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150;170;135;255
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150;170;135;255
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150;170;135;255
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150;170;135;255
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150;170;135;255
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16
284
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16.83136
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17
244
195
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17.83136
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254
234
55
84
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280
276
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256
236
9
20
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262
246
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256
256
9
20
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262
266
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286
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256
296
9
20
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262
306
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295
236
12
40
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301
256
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295
276
12
40
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301
296
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337
336
55
84
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363
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339
338
9
20
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345
348
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339
358
9
20
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345
368
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339
378
9
20
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345
388
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0
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- Corner type flag. Possible values:
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339
398
9
20
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345
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378
338
12
80
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384
378
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16
336
174
20
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16.14278
336.5076
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257
354
55
28
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283
368
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- Value
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259
356
9
24
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265
368
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298
356
12
24
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304
368
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423
346
57
64
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449
378
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425
348
9
60
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431
378
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- Control points of the Nurbs-form.
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464
348
14
20
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471
358
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464
368
14
20
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471
378
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- Knot vector of Nurbs-form.
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464
388
14
20
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471
398
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- Control Points
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- Control Points
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326
233
57
64
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352
265
- Curve to evaluate
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328
235
9
60
-
334
265
- 1
- Control points of the Nurbs-form.
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-
367
235
14
20
-
374
245
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- Weights of control points.
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-
367
255
14
20
-
374
265
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- Knot vector of Nurbs-form.
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-
367
275
14
20
-
374
285
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423
444
55
44
-
449
466
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425
446
9
20
-
431
456
- Recursive decomposition until all segments are atomic
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425
466
9
20
-
431
476
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- {0}
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- Exploded segments that make up the base curve
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464
446
12
20
-
470
456
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- Vertices of the exploded segments
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-
464
466
12
20
-
470
476
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504
444
55
44
-
530
466
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-
506
446
9
20
-
512
456
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- Dispatch pattern
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506
466
9
20
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512
476
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- Dispatch target for True values
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545
446
12
20
-
551
456
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- Dispatch target for False values
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-
545
466
12
20
-
551
476
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- Dispatch
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- Dispatch
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-
589
444
55
44
-
615
466
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- List to filter
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- List
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- false
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- 1
-
591
446
9
20
-
597
456
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- Dispatch pattern
- c3926fb2-b387-4d36-8349-f339b413e916
- Dispatch pattern
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- false
- 0
-
591
466
9
20
-
597
476
- 1
- 2
- {0}
- true
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- 1
- Dispatch target for True values
- 89152845-95b7-49c6-aede-e78a44b01ed0
- List A
- A
- false
- 0
-
630
446
12
20
-
636
456
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- Dispatch target for False values
- 8b260c02-79ae-40f9-b022-ebff10065f17
- List B
- B
- false
- 0
-
630
466
12
20
-
636
476
- 2162e72e-72fc-4bf8-9459-d4d82fa8aa14
- Divide Curve
- Divide a curve into equal length segments
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- Divide Curve
- Divide
-
638
325
55
64
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664
357
- Curve to divide
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- Curve
- C
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- 1
-
640
327
9
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646
337
- Number of segments
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- Count
- N
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- cf97a39f-9ed8-41e3-8ae3-d0fa3b835573
- 1
-
640
347
9
20
-
646
357
- 1
- 1
- {0}
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- Split segments at kinks
- 81292577-9b8d-4403-946e-6f2ab9c92262
- Kinks
- K
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- 0
-
640
367
9
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-
646
377
- 1
- 1
- {0}
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- 1
- Division points
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- Points
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- 0
-
679
327
12
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-
685
337
- 1
- Tangent vectors at division points
- c89367a7-e8f4-47e3-a658-c0f206a97e86
- Tangents
- T
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- 0
-
679
347
12
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-
685
357
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- Parameter values at division points
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- Parameters
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- 0
-
679
367
12
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685
377
- 2e3ab970-8545-46bb-836c-1c11e5610bce
- Integer
- Contains a collection of integer numbers
- cf97a39f-9ed8-41e3-8ae3-d0fa3b835573
- Integer
- Int
- false
- 0
-
563
345
50
24
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588.2969
357.595
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- 1
- {0}
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- 4c4e56eb-2f04-43f9-95a3-cc46a14f495a
- Line
- Create a line between two points.
- true
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- Line
- Ln
-
924
335
55
44
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950
357
- Line start point
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- Start Point
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- a91b8dcd-26aa-4be9-b933-af003077bdc8
- 1
-
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337
9
20
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- Line end point
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- End Point
- B
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- 356356e2-9472-495a-9522-9f49e8ce6b1e
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-
926
357
9
20
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932
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- Line segment
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- Line
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- 0
-
965
337
12
40
-
971
357
- d8332545-21b2-4716-96e3-8559a9876e17
- Dispatch
- Dispatch the items in a list into two target lists.
