This should be easy, but I've been all over trying to find a simple explanation that I can grasp. I have an object that I'd like to represent in OpenGL as a cone. The object has x, y, z coordinates and a velocity vector vx, vy, and vz. The cone should point in the direction of the velocity vector.

So, I think my PyOpenGL code should look something like this:

```
glPushMatrix()
glTranslate(x, y, z)
glPushMatrix()
# do some sort of rotation here #
glutSolidCone(base, height, slices, stacks)
glPopMatrix()
glPopMatrix()
```

So, is that correct (so far)? What do I put in place of the "# do some sort of rotation here #" ?

In my world, the Z-axis points up (0, 0, 1) and, without any rotations, so does my cone.

Okay, Reto Koradi's answer seems to be the approach that I should take, but I'm not sure of some of the implementation details and my code is not working.

If I understand correctly, the rotation matrix should be a 4x4. Reto shows me how to get a 3x3, so I'm assuming that the 3x3 should be the upper-left corner of a 4x4 identity matrix. Here's my code:

```
import numpy as np
def normalize(v):
norm = np.linalg.norm(v)
if norm > 1.0e-8: # arbitrarily small
return v/norm
else:
return v
def transform(v):
bz = normalize(v)
if (abs(v[2]) < abs(v[0])) and (abs(v[2]) < abs(v[1])):
by = normalize(np.array([v[1], -v[0], 0]))
else:
by = normalize(np.array([v[2], 0, -v[0]]))
#~ by = normalize(np.array([0, v[2], -v[1]]))
bx = np.cross(by, bz)
R = np.array([[bx[0], by[0], bz[0], 0],
[bx[1], by[1], bz[1], 0],
[bx[2], by[2], bz[2], 0],
[0, 0, 0, 1]], dtype=np.float32)
return R
```

and here is the way it gets inserted into the rendering code:

```
glPushMatrix()
glTranslate(x, y, z)
glPushMatrix()
v = np.array([vx, vy, vz])
glMultMatrixf(transform(v))
glutSolidCone(base, height, slices, stacks)
glPopMatrix()
glPopMatrix()
```

Unfortunately, this isn't working. My test case cones just do not point correctly and I can't identify the failure mode. Without the "glutMultMatrixf(transform(v)" line, the cones align along the z-axis, as expected.

It's working. Reto Koradi correctly identified that the rotation matrix needed to be transposed in order to match the column order of OpenGL. The code should look like this (before optimization):

```
def transform(v):
bz = normalize(v)
if (abs(v[2]) < abs(v[0])) and (abs(v[2]) < abs(v[1])):
by = normalize(np.array([v[1], -v[0], 0]))
else:
by = normalize(np.array([v[2], 0, -v[0]]))
#~ by = normalize(np.array([0, v[2], -v[1]]))
bx = np.cross(by, bz)
R = np.array([[bx[0], by[0], bz[0], 0],
[bx[1], by[1], bz[1], 0],
[bx[2], by[2], bz[2], 0],
[0, 0, 0, 1]], dtype=np.float32)
return R.T
```