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1568
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46
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1600
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1570
1599
15
20
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1579
1609
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- Curvature Graph
- Draws Rhino Curvature Graphs.
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- Curvature Graph
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- Curve
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1574
1450
15
20
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1583
1460
- Sampling density of the Graph
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- Density
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1574
1470
15
20
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1583
1480
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- Scale of graph
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1574
1490
15
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1583
1500
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1701.829
876.0247
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876.0247
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984.8504
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1701.829
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- A quick note
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- Scribble
- Scribble
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- Curvature radius of the internal surface is 349.82 mm
Curvature radius of the external surface is also 96.36 mm
So I would like a surface which joins the two internal and external surfaces, as "smooth" as possible,
with splines so as to be tangent on its edges, to have a continuous final surface.
-
1696.829
871.0247
1189.126
118.8257
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1701.829
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- Panel
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255;255;250;90
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- c9785b8e-2f30-4f90-8ee3-cca710f82402
- Entwine
- Flatten and combine a collection of data streams
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- true
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- Entwine
- Entwine
-
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79
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5461
4779
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- 1
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- Data to entwine
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- 1
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5418
4749
28
20
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5433.5
4759
- 2
- Data to entwine
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- Branch {0;1}
- {0;1}
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- 1
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5418
4769
28
20
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5433.5
4779
- 2
- Data to entwine
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5418
4789
28
20
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5433.5
4799
- Entwined result
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- Result
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5476
4749
17
60
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5484.5
4779
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- Surface
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50
24
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5588.86
4781.521
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- Panel
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- Panel
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- Double click to edit panel content…
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5517
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209
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4800.539
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255;255;250;90
- true
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- deaf8653-5528-4286-807c-3de8b8dad781
- Surface
- Contains a collection of generic surfaces
- true
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- Surface
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69
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- Panel
- A panel for custom notes and text values
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209
90
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4651.536
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255;255;250;90
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- Surface
- Contains a collection of generic surfaces
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- bef6dc38-a508-4496-8b2d-2535ed67e951
- Surface
- Surface whose radius we want to check
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- 1
- 1
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215
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7398.297
4805.899
- 404f75ac-5594-4c48-ad8a-7d0f472bbf8a
- Principal Curvature
- Evaluate the principal curvature of a surface at a {uv} coordinate.
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- Principal Curvature
- Curvature
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74
104
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4916
- Base surface
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- Surface
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19
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19
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21
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4876
- Minimum principal curvature
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7747
4886
21
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7757.5
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- Maximum principal curvature
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- Max
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7747
4906
21
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7757.5
4916
- Minimum principal curvature direction
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- Min direction
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7747
4926
21
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7757.5
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- Maximum principal curvature direction
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- Max direction
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21
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7757.5
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4977
50
24
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7865.059
4989.909
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- Division
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- Division
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65
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- Item to divide (dividend)
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- 1
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7930
4948
14
20
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7938.5
4958
- Item to divide with (divisor)
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7930
4968
14
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7974
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17
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7982.5
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- Panel
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50
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7840.059
4942.909
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255;255;250;90
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8031
4956
50
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8056.059
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- Panel
- A panel for custom notes and text values
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8189
4956
81
39
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8189.059
4956.909
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255;255;250;90
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- Point
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- Point
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7600
4930
50
24
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7625.059
4942.909
- f241e42e-8983-4ed3-b869-621c07630b00
- Dimensions
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- Dimensions
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7690
4776
65
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7720
4798
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- 1
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7692
4778
13
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7700
4798
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7735
4778
18
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4788
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7735
4798
18
20
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7744
4808
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- Panel
- A panel for custom notes and text values
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7801
4769
97
27
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- 0
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7801.478
4769.909
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255;255;250;90
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- Panel
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7803
4803
102
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7803.265
4803.909
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255;255;250;90
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- MD Slider
- A multidimensional slider
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0.336586556783537
0.330487879311166
0.5
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126.54
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7314
4842
200
200
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7314.059
4842.909
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50
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7835.059
4876.909
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8103
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61
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12
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15
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- deaf8653-5528-4286-807c-3de8b8dad781
- Surface
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- Surface
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93
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7145.797
4893.649
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94
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4839.229
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95
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7153.687
4951.879
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1224.017
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4152.005
385.4339
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4152.005
577.973
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1224.017
577.973
- A quick note
- Microsoft Sans Serif
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- Scribble
- Scribble
- 60
- The "challenge" :
To have a transition surface which joins the two internal and external surfaces, as "smooth" as possible,
with splines, so as to be tangent on its edges, to have a continuous final round surface.
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1219.017
380.4339
2937.988
202.5391
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1224.017
385.4339
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- Count
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- Count
- N
- false
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2815
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50
24
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2840.077
4825.243
- 1
- 1
- {0}
- 10
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- Panel
- A panel for custom notes and text values
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- Panel
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- 0
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- 2
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2710
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50
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2710.727
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255;255;250;90
- true
- true
- true
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- true
- 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312
- Number
- Contains a collection of floating point numbers
- 0dcef7bf-3a1b-465f-9113-f5c9899d188c
- Number
- Num
- false
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50
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- Panel
- A panel for custom notes and text values
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- Panel
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- Double click to edit panel content…
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133
192
- 0
- 0
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4847.952
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255;255;250;90
- true
- true
- true
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- true
- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
- Curve
- Curve to divide
- true
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- Curve
- C
- false
- 6449ca9e-a381-4623-b25f-b9f8532a3c7d
- 1
- 2
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2812
4762
50
24
-
2837.997
4774.933
- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
- Curve
- Contains a collection of generic curves
- 1
- 6449ca9e-a381-4623-b25f-b9f8532a3c7d
- Curve
- Internal curve that delimits the internal surface (Radius=96.36mm)
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- 1
- 1
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2725
1450
358
20
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2904.72
1460.253
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- Curve
- Contains a collection of generic curves
- 1
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- Curve
- External curve that delimits the external surface (Radius=96.36mm)
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- 1
- 1
-
2729
1538
362
20
-
2910.919
1548.293
- 983c7600-980c-44da-bc53-c804067f667f
- Perp Frames
- Generate a number of equally spaced, perpendicular frames along a curve.
- true
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- Perp Frames
- PFrames
-
2897
4754
64
64
-
2929
4786
- Curve to divide
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- Curve
- C
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- 1
-
2899
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15
20
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2908
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- Number of segments
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- Count
- N
- false
- 50bd53ea-9edb-42b1-b996-30056843359d
- 1
-
2899
4776
15
20
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2908
4786
- 1
- 1
- {0}
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- Align the frames
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- Align
- A
- false
- 0
-
2899
4796
15
20
-
2908
4806
- 1
- 1
- {0}
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- 1
- Curve frames
- 07a8cd95-4eea-4e68-a908-6539c080db35
- Frames
- F
- false
- 0
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2944
4756
15
30
-
2951.5
4771
- 1
- Parameter values at frame points
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- Parameters
- t
- false
- 0
-
2944
4786
15
30
-
2951.5
4801
- 4f8984c4-7c7a-4d69-b0a2-183cbb330d20
- Plane
- Contains a collection of three-dimensional axis-systems
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- Plane
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- false
- 07a8cd95-4eea-4e68-a908-6539c080db35
- 1
-
3000
4760
50
24
-
3025.86
4772.474
- b7c12ed1-b09a-4e15-996f-3fa9f3f16b1c
- Curve | Plane
- Solve intersection events for a curve and a plane.
- true
- 58a4914d-d6e7-45e8-b54b-4a4748f926ca
- Curve | Plane
- PCX
-
4349
1487
70
64
-
4380
1519
- Base curve
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- Curve