- true
- ea77e68e-eb3d-4991-9997-e4e996d71021
- Dispatch
- Dispatch
-
726
325
55
44
-
752
347
- 1
- List to filter
- 3e3dd5ff-62db-4805-b8fa-87a01e78cbfd
- List
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- 6a9a5e74-90ed-4618-99c3-29d4645abe06
- 1
-
728
327
9
20
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734
337
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- Dispatch pattern
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- Dispatch pattern
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- 0
-
728
347
9
20
-
734
357
- 1
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- {0}
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- 1
- Dispatch target for True values
- 5ce0fc07-d9e2-4315-9bf9-74ffc71c76cb
- List A
- A
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- 0
-
767
327
12
20
-
773
337
- 1
- Dispatch target for False values
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- List B
- B
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- 0
-
767
347
12
20
-
773
357
- 74cad441-2264-45fe-a57d-85034751208a
- Explode Tree
- Extract all the branches from a tree
- true
- ed5d47ff-8709-4308-a4e0-f43df5505418
- Explode Tree
- BANG!
-
811
335
79
44
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357
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- 8ec86459-bf01-4409-baee-174d0d2b13d0
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- Data to explode
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- Data
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- 1
-
813
337
9
40
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819
357
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- All data inside the branch at index: 0
- a91b8dcd-26aa-4be9-b933-af003077bdc8
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- Branch 0
- {0;0;0;0}
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- 0
-
852
337
36
20
-
870
347
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- All data inside the branch at index: 1
- 356356e2-9472-495a-9522-9f49e8ce6b1e
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- Branch 1
- {0;0;0;1}
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- 0
-
852
357
36
20
-
870
367
- cc14daa5-911a-4fcc-8b3b-1149bf7f2eeb
- Point List
- Displays details about lists of points
- true
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- Point List
- Points
-
1494
407
40
44
-
1520
429
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- Points to display
- true
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- Points
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- 2bc01147-d07d-4525-8b08-83190375c073
- 1
-
1496
409
9
20
-
1502
419
- Optional text size (in Rhino units)
- cde94326-2827-46f7-b99d-a1a805e4ce5e
- Size
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- 660321ec-b949-404c-aea3-4e449cde345e
- 1
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-
1496
429
9
20
-
1502
439
- 57da07bd-ecab-415d-9d86-af36d7073abc
- Number Slider
- Numeric slider for single values
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- Number Slider
- FontSize
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- 0
-
22
210
174
20
-
22.25581
210.8824
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- 30
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- Move
- Translate (move) an object along a vector.
- true
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- Move
- Move
-
1654
394
57
44
-
1681
416
- Base geometry
- 4027ea55-19d0-4c1b-aa81-ebd6b927497d
- Geometry
- G
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- 2bc01147-d07d-4525-8b08-83190375c073
- 1
-
1656
396
10
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-
1662.5
406
- Translation vector
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- Motion
- T
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- 9dfc22dc-ea08-43e4-b5a0-53eaf47808fc
- 1
-
1656
416
10
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1662.5
426
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- {0}
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0
0
10
- Translated geometry
- f16671be-f6e4-48fc-a3d7-ab6054af469d
- Geometry
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- 0
-
1696
396
13
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-
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406
- Transformation data
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- Transform
- X
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-
1696
416
13
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-
1702.5
426
- d3d195ea-2d59-4ffa-90b1-8b7ff3369f69
- Unit Y
- Unit vector parallel to the world {y} axis.
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- Unit Y
- Y
-
1578
412
55
28
-
1604
426
- Unit multiplication
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- Factor
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- 0f9276af-a4d8-48c2-bd48-237306a37b8e
- 1
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-
1580
414
9
24
-
1586
426
- 1
- 1
- {0}
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- World {y} vector
- 9dfc22dc-ea08-43e4-b5a0-53eaf47808fc
- Unit vector
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- 0
-
1619
414
12
24
-
1625
426
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- Number Slider
- Numeric slider for single values
- 0f9276af-a4d8-48c2-bd48-237306a37b8e
- Number Slider
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- 0
-
20
170
240
20
-
20.32101
170.2944
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- 150
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- e9eb1dcf-92f6-4d4d-84ae-96222d60f56b
- Move
- Translate (move) an object along a vector.
- true
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- Move
- Move
-
1410
91
57
44
-
1437
113
- Base geometry
- 465613a7-50a1-4cf2-95e6-873097f0c614
- Geometry
- G
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- 2bc01147-d07d-4525-8b08-83190375c073
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-
1412
93
10
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-
1418.5
103
- Translation vector
- c96aea50-ad28-405d-b437-c74102becd26
- Motion
- T
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- 7a42a027-9f15-41e9-b058-d7571890dde2
- 1
-
1412
113
10
20
-
1418.5
123
- 1
- 1
- {0}
-
0
0
10
- Translated geometry
- aaa0edda-cc14-472b-9626-9f37359400fb
- Geometry
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- 0
-
1452
93
13
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-
1458.5
103
- Transformation data
- 4867aa93-4fb3-4f9a-88e9-b2dde74e90e8
- Transform
- X
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- 0
-
1452
113
13
20
-
1458.5
123
- d3d195ea-2d59-4ffa-90b1-8b7ff3369f69
- Unit Y
- Unit vector parallel to the world {y} axis.
