I've been playing with some algorithms on the internet for a while and I can't seem to get them to work, so I'm tossing the question out here;

I am attempting to render a velocity vector line from a point. Drawing the line isn't difficult: just insert a line with length `velocity.length`

into the graph. This puts the line centered at the point in the y-axis direction. We need to get this now in the proper rotation and translation.

The translational vector is not difficult to calculate: it is half the velocity vector. The rotational matrix, however, is being exceedingly elusive to me. Given a directional vector `<x, y, z>`

, what's the matrix I need?

**Edit 1:** Look; if you don't understand the question, you probably won't be able to give me an answer.

Here is what I currently have:

Vector3f translation = new Vector3f(); translation.scale(1f/2f, body.velocity); Vector3f vec_z = (Vector3f) body.velocity.clone(); vec_z.normalize(); Vector3f vec_y; // reference vector, will correct later if (vec_z.x == 0 && vec_z.z == 0) { vec_y = new Vector3f(-vec_z.y, 0f, 0f); // could be optimized } else { vec_y = new Vector3f(0f, 1f, 0f); } Vector3f vec_x = new Vector3f(); vec_x.cross(vec_y, vec_z); vec_z.normalize(); vec_y.cross(vec_x, vec_z); vec_y.normalize(); vec_y.negate(); Matrix3f rotation = new Matrix3f( vec_z.z, vec_z.x, vec_z.y, vec_x.z, vec_x.x, vec_x.y, vec_y.z, vec_y.x, vec_y.y ); arrowTransform3D.set(rotation, translation, 1f);

based off of this article. And yes, I've tried the standard rotation matrix (vec_x.x, vec_y.x, etc) and it didn't work. I've been rotating the columns and rows to see if there's any effect.

**Edit 2:**

Apologies about the rude wording of my comments.

So it looks like there were a combination of two errors; one of which House MD pointed out (really bad naming of variables: `vec_z`

was actually `vec_y`

, and so on), and the other was that I needed to invert the matrix before passing it off to the rendering engine (transposing was close!). So the modified code is:

Vector3f vec_y = (Vector3f) body.velocity.clone(); vec_y.normalize(); Vector3f vec_x; // reference vector, will correct later if (vec_y.x == 0 && vec_y.z == 0) { vec_x = new Vector3f(-vec_y.y, 0f, 0f); // could be optimized } else { vec_x = new Vector3f(0f, 1f, 0f); } Vector3f vec_z = new Vector3f(); vec_z.cross(vec_x, vec_y); vec_z.normalize(); vec_x.cross(vec_z, vec_y); vec_x.normalize(); vec_x.negate(); Matrix3f rotation = new Matrix3f( vec_x.x, vec_x.y, vec_x.z, vec_y.x, vec_y.y, vec_y.z, vec_z.x, vec_z.y, vec_z.z ); rotation.invert();