- C
- false
- 83ea462c-0498-4c6c-8d47-d79eb7be94f1
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-
4351
1489
14
30
-
4359.5
1504
- Intersection plane
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- Plane
- P
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- 1
-
4351
1519
14
30
-
4359.5
1534
- 1
- Intersection events
- 85d276c4-5909-4014-a9be-4189e31dfd7b
- Points
- P
- false
- 0
-
4395
1489
22
20
-
4406
1499
- 1
- Parameters {t} on curve
- 325e09b5-bda0-4bf1-9a30-7f8820157981
- Params C
- t
- false
- 0
-
4395
1509
22
20
-
4406
1519
- 1
- Parameters {uv} on plane
- true
- f9f0d0a8-f0d7-4b13-80f1-82b0457341eb
- Params P
- uv
- false
- 0
-
4395
1529
22
20
-
4406
1539
- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
- Curve
- Base curve
- true
- 1
- 83ea462c-0498-4c6c-8d47-d79eb7be94f1
- Curve
- Medium curve that delimits the medium surface
- false
- b5c1669f-884d-4b5e-aac6-c058dff472e3
- 1
- 1
-
4059
1482
262
20
-
4190.33
1492.149
- fbac3e32-f100-4292-8692-77240a42fd1a
- Point
- Contains a collection of three-dimensional points
- true
- 0bb4980d-0d62-4cdb-9bb1-420e69cc4e12
- Point
- Pt
- false
- 85d276c4-5909-4014-a9be-4189e31dfd7b
- 1
-
4467
1489
50
24
-
4492.392
1501.837
- 4f8984c4-7c7a-4d69-b0a2-183cbb330d20
- Plane
- Contains a collection of three-dimensional axis-systems
- true
- 1
- 6bc20286-a388-4837-976c-25443e43421b
- Plane
- Section plane
- false
- e07214ab-66bb-466a-9837-4f1e5f2d1dfc
- 1
- 1
-
4246
1535
83
20
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4288.392
1545.837
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- Number
- Contains a collection of floating point numbers
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- Number
- Num
- false
- 325e09b5-bda0-4bf1-9a30-7f8820157981
- 1
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50
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1538.877
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
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- Panel
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- 33fa9bd2-0be0-427d-884f-2b22beff5a50
- 1
- Double click to edit panel content…
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255;255;250;90
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- true
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- Panel
- A panel for custom notes and text values
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- Panel
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- Double click to edit panel content…
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-
255;255;250;90
- true
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- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- f525c954-ba55-4cac-a0f8-423628b8f14c
- Panel
- false
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- 1abf6579-658b-4f29-96cd-74c77f94ae03
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- Double click to edit panel content…
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305
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- 0
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255;255;250;90
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- true
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- true
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
- 1
-
150;170;135;255
- A group of Grasshopper objects
- 36dd6f03-6b2b-4170-93e9-7936af885b8d
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- 2d5ec834-c778-4120-8b91-cd3c6028f677
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- Group
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- Circle TanTan
- Create a circle tangent to two curves.
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- Circle TanTan
- CircleTT
-
3504
5255
81
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-
3535
5287
- First curve for tangency constraint
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- A
- false
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- 1
-
3506
5257
14
20
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- Second curve for tangency constraint
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- B
- false
- 2d5ec834-c778-4120-8b91-cd3c6028f677
- 1
-
3506
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14
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3506
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14
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- Resulting circle
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33
60
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- Curve
- Contains a collection of generic curves
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- true
- Curve
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- f86f621a-96b4-43a0-ab31-2c710ecd46ad
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3410
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50
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3435.741
5298.38
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- Circle
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- Circle
- false
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- 1
-
3614
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50
24
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3639.741
5293.38
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- Panel
- A panel for custom notes and text values
- 82dbe02d-67d1-4c64-b790-6c9a8b4b8dc8
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- Panel
- false
- 0
- 12de5331-7fc9-4ef8-8220-8c5b27dc53b5
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- Double click to edit panel content…
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3600
5319
187
400
- 0
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3600.491
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255;255;250;90
- true
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- true
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- Point
- Contains a collection of three-dimensional points
- true
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- true
- Point
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- false
- 00114369-b0f2-4181-a4ad-14af0eb8248f
- 1
-
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5323
50
24
-
3452.183
5335.924
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
- 1
-
150;170;135;255
- A group of Grasshopper objects
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- Group
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- Seam
- Seam
-
2793
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65
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2824
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- 1
-
2795
5192
14
20
-
2803.5
5202
- Parameter of new seam
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- Seam
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2795
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14
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- Panel
- A panel for custom notes and text values
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70
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2691.392
5253.339
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255;255;250;90
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- Seam
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2793
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65
44
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2824
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- Curve to adjust
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-
2795
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14
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- Parameter of new seam
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-
2795
5323
14
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- Adjusted curve
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-
2839
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17
40
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2847.5
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- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
- Curve
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-
2906
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50
24
-
2931.103
5218.362
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- Curve
- Contains a collection of generic curves
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- Curve
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- 4bfd3f75-a497-42aa-8d2d-01bb8e34f489
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-
2908
5317
50
24
-
2933.572
5329.503
- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
- Curve
- Contains a collection of generic curves
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- Curve
- Crv
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- true
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- 1
- 2
-
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69
24
-
2711.178
5205.734
- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
- Curve
- Contains a collection of generic curves
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- Curve
- Crv
- false
- true
- f56deb88-527c-4fda-8321-610c4e99e8e5
- 1
- 2
-
2669
5306
69
24
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2713.678
5318.234
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
- 1
-
150;170;135;255
- A group of Grasshopper objects
- 8dc8e20c-beaf-4bd6-acd8-0c130ebaf1ef
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- Group
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- Explode
- Explode a curve into smaller segments.
- true
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- true
- Explode
- Explode
-
3126
5640
65
44
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- Curve to explode
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- Curve
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- false
- 0323f248-49b1-4ad4-be6f-744b007f14b2
- 1
-
3128
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14
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3136.5
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- Recursive decomposition until all segments are atomic
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- Recursive
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- false
- 0
-
3128
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14
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3136.5
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- 1
- 1
- {0}
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- 1
- Exploded segments that make up the base curve
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2+ZVLn6Ia2gpZQUzzB9eB6MfL0uUtEa6Vgso16rIfTW/RA7HMEqa56XGTVbMXJG0fN6nIKHZF8/PCrDANuseern7cmuo1jWr9EJnyxLJ0JnWH9a+kt1BvLbpcpWgsCqARgGk9Z+cHj6tyDwfL699bG1R+efwuBkLMUqVxBvei+cAYcb12Fm33py6djNH5vLU8betjybEm/xBfrHhrhAeEHPXrNlNmDhf5ka5jP8DMcO+elRu3eHraw8jElbOi8F3oLxp7WdtHQ0zr9G7xi/P6q3d0uAi41vyn9TaxCd2KzNnydkJj9N3i93rFSe8T2AHoWZC0xmV7apheloKHzpFrjYcD38W5tie/TLSTbNwXfVCyyIty9nVOqaWmWdcX9hZpZe5WqXWbpYW8Il7qSGZc6eE3+T8sXUlh10eI8vK1LMydNcfXX/saxxld2jH3uOtS56mLd5WW7hLa7zm/spzCTeyyI5SiUI0gRXtrbISjOoajbY7TR8x58uD3e+0fRBrKO9cZUpUzA6TzC5zse1o0lCX/ngc9aVYqTkkPTLoaOzbzPV9PkdSTMZlpYXurFmrmRakeVIdnTXDw5HBcOxoVCmxt0Gcl0PUrixInh6eR7ye25xcfjziYpmJ3P2d+c6XxT1ezt6+pIJggO64tcCzt7qz0bYzc8aKi52H69LyquYJRBs9aiHsUJ5aIiS6PK5dsGVHnMiX2OxpQbiqOwyBZmCyYXXgggj1gA1S6UmL95eennNoXeTuk0vI0iHugSQFxwb76wXdnvHbn39LjdgszX8nxck6JSfk0f7YNLnXVW1nTqzoY/j6vxXZEo/WaFqjcya7UPfruyTBTxqyx6Z0vivN2147znzqw0lfjPRmfaBcOxLn6X7ywXp/hrdd8rM0LfylvM57NkK7boqlSTxDe7avtwIKX11qmefgpRZv9ULcxGT1rTOzl9RpeKrrqOXX67gUqNa7z769OPVDx0mG5gfJ1Jyipo2VN7Q3TZgTLzeF0b7qaukLmfGTul3bbv05vtD9am/AgZXzn9/0Nt6ODa//s/q48bF19Om1yBZMcqGTrP9WQ31lXFXcOc+tZPXKRZvHGTm8MLj1oKa1zl1XMHpq+psNsrq02dknrjxTjgvkfxb6zk4e91Bp+rUN1VvGndMyVk813hi542jFtrDJ4w+t7apu8KygB9Ucbfui86kYODnlaJ9thTdihc1bvnIvHCG21KacWFs+swGdtAZvWnds3x5r70V7lXVk47FJEmINWedmROmr3T8fdGbL7cZFmR9e3/6CeUzIeCTEl1e103LlpDr86tTCtvO6b+XNZ5Q4/umh1/7q9n2RmKjkw4cri+aoWGq3Fhc/vlBUbKwyIb2gSI2wtx5lZJOBGUfQMoirfOXoP/V6gInXfUzKrCftcrRv+TnL43Xu3l31onaTR1yd03uZuVlZE3suFLU61Diked+8tdr18JU9N98gjpr3ehStfiKfnd6t6SIjlu6Cra1AbbnZtGWd0hzc0X1LhCWmGJKyDkcAf+Cr9CMmS3mKT5o888PmmB6NdUVKfY+zpn05nrFn7WvbOLEEE8spkzUmiOlpeZ2Tt9D/i79pdtWu+frJfJ0Cq2SNQ85O6gtfkZm7oXfqEtOv8uv4xWv21Rrfzk/fZZ8TuqHn2vjYjj2zTC50dOfezVGd1O45v092QduDh0nzT7dUevXVolbrX01qtluRVoO023Y9nqaon9cNYESSSOv1rIsZ7p74SLr9u2UzL0pPf2x2i+E8Tqz2UU9fgnmA/l8fSmpXOkfXvaAdmvr8vUHZtzuUTsdMyqfykhcB4Su8Dq7ZRUpc5RKQ26uiB7zJL70idspj3k678KQl2onWfXzcFuq67HUUZoSrsaH6hQ+F7BgC0Ggk1q0ZdbDVDFyhbXFysEKJK0F9oPDWFs7Q2gx6i0IL1ZbQ+Z+hxaIf1h7csRTHI3sIzMegqNZudAQCXQW9+S5SCojgwvIJ3gK7yNr28M0AaxeCgghV84pNuV1dyMKFM5HB+ecZUTpy9AYRlVIzzUZ7TTcztcjZSpvcb+UauBwqXzuzRtbwqESxQeWNbsyi5DS1mj1u3fiK6fPmXyNZGbdOJO4fv07i6oP2Pr92I5GM0tqV25Jahd/T18Z5vT9/tUaoTFVS7YvtsRRf/2T9z7mfSu9es9VE7nqe3FXL8LocEJCHCHBMNfC7W6VuusUty38C4DxTeyVN/EHw42X3Ju0tU3uNvOMcliJW1KksOiMN+c5uRvUhU4uKS2KrtqWHTNt3auHynl2Lb1GPHVq2oVTDo/GM0pQrytWHpuWZNkufUI5QEzFXlS3TtPxrclqVkucuRIDklRjNj5o6Dh/2pipGP0un7r8Y9vZq3QcicHNeQILa59viRZ0JeS0HTXrUm+amlk0Oc+ELXVNJvJts/kgu4UBhDCNYW3lLYayPHipBuln0oqF2dqJntHWYtMX0rdjXLsLd0To1tq8iG/FnqK5f+T/s+no+oUe8pHWO6fQr6dV1S59YCTHmljUsn3mrQlD1WorXyVCxBx+1Kl++sVR40SOm2zy+ZUXb3IKKecKlF6QLdCbGPPBFfpxXZBq6UWjOy6fZrYWKk26n5rw+nnZ670yXbSEdQm8YCVEUpbN6QMEcoaXh1gE3tTwToqK+8EvOMb7xCWkXMz1/1ws//kPz8/Z5x+gabzcTEhIIQlKrZtbmbVOU8nqt0qUb0Y50lp7PuDc3WvNZQGbsyy+77J4fmFpzU6JwfUlnwqnHJN/IaPSCICPzxd/8Tpc8niy+wO2Art1d3WcrUzcF+E210JOzu6PrfzAt8lK5Y+5dbX9De3PLNyLXX8kbJK/fpPlHa+5d+UMP8z8BMl51a3TT70d5bGp1SvziahAQ+XpjvuesFyI5M+33RO1eoFV/hJDfsviR0sTV36QN+ySlz+5v0pslvUp37prljSbxypaY7qim5xoNYfdE03PcLmVrXerpWL/93iGRAkPB60Ld4w1sFVPbWjon1MlcPXD1P7d0oD0W3tLBotDMK4rr1hj+rNIPbamGbJ7R4IEWrKMgmYbzjDH8aWk+USdIQ7FnbQFFOHvUITcoBWyBMOaeFnyXUwz5FCI3Y09EP3x/MFLqC2Tj3A1HmdTSo817safCtJSjJ647ANk4t8NPRW44mDg7Fltg/EQFqVGgIeQK6QWcs66OKAgwjQyx2Nl54ZieytoylpVz3tQjtolSPo72G2bNmLuv5Zw9y8o5M+VB+8WjXy7h8p9HZu2T7useqd6VjEMIQnqXqjkXxVQrBYdYhsKhmAAB0MaULXcJsTERx0Ni4ZCHkkWYzXgiZ2BuxJo4vgoxi1NvxtujNGXqOXY+HnakI1PPGiKTibLaeZ+YdT3My4W+Mpy0q87zroQfAG7LST5MT+PqrnD2B7kr9DQ6YYgvoqBWDIUt5nz3ZhH8WbufVDUdQJYlIJbPcbm7gCgGrQYo3ADsvnev8iewg0fHCLAbx8SOHckshe27ABY92DzZSXuW5V7hQK/4ldvCRgHAZcMCGI3Csb12FL1vRPdV4DllBIiyWkdbsLVJYXuZoBkXwTaAlUvY6poEYkxdG1PXxtS1MXVtTF0bU9fG1LUxdW1MXRtT18bUtTF1bUxdG211Df4Lp99eXXOT1lLdprXOIWZOR2CgLV55oLpm5R82Y+7xSLPYna2hKhamkweqa943FE+78ftbpLU0XMjbn20yWF3jrp9xzgvXzwara3BlboQ74u3JOMQeNC91jQzuiD+ix9Q1mLvCWRx9dQ3+u76fFIcSQJbz0LzEoQ7QWof+l9Q1eOT8InUN/ijbKAD4cVgAlSX/W+oaPN/819S17SlsL+Oqrh1m5RK2uoZCjKlrY+ramLo2pq6NqWtj6tqYujamro2pa2Pq2pi6Nqaujalro62uwcvY/PbqGgVToHKufg+ujB//l/Qq4NxAda0ghzCFrO5hs0mSuNvXl6Y8UF1bNSVybb3ZCvuT6J6MA2t2iw1W17jrZ5zzcn+yjXNmuDI3wh3xOGjPK85LXfsIWu2QY+oazF3hDI++ugYv3vST4pA8yGOPOC9xKAy0qiH/JXUNHgG/SF2Dl7gaBQDBQBgGQAbyv6WuwXPRf01dG5fK9jKu6tqsVCaEbHUNjeChrukvOPQV8T7RLCYxVE3crFcJ9gtfqArOyMuV6P2DqhnMAjv/rGgGPEq5XOsQ6CUG1vP57i/z4ZU/f9KNz+7GIe5BDOVyc2OpJByfcD9Dkr8pQyOKCXj4j4QZfqfv8+GGDcNP2dFruemBgp6e9EbVn+TDOhmHoCJ5FJrZsCYZx5fTz4cULz5mfIw0TEzCW54JUJasyhQOHzRWSRBfOoMW7MPAcGEGmsaFeDAz/e8jCZzqUzRKECZ8ddiaCJArCo1IIhPAAY6scgm8sOCwV8mNm5EWTUrCIbwgSDeDkG6AJ6Fs0NqCHFK+hFO5jhsO6PDVA4fLdXBZ3V0b6pte25aH3az52CJSMWhwEksHHD606MPSUc/DvuAg/ZG86m+EgtYE5O9TfwMcLqxmyvBshH2XjVe7Trk9+XrP8XDEC1RjF+A1mA23Ydlw+yVsnByWjZbflg3+77Kx5rtsPOo58XVCmDI2y09VIr3Hw3AwG+7DsuH+S9gQ5VnEB2JjpsTvxMY/q03DTJ7fIwQ+h/3w3PiTVJzlpKlsLFQZBUZFAysw2JOfNOJ/eDECL5w7WosR+ML/JxcjMeACXZnnYqQsFcdn38/HuB/ig115cuSE/FDxS3iRytEqfgmn8RdVsTuXwa4gypWGjgxmUUw2DTK8aDibv31BQe8Rm9Jz8xbVnKaPG1EVO05NvH9Uq+wfbZjghcZGWsNMil12sr+E3ndjA15b/BeRZZqGQ2yAfq51lcuGasN+0Hrwtyp1xvYb2VH1m+EieHT8Bv6w2a/zG/g/zfjJnPoY3HCvRvPwD4QNOMdl9z9wJDfqpPzaYIaH2K8jBf782E+SIprKfJqQBykU0PoJ/RsGrTwv/zCtFNj5V76qWYZZ8/WMjjjNwRPeYjKJgXEf7BxQrVIBHs6hyTyANb9ioNUnuA4KhAr+QjVMQym0QCIGWvUTVpPoOlz9Av6fUbhdDpel/gjJI0KrRijjrgXJa4GTlwVF1NDypMPtYWSYVxQEFbgD/dEHKglI5joupfZpu3fz5ZifLHDFtO2r0xo8LlZB8aHjwo36utkfHCMVQsAUO3SBwNzCZP9Wc84/28Is6fewYZZ48F+mD6ICOcCB/40am+UcPjZz4+MKiw92DI/nFcP/W9Wi4QWdR7VaNPy3+L+qyHcKDmGM4lEt+n1fCs7Zq582hf8ftMErYowqbfD/RPaLaLuze7gi3+JJA4t8K/KiTf7xDotxc66Z5xi2VhypCbX4rmrAYU3anFmxltv/xRRnmQZVnkWz2+AVaUdHfOB+Twp2x2gU7kmNMD/y8WDswi4c4gZ006mSuaFlc6P0Q9wMG1K/kJwfiEyu7MCD5Oci8CeJOb6LXbcoeiAxE36ImOE0hV/MzT8row7f4I3iruUn6VgD0rEW2pa8YtLxfw==
- 08 oct. 2020 - 20h00
Visualise a vector
- true
-
iVBORw0KGgoAAAANSUhEUgAAABgAAAAYCAYAAADgdz34AAAABGdBTUEAALGPC/xhBQAAAAlwSFlzAAAOwwAADsMBx2+oZAAAAMJJREFUSEvt1DsKwkAUheEUijai4BsEQRsRW5dhZWXtSlyBG7NyAQER3Ib+R+bCNCqMd0AkB74ik3APMwkpqnhniAnqzyvnNHEPVNSAazawgh36cClpY4srrOCGPabQzpLTgQ19ZY7knehlljjhABt6xBkXjKFdJr34GlroQcdhBWuswpru6Rk9m5S4xAqWcBlu0YD4M11gENa+Hm7RGccF3bDmlqrgY/6rYIYsBfoljILk38O7WEmW4RYNzjb811IUD5GFMMTyMRpMAAAAAElFTkSuQmCC