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- Unit Y
- Y
-
1325
109
71
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-
1367
123
- Unit multiplication
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- -x
- Factor
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- 0f9276af-a4d8-48c2-bd48-237306a37b8e
- 1
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-
1327
111
25
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-
1349
123
- 1
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- {0}
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- World {y} vector
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- Unit vector
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- 0
-
1382
111
12
24
-
1388
123
- bb59bffc-f54c-4682-9778-f6c3fe74fce3
- Arc
- Create an arc defined by base plane, radius and angle domain.
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- Arc
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-
1522
96
71
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1564
128
- Base plane of arc
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- Plane
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1524
98
25
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-
1546
108
- 1
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- {0}
-
0
0
0
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0
0
1
0
- Radius of arc
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- -x
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- 1
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-
1524
118
25
20
-
1546
128
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- Angle domain in radians
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- Angle
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- 0
-
1524
138
25
20
-
1546
148
- 1
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- {0}
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0
3.14159265358979
- Resulting arc
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- Arc
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-
1579
98
12
30
-
1585
113
- Arc length
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- Length
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-
1579
128
12
30
-
1585
143
- 57da07bd-ecab-415d-9d86-af36d7073abc
- Number Slider
- Numeric slider for single values
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- Number Slider
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- 0
-
23
144
186
20
-
23.25363
144.1144
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- 1000
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- 159
- e9eb1dcf-92f6-4d4d-84ae-96222d60f56b
- Move
- Translate (move) an object along a vector.
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- Move
- Move
-
1632
132
57
44
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1659
154
- Base geometry
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- Geometry
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- a0a4cddc-b05e-4e51-9422-26f56cf4d2dc
- 1
-
1634
134
10
20
-
1640.5
144
- Translation vector
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- Motion
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- 1
-
1634
154
10
20
-
1640.5
164
- 1
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- {0}
-
0
0
10
- Translated geometry
- 1ee22180-ccd4-4a3b-aba1-c27a5cb78261
- Geometry
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-
1674
134
13
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-
1680.5
144
- Transformation data
- 8edc5fc9-7d7a-49f2-8b0e-eea24ab4c8f9
- Transform
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- 0
-
1674
154
13
20
-
1680.5
164
- d3d195ea-2d59-4ffa-90b1-8b7ff3369f69
- Unit Y
- Unit vector parallel to the world {y} axis.
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- Unit Y
- Y
-
1530
174
55
28
-
1556
188
- Unit multiplication
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- Factor
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- 1
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-
1532
176
9
24
-
1538
188
- 1
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- {0}
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- World {y} vector
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- Unit vector
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- 0
-
1571
176
12
24
-
1577
188
- bb59bffc-f54c-4682-9778-f6c3fe74fce3
- Arc
- Create an arc defined by base plane, radius and angle domain.
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- 7fff3e68-ab8d-435f-8c4e-ebe27b2482a8
- Arc
- Arc
-
1731
394
55
64
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1757
426
- Base plane of arc
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- Plane
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- 1
-
1733
396
9
20
-
1739
406
- 1
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- {0}
-
0
0
0
1
0
0
0
1
0
- Radius of arc
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- Radius
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- 1
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-
1733
416
9
20
-
1739
426
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- Angle domain in radians
- 52727ad5-5d24-43af-9c7e-5440a564f1c3
- Angle
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- 0
-
1733
436
9
20
-
1739
446
- 1
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- {0}
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- Resulting arc
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- Arc
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- 0
-
1772
396
12
30
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1778
411
- Arc length
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- Length
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- 0
-
1772
426
12
30
-
1778
441
- e9eb1dcf-92f6-4d4d-84ae-96222d60f56b
- Move
- Translate (move) an object along a vector.
- true
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- Move
- Move
-
1852
421
57
44
-
1879
443
- Base geometry
- 0fbfc5d6-3f4b-420c-8f61-cc78825ada2a
- Geometry
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- 1
-
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423
10
20
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1860.5
433
- Translation vector
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- Motion
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- 1
-
1854
443
10
20
-
1860.5
453
- 1
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- {0}
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0
10
- Translated geometry
- 8231aaa8-cc6b-45b2-a5f3-fd353ad1a892
- Geometry
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- 0
-
1894
423
13
20
-
1900.5
433
- Transformation data
- bd3fefd5-01be-4e30-b6aa-9de31d3a4e04
- Transform
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- 0
-
1894
443
13
20
-
1900.5
453
- d3d195ea-2d59-4ffa-90b1-8b7ff3369f69
- Unit Y
- Unit vector parallel to the world {y} axis.
- true
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- Unit Y
- Y
-
1723
478
71
28
-
1765
492
- Unit multiplication
- ea39bdc6-7acc-4c67-8add-d1dcc6197f4b
- -x
- Factor
- F
- false
- 5c1a0b1b-47c4-4b5d-8df7-56bf982cb35b
- 1
- 2
-
1725
480
25
24
-
1747
492
- 1
- 1
- {0}
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- World {y} vector
- 5aa591ca-5ba9-48ac-8956-e522fa9d7178
- Unit vector
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- 0
-
1780
480
12
24
-
1786
492
- 11bbd48b-bb0a-4f1b-8167-fa297590390d
- End Points
- Extract the end points of a curve.
