greatly appreciate it!!
You can write the number of the question and write your answer next to it, example:
1) a
2) c
3) a) Washington University in St. Louis
4) 2 weeks (1week+1week shipping)
5) 130
6) b
7) b
The survey questions are as follows:
1)
Did you 3D print before?
5)
How much did it cost (in dollars)?
a.
Yes, for a school project
a.
Between 20 & 50
b.
Yes, for a personal project
b.
Between 50 & 80
c.
Between 80 & 120
2)
Print size
d.
Please specify if otherwise: _____ dollars
a.
Between 2 & 6 cubic inches
b.
Between 6 & 12 cubic inches
6)
Do you think the price was expensive?
c.
Between 12 & 20 cubic inches
a.
Not at all
d.
Please specify if otherwise: ____cubic inches
b.
A little bit expensive
c.
Very expensive
3)
Where did you print your object?
a.
School
7)
Were you satisfied with the printed object?
b.
Outside school: _________________
a.
Yes, it was a great print without problems
b.
Not bad, some issues
4)
How long did it take to print?
c.
I was not satisfied, very bad quality
a.
___ days
b.
___ weeks
Thank you very much to all!!
PS: If you did many 3D prints, you can post multiple answers.
Wassef…
curve or locus] of a segment AB, in English. The set of all the points from which a segment, AB, is seen under a fixed given angle.
When you construct l'arc capable —by using compass— you obviously need to find the centre of this arc. This can be easily done in GH in many ways by using some trigonometry (e.g. see previous —great— solutions). Whole circles instead of arcs provide supplementary isoptics —β-isoptic and (180º-β)-isoptic—. Coherent normals let you work in any plane.
Or you could just construct β-isoptics of AB by using tangent at A (or B). I mean [Arc SED] component.
If you want the true β-isoptic —the set of all the points— you should use {+β, -β} degrees (2 sides; 2 solutions; 2 arcs), but slider in [-180, +180] degrees provides full range of signed solutions. Orthoptic is provided by ±90º. Notice that ±180º isoptic is just AB segment itself, and 0º isoptic should be the segment outside AB —(-∞, A] U [B, +∞)—. [Radians] component is avoidable.
More compact versions can be achieved by using [F3] component. You can choose among different expressions the one you like the most as long as performs counter clockwise rotation of vector AB, by 180-β degrees, around A; or equivalent. [Panel] is totally avoidable.
Solutions in XY plane —projection; z = 0—, no matter A or B, are easy too. Just be sure about the curve you want to find the intersection with —Curve; your wall— being contained in XY plane.
A few self-explanatory examples showing features.
1 & 5 1st ver. (Supplementary isoptics) (ArcCapableTrigNormals_def_Bel.png)
2 & 6 2nd ver. (SED) (ArcCapableSED_def_Bel.png)
3 & 7 3rd ver. (SED + F3) (ArcCapableSEDF3_def_Bel.png)
4 & 8 4th ver. (SED + F3, Projection) (ArcCapableSEDProjInt_def_Bel.png)
If you want to be compact, 7 could be your best choice. If you prefer orientation robustness, 5. Etcetera.
I hope these versions will help you to compact/visualize; let me know any feedback.
Calculate where 2 points [A & B] meet at a specific angle is just find the geometrical locus called arco capaz in Spanish, arc capable in French (l'isoptique d'un segment de droite) or isoptic [curve or locus]
of a segment AB, in English. The set of all the points from which a segment,
AB, is seen under a fixed given angle.…
rera de Arquitectura CEM | presenta la cordial invitación al Curso de Diseño Computacional a realizarse en nuestros laboratorios de Arquitectura y Diseño Industrial del Campus Estado de México.
Fecha: jueves 21, viernes 22 de 18: a 22:00 Hrs y sábado 23 de 8:00 a 15:00 Hrs febrero 2013. 15 Horas.
El taller está orientado a estudiantes y profesionales de la Arquitectura, Arte, el Diseño e Ingeniería.
COSTO:
Alumnos Tec o EXATEC con una cuota de $2000.00 pesos.* Estudiantes EXTERNOS y profesores TEC $3000.00*, Estudiantes de posgrado externos $3800.00* y Profesionales externos $4250.00 pesos.*
OBJETIVO GENERAL:
Alfabetización sobre lectura y escritura de herramientas computacionales para el desarrollo de la Arquitectura, Diseño e Ingeniería.
