# How can I draw a SuperShape3D as a mesh?

I would like to draw a 3D Superformula mesh but not sure how I should organize the faces(be them triangles or quads).

I've installed octave and tried the sample code. I have no clue how Gnuplot's mesh() function works, but I imagine I would need something similar.

The Wikipedia entry has a link to a Processing demo. I had a look at the source and noticed it only draws points. I tried to wrap that segment of code within beginShape()/endShape() calls but work the way I hoped.

I also tried to check if the number of points is divisible by 3 or 4 and used TRIANGLES or QUADS, but this is not the right way to do this, as you can see below:

How can I draw a SuperShape3D using triangles/quads ? I imagine the vertices are in the right positions, but they need to be sorted to calls that would draw the faces using the vertex indices.

I'm not fixed to a particular language at the moment, but my goal would be to have the vertices in an array, then push faces(3 or 4 points) using vertex indices.

Any hints ?

Update:

Here is the function used to get the points in the Processing sample code:

``````import toxi.geom.*;
import controlP5.*;

ControlP5 controlP5;
ArrayList points = new ArrayList();
ArrayList faces = new ArrayList();

float a1=1,a2=1,b=1,xx,step = 0.05,yy,zz,n1=4,n2=12,n3=15,n4=15,r,raux1,r1,raux2,r2;
int N_X = int(2*PI/step);
int N_Y = int(PI/step);

void setup() {
size(800,800,P3D);
//hint(ENABLE_DEPTH_SORT);

controlP5 = new ControlP5(this);

controlP5.addSlider("a1value",0,3,1,20,0,200,10);
controlP5.addSlider("a2value",0,3,1,20,20,200,10);
controlP5.addSlider("bvalue",0,3,1,20,40,200,10);
controlP5.addSlider("n1value",0,20,8,20,60,200,10);
controlP5.addSlider("n2value",0,5,0.5,20,80,200,10);
controlP5.addSlider("n3value",0,5,0.5,20,100,200,10);
controlP5.addSlider("n4value",0,20,8,20,120,200,10);
controlP5.addSlider("stepvalue",0.02,0.9,0.05,20,140,200,10);
controlP5.setAutoDraw(false);
draw_super_formula();
}

void draw() {
background(0);
fill(255);
controlP5.draw();
lights();
translate(width / 2, height / 2, 0);
rotateX(mouseY * 0.01f);
rotateY(mouseX * 0.01f);
// connect 4 points into quads:
Vec3D pt;
for(int x=0;x<N_X-1;x++)
{
for(int y=0;y<N_Y-1;y++)
{
beginShape(QUADS);
pt = (Vec3D)points.get( x*N_Y + y );
vertex(pt.x,pt.y,pt.z);
pt = (Vec3D)points.get( x*N_Y + y+1 );
vertex(pt.x,pt.y,pt.z);
pt = (Vec3D)points.get( (x+1)*N_Y + y+1 );
vertex(pt.x,pt.y,pt.z);
pt = (Vec3D)points.get( (x+1)*N_Y + y);
vertex(pt.x,pt.y,pt.z);
endShape();
}
}
}

void vertex(Vec3D v) {
vertex(v.x,v.y,v.z);
}

void draw_super_formula() {
for(int i = points.size()-1; i>0;i--){
points.remove(i);
}

for(int x=0;x<N_X;x++)
{
float i = -PI + x*step;
for(int y=0;y<N_Y;y++)
{
float j = -PI/2.0 + y*step;
raux1=pow(abs(1/a1*abs(cos(n1*i/4))),n3)+pow(abs(1/a2*abs(sin(n1*i/4))),n4);
r1=pow(abs(raux1),(-1/n2));
raux2=pow(abs(1/a1*abs(cos(n1*j/4))),n3)+pow(abs(1/a2*abs(sin(n1*j/4))),n4);
r2=pow(abs(raux2),(-1/n2));
xx=r1*cos(i)*r2*cos(j)*100;
yy=r1*sin(i)*r2*cos(j)*100;
zz=r2*sin(j)*100;

Vec3D test1 = new Vec3D(xx,yy,zz);
points.add(test1);
}
}
}

void bvalue(float new_value){
b = new_value;
draw_super_formula();
}
void a1value(float new_value){
a1 = new_value;
draw_super_formula();
}
void a2value(float new_value){
a2 = new_value;
draw_super_formula();
}
void n1value(float new_value){
n1 = new_value;
draw_super_formula();
}
void n2value(float new_value){
n2 = new_value;
draw_super_formula();
}
void n3value(float new_value){
n3 = new_value;
draw_super_formula();
}
void n4value(float new_value){
n4 = new_value;
draw_super_formula();
}

void stepvalue(float new_value){
step = new_value;
draw_super_formula();
println("% 3: "+(points.size()%3));
println("% 4: "+(points.size()%4));
}
class F4{
int a,b,c,d;
F4(int a,int b,int c,int d){
this.a = a;
this.b = b;
this.c = c;
this.d = d;
}
}
``````

