# Morph cube into sphere

I created a cube of small sphere models that act as dots. The dots have coordinates:

{0 <= x <= 9, 0 <= y <= -9, 0 <= z <= -9}

The interior of the cube is empty so dots only exist on the surface of the cube. The empty spaces are represented as points at (100, 100, 100) and when I do the draw loop I ignore points which match them, which is why in the code I'll post below will have that as a condition for doing certain things or not doing them.

The goal is to take the points of the cube, and apply transformations to them to map them onto a sphere.

This is the code to create the array for the cube positions then to create an array for the sphere positions:

``````// initialize cube array
points = new Matrix[10, 10, 10];

for (int i = 0; i < 10; i++)
{
for (int j = 0; j < 10; j++)
{
for (int k = 0; k < 10; k++)
{
points[i, j, k] = Matrix.CreateTranslation(new Vector3(100, 100, 100));
}
}
}

for (int i = 0; i < 10; i++)
{
for (int j = 0; j < 10; j++)
{
points[i, j, 0] = Matrix.CreateTranslation(new Vector3(i, -j, 0));
points[i, j, 9] = Matrix.CreateTranslation(new Vector3(i, -j, -9));
}
}

for (int j = 0; j < 10; j++)
{
for (int k = 0; k < 10; k++)
{
points[0, j, k] = Matrix.CreateTranslation(new Vector3(0, -j, -k));
points[9, j, k] = Matrix.CreateTranslation(new Vector3(9, -j, -k));
}
}

for (int i = 0; i < 10; i++)
{
for (int k = 0; k < 10; k++)
{
points[i, 0, k] = Matrix.CreateTranslation(new Vector3(i, 0, -k));
points[i, 9, k] = Matrix.CreateTranslation(new Vector3(i, -9, -k));
}
}
// end cube array initialization

// create sphere array
double d;
double theta;
double phi;
double r = 10;

spherePoints = new Matrix[10, 10, 10];
for (int i = 0; i < 10; i++)
{
for (int j = 0; j < 10; j++)
{
for (int k = 0; k < 10; k++)
{
if (points[i, j, k] != Matrix.CreateTranslation(new Vector3(100, 100, 100)))
{
d = Math.Sqrt(Math.Pow(i, 2) + Math.Pow(-j, 2) + Math.Pow(-k, 2));
theta = Math.Acos(-k / d);
phi = Math.Atan2(-j, i);

spherePoints[i, j, k] = Matrix.CreateTranslation(new Vector3((float)(r * Math.Sin(theta) * Math.Cos(phi)),
(float)(r * Math.Sin(theta) * Math.Sin(phi)),
(float)(r * Math.Cos(theta))));
}
else
spherePoints[i, j, k] = Matrix.CreateTranslation(new Vector3(100, 100, 100));
}
}
}
// end creation of sphere array
``````

Cube:

Not a sphere...:

From what I can tell I followed the formula exactly, but it seems to only generate an eighth of a sphere. There also appears to be weird grouping along the edges.

-
@Leonardo I'm sorry, where does it say that in here? stackoverflow.com/faq#dontask The purpose of this site is to get help with programming problems. I'm not asking anyone to do my homework for me. I'm trying to figure out the cause of weird behavior in my code. Is asking for help against the rules of a site made to ask for help? –  Portaljacker Feb 18 '13 at 17:17
There's quite a bit on algorithms for generating the points for a spherical surface. math.stackexchange.com/questions/299981/… gamedev.stackexchange.com/questions/16585/… stackoverflow.com/questions/4349727/… –  Pete Feb 18 '13 at 17:31
@Pete Those all seem to be about making a sphere. The goal for this assignment is to morph the points of a cube into the positions on a sphere. The links seem to refer to making a sphere from scratch. –  Portaljacker Feb 18 '13 at 17:34
Then what is the question you are asking? I thought the question revolved around the fact that you're only generating 1/8th of a sphere. Perhaps you can make your question more obvious in the text. –  Pete Feb 18 '13 at 17:40
@Pete Whoops, I just realized I didn't make it entirely clear, though the instructions in the first picture are. Regardless, I added the line, "The goal is to take the points of the cube, and apply transformations to them to map them onto a sphere." Though the of the post is directly about that. –  Portaljacker Feb 18 '13 at 17:43

The problem is that you're only drawing your cube in one "quadrant" (or perhaps "octrant" would be more appropriate), so you're only getting 1/8 of your sphere.

Instead of having your cube go from [0,9], [-9,0], [-9,0], focus it on the origin.

Once your cube goes from [-5,5], [-5, 5], [-5,5], your spherical calculation will be fine.

Just to give a bit more understanding of how this is the issue:

• How many quadrants will your answers be in when you evaluate Acos(z/d), given that d is always positive and z is always negative?
• How many quadrants will your answers be in when you evaluate Atan(y, x), given that y is always negative and x is always negative?

Out of the 8 possible quadrant combinations, you're only filling one.

-
So my cube now goes from [-5,5] on all axis' and I removed the negative signs from the conversion part. Though I still get a quadrant, though it looks more rounded. i.imgur.com/UmGfins.png pastebin.com/6iK2rmbs –  Portaljacker Feb 18 '13 at 18:39
Fixed it, my sphere part wasn't adapted to the new points the right way. –  Portaljacker Feb 18 '13 at 19:01
Good, because I wasn't finding anything wrong with your paste. :-) What do you mean by what you said, though? –  Scott Mermelstein Feb 18 '13 at 19:02
Well i had fixed in cube making the points be at {i,j,k} - 5 for {i,j,k} between [0,11]. But I didn't do the {i,j,k} - 5 in the sphere part. Now I just need to do the animation part but that should be simple enough. I made a direction vector for each point from cube to sphere and will move them a % of that each frame until % = 100. –  Portaljacker Feb 18 '13 at 19:15
I mean I'm not using them directly, but I'm using the same coordinates. I'm also checking in the cube array for points that should be empty. The animation looks super smooth btw, I move the points 2% of the way per frame. –  Portaljacker Feb 18 '13 at 19:41