Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I have two rays on a 2D plane that extend to infinity, but both have a starting point. They are both described by a starting point and a vector in the direction of the ray extending to infinity. I want to find out if the two rays intersect, but I don't need to know where they intersect (it's part of a collision detection algorithm).

Everything I have looked at so far describes finding the intersection point of two lines or line segments. Is there a fast algorithm to solve this?

share|improve this question
    
2D or 3D? If the former simply check and see if the slope is the same for both: if so they are either parallel or the same line. Otherwise they will intersect. –  fbrereto May 28 '10 at 18:35
    
These are rays, not lines, then? All lines intersect in two dimensions, unless they're parallel. –  Carl Norum May 28 '10 at 18:35
    
@fbereto: sorry, 2D plane. Edited to reflect that. –  Faken May 28 '10 at 18:36
    
@Carl Norum: Yea, your right. Sorry you're right –  Faken May 28 '10 at 18:37
1  
It is tempting, at a first glance, to look for some fancy use of vector products and comparing angles, but think about calculations needed to get those products and look at Adam's or Peter's solution. Calculating the determinants for the equation set is almost the same as calculating vector products –  Maciej Hehl May 28 '10 at 19:27

9 Answers 9

up vote 18 down vote accepted

Given: two rays a, b with starting points (origin vectors) as, bs, and direction vectors ad, bd.

The two lines intersect if there is an intersection point p:

p = as + ad * u
p = bs + bd * v

If this equation system has a solution for u>=0 and v>=0 (the positive direction is what makes them rays), the rays intersect.

For the x/y coordinates of the 2d vectors, this means:

p.x = as.x + ad.x * u
p.y = as.y + ad.y * u
p.x = bs.x + bd.x * v
p.y = bs.y + bd.y * v

Further steps:

as.x + ad.x * u = bs.x + bd.x * v
as.y + ad.y * u = bs.y + bd.y * v

Solving against v:

v := (as.x + ad.x * u - bs.x) / bd.x

Inserting and solving against u:

as.y + ad.y * u = bs.y + bd.y * ((as.x + ad.x * u - bs.x) / bd.x) 
u := (as.y*bd.x + bd.y*bs.x - bs.y*bd.x - bd.y*as.x ) / (ad.x*bd.y - ad.y*bd.x)

Calculate u, then calculate v, if both are positive the rays intersect, else not.

share|improve this answer
2  
Excellent answer. –  Kurucu May 28 '10 at 18:58
    
how do you solve u from the last formula? it includes itself. –  ColacX Dec 13 '13 at 17:39
    
whoops, I inserted 'v' into the wrong equation. It's fixed now. –  Peter Walser Dec 14 '13 at 19:27
    
Are the directions unit vectors? –  Thomas Kefauver Aug 7 at 22:16
    
I understand this post is old, and I am not sure why or how, but this solution causes different solutions when the vector a and be are switched, notably when the solution would have been v = 2 but it equals 1 instead. The points I used were: for the first vector (7.64475393f, 5.59931898f), (6.30824f, 4.91833f) for the second vector (6.43122959f, 7.98099709f),(6.43122864f, 6.48099709f) –  user975989 Aug 18 at 1:00

If the lines are of infinite length, then they will always intersect, unless they are parallel. To check if they are parallel, find the slope of each line and compare them. The slope will just be (y2-y1)/(x2-x1).

share|improve this answer
6  
Lines are not rays. And parallel lines can intersect as well (if they are the same line). –  corsiKa May 28 '10 at 18:39
1  
Also if the 2D space is curved, parallel lines can intersect (latitudes and longitudes for example). –  Vivin Paliath May 28 '10 at 18:41
    
Sorry i edited my post to reflect what i was really asking. They lines are actually rays with a starting point but no end. Checking the slope will not give me the answer as it is possible for the "lines" to intersect on the "wrong" side of the point which counts as a miss. –  Faken May 28 '10 at 18:41
    
I believe the question implies that they are not infinite in both directions: they have a starting vector and a direction vector. Thus a line starting at (1,2) and going off on (0,1) will not intersect with a line starting at (2,1) and going off on (1,0). If they were lines rather than 'rays', then of course your answer would be correct. –  Kurucu May 28 '10 at 18:54

GeomAlgorithms.com has some pretty sweet algorithms dealing with lines in 3D... Generally speaking though, the probability of two lines intersecting in 3D space is really quite low.

