-
0
2
2
-
0
9
76
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- Shaded
- 2
-
255;196;196;196
-
100;0;150;0
- 635467344756790966
- 2015_01_02-thelix.ghx
- 0
-
-7
119
- 0.6399999
- 0
- 0
- 1
- Mateusz Zwierzycki
- 4442bb24-c702-460c-a1e4-fcdd321eb886
- Anemone
- 0.26
- 31
- b6cf000a-aeae-4159-b9df-9172309ca239
- 4442bb24-c702-460c-a1e4-fcdd321eb886
- Loop End
- End the loop with this one. Double click to pause the loop.
- true
- 32853b20-658f-4a22-82b3-dade6f5416e8
- Loop End
- Loop End
- false
- Constant & Record
-
1529
40
98
90
-
1582
85
- 3
- 8ec86459-bf01-4409-baee-174d0d2b13d0
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- 1
- 8ec86459-bf01-4409-baee-174d0d2b13d0
- Connect with the Loop Start
- 9d4c77ad-80b1-4ae0-b0dc-1f65b8881da6
- <<<
- <<<
- false
- bd5960e3-b852-48cf-9525-97b337cf7968
- 1
-
1531
42
36
28
-
1550.5
56.33333
- Set to true to exit the loop
- 5d96babe-df34-43cd-925e-be0ce66e2fd2
- Exit
- E
- true
- 0
-
1531
70
36
29
-
1550.5
85
- 1
- 1
- {0}
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- 2
- Data to loop
- 2ff36b7d-1c48-430a-ac4c-a7bac07610ba
- Data_0
- D0
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- c9de2fd7-7a18-404c-82e5-9c061dee2afa
- 1
-
1531
99
36
28
-
1550.5
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- Data to loop
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- Data_0
- D0
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1597
42
28
86
-
1611
85
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- 4442bb24-c702-460c-a1e4-fcdd321eb886
- Loop Start
- Start the loop with this one. Double click to rerun.
- true
- 65e26ee5-2732-4b8e-a465-db0add36915a
- Loop Start
- Loop Start
-
962
48
98
99
-
1004
98
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- 8ec86459-bf01-4409-baee-174d0d2b13d0
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- 8ec86459-bf01-4409-baee-174d0d2b13d0
- 3ede854e-c753-40eb-84cb-b48008f14fd4
- 8ec86459-bf01-4409-baee-174d0d2b13d0
- 2
- Please leave this one alone, don't input anything.
- 325e0bc8-20ef-47ba-a5fc-bd7938a3edbf
- true
- 0
-
964
50
25
23
-
978
61.875
- Number of repeats
- 29b1e570-7e58-40a4-9edd-4ab65f6c7871
- Repeat
- N
- true
- fe04183e-3f8b-4470-a85f-a7d8e7a67066
- 1
-
964
73
25
24
-
978
85.625
- 1
- 1
- {0}
- 0
- 2
- If you want trigger loop to restart
- ac3c551a-d74c-47cf-8eb8-273bf1b94c68
- Trigger
- T
- true
- 2b095c39-dbe3-4822-b42a-939c47dbf41c
- 1
-
964
97
25
24
-
978
109.375
- 2
- Data to loop
- 614737a1-6342-46a5-8d36-80532735d567
- Data_0
- D0
- true
- e667a693-eb83-45e7-a933-f61fb77a769d
- 1
-
964
121
25
24
-
978
133.125
- Connect with the Loop End
- bd5960e3-b852-48cf-9525-97b337cf7968
- >>>
- >>>
- false
- 0
-
1019
50
39
31
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1038.5
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- Counter
- 7c7de4eb-b564-4d7b-b1e6-d16209848723
- Counter
- C
- false
- 0
-
1019
81
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32
-
1038.5
97.5
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- Data to loop
- 89ffd9e1-6710-4c7d-b879-f2fdffd5e08e
- Data_0
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- 0
-
1019
113
39
32
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1038.5
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- Point
- Contains a collection of three-dimensional points
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- Point
- Pt
- false
- 0
-
301
179
50
20
-
326.2747
189.9329
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- {0}
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38.2502305058964
5.15388288479034
0
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- Number Slider
- Numeric slider for single values
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- Number Slider
- edge
- false
- 0
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221
230
165
20
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221.3892
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- Polygon
- Create a polygon with optional round edges.