- fbbefa64-f4f3-4da3-82a4-d5cb6c0a5158
- View a vector
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5479
5828
50
24
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5504.646
5840.744
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- Panel
- A panel for custom notes and text values
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5471
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160
120
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255;255;250;90
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- A panel for custom notes and text values
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255;255;250;90
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- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
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- Contains a collection of generic curves
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- Medium curve that delimits the medium surface (Radius=96.36mm)
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- 1
-
2726
1495
363
20
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2908.379
1505.7
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
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-
150;170;135;255
- A group of Grasshopper objects
- f074284d-27a7-469f-8393-a34c9d5c2b30
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- Group
- b7c12ed1-b09a-4e15-996f-3fa9f3f16b1c
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- Solve intersection events for a curve and a plane.
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- f074284d-27a7-469f-8393-a34c9d5c2b30
- Curve | Plane
- PCX
-
4321
1868
70
64
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1900
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1870
14
30
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1885
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4323
1900
14
30
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4331.5
1915
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- 1aa825e8-58e9-4696-820c-5a8f25e8c159
- Points
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4367
1870
22
20
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4378
1880
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- c4943ce9-3e39-4cad-a4c0-c9ed07c8d70e
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4367
1890
22
20
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1900
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- Params P
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-
4367
1910
22
20
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1920
- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
- Curve
- Base curve
- true
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- 2846166c-4582-4dd1-aa52-3ed58bb446e7
- Curve
- External curve that delimits the external surface
- false
- f56deb88-527c-4fda-8321-610c4e99e8e5
- 1
- 1
-
4025
1866
260
20
-
4155.169
1876.491
- fbac3e32-f100-4292-8692-77240a42fd1a
- Point
- Contains a collection of three-dimensional points
- true
- 31a12052-1d68-4adf-a6f3-63ae6e073ff5
- Point
- Pt
- false
- 1aa825e8-58e9-4696-820c-5a8f25e8c159
- 1
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4440
1872
50
24
-
4465.214
1884.746
- 4f8984c4-7c7a-4d69-b0a2-183cbb330d20
- Plane
- Contains a collection of three-dimensional axis-systems
- true
- 1
- 6f11cab2-6218-4400-b324-674c5a79bb62
- Plane
- Section plane
- false
- e07214ab-66bb-466a-9837-4f1e5f2d1dfc
- 1
- 1
-
4219
1918
83
20
-
4261.214
1928.746
- 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312
- Number
- Contains a collection of floating point numbers
- 46191a6a-a165-40b7-89ea-19b24224de29
- Number
- Num
- false
- c4943ce9-3e39-4cad-a4c0-c9ed07c8d70e
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-
4440
1909
50
24
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4465.942
1921.786
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- 1eb9b415-9485-4fde-a90b-92abbf37a1ac
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- 0
- 46191a6a-a165-40b7-89ea-19b24224de29
- 1
- Double click to edit panel content…
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4428
1945
133
108
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4428.771
1945.867
-
255;255;250;90
- true
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- true
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- dfe44c63-c2bd-42d5-be4b-43616bb3b22e
- Panel
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- 31a12052-1d68-4adf-a6f3-63ae6e073ff5
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- Double click to edit panel content…
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275
118
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1811.746
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255;255;250;90
- true
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- true
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- true
- f73498c5-178b-4e09-ad61-73d172fa6e56
- Tangent Curve
- Create a curve through a set of points with tangents.
- true
- 0d3715e2-4e3d-477e-93c1-ed252a9866ea
- Tangent Curve
- TanCurve
-
9954
1596
67
84
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9986
1638
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- cdd93d55-6a56-4995-bdd2-5b4cfe2f0b89
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- f67d0ab3-a108-44d7-a979-c18a801cc197
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9956
1598
15
20
-
9965
1608
- 1
- Tangent vectors for all interpolation points
- 9e470aa2-0192-4878-9c17-ffe90a4e9682
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- T
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- 3ad39da4-2fec-4071-b541-50c362062a62
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-
9956
1618
15
20
-
9965
1628
- Blend factor
- 51b836a9-8ef0-470a-806a-dbd20d88f4d3
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- B
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- ff01cf14-4b0a-4246-b83f-36c475ea8d11
- 1
-
9956
1638
15
20
-
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1648
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- {0}
- 0.5
- Curve degree (only odd degrees are supported)
- 7be2d35f-86e0-446a-908d-c9a67c7bbbc1
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-
9956
1658
15
20
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1668
- 1
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- 3
- Resulting nurbs curve
- 38c41b9f-3b5a-4f99-bb04-f1c98962585c
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- C
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- 0
-
10001
1598
18
26
-
10010
1611.333
- Curve length
- 56461d2f-b477-4956-9a45-825ebcc7c67f
- Length
- L
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10001
1624
18
27
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1638
- Curve domain
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10001
1651
18
27
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1664.667
- 2e3ab970-8545-46bb-836c-1c11e5610bce
- Degree
- Curve degree (only odd degrees are supported)
- 3021adb1-6cc0-47a5-9a16-cebc8bd8345e
- Degree
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- 1f6c5e10-0201-43ea-9116-6e77526f54b2
- 1
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1665
50
24
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9869.717
1677.055
- 1
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- fbac3e32-f100-4292-8692-77240a42fd1a
- Point
- Contains a collection of three-dimensional points
- 1
- 018cea42-f515-4f4f-acf3-f0485056a7c9
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- End point of the spline in the External curve
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- 93eed1ef-a3f4-4870-ad29-ffb23f9b8402
- 1
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6189
1645
239
20
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6309.263
1655.617
- 3cadddef-1e2b-4c09-9390-0e8f78f7609f
- Merge
- Merge a bunch of data streams
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- Merge
- Merge
-
9159
1505
72
84
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- Data stream 1
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- Data 1
- D1
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- 1
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21
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21
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1567
21
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- Result of merge
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9212
1507
17
80
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- fbac3e32-f100-4292-8692-77240a42fd1a
- Point
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- 2898dc90-85f1-4461-864b-76ddc8a889e2
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1551
69
24
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9310.442
1563.543
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69
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9316.634
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- Merge a bunch of data streams
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9218
1682
17
80
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1722
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255;255;250;90
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255;255;250;90
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255;255;250;90
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50
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255;255;250;90
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7dp5OFT9//jxoVJ2SVqQrEmiSFI4YyiMbCFJZSuRfcyMLQmRiizZC4kobdqRvCm7iBJSloSI7MYav/e57zt8Ot2/z/X9fv+d13XV0+M4cxxnhjnncnAMOBxuDg5adNgY4X+GB2ztnJzVnB0dnZ2kNh48QXKzc3ZSlpfeLi23DY70dgWpjWoUBzKFdELZ6QSFTLJ0kNqoT7FysLPWPuFp5Gx/Aq4tLyu7a/sJRQVrBXl5eblty9CvsOqvDUtrnHB2PEEmeUoTSCdclsLly6l/fw0WS5K1rR31hNxxR2ZnlxNOThSSldvS45ZkS3SlFStWMKK7x7UJh0MfxVy6jI15CfyAE/2vZBcOxzjly4jLhx9MzzHieOBCtVfOg5KpK/YlNma8K6qW3Ckxe3f3DPxcJFxHFncWh6+H2+JCdw39hz66cNPCo9etfHDMgLVuJZjFcQUwCA8S13uuQR8djT6I8Z8jhu7JjV+Hb34Gkd+X/LMc/L4kDT4WH5N2ro+tDvm9wQGz996MjmD6kmFCI9pxGlOPDWFSpdo/MY3RCskb3TmLaU3nqgcefHOY3pymbmD9iW3oysYybycc/vc+/7JEf1M6tpkFo6T197AVVubFRWVhS+x3CGV/gq2H6heO0UJs+bW8El83YzurcuBuqg4Dpgy4q8eU87HdpSCjs20bI6Yffvg+e26H7aPWTDlpD2yNtoU7VHljm/itWCvRB9vND3I1A89gOyXfRpz8Q/2VfIiOvtiSL7Y03QnClqJyqSc0FdvmVz1eUrxLMLVY7R8qfR7bRwHlO1XHsc3pbLg1JL0UU5bbHeoFRGz3bqlm8dmPbWTJA0czHWx9329IrvhDE9Qu1yjqYvsgV+HoYwNsm518zqYfwpZY4yUYaoOtXJXuPdN6bAPIypbF+5ZhGnFQPtUuG9tvI6uEXwxhq2rUuCOagwnTgnDmjNrV2NqcY2pxWYftqNXeXDwftiY8+dkS/Ng6jSJPkv5QEZtW2moBbLkNsjVnt2DrX8y9D5+K7UxS+EaVsyswPSd+Y+nVEU5Mmw7ovbpVvxJTNm3li8LF3JgWNndQrZRWYfrIfI/MEg9sZwTbX7yPxpbNaW2HRiK27yqo/aLJ2GasfuS26jq2vI55X3X/0Gu37DqC/1By0e0vM39o0KQB27U0bCW4JNPYHmNb3yFx8XAftpkXJe42ifJgeg+3ivr1CLYTIg+CXnhgu89qtuRGELbEl3s2+53H9rpNSWH2H1rHYnB48A/dmGB7yTwYW1ystT7/RWy3JQa2Rodie+NaleSFKGxFH4t5OL/BdudX3ts3l67GNHRM8YKHMraN58wahQ5j+2hmSiHMFlv8R9XgrQ7YPhKMk/npiC2p6rFIpxO2sowWQlXO2M7tyNnO4o6txbBb7oUsbA/+1Pos0YNtkt/Id1UhXkz5j5JMBZSxDdH8sm2ZNrZ8Uv52EwbYsix3GHI1xrb+yY4D+gex9Toz+UjaBNtaRTZK7yFsX7r1dJSHY3ts9NCh3jJspTlYyuIZ1mCaRo0w274H22ErSQYGZWwl/Y+Pdv+htYaS4R9UsA0oNjcKI2BrXFT9mZGIbdy3vB89h7CVlmjgzKZie2W038joEbZ5qUztIZvXYrqx5h7j7Jp1mPqti93RNroeU7uxY0te1fJjShoNPDKlKYDpg4/ApcwGW/uNMwY3bbHl4tS+yG+H7dBZkvihP5TlC7vslT90eYWQ95lT2CLeX1ZuccLWxe/KEz8KtqLKEwNi57Bt9QloupyPbcIu2o0rE9heXvtAZ45pA6abBLhHO5djq+alqGG6AlsXVcuEN3+o5Id73+JZsJ3rlQrewYHt6Rr8T7vV2E7OFiRqy2LbJh+f7uaArRSTXe2mDGwdPk4EvxrH9p10pHyYhiCmH4zU281isQ3XexxP+4Yten11UHffM8uNzHgcl1HNC38iKP4k/kVYkBlPDZp2So80AbzSA6wdAsz43N79AuNDFmBrls3Om/zM+EMRwxXx622Ak1h65TLo7HpH7t77tiDLptbCho8ZTwxoYVVSswdEyy9jJeuZ8aczh6+GNDgCthZJvmRor1CF29dPO4Hj6SS8OzR7RteDJ0LOYEVS9gk9aLmsyAdlJc6AP3u6cg80D4vUphlWF8Dr/qlhE3QrNaSnRM4FhDsy5q9GH7+dR0nd3AVE8LtsWgptZVEjHnTBBZzs3Ld/dB0zntRRfDL/qQvQ3w36O6FpimsikjtcwOWB6IIG6ERGH7Eublcgf1rNqhJ6daLTyjiCK6jY9ulGAXRL2DpFJ7IrcGW9PP4U2vlUpti3m67gAwNu8z1ojWynLNVGVzA+7cmTDh3iPURSZiOBZaZI2A10e/FvLHjFScB5xfezydCEOhGR9XgSYL8f2HUN3R9LgVOWh0mgINvoCuo8aT+l20dJIFXvpypqcmAeGLIggRtKZ4avQvds0MTtOU4CxR35FagfJJ5Naj1BgtfU1FTUaZfEbc+dJIFJ+9TTqFeHlB/bbAcfX1djjJqQG2hcfYoEwsvJMn/5VhrVzYEEToiHMaP2MXz2eq0TCbw2G3NNgJ7KXM5/n0wC3MaVX+Kh3XZpVu71JoFLUStMUZ9+dFe+zY8ESpaf0oiDnuxegecNIwHPhhzDWGgKp5W24TUSGEwAPjHQLBzSPgm3SUAyeHLjFWiOHZuDl7aSgLqA/50I6BSbISUVHjcgaVyzNhLaP4E5hpvoBgb63gehTtUxUcWfdQOCBKFPUdD8UpsfZT11A7N3agTR/Rl+cHhattcN4LRiXBPR/T9YZ2gqRAbceFJqKrSsg/Q7mYNkUK/Z+eYOenzPB3wPvkgGOxLLex9Ad4Yb3aWlkQFOntf/CXT/k053BkAGmnfbr+RAM2q8X1vUSAYjBpuacqEddRJmlVvJYNLz+6Y8aIaQvXEPO8lghZaKz0vohuNVBoJ9ZBA+l/0Otf46PPXFDzLYX3JHIh9acspb3mSADLy/8fqiPh66PWJ4kAzU/Q5kos6OKDUrGCID/w13P6BWtRxiuzxMBiFlIgwAWpqnM81shAxqxb7wos6V3+DxCrptSboUagOvCfXNo2TQYU0ioK5M82INh15Td0gHtdiR786voR1EVQ+hdugvfEeD5jHeYo2aYzPjDskxMsjWXO2E+uQWkaij0Af4GTxRvwm+MxwOzVPTH4B6jv2aXhH09GyGLPrzk6GScGZyggyq+FS+or7FVMqydYYMlts8iS5EXy82zTjzOTLodFY8WgR91GBMip+NAqzGK1VLob9+bCrJW0sBBVcQ9Qr0+ONihtTEKGBm41P5evR4pZQTpg9SgNC1l8VfUZcZJJoGUQDBkn3rCPSL7y271j+hAN3PP44wwt8PCaqVUju/UMBO7yWj3NBaT8JEE1ipALfshawYNO8Vw+t9clSg5VNJVICuS4l40GNGBbYqnOFE6Dv2zOUtZ6mASd1P2xz66ZSRllkqFYgNlsXZQX+sjZE584QKYq4OS5KhTWUsNJqKqKBafo7VF3rqWh3et44K2ArSvM5Br++TZ9H7TAWBReWTF6CHST9s+r5SAX74xcUw6FTeTZtMe6nAq/v1V9T2ZXE9b6Ff+H1WCoeOjW3y3NdHBZLvl8Wgfn5/RWMeNKtHwivUBSnrl09Am6rLDaA2b0naLPeDCnJ31/BFQFO74hAn6MinG2RRa7lFV1yCXr/bSRM14bDTgdvQt8ryj6H+xCraUAJNNOGkoC5r+GjWAX18wOIS6oOP7ZsZ+qlAO+JxCmpxjiYzQWiRZk2jSGjcz2t6rANUoPhTcPkVaM7xe540aNJVxVzUG9T7mtoGqSCj0WljNPThzuXXnw5TgZpdxvkY6OQCccXzo/B43ugeiEXfL9xk7hnTqCBt9nRBAnShrMrd4Ukq4Lg0G5UIfbKc8M7/JxUMmsY5XoeWkNllzMTgDm6vcDF4jj5f1xpfagq4gzZO9Z5qaOuGNwUMO91B74RC2DfonGibzlBtd1ChRjiEg+9vZ1rMn+2ydAfnRAqj1kEvcxeuEHFzB+26sely0PwfvPki/dzBN+VunC76+evNlyTC3YGZYv4FW2iW5zs/vE1wBxOcP24HQE+1mK97nOIOikztD0VAbxO97yZ10x08OR3Imgztf9dt7c0Md2BquKz2LjSz5LDjxtvuwHFjMngMffSwkHkrtFqUz/1c6J+tnl5HM91B6yvr5ELoc0VBnFehP1qwHH0NPTfj4pcJPcXzZH0xdC/xePtTaIvpk40l0GdTXOReQjcs9X1eim4vYPxzAfQ3y5iYMmj5ih6/19CptPuUcnT91yeFi6GdPhA7UTPXvx5G/Sm3y6gCOmNwwK8EmvLavwj1HG7wLeqSZ0YzqIfKhmmoabfFd1RCCyveYi+Fjr0+YY8aV83Fgzr4m1kw6kJhwzWoXaRBGuqzYaOrUR+jCBcutrVrXfNin3QMmlpsB7tda94s8gs793tvF5n11DO194t8+NTYx/pFlnSuuDSyyFNuycpc/Auu8CAPSC2yKd/hJ8nQvv+4+yXiyQ3Pr/z+MdVCTCVQYGH9Q22hUvrwfMznH++2oK3nE1r4/Pq2Y8xdwguOxAf4V4osmDklYzpLdMFnGd6QY8QWHJGtoMAsvuBU59RJ70V+Is6Z17/ICUW5GyQ2LdqelY2f5SLb4Lg7EhaZQao4+vkiXzPx0Khb5J0BWyYHFznLkf/A3CJLHmK/wy6xaP8Is0v4F5nYq5QguMiDV7y3iSxynFJuifgip7AT725a5MyWjxESi/zkgZ375kVmT9r+fbFPhkwekVzkAq/Ct4s9UmDWt9hiy2krtkBbTRXz/vV86oSLocYllf31+bWVnqqoL5vX/vX6dtK0Poq6sbSEE3VN8X7Pv9Yvg++Y0AKlAg9R2zs6jqI/LwJF/d2ovyZ01qK2KAAbpdD133Mlo+a+3NuyFXrGKX8F+vMoe4YrUQbaWXrYAkAzPZQ32w7tV3krHf35P6s4rbMLOrN2sPkytJnuDxUE2iQykLQJuoezRmYf9LiI6Fpf+Psm0PbYC0volbeiZ9rT3YERZ/f709Ajd9ZLWV53Bx4rn3XGQh+X3b+vKdodKDTpxzyCPvVgx1bPS+5gb0Nk5BvU74RV3XzcQehGBN8F3Y1sr460dwdV3Pefz0H78PQJNJq6g3h5Q2TtZvh5b6pckbo7kHmaIr8Nev/57NAVUu6Ac3mdgBL0xc5O7XxBeHw7DxdrQJNy/W5ncMPf70+NFQyh893LTbKXwuMxZ9Z/CLphj8+q1/D94QAtPuoYtOQOzddX4fuJne3JLceh7QYuP8XD96d366rOoVa35+OohO9nT6SEW1Df5SbtMIbWeGajcAJa8ztVohW+H1bWP9dBXXXV62Yh9OEfy4+jrltiJpgGvW/qoBfqNQ/XxARBb1ueHo6ax7KOzQ66j3k0HbXLSqez2tDVjKovUcsadgxuhfYca+pBXXH9be0wfH93eunCawPtE7U9/Tm0/lFGNdRVt5mcTkM/5NMaQ30+YHloGDx/SLq1P+Mk9JMlYh0p36lA6B67qS20iJ4P6XEPfHxpRJ4dtNBK25D6b1Rgv2mZoD20th9vCK2TCnZxOp51gG7Utzm1qoMKeAp11ZzR70/wCodOGxUsX1vNQIK+urSH7AXPbxxyePLI0Dc+CFpfbaQCdcG1dy9Cu8ownPfIoYLSTHvVZGgx7pN8t2OpICjmbfkjaMHhTqk7JCrIey/gVAL9sMnewkMHHo+VgYGN0Eljx9OmxKiAQZnFuAd6Z/L98thpCpBbYW84BZ3HalCeX0MBzu/EopgloV2v6C1PowDypp+Ga6DxXiJrC8kUYLTzqNoG6B0XFD52H6EA/i6DfFHoW6rCc6nqFFDkV1UpCd08EeLetIUC9G6/btgKrZ/FaWghSAETfJPF26AvUSZt3nDD89eLhFg51JXuV/iYKCDq+Ob9O6B3v3xZ2MdIAQdXyc6hXsVlZpQHz38PNZlnyUOrHExRuQjPjxFuTuad0PXyTq8Hp8jg86l9lqg/j+LaD06Swer9TDmoNXhfxeWNk4GlRV8H6mPTjiYDNDLQIz3hUoCOs0uZEYKuu3xMCXWD8eZgI3h+vs+DxRZ1v9su1vPwfP+5SdwV1FxzQ+QceP0goLACoHY6urG4F15vGA3/XKcILeZ1puYsvJ7Zq3DCcTd0h11xG2cXGSTa6Ofsgb7o8e1CHLweKt/9edk+6NaioPg9d8lgwI16WBf9+gdWx3F5kMHSom0fjKBDGHn2qRHIoMktZaeZJPr8CfRrsJNB8pb3N8yha8MLDq1sdAPcw4e3WKH7N7oqvDrFDazn/HrvOLTgeLAam4MbmP4eufcE9LV7Vt0JO92ARcbImDX00r5KyXs4N2DySksP9eDDd2c6O0kg+l36NnR7+81HX6tUwuvzLp54C+hTNtuvJGeRgHJ7ShX69WcKB2ONU0mAK8+54xi6v1rqJ1bHwOvXfM3mo9DLYovqPgWTgP7pV6ao2erqnyH+JDDx8F31EWjZjnildHi9XK3gqoR6JCeHgZNCAjYShBH0+70gf8P9tSsJuB1XvIV6e+q9ax7w+ntpjbEZ6u5o0+PS9iRgskxAEzXrWpsGM3j9Hnq9ZAfq3gkH4wvw+p4z8YAQaiZlpZZntiTQHd/CjvqHDOfJjpMk8Gpu/9Rh9Pi9/Tm1Enq8PLEL9axIfTxiA7/fAwhArcW2rCHhOAlkJ5yKRd2jXa1KsyKBQB9BZ9RzlBuNBpYkoLbHwtwYWgQvcNRfigQcWlqD0efXRmfpbvZJV+DdzFi7FzrjUoSZTIkraC3O4lCG9vCM9OS54gpoiWxJstBFm52P1Fu6AquBQmNx6EOndlKyt7uCkeTE/nXQyt33HgkxuIKQqE80VuhXTw28et+5AK3Qswoz8Oeb+K21yzzdBah9NVfogzbUuL5ewNMFSFQdqWyC7p+VnwW6LuDWLqusUmgmq6uuceIuwAJ/hRc1642KrcZiLkDIxuY0+vvFg/9JEreoC5jh/fSlGJrLavJVjbAL0Lh+MQr1qvXx+TLQAs+FNVDjTgV8uyzkAri0UieLoKWCQ5T7N7qACtvoTNQK/iGmROibBhQz1JEDL+PSBV0A7/0jbKi5hS+UM0InJgVVvYJuzxHxdOJ3AfFhWZcL0fczp5cSTetcAJtfk14BdJbKwca9a1xAuJX0u5fQHMsDFQS4XUDvXn+jF9B+qlkxo2wugG9LfX02NP9Iw1jlchewetDn02PoFQa7bMemnIF1nljbfWhfl7SOA13OgBZW1XEbWtRz1CKr1hkcFxboR38fh+WomNrfcgbdtQ7j0dBNKWsNxH2dAVdSHi4E+lZ3gOYXY7j+d7NVHtARLwV3mixxBlq3p8XQ90cPZgbhqiwnIN9wdZc+9Fo3eTa1Y05Ab/enoxLQM5Oxn6VzHEGgKX8ADlpmZl/6eh5HELrW/FYjfP/PAw/smJwdwFrH9uFg6KsRId+aRe1BH95BWRG6z1l//9MmO/D44fT5Hnj+uCTpxNWQcFvwLFtQgAj9faJNd8/MCRAhd/hRJjyflcpJudNz0hpc5UzTYIV+3jj5Jva9BWDm5Gy2h+fHvOObB0LOHAEZzhdIb+D5s6ptWFWPsQmo38C2Yit0xfdS+31bDwD+TMrWZdBpng2fBb7qA2Ju64FmeP6dTy278n27HlgjR/R4Ct1/OuJkfOJ+APxu+t2BDjce2BQ4oQ0G63GXUqBXinV/czHUBoqyR6JiofWAf8aR+0Rg/X1oNAb64Kqb1qxpRBB547wx6tQVpYK58URQeljgWTT0ueTuT7ZhRNBWRriMWrd06GJdCBFM7rS1QW3XPaWIv0gEq26GqqAWZ1zac+c8EQgfuS6Jesu94ALLICLYtuoxL+pXBuxxawKJAKkoZkQtPRXhXBVABAbvVwxEQV9+e/9kkD8R8DQRP6F+dNjOGfEjgsqJi6WoVXRioyZ8iWCXZKMHaqVTPRvavYhgyzZ2SdSnMjWEqihEIDu2+dMVdPuh5gk5LkTAcPZNciR0rEFyiNMRIjjYO2gVAb3BhKa0R5MILtZHiIZDl0UTTQR3EEHW2INbodDlde8pY6xEoEWYFL8E/TVDXVuqQwuInyIkB0O3lT/DF+ZpAfyl4cgA6L5T0jl8TlrgR52Tyxlor2SmCCYhLXCuzWSnJ3R6Y9xjxw+awPOl+pHj0P6S9+oaMzSAzD7zU7rQJQfrt6XE7AOPkpSXKUATFQxdTRL3AmmCQpkgtJ9vN3vOTXXwdBnhxXLo1/fLRHXfqIEPke3e/fB67dj9AKZodjWQymkn3w397prFua0tBLCH4NT+BbqZ30LzZhYBjMYY+n2C/hKYcWPwHAHodBL5UJuRiqPl/Qlg7pz80yboBz+CbU77EkC72So91HYGCE/xaQJ4r83Ij/rtWkV7O28CeLmyv/sj9DbtDEUOLwIwy6x/iloszc33sQcBVBCAP2r5fJXiQ+4EYPk4TQ81Jy7Uf5ZCAJ8mgvhRX9LSfJ5GJoC2Qk79Ruguva3Bys4EYPTYJqAB+r3izQ/NdgTgM33xWT10RpF0QuBxAlD/UcP/ATrL9PXKD6YEMOFg5P8eeiLK9hpBjwCefeP4Vgsd7V7HUa1OAKE3HbKqoQNHI490yBAAv2g3tRK6VnmK5sZHAK4++3eXQXt15oR5LycAlvcRhBfo93tjTs3zuSrg+6Sy6T40Kz6NWdtZFej4tDZdh8Zf3ueQIa0KIvfnrAqCzjcSSj1zFw/u7WrhsofOvsSlJqaNB7Lrq6z0oEWyra9xMuPBZ39mkhy0apoT6WkIAny+SEatgW5LMhFOJCJg7VZ1o2l4fY67/rejvzLk1EF/Eg36y3XpzaseQKs/PO5zvAgB55xr8RegI96oxg8cxYPbBEq1NfQ9VZubLo14IDeyjAkPnVW4d+n5i6rgiBGtnh/6Q6drgbMnAURldmVMboTbN+o+fchWDSyr2FnRCP39SPHHk8HqIDGDoJ4DnV2glLy7fS+4MNjjEA/dkpStexHRADpGecGnoceV1/CRSzTB738P8qrd0DXny3gWvadOdHurCnp3Xw3bb3f3vWBbuLuvra5BV6Pn/UrQ+ffdfZljksHo3X1hbIvu7vvf3NGH3o346w6+X38h+/WXLHQnaln++y2GN+E6XEsW3WJ44P+wQ0a4f7/FMNDcXf9L7sh8azSqJdetmZ7vV4bjQpv6Z+Zr68Kc/N3653z7Wu7z3/+4UNqLyTXyxbPzXfpC47yQLg7/qxxxkf63FBnmm2Xx/TqDGON8DTYTwGGuJfMdHopvfjy90KjcoWm2b0vnKx+gtd7m3bL5HqO0WiqxM8036CTlNrfmQuu1U3aBlwtd16xPcY1aMd8g3dEKgV7O+X4ei/i6t3LlfCWaE62EnnHPt7pGRDhsy6r5/n5rTyHQTavg5Zkvx4sRm7iQhZo9i9tsw7h6vrceKvfJeSx07G77fYb+hRJunXd9a80737BUqR2JHxe6U8h39TmeNfNltpAIGt++0M9JtbRTegut2jjilj+1fr6nV90XHqnhn69EzRHds/sE5mvoqxn/1XqhZ6R3dOzzW2hdCKsXe95Cz2rl3kzYvmG+//YnZPT1zc7J38Al8A4JHW45RPOpha/vjWoiuK3IM6PulMK5ViQoNKvzQVcLwhWZ+jn1KAHJV0q22jXUhXjXlvc93tSFiDVbJmUKGSMjo49jHt8bRA5fU+iV4xtEWpyY2fccsEWOkRQUN54aRng0mNssyoaQuxEunGVPHJGAz6tdM6JHkViuhoDGthGk0nGm6+NzEkJDOsmvlo4h2Q4+iSL7R5EX1ddowufckNUfP8mkhY0hByt5yarvRhGDNxtFT18iI4f2rtLwuDOG6P/Yycf8YxSRX1bvFV5ARlKXfnn1uX0M2R+wVqRWeAypnAr95LGFgsxOu6i4zo4hJ1nemFcqjyH1DcfGiJYUZDjw8FZxQxri9OaO2/OQMcRI/5T01BIq0qu1y1YpjIZkFopFZr4c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- 00000000-0000-0000-0000-000000000000
- deaf8653-5528-4286-807c-3de8b8dad781
- Surface
- Contains a collection of generic surfaces
- 1
- ef73dc49-b638-45e5-b651-690069a2c4dd
- Surface
- External surface (Radius=96.36mm)
- false
- 0
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
- 00000000-0000-0000-0000-000000000000
- deaf8653-5528-4286-807c-3de8b8dad781
- Surface
- Contains a collection of generic surfaces
- true
- 1
- c92aaec8-ea9b-4dfe-9793-ff203fe08983
- Surface
- Sphere of radius 349.82mm for the internal surface
- false
- 0
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- Surface
- Sphere of radius 223.09mm for the medium surface
- false
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dGMjY329JZ7NL4MZ6+vG9jf/OsxYX6c54IXkWcbtOspDL0wpDPMe2NG85SnD79vGmiL7Gfev1tn77ASBZ8rzFnzpzOTimVp/w5Dbh5y5DJ9uaPpxToDh4E1rj3gsYHj5m1oJuYUML/SzvvF2ms8dfvbTXJBhjQIns4Jpvnf/7RFOIcb+cF3tzREXYty+OqP/mu40p+17X7F6mh2zeh9vnmaJku4mr2nuedTZHjpt+2H8E1u2T7ud3VG8K3yaj58zdo2Ytv7P5bVSO6fd7vnG6c1018V+yIuc5refqG5R0/xxY7z0LvBWL6m/zFHp8IbunVGGanQ/8/fpiganOhYsonvWoZ0dseBl0R3P6O8/+XcOtR0AnzXvcqC7dG3fiwRwbzLbViv6+VCs+uwo2CcvLn0FuJUUXJcGbj2y5rcZWJ+T+/gDsILJqLE62PsdWXUEXPXx6u1eeH9MEUGP5YR58NERdyE/8Ov27Q8PgLk2+gSEZlLRtTl8Sm/AcesdC66lUxF/6i6DZSI8+FjNimhxeP/dJ1kfGQBW2LnA/cVxKqod8lyWDX77o13YJZWKFiimljwEhzmcUik9SkWpgot5msDrLCuyrMD7GzscO8GPCgxHXqVQEVEwKn8AbPBug4EfOHtXTcRH8NbXv4i2YMPh01afwdKShy9rgkdHR0SHwQ3sL0UFwXMTberpXrSrbGQe2GJl1v6vYC3hvfVc4DSzLr1v4Bd+uvmT8HkSOk/+A93r8gajRsHFk+65I+DlRumrhsDGclnrv4OpD5aIvQcX/OK48wOc7eR0uw3MZ2QnNwYuq15hWwdmU9mb9BPMc/D983vgh9ZaqgRRHvw4MeJzHDi3of0JJ/ipqeuKleC76ak+c8A2Mg9a54M3tDe3S4MXxy5YIJ0Ez4dXgooB+N4bKxPSETjfdLOdbcEiT9oXSSdSUVvRoqOF4E1u+21mHaKiAd6n0b/BhEmddI19cP+jBEe7RWAXp93pu+H8q8mw2w2+J5T45FEkfF7oZnjkg3etNuRo2AGPB5HKa8GZdrPXXQiD14/A4MBrsAbmyc0fSkXNBae7v4GXau9pCQmGzyOOh+e5F/PgfJ5CWx7A570e9Wi8AFjnwZj55wA4X1R/bhEDG68/HyEE5ivJkFMAj2xf/87IH75ftYkSl4Dj+ErZ6vzg88SaOqAOTjzwLcQFvE8gvloH/GxnpOZnXyoy4XFeqAveltpl3A9Ok1JxpzvfOMvyDfiQw+g1utU2F9i9Ast5VP2m21ix3KkJLJ+cZKMHTjso7FULvtC8NovuhQ61gQ/AtsEvdPTBo+NRMWSwTuSqp3S/SwpLuQTWHrvhbwA2Vy/PPgWW1Q0/ZwjexGtdFgM+O/691QjMu2R+pQfY9cRSXmOwQunvaksw2TN99zLwTs85Tbzg3rqRXhxcc5KnrMWHigRnOduZgbfkVfnmginW+/YdA19VV7+T6QbHn33V+1bwiYchcyY2U9Gy8ZTj4mJwvnkmR92wo6KvF5or3MAKoejgDms4P46I5J4FF2hbLb2D07+vesxvA2sl2pl661PR5ZJCu27w5TMH9Ezg++Pcj1yxA+CLCjv1BHTh88JpIOsLWIz4TuOdNhVN3ixX+AZmS9MrswVzh5gW/wArDh2/TdaC71NupzXGwafHn5hLgQPENPh/gYXUUrf9hO+vFc+Dh+i2i8vc/xwcf9ep8Tf9dpOXacXgg8F2yyfo22uNyz0FPiuuVUK35OHlhfFgvfrfUpPgI5rzr+4Ay2+uOUa3NP7mhjt4oC2GQBDnwW+JVd9cA253lg6h+3zxbYoxGIu9oMYOjpaj0L7A9/eQjpcfZoFXvue+nA9+T7xbyAneULItfBP46KJLhxeAg7Zqnf8O1xMrWk7ySYOLMq5kJcP1xvPraRZq4GLjzTViSrB/jbfIVmCK37VCQzl4/q9/uu0G9u+7RjSRpCK/qrm+UeCC6Nv2Movg+9DI2vmXwMlEo3vtvFQkneS26xl9f/dkUFZzUtEu8hLL7+BXy9Zgtj8pKETCxngSzOl3sib5BwX9fLGtbrYED24VF9nx6Btczy46/osXfGhQ+sXEEFwPk/sFF4KrDK0Ms75QkNhXXiER8AHJc/FanykoNmbF78Xg4fxV1x5/oqAxxy1D4uD1q6TShcCzt8h0SYIbrxsaun+koMcKOdXSYFeR0bSrcH23b2VQsSw4i4f8bBSuB0We9B6VBwt99KszA58R5PUngQM37TqQAtejnSKzl+nR97d6c3ZvD1zv2tPCzMD7fJama3VS0F5ChuAa8CKv7/KBrRRUqOli5Q02COYp+FBLQcldu95GgDmOPVBxrKCgHeeOqewDV/jKRqaUU5BuxIn+NPBb9bv3q3IoaP2X34eOgW9KeOwmH6Kg8bUys0LByxsJwhLBFPT1nMkGN7DikTNerh4U1H01ZocN2LBV6ULfRrieLr4hoQ4+Ur5qT+IqeHwLapeq0Y/n6Usx6mCC9saNqvTbjV4cf25DQbYb1oeqgIuaYsqjwEpj1hNL6MfjyDuzVWAz/o5EujVOm7+QABscmitMt/f14wFDKynoWZbwT2Uwu3wLfy/4ZLhYB90t+k7kV2AZocU0uuORxJYGsON+0fN0S2+rY68CN5TzH6Jb5vHtixTwYMksX7oJVwdsr4JvhPar0Z3lfeJUOthkY9k3JXBdhfFADDho67ZbdIdFvNX3BX9IJ/XTn7/oX9fulFpT0KoKMq8CeH6/74EJKwpCB/k15cCx5w4kWIP1udLDpcCR56lvu1ZQUPXzo7liYLZUW4edFhSkdvxxCf3190hoqIbXnIKEm7Ve8oHtP3Oj5cspaN0TpbPcYCXT+fsil1HQnuvDHARwO8ed4NKlFLQ8wKllkP76r3WTV9GjILL4Gb128NjvyZTbGhSkKKi14BE4KTDvqfMSCprLf680AswxP6XvkiAF5ap8Wy8Arhs/YWLMTkGPblx7nAbvH2U8b55yfCGjZRkPuTaBl83vGRzvJSN9113yQuAvHJelj3WS0beKzZYN8P6r6h4skP+CjASSjSqv0N+vH6tfv/KMjN7uHLY8TH8/F4td1V5PRhb+WjfdwOWXXJO1npCRjwgb+xbww8f6cncfk1GC6YD1JnBybYaLFfh1wavk9fTPk4fdRs9ryGh7zxF1u8X081tdJhuctNn8qS398y8mRssVnP+LLWQV/fNmTa6/Ath0Yz1mA/bVDzpEBAuccuZdCQ4X2n/l4yMyCjtU1GkFNot7/qoBfOK9wAq6fVesDKgAv6F4X7UE3x9oIpSCGxRKFtJtggbS88EjDz7tWgHm149fkA6u9FZ+YwFu9VE4dhhsQNxmSXeMfdXcKHCcsdaVpWApxzsvjj0kIxPhyfla4GrLoLMXq8lIM6suTBHsJv/Kl/aAjIwPhhjBV0R8OBv//bmSjLD5i9jZwWufpRyVvE9Gl7Ue1wzC94/NPA+k1tDIqC7ai3sDmL9R5MGTEjJaVVpodRu+/zzuCpa1Og+Ptzw5kf59yn2hlXHVSTIqtdtQcAu+/54b3hp80xH2V9bl1Xq4XqHqudnkS5FRavtrxU/8cD4mP/yc3HsTbT7EJy41jwcfohrt8A27ibZ2rdm5nhuOd0+VrM5EOTr8yFvz8Cw4n48c/zGYUI6+di6u3vyFiF/Es1dqU0uRX+HirVodRJxgdl9hd18J+r6XI4T3MRHP/3SimVPwOpJdEGr95SYRj3yYEfnyYBGqmVQ513yeiB+1UjBXf30RbWi7+fnuMSLucPiTTZJhAdqw6vCGS9FEXN++ryn2RB6KCzYqzfAj4qu+lniNt55C11rLYg7D9WTY/aQFnIknUdd2/2+Tq4m4ruvJBFr3MbRxjOtBpDkRv3W/zyg2IhFF/ginDRkRcUGjoThL0gGkbfzaQE2PiMs5XNO2ndyLaj6z3fHTJOI9QT6hQ9d2or5BslmhChGPetVxL941BH1cIOERsYSI/zbPcNsgGoj899Xtt1Am4oc3BT7MCPVFfsVXzy1UIuJGxTLqL2u8kFi8mNYeRSJ+3XC9w+iIB2pMzajogetjt03jJsIy7sjj1mI7G/CrduHvurauaHYlp5kB2ENYm0pd4IoUvnzWkQe7Wkr92HVjKzLAXykIgG9PBu7ab7IV+b+qz+UG71IsNuCatRU5RVeKTCoQcWu9E98THrmgF4qU1BFwl7pk2bwUFzTiqFX/Bdx8kOd4Q4gL0jtaxPMRfCCzKzh1vQtKe6Bg2Qe+c/bM6vV6Lij94HBxL3ib8NFfRVouaE18pRDdkiWXw7nUXdCvNYf3vgOLiF2PcF3igmIy3fve0m9/dGBJBckFxfeqrqVbRCX6sIycC3LUHKD0gMXkfBLjpFxQvYVfYje4wT36qZWoC9p28YrTG7BU5dIyXgEXZLTgqspr8Jk5s3Re8rgg/s0v6zvAajdFNQJ/bUHLMrlD2sDzorZcmTO4BV05a8D3Elwr0JZZ1rUFORU8lCsFX3+TvuvqT2ekec3fMQlMCe0euCvljPq5riZ7gkvwgWRpOyekmHhYQxB8pbLklGzpZnS9x8CkUp6I18za/YFgsQmFt+xLDgTzRGaln2TbiPKuTT6lyRFxO8zGPn2HPXqGfsvxg53XEFsF76xDasa6zfaycH9N+YZbd+yQxrCd9g8ZIh76XJ6t0sQOJcYuSMsCJ17pS1X7uhbxLi2/aASeGxuQ/aFtLZK3yX+oBo4pK3Rhf7kW8Xs79MqACZICI+9frEWv+SU4hMG/li7SKmhei3yX7uPnB3v5B5LYwd0cryXmgM3PD1088Xwtqr4qp8IJnlUtVroZbHrXVYsd7Fq/uswYbMifYzApTcRjo9PaVMBJX14s+wVm6z2rqAxWX5fVNQ5e8dHkmRJYt8wplm7l9J3X6TYTlJCmm0BbXUn3kqbXFT/BUS2yL+jeevy8O93Rguni9O0dsPOeRfdkVn4W3UEyn83H6La9m7oEfJMQeWgUfOYG5qwKDn9DePSDvj8/VcbUwY3PJW2+g3drvtTSBf9YhtV/A2tkfis3AT945GL3FTxRmLDfGvzhSkNiG3i2Yg4fFxyfrlWqNZVgPx8nRSIc38dCc2cX0f9+pYCE/eu1aOnTWRf2gH2urzHsGlyL5LDLkavBRdwGmlt47FCKgIm9BDgf+6jer2WHTm9ZbeEqRcQH1xfMdn5hh+5fHw65KgnvT2znvUWM1qNhtZihcQki/gxvPFwcugE59Vc9sgZ/W/7jm9uVjWjbwU0Cl8SJuEvD22TOw47oz/9e3PIgr28yhj2W/jtrOc2uZfRfg/fO++PX4I3z/vuvwQvod5o17dfgfsy/+v5f/xo84N9/DE7YJy84riCxGP+nD3/PalGQWDLV0eiRRQFPVab6kyhoMdHB6HiaTvCxD4xOXN1eWcalOlWOziH/38aM8swPWbhiO6N8ywbvpFxiVCgowKuli1GxM+/nSQmpTVWm3uemzypGFSd6XUr2M6qm5jX7J4VRjVtxmknVjGquyHeSeM6ojkvPNdPPjOL3ugjPndSnqoIF2O1epDFV80nPrzlfGc2ftNytuElnqvwtqglJkkunatCSYBP5FZ9qrrV3b2GB6VQNvMXrtAXMpuqi+qTaQZVRxVy9g5I6jA7znTPrN2L04LdIWpQVoyKta0zmODBadFvh1mkPRrHc33pqoYw+2/+8FO1l1Mv7ioZdEqOj1vuvdmcxmqS6WTm8kFGH3Kp+42JGJfk1CjnLGQ3IPZJt84FRrjum+1o2mk91b1sFjXrbcqpPuz2PEIKsp7rL++YXWcuVU7VV3Hq+vJTRyk1Evlf1jE6EuKwIaGd08e94N90eRg0SSvdMDDC6PY+79NgPRoupWwZkOG2m2t94Q7JcgNF/+/UI/fw8cMN4z2dyNRZ1Z/H+qFN1cH5qtLX2GWP3u5TDPd+OYoG53z7YGxDw+72ekq4d0djoBcnVcZGz8WNGMpnb0+fjUm88vkvwUTBXBZX6k1QhXLPhS+aZHHHcSUWPgFm1YejyzmW3tcXwvqalIztdZXADlQM6gzHvMLZU7W1UJWn8ykWL1bNcFPAPPIZiHie/YHNSbd41xkrj3fcWXYxrUMBbQqQtnbAhTPW83tjRV9L4B8Lj+VHmJNxCKDm46dsQptxSLmvVIY1z/yi047Ai4RPhlWH2P4cwLgn3YEq3NM5ruOzJojUknN1s6dgmzmHMEOtTjH0njT+/a7bh1DoS7uPiVtHBM4yt5RcUWjoojZve139W6kzCQ25dGFy/eBhbOr8qJeWbNG6vffzXfA8SfkIjcK6DwjCGdQgmxHDL4CRCgtCpcBK+ebXsgsIVw5iRmfh3TFgG33xcVdluLwn/fCR2ToDTMGY/XOhnqC+DlxBxi3vJJDx17sHt8w4MY+Prl7OzW8ng5SrhZLkTJLzutrqledowxuurg2z9ZfBUeSMprywSXvqNjbP45jBWtUBs07FoGfz2mHUObzYJ/7He2jnmwTAWN/ZOzz5PBj86lL3cM52EE2cniFR0DGM7Xiv7SJfK4Fd+q/OwHSfhxX4KpS59sP1QjS3Hnsvg/isnFuXFkfB1JzXiY78NYxmr+ztd3srgtgGR9zN2k/ByyWSzxaPDmJl5et04QRa/k15zNtiLhNukJlP4xoax34c52K7Pk8Uv82e8ddtEwuUSn2zb9n0YI68lfhmRkcV/vT2pE7aUhDvHpZwgfYD1c5Ju5i6RxfMz3YfWLiHhMRauDd7dw1hpTvYxfgNZvPOUDC7OQ8LZcurFdGqHsZDCkuWDS2Xx+DWyXk9GFXDd512RJ+8NY9xI9mudiSxusqHdLb1bAe9JUwqgXh7GTnB8CeZaJosX52rvl+1UwHltC93OXhjGjgRstlWC5Q6ttgJazQp46GyRKIUzw5h+m36pOCxfFuSy4+ZTBXzOg+zEp1nDmMHfy3OxT76WlQr4+x3iHsNJw5jp38uPZZrlr7ulgMs0tTl4xMHx+Xt5ZFTKtsRkBTxqqaNryWbG9h962zeU+yrgRnNDVr7SZyx/kOmxS2dCHl/9bAPNsmloavv6A76acTflceG3PbNiUhnLuQqiir265HD+60uWfGn4MrUdi/W7agfWyOGHXkkGjqz/gun9vTzHX2CP8n5pfK2L8fpK9o9T27nIE3DpxUEJ/IBBEfu+T/1TyymDbUXh3Px4bMAryZz0N9jyv5eTFfLi2nkIOAG5Fy7Z2Tn1eD2UONS3EThok9ctla/qdk1tRyY/KLGefQEtSEztrMSG7qnlhlppex0xKVpL+vU5243eT22nIHl7h+FeGVr72YK17DGfptaXsvDpDrGRpz1XJ9xJUmcchzOfhIufvpKnBS/ey+Vfwlhu8nxP3pdkBZqcyNJlAo5wXv+9/E3Cqbz7JQo0Ewt3ksQeOH//Xh7c9ynncKcCzU0pRVSgcBgzkWafzIDXVf9QB29MnwKtlV9vh8W1YUx+TaTuMngdvua8VqY2pkC7eItbxh9eh4qeYd7bDWXxvk7ee2NsJJrEVR7hnXA+Lm3UHTLVksVbhZ2lPy0m0UzHi4NqWocxue37QhbC67/rpw8tXoVEWxiVP0ehZxhz3/342joRWVy7mnPxWhsSLYA7qldieBjTCb4j9WiuLP7pXYav92YSzYeY5nwVzi9DzoDeLcMyuPKlX4V1oSRa5oo0jjQ4H82upqVY9sjg0grX4i32kGj+ysmiAz+GMbGPVuakShlc7eTVxD1JJFpa8AnBg4PDmOBnqagHJTJ4dK5+m/dxEs368k+VG73DmO/yl68jU+D9xJ5dTjGLRCPPNV1c2TiMtX6/9jN7jwwu6cdZIZhNoi0eNf5dXQXHOchw4+rNMvinhNXP2TNItHcH3+73gfPuTNePgP2W8D5zJa2I/QSJdnbkZxzt5DA2Ojtr86C8DJ4wfMF5zSESzbU8hxwdNIwtWvjts7eQDL72vMiXV9FwHNZlHloHz6P6/gOFc39K445HbwR88iHRBI5aNBtpDGPtfpW/5nySxrW/5A87OJNoq600vHkXwfsMdV/tyXZpfJmwRZO2JYmW7cFZRRgbwrZVPBXWbJHGr/0qObwQJ9GEf57sIwwOYQV9zxTtaqVxzycfg/s1SbT360YV57QOYadLKyTeVEvju1e/sHmmTKLl64haC9YNYe5t6eJf0qTxiHU/VXk+KNBE9InbcvyGMMeGN5l+ftK4bpiixbobCrSsC0vXOCwcwoZHR5Nr+6Rw+fzP30W4FWj18VpspoJfsI3cS1IuHJPCnR58YjuULk/TGzM55f96EJsVs3OJIWExftnoZaFwpjRNzcSW0y6vB7s9uXOJ5EFB3GBk/MTZOWK0k993BZy1asVW3XtkZ36EBx+Yp9T4xoafpnyhIyXt7X0srmKN3GNuTtw4VkQt03cOrUy1+VudIBkLtw/JFDk8hml1WvzafI5Aw4P69SW987DYCC5ukVnfsGzDBRVHFv5Etjkbj3yinsTktB/LR0b1YYWPtN1KMgZRSsGh286K0djSy+G7xUbeYF/yBoIFtvWhCzpGzt8cQ7AbbcuMtCVfYK5sOvyBz9uR4xz2KwbjjtiWHG/8t3MTJvcBjQsYv0SNMnlp/sftMVpCytoN2+uxC+qXbie0NKHJ9nHMj2aNRXo4lYuXPME0B3+edZrzDI3E3rXNNrXArmt2X6tJfohF5d2RV7lRj+xjbr6//30ZJsrR/SlYthrbc4aUkPexFonfz+D+HrgUG2r3difkVmIh5pt2KSnVoB4TbrU+Tl0s6VtP/Y3Y+xj7aX+inO5DdF1ws0aoqhYWsog30lAUYdo1miSKSAWKu/h1e5mdPNamvr5sndcd7HGUYU5jCxXt4V3SrNQrholu7+OvxKlYT7lNWgrfWcT9ZkBqaQURu3HS1dbnIwVb+y4/qVYzFJNLt+GoCODCONKyK4PrbmESWcKm1qKl2Ekdxxxy9UJMhj/h7NjbO5iQ9m8sPeM2JthW3vw2QBLrsVx4SayuAuMb6bvkoleNHUlITJP01MBqzK98rhmpxLIC7Tn4Zz3G+uOdftC6dbF/+17HY3aR98+rvVG2P672etgYV3s32eJ4dFZn2RwSXGwbZlL17gWbajv9ao8M60j9eWUmvCW80UJ4E/7nVd1/LicQRFTN7celRZn893o00b+LeCQJ1VZid/+5/3/W56/7s9H3WH7aHivf024oI8L16fj/XJ+mi9Xvo+/xGNzG91/2+F+uT/+cP9djvn79l+Wxfz6SP/fjhZsw6d3xn8b/udxn6shMHbEZjygR/5+Oob+L0a/HLa7MqvnnOZ+nqnfpz+ffkPD380+ff3vh/PN/854+CQ93FtE3sHr6Bv6cf642/vF/W69L9EE/faPJ/7bRPzf43zb8v7nvn/NMXPvM3dF3k/9U5HXuGH2nxKfv1J+t6cDW0VfShH/n//PG/9seRqQVuv8/v/ThD3HS75z8mf3ZfwLGT11g4p+nec7/4riwhjWsYQ1rWMMa1rCGNaxhDWtYwxrWsIY1rGENa1jDGtawhjWsYQ1rWMMa1rCGNaxhDWtYwxrWsIY1rGENa1jDGtawhjWsYQ1rWMMa1rCGNaxhDWtYwxrW/P/O/wE=
- 00000000-0000-0000-0000-000000000000
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
- 1
-
150;170;135;255
- A group of Grasshopper objects
- 922a4404-eeca-407f-8c6e-15f4fa8efbc7
- 387787f0-c4c4-43dc-b6d6-09fd28eecf02
- f5cc0b94-c3cc-4ccb-8499-6ba36ae5663c
- 77c3053e-fdef-4225-9b6f-c7b96895fe13
- 4
- 4003bde6-6856-4d0c-bdc8-2423b2a0497d
- Group
- f31d8d7a-7536-4ac8-9c96-fde6ecda4d0a
- View a vector
-
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
- 08 oct. 2020 - 20h00
Visualise a vector
- true
-
iVBORw0KGgoAAAANSUhEUgAAABgAAAAYCAYAAADgdz34AAAABGdBTUEAALGPC/xhBQAAAAlwSFlzAAAOwwAADsMBx2+oZAAAAMJJREFUSEvt1DsKwkAUheEUijai4BsEQRsRW5dhZWXtSlyBG7NyAQER3Ib+R+bCNCqMd0AkB74ik3APMwkpqnhniAnqzyvnNHEPVNSAazawgh36cClpY4srrOCGPabQzpLTgQ19ZY7knehlljjhABt6xBkXjKFdJr34GlroQcdhBWuswpru6Rk9m5S4xAqWcBlu0YD4M11gENa+Hm7RGccF3bDmlqrgY/6rYIYsBfoljILk38O7WEmW4RYNzjb811IUD5GFMMTyMRpMAAAAAElFTkSuQmCC
- 922a4404-eeca-407f-8c6e-15f4fa8efbc7
- View a vector
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
- 08 oct. 2020 - 20h00
Visualise a vector
- true
-
iVBORw0KGgoAAAANSUhEUgAAABgAAAAYCAYAAADgdz34AAAABGdBTUEAALGPC/xhBQAAAAlwSFlzAAAOwwAADsMBx2+oZAAAAMJJREFUSEvt1DsKwkAUheEUijai4BsEQRsRW5dhZWXtSlyBG7NyAQER3Ib+R+bCNCqMd0AkB74ik3APMwkpqnhniAnqzyvnNHEPVNSAazawgh36cClpY4srrOCGPabQzpLTgQ19ZY7knehlljjhABt6xBkXjKFdJr34GlroQcdhBWuswpru6Rk9m5S4xAqWcBlu0YD4M11gENa+Hm7RGccF3bDmlqrgY/6rYIYsBfoljILk38O7WEmW4RYNzjb811IUD5GFMMTyMRpMAAAAAElFTkSuQmCC
- 86287049-8fbb-42f5-a190-ffb39df793d8
- View a vector
- ViewVector
- true
- 3
- 4e39ba28-c419-402c-8a54-accc115b0fa7
- c0af2b6b-af9a-4a6d-b5cd-85e7e7e471f2
- f1cf65b5-d8d3-4a40-abce-80873b56d66f
- 69d862b7-b215-4575-99e3-aa5603d2f826
- c4415abf-c7db-40d3-ad88-4fae8afe3e8c
- d99c4fc5-894b-48bf-b1aa-5e55c8b5ccaf
-
9511
1877
122
64
-
9619
1909
- 3
- fbac3e32-f100-4292-8692-77240a42fd1a
- 16ef3e75-e315-4899-b531-d3166b42dac9
- 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312
- 0
- Contains a collection of three-dimensional points
- 1
- f1cf65b5-d8d3-4a40-abce-80873b56d66f
- Point
- Anchor point
- true
- c66168e8-a064-49a6-b6e0-909ecbbdd936
- 1
-
9513
1879
91
20
-
9560
1889
- Contains a collection of three-dimensional vectors
- 1
- 4e39ba28-c419-402c-8a54-accc115b0fa7
- Vector
- Vector
- true
- 427584c7-56bd-479c-84c7-3d408cf70ac9
- 1
- 1
-
9513
1899
91
20
-
9560
1909
- Amplitude (length) value
- 1
- c0af2b6b-af9a-4a6d-b5cd-85e7e7e471f2
- Amplitude
- Vector amplitude
- true
- 4f6f289c-89c8-4829-ae1e-6a0fc083ca63
- 1
-
9513
1919
91
20
-
9560
1929
- fbac3e32-f100-4292-8692-77240a42fd1a
- Point
- Contains a collection of three-dimensional points
- true
- 1
- c66168e8-a064-49a6-b6e0-909ecbbdd936
- Point
- Anchor point
- true
- 2898dc90-85f1-4461-864b-76ddc8a889e2
- 1
- 1
-
9379
1871
81
20
-
9420.319
1881.117
- 16ef3e75-e315-4899-b531-d3166b42dac9
- Vector
- Contains a collection of three-dimensional vectors
- 1
- 427584c7-56bd-479c-84c7-3d408cf70ac9
- Vector
- Vec
- true
- 50621a44-c939-4d64-a370-3a9cede216ad
- 1
- 1
-
9405
1900
50
20
-
9430.619
1910.367
- 4a9e9a8e-0943-4438-b360-129c30f2bb0f
- Surface Closest Point
- Find the closest point on a surface.