Objetivos específicos:
1. Comprenderá los conceptos metodológicos del Diseño Computacional y generativo.
2. Aplicará las metodologías en el diseño, análisis y despiece de una cubierta (celosía, muro, losa, fachada o mobiliario) con base en un espacio existente en el campus.
3. Desarrollará los conceptos de programación orientada a objetos (POO Intermedia)
4. Generará algoritmos y análisis en Grasshopper sobre el ejemplo de praxis.
5. Desarrollo de documentación y presentación de resultados.
6. Fabricación del objeto, escala por definir.
Requisitos: Conocimiento de alguna plataforma CAD/CAM/CAE.
Profesor:
Arq. David Hernández Melgarejo.
http://bioarchitecturestudio.wordpress.com
Mayor información:
Kathrin Schröter, Dipl.-Ing./Arch. (D)
Directora de la Carrera de Arquitectura e Ingeniería Civil
Escuela de Diseño, Ingeniería y Arquitectura
Campus Estado de México
TEC DE MONTERREY
Tel.: (52/55) 5864 5555 Ext. 5685 o 5750
Enlace intercampus:80.236.5685
Fax: (52/55) 5864 5319
kschroter@itesm.mx
www.itesm.mx
…
http://www.pilkington.com/) dominates the planar market. Charges "around" 1K Euros per m2 for a "plain" system. Personally in bespoke projects I design my own stuff but due to economies of scale ... they cost a bit more (but they look far more sexier, he he) . On the other hand only in a bespoke project I could dare to suggest such a solution (for a large scale building we are talking lots and lots of dollars).
3. Several scales below (aesthetics) you can find static alu systems (either structural or semi-structural):
Or hinged systems (either structural or semi-structural) capable to adapt in contemporary double curvature facades/roofs/envelopes/cats/dogs etc etc ... pioneered worldwide many years ago by my best friend Stefanos Tampakakis (everybody in UAE knows that genius man: http://www.alustet.gr/company.html):
4. With the exception of some paranoid things that Guru Stefanos does for Zaha these days we are talking about planar "facets" (obviously a triangle is such a planar facet). The current trend is: the more edges the better (humans excel in vanity matters). But achieving planarity in, say, quads (like yours) it adds another "restriction" on what you are doing. Until recently Evolute Tools Pro was the only answer. But right now ... well let's say that in short time you'll be greatly surprised by some WOW things in this Noble Forum, he he.
5. MERO (and obviously custom systems) can adapt (at almost no extra charge) in anything imaginable. But in a bespoke building ... well.. you know ultra rich people: they don't want MERO anymore since "everybody" does MERO solutions. Vanity, what else?
6. Smart Glass would become a must in the years to come: Eco-Architecture MUST dominate everything you do. On the other hand spending millions to do some extra WOW stuff (Vanity) ... it doesn't look to me very Eco-Friendly/Whatever ... but let's pretend so, he he.
7. I'm Architect but a bit different from the norm: for instance I smoke cigars (highly politically incorrect stuff) I always talk openly (ditto) and I ride lethal bikes (ditto).
may the Force (as always the Dark Option) be with you: go out there and kill them all.
best, Peter
…
Ladybug + Honeybee:
(Follow steps 0-4 for basic functionality and 0-9 for full functionality)
0. If you have an old version of LB+HB, download the file here (https://app.box.com/s/ds96em9l6stxpcw8kgtf)
and open it in Grasshopper to remove your old Ladybug and Honeybee version.
1. Make sure that you have a working copy of both Rhino and Grasshopper installed.
2. Open Rhino and type "Grasshopper" into the command line (without quotations). Wait for grasshopper to load.
3. Install GHPython 0.6.0.3 by downloading the file at this link (http://www.food4rhino.com/project/ghpython?ufh) and
drag the .gha file onto the Grasshopper canvas.
4. Select and drag all of the userObject files (downloaded with this instructions file) onto your Grasshopper canvas.
You should see Ladybug and Honeybee appear as tabs on the grasshopper tool bar.
