# How do I determine orientation of vertices in scilab 3dplot?

I want to plot a simple object in scilab (3d). To understand the way scilab works in that regard, I wrote the following example:

xx = [[2;2;1;3;],[2;2;3;3],[2;2;3;1],[2;2;1;1],[1;3;3;1],[3;3;3;3],[3;3;1;1],[1;1;1;1],[1;2;2;3],[1;1;2;2],[3;2;2;3],[3;2;2;1]]

yy = [[2;2;1;1;],[2;2;1;3],[2;2;3;3],[2;2;3;1],[1;1;1;1],[1;3;3;1],[3;3;3;3],[3;1;1;3],[1;2;2;1],[1;3;2;2],[1;2;2;3],[3;2;2;3]]

zz = [[0;0;1;1;],[0;0;1;1],[0;0;1;1],[0;0;1;1],[1;1;2;2],[1;1;2;2],[1;2;2;1],[1;1;2;2],[2;3;3;2],[2;2;3;3],[2;3;3;2],[2;3;3;2]]

col = ones(12,1)*3

plot3d(xx,yy,list(zz,col))
//h = get("hdl")
//h.hiddencolor = -1 // backside and frontside same color

with the following result:

While the structure is absolutley fine, the coloring on 2 faces is inside out. I tried to draw the points of the affected faces in different ways counterclockwise/clockwise, different starting points, etc.. But the faces seem to keep oriented inwards the structure. I found a workaround by setting the backside of the faces equal to the frontside (the 2 commented lines in the code) but I want to understand how scilab determines the orientation of the faces for later work. Any clues?

EDIT:

So i tried PTRK's suggestions. While his provided Matrices are definitely different:

The result is still the same. Even the output of the provided Testscript is different:

Perhaps thats some kind of version/system thing? I'm using Scilab 6.0.0 on Windows 10.

Let a surface defined by 3 nodes: [P1,P2,P3]. Then you must cycle clockwise trough theses nodes to have the right orientation of inside and outside. Here is a drawing explaining it:

3 of your polygones are defined conterclockwise, thoses with y=1, y=3 and x = 1. When drawing 4 points polygones, to switch the rotation from clockwise to counterclockwise, just swap the 2nd and 4th nodes or 1st and 3rd.

Thus you must set your points as:

xx = [[2;2;1;3;],[2;2;3;3],[2;2;3;1],[2;2;1;1],[1;1;3;3],[3;3;3;3],[3;3;1;1],[1;1;1;1],[1;2;2;3],[1;1;2;2],[3;2;2;3],[3;2;2;1]]

yy = [[2;2;1;1;],[2;2;1;3],[2;2;3;3],[2;2;3;1],[1;1;1;1],[1;1;3;3],[3;3;3;3],[3;3;1;1],[1;2;2;1],[1;3;2;2],[1;2;2;3],[3;2;2;3]]

zz = [[0;0;1;1;],[0;0;1;1],[0;0;1;1],[0;0;1;1],[1;2;2;1],[1;2;2;1],[1;2;2;1],[1;2;2;1],[2;3;3;2],[2;2;3;3],[2;3;3;2],[2;3;3;2]]

This will give the desired output :

# Scilab 6.0.0 bug

In this version, if your surfaces are parallel to the cartesian axes, then Scilab will direct it along the axis, no matter how you defined it. Thus your problem. A workaround could be to offset one of the coordinate by a small delta, which must be not too small, as shown in below example.

Regarding your problem, if we want to keep the geometry of your object, we could tilt it with a tiny angle: using rotation matrix, if the computational cost induced by the rotation of all the coordinates doesn't bother you. Here's your script with the tilted object

clc
clear
xdel(winsid())

xx = [[2;2;1;3;],[2;2;3;3],[2;2;3;1],[2;2;1;1],[1;1;3;3],[3;3;3;3],[3;3;1;1],[1;1;1;1],[1;2;2;3],[1;1;2;2],[3;2;2;3],[3;2;2;1]]

yy = [[2;2;1;1;],[2;2;1;3],[2;2;3;3],[2;2;3;1],[1;1;1;1],[1;1;3;3],[3;3;3;3],[3;3;1;1],[1;2;2;1],[1;3;2;2],[1;2;2;3],[3;2;2;3]]

