Was looking through the web for an answer but it seems like there is no clear recipe for it.

What I need is a signed angle of rotation between two vectors Va and Vb lying within the same 3D plane and having the same origin knowing that:

- the plane contatining both vectors is an arbitrary and is not parallel to XY or any other of cardinal planes
- Vn - is a plane normal
- both vectors along with the normal have the same origin O = { 0, 0, 0 }
- Va - is a reference for measuring the left handed rotation at Vn

The angle should be measured in such a way so if the plane would be XY plane the Va would stand for X axis unit vector of it.

I guess I should perform a kind of coordinate space transformation by using the Va as the X-axis and the cross product of Vb and Vn as the Y-axis and then just using some 2d method like with atan2() or something. Any ideas? Formulas?

```
SOLUTION:
sina = |Va x Vb| / ( |Va| * |Vb| )
cosa = (Va . Vb) / ( |Va| * |Vb| )
angle = atan2( sina, cosa )
sign = Vn . ( Va x Vb )
if(sign<0)
{
angle=-angle
}
```

`(|Va||Vb|)`

for the`sin`

and`cos`

. The way`atan2`

works the denominators cancel out. – ja72 Apr 4 '11 at 17:27