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So coming from a flash background I have an OK understanding of some simple 2D trig. In 2d with I circle, I know the math to place an item on the edge given an angle and a radius using.

x = cos(a) * r;
y = sin(a) * r;

Now if i have a point in 3d space, i know the radius of my sphere, i know the angle i want to position it around the z axis and the angle i want to position it around, say, the y axis. What is the math to find the x, y and z coordinates in my 3d space (assume that my origin is 0,0,0)? I would think i could borrow the Math from the circle trig but i can't seem to find a solution.

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Your position in 3d is given by two angles (+ radius, which in your case is constant)

x = r * cos(s) * sin(t)
y = r * sin(s) * sin(t)
z = r * cos(t)

here, s is the angle around the z-axis, and t is the height angle, measured 'down' from the z-axis.

The picture below shows what the angles represent, s=theta in the range 0 to 2*PI in the xy-plane, and t=phi in the range 0 to PI.

enter image description here

  • 6
    Don't forget that s and t need to be in radians, not degrees. To convert to radians: radians = angleInDegrees * Math.PI / 180. – Sam Apr 16 '14 at 17:48
  • If s=45deg and t=0deg, then (x,y,z) = (0,0,1). But when we actually map it, we would get (0, 0.707, 0.707) right? x and y always give zero when t is zero and z is independent of s...! What should I do to get it right? – Saravanabalagi Ramachandran May 2 '17 at 18:34
  • Shouldn't we be able to sweep exactly one circle with t locked down to 0 and varying s? Here, it doesnt work like that, when t is zero, regardless of the value of s, (x,y,z) is always (0,0,1) – Saravanabalagi Ramachandran May 2 '17 at 18:37
  • @SaravanabalagiRamachandran think about where on the sphere you would be when phi equals zero and you'll realize why this is. – David Hoelzer Jun 13 '18 at 21:00
  • It's been a year but here are the answers; x and y always give zero when t is zero and z is independent of s Nope; Shouldn't we be able to sweep exactly one circle with t locked down to 0 and varying s? Yes, but sweeping a circle requires changes in both y and z – Saravanabalagi Ramachandran Jun 13 '18 at 21:19
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The accepted answer did not seem to support negative x values (possibly I did something wrong), but just in case, using notation from ISO convention on coordinate systems defined in this Wikipedia entry, this system of equations should work:

import math

x = radius * sin(theta) * cos(phi)
y = radius * sin(theta) * sin(phi)
z = radius * cos(theta)

radius = math.sqrt(math.pow(x, 2) + math.pow(y, 2) + math.pow(z, 2))

phi = math.atan2(y, x)
theta = math.acos((z / radius))

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