- true
- b753d427-cbe9-4524-8eed-03d54115c9f5
- End Points
- End
-
2016
619
55
44
-
2042
641
- Curve to evaluate
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- Curve
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- 8231aaa8-cc6b-45b2-a5f3-fd353ad1a892
- 1
-
2018
621
9
40
-
2024
641
- Curve start point
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- Start
- S
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- 0
-
2057
621
12
20
-
2063
631
- Curve end point
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- End
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- 0
-
2057
641
12
20
-
2063
651
- 8073a420-6bec-49e3-9b18-367f6fd76ac3
- Join Curves
- Join as many curves as possible
- defeff46-c5f4-4c67-a492-62ebb5f49166
- Join Curves
- Join
-
1989
496
55
44
-
2015
518
- 1
- Curves to join
- bcdbb346-c469-4b23-a144-7b8687dfc61d
- Curves
- C
- false
- 8231aaa8-cc6b-45b2-a5f3-fd353ad1a892
- 1
-
1991
498
9
20
-
1997
508
- Preserve direction of input curves
- 7d0919f4-2b3d-45f0-8879-a87ebdde043a
- Preserve
- P
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- 0
-
1991
518
9
20
-
1997
528
- 1
- 1
- {0}
- false
- 1
- Joined curves and individual curves that could not be joined.
- e9649a49-89fc-4f9a-98da-51bfd6e23ff7
- Curves
- C
- false
- 0
-
2030
498
12
40
-
2036
518
- 8073a420-6bec-49e3-9b18-367f6fd76ac3
- Join Curves
- Join as many curves as possible
- f8bce0be-2c69-48d5-856a-7ef898c3569f
- Join Curves
- Join
-
1771
86
55
44
-
1797
108
- 1
- Curves to join
- 478ccebd-7275-4c02-b5bf-e08a33801b4a
- Curves
- C
- false
- 1ee22180-ccd4-4a3b-aba1-c27a5cb78261
- 1
-
1773
88
9
20
-
1779
98
- Preserve direction of input curves
- 35b994e9-78b9-4751-a29e-7aab51611e99
- Preserve
- P
- false
- 0
-
1773
108
9
20
-
1779
118
- 1
- 1
- {0}
- false
- 1
- Joined curves and individual curves that could not be joined.
- 66bbcddb-4cd7-47ec-9fa5-6fcdf27aefc4
- Curves
- C
- false
- 0
-
1812
88
12
40
-
1818
108
- 62cc9684-6a39-422e-aefa-ed44643557b9
- Extend Curve
- Extend a curve by a specified distance.
- acbf95c4-62dc-4cba-9fa8-d5afeae635e7
- Extend Curve
- Ext
-
1013
364
74
84
-
1058
406
- Curve to extend
- 0167f060-24b4-43bc-b78d-56b087819ea5
- Curve
- C
- false
- 7f1e1ef3-9c45-441b-af32-06ca68545b04
- 1
-
1015
366
28
20
-
1038.5
376
- Type of extension (0=Line, 1=Arc, 2=Smooth)
- 1ed5ebb3-03d6-440d-9c39-e67fb5765283
- Type
- T
- false
- 0
-
1015
386
28
20
-
1038.5
396
- 1
- 1
- {0}
- 0
- Extension length at start of curve
- 4d0ebfc2-9295-4758-8905-4e0f48262064
- -x
- Start
- L0
- false
- 4fa64abb-5475-4c0a-887b-20f94f59983b
- 1
-
1015
406
28
20
-
1038.5
416
- 1
- 1
- {0}
- 0
- Extension length at end of curve
- 3d3f18af-b0c0-479d-89e2-46baa3a8ab2f
- -x
- End
- L1
- false
- 4fa64abb-5475-4c0a-887b-20f94f59983b
- 1
-
1015
426
28
20
-
1038.5
436
- 1
- 1
- {0}
- 0
- Extended curve
- 2bf803a8-f029-4f21-b5ce-2cba85588156
- Curve
- C
- false
- 0
-
1073
366
12
80
-
1079
406
- 2162e72e-72fc-4bf8-9459-d4d82fa8aa14
- Divide Curve
- Divide a curve into equal length segments
- true
- 91a9e36e-98ec-4015-be84-50d96a64524e
- Divide Curve
- Divide
-
1417
387
55
64
-
1443
419
- Curve to divide
- 5c415152-8a73-44f2-a546-dfe1350aeefd
- Curve
- C
- false
- 2bf803a8-f029-4f21-b5ce-2cba85588156
- 1
-
1419
389
9
20
-
1425
399
- Number of segments
- 8d51acb7-ea33-4636-80d8-b7c799c179ea
- Count
- N
- false
- e5822062-4f3d-45a3-8e9f-c2294fcd9854
- 1
-
1419
409
9
20
-
1425
419
- 1
- 1
- {0}
- 10
- Split segments at kinks