- true
- d382dc4c-e613-4061-81b7-6d2bff11bfb9
- Surface Closest Point
- Srf CP
-
7069
1403
75
64
-
7099
1435
- Sample point
- 7bc4f273-7990-4d2e-863c-f197e3791099
- Point
- P
- false
- 389af6d4-4014-4671-aaca-eb6415bdaa6e
- 1
-
7071
1405
13
30
-
7079
1420
- Base surface
- 208f1b73-8c66-4fc2-8d76-a6e0ed07d64b
- Surface
- S
- false
- f11f313c-d7e8-4600-aecc-4003be32b290
- 1
-
7071
1435
13
30
-
7079
1450
- Closest point
- 20da297f-be63-4967-8477-448387246edf
- Point
- P
- false
- 0
-
7114
1405
28
20
-
7128
1415
- {uv} coordinates of closest point
- true
- fd748b76-1e45-48c6-9a58-1905845cc662
- UV Point
- uvP
- false
- 0
-
7114
1425
28
20
-
7128
1435
- Distance between sample point and surface
- e9c5f0fd-f7b6-479b-950b-bc1ddc5c171d
- Distance
- D
- false
- 0
-
7114
1445
28
20
-
7128
1455
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- e80cc896-0b2a-41e6-a5bd-ff52d3b5b3cc
- Panel
- false
- 0
- 389af6d4-4014-4671-aaca-eb6415bdaa6e
- 1
- Double click to edit panel content…
-
6768
1340
236
53
- 0
- 0
- 0
-
6768.022
1340.357
-
255;255;250;90
- true
- true
- true
- false
- true
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
- 1
-
150;170;135;255
- A group of Grasshopper objects
- d8478df4-7fd6-43bb-9aaf-d9579e302901
- cc49993e-811f-47da-b706-fd1a8bbadaf4
- 798d0fdc-e3fc-4909-8024-9f6b157841ae
- 5e50fc5e-b306-4324-bc76-85165fa5c4e7
- 4
- 40e53932-f44c-45c2-81a1-a94eb1bb39aa
- Group
- 404f75ac-5594-4c48-ad8a-7d0f472bbf8a
- Principal Curvature
- Evaluate the principal curvature of a surface at a {uv} coordinate.
- true
- d8478df4-7fd6-43bb-9aaf-d9579e302901
- Principal Curvature
- Curvature
-
7238
1436
74
104
-
7274
1488
- Base surface
- cac73ac7-c16d-41ef-8e30-adfc6a9e781b
- Surface
- S
- false
- f11f313c-d7e8-4600-aecc-4003be32b290
- 1
-
7240
1438
19
50
-
7251
1463
- {uv} coordinate to evaluate
- true
- 16a1270d-005a-46f9-9a7a-ad74aa645eb8
- Point
- uv
- false
- fd748b76-1e45-48c6-9a58-1905845cc662
- 1
-
7240
1488
19
50
-
7251
1513
- Surface frame at {uv} coordinate
- true
- 903b02f2-361e-469d-a679-22b18be41942
- Frame
- F
- false
- 0
-
7289
1438
21
20
-
7299.5
1448
- Minimum principal curvature
- 8039e33e-6b41-40b7-bc79-c36562f3486c
- Min
- C¹
- false
- 0
-
7289
1458
21
20
-
7299.5
1468
- Maximum principal curvature
- 79897f68-3e1f-4ba0-8fe9-5424825583b6
- Max
- C²
- false
- 0
-
7289
1478
21
20
-
7299.5
1488
- Minimum principal curvature direction
- a1055467-dc10-4483-aa00-014f5f92405e
- Min direction
- K¹
- false
- 0
-
7289
1498
21
20
-
7299.5
1508
- Maximum principal curvature direction
- ccf93300-60c3-4a9a-882c-1440adaac2d6
- Max direction
- K²
- false
- 0
-
7289
1518
21
20
-
7299.5
1528
- 16ef3e75-e315-4899-b531-d3166b42dac9
- Vector
- Contains a collection of three-dimensional vectors
- cc49993e-811f-47da-b706-fd1a8bbadaf4
- Vector
- Vec
- false
- a1055467-dc10-4483-aa00-014f5f92405e
- 1
-
7349
1499
50
24
-
7374.465
1511.744
- 16ef3e75-e315-4899-b531-d3166b42dac9
- Vector
- Contains a collection of three-dimensional vectors
- 798d0fdc-e3fc-4909-8024-9f6b157841ae
- Vector
- Vec
- false
- ccf93300-60c3-4a9a-882c-1440adaac2d6
- 1
-
7346
1533
50
24
-
7371.965
1545.494
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- 5e50fc5e-b306-4324-bc76-85165fa5c4e7
- Panel
- false
- 0
- cc49993e-811f-47da-b706-fd1a8bbadaf4
- 1
- Double click to edit panel content…
-
7389
1447
260
50
- 0
- 0
- 0
-
7389.215
1447.744
-
255;255;250;90
- true
- true
- true
- false
- true
- deaf8653-5528-4286-807c-3de8b8dad781
- Surface
- Contains a collection of generic surfaces
- true
- 1
- f11f313c-d7e8-4600-aecc-4003be32b290
- Surface
- Medium surface (Radius=96.36mm)
- false
- 394f4305-add1-415e-8066-40c13516eb71
- 1
- 1
-
6698
1453
198
20
-
6797.905
1463.357
- 2e3ab970-8545-46bb-836c-1c11e5610bce
- Integer
- Contains a collection of integer numbers
- 8a0fe55c-9e3a-44da-ab4a-d6026662bfa7
- Integer
- Int
- false
- 52f3a4e7-4a9e-4481-9b44-f6236e8129bf
- 1
- 1
-
5390
1543
50
24
-
5415.104
1555.03
- 69f3e5ee-4770-44b3-8851-ae10ae555398
- Perp Frame
- Solve the perpendicular (zero-twisting) frame at a specified curve parameter.
- true
- 65b4d55d-0c25-4c4a-94c5-3a97287271b7
- Perp Frame
- PFrame
-
3364
1413
63
44
-
3395
1435
- Curve to evaluate
- f457bb76-f07b-4ae5-a2d2-ea26d777048c
- Curve
- C
- false
- 9fe3a1e1-986a-4379-97f5-970ed7675221
- 1
-
3366
1415
14
20
-
3374.5
1425
- Parameter on curve domain to evaluate
- b8a50a41-f911-4a1d-ae9e-409af3072932
- Parameter
- t
- false
- 5d0453de-ce33-43a1-a05f-16609ebe42f5
- 1
-
3366
1435
14
20
-
3374.5
1445
- Perpendicular curve frame at {t}
- ced20092-f8c4-4c0a-9017-068ff809f532
- Frame
- F
- false
- 0
-
3410
1415
15
40
-
3417.5
1435
- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
- Curve
- Curve to divide
- true
- 9fe3a1e1-986a-4379-97f5-970ed7675221
- Curve
- C
- false
- true
- 6449ca9e-a381-4623-b25f-b9f8532a3c7d
- 1
- 1
-
3255
1407
69
24
-
3299.092
1419.632
- 57da07bd-ecab-415d-9d86-af36d7073abc
- Number Slider
- Numeric slider for single values
- 5d0453de-ce33-43a1-a05f-16609ebe42f5
- Number Slider
- false
- 0
-
3166
1445
183
20
-
3166.571
1445.274
- 3
- 1
- 0
- 1
- 0
- 0
- 0.662
- 4f8984c4-7c7a-4d69-b0a2-183cbb330d20
- Plane
- Contains a collection of three-dimensional axis-systems
- true
- 1
- b7424cbc-986c-4d07-8de3-fdbebadf5f43
- Plane
- Section plane
- false
- ced20092-f8c4-4c0a-9017-068ff809f532
- 1
-
3471
1427
83
20
-
3512.755
1437.173
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- c7f848af-8da9-45d5-9da4-f0301904145f
- Panel
- false
- 0
- b7424cbc-986c-4d07-8de3-fdbebadf5f43
- 1
- Double click to edit panel content…
-
3445
1323
305
81
- 0
- 0
- 0
-
3445.755
1323.679
-
255;255;250;90
- true
- true
- true
- false
- true
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
- 1
-
150;170;135;255
- A group of Grasshopper objects
- d0028e69-a93a-4685-8536-3559554c669b
- 93eed1ef-a3f4-4870-ad29-ffb23f9b8402
- ce3f8ee2-6505-4753-9c89-38a237a34232
- eb236086-068d-40c9-b819-b680be5201e7
- 3146a25a-61e5-4a8f-b22d-614984861811
- b3247689-06f3-47ca-a5f0-61593721c649
- a927dc18-0a68-4989-b6e8-74f4056f7fe1
- 7
- 9a6fb59d-88f6-4709-8c2d-b2b152fdc75a
- Group
- 59daf374-bc21-4a5e-8282-5504fb7ae9ae
- List Item
- 0
- Retrieve a specific item from a list.
- true
- d0028e69-a93a-4685-8536-3559554c669b
- List Item
- Item
-
5494
1898
64
64
-
5528
1930
- 3
- 8ec86459-bf01-4409-baee-174d0d2b13d0
- 2e3ab970-8545-46bb-836c-1c11e5610bce
- cb95db89-6165-43b6-9c41-5702bc5bf137
- 1
- 8ec86459-bf01-4409-baee-174d0d2b13d0
- 1
- Base list
- 45bd317b-ff4d-4853-82e3-41212b651952
- List
- L
- false
- ce3f8ee2-6505-4753-9c89-38a237a34232
- 1
-
5496
1900
17
20
-
5506
1910
- Item index
- 764af642-91b0-4e13-9c80-6a34cba109f9
- Index
- i
- false
- b3247689-06f3-47ca-a5f0-61593721c649
- 1
-
5496
1920
17
20
-
5506
1930
- 1
- 1
- {0}
- 0
- Wrap index to list bounds
- 7e07565e-a8c9-4953-8354-d1542226698e
- Wrap
- W
- false
- 0
-
5496
1940
17
20
-
5506
1950
- 1
- 1
- {0}
- true
- Item at {i'}
- 8fa3982e-c050-4fa3-afac-db3fc444c23f
- false
- Item
- i
- false
- 0
-
5543
1900
13
60
-
5549.5
1930
- fbac3e32-f100-4292-8692-77240a42fd1a
- Point
- Contains a collection of three-dimensional points
- true
- 1
- 93eed1ef-a3f4-4870-ad29-ffb23f9b8402
- Point
- End point of the spline in the External curve
- false
- 8fa3982e-c050-4fa3-afac-db3fc444c23f
- 1
-
5671
1924
239
20
-
5790.928
1934.689
- fbac3e32-f100-4292-8692-77240a42fd1a
- Point
- Contains a collection of three-dimensional points
- true
- ce3f8ee2-6505-4753-9c89-38a237a34232
- 1
- Point
- Pt
- false
- 31a12052-1d68-4adf-a6f3-63ae6e073ff5
- 1
-
5387
1896
69
24
-
5431.928
1908.689
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- eb236086-068d-40c9-b819-b680be5201e7
- Panel
- false
- 0
- ce3f8ee2-6505-4753-9c89-38a237a34232
- 1
- Double click to edit panel content…
-
5380
1782
251
100
- 0
- 0
- 0
-
5380.928
1782.689
-
255;255;250;90
- true
- true
- true
- false
- true
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- 3146a25a-61e5-4a8f-b22d-614984861811
- Panel
- false
- 0
- 93eed1ef-a3f4-4870-ad29-ffb23f9b8402
- 1
- Double click to edit panel content…
-
5620
1950
306
46
- 0
- 0
- 0
-
5620.066
1950.745
-
255;255;250;90
- true
- true
- true
- false
- true
- 2e3ab970-8545-46bb-836c-1c11e5610bce
- Integer
- Contains a collection of integer numbers
- b3247689-06f3-47ca-a5f0-61593721c649
- Integer
- Int
- false
- 52f3a4e7-4a9e-4481-9b44-f6236e8129bf
- 1
- 1
-
5396
1937
50
24
-
5421.604
1949.28
- fbac3e32-f100-4292-8692-77240a42fd1a
- Point
- Contains a collection of three-dimensional points
- true
- 1
- 389af6d4-4014-4671-aaca-eb6415bdaa6e
- Point
- Intermediate point of the spline in the Medium curve
- false
- 546793ec-7797-4884-b76b-51ecb9bd6c37
- 1
- 1
-
6704
1402
288
20
-
6848.382
1412.897
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
- 1
-
150;170;135;255
- A group of Grasshopper objects
- ce1f0835-c207-4a50-812a-fb60e16a74fe
- adfe492c-04ed-4580-8741-1e22d5723fb6
- 05a59750-87e0-4420-ab07-097bf7fd7a83
- 365b0a4d-be2c-4a75-9dca-fa2775577e21
- f019a19b-1277-4ce7-8aa5-14dfe5620e4d
- 5
- 6a9e1524-3e07-43c4-a846-a80f2d986567
- Group
- 4a9e9a8e-0943-4438-b360-129c30f2bb0f
- Surface Closest Point
- Find the closest point on a surface.
- true
- ce1f0835-c207-4a50-812a-fb60e16a74fe
- Surface Closest Point
- Srf CP
-
7036
1975
75
64
-
7066
2007
- Sample point
- 053673a2-b961-4d31-970a-62d9451a24a4
- Point
- P
- false
- 365b0a4d-be2c-4a75-9dca-fa2775577e21
- 1
-
7038
1977
13
30
-
7046
1992
- Base surface
- 0590fdd3-4a8b-43bf-814e-6312a2603844
- Surface
- S
- false
- f019a19b-1277-4ce7-8aa5-14dfe5620e4d
- 1
-
7038
2007
13
30
-
7046
2022
- Closest point
- ce487738-b824-4eae-a2dc-293bea3b37ea
- Point
- P
- false
- 0
-
7081
1977
28
20
-
7095
1987
- {uv} coordinates of closest point
- true
- 3b3ec293-7dd7-4c47-8693-cccb17f63e0b
- UV Point
- uvP
- false
- 0
-
7081
1997
28
20
-
7095
2007
- Distance between sample point and surface
- ef0cf601-379d-4765-a26d-c06e2e12352c
- Distance
- D
- false
- 0
-
7081
2017
28
20
-
7095
2027
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- adfe492c-04ed-4580-8741-1e22d5723fb6
- Panel
- false
- 0
- 365b0a4d-be2c-4a75-9dca-fa2775577e21
- 1
- Double click to edit panel content…
-
6736
1913
236
53
- 0
- 0
- 0
-
6736.382
1913.872
-
255;255;250;90
- true
- true
- true
- false
- true
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
- 1
-
150;170;135;255
- A group of Grasshopper objects
- 8570c6ea-9258-4b58-ac82-bcdc57684a63
- f3c36f2e-e3af-498e-a4a9-5160cd143b74
- a9e656ad-4f14-4b5f-942d-a05692923d92
- b194cba4-3792-4a9b-89a5-80ce3c2bf07b
- 4
- d205ac9c-0566-4d03-a377-f811f1db4924
- Group
- 404f75ac-5594-4c48-ad8a-7d0f472bbf8a
- Principal Curvature
- Evaluate the principal curvature of a surface at a {uv} coordinate.
- true
- 8570c6ea-9258-4b58-ac82-bcdc57684a63
- Principal Curvature
- Curvature
-
7192
2052
74
104
-
7228
2104
- Base surface
- 91638b7c-b772-4edf-8f06-217914e3fc14
- Surface
- S
- false
- f019a19b-1277-4ce7-8aa5-14dfe5620e4d
- 1
-
7194
2054
19
50
-
7205
2079
- {uv} coordinate to evaluate
- true
- e6aec02e-d6b4-49ca-af1c-39eb4d74f273
- Point
- uv
- false
- 3b3ec293-7dd7-4c47-8693-cccb17f63e0b
- 1
-
7194
2104
19
50
-
7205
2129
- Surface frame at {uv} coordinate
- true
- 6c603811-1231-48bd-9d61-683876064e82
- Frame
- F
- false
- 0
-
7243
2054
21
20
-
7253.5
2064
- Minimum principal curvature
- 1214d226-fb6b-4939-996f-6fc2869eecd2
- Min
- C¹
- false
- 0
-
7243
2074
21
20
-
7253.5
2084
- Maximum principal curvature
- 13e720d1-ee34-40c3-96ca-b4c9ceccad84
- Max
- C²
- false
- 0
-
7243
2094
21
20
-
7253.5
2104
- Minimum principal curvature direction
- 9b69de34-c904-4c83-9f84-e5b025441f7a
- Min direction
- K¹
- false
- 0
-
7243
2114
21
20
-
7253.5
2124
- Maximum principal curvature direction
- 1379e672-b7ac-4fba-8619-8c59f8f4b0f6
- Max direction
- K²
- false
- 0
-
7243
2134
21
20
-
7253.5
2144
- 16ef3e75-e315-4899-b531-d3166b42dac9
- Vector
- Contains a collection of three-dimensional vectors
- f3c36f2e-e3af-498e-a4a9-5160cd143b74
- Vector
- Vec
- false
- 9b69de34-c904-4c83-9f84-e5b025441f7a
- 1
-
7304
2116
50
24
-
7329.151
2128.775
- 16ef3e75-e315-4899-b531-d3166b42dac9
- Vector
- Contains a collection of three-dimensional vectors
- a9e656ad-4f14-4b5f-942d-a05692923d92
- Vector
- Vec
- false
- 1379e672-b7ac-4fba-8619-8c59f8f4b0f6
- 1
-
7301
2150
50
24
-
7326.651
2162.525
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- b194cba4-3792-4a9b-89a5-80ce3c2bf07b
- Panel
- false
- 0
- f3c36f2e-e3af-498e-a4a9-5160cd143b74
- 1
- Double click to edit panel content…
-
7343
2064
260
50
- 0
- 0
- 0
-
7343.901
2064.775
-
255;255;250;90
- true
- true
- true
- false
- true
- fbac3e32-f100-4292-8692-77240a42fd1a
- Point
- Contains a collection of three-dimensional points
- true
- 1
- 365b0a4d-be2c-4a75-9dca-fa2775577e21
- Point
- End point of the spline in the External curve
- false
- 018cea42-f515-4f4f-acf3-f0485056a7c9
- 1
- 1
-
6697
1976
239
20
-
6816.741
1986.413
- deaf8653-5528-4286-807c-3de8b8dad781
- Surface
- Contains a collection of generic surfaces
- true
- 1
- f019a19b-1277-4ce7-8aa5-14dfe5620e4d
- Surface
- External surface (Radius=96.36mm)
- false
- ef73dc49-b638-45e5-b651-690069a2c4dd
- 1
- 1
-
6698
2016
197
20
-
6796.628
2026.58
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- 77c3053e-fdef-4225-9b6f-c7b96895fe13
- Panel
- false
- 0
- 0
- 1
-
8225
2290
50
21
- 0
- 0
- 0
-
8225.505
2290.155
-
255;255;250;90
- true
- true
- true
- false
- true
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- eeb824ac-4ebf-46ea-8041-a084a56a1e3e
- Panel
- false
- 0
- 0
- 1
-
4693
1284
50
21
- 0
- 0
- 0
-
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- View a vector
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
- 08 oct. 2020 - 20h00
Visualise a vector
- true
-
iVBORw0KGgoAAAANSUhEUgAAABgAAAAYCAYAAADgdz34AAAABGdBTUEAALGPC/xhBQAAAAlwSFlzAAAOwwAADsMBx2+oZAAAAMJJREFUSEvt1DsKwkAUheEUijai4BsEQRsRW5dhZWXtSlyBG7NyAQER3Ib+R+bCNCqMd0AkB74ik3APMwkpqnhniAnqzyvnNHEPVNSAazawgh36cClpY4srrOCGPabQzpLTgQ19ZY7knehlljjhABt6xBkXjKFdJr34GlroQcdhBWuswpru6Rk9m5S4xAqWcBlu0YD4M11gENa+Hm7RGccF3bDmlqrgY/6rYIYsBfoljILk38O7WEmW4RYNzjb811IUD5GFMMTyMRpMAAAAAElFTkSuQmCC
- a4db2753-59fa-445e-aa51-f5f3e82bf4a9
- View a vector
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-
8316
1593
122
64
-
8424
1625
- 3
- fbac3e32-f100-4292-8692-77240a42fd1a
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- 0
- Contains a collection of three-dimensional points
- 1
- 841fb08e-22ec-45b3-864d-1613b5031a0c
- Point
- Anchor point
- true
- 7c78f78d-a499-45c5-b125-488d8b3a75af
- 1
-
8318
1595
91
20
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- Contains a collection of three-dimensional vectors
- 1
- e1ef6460-f4e2-4c65-a279-8c0d51ab3b24
- Vector
- Vector
- true
- d12a6d44-8416-4900-9357-e8f122b97fa1
- 1
- 1
-
8318
1615
91
20
-
8365
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- Amplitude (length) value
- 1
- 8edc800d-43e1-432e-b79e-0e014e8f0a88
- Amplitude
- Vector amplitude
- true
- 0c801408-0bb2-4e76-b629-3a52c1163b78
- 1
-
8318
1635
91
20
-
8365
1645
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- Point
- Contains a collection of three-dimensional points
- true
- 1
- 7c78f78d-a499-45c5-b125-488d8b3a75af
- Point
- Anchor point
- true
- 389af6d4-4014-4671-aaca-eb6415bdaa6e
- 1
- 1
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1599
81
20
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1609.073
- 16ef3e75-e315-4899-b531-d3166b42dac9
- Vector
- Contains a collection of three-dimensional vectors
- 1
- d12a6d44-8416-4900-9357-e8f122b97fa1
- Vector
- Vec
- true
- 591a14c1-722d-4985-8bbc-efdede0a69b5
- 1
- 1
-
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50
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1636.073
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- Panel
- A panel for custom notes and text values
- 0c801408-0bb2-4e76-b629-3a52c1163b78
- Panel
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- 0
- 0
- 1
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1655
50
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255;255;250;90
- true
- true
- true
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- true
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- 4f6f289c-89c8-4829-ae1e-6a0fc083ca63
- Panel
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- 0
- 0
- 1
-
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50
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1931.195
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- true
- true
- true
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- true
- aaa665bd-fd6e-4ccb-8d2c-c5b33072125d
- Curvature
- Evaluate the curvature of a curve at a specified parameter.