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- Polygon
- Polygon
-
539
219
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84
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576
261
- Polygon base plane
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- Plane
- P
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- 1
-
541
221
20
20
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552.5
231
- 1
- 1
- {0}
-
0
0
0
1
0
0
0
1
0
- Radius of polygon (distance from center to tip).
- 9b219494-97dd-4fa9-8c0d-a55081f7b5f6
- Radius
- R
- false
- fad5f73f-76cc-4331-9974-f9802ad5fd09
- 1
-
541
241
20
20
-
552.5
251
- 1
- 1
- {0}
- 3
- Number of segments
- 8ceb094a-8be6-43da-8e8e-3dfe84ebabbb
- Segments
- S
- false
- 0
-
541
261
20
20
-
552.5
271
- 1
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- Polygon corner fillet radius
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- Fillet Radius
- Rf
- false
- 0
-
541
281
20
20
-
552.5
291
- 1
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- Polygon
- 2d9a62a7-e139-405c-bafa-21103267da4f
- Polygon
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-
591
221
19
40
-
600.5
241
- Length of polygon curve
- 294ec7d6-dcd8-4c78-955f-6f059f01d054
- Length
- L
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- 0
-
591
261
19
40
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600.5
281
- b8963bb1-aa57-476e-a20e-ed6cf635a49c
- Multiplication
- Mathematical multiplication
- true
- c5c2498e-dd99-4ae7-ae4d-cba523904f24
- Multiplication
- A×B
-
697
300
70
50
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731
325
- First item for multiplication
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- A
- A
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- fcd2bca6-e66a-4cb3-a802-4762e3ecfc7a
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-
699
302
17
23
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709
313.5
- Second item for multiplication
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- B
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- 74f47bad-46ba-4268-867f-cd9f90cd0e58
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-
699
325
17
23
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709
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- The result of the Multiplication
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- Result
- R
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746
302
19
46
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755.5
325
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- Point Oriented
- Create a point from plane {u,v,w} coordinates.
- true
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- Point Oriented
- Pt
-
825
256
78
84
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863
298
- Plane defining coordinate space
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- Base plane
- P
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- cb1794bc-7768-4254-ab71-4609aa129c06
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827
258
21
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0
0
0
1
0
0
0
1
0
- U parameter on plane
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- U component
- U
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- 0
-
827
278
21
20
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839
288
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- V parameter on plane
- 47bc42a4-fff5-45a1-ac6d-2602cd068dea
- V component
- V
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- 0
-
827
298
21
20
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839
308
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- W parameter on plane (elevation)
- 00575295-89ae-4dee-a5ef-0a46d73860cb
- W component
- W
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-
827
318
21
20
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839
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- Oriented point coordinate
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- Point
- Pt
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-
878
258
23
80
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889.5
298
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- Boolean Toggle
- Boolean (true/false) toggle
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- Boolean Toggle
- Toggle
- false
- 0
- false
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781
85
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22
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- Numeric slider for single values
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-
741
46
176
20
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741.5267
46.4054
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- 1000
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- Closest Point
- Find closest point in a point collection.
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- Closest Point
- CP
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1273
396
87
64
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1322
428
- Point to search from
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- Point
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1275
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30
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1300.5
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- Cloud of points to search
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- Cloud
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1275
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32
30
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1300.5
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- Point in [C] closest to [P]
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- Closest Point
- P
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1337
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21
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- Index of closest point
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- CP Index
- i
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-
1337
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21
20
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1347.5
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- Distance between [P] and [C](i)
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- Distance
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-
1337
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21
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1347.5
448
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- List Item
- 0
- Retrieve a specific item from a list.