- e0cb2a0b-712f-4ef7-8bd9-9f8e0f72cfa4
- Kinks
- K
- false
- 0
-
1419
429
9
20
-
1425
439
- 1
- 1
- {0}
- false
- 1
- Division points
- 2bc01147-d07d-4525-8b08-83190375c073
- Points
- P
- false
- 0
-
1458
389
12
20
-
1464
399
- 1
- Tangent vectors at division points
- 47f7f347-234e-4a37-abd4-d8901ccb1321
- Tangents
- T
- false
- 0
-
1458
409
12
20
-
1464
419
- 1
- Parameter values at division points
- 4692dc57-566d-4968-866a-1ac192ee70a9
- Parameters
- t
- false
- 0
-
1458
429
12
20
-
1464
439
- 9c85271f-89fa-4e9f-9f4a-d75802120ccc
- Division
- Mathematical division
- true
- b07fc49f-e9c9-4e93-85e9-a664b118bd8e
- Division
- A/B
-
1218
449
55
44
-
1244
471
- Item to divide (dividend)
- 7e73bc39-428c-46ac-b188-137f3999615f
- A
- A
- false
- 8104b359-e90c-40e9-bec9-37b119b06d7c
- 1
-
1220
451
9
20
-
1226
461
- Item to divide with (divisor)
- 36cfb1dc-52a6-45a6-b690-3279b681150d
- B
- B
- false
- 71b56cda-00f8-411b-ad03-7465281edbc0
- 1
-
1220
471
9
20
-
1226
481
- The result of the Division
- 5a5d91b8-13e7-4f5b-b6a7-906c7c9d590b
- Result
- R
- false
- 0
-
1259
451
12
40
-
1265
471
- c75b62fa-0a33-4da7-a5bd-03fd0068fd93
- Length
- Measure the length of a curve.
- true
- 838e3490-e248-4507-ad90-2a39560adb95
- Length
- Len
-
1120
413
55
28
-
1146
427
- Curve to measure
- bef82656-33bd-4412-a607-e7423a9db947
- Curve
- C
- false
- 2bf803a8-f029-4f21-b5ce-2cba85588156
- 1
-
1122
415
9
24
-
1128
427
- Curve length
- 8104b359-e90c-40e9-bec9-37b119b06d7c
- Length
- L
- false
- 0
-
1161
415
12
24
-
1167
427
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
- 419b1194-515f-4691-bdd5-95bdf7a7c365
- Panel
- false
- 0
- e5822062-4f3d-45a3-8e9f-c2294fcd9854
- 1
- Double click to edit panel content…
-
1402
471
83
45
- 0
- 0
- 0
-
1402.062
471.6896
-
255;255;250;90
- true
- true
- true
- false
- true
- b8963bb1-aa57-476e-a20e-ed6cf635a49c
- Multiplication
- Mathematical multiplication
- true
- 2d1e3a6f-b5ed-41e3-a5eb-4065eff867aa
- Multiplication
- A×B
-
1139
459
55
44
-
1165
481
- First item for multiplication
- 6c13943f-0ef7-47db-975f-2f8a5b50fd18
- A
- A
- false
- 5c1a0b1b-47c4-4b5d-8df7-56bf982cb35b
- 1
- 2
-
1141
461
9
20
-
1147
471
- Second item for multiplication
- d3743698-4f24-4af0-88ef-e6c3ee711cc0
- B
- B
- false
- ec91178f-e16b-41bc-aed1-827e92bade34
- 1
-
1141
481
9
20
-
1147
491
- The result of the Multiplication
- 71b56cda-00f8-411b-ad03-7465281edbc0
- Result
- R
- false
- 0
-
1180
461
12
40
-
1186
481
- 2e3ab970-8545-46bb-836c-1c11e5610bce
- Integer
- Contains a collection of integer numbers
- ec91178f-e16b-41bc-aed1-827e92bade34
- Integer
- Int
- false
- 0
-
1063
479
50
24
-
1088.448
491.1987
- 1
- 1
- {0}
- 2
- a50c4a3b-0177-4c91-8556-db95de6c56c8
- Round
- Round a floating point value.
- true
- c823906c-5b2a-4f35-9c6f-3f498d0a23cd
- Round
- Round
-
1302
439
55
64
-
1328
471
- Number to round
- 75cb49fe-60ff-4421-bea8-ed6f9239ebec
- Number
- x
- false
- 5a5d91b8-13e7-4f5b-b6a7-906c7c9d590b
- 1
-
1304
441
9
60
-
1310
471
- Integer nearest to x
- e5822062-4f3d-45a3-8e9f-c2294fcd9854
- Nearest
- N
- false
- 0
-
1343
441
12
20
-
1349
451
- First integer smaller than or equal to x
- 2ef533b3-5074-404c-810b-19e17c8a2974
- Floor
- F
- false
- 0
-
1343
461
12
20
-
1349
471
- First integer larger than or equal to x
- d2637630-e3fd-41dc-a5ff-a740d2af337f
- Ceiling
- C
- false
- 0
-
1343
481
12
20
-
1349
491
- 1a38d325-98de-455c-93f1-bca431bc1243
- Offset
- Offset a curve with a specified distance.