@tim_hutton's solution is great, but it looks an index off, trying to figure out where that is.

-
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## 1 Answer

The superformula gives you a radius for each angle sampled. In 3D you need two angles: theta and phi. By keeping theta fixed and varying phi (or vice versa) you will sample along a great circle.

One way to make a surface is to make quads by sampling four points based on the angles a and b: (a,b), (a+da,b), (a+da,b+db), (a,b+db). Do this for a: 0,da,2*da... and for b: 0,db,2*db... until the whole surface is covered. Use a small da and db to get small quads.

(The alternative is to use a generic surface reconstruction algorithm (1,2) but this is overkill for a problem like this.)

Update:

I think the code below is something like what you want:

``````
import toxi.geom.*;
import controlP5.*;

ControlP5 controlP5;
ArrayList points = new ArrayList();
ArrayList faces = new ArrayList();

float a1=1,a2=1,b=1,xx,step = 0.05,yy,zz,n1=4,n2=12,n3=15,n4=15,r,raux1,r1,raux2,r2;
int N_X = int(2*PI/step);
int N_Y = int(PI/step);

void setup() {
size(800,800,P3D);
//hint(ENABLE_DEPTH_SORT);

controlP5 = new ControlP5(this);

controlP5.addSlider("a1value",0,3,1,20,0,200,10);
controlP5.addSlider("a2value",0,3,1,20,20,200,10);
controlP5.addSlider("bvalue",0,3,1,20,40,200,10);
controlP5.addSlider("n1value",0,20,8,20,60,200,10);
controlP5.addSlider("n2value",0,5,0.5,20,80,200,10);
controlP5.addSlider("n3value",0,5,0.5,20,100,200,10);
controlP5.addSlider("n4value",0,20,8,20,120,200,10);
controlP5.addSlider("stepvalue",0.02,0.9,0.05,20,140,200,10);
controlP5.setAutoDraw(false);
draw_super_formula();
}

void draw() {
background(0);
fill(255);

controlP5.draw();

translate(width / 2, height / 2, 0);
rotateX(mouseY * 0.01f);
rotateY(mouseX * 0.01f);
drawAxes(300);
beginShape(POINTS);
for(int i = 0; i < points.size();i++){
Vec3D k = (Vec3D)points.get(i);
stroke(color(k.x+110,k.y+110,k.z+110));
vertex(k.x,k.y,k.z);
}
endShape();

// connect 4 points into quads:
Vec3D pt;
noFill();
for(int x=0;x<N_X-1;x++)
{
for(int y=0;y<N_Y-1;y++)
{
beginShape();
pt = (Vec3D)points.get( x*N_Y + y );
vertex(pt.x,pt.y,pt.z);
pt = (Vec3D)points.get( x*N_Y + y+1 );
vertex(pt.x,pt.y,pt.z);
pt = (Vec3D)points.get( (x+1)*N_Y + y+1 );
vertex(pt.x,pt.y,pt.z);
pt = (Vec3D)points.get( (x+1)*N_Y + y);
vertex(pt.x,pt.y,pt.z);
endShape();
}
}
}

void vertex(Vec3D v) {
vertex(v.x,v.y,v.z);
}

void draw_super_formula() {
for(int i = points.size()-1; i>0;i--){
points.remove(i);
}

for(int x=0;x<N_X;x++)
{
float i = -PI + x*step;
for(int y=0;y<N_Y;y++)
{
float j = -PI/2.0 + y*step;
raux1=pow(abs(1/a1*abs(cos(n1*i/4))),n3)+pow(abs(1/a2*abs(sin(n1*i/4))),n4);
r1=pow(abs(raux1),(-1/n2));