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- List Item
- Item
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1328
220
69
64
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1366
252
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- Base list
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1330
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21
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- Item index
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- Index
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1330
242
21
20
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1342
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- Wrap index to list bounds
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1330
262
21
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- Item
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1381
222
14
60
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1388
252
- be6636b2-2f1a-4d42-897b-fdef429b6f17
- Extrude Point
- Extrude curves and surfaces to a point.
- true
- 197974e3-fb82-4871-9026-a87f9a6156f9
- Extrude Point
- Extr
-
824
123
68
47
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857
147
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21
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- Extrusion tip
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826
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16
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- Extrusion result
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- Extrusion
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-
872
125
18
43
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881
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- Panel
- A panel for custom notes and text values
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298
286
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298.2517
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255;255;250;90
- true
- true
- true
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- true
- 9c85271f-89fa-4e9f-9f4a-d75802120ccc
- Division
- Mathematical division
- true
- 350ff3ec-ae06-4103-a8cc-2a265cd8a3f4
- Division
- A/B
-
422
274
70
46
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456
297
- Item to divide (dividend)
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- A
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- 1
-
424
276
17
21
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434
286.5
- Item to divide with (divisor)
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- B
- B
- false
- c41ef699-cdab-4ea7-b341-04c11d1b647d
- 1
-
424
297
17
21
-
434
307.5
- The result of the Division
- fad5f73f-76cc-4331-9974-f9802ad5fd09
- Result
- R
- false
- 0
-
471
276
19
42
-
480.5
297
- 59e0b89a-e487-49f8-bab8-b5bab16be14c
- Panel
- A panel for custom notes and text values
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- Panel
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- 0
- 0.816497
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576
329
86
25
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576.2517
329.7429
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255;255;250;90
- true
- true
- true
- false
- true
- 75eec078-a905-47a1-b0d2-0934182b1e3d
- Plane Origin
- Change the origin point of a plane
- true
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- Plane Origin
- Pl Origin
-
711
208
74
86
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746
251
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- 46c5e494-6b8d-4370-8806-33575840170a
- Base
- B
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- 2d9a62a7-e139-405c-bafa-21103267da4f
- 1
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713
210
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41
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723.5
230.5
- New origin point of plane
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- Origin
- O
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- a5755610-82d0-42fc-9bc5-bc805be8c0e3
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713
251
18
41
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723.5
271.5
- Plane definition
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- Plane
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- 0
-
761
210
22
82
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772
251
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- Area
- Solve area properties for breps, meshes and planar closed curves.
- true
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- Area
- Area
-
624
159
71
52
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658
185
- Brep, mesh or planar closed curve for area computation
- fc538c08-8a66-4a0f-aa5d-a3ac6b154602
- Geometry
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161
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- Area
- A
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-
673
161
20
24
-
683
173
- Area centroid of geometry
- a5755610-82d0-42fc-9bc5-bc805be8c0e3
- Centroid
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- 0
-
673
185
20
24
-
683
197
- 2e205f24-9279-47b2-b414-d06dcd0b21a7
- Area
- Solve area properties for breps, meshes and planar closed curves.
- 8e33e3fe-fb2d-442b-9c38-4b3729ec4b54
- Area
- Area
-
1206
310
71
52
-
1240
336
- Brep, mesh or planar closed curve for area computation
- 7ccad1ec-b66c-4db2-adb6-f08873c62390
- Geometry
- G
- false
- 29df54b9-3acb-42c8-ab06-262968d5259c
- 1
-
1208
312
17
48
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1218
336
- Area of geometry
- dc20c40e-2a09-4037-b33e-2146483d30b4
- Area
- A
- false
- 0
-
1255
312
20
24
-
1265
324
- Area centroid of geometry
- 8883296a-36d9-4829-96b3-de47085b36d1
- Centroid
- C
- false
- 0
-
1255
336
20
24
-
1265
348
- 8d372bdc-9800-45e9-8a26-6e33c5253e21
- Deconstruct Brep
- Deconstruct a brep into its constituent parts.
