# Checking a line segment is within a distance from a point

I have two points A and B that define a line segment on a device screen plus another point C. Using efficient and short algorithm that is easy to code (preferably using standard math library), how do I check if the line segment AB is within a distance R from C?

I know there is a simple way to find the shortest distance from a point to a line, but it assume the line is infinitely long. What I have is a line segment with two endpoints.

I considered posting this in Math SE but decided not to since I don't want to get all those long math formula as the answer like in http://math.stackexchange.com/questions/2837/how-to-tell-if-a-line-segment-intersects-with-a-circle . What I need is an efficient and readable computer algorithm, not a formal math theorem.

p/s: I have the following Objective-C method skeleton that needs to be implemented:

``````typedef struct {
CGPoint a;
CGPoint b;
} CGLineSegment;

}
``````

EDIT WITH SOLUTION:

thanks to answer from veredesmarald (which I already accepted) I've implemented the method, put here as reference for other people:

``````+ (BOOL)isLineSegment:(CGLineSegment)line withinRadius:(CGFloat)radius fromPoint:(CGPoint)point {
CGPoint v = CGPointMake(line.b.x - line.a.x, line.b.y - line.a.y);
CGPoint w = CGPointMake(point.x - line.a.x, point.y - line.a.y);
CGFloat c1 = dotProduct(w, v);
CGFloat c2 = dotProduct(v, v);
CGFloat d;
if (c1 <= 0) {
d = distance(point, line.a);
}
else if (c2 <= c1) {
d = distance(point, line.b);
}
else {
CGFloat b = c1 / c2;
CGPoint Pb = CGPointMake(line.a.x + b * v.x, line.a.y + b * v.y);
d = distance(point, Pb);
}
}

CGFloat distance(const CGPoint p1, const CGPoint p2) {
return sqrt(pow(p2.x - p1.x, 2) + pow(p2.y - p1.y, 2));
}

CGFloat dotProduct(const CGPoint p1, const CGPoint p2) {
return p1.x * p2.x + p1.y * p2.y;
}
``````
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Before being able to translate it to code, you must have (and preferably understand!) the math involved. –  Bart Kiers May 20 '11 at 7:17
@Bart Kiers yup that's true but so I'm looking for the math, not formula, as I've emphasized in my question. I have no problem with simple to intermediate geometry math. –  Lukman May 20 '11 at 7:20

When I had to implement a method to determine the distance from a point to an interval for a graphics assignment, I found this page very informative: About Lines and Distance of a Point to a Line

In particular, the section Distance of a Point to a Ray or Segment should be of interest to you.

Pseudocode from the article (where `·` is dot product and `d()` is distance between two points):

``````distance( Point P, Segment P0:P1 )
{
v = P1 - P0
w = P - P0
if ( (c1 = w·v) <= 0 )
return d(P, P0)
if ( (c2 = v·v) <= c1 )
return d(P, P1)
b = c1 / c2
Pb = P0 + bv
return d(P, Pb)
}
``````

This method relies on the dot product to determine if the base of the perpendicular is within the interval, and if not which end point is closer.

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Funny how this implementation of the algorithm described in the other answer doesn't look like it was just that ;-) +1 because it's correct. –  danyowdee May 20 '11 at 7:52
it works! thanks! i've added my objective-c implementation in the question as reference for others :) –  Lukman May 20 '11 at 14:41