- acfca665-352b-438b-9d67-7bd75f7ee9fc
- Offset
- Offset
-
2032
365
55
84
-
2058
407
- Curve to offset
- 6865a87b-d1bd-40f0-b018-8e9f7a35c0c5
- Curve
- C
- false
- e9649a49-89fc-4f9a-98da-51bfd6e23ff7
- 1
-
2034
367
9
20
-
2040
377
- Offset distance
- 25dd1b2a-fb63-45cc-a3a8-ea67dfa97a92
- Distance
- D
- false
- dacfe736-ff24-4cdc-9e8b-236daac44052
- 1
- 2
-
2034
387
9
20
-
2040
397
- 1
- 1
- {0}
- 1
- Plane for offset operation
- 4ec72bba-93cc-4f6c-85cc-2bce3eb67a72
- Plane
- P
- false
- 0
-
2034
407
9
20
-
2040
417
- 1
- 1
- {0}
-
0
0
0
1
0
0
0
1
0
- Corner type flag. Possible values:
none = 0
sharp = 1
round = 2
smooth = 3
chamfer = 4
- 76052479-405d-47e2-8890-c388a9046c5a
- Corners
- C
- false
- 0
-
2034
427
9
20
-
2040
437
- 1
- 1
- {0}
- 1
- 1
- Resulting offsets
- 43fec6fa-ef46-4984-8ae7-92131d83b5b7
- Curve
- C
- false
- 0
-
2073
367
12
80
-
2079
407
- 57da07bd-ecab-415d-9d86-af36d7073abc
- Number Slider
- Numeric slider for single values
- dacfe736-ff24-4cdc-9e8b-236daac44052
- Number Slider
- Offset_Inside
- false
- 0
-
17
67
177
20
-
17.86035
67.70021
- 3
- 1
- 1
- 30
- 0
- 0
- 16
- 1a38d325-98de-455c-93f1-bca431bc1243
- Offset
- Offset a curve with a specified distance.
- ce6e93ff-20c7-4200-8c25-7e38688a9f1f
- Offset
- Offset
-
1846
96
55
84
-
1872
138
- Curve to offset
- 33f2c562-972d-44df-bfb0-2863dd6264c4
- Curve
- C
- false
- 66bbcddb-4cd7-47ec-9fa5-6fcdf27aefc4
- 1
-
1848
98
9
20
-
1854
108
- Offset distance
- b4f6a4c1-62be-47e1-8f43-ba4a8daaf406
- Distance
- D
- false
- dacfe736-ff24-4cdc-9e8b-236daac44052
- 1
- 2
-
1848
118
9
20
-
1854
128
- 1
- 1
- {0}
- 1
- Plane for offset operation
- ae5337bc-1e00-4db8-9873-ff0a62f4f710
- Plane
- P
- false
- 0
-
1848
138
9
20
-
1854
148
- 1
- 1
- {0}
-
0
0
0
1
0
0
0
1
0
- Corner type flag. Possible values:
none = 0
sharp = 1
round = 2
smooth = 3
chamfer = 4
- 50b1e060-ef52-4f29-99f5-0c21d7486d9d
- Corners
- C
- false
- 0
-
1848
158
9
20
-
1854
168
- 1
- 1
- {0}
- 1
- 1
- Resulting offsets
- d1e619ef-aaf4-4df6-8bce-af3781f25def
- Curve
- C
- false
- 0
-
1887
98
12
80
-
1893
138
- 36132830-e2ef-4476-8ea1-6a43922344f0
- Edge Surface
- Create a surface from two, three or four edge curves.
- 2152207b-949a-400e-aa1d-d6ca7012aadf
- Edge Surface
- EdgeSrf
-
2609
332
71
84
-
2651
374
- First curve
- cf48d9de-14f5-49bf-898c-feb191b48fb5
- 2
- Curve A
- A
- false
- e9649a49-89fc-4f9a-98da-51bfd6e23ff7
- 1
-
2611
334
25
20
-
2633
344
- Second curve
- beb54de7-5988-4a3f-8ba3-a74e65607cad
- Curve B
- B
- false
- 43fec6fa-ef46-4984-8ae7-92131d83b5b7
- 1
-
2611
354
25
20
-
2633
364
- Optional Third curve
- 8f30aaa6-36c6-4e83-a2b5-343cb36c4683
- Curve C
- C
- true
- 0
-
2611
374
25
20
-
2633
384
- Optional Fourth curve
- 54b80e6f-9c92-47f7-8c0a-59a2fa5eb13c
- Curve D
- D
- true
- 0
-
2611
394
25
20
-
2633
404
- Brep representing the edge-surface
- b5e1a93e-4e92-4896-af19-2b28faf3bbcb
- Surface
- S
- false
- 0
-
2666
334
12
80
-
2672
374
- d51e9b65-aa4e-4fd6-976c-cef35d421d05
- Boundary Surfaces
- Create planar surfaces from a collection of boundary edge curves.
