algorithmic modeling for Rhino
stellated octahedron growth
An iteration of truncation of the stellated octahedron which generates new ones by mirroring the truncated tetrahedrons in respect to their centroid. Each Nth generation growths by 8^n. Final number of objects in the population equals:
8^0 + 8^1 + ... + 8^n
Comment
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Comment by Piotr Klushinsky on December 24, 2014 at 6:18am
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cool snowflake fractal !
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Comment by Alexander Świątek on December 24, 2014 at 3:37am
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I used galapagos to find the base tetrahedron. It optimizes the angle of rotation of the side walls around their base edge. Fitness is set to minimize the area of the polyline created by the top vertices of each side - obviously we want it to be zero as they should meet in one point.
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Comment by Aleksander Dynarek on December 24, 2014 at 3:31am
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nice! what galapagos was used for?
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