per space. In the upper right corner you draw another dot, and you write "1, 1" next to it. You now have 2 points defined in paper space (uv space).
Ok, lay down the pencil and pick up the paper. You'll notice that the two points have just moved through world-space. They were very close to the desk, but now they are hovering above it. The coordinates you wrote down on the paper or the other hand are still valid.
No matter what you do to this piece of paper; crumple it, fold it, take it on a plane to South Africa, those two points remain fixed in paper space.
A surface is always a rectangle in Rhino. It may be deformed, it may have holes cut into it, but in the end it's always a rectangle, just like your piece of paper. UV coordinates are points that are defined in Surface UV space. They consist of only two numbers, because a surface has no thickness. At any point in time, you can translate these UV points into World XYZ points using what is called a surface evaluator. Where these XYZ points end up depends entirely on the *shape*, *size* and *location* of the surface.
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Surface uv-space (and Curve t-space) are vital when dealing with nurbs geometry. If you do not understand the concept of parameter space, you will have a lot of problems because many components in Grasshopper use these coordinates.
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David Rutten
david@mcneel.com
Seattle, WA…
Added by David Rutten at 6:40pm on September 27, 2009
hopper no requiere de conocimientos de programación o scripting para permitir al diseñador trabajar de forma generativa y paramétrica. No son necesarios conocimientos previos de Grasshopper pero sí de Rhino a nivel básico.
Controlmad es Centro Formador Autorizado Rhinoceros y Rhino fab Studio.
Nuestros profesores son Instructores Autorizados Rhinoceros con experiencia universitaria, nacional e internacional.
El curso y los ejercicios a desarrollar están enfocados a diseñadores, arquitectos, ingenieros y estudiantes.
En este curso introductorio el alumno se familiarizará con términos básicos de la estructura de Grasshopper, como “listas de datos”, “dominios”, “estructuras en árbol”, etc.
Es un curso de 18 horas, con el que se pretende entrar en la lógica de trabajo de Grasshopper mediante diversos ejercicios, de forma que el alumno sea capaz posteriormente de desarrollar sus propias gramáticas, con la confianza que da comprender los términos básicos de programación sobre los que se apoya todo el sistema de trabajo de Grasshopper.Para este curso no son necesarios conocimientos previos de Grasshopper, pero sí de Rhino (a nivel básico).
También se vincula el programa con la impresión 3D aprendiendo a exportar archivos desde Grasshopper con los requisitos mínimos de impresión 3D. Se realizará una demo de impresión en el aula.
El primer día del curso se le facilita al alumno un manual-tutorial con los ejercicios a realizar, en PDF.
A la finalización del curso, y siempre que el alumno haya asistido al 80% de las clases, se le otorgará un diploma oficial acreditativo del curso.
Fechas: 5, 6, 12 y 13 de marzo
Horario: sábado y domingo 16 - 20,30h (Madrid, CET)
Lugar: Sesiones On-line en directo a través de nuestra plataforma online.controlmad.com
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creating the structural frame, finding the endpoints, linking these endpoints with curves and afterwards lofting the surfaces between the curves.
The results were quite nice, however, the procedure is very time consuming and inefficient. There is just too much copy-pasting involved.
(see attached file: "Old Attempts.zip" )
Mesh relaxation:
I have later on used Daniel Piker's tutorials on Mesh Relaxation and realized that this might be the way to go.
The link to these online tutorials on wewanttolearn.net is:
https://wewanttolearn.wordpress.com/2011/10/22/mesh-relaxation-kangaroo-tutorial/
His tutorials, however, only deal with mesh boxes which are ideal cubes. He then joins them together in various directions, but it is under 90 degrees angle.
( see attached file: "Daniel Pikers Examples" )
What I would like to achieve:
I want my bridges to go in all directions and angles, not just under 90 degree angle.
Ideally I would like to make a square (polygon) follow a curve (which moves in all axis) at certain number of division points. I would then loft these squares into a mesh and use that shape as a mesh box. I would later use this mesh box and relax it the same way as Daniel Piker used the cubes in his tutorial. The anchor points are only the vertices of the squares which create the lofted mesh box.
( see attached file: "New Attempts" )
As you can see below this procedure works even if the curve is moving in all directions not only along xy axis. There are, however, many problems connected to it.
The problem:
Despite all the effort I cannot seem to come up with a design where I would be able to draw a random curve which would be the guideline for my mesh box and then apply this box to one definition in order to relax the mesh and create the shape that I want. Without this I am again forced into a lot of copy pasting as the final mesh box is made out of several sections.
Also is there any way I could make the final resulting mesh a bit smoother? Increasing the number of mesh faces is probably the only way, right?
Thank you guys so much for any potential help.
All best,
Luka
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