- true
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- Curvature
- Curvature
-
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65
64
-
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- Curve to evaluate
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14
30
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- Parameter on curve domain to evaluate
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- 1
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14
30
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- Point on curve at {t}
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- Point
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17
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- Curvature vector at {t}
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- Curvature
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17
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10752
1756
17
20
-
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1766
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- Curve
- Curve to evaluate
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- Curve
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- b4497085-d23d-477d-82c1-b14d102d0230
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- 1
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1720
69
24
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- Parameter
- Parameter on curve domain to evaluate
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- Parameter
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1761
50
24
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- Number Slider
- Numeric slider for single values
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183
20
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- 1
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- 0.65
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- Point
- Contains a collection of three-dimensional points
- true
- 81a31b76-2abd-4b6a-b6da-67e9e7d030f9
- Point
- Pt
- false
- 4accb40c-a9bf-4ca3-8c4a-f8650c1069c3
- 1
-
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1716
50
24
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- 7376fe41-74ec-497e-b367-1ffe5072608b
- Curvature Graph
- Draws Rhino Curvature Graphs.
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- CrvGraph
-
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1533
46
64
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10285
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- Curve for Curvature graph display
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- Curve
- C
- false
- b4497085-d23d-477d-82c1-b14d102d0230
- 1
-
10255
1535
15
20
-
10264
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- Sampling density of the Graph
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- Density
- D
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- 0
-
10255
1555
15
20
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10264
1565
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- 1
- {0}
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- Scale of graph
- 0ed07b89-8b32-4a5e-bc44-07920861d771
- Scale
- S
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- 0
-
10255
1575
15
20
-
10264
1585
- 1
- 1
- {0}
- 105
- d1028c72-ff86-4057-9eb0-36c687a4d98c
- Circle
- Contains a collection of circles
- true
- df481db5-6a45-4fc7-a1e2-91f141652e1d
- Circle
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- false
- 6400d2bc-2270-426b-bd00-22245bdfc7fe
- 1
-
10811
1755
50
24
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10836
1767.155
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- d10b06a4-fbe0-4a07-8696-865a6c5ffb9d
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- 0
- df481db5-6a45-4fc7-a1e2-91f141652e1d
- 1
- Double click to edit panel content…
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10815
1790
215
27
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255;255;250;90
- false
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- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
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-
10358.14
1671.08
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11115.42
1671.08
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11115.42
1704.593
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10358.14
1704.593
- A quick note
- Microsoft Sans Serif
- cd68c20a-52e3-42fd-b914-b85b0390c06d
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- Scribble
- Scribble
- 35
- To check the curvature radius of a curve (mm)
-
10353.14
1666.08
767.2852
43.51318
-
10358.14
1671.08
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-
5150.523
4605.818
-
5808.946
4605.818
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5808.946
4629.487
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5150.523
4629.487
- A quick note
- Microsoft Sans Serif
- f81e0704-ddcc-45b4-87ba-a6e497bdbea4
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- Scribble
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- 25
- The "Ruled surface" component does not meet the need
-
5145.523
4600.818
668.4229
33.66943
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4605.818
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5082.106
4971.214
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5924.562
4971.214
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5023.179
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5082.106
5023.179
- A quick note
- Microsoft Sans Serif
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- Scribble
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- The curvature graph of the internal and external curve
must remain the same, so the "Pull" component does not meet the need
-
5077.106
4966.214
852.4561
61.96533
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5082.106
4971.214
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- Scribble
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4776.187
5744.6
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5641.47
5744.6
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5768.538
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4776.187
5768.538
- A quick note
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- 7e278f8b-8563-413b-964a-c2e64656db75
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- Scribble
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- 25
- "Loft" component does not allow creating a surface through closed curves
-
4771.187
5739.6
875.2832
33.93799
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4776.187
5744.6
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150;170;135;255
- A group of Grasshopper objects
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- Group
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
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-
150;170;135;255
- A group of Grasshopper objects
- 5c80230e-db06-4ee5-aa0b-c64a72e0aa4e
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- Group
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
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-
150;170;135;255
- A group of Grasshopper objects
- 7085abd1-b5dc-4f2a-b03a-715cb9504094
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- Group
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
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-
150;170;135;255
- A group of Grasshopper objects
- 5ec82a9a-cc71-4747-8af3-63599e5b779d
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- Group
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- Group
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150;170;135;255
- A group of Grasshopper objects
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- Group
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- Surface
- Contains a collection of generic surfaces
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- Surface
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197
20
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4704.39
5197.128
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- Curve
- Contains a collection of generic curves
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- Curve
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-
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364
20
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5354.859
- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
- Curve
- Contains a collection of generic curves
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- 1
- 9ec54461-9cc3-407d-9f99-45015d5b8ae1
- Curve
- External curve that delimits the external surface (Radius=96.36mm)
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- 1
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-
4895
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362
20
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5076.731
5318.841
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- Divide Domain²
- Divides a two-dimensional domain into equal segments.
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- Divide Domain²
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-
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65
64
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- Base domain
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- 15a49ed4-e17c-4f82-bc5e-3c9fc5cf56c0
- 1
-
5040
5207
15
20
-
5049
5217
- Number of segments in {u} direction
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- U Count
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- 8cf0da51-10c2-42b8-b230-e921cb553860
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15
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5049
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- 1
- {0}
- 10
- Number of segments in {v} direction
- 8d988593-6234-49a8-96b0-083505bf46a7
- V Count
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- 7cea29fa-0e8b-4cce-ab55-31406729bb05
- 1
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5040
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15
20
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5049
5257
- 1
- 1
- {0}
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- 1
- Individual segments
- 841311f1-ff86-4f11-8015-99c770da2a79
- Segments
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5085
5207
16
60
-
5093
5237
- 6a9ccaab-1b03-484e-bbda-be9c81584a66
- Isotrim
- Extract an isoparametric subset of a surface.
- true
- 5ec82a9a-cc71-4747-8af3-63599e5b779d
- Isotrim
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-
5425
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65
44
-
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- Base surface
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- Surface
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- 9449dbcf-3cb6-4686-a311-bd45effd1d38
- 1
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15
20
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5436
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- Domain of subset
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- Domain
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- 1
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5427
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15
20
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5436
5179
- Subset of base surface
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- Surface
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- 0
-
5472
5149
16
40
-
5480
5169
- 57da07bd-ecab-415d-9d86-af36d7073abc
- Number Slider
- Numeric slider for single values
- 8cf0da51-10c2-42b8-b230-e921cb553860
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4837
5228
173
20
-
4837.936
5228.764
- 3
- 1
- 1
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- 0
- 0
- 1
- 59daf374-bc21-4a5e-8282-5504fb7ae9ae
- List Item
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- Retrieve a specific item from a list.
- true
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- List Item
- Item
-
5701
5141
64
64
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5735
5173
- 3
- 8ec86459-bf01-4409-baee-174d0d2b13d0
- 2e3ab970-8545-46bb-836c-1c11e5610bce
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- 8ec86459-bf01-4409-baee-174d0d2b13d0
- 1
- Base list
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- List
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- 1
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5703
5143
17
20
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5713
5153
- Item index
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- Index
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5703
5163
17
20
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5713
5173
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- {0}
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- Wrap index to list bounds
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5703
5183
17
20
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5713
5193
- 1
- 1
- {0}
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- Item at {i'}
- 7a3a83aa-9c82-4737-aeea-1af5c35a18fe
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- Item
- i
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- 0
-
5750
5143
13
60
-
5756.5
5173
- 57da07bd-ecab-415d-9d86-af36d7073abc
- Number Slider
- Numeric slider for single values
- 7cea29fa-0e8b-4cce-ab55-31406729bb05
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- 0
-
4844
5260
173
20
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4844.136
5260.113
- 3
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- 1
- 10
- 0
- 0
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- 6b5812f5-bb36-4d74-97fc-5a1f2f77452d
- Pull Curve
- Pull a curve onto a surface.
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- 5c80230e-db06-4ee5-aa0b-c64a72e0aa4e
- Pull Curve
- Pull
-
5979
5296
65
44
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6010
5318
- Curve to pull
- ea5f72f0-78e3-418a-9c6e-d70283f2793d
- Curve
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- 999d68d0-0df8-4c7b-b4a6-4f2f46f73ea3
- 1
-
5981
5298
14
20
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5989.5
5308
- Surface that pulls
- 36231035-4314-42ee-8073-289f190bb45d
- Surface
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- false
- 8acbcbfb-f233-4907-a151-8c76f96bda79
- 1
-
5981
5318
14
20
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5989.5
5328
- Curve pulled onto the surface
- ed80a8a1-2006-46b1-92bd-e75fb44bd2bf
- Curve
- C
- false
- 0
-
6025
5298
17
40
-
6033.5
5318
- deaf8653-5528-4286-807c-3de8b8dad781
- Surface
- Contains a collection of generic surfaces
- true
- 1
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- Surface
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- false
- 6f91933d-63d3-42b1-a699-8076cde8fb9c
- 1
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5521
5160
50
20
-
5546.121
5170.849
- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
- Curve
- Contains a collection of generic curves
- true
- bed93087-bec7-42a5-a986-8069aa132714
- Curve
- Crv
- false
- ed80a8a1-2006-46b1-92bd-e75fb44bd2bf
- 1
-
6070
5308
50
24
-
6095.335
5320.495
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- f10063ce-c3a6-45e6-8a4e-7c251feea2bb
- Panel
- false
- 0
- bed93087-bec7-42a5-a986-8069aa132714
- 1
- Double click to edit panel content…
-
6051
5368
160
100
- 0
- 0
- 0
-
6051.705
5368.229
-
255;255;250;90
- true
- true
- true
- false
- true
- deaf8653-5528-4286-807c-3de8b8dad781
- Surface
- Contains a collection of generic surfaces
- true
- 1bfc89e6-70e1-42fa-9cd9-541d2aba8cdd
- Surface
- Srf
- false
- 7a3a83aa-9c82-4737-aeea-1af5c35a18fe
- 1
-
5801
5162
50
24
-
5826.309
5174.563
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- ebc7926f-e985-409d-84e2-559f0e8191f6
- Panel
- false
- 0
- 1bfc89e6-70e1-42fa-9cd9-541d2aba8cdd
- 1
- Double click to edit panel content…
-
5790
5090
160
59
- 0
- 0
- 0
-
5790.357
5090.469
-
255;255;250;90
- true
- true
- true
- false
- true
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- 2dcdfa25-86f1-4ce2-adbe-b6845466f9bb
- Panel
- false
- 0
- 2e507622-ed48-4700-b0af-5edd05d67af0
- 1
- Double click to edit panel content…
-
5509
5061
160
75
- 0
- 0
- 0
-
5509.885
5061.115
-
255;255;250;90
- true
- true
- true
- false
- true
- c9785b8e-2f30-4f90-8ee3-cca710f82402
- Entwine
- Flatten and combine a collection of data streams
- true
- true
- da185f0d-b495-489b-bbc7-591eab69b540
- Entwine
- Entwine
-
5512
5319
79
44
-
5557
5341
- 2
- 8ec86459-bf01-4409-baee-174d0d2b13d0
- 8ec86459-bf01-4409-baee-174d0d2b13d0
- 1
- 8ec86459-bf01-4409-baee-174d0d2b13d0
- 2
- Data to entwine
- f2cb5c99-7499-4c00-8c8c-788d4acc6ab4
- false
- Branch {0;0}
- {0;0}
- true
- 9ec54461-9cc3-407d-9f99-45015d5b8ae1
- 1
-
5514
5321
28
20
-
5529.5
5331
- 2
- Data to entwine
- a4f7e26f-4fed-43d6-b0f6-b0e1a093c6e9
- false
- Branch {0;1}
- {0;1}
- true
- 5f08ba62-d7d6-44bb-9c4c-2705e56c83f7
- 1
-
5514
5341
28
20
-
5529.5
5351
- Entwined result
- 1e07462b-80f7-430a-abe1-2afd84f4b6f9
- Result
- R
- false
- 0
-
5572
5321
17
40
-
5580.5
5341
- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
- Curve
- Contains a collection of generic curves
- true
- 033783f3-4e65-4b82-a430-f7e32e912511
- 1
- Curve
- Crv
- false
- 1e07462b-80f7-430a-abe1-2afd84f4b6f9
- 1
-
5628
5329
69
24
-
5672.485
5341.314
- 90744326-eb53-4a0e-b7ef-4b45f5473d6e
- Domain²
- Contains a collection of 2D number domains
- 8239f927-2bce-4704-9653-d00b7d5dd2a3
- Domain²
- Domain²
- false
- 841311f1-ff86-4f11-8015-99c770da2a79
- 1
-
5129
5227
50
24
-
5154.645
5239.075
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- 186519f6-4e46-4d26-8ecd-7576ec75d31e
- Panel
- false
- 0
- 8239f927-2bce-4704-9653-d00b7d5dd2a3
- 1
- Double click to edit panel content…
-
4915
5113
370
66
- 0
- 0
- 0
-
4915.165
5113.555
-
255;255;250;90
- true
- true
- true
- false
- true
- deaf8653-5528-4286-807c-3de8b8dad781
- Surface
- Contains a collection of generic surfaces
- true
- 9449dbcf-3cb6-4686-a311-bd45effd1d38
- Surface
- Srf
- false
- 15a49ed4-e17c-4f82-bc5e-3c9fc5cf56c0
- 1
- 1
-
5330
5148
50
24
-
5355.765
5160.955
- deaf8653-5528-4286-807c-3de8b8dad781
- Surface
- Contains a collection of generic surfaces
- true
- 15a49ed4-e17c-4f82-bc5e-3c9fc5cf56c0
- Surface
- Srf
- false
- b6aed6cd-69be-49aa-b6fb-1725a086c940
- 1
- 1
-
4945
5185
50
24
-
4970.645
5197.835
- deaf8653-5528-4286-807c-3de8b8dad781
- Surface
- Contains a collection of generic surfaces
- true
- 8acbcbfb-f233-4907-a151-8c76f96bda79
- Surface
- Srf
- false
- 1bfc89e6-70e1-42fa-9cd9-541d2aba8cdd
- 1
- 1
-
5904
5325
50
24
-
5929.285
5337.815
- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
- Curve
- Contains a collection of generic curves
- true
- 999d68d0-0df8-4c7b-b4a6-4f2f46f73ea3
- Curve
- Crv
- false
- 033783f3-4e65-4b82-a430-f7e32e912511
- 1
- 1
-
5900
5293
50
24
-
5925.285
5305.815
- 7376fe41-74ec-497e-b367-1ffe5072608b
- Curvature Graph
- Draws Rhino Curvature Graphs.
- true
- 4641628b-0cc9-45f0-890e-89867fcb4a78
- Curvature Graph
- CrvGraph
-
6257
5548
46
64
-
6289
5580
- Curve for Curvature graph display
- true
- 42bef5d4-a574-457b-9e97-f3a72c79ba38
- Curve
- C
- false
- 3f6806ae-a1a8-4238-adca-16c972a437f1
- 1
-
6259
5550
15
20
-
6268
5560
- Sampling density of the Graph
- f3da999f-e11f-4223-9e43-26689a42743f
- Density
- D
- false
- 0
-
6259
5570
15
20
-
6268
5580
- 1
- 1
- {0}
- 5
- Scale of graph
- 10f06182-4f43-4134-8bec-4acfaa58f6bb
- Scale
- S
- false
- 0
-
6259
5590
15
20
-
6268
5600
- 1
- 1
- {0}
- 105
- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
- Curve
- Curve for Curvature graph display
- true
- 3f6806ae-a1a8-4238-adca-16c972a437f1
- Curve
- C
- false
- bed93087-bec7-42a5-a986-8069aa132714
- 1
- 1
-
6183
5550
50
24
-
6208.085
5562.064
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
- 1
-
150;170;135;255
- A group of Grasshopper objects
- 6acb7848-fdb8-4ec6-b5ce-ab0fcd652726
- 5683a23b-bd7e-464f-9778-cdaac16e7d23
- 5ac25f26-1c60-4547-9714-8bc6267dbe8f
- 3
- 9e293998-b515-482c-ad18-6eac6ef66ed7
- Group
- 7376fe41-74ec-497e-b367-1ffe5072608b
- Curvature Graph
- Draws Rhino Curvature Graphs.
