# How to determine a semi-sphere's point x-y-z coordinates?

I'm having serious problems solving a problem illustrated on the pic below. Let's say we have 3 points in 3D space (blue dots), and the some center of the triangle based on them (red dot - point P). We also have a normal to this triangle, so that we know which semi-space we talking about.

I need to determine, what is the position on a point (red ??? point) that depends on two angles, both in range of 0-180 degrees. Doesnt matter how the alfa=0 and betha=0 angle is "anchored", it is only important to be able to scan the whole semi-sphere (of radius r).

http://i.stack.imgur.com/a1h1B.png

If anybody could help me, I'd be really thankful.

Kind regards, Rav

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From the drawing it looks as if the position of the point on the sphere is given by a form of spherical coordinates. Let `r` be the radius of the sphere; let `alpha` be given relative to the x-axis; and let `beta` be the angle relative to the x-y-plane. The Cartesian coordinates of the point on the sphere are:

``````x = r * cos(beta) * cos(alpha)
y = r * cos(beta) * sin(alpha)
z = r * sin(beta)
``````

Edit

But for a general coordinate frame with axes `(L, M, N)` centered at `(X, Y, Z)` the coordinates are (as in dmuir's answer):

``````(x, y, z) =
(X, Y, Z)
+ r * cos(beta) * cos(alpha) * L
+ r * cos(beta) * sin(alpha) * M
+ r * sin(beta) * N
``````

The axes `L` and `N` must be orthogonal and `M = cross(N, L)`. `alpha` is given relative to `L`, and `beta` is given relative to the `L`-`M` plane. If you don't know how `L` is related to points of the triangle, then the question can't be answered.

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It's almost what I'm looking for - except the blue triangle doesn't have to be parallel to XY, XZ nor YZ plane. We have only 3 points (blue dots) given. Nothing more ;-( i.e. i.imgur.com/iwrbU.png –  elmes May 24 '11 at 18:14
Thanks you very much! –  elmes May 25 '11 at 7:31