# Determine whether two sectors of a given circle intersect?

Anybody know how to determine whether two sectors of the same circle intersect?

Let's say I have a sector A, expressed by starting and ending angles A1 and A2, and a sector B, expressed by starting angle B1 and ending angle B2. All angles ranges from 0..2*PI radians (or 0..360 degrees).

How to determine whether angle A intersects with angle B?

I've tried a variation of the two rectangle intersection problem like the following:

``````if(a1 <= b2 && a2 >= b1) {
// the sectors intersect
} else {
// the sectores doesn't intersect
}
``````

This method is fine as long as no sectors crosses the 0 degrees point. But if any one sector crosses it, the calculation becomes incorrect.

The underlying problem is in creating a directional (heading-based) augmented reality application. Sector A is the object whereas Sector B is the viewport. The angles are obtained as follow:

``````A0 = bearing of the object

B0 = heading of the user (device)
``````

-

What you really care about is whether the shortest difference in bearings is smaller than the collision range:

``````// absolute difference in bearings gives the path staying within the 0..2*pi range
float oneWay = abs(A0 - B0);

// .. but this may not be the shortest, so try the other way around too
float otherWay = 2 * pi - oneWay;

Note that your `width` definition is a bit odd (seems to be really the half-angle), and the calculations shown for `A1` etc do not actually clip into the stated `[0..2*pi]` range...
@adib The ranges you show here are calculated one-way, ie `[heading, heading+width]`, whereas the code shown in the question is two-way, `[heading-width, heading+width]`. (This is what my note about the half-angle relates to.) In the one-way case you'll need to halve the sum of widths used to test collisions. –  walkytalky Aug 25 '10 at 10:35