- 1cb592e3-db3b-4728-af01-6b0d396a05f7
- Deconstruct Brep
- DeBrep
-
1076
248
69
75
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1109
286
- Base Brep
- 66f8d02f-2c80-4f05-ae4a-6fe3ac3a1988
- Brep
- B
- false
- 09ed81e4-b322-4e74-a416-7d5a8ed093f7
- 1
-
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71
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1087.5
285.5
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- Faces of Brep
- 29df54b9-3acb-42c8-ab06-262968d5259c
- Faces
- F
- false
- 0
-
1124
250
19
23
-
1133.5
261.8333
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- Edges of Brep
- 0f823b81-0474-4b59-b474-94468dc7e179
- Edges
- E
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- 0
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1124
273
19
24
-
1133.5
285.5
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- Vertices of Brep
- 22470c48-65fd-499c-8270-76d9a884844b
- Vertices
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- 0
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1124
297
19
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1133.5
309.1667
- 378d0690-9da0-4dd1-ab16-1d15246e7c22
- Orient
- Orient an object. Orientation is sometimes called a 'ChangeBasis tranformation'. It allows for remapping of geometry from one axis-system to another.
- true
- 30a6229e-aac1-4ad1-9272-6c236e4032f2
- Orient
- Orient
-
1414
133
71
66
-
1448
166
- Base geometry
- 1f8fa8e8-1269-4e8c-8b61-eeec669b0b64
- Geometry
- G
- true
- 09ed81e4-b322-4e74-a416-7d5a8ed093f7
- 1
-
1416
135
17
20
-
1426
145.3333
- Initial plane
- 0ca2a8ee-3bfb-4675-bef2-c1019de2d11c
- Source
- A
- false
- fbd13074-5224-40a0-86ad-4b933bf656d9
- 1
-
1416
155
17
21
-
1426
166
- 1
- 1
- {0}
-
0
0
0
1
0
0
0
1
0
- Final plane
- bb11d356-6508-4bca-ac9c-afbceec6d0dc
- Target
- B
- false
- 303cd217-301e-4079-a8bd-7e142ce15c83
- 1
-
1416
176
17
21
-
1426
186.6667
- 1
- 1
- {0}
-
0
0
0
1
0
0
0
1
0
- Reoriented geometry
- c9de2fd7-7a18-404c-82e5-9c061dee2afa
- Geometry
- G
- false
- 0
-
1463
135
20
31
-
1473
150.5
- Transformation data
- e1c90516-9e74-48b8-b8ce-872fe1df2ad6
- Transform
- X
- false
- 0
-
1463
166
20
31
-
1473
181.5
- 919e146f-30ae-4aae-be34-4d72f555e7da
- Brep
- Contains a collection of Breps (Boundary REPresentations)
- 4ed8c27e-5e24-4e07-841e-6eb75118dc28
- Brep
- Brep
- false
- d0d2faab-a143-4a5e-8733-e07191d41049
- 1
-
1661
75
50
20
-
1686.413
85.51819
- b8963bb1-aa57-476e-a20e-ed6cf635a49c
- Multiplication
- Mathematical multiplication
- true
- 0a6ef117-280a-4172-a2e4-440610c453d0
- Multiplication
- A×B
-
786
358
70
50
-
820
383
- First item for multiplication
- 371734c0-78ca-4064-b4c5-161bd197aefd
- A
- A
- false
- 2e1145b2-d67e-4dfe-bcc6-27a6d17ab15d
- 1
-
788
360
17
23
-
798
371.5
- Second item for multiplication
- 2058b7db-a78b-437b-afa0-45f0a35d1ea9
- B
- B
- false
- 0
-
788
383
17
23
-
798
394.5
- 1
- 1
- {0}
- -1
- Grasshopper.Kernel.Types.GH_Integer
- The result of the Multiplication
- e3ca8fbd-4536-40a6-a1ec-88fac38722de
- Result
- R
- false
- 0
-
835
360
19
46
-
844.5
383
- 59daf374-bc21-4a5e-8282-5504fb7ae9ae
- List Item
- 0
- Retrieve a specific item from a list.