- c0340b47-39ef-41ab-902e-22dc29623d19
- Boundary Surfaces
- Boundary
-
439
273
71
28
-
481
287
- 1
- Boundary curves
- 3f07bfe3-e08f-414b-96c3-1101a2a2b14d
- 1
- Edges
- E
- false
- 903caeaf-7a2c-49ab-96e8-40ee7fcb1c3b
- 025a1569-975f-4577-b9a7-2469dcaa68dd
- 2
-
441
275
25
24
-
463
287
- 1
- Resulting boundary surfaces
- 13a1df3e-686c-4ce4-8fd9-64ddde4480ee
- Surfaces
- S
- false
- 0
-
496
275
12
24
-
502
287
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
- 1
-
150;170;135;255
- A group of Grasshopper objects
- f1a7c492-dc84-41a8-986b-1686e621d789
- ef135cae-e975-4f8f-b577-3b73aabba337
- 2
- 630c2504-af41-483e-aee5-efdc48325d06
- Group
- Top_INT_Line_Projection
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
- 1
-
150;170;135;255
- A group of Grasshopper objects
- caf67365-58c6-4e6b-8df1-2a7214ba545d
- 57ab1351-b152-4ffa-b71f-8b5b2435600a
- 2
- 76083189-b74e-467d-956e-b18684a9a4e5
- Group
- Bottom_IN_Line_Projection
- 902289da-28dc-454b-98d4-b8f8aa234516
- Pull Point
- true
- Pull a point to a variety of geometry.
- true
- caf67365-58c6-4e6b-8df1-2a7214ba545d
- Pull Point
- Pull
-
2180
624
56
44
-
2207
646
- Point to search from
- 2112b7e4-8ce7-4cf7-88dc-9eaf9c55e8aa
- Point
- P
- false
- 9893766d-722e-43be-a99a-f3d6f9626e6c
- 1
-
2182
626
10
20
-
2188.5
636
- 1
- Geometry that pulls
- 0a329d3e-888c-4dde-aedb-11a28bc58af9
- Geometry
- G
- false
- c17d1602-02f7-4287-9481-239ce9080e77
- 1
- 2
-
2182
646
10
20
-
2188.5
656
- Point on [G] closest to [P]
- f41b2bc7-05f6-4d08-a1ef-4415e2b5e7e9
- Closest Point
- P
- false
- 0
-
2222
626
12
20
-
2228
636
- Distance between [P] and its projection onto [G]
- ac45fc7a-7def-43c9-bcd6-8e16b12d5842
- Distance
- D
- false
- 0
-
2222
646
12
20
-
2228
656
- 4c4e56eb-2f04-43f9-95a3-cc46a14f495a
- Line
- Create a line between two points.
- 57ab1351-b152-4ffa-b71f-8b5b2435600a
- Line
- Ln
-
2280
630
55
44
-
2306
652
- Line start point
- 0e6abc26-d7e4-4312-8cbb-e1711875a22d
- Start Point
- A
- false
- 9893766d-722e-43be-a99a-f3d6f9626e6c
- 1
- 2
-
2282
632
9
20
-
2288
642
- Line end point
- e3971bd9-3120-4f79-a78a-0bc86d716910
- End Point
- B
- false
- f41b2bc7-05f6-4d08-a1ef-4415e2b5e7e9
- 1
-
2282
652
9
20
-
2288
662
- Line segment
- 1bcb5421-d7a9-4902-b181-4a1e4712c5c5
- Line
- L
- false
- 0
-
2321
632
12
40
-
2327
652
- 4e86ba36-05e2-4cc0-a0f5-3ad57c91f04e
- Sort Points
- Sort points by Euclidean coordinates (first x, then y, then z)
- true
- 69e4c72d-1c29-4f51-bf41-56ba5605bce6
- Sort Points
- Sort Pt
-
2100
623
55
44
-
2126
645
- 1
- Points to sort
- ca457004-a2ae-4515-920b-77feb3e54632
- Points
- P
- false
- 02fa778a-a6fa-4690-9c2e-d9fa272d31c0
- 01d98866-99ef-4621-86ec-6214c58086d5
- 2
-
2102
625
9
40
-
2108
645
- 1
- Sorted points
- 9893766d-722e-43be-a99a-f3d6f9626e6c
- Points
- P
- false
- 0
-
2141
625
12
20
-
2147
635
- 1
- Point index map
- e0c6202f-4408-4c45-a75b-0ce248fc9a24
- Indices
- I
- false
- 0
-
2141
645
12
20
-
2147
655
- 11bbd48b-bb0a-4f1b-8167-fa297590390d
- End Points
- Extract the end points of a curve.