raux2=pow(abs(1/a1*abs(cos(n1*j/4))),n3)+pow(abs(1/a2*abs(sin(n1*j/4))),n4);
r2=pow(abs(raux2),(-1/n2));
xx=r1*cos(i)*r2*cos(j)*100;
yy=r1*sin(i)*r2*cos(j)*100;
zz=r2*sin(j)*100;

Vec3D test1 = new Vec3D(xx,yy,zz);
points.add(test1);
}
}
}

void drawAxes(float l) {
stroke(255, 0, 0);
line(0, 0, 0, l, 0, 0);
line(l, 0, 0, l-10, 10, 0);
line(l, 0, 0, l-10, -10, 0);

stroke(0, 255, 0);
line(0, 0, 0, 0, l, 0);
line(0, l, 0, 10, l-10, 0);
line(0, l, 0, -10, l-10, 0);

stroke(0, 0, 255);

line(0, 0, 0, 0, 0, l);
line(0, 0, l, 0, 10, l-10);
line(0, 0, l, 0, -10, l-10);

}

void bvalue(float new_value){
b = new_value;
draw_super_formula();
}
void a1value(float new_value){
a1 = new_value;
draw_super_formula();
}
void a2value(float new_value){
a2 = new_value;
draw_super_formula();
}
void n1value(float new_value){
n1 = new_value;
draw_super_formula();
}
void n2value(float new_value){
n2 = new_value;
draw_super_formula();
}
void n3value(float new_value){
n3 = new_value;
draw_super_formula();
}
void n4value(float new_value){
n4 = new_value;
draw_super_formula();
}

void stepvalue(float new_value){
step = new_value;
draw_super_formula();
println("% 3: "+(points.size()%3));
println("% 4: "+(points.size()%4));
}
class F4{
int a,b,c,d;
F4(int a,int b,int c,int d){
this.a = a;
this.b = b;
this.c = c;
this.d = d;
}
}
``````
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The idea of making quads by sampling four points sounds good. I'm affraid I don't fully understand the notation for the points. a,b are the two angles (theta and phi in the wiki sample), what is d ? Is it the 4th point of the quad ? I've updated my question. –  George Profenza Jan 27 '11 at 15:37
In your code you're almost finished. After looping over i and j exactly as you're already doing, make your first quad from points 0,1,k+1,k. Where k is the number of samples in each row: PI/step. The next quad is 1,2,k+2,k+1, etc. until k-2,k-1,2k-1,2k-2. That gives you a whole column. Then do the next column: k,k+1,2k+1,2k, etc. Hope this makes sense! –  tim_hutton Jan 27 '11 at 16:27
I've added the full code + an attempt to store the quads, but I'm affraid I'm doing it wrong :( If k = PI/step...that would be a constant right ? so I guess I didn't understand this part...then...0,1,k+1,k would be indices of vertices or vertex coordinates ? Thank you for taking your time to explain. –  George Profenza Jan 27 '11 at 18:10
Those values are indices into points. –  tim_hutton Jan 28 '11 at 11:38
@tim_hutton Wow! this looks great! There is a minor last issue, some faces are missing, guessing it has something to do with the start/end index when drawing quads, but not sure :( –  George Profenza Jan 28 '11 at 12:27
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