- b8305245-2607-4907-a2af-902cd479b89b
- List Item
- Item
-
1198
90
69
64
-
1236
122
- 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
- 68086f8f-7a93-46e3-9599-2430e72b292e
- List
- L
- false
- 29df54b9-3acb-42c8-ab06-262968d5259c
- 1
-
1200
92
21
20
-
1212
102
- Item index
- ddbacce7-b36b-4ff1-bcde-6f2d7581929d
- Index
- i
- false
- 0
-
1200
112
21
20
-
1212
122
- 1
- 1
- {0}
- 0
- Wrap index to list bounds
- c681250f-45dd-4dad-b32c-768fc5c393d2
- Wrap
- W
- false
- 0
-
1200
132
21
20
-
1212
142
- 1
- 1
- {0}
- true
- Item at {i'}
- fbd13074-5224-40a0-86ad-4b933bf656d9
- false
- Item
- i
- false
- 0
-
1251
92
14
60
-
1258
122
- b648d933-ddea-4e75-834c-8f6f3793e311
- Cap Holes
- Cap all planar holes in a Brep.
- 1fe98429-f165-4518-b2a3-9019e4167e60
- Cap Holes
- Cap
-
1023
178
69
46
-
1056
201
- Brep to cap
- 3a140e82-d2a8-433c-8cc8-9ecbcf053c0c
- Brep
- B
- false
- 89ffd9e1-6710-4c7d-b879-f2fdffd5e08e
- 1
-
1025
180
16
42
-
1034.5
201
- Capped Brep
- 09ed81e4-b322-4e74-a416-7d5a8ed093f7
- Brep
- B
- false
- 0
-
1071
180
19
42
-
1080.5
201
- a435f5c8-28a2-43e8-a52a-0b6e73c2e300
- Point Polar
- Create a point from polar {phi,theta,offset} coordinates.
- edaeefc4-8418-48f1-a18f-37c10f486a9f
- Point Polar
- Pt
-
720
444
78
84
-
758
486
- Plane defining polar coordinate space
- 5d5a4637-0c27-4d59-9ae3-bbd25f987b22
- Base plane
- P
- false
- ec5f2aa0-1291-4d7a-ae32-db1a676a1c81
- 1
-
722
446
21
20
-
734
456
- 1
- 1
- {0}
-
0
0
0
1
0
0
0
1
0
- Angle in radians for P(x,y) rotation
- 016a3598-ca51-4be7-ab55-f50312e31e8f
- XY angle
- xy
- false
- f9ab86dd-723c-4ca8-9cb1-62fcd25b4153
- 1
-
722
466
21
20
-
734
476
- 1
- 1
- {0}
- 0
- Angle in radians for P(z) rotation
- f0ce99b9-0caa-41de-ad38-f50a19370a6a
- Z angle
- z
- false
- 15a96934-6fe0-4628-8eec-e78ee9687bf3
- 1
-
722
486
21
20
-
734
496
- 1
- 1
- {0}
- 0
- Offset distance for point
- d6143bde-0839-453c-b97f-0e5fad692d6e
- Offset
- d
- false
- e08de59b-9e05-42e9-a6ea-662d34d57cf9
- 1
-
722
506
21
20
-
734
516
- 1
- 1
- {0}
- 1
- Polar point coordinate
- 06d3956c-5ca1-4135-9bf0-5834877b0e35
- Point
- Pt
- false
- 0
-
773
446
23
80
-
784.5
486
- a4cd2751-414d-42ec-8916-476ebf62d7fe
- Radians
- Convert an angle specified in degrees to radians
- 6a58b3ad-ec2c-4934-8023-6f27beb49c4e
- Radians
- Rad
-
594
469
71
46
-
629
492
- Angle in degrees
- c9f60093-2dcd-4ba7-bf6c-ed7c6816e969
- Degrees
- D
- false
- 74a8e9b2-1867-4105-a2d5-da4c3d24143c
- 1
-
596
471
18
42
-
606.5
492
- Angle in radians
- f9ab86dd-723c-4ca8-9cb1-62fcd25b4153
- Radians
- R
- false
- 0
-
644
471
19
42
-
653.5
492
- a4cd2751-414d-42ec-8916-476ebf62d7fe