(If you are reading this instruction on github you can download them from http://www.food4rhino.com/project/ladybug-honeybee)
5. Restart Rhino and Grasshopper. You now have a fully-functioning Ladybug. For Honeybee, continue to the following:
6. Install Radiance to C:\Radiance by downloading it from this link (https://github.com/NREL/Radiance/releases/download/4.2.2/radiance-4.2.2-win32.exe) and running the exe.
7. Install Daysim 4.0 for Windows to C:\DAYSIM by downloading it at this link (http://daysim.ning.com/page/download) and running the exe.
8. Install EnergyPlus 8.1 to C:\EnergyPlusV8-1-0 by going to the DOE website (http://apps1.eere.energy.gov/buildings/energyplus/energyplus_download.cfm), making an account, going to "download older
versions of EnergyPlus, selecting 8.1 and running the exe.
9. Copy falsecolor2.exe (http://pyrat.googlecode.com/files/falsecolor2.exe) and evalglare.exe (http://www.ise.fraunhofer.de/en/downloads-englisch/software/evalglare_windows.zip/at_download/file) to C:\Radiance\bin
10. You now have a fully-working version of Ladybug + Honeybee. Get started visualizing weather data with these video tutorials (https://www.youtube.com/playlist?list=PLruLh1AdY-Sj_XGz3kzHUoWmpWDXNep1O).
After I've done all the above I followed this video
https://vimeo.com/96155674
And everything works well.
…
nted" in space (at instance definition creation phase): indicates the obvious fact that if garbage in > garbage out (try it).
2. Load the GH thing. Task for you: Using Named Views locate the points of interest as described further and make a suitable view. That way you can navigate rather easily around (hope dies last).
3. Your attractors are controlled from here:
The slider in blue picks some attractor to play with. You can use this while the K2 is running.
4. Don't change anything here (think of it as a black box: who cares how it works? nobody actually):
5. Enable the other "black box": job done your real-life stuff is placed:
6. Enable the solver: your "real-life" things start to bounce around:
7. Go there are play with the slider. A different attractor yields an other solution:
8. With real-life things in place if you disable the C# ... they are instantly deleted and you are back in lines/points and the likes:
9. Either with instance definitions or Lines/points change ... er ... hmm ... these "simple" parameters and discover the truth out there:
10. Since these are a "few" and they affect the simulation with a variety of ways ... we need a "self calibrating" system: some mini big Brother that does the job for us. Kinda like applying safely the brakes when it rains (I hate ABS mind).
NOTE: the rod with springs requires some additional code ,more (that deals with NESTED instance definitions) in order to (b) bounce as a whole and at the same time (b) elongates or shrinks a bit.
More soon.
…
ng/702/30
EDIT: DK2 works, not with positional tracking yet (14/09/15)
Source is here:
https://github.com/provolot/RhinoRift
Steps:
1) Download these files (also attached below):
https://github.com/provolot/oculus-grasshopper/raw/master/oculus-grasshopper_v0.4.ghx
https://github.com/provolot/oculus-grasshopper/raw/master/OpenTrackRiftGrasshopperUDP.ini
https://github.com/provolot/oculus-grasshopper/raw/master/oculus-grasshopper-test_v0.1.3dm
2) Download OpenTrack - http://ananke.laggy.pk/opentrack/, and setup/install. Once installed, double-click to open.
3) In OpenTrack, load the 'OpenTrackRiftGrasshopperUDP.ini' profile. Click the 'Start' button and move your Rift around - make sure that it looks like the Yaw/Pitch/Roll data is being sent. TX/TY/TZ will all be 0, as Oculus doesn't have absolute positioning data.
4) In Rhino, open the test 3dm. You'll notice that there are two viewports - called 'LeftEye' and 'RightEye'. These have been placed to mimic where the screens should be for the Oculus Rift --- but only when Rhino is in fullscreen mode, with the command 'Fullscreen'. The placement needs to be tweaked, but should work.
If you want to use your own model, you can load your own .3dm file in Rhino, then you can right-click on the viewport name, and go to Viewport Layout > Read from File. If you then load my test file, Rhino should open my two viewports, sized correctly, onto your model.
The placement of these viewports need to be tweaked; if you find a better viewport layout, upload an empty Rhino file with your viewports, and we can share eye-layout 'templates'!
