# 3D Vector defined by 2 angles

So basically I'm looking for a way to calculate the x, y and z component of a vector using 2 angles as shown: Where alpha is the 2D angle and beta is the y angle. What I've been using uptill now for 2D vectors was:

``````x = Math.sin(alpha);
z = Math.cos(alpha);
``````

After searching on stackexchange math I've found this forumula doesn't really work correctly:

`````` x = Math.sin(alpha)*Math.cos(beta);
z = Math.sin(alpha)*Math.sin(beta);
y = Math.cos(beta);
``````

Note: when approaching 90 degrees with the beta angle the x and z components should approach zero. All help would be appreciated.

The proper formulas would be

``````x = Math.cos(alpha) * Math.cos(beta);
z = Math.sin(alpha) * Math.cos(beta);
y = Math.sin(beta);
``````
• Thanks, that works and makes a lot more sense. (i had to switch the x and z but that's just how my enviroment is set) Commented May 3, 2015 at 8:43
• @MoffKalast Two angles on perpendicular planes are sufficient to define a vector in 3D space. You could calculate the angle of the projection on the third plane (in this example, XY) using the first two angles. Commented May 16, 2016 at 10:30
• Any idea on how to compute it, if the used x,y,z directions were relative to a plane of a model, and not relative to the coordinate-system the model sits within?
– user10004359
Commented Sep 18, 2018 at 14:17
• I took a stab at doing this in 4D, I came up with: a = Math.cos(gamma); x = Math.cos(alpha)*Math.cos(beta)*a; z = Math.sin(alpha)*Math.cos(beta)*a; y = Math.sin(beta)*a; w = Math.sin(gamma); How close was I? Commented Mar 28, 2019 at 16:36
• Given alpha and beta, what is the angle between red and green lines. Commented Jun 21, 2023 at 13:15

That formula just come from the transformation of Spherical coordinates (r, theta, phi) -> (x, y, z) to Cartesian coordinates.

• The angle beta shown by OP is not the same as the polar angle in spherical coordinates Commented Feb 15 at 19:19