- true
- 756e3540-09d7-4c8b-a20a-3c1961cdfe3d
- End Points
- End
-
2140
511
55
44
-
2166
533
- Curve to evaluate
- 2f8753b6-de0a-4b54-82b8-09f58c92f0d4
- Curve
- C
- false
- 43fec6fa-ef46-4984-8ae7-92131d83b5b7
- 1
-
2142
513
9
40
-
2148
533
- Curve start point
- 8aa31412-319f-4d32-87c6-ac8d8ce5cf2b
- Start
- S
- false
- 0
-
2181
513
12
20
-
2187
523
- Curve end point
- 60b70bb4-b027-4e7c-86d8-d63f322c5007
- End
- E
- false
- 0
-
2181
533
12
20
-
2187
543
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
- 1
-
150;170;135;255
- A group of Grasshopper objects
- 9cf01fb1-bf06-4de5-b98b-1187013e4bed
- 4f7bdc85-5437-4b8c-9e1e-41d6be959dda
- 2
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- Group
- Bottom_EXT_Line_Projection
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- Pull Point
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- Pull a point to a variety of geometry.
- true
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- Pull Point
- Pull
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2300
508
56
44
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2327
530
- Point to search from
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- Point
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2302
510
10
20
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2308.5
520
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- Geometry that pulls
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- Geometry
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2302
530
10
20
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2308.5
540
- Point on [G] closest to [P]
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- Closest Point
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- 0
-
2342
510
12
20
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2348
520
- Distance between [P] and its projection onto [G]
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- Distance
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-
2342
530
12
20
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2348
540
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- Line
- Create a line between two points.
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- Line
- Ln
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515
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- Line start point
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- Start Point
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517
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527
- Line end point
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- End Point
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2383
537
9
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2389
547
- Line segment
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- Line
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2422
517
12
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2428
537
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- Sort Points
- Sort points by Euclidean coordinates (first x, then y, then z)
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- Sort Points
- Sort Pt
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2221
508
55
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2247
530
- 1
- Points to sort
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- Points
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2223
510
9
40
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2229
530
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- Sorted points
- f436aed3-4860-4af3-a574-fa8392b67ca2
- Points
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- 0
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2262
510
12
20
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2268
520
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- Point index map
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2262
530
12
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2268
540
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- Group
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-
150;170;135;255
- A group of Grasshopper objects
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- Group
- Top_EXT_Line_Projection
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- Jump
- Jump between different locations
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- Jump
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200
292
48
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224
316
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- Jump between different locations
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- Jump
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698
48
48
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2201
722
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- Addition
- Mathematical addition
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- Addition
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935
406
55
44
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961
428
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- 1
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- First item for addition
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- A
- A
- true
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- 1
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-
937
408
9
20
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943
418
- Second item for addition
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- B
- B
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937
428
9
20
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943
438
- Result of addition
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976
408
12
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982
428
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- Number Slider
- Numeric slider for single values
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17
394
164
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17.13232
394.2811
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- Dispatch
- Dispatch the items in a list into two target lists.
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675
444
55
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701
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677
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683
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- Dispatch pattern
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677
466
9
20
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683
476
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- {0}
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- Dispatch target for True values
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- List A
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716
446
12
20
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722
456
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- Dispatch target for False values
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- List B
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- 0
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716
466
12
20
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722
476
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- End Points
- Extract the end points of a curve.
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- End Points
- End
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1979
80
55
44
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2005
102
- Curve to evaluate
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- Curve
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1981
82
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40
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1987
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- Curve start point
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- Start
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2020
82
12
20
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2026
92
- Curve end point
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2020
102
12
20
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2026
112
- c552a431-af5b-46a9-a8a4-0fcbc27ef596
- Group
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150;170;135;255
- A group of Grasshopper objects
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- Group
- Top_IN_Line_Projection
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- Pull Point
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- Pull a point to a variety of geometry.
- true
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- Pull Point
- Pull
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85
56
44
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- Point to search from
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- Point
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87
10
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- Geometry that pulls
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- Geometry
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2145
107
10
20
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2151.5
117
- Point on [G] closest to [P]
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- Closest Point
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2185
87
12
20
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2191
97
- Distance between [P] and its projection onto [G]
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- Distance
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- 0
-
2185
107
12
20
-
2191
117
- 4c4e56eb-2f04-43f9-95a3-cc46a14f495a
- Line
- Create a line between two points.
- true
- 08487f7e-6f10-4ac6-86a3-6249e85e0e87
- Line
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-
2214
91
55
44
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2240
113
- Line start point
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93
9
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2222
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- Line end point
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- End Point
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2216
113
9
20
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2222
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- Line segment
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- Line
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- 0
-
2255
93
12
40
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2261
113
- 4e86ba36-05e2-4cc0-a0f5-3ad57c91f04e
- Sort Points
- Sort points by Euclidean coordinates (first x, then y, then z)
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- Sort Points
- Sort Pt
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2063
84
55
44
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2089
106
- 1
- Points to sort
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- Points
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2065
86
9
40
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2071
106
- 1
- Sorted points
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- Points
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2104
86
12
20
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2110
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- Point index map
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2104
106
12
20
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2110
116
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- Join Curves
- Join as many curves as possible
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436
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25
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2451
436
25
20
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2473
446
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- Joined curves and individual curves that could not be joined.
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2506
416
12
40
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436
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- Join Curves
- Join as many curves as possible
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638
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- Curves to join
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25
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2380
660
25
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12
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660
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