zz = [[0;0;1;1;],[0;0;1;1],[0;0;1;1],[0;0;1;1],[1;2;2;1],[1;2;2;1],[1;2;2;1],[1;2;2;1],[2;3;3;2],[2;2;3;3],[2;3;3;2],[2;3;3;2]]

col = ones(12,1)*3

figure(1)
set(gcf(),'background',-2)
subplot(2,1,1)
plot3d(xx,yy,list(zz,col))
title('Object with surfaces orthogonal to cartesian axis')
subplot(2,1,2)
// t is angle in radian showing the tilt
t = %pi/10000
c = cos(t)
s = sin(t)
rot = [1,0,0;0,c,-s;0,s,c]*[c,0,s;0,1,0;-s,0,c]*[c,-s,0;s,c,0;0,0,1]
for i=1:size(xx,1)
for j = 1:size(xx,2)
xyz=(rot*[xx(i,j);yy(i,j);zz(i,j)])
x(i,j)=xyz(1)
y(i,j)=xyz(2)
z(i,j)=xyz(3)
end
end
plot3d(x,y,list(z,col))
title('Object with surfaces tildted by an angle of '+string(t)+' rad')

Script showing 2 surfaces defined by the same nodes but in opposite order.

clc
clear
xdel(winsid())

figure(1)
set(gcf(),'background',-2)
cr=color('red') // color of the outside surface

P1 = [0,0,0] //
P2 = [0,1,0]
P3 = [1,0,0]

F1 = [P1;P2;P3] // defining surface clockwise
F2 = [P1;P3;P2] //                  counterclockwise

subplot(2,2,1)
plot3d(F1(:,1),F1(:,2),list(F1(:,3),cr*ones(F1(:,3))))
xstring(F1(:,1),F1(:,2),['P1','P2','P3'])
title('surface is [P1,P2,P3] with z_P3=0')
set(gca(),'data_bounds',[0,1,0,1,-1,1])

subplot(2,2,2)
plot3d(F2(:,1),F2(:,2),list(F2(:,3),cr*ones(F2(:,3))))
xstring(F2(:,1),F2(:,2),['P1','P3','P2'])
title('surface is [P1,P3,P2] with z_P3=0, broken with Scilab 6.0.0')
set(gca(),'data_bounds',[0,1,0,1,-1,1])

subplot(2,2,3)
plot3d(F2(:,1),F2(:,2),list(F2(:,3)+[0;0;10^-7],cr*ones(F2(:,3))))
xstring(F2(:,1),F2(:,2),['P1','P3','P2'])
title('surface is [P1,P3,P2] with |z_P3| < 10^-8')
set(gca(),'data_bounds',[0,1,0,1,-1,1])

subplot(2,2,4)
plot3d(F2(:,1),F2(:,2),list(F2(:,3)+[0;0;10^-8],cr*ones(F2(:,3))))
xstring(F2(:,1),F2(:,2),['P1','P3','P2'])
title('surface is [P1,P3,P2] with |z_P3| = 10^-8, broken in 6.0.0')
set(gca(),'data_bounds',[0,1,0,1,-1,1])

## Scilab 6.0.0

• Hi! Thanks alot for your answer! Please see the edit of my question! Commented Sep 8, 2017 at 7:50
• Thank you very much! Good to know it's kind of a bug afterall. You definitely explained the behaviour and added a workaround, so I'll mark your post as answer. I don't know if this behaviour is intended, we probably should report a bug when scilabs bugtracker is back online. Commented Sep 8, 2017 at 9:33
• At least I wrote on the scilab mailing list
– PTRK
Commented Sep 8, 2017 at 9:59
• @StefanSchallmeiner I've added an idea to your solution if you're interested.
– PTRK
Commented Sep 8, 2017 at 10:27
• Thanks again, but i'll stick to my workaround with "h.hiddencolor = -1" to keep the geometry in tact. Usually if the figure represents a volume of some kind, it shouldn't be a problem to make the inside as well as the outside the same color. But as I'm planning to interpret results coming from some kind of finite element simulation I don't want to mess with the geometry. Commented Sep 11, 2017 at 11:18