Plot Curve! That's what I'm looking for. That was Plot Trajectory in the good ole days wasnt it?
Kind of a silly way to have to perform a curve resample but easier than bringing it into Maya I suppose. Thanks -- Joey Ponthieux LaRC Information Technology Enhanced Services (LITES) Mymic Technical Services NASA Langley Research Center __________________________________________________ Opinions stated here-in are strictly those of the author and do not represent the opinions of NASA or any other party. From: [email protected] [mailto:[email protected]] On Behalf Of Adam Seeley Sent: Friday, August 02, 2013 9:34 AM To: [email protected] Subject: Re: Convert curve to linear Or draw a vertical straight linear line, use fit on curve & deform the new curve along the Nurbs one. At least the number of divisions will be 'live' then. Bit of a drag unless there's a handy script. A. --------------------- Yoyo Digital Ltd. 07956 976 245 http://www.linkedin.com/in/adamseeleyuk<http://www.linkedin.com/profile/view?id=21162305> https://vimeo.com/adamseeley<https://vimeo.com/album/2280465> ________________________________ From: Adam Seeley <[email protected]<mailto:[email protected]>> To: "[email protected]<mailto:[email protected]>" <[email protected]<mailto:[email protected]>> Sent: Friday, 2 August 2013, 14:22 Subject: Re: Convert curve to linear You'd think...! If not then hoop jump and either path animate a null & plot it's trajectory or curve deform some geo along & extract the edges. A. --------------------- Yoyo Digital Ltd. 07956 976 245 http://www.linkedin.com/in/adamseeleyuk<http://www.linkedin.com/profile/view?id=21162305> https://vimeo.com/adamseeley<https://vimeo.com/album/2280465> ________________________________ From: "Ponthieux, Joseph G. (LARC-E1A)[LITES]" <[email protected]<mailto:[email protected]>> To: "[email protected]<mailto:[email protected]>" <[email protected]<mailto:[email protected]>> Sent: Friday, 2 August 2013, 14:11 Subject: Convert curve to linear Is there in any way in Soft to convert a NURBS curve of any shape, to a high density linear curve with equidistant points? -- Joey Ponthieux LaRC Information Technology Enhanced Services (LITES) Mymic Technical Services NASA Langley Research Center __________________________________________________ Opinions stated here-in are strictly those of the author and do not represent the opinions of NASA or any other party.