In 2D, you have to check the slope. If the slope is not equal then they intersect. If the slope is equal, they intersect if a point on them has the same x-coordinate or the same y-coordinate.

share|improve this answer
1  
The question specifically states that it's limited to 2d. –  corsiKa May 28 '10 at 18:41
    
@glowcoder It didn't state that at the time that I answered originally, edited post to describe 2-D algorithm. –  vicatcu May 28 '10 at 18:42
    
@glowcoder: its ok, if it was in 3D all i need to do is set all z components to zero and simplify the equations and it should work. Thanks vicatcu, ill check out the site. –  Faken May 28 '10 at 18:44

I'm not going to real code here - the abstractions are exercises for the reader (or hopefully you're using a library that already has them)

boolean doTheyIntersect(Ray a, Ray b) {
    Line aLine = MagicLibrary.createLineFromRay(a);
    Line bLine = MagicLibrary.createLineFromRay(b);
    Point intersection = MagicLibrary.intersectionPoint(aLine,bLine);
    boolean aIntersect = MagicLibrary.rayIntersectsPoint(a,intersection);
    boolean bIntersect = MagicLibrary.rayIntersectsPoint(b,intersection);
    return aIntersect  && bIntersect;
}
share|improve this answer

A ray can be represented by the set of points A + Vt, where A is the starting point, V is a vector indicating the direction of the ray, and t >= 0 is the parameter. Thus, to determine if two rays intersect, do this:

bool DoRaysIntersect(Ray r1, Ray r2)
{
    // Solve the following equations for t1 and t2:
    //   r1.A.x + r1.V.x * t1 == r2.A.x + r2.V.x * t2
    //   r1.A.y + r1.V.y * t1 == r2.A.y + r2.V.y * t2
    if(no solution)  // (e.g. parallel lines)
    {
        if(r1 == r2)  // same ray?
            return true;
        else
            return false;  // parallel, non-intersecting
    }
    else  // unique solution
    {
        if(t1 >= 0 && t2 >= 0)
            return true;
        else
            return false;  // they would intersect if they are lines, but they are not lines
    }
}
share|improve this answer

Lines are represented by a point p and a vector v:

line = p + a * v (for all a)

Rays are (the positive) half of that line:

ray = p + a * v (for all a >= 0)

To determine if two lines intersect, set them equal and solve:

intersection occurs where p1 + a1 * v1 = p2 + a2 * v2
(note that there are two unknowns, a1 and a2, and two equations, since the p's and v's are multi-dimensional)

Solve for a1 and a2 - if they are both non-negative, they intersect. If one is negative, they don't intersect.

share|improve this answer

I want only to check if the two rays intersect. I will go about it by calculating the direction of rotation of two "triangles" created from the two rays. They aren't really triangles, but from a mathematical standpoint, if I only wanted to calculate the rotation of the triangle, I only need two vectors with a common starting point, and the rest doesn't matter.

The first triangle will be formed by two vectors and a starting point. The starting point will be the first ray's starting point. The first vector will be the first ray's direction vector. The second vector will be the vector form the first ray's starting point to the second ray's starting point. From here we take the cross product of the two vectors and note the sign.

We do this again for the second triangle. Again, the starting point is the second ray's starting point. The first vector is the second ray's direction and the second vector is from the second ray's starting point to the first ray's starting point. We take the cross product again of the vectors and note the sign.

Now we simply take the two signs and check if they are the same. If they are the same, we have no intersection. If they are different we have an intersection. That's it!

Here's some psudo code:

sign1 = cross(vector1, point1 - point2)
sign2 = cross(vector2, point2 - point1)

if (sign1 * sign2 < 0) // If signs are mismatched, they will multiply to be negative
    return intersection

It works out to be five multiplications, six subtractions, and one comparison.

share|improve this answer
    
Ahh you got it. Didn't see that. –  John May 28 '10 at 19:20
    
Don't know if the "edge cases" are necessary to consider but I edited my answer to describe them. –  John May 28 '10 at 19:29
    
An edge case in my application is very unlikely and even a false positive doesn't really hurt me. I need raw speed since I'm iterating over possibly billions of such cases. I'll just simply say if anything collinear we will just call it an intersection rather than add a few extra statements to nail down exactly what happened. –  Faken May 28 '10 at 19:34
    
No, this is wrong. See my comment on John at CashCommons' equally incorrect solution. –  Adam Rosenfield May 28 '10 at 20:16
    
Yea your right, its not correct. –  Faken May 28 '10 at 20:37

I am sorry to disagree with the answer of Peter Walser. Solving the equations gives on my desk:

u = ((bs.y - as.y) * bd.x - (bs.x - as.x) * bd.y) / (bd.x * ad.y - bd.y * ad.x)
v = ((bs.y - as.y) * ad.x - (bs.x - as.x) * ad.y) / (bd.x * ad.y - bd.y * ad.x)

Factoring out the common terms, this comes to:

dx = bs.x - as.x
dy = bs.y - as.y
det = bd.x * ad.y - bd.y * ad.x
u = (dy * bd.x - dx * bd.y) / det
v = (dy * ad.x - dx * ad.y) / det

Five subtractions, six multiplications and two divisions.

If you only need to know if the rays intersect, the signs of u and v are enough, and these two divisons can be replaced by num*denom<0 or (sign(num) != sign(denom)), depending on what is more efficient on your target machine.

Please note that the rare case of det==0 means that the rays do not intersect (one additional comparison).

share|improve this answer

These guys at Princeton made a good slide show about this. The answer is described around slide 17. I think it's the same solution described in the first comment, but it's condensed into a couple of dot products.

share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.