# how to calculate shortest 2D distance between a point and a line segment in all cases in C, C# / .NET 2.0 or Java? [duplicate]

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Shortest distance between a point and a line segment

i am looking for a way to calculate the minimum distance in all cases. the problems with solutions i found are:

1. Solutions with graphical conceptual drawings show point always on perpendicular from line segment so it's "between line segment's end points". My geometry skills are horrible so i can't verify that these solutions work in all cases.

2. Algorithm solutions are a: with fortran or some other language i don't fully understand, b: are flagged as incomplete by people, c: calling methods/functions that are not described in any way (considered trivial).

Good example of 2 a, b and c is

Shortest distance between a point and a line segment

i have the 2D line segment as double-type co-ordinate pair (x1, y1), (x2,y2) and point as double type co-ordinate (x3,y3). C#/Java/C solutions are all appreciated.

• I counted implementations in 6 different languages here: stackoverflow.com/questions/849211/… – Tim Robinson Dec 14 '10 at 10:45
• @oded: which part u refer? that it's asked and answered million times? or that there's no 'how to calculate' in the beginning? as i said apologies for bad search skills but if one can't imagine the 'how to calculate' to the beginning... well. ur link is 2 help people 2 understand each other. think u understood me perfectly. – char m Dec 14 '10 at 10:55
• @tim: thank u very much! – char m Dec 14 '10 at 10:55
• You are a. Not describing your question properly. b. Not showing us what you have tried so far. c. Not explaining where you are having difficulties. – Oded Dec 14 '10 at 10:56
• ok. missing 'how to...' seems 2 b a problem. didn't occur 2 me at all but i ask better questions in future. – char m Dec 14 '10 at 10:57

Answered also Shortest distance between a point and a line segment because that gathers solutions in all languages. Answer put also here because this questions asks specifically a C# solution. This is modified from http://www.topcoder.com/tc?d1=tutorials&d2=geometry1&module=Static :

``````//Compute the dot product AB . BC
private double DotProduct(double[] pointA, double[] pointB, double[] pointC)
{
double[] AB = new double;
double[] BC = new double;
AB = pointB - pointA;
AB = pointB - pointA;
BC = pointC - pointB;
BC = pointC - pointB;
double dot = AB * BC + AB * BC;

return dot;
}

//Compute the cross product AB x AC
private double CrossProduct(double[] pointA, double[] pointB, double[] pointC)
{
double[] AB = new double;
double[] AC = new double;
AB = pointB - pointA;
AB = pointB - pointA;
AC = pointC - pointA;
AC = pointC - pointA;
double cross = AB * AC - AB * AC;

return cross;
}

//Compute the distance from A to B
double Distance(double[] pointA, double[] pointB)
{
double d1 = pointA - pointB;
double d2 = pointA - pointB;

return Math.Sqrt(d1 * d1 + d2 * d2);
}

//Compute the distance from AB to C
//if isSegment is true, AB is a segment, not a line.
double LineToPointDistance2D(double[] pointA, double[] pointB, double[] pointC,
bool isSegment)
{
double dist = CrossProduct(pointA, pointB, pointC) / Distance(pointA, pointB);
if (isSegment)
{
double dot1 = DotProduct(pointA, pointB, pointC);
if (dot1 > 0)
return Distance(pointB, pointC);

double dot2 = DotProduct(pointB, pointA, pointC);
if (dot2 > 0)
return Distance(pointA, pointC);
}
return Math.Abs(dist);
}
``````
• Err, which points A,B,C are the line end points and which is the actual singular point ? You should really name the vars properly, tahts why we use names and not numbers. – mP. Dec 5 '12 at 0:16
• It's in the comments. A and B are the vertices of the line or line segment, and C is the point in question. Once you've got that it's arguably more readable with single letter variables names. – Nat Mar 30 '14 at 16:41
• The comment for the first function says `//Compute the dot product AB . AC`, but it appears as if it computes the dot AB • BC. Is this a typo, or is this me not fully understanding dot products? – M-Pixel Dec 1 '15 at 5:15
• This is giving NaN with vertical line and colinear point. – crokusek Jul 1 '16 at 8:54
• //Compute the dot product AB . AC... should not it be AB.BC ? – Humam Helfawi Jul 4 '16 at 21:08

If you have line

L: `A * x + B * y + C = 0`

Then distance from this line to point `(x1, y1)` is `abs(A * x1 + B * y1 + C) / sqrt(A * A + B * B)`. in your case if you has interval, `(xa, ya); (xb, yb)` you should find `min( distance(x1, y1, xa, ya), distance(x1, y1, xb, yb))` then see if perpendecular from `(x1, y1)` to line L is on the interval, then the answer is the distance is it. otherwise min of two distances.