- true
- 6acb7848-fdb8-4ec6-b5ce-ab0fcd652726
- Curvature Graph
- CrvGraph
-
5886
5551
46
64
-
5918
5583
- Curve for Curvature graph display
- true
- 9abe2bc8-252a-40be-8816-01429481894d
- Curve
- C
- false
- 5683a23b-bd7e-464f-9778-cdaac16e7d23
- 1
-
5888
5553
15
20
-
5897
5563
- Sampling density of the Graph
- 77e7d90a-4cbf-4e77-a9db-d3541e39ca5d
- Density
- D
- false
- 0
-
5888
5573
15
20
-
5897
5583
- 1
- 1
- {0}
- 5
- Scale of graph
- f8e35438-c98c-457e-b197-04626feb40c8
- Scale
- S
- false
- 0
-
5888
5593
15
20
-
5897
5603
- 1
- 1
- {0}
- 105
- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
- Curve
- Curve for Curvature graph display
- true
- 5683a23b-bd7e-464f-9778-cdaac16e7d23
- Curve
- C
- false
- 999d68d0-0df8-4c7b-b4a6-4f2f46f73ea3
- 1
- 1
-
5813
5552
50
24
-
5838.835
5564.814
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
5737.025
5512.471
-
6033.033
5512.471
-
6033.033
5536.409
-
5737.025
5536.409
- A quick note
- Microsoft Sans Serif
- 5ac25f26-1c60-4547-9714-8bc6267dbe8f
- false
- Scribble
- Scribble
- 25
- Curvatures before pulling
-
5732.025
5507.471
306.0083
33.93799
-
5737.025
5512.471
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
6120.025
5514.721
-
6394.036
5514.721
-
6394.036
5538.659
-
6120.025
5538.659
- A quick note
- Microsoft Sans Serif
- ecfbb38a-0006-40e2-9e32-7f91bc744665
- false
- Scribble
- Scribble
- 25
- Curvatures after pulling
-
6115.025
5509.721
284.0112
33.93799
-
6120.025
5514.721
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
6082.525
5627.221
-
6485.638
5627.221
-
6485.638
5679.15
-
6082.525
5679.15
- A quick note
- Microsoft Sans Serif
- 1979d635-54be-4cfc-8063-baa5624de2a3
- false
- Scribble
- Scribble
- 25
- The curvatures have changed.
The goal is that they don't change.
-
6077.525
5622.221
413.1128
61.92871
-
6082.525
5627.221
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
7479.749
4729.565
-
7974.683
4729.565
-
7974.683
4748.559
-
7479.749
4748.559
- A quick note
- Microsoft Sans Serif
- 8583d814-adef-4223-b20f-3876167df4ce
- false
- Scribble
- Scribble
- 25
- To check the curvature radius of a surface
-
7474.749
4724.565
504.9341
28.99414
-
7479.749
4729.565
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
3172.954
1257.738
-
3751.86
1257.738
-
3751.86
1305.028
-
3172.954
1305.028
- A quick note
- Microsoft Sans Serif
- 6ace8d2d-0c50-45c3-be52-3db84eb3431c
- false
- Scribble
- Scribble
- 25
- To get a section on which to create a "soft" spline
to connect the surfaces
-
3167.954
1252.738
588.9063
57.29004
-
3172.954
1257.738
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
4018.194
1021.598
-
4903.533
1021.598
-
4903.533
1045.536
-
4018.194
1045.536
- A quick note
- Microsoft Sans Serif
- e4654636-7797-4317-91ab-55edbb0f108f
- false
- Scribble
- Scribble
- 25
- To get the starting point of the spline and the tangent to the internal surface
-
4013.194
1016.598
895.3391
33.93799
-
4018.194
1021.598
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
4029.99
1343.395
-
4819.248
1343.395
-
4819.248
1367.333
-
4029.99
1367.333
- A quick note
- Microsoft Sans Serif
- d1941a9f-bc79-4d2b-93c3-92bc9f65a52a
- false
- Scribble
- Scribble
- 25
- To get an intermediate point of the spline on the intermediate curve
-
4024.99
1338.395
799.2581
33.93799
-
4029.99
1343.395
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
4073.037
1762.926
-
4714.028
1762.926
-
4714.028
1786.864
-
4073.037
1786.864
- A quick note
- Microsoft Sans Serif
- 86272963-4341-4bd7-a37d-2617724fe6b9
- false
- Scribble
- Scribble
- 25
- To get the end point of the spline on the external curve
-
4068.037
1757.926
650.9912
33.93799
-
4073.037
1762.926
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
5416.692
1320.348
-
5857.61
1320.348
-
5857.61
1372.582
-
5416.692
1372.582
- A quick note
- Microsoft Sans Serif
- 33e2a73d-e874-41cc-a47d-e2db277f4105
- false
- Scribble
- Scribble
- 25
- Select the "good" point of intersection
(To automate later...)
-
5411.692
1315.348
450.918
62.23389
-
5416.692
1320.348
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
5431.692
1711.598
-
5872.61
1711.598
-
5872.61
1763.832
-
5431.692
1763.832
- A quick note
- Microsoft Sans Serif
- a927dc18-0a68-4989-b6e8-74f4056f7fe1
- false
- Scribble
- Scribble
- 25
- Select the "good" point of intersection
(To automate later...)
-
5426.692
1706.598
450.918
62.23389
-
5431.692
1711.598
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
6713.25
1292.304
-
7250.481
1292.304
-
7250.481
1316.242
-
6713.25
1316.242
- A quick note
- Microsoft Sans Serif
- 634f1cf8-6898-4d0e-914a-e0f261293e77
- false
- Scribble
- Scribble
- 25
- To get the tangent to the intermediate surface
-
6708.25
1287.304
547.2314
33.93799
-
6713.25
1292.304
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
6885.522
1862.999
-
7370.471
1862.999
-
7370.471
1886.937
-
6885.522
1886.937
- A quick note
- Microsoft Sans Serif
- 09d2e85f-c5b5-467c-a8a8-d1162af08f94
- false
- Scribble
- Scribble
- 25
- To get the tangent to the external surface
-
6880.522
1857.999
494.9487
33.93799
-
6885.522
1862.999
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
9832.402
1352.482
-
10178.32
1352.482
-
10178.32
1389.865
-
9832.402
1389.865
- A quick note
- Microsoft Sans Serif
- 8c345115-e40c-453a-963a-5caefacb8e68
- false
- Scribble
- Scribble
- 40
- Here is the spline !
-
9827.402
1347.482
355.918
47.38281
-
9832.402
1352.482
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
9189.442
1391.848
-
9384.56
1391.848
-
9384.56
1415.481
-
9189.442
1415.481
- A quick note
- Microsoft Sans Serif
- c29c6d60-61e0-4694-8d45-a7eb0b5f2ad2
- false
- Scribble
- Scribble
- 25
- Merge the points
-
9184.442
1386.848
205.1172
33.63281
-
9189.442
1391.848
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
9199.442
1640.848
-
9425.504
1640.848
-
9425.504
1664.481
-
9199.442
1664.481
- A quick note
- Microsoft Sans Serif
- 4fe7c02f-89e1-4696-af6a-79b5d3c21807
- false
- Scribble
- Scribble
- 25
- Merge the tangents
-
9194.442
1635.848
236.0615
33.63281
-
9199.442
1640.848
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
8621.442
1631.848
-
8775.153
1631.848
-
8775.153
1655.481
-
8621.442
1655.481
- A quick note
- Microsoft Sans Serif
- 276b5f95-c507-4dcf-8c46-331fd270630b
- false
- Scribble
- Scribble
- 25
- The tangents
-
8616.442
1626.848
163.7109
33.63281
-
8621.442
1631.848
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
6216.58
1545.735
-
6339.346
1545.735
-
6339.346
1569.099
-
6216.58
1569.099
- A quick note
- Microsoft Sans Serif
- 11ab8865-3d86-42a0-80fe-52aabad62cbe
- false
- Scribble
- Scribble
- 25
- The points
-
6211.58
1540.735
132.7661
33.36426
-
6216.58
1545.735
- 7159ef59-e4ef-44b8-8cb2-91231e278292
- PolyArc
- Create a polycurve consisting of arc and line segments.
- true
- d9bd9867-af96-462c-8f56-2eca8a79289b
- PolyArc
- PArc
-
9961
1220
74
64
-
9992
1252
- 1
- Polyarc vertex coordinates
- 1ca41491-b997-464b-9dae-c04491fb1fab
- Vertices
- V
- false
- 9537f8df-d178-4d33-b86b-d7f72470eb7f
- 1
-
9963
1222
14
20
-
9971.5
1232
- Optional tangent vector at start.
- 867da44c-5677-46bf-bf0a-999de0f7d341
- Tangent
- T
- true
- b4f2c792-2619-4fbb-b78e-066a924a69e8
- 1
-
9963
1242
14
20
-
9971.5
1252
- Close the polyarc curve.
- 53993285-e4af-45ac-9412-e9df5c672800
- Closed
- C
- false
- 0
-
9963
1262
14
20
-
9971.5
1272
- 1
- 1
- {0}
- false
- Resulting polyarc curve
- cb0bc9b7-acb7-41d6-b3e3-a8ade80b4699
- PolyArc
- Crv
- false
- 0
-
10007
1222
26
60
-
10020
1252
- fbac3e32-f100-4292-8692-77240a42fd1a
- Point
- Contains a collection of three-dimensional points
- true
- f67d0ab3-a108-44d7-a979-c18a801cc197
- Point
- Pt
- false
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1564
50
24
-
9868.552
1576.392
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- Contains a collection of three-dimensional vectors
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- Vector
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9844
1598
50
24
-
9869.352
1610.192
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- Point
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- 1
-
9811
1211
50
24
-
9836.852
1223.192
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- Vector
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- Vector
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9812
1244
50
24
-
9837.651
1256.992
- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
- Curve
- Contains a collection of generic curves
- true
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- Curve
- Crv
- false
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- 1
-
10067
1241
50
24
-
10092.3
1253.992
- aa1dc107-70de-473e-9636-836030160fc3
- Evaluate Surface
- Evaluate local surface properties at a {uv} coordinate.
- true
- 944621c2-870f-458f-bb56-2e63e9a6c4cf
- Evaluate Surface
- EvalSrf
-
7247
1593
71
64
-
7283
1625
- Base surface
- 666643e4-26b1-4807-9c92-2ebb624ba2bf
- Surface
- S
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- f11f313c-d7e8-4600-aecc-4003be32b290
- 1
-
7249
1595
19
30
-
7260
1610
- {uv} coordinate to evaluate
- true
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- Point
- uv
- false
- fd748b76-1e45-48c6-9a58-1905845cc662
- 1
-
7249
1625
19
30
-
7260
1640
- Point at {uv}
- c75ee843-9e03-4fc8-9c55-0285bd6c3bdb
- Point
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- false
- 0
-
7298
1595
18
20
-
7307
1605
- Normal at {uv}
- 4fd74302-afc9-4764-8dd2-0719b8fc9be3
- Normal
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- false
- 0
-
7298
1615
18
20
-
7307
1625
- Frame at {uv}
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- Frame
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- 0
-
7298
1635
18
20
-
7307
1645
- d5788074-d75d-4021-b1a3-0bf992928584
- Reverse
- Reverse a vector (multiply by -1).
- true
- b21f7ad1-5942-478b-bd23-69e8980b5662
- Reverse
- Rev
-
8850
1756
65
28
-
8881
1770
- Base vector
- 46a24874-7009-4b24-83cb-3ea1a14df4a3
- Vector
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- 1
-
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1758
14
24
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- Reversed vector
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- Vector
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- 0
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1758
17
24
-
8904.5
1770
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
9741.641
1404.648
-
10318.74
1404.648
-
10318.74
1484.873
-
9741.641
1484.873
- A quick note
- Microsoft Sans Serif
- 553c3c4f-ab16-4c75-9c88-3349b5e29fb3
- false
- Scribble
- Scribble
- 25
- but the spline is not regular when the parameter t
changes on the starting curve
and the curvatures are completely aberrant
-
9736.641
1399.648
587.0996
90.22461
-
9741.641
1404.648
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
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-
9876.042
1154.848
-
10107.07
1154.848
-
10107.07
1201.833
-
9876.042
1201.833
- A quick note
- Microsoft Sans Serif
- 8f2baee0-f8ce-4b31-9676-b060724e868b
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- Scribble
- Scribble
- 25
- Try Poly Arc
but without success
-
9871.042
1149.848
241.0303
56.98486
-
9876.042
1154.848
- 50870118-be51-4872-ab3c-410d79f2356e
- Interpolate (t)
- Create an interpolated curve through a set of points with tangents.
- true
- 489aef15-c44c-49a1-8156-1ae54968ce1e
- Interpolate (t)
- IntCrv(t)
-
9969
1766
71
104
-
10005
1818
- 1
- Interpolation points
- 07ba69ba-a2fc-4bd7-8815-8b8b9dac14db
- Vertices
- V
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- bffae313-0975-404c-b99f-ff79a4970a0c
- 1
-
9971
1768
19
20
-
9982
1778
- Curve degree
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- Degree
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- 0
-
9971
1788
19
20
-
9982
1798
- 1
- 1
- {0}
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- Tangent at start of curve
- ef66cf85-a75c-4094-94b0-ebff34a5ff04
- Tangent Start
- Ts
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- 6cea1a44-770a-4039-af2c-6115f6e80b0d
- 1
-
9971
1808
19
20
-
9982
1818
- 1
- 1
- {0}
-
0
0
0
- Tangent at end of curve
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- Tangent End
- Te
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- d786c584-f203-4f24-aee4-f6b3a53aad12
- 1
-
9971
1828
19
20
-
9982
1838
- 1
- 1
- {0}
-
0
0
0
- Knot spacing (0=uniform, 1=chord, 2=sqrtchord)
- cc4a34cd-6fd1-4033-950b-b8b17b746d35
- KnotStyle
- K
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- 0
-
9971
1848
19
20
-
9982
1858
- 1
- 1
- {0}
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- Resulting nurbs curve
- 54cfc437-f728-4790-b27c-748e77a824c8
- Curve
- C
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- 0
-
10020
1768
18
33
-
10029
1784.667
- Curve length
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- Length
- L
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- 0
-
10020
1801
18
33
-
10029
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- Curve domain
- 2b7a0b03-8845-4a49-b5e3-8cef7f246710
- Domain
- D
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- 0
-
10020
1834
18
33
-
10029
1851.333
- fbac3e32-f100-4292-8692-77240a42fd1a
- Point
- Contains a collection of three-dimensional points
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- Point
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- false
- 2898dc90-85f1-4461-864b-76ddc8a889e2
- 1
-
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1764
50
24
-
9817.151
1776.792
- 16ef3e75-e315-4899-b531-d3166b42dac9
- Vector
- Contains a collection of three-dimensional vectors
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- Vector
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- da3cae09-14c5-478e-977c-6badd28027d2
- 1
-
9808
1809
50
24
-
9833.552
1821.392
- 16ef3e75-e315-4899-b531-d3166b42dac9
- Vector
- Contains a collection of three-dimensional vectors
- d786c584-f203-4f24-aee4-f6b3a53aad12
- Vector
- Vec
- false
- deb4f8a7-0010-410f-8e45-029112a2d10e
- 1
-
9809
1840
50
24
-
9834.752
1852.192
- d5967b9f-e8ee-436b-a8ad-29fdcecf32d5
- Curve
- Contains a collection of generic curves
- 6f0f047a-db1f-4a60-bc20-fb0bb9f89ced
- Curve
- Crv
- false
- 54cfc437-f728-4790-b27c-748e77a824c8
- 1
-
10071
1772
50
24
-
10096.25
1784.942
- 7376fe41-74ec-497e-b367-1ffe5072608b
- Curvature Graph
- Draws Rhino Curvature Graphs.
- 537736b2-c1ea-43d4-bc9a-c0241f6bd523
- Curvature Graph
- CrvGraph
-
10187
1781
46
64
-
10219
1813
- Curve for Curvature graph display
- true
- 24ad0d8c-bc81-4677-9861-3d92942a8080
- Curve
- C
- false
- 6f0f047a-db1f-4a60-bc20-fb0bb9f89ced
- 1
-
10189
1783
15
20
-
10198
1793
- Sampling density of the Graph
- 7aba5b7b-7115-4d2a-962f-bd91b88b0c6c
- Density
- D
- false
- 0
-
10189
1803
15
20
-
10198
1813
- 1
- 1
- {0}
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- Scale of graph
- 18eef13c-f629-405b-8d2a-486a786b2f9c
- Scale
- S
- false
- 0
-
10189
1823
15
20
-
10198
1833
- 1
- 1
- {0}
- 105
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
10213.25
1166.101
-
10856.16
1166.101
-
10856.16
1274.658
-
10213.25
1274.658
- A quick note
- Microsoft Sans Serif
- c9529df7-0b51-4aa3-96da-b0df43be4956
- false
- Scribble
- Scribble
- 25
- Here the radius of curvature should be 96.36 mm
since the 3 curves (internal, intermediate and external)
have the same radius of curvature.
We should "reconstruct" a spherical surface.
-
10208.25
1161.101
652.9082
118.5571
-
10213.25
1166.101
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- 50b96d63-5d6a-40ed-baad-505a7b763988
- Panel
- false
- 0
- 0
- In t = 0.662, it almost seems not bad!