5) In Grasshopper, open the .ghx definition. Everything that is multiple-grouped is a value that can be changed. Two things here:
- IPD: Set this and convert it to the proper units for your model.
- Left/right viewport names. In this case, leave this as-is, since you're using my example file.
6) Turn on the Grasshopper Timer, if it isn't on already.
7) In the GH definition, toggle 'SyncEyes' to be True. Then, in the left viewport, try orbiting around with the mouse. The 'RightEye' viewport should move around as well, pretty much simultaneously.
8) In OpenTrack, click 'Start', then toggle 'ReadUDP' to be True. You should see the 'OpenTrackInfo' panel fill with data that's constantly changing.
9) Move around the landscape with your camera, and when you set on a starting view that's ideal, click the triangle of the Data Dam component to 'store' the data.
10) Finally, toggle 'OculusMove' to be true. If all works correctly, both viewports should move based on the Rift's movement.
Let me know if you have any problems!
Cheers,
Dan…
Added by Dan Taeyoung at 11:47pm on December 10, 2013
ays be a bit, well, crinkly, so to speak (which is often something people want to avoid, but in this case it sounds like it is the desired result).
Also, they can indeed be created using Kangaroo, by simply setting a length goal for every edge:
(This was possible in the old Kangaroo, but such hard constraints work much better with the new solver in version 2)
Such meshes are sometimes referred to as Lobel frames after the French architect Alain Lobel.
I think some of the confusion arises because there have been numerous conversations on this forum where people were asking how to create a triangular mesh with precisely equal edge lengths on a given doubly curved surface, which also in some sense approximates smoothness, and this is generally impossible.
Of course no non-flat triangular mesh with a finite number of faces is ever actually truly smooth, since the individual faces are flat, while the curvature is concentrated at the vertices instead of distributed across the surface. However, by allowing slight variation in the edge lengths these kinks can be made small, and they get smaller as the mesh is refined (as is done for subdivision surfaces), approaching smoothness in the limit.
This isn't possible while keeping edge lengths equal, but interestingly Lobel frames can in some cases approximate slightly doubly curved surfaces, it's just that they have to take on a sort of up-and-down folding pattern between adjacent faces, like origami, instead of the faces lying tangent to the smooth surface like subdivision meshes do.
Also, such equilateral meshes inevitably form spikes at the extraordinary vertices (those surrounded by some number other than 6 faces), and unless the surface you are approximating is close to developable you usually need some extraordinary vertices.
Bearing in mind all these limitations, I still think equilateral meshes have some interesting possibilities and are relatively under-explored digitally, due to a former lack of tools for working with them.
They are also closely related to an interesting class of hexagonal beam structures, as described here:
http://www.geometrie.tuwien.ac.at/pottmann/2014/honeycomb/index.html
…
tten on the initial configuration): this makes the analysis a bit tricky. In Finite Element programs, this is usually solved by an iterative method (modified Riks method), which is unfortunately not implemented in Karamba. There are other form-finding techniques, used for gridshells:
Dynamic relaxation with kinetic or viscous damping. I used viscous damping and an implicit integration scheme (Bathe's method) for the form-finding of gridshells in this paper. For kinetic damping, you can look here. It was first used for beams by Sigrid Adriaenssens
You can also look at Sina Nabei's PhD on the form-finding of twisted beams, and also the thesis of Frederic Tayeb (in french) and some papers in the link far below.
The main question remains the mechanical you are using: beam model (with torsion and bending) or shell model? In terms of solver, Kangaroo2 is powerful (although you don't have access to real engineering values, like Young's modulus), but there is no beam element with 4 or 6 degrees of freedom/node... Likewise, I'm not sure that shell elements (with bending) are implemented within Kangaroo2.
If you look for references of research on deployable structures for shading, you can look at the research at ITKE, but also a joint research effort between Princeton and l'Ecole des Ponts ParisTech.
http://thinkshell.fr/deployable-structures/
http://thinkshell.fr/form-finding-of-twisted-beams/
I hope this helps you...
Romain…
er from moltiple curves the represent the area of floor plans,
but the problem is, I cant fine a way to intelligently divide the curves - responsively to the radiation analysis color (for example - that yelow area on of the building will have more division on each floor plan)
do you have any ideas on how to do that?
i tried to use attractors be failed miserably..
THANKS,
Limor.…