- Radians
- Convert an angle specified in degrees to radians
- 01b8d57a-dc7a-442c-867b-73eaea7fe2d9
- Radians
- Rad
-
595
514
71
46
-
630
537
- Angle in degrees
- 75141fff-1ecc-4014-b1b9-3e82bcc6c426
- Degrees
- D
- false
- c625a643-f3e6-45f8-9b7b-3d9d5e0b7995
- 1
-
597
516
18
42
-
607.5
537
- Angle in radians
- 15a96934-6fe0-4628-8eec-e78ee9687bf3
- Radians
- R
- false
- 0
-
645
516
19
42
-
654.5
537
- 57da07bd-ecab-415d-9d86-af36d7073abc
- Number Slider
- Numeric slider for single values
- e08de59b-9e05-42e9-a6ea-662d34d57cf9
- Number Slider
- false
- 0
-
495
573
173
20
-
495.5533
573.0284
- 1
- 1
- 0
- 360
- 0
- 0
- 50.6
- 318dacd7-9073-4ede-b043-a0c132eb77e0
- MD Slider
- A multidimensional slider
- a529f4ed-7e61-47d7-a155-14a9005089c7
- MD Slider
- MD Slider
- false
-
0.255245063878313
0.0835370319645579
0.5
- 0
- 0
-
0
180
-
0
180
-
0
1
-
134
382
194
200
-
134.3436
382.0854
- d24169cc-9922-4923-92bc-b9222efc413f
- Points to Numbers
- Convert a list of points to a list of numbers
- f3871b5a-ad6b-4272-958d-2d0f832c328e
- Points to Numbers
- Pt2Num
-
364
461
75
82
-
401
502
- 1
- Points to parse
- e001bc5e-d383-4296-beae-7b979f61a203
- Points
- P
- false
- a529f4ed-7e61-47d7-a155-14a9005089c7
- 1
-
366
463
20
39
-
377.5
482.5
- 1
- 1
- {0}
-
1
2
3
- Mask for coordinate extraction
- cc9b592d-1647-478c-8751-20ba1ddcb800
- Mask
- M
- false
- 0
-
366
502
20
39
-
377.5
521.5
- 1
- 1
- {0}
- 4
- 1
- Ordered list of coordinates
- b95e278c-6a1c-4846-8106-a5fe118f7028
- Numbers
- N
- false
- 0
-
416
463
21
78
-
426.5
502
- 59daf374-bc21-4a5e-8282-5504fb7ae9ae
- List Item
- 0
- Retrieve a specific item from a list.
- 079400fd-f093-440d-a8a1-0dcae34c9f8c
- List Item
- Item
-
466
490
83
64
-
504
522
- 3
- 8ec86459-bf01-4409-baee-174d0d2b13d0
- 2e3ab970-8545-46bb-836c-1c11e5610bce
- cb95db89-6165-43b6-9c41-5702bc5bf137
- 2
- 8ec86459-bf01-4409-baee-174d0d2b13d0
- 8ec86459-bf01-4409-baee-174d0d2b13d0
- 1
- Base list
- 9d09b8db-56a7-434d-8740-f6fbb88ca2ba
- List
- L
- false
- b95e278c-6a1c-4846-8106-a5fe118f7028
- 1
-
468
492
21
20
-
480
502
- Item index
- 15e68c93-be35-4e71-8c6f-8908a83722f3
- Index
- i
- false
- 0
-
468
512
21
20
-
480
522
- 1
- 1
- {0}
- 0
- Wrap index to list bounds
- 147c3c6b-cdfd-4aec-8f41-12a7bffbce8a
- Wrap
- W
- false
- 0
-
468
532
21
20
-
480
542
- 1
- 1
- {0}
- true
- Item at {i'}
- 74a8e9b2-1867-4105-a2d5-da4c3d24143c
- false
- Item
- i
- false
- 0
-
519
492
28
30
-
533
507
- Item at {+1'}
- c625a643-f3e6-45f8-9b7b-3d9d5e0b7995
- false
- Item +1
- +1
- false
- 0
-
519
522
28
30
-
533
537
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