algorithmic modeling for Rhino
i'm wondering if there is anyone out there that might be interested in helping with a small (i assume) task to generate some circular sections on an arbitrary ellipsoid.
i am wondering in part if this might be accomplished in galapagos and would be interested in being contacted by anyone interested in such a challenge.
feel free to email me off list if this might be of interest.
thanks.
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Hi Chris.
Excellent.
Really very, very elegant.
Thanks for this
Jonathan
Hi Sistemiq,
On this one. Can I ask you to elaborate a little on it or if it is possible for me to work with the definition a little either by sending it on or off list? I am just getting started with GH but it is something I have wanted to work with for a long time and these kind of experiments are really nice because - well I find them interesting.
Anyway, I guess this is a galapagos script with some kind of evolutionary goal which is the circularity of the sections? And it has somehow refined things down to the point at which you are showing a "non-circularity" by some linear amount? And this is an "e to the whatever" /difference/ between the smallest and the largest radius of the ellipsoid?
If so, is there an angular amount that this section deviates from one of the planes of the ellipsoid? I mean, what is this amount? Do you imagine this is a constant across all "non-radially similar" ellipsoids (i.e. their radiuses are all different to each other? Different angles for each individual ellipsoid?
Regards,
Jonathan
I dont think its needed to elaborate on this further, as Chris's simple solution makes Galapagos useless there.
Yes. Very interesting.
Thanks for the look here.
I quite enjoyed following it.
Cheers.
Hi Sistemiq. First off a big thank you for taking this under consideration. It is this last class that I am interested in. However, I have to study some of the posts and some of the url's to make sure I am not mistaken about this.
But, I am pretty sure this is the class I am interested in:
> all radii different: there are 2 infinite sets (I think) of parallel circular cuts, finding the 2 planes of these families shouldnt require Galapagos. I may be totally wrong about this.
I suppose it is possible to specify one single angular amount that deviates from a transverse or longitudinal 'planar' (horizontal) or 'sectional' (vertical) section cut through the ellipsoid? But the question I am imagining is what is this angle and couldn't it be possible to arrive at it in galapagos? I guess you are saying that you believe the iterative nature of galapagos is not necessary and it can be done in GH?
- Jonathan
See Chris's suggestion above.
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