# mapping polar angle to 0..1

Given a cartesian position, how can you map the angle from the origin into the range 0 .. 1?

I have tried:

``````sweep = atan(pos.y,pos.x) + PI) / (2.*PI);
``````

(where sweep should be between 0 and 1)

This is GLSL, so the `atan` function is happy with two parameters (y then x) and returns -PI ... PI

This gives 1 in the top-left quadrant, a nice gradient in the top-right going round to the bottom right quadrant and then 0 in the bottom left quadrant:

How do I get a nice single gradient sweep instead? I want the maximum sweep somewhere, and the minimum adjacent to it anti-clockwise.

``````uniform mat4 MVP_MATRIX;
attribute vec2 VERTEX;
varying vec2 pos;
void main() {
gl_Position = MVP_MATRIX * vec4(VERTEX,-2,1.);
pos = gl_Position.xy;
}
``````

``````uniform vec4 COLOUR;
varying vec2 pos;
void main() {
float PI = 3.14159265358979323846264;
float sweep = (atan(pos.y,pos.x) + PI) / (2.*PI);
gl_FragColor = vec4(COLOUR.rgb * sweep,COLOUR.a);
}
``````
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Sorry, I don't understand what it is you want. There's a discontinuity in all trig functions, because the functions are periodic. Are you objecting to the saturated green next to the black? –  duffymo May 16 '12 at 13:24
@duffymo yes, have clarified that in the question –  Will May 16 '12 at 13:29

Most programming languages have a two-parameter version of `atan`, often called `atan2` This will usually give a result in the range (-PI, PI]. To convert that to the values 0-1 you can use:

``````(atan2(y,x) + PI) / (2*PI)
``````

Since your language's `atan` function takes two arguments, it probably does the same thing as `atan2`.

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You appear to be using `atan2`, which returns an angle in (-pi, pi). Make it into:

``````atan2(pos.y,pos.x) + PI) / (2*PI)
``````
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