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 5.5.1

## Scilab 6.0.0