e-14 -182.22222222222 0.59867109471397 -0.59867109471397 0.53215208419019
% TI: DistanceToOut(p) <= 0 DistanceToIn = -0
52 0 0 -20 0 0 0
% T02: DistanceToOut incorrectly returns validNorm==true (horizon) DistanceToIn = 0
53 788.57142857143 17.142857142857 1000 -0.46146760423953 0.02714515319056 -0.88674167089164
% T02: DistanceToOut incorrectly returns validNorm==true (horizon) DistanceToIn = 0
54 828.57142857143 137.14285714286 1000 -0.39973579917857 0.21803770864286 -0.890320643625
% T0: DistanceToIn(p,v) == kInfinity DistanceToIn = 0
55 1080 0 1560 -0.56430922864751 0 -0.82556350116951
% T02: DistanceToOut incorrectly returns validNorm==true (horizon) DistanceToIn = 0
56 520 42.264150943396 1000 -0.70610201083006 0.053290717798495 -0.70610201083006
% T02: DistanceToOut incorrectly returns validNorm==true (horizon) DistanceToIn = 0
57 815.84905660377 15.849056603774 1000 -0.42647898139472 0.025588738883683 -0.90413544055681
% T02: DistanceToOut incorrectly returns validNorm==true (horizon) (any further such errors suppressed) DistanceToIn = 0
58 760 258.46153846154 1000 -0.46053780114091 0.37197283938305 -0.8059411519966
% T0: DistanceToIn(p,v) == kInfinity DistanceToIn = 0
59 60 -1360 -2080 -0.024299664423951 0.55079239360957 0.83428847855567
% T0: DistanceToIn(p,v) == kInfinity DistanceToIn = 0
60 700 -860 1500 -0.37204580241691 0.45708484296935 -0.80787088524816
% T0: DistanceToIn(p,v) == kInfinity DistanceToIn = 1340
61 1100 -1340 -460 -0.61499557306433 0.74917642536927 0.24599822922573
% T02: DistanceToOut(p,v) undershoots DistanceToIn = 0
62 740.54794520548 433.15068493151 1000 -0.55562149295482 -0.32498615625659 -0.7652899808623
% T0: DistanceToIn(p,v) == kInfinity (any further such errors suppressed) DistanceToIn = 660
63 -660 940 -100 0.57324158458974 -0.81643498411266 0.06948382843512
% T02: DistanceToOut(p,v) undershoots (any further such errors suppressed) DistanceToIn = 0
64 483.42270083417 875.38705286187 371.9643520277 -0.45008302150867 -0.81501520111029 -0.36493217960162
% T02: DistanceToIn(p,v) == kInfinity DistanceToIn = 0
65 2.4424906541753e-15 0 -20 0.86424637517608 0 -0.50306878555025
% TI: DistanceToOut(p,v) undershoots DistanceToIn = 240
66 460 240 520 -0.45539842432418 -0.23759917790827 -0.85799703133541
% TI: DistanceToOut(p,v) undershoots (any further such errors suppressed) DistanceToIn = 140
67 140 140 -620 -0.48621408401685 -0.48621408401685 0.72607969879849
% End of test (maximum number points) ´

% Statistics: points=10000 errors=803537 errors reported=67
%             inside=647 outside=9308 surface=45
%             cpu time=48
%(End of file)