-
10066
1871
160
46
- 0
- 0
- 0
-
10066.59
1871.23
-
255;69;235;19
- true
- true
- true
- false
- true
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
1136.441
1382.969
-
1765.994
1382.969
-
1765.994
1458.555
-
1136.441
1458.555
- A quick note
- Microsoft Sans Serif
- 0028826d-434e-48ff-bcf7-42dc8d30705e
- false
- Scribble
- Scribble
- 25
- Input curves to do a first test
where a spherical binding surface of radius 96.36 mm
should be reconstructed
-
1131.441
1377.969
639.5532
85.58594
-
1136.441
1382.969
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
1161.941
978.656
-
1480.667
978.656
-
1480.667
1002.325
-
1161.941
1002.325
- A quick note
- Microsoft Sans Serif
- 4d690dbf-1fe1-4be1-8f48-098da2f65515
- false
- Scribble
- Scribble
- 25
- Other input surfaces to test
-
1156.941
973.656
328.7256
33.66943
-
1161.941
978.656
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
2739.441
1378.656
-
2851.208
1378.656
-
2851.208
1402.289
-
2739.441
1402.289
- A quick note
- Microsoft Sans Serif
- 11f6525f-adae-42cc-aa2f-6b0d0989c15c
- false
- Scribble
- Scribble
- 25
- Fourth try
-
2734.441
1373.656
121.7676
33.63281
-
2739.441
1378.656
- true
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
- 1
-
150;135;243;255
- A group of Grasshopper objects
- 11f6525f-adae-42cc-aa2f-6b0d0989c15c
- 1
- dc12c90e-02ba-4bdd-97c7-01ac2be7ff68
- Group
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
4656.201
4644.832
-
4743.25
4644.832
-
4743.25
4668.465
-
4656.201
4668.465
- A quick note
- Microsoft Sans Serif
- 230656ea-b112-46be-a9cb-438f3c67f42d
- false
- Scribble
- Scribble
- 25
- First try
-
4651.201
4639.832
97.04834
33.63281
-
4656.201
4644.832
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
- 1
-
150;135;243;255
- A group of Grasshopper objects
- 230656ea-b112-46be-a9cb-438f3c67f42d
- 1
- ef309344-3f7d-4470-9908-e8f2b1ffd454
- Group
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
4642.451
5012.382
-
5002.705
5012.382
-
5002.705
5064.616
-
4642.451
5064.616
- A quick note
- Microsoft Sans Serif
- a5610b71-0a7a-4531-bc55-ad42c50bf49e
- false
- Scribble
- Scribble
- 25
- Second try from Joseph_Oster
Thank you Joseph
-
4637.451
5007.382
370.2539
62.23389
-
4642.451
5012.382
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
- 1
-
150;135;243;255
- A group of Grasshopper objects
- a5610b71-0a7a-4531-bc55-ad42c50bf49e
- 1
- 992e61f1-98a5-42c4-9db0-852c30393f68
- Group
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
4619.998
5741.188
-
4717.105
5741.188
-
4717.105
5764.821
-
4619.998
5764.821
- A quick note
- Microsoft Sans Serif
- 9ec246ef-b8c3-4a1e-abfc-725796bd223a
- false
- Scribble
- Scribble
- 25
- Third try
-
4614.998
5736.188
107.1069
33.63281
-
4619.998
5741.188
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
- 1
-
150;135;243;255
- A group of Grasshopper objects
- 9ec246ef-b8c3-4a1e-abfc-725796bd223a
- 1
- 62db3b3c-6d2c-409a-afc9-09cdbc3cb867
- Group
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
1704.234
1012.815
-
2527.378
1012.815
-
2527.378
1064.78
-
1704.234
1064.78
- A quick note
- Microsoft Sans Serif
- b037ce88-11c2-401a-bc42-d38f707e8f88
- false
- Scribble
- Scribble
- 25
- The curvature graph of the internal and external curves
must remain the same, so the Pull component does not meet the need
-
1699.234
1007.815
833.1444
61.96527
-
1704.234
1012.815
- 7f5c6c55-f846-4a08-9c9a-cfdc285cc6fe
- Scribble
- true
-
2876.44
4519.405
-
3389.311
4519.405
-
3389.311
4564.991
-
2876.44
4564.991
- A quick note
- Microsoft Sans Serif
- 8aac1cb5-050e-4fd3-a846-b47c81a226a7
- false
- Scribble
- Scribble
- 60
- Ideas for solutions
-
2871.44
4514.405
522.8711
55.58594
-
2876.44
4519.405
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iVBORw0KGgoAAAANSUhEUgAAAJYAAABkCAIAAADrOV6nAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAABnYSURBVHhe7VvpUyJblu8/bebLzIdZOjrm00zEfJmZ6ImY7tf9tu5+VV31qlyq3HcRRVQEBVFAVHABQVRWwQ23Kjd2EMulNutVvXpdzi/zpGmCiJa1ifqLExl3Offmvfd3z7knk+RXN7gKOLxBzuKYwsgNchA3FOY8bijMedxQmPO4oTDncUNhzuOGwpzHDYU5jxsKcx43FOY8bijMeZxJYSgSZSQcCUIi0WCETRxlhVXHmmyC08Q1VYcSJFwTXkjtMwkzwjA3y1xGNgqjsbB3PDrel3QN7XhNz6ZMz7ym556Rp17zC8/IPrIQ9/Ce14zCfffIvsO4PYVa0zPX8B6qfKMvmKv5hWtol231HAnUIuEe3kcJ9FHiHNyBIG03bnO1I/t2QxLZTyoTfcmluVAszk02d5GdwpBr+Ikof7K+wFqbZ67NGy38Xl2XP1ryg7613FuXb8n/VlXwXVfNfVNHjb/0dl/1veG8b5UND8YbCm3533VBGSUlt/RoKyl2Qh/Kpbf7K+4Ym0ucooIxRfXcva8Vf/19a13e6J2v2torZ6ADfVnFtF33drz7la37wKZ+aVPj+vFltOPA7w3HE9xkcxcpFEaPQHXReGjKvCOvmmurdHfWzUGaSyfl1V5ZpUcrWe2smxUXWRuLbbIqj655DYXK+nkoqER+TdPjtgp3U/G4SrTAlNT7O+pm5TU+Rc10w0NLe9UUFOTVvr7WAK7t1V6t5LH4obW9ygud2vzhroaFCe3BWPczW8/zcc2LTyRW1YsF35WjMCBAMBgMhTcdQwnxgwksa+W9Acj9b9ur7xuLfugGYbUFsDl53neKirv94Kb0rzrRg9H87zsaHliQePiXrrzv5CisujdA+kziVjd6qLpnQCfQaa1wFd/qgZr4oUVSMv7H/y7HJrj9lQR0lt/V3/tGhq0zZXjn0L9x9P5kJ9G9mtS9cvS+dvb9jDTKkQUfqGLK9a+P1H5y6t9AB4Vs1QFfDh1UoYerSSFo48GwGNpwDW/BB0rLHLAnmF1rhRtsIYsE7KmuYBiLDgtTi5egAHuSlEzA5rpEC+qGRdgolFvKnTDf7sZlaZm9W7yMKjSkREftLFqhB3AJ20X/XQ2L6A02jVpYJKxT37KJtr3N60j0Stf7W4NGeRQ+oKN2xtAeQYmxPWLreYZagyyCYehbNpAekIXRs7xmGoY+0BYaUiQMsnAfUx6CDsaDHq4mhVwZC7jTWDzsteyJCm0wJri+1grnwx/UMCBc6wpMdQUjf/1Dc1OxTVI6CVKLflBDDUZWcltTmz8ELwqLLL+jRyHIK/yTsuS2tvS2FmwV/Kmz/G6ftNzx4zdtsMWWcgea3PmjFLYOewXBogdmJKrzBhuLxtDt/W/lyNbkD6GhrGoKd4eNFv5ZicKC7zswHvCK5uScYbsoz/9ececPUqj1tW7e/n1TA+seSO5903b369bbXzX3SoLLs/GrTCGAcMZj2pZXzcOFwvthd8OksGQwNRyBPY0rMB1l3RzMCCsLE4RVgSFQghJx0RgWFPrgDwJzxFGH7Q/iYQFgDpuA+oExkb1iN6C5pHQC3cKIYZHIYiuAVBgoTlwcw7AtuNyavCH0DDOlWxff0kAThy66crHOE0cp3Cw854T25aT2AGeqVb3POuEDVhhvbO7cv+JWCIDCqdGdxof2yh/7sehY2fzvFDAOUaEZdoOoBBw0lYzjCgPCEoMDrCPOPEXtNA65irt9ONjgbHEQYonRA1YcOwDUYk+wNoHejLrm1bpCEyisLzRX3TdCAZsA3cKyK37sx+1q8gbRf9kdHapgT9CElZfd6YUvBff1hSYIRghlEI/TURizsPJyAqJ9mVZ49R0pAAqdw3F33+Hs8KHPeOjufztlOPQNHnqNTAkCDaQ9A39DlgohyM4McQpIQ2dmmMlSQ3f/L4ym4XB6iKlFn1B29b1FwmN4Rzqooq4QdOCOsCqKPphQhTUvEEBBClgBYah19b91D/yCDqGWylM2uS4Uekd3ZRUz2OYIQBALwAeqG5Zw6sAUEGXAMSJw0EgeY/vDRhU1TIgB64QZ4YrwAc4QNoeqbvESTFDT9Ki7cQUJxBQIVdAcvheRC7pS1vuhj55RhYcKlCBIEa44LAmmw8oLOMaxnmfW7qcW9b6la2+0axdiUe/BW451Pz16FOGUT5PrQuHU6K5eGgaFCEbguBAgkONiY4o+eEucc3iugJdDQAHvhxMRtQhDEG7QKQgdpHHm4eGhtdyF6IaJZcocOFzhTtEPnCEbAQ3D/aIEsQyrowcTMGLYFmwXNgdTg73C5lACQYJlQkBq9zNQCCI5RrvOYPT6ULgDKwQBIAMMwfhwOCEBknCAwYAQ/uEMQ2iDOAVPhDi3KHDHIx3ORTABO0MVo18wAnNEVzgUEeygBIcoQpX6AhPMEQ3RIeiHdcKIUYs4BYV0OuJJETdCCAPjrvixj54sYYUnTjgIVwIjZs10z5KJUdj0taAQDxWgsKv+EcgAT7AweFEw0VbpwVo3l9p7mlaw3GAXrg9RIhKwIThPUILQBkSCidZyJ5xtW4UbpIJChEJoAg7QD54rkAWRaNJYPIY+UUhPkLgjXDf2ClikrnAFhYhImQAnH/dyHHGWXQSMCm1UvWfufOr3hkAh/zYqR5FC4WYqAsH1ycHoeM/rSe3rSQ2uFEG8RlyOK4ILLA0fu8OzIeFg/BsTxzNq2gOKRJhWejYegT9EeMIIF6rAScJDogpZ8pCUhrAJBCnvcKU0HCkSpIa2RyS9h7AHKnndp+aO/Rn3RjC8gZkGg8FQKITlyEU6UygMs8BkcI3FYqFIwNYf6mlcba7vb2sytoiGzaodmr9Q4K9Y2cc2J2GiDHgwkq40gU9j7OCksFUCTab5UZ/Ht3sGe8IYGNGkvUEFPUIRVmUQq+olOVLMNxAIgMiNDY5OTB9Lkyt0plBIRfF4HLOamZmZ8roGu5bhP5skHR3K3kZx10hHEgF92lqkCreCzKPYkfCFJ5Q5ARkcK2yoCZ6ON4caQtuC3xDp3JNwO4CNSwWsH1MuuCMzqjHVy0WWQlBFwNx5OgF6UXz56UynMJFIrKysOJ3O5eVlnIUzY8/7WoO1dbJmqbquRjnSuT2pzU7hp5CUPXFyNxzR/4yln+WeZ/3IplPJZkpMHXuz7s1IlH2hz4Jn6ySdl9nTplAI+5udnfV4PKhAmn0u3NNK1gofVJVVNhQ9FJtA4RlWeHlESPlxOU/2aOfTOU8gHAFNHE9pICsESAFuFkCa55LALuMXAwaWQqHb7Z6bm2PIY0cGCt2mbVPnnqpxRiWe7pYspLqj3JajhwoiggEtCkABAUD88QCFa2trj1msrq6ur6+jEGrQJwsGuL4+PbW4Be6OEaZQiGHBkXIqcKpb0SnzkzH1QV/7Wq9subdtBa4p06NYTsr5nwtPUgLCsHygECsGgFekWdPlQIubkV1KfzjQFW6EzlMoRBRK1TBEjMC/MDug9LdXztTXydsVmgaxvE+2Yde9x3vIyywf/mjPU4K1SmMOQJoKAZgvJT4utegwnUKqAH9+v9/lci2t+B1DcaNsq6Fe1SbTikQd/bLNGwozAhxgNXkukUBWyA2yYA7lPLU8r4CQWtIXts0I1KJhOoUoBX9er3d6ehoWyTrSHaMsWV7WXC+WlZU36tvWHb30cjLn5QIUQjm+Fc4iiS2cPpFYIoRANxTegCCBLJWzOkziOJsIx+KhaCwYiQXC0c1QZIMRtmGYSTDMnsYrEqhGbQqFoA0RDUxwa2uLUYqFnEPbQ7K9ygfdFQ+VZQWd/a0RW/cri+r5FRCT/Pn8FPOC7dwI+70hvye56E36PYkl3/aid9s/lYAggcIl3xMkFqa2IIs+JgGdeXd8zhWfdUXRxO+JQ41V3oYyUzKVYJS9yZWZ3eXpHWrC9pOccyXmpzeDofRombdXDAgJIIVCPA4uLS0dRzTRyMpCcGE6sjQTW/RFl6ZjizORhenw1RC/L7y+GjrnGQS1cCRo799rLvLJK+f6pTFFlV9eNa9rCkI6qhc6a5ekJR4UasQbPeJ1Ze2yXhKWFLnayqdby7ydNYtI9Ig3VLXL0IF+S+lUrySkbQrIK+e76h+JCmz1+WPoCppNRQ5F1by6dtNtSsJMebM76YoRQyE2TqEQkRXsjzVWDoi5yfZxZQSe5MrIFtwMFobW5wwQha7BvV5JQFw0Jio0//A7cXPpZGuFq73aW/hnZeW9gZq8wZLbWnm1t6nYVl9oltf4im/1VOcxnxq1lDvK7+qlZXaUF93qufeNjD47anho6WvZRHOUdNbNKmqm//J/DWgFqbln9o3twM1yIxCAqKE0DtQUCkEsxccAHbYnj1kewo6uPFgKQw7Dk9r7zE9jIKO2YFhSMlFXMCJ6MNpW6anJG6q6N6AWL4FU1Jbc1oAeScm4+KEV566z742DfgbgXvQzb//pJQOuqKLfRCfZzxLYnwF+ntT87BqNZ6SQB9YfHKVTCIA8UAguATz00JMsgZ6BeHaJ4DSOrySvZIXOwd3WsinYCgT8gbnGYltj0ZiS/dZZXGTtalgEf9JyR1uFu77QBAqbiieG5W8sqsNRZbpYlIfmzncjirdD8jfD8p9NHX+jQqa289Cq/Jv7HBRi8VMoZMwqE6AtdMTEsdBSAZZ9DshCk0jle8hpEIV2Q9LR+4tT/wbi6n8LW+F/F0MJ86NY72sYGQmy7v7DCd2OfbjBY633WHHNIFNWsccqdo3WO8w1bouIKbQ0eMaqTN1ml2kvO4UASEmhkCvOiCgzDSEfwqNVyBmVE5dCb8wzyrb+HMCdEtFI/ISgkHuFcW4cUbht62a+vzqnTGjemroWn+/94+HhPx2++5dscgj5V0H277y2h+MDLxDOcCM4BVjVFAoxyuzC/uUsBUQJaOMNEWxROV/FM034PHSiazw0rQRCj4Lh5c3AymYQiZVAELK0GVgPBt/r3hemUN/m3tv+t8Nf/v3w5//IKO/eZMoe/nrKWmnp3WEeENlXBNw4MiGFQrsxmVW2Jw0JBOJHr+FSQLfB/TJyCbBax2STgfJ0fnRsRSPTm6GSYLQsHBXvvKpPPq+IJGq3ntYm9queHBg3wsnwGT5KiAtSqP1F2TC6m/xNFgozy+GvfbbqCcPzMPMSjQHWjR1GBi5TKMRj+0TPa+YvYd0Hk5rXE5rX4z0/TWreoJwt/Mna9Wx15Yz/5NFteC5xxe2F92b4ZLNptnvmdnsvgMK58NYPj+b/163/rUPzW6f2Py0tf15y/9eE6vvV+eHozkeh0KF749D9TMK+emR+ybHrmP/fsHLIONL9fzg8/GfWVUJ+A3qO0lnk733jRRMDL5h3N9Eov1C4pq0SqlIonNC+HOlMTuqYURrbo8MdW2blE4MsPMZ++GXreTHWs7/26Lx/q+R54kniC3lQNs12PwqXoHBqI1i6/bJ852VhJFYU3y5N7pdvP38Qjd+PPxkIxj+AQu63GixIt3RO2exUSd3KZoeudXlSi6eCl0Z52CAPGdqDw51Jizo+bmzxWNp9VqXL1DakKbMPNU/blC5zm8vcepo4RxvN6nGXaRcUxuPx7e0kJJlMxOMxjIRWMhZD+sRDxe2vJLd+11jwp04Eyne/bmU+DS0e//p/KhA63/u2/c4fW3TS1cBa7H3/GYs7CY0yI0NCLsnHgnuquhjg7DejQXck5I1FffGYNwaJTkUjvljME40uRwJJwevKLBJnX1URhQ7jDnwSKLR1Mxt6VPm0skReUSWurGourxRVFan7pdGOOp+oXiGV9kilanFdt1m5O9Z12N/6rEcS1TYnOurXRUWelvJlPE5keNLofIdyVpB+6zRH41vhmZlZnc7Y3z9CYjSalpeXl5aWFhYWkMBypVDYJVrUNa/pWzZhfybl9pAiPtyRGFTEkR6UxyGjXU/WHocv9udmIgk7iLG1U4wSoBLedfBqQk3KnoXI8lzEbw/M2zf9J2TWEfDaN31ZxTu5OeMML85wdwyFgxZdiPmDnGzDIA8aFSGzOqGRznc2ulVNU51id5/skU2zq2yYqaqWSKQqibSzqqJNVb+glwYqH6qKS2tKyxrKKxrLK8V5d0SGtqi1+yl98kNX/psg+i7E3PnUPsy8OrfZJsrKxLW1rZDq6haRqHVmZsbv9+M6PT3t8/lSKGyXDTQ3afSyRy79W/4fQPRPBjb9k63n6fkdKQ9aUSGERslbGwoBZHmAP1jkGvvCCJrIAkicjSCjbOhaMBmdE1bfuMV7AZm0efvVnqGO6PoG7r4ZDoV72jyFBfUV5dLSEkllZaPdbne7vB6Xz+3y4epxe0fNY5IyW+VDdXWJurJYVVfSN6ZGVPFmUJ7QSB5rm9cgGskjZBFqMP9BZ8OOjGJVvnaZt+gdKbtUjGfCFauSSMCjMoAvxYqlUKjo7JVIlfDvTv1b+HRejrz/y5NnIa07D27t2dXnwS0rO5A0gJ7Hjx8/evRolf2OASVCNaSpOaroxRCVnI1QEEMw61aHdLMWg390YP4CYjHOG7sWrdokbso8Fsei44Pr3W1urdytkbt1CveIzj/S62euJL3+Ie385EDSYdid7H8CsQ/s4PhEidO46x56eiTPnIN7k4ZtVGWRib4d3wTzNTYoBFVCsFZwjBQKmyTK2rpWhciNyNOkfIJYhhHVDmSUkT2TKrm8sB7kApQzgJkTuFUVgPimTYBB4AoFXhlVKOTGy46YEignBSrB9VQwlSG74cmwfGe4I3lBUSRHOnYm+p5gZ5IXxzWR2OIkvsXeRiAR5opDIHwsmEsQHjgUDhxLKBBkZJOTICMBRjaOJbCBZ1dsZlqT7EihsLhEVFBY1SHyjGsOUj7X5CjcNSmTS/413I8YImKIDFq684BZDBYMjSyoE1zRIXlO/oMU/v0ODzJcXJlBnAZ28oNq/6jZ6nI7HE77BcTlclgs1gGln/GjvGvI4EreH8zwSI6ADcw4f5L3QwqF+tb1vrYNa/c+nmnYs/BgUnuAg5AVeNQDONLVlWA0dvy+FOPBKvNghsdSC/A6BHbsnDKlT4I0qTmy0ASLYAsgOlGLbgGqRYLbDmlgQ6LxvqixY2NQtX4xGVKtGxQbVh3zYfSJEyMddNszwe3ic4NrlhUpFE704NH+FWtt25wjVTGOlDFBxhz3zKrtlcV19oOAY7CLz/z8SMsNA+JB6w4+sArcXFlwNz8CN14B0grRBD2gH/52AHqmH09QyJLOAGoMoB4O2PriZk1g3LBpG7igWPQbozqmV6KQRgvQqLjMl0YKhV2SGbVkDvxxnz+z5BGF7JVzpHQW0sIxy3XkSOnEAmh6tO78opM+r8zc/P3BN2RWlAV6xr6hjXJMMOumhpTrA1rbhM05ZnFcQGxWp2nYpldMb6yjZ65jHh9lOh8FKRS2K7RicYdRHrGzf0c6FkFECkcaiXIBJ79kWEFKpE2MgDRK0uhElnSYUXwAqAd0CLB34xGec0fspo1J06rdtHYxmRxZm7anj5Pmwk+f5k6zFqp9NqRQKGvXNYiURnkYj4D0DilV0h8q2JXiBp1xYkifZBRZFPI6H4VLNKc+hesYS9AnZdGLSzJKb2cygpkMey/h7sQwqIpV+RxIobChUV5R0WxoD53ysWiG58KT4EdPVJ3cqqRDapg8O3GGbOHqXwBoix7oLh/Sz8XATwcTwWRx5Qs/NVIoLH0gL8lXGGUJm/qVRfXihLw0K+FI3+/tDE0Di8tvVZohb3ykQDZEBHwgl+gc4DKfHTRyDIAn8lMjhcI5d3jeE/F7o/NTuKYLCuenwoHN8364dxIsX+mOFGlhFaaNQlwvTCRaoc8vyCJAIyciaYKfDikUHr2bZ74yPkUwOq7lB4ImKTxFeLvElTgGLkYkmqA3NOfyXwg8kReeyHmQQiFX9nlBE6MVB3j7A/hCJEjtvYB+0JbLfDnwE/lEjuHLU8gDU8Wi8/ZHtPHzBy6wkS8Ji4RPZI6XiEICTS/N/oALb+TLwyJmQYPBNkWaK/1gXDoKheCJpDkDSFwgQLhUtgjw5sjlPwyXmkIAtBEBAFkkCi+wBLQbuMyXBmZB4/ko5njZKSQIiURCuAScxjkAZXD/4Uv2EUEz4jIXRW5QyIOY45kgc6SqM4Em0P8oG/9jgfbiBz475hiFBEwYzAnNkdJc9ekgFtGEy18a0F7EwC6wvXKSQsyT/Cpvjkif37yIci5zOYCR016ksb0XkTlJIQ/avDRnJJDlKrKCFovLXDLwRJKrOA+XuU0hZkjmSC6IAhau7nTwmudZoC8CnkgMkhxGlqHmNoU8aLaY5/ktDGq00y8nMBeQR6c+gNlhtDydAKkBV4RCAJPEVDG3c7JI5stlLjeIS0yQftsBkEYJgMleHQqF5J2HRejTugh39GUGjRN0YnY0cgDTvDoUApgkb1vnNDLoQJPL5BowX+BKUUjgyTuPLZIOFoLL5yCuIIWAkEV4GyrMCJAHTahx+RzE1aQQ4FlkT/1sT/2kmbuGeGUpBHgWYYiws9NIQjkUQDOXzzVcZQoB/jjEFYxS4UnktCFecQoBOg55i8wIMsQcPRGvPoWgh45DssjTTC13DfHqUwiAGHKkdOZl5Il0ctEQrwWFBGIRVy5/AtnN9NLiGlFIVkhH42k8Ec1cJkdwjSgEbXQonha5kEIWgi8nrhGFBDrwsrjTLFWXE9eOQjoOT7M2lBDHXD4XcO0oBEkgDxSeZm05F9RcOwoJWQwROI3dy4lrSiHFpcDJ+JM3Uy5/6XFNKaQzj1g8aYi55UuvKYVAFkMEcsiXXl8KyWGSLaYZHNlorsSl15dCgB4wgJOGmEPP+CkU3iBHwVF4gxzGr371/0ABWOiJNcNmAAAAAElFTkSuQmCC