# Shortest distance between a point and a line segment

I need a basic function to find the shortest distance between a point and a line segment. Feel free to write the solution in any language you want; I can translate it into what I'm using (Javascript).

EDIT: My line segment is defined by two endpoints. So my line segment `AB` is defined by the two points `A (x1,y1)` and `B (x2,y2)`. I'm trying to find the distance between this line segment and a point `C (x3,y3)`. My geometry skills are rusty, so the examples I've seen are confusing, I'm sorry to admit.

Eli, the code you've settled on is incorrect. A point near the line on which the segment lies but far off one end of the segment would be incorrectly judged near the segment. Update: The incorrect answer mentioned is no longer the accepted one.

Here's some correct code, in C++. It presumes a class 2D-vector `class vec2 {float x,y;}`, essentially, with operators to add, subract, scale, etc, and a distance and dot product function (i.e. `x1 x2 + y1 y2`).

``````float minimum_distance(vec2 v, vec2 w, vec2 p) {
// Return minimum distance between line segment vw and point p
const float l2 = length_squared(v, w);  // i.e. |w-v|^2 -  avoid a sqrt
if (l2 == 0.0) return distance(p, v);   // v == w case
// Consider the line extending the segment, parameterized as v + t (w - v).
// We find projection of point p onto the line.
// It falls where t = [(p-v) . (w-v)] / |w-v|^2
// We clamp t from [0,1] to handle points outside the segment vw.
const float t = max(0, min(1, dot(p - v, w - v) / l2));
const vec2 projection = v + t * (w - v);  // Projection falls on the segment
return distance(p, projection);
}
``````

EDIT: I needed a Javascript implementation, so here it is, with no dependencies (or comments, but it's a direct port of the above). Points are represented as objects with `x` and `y` attributes.

``````function sqr(x) { return x * x }
function dist2(v, w) { return sqr(v.x - w.x) + sqr(v.y - w.y) }
function distToSegmentSquared(p, v, w) {
var l2 = dist2(v, w);
if (l2 == 0) return dist2(p, v);
var t = ((p.x - v.x) * (w.x - v.x) + (p.y - v.y) * (w.y - v.y)) / l2;
t = Math.max(0, Math.min(1, t));
return dist2(p, { x: v.x + t * (w.x - v.x),
y: v.y + t * (w.y - v.y) });
}
function distToSegment(p, v, w) { return Math.sqrt(distToSegmentSquared(p, v, w)); }
``````

EDIT 2: I needed a Java version, but more important, I needed it in 3d instead of 2d.

``````float dist_to_segment_squared(float px, float py, float pz, float lx1, float ly1, float lz1, float lx2, float ly2, float lz2) {
float line_dist = dist_sq(lx1, ly1, lz1, lx2, ly2, lz2);
if (line_dist == 0) return dist_sq(px, py, pz, lx1, ly1, lz1);
float t = ((px - lx1) * (lx2 - lx1) + (py - ly1) * (ly2 - ly1) + (pz - lz1) * (lz2 - lz1)) / line_dist;
t = constrain(t, 0, 1);
return dist_sq(px, py, pz, lx1 + t * (lx2 - lx1), ly1 + t * (ly2 - ly1), lz1 + t * (lz2 - lz1));
}
``````
• I've added a fleshed-out version of this as a separate answer. – M Katz Jun 8 '12 at 22:13
• Thanks @Grumdrig, your javascript solution was spot on and a huge time saver. I ported your solution to Objective-C and added it below. – awolf Aug 29 '12 at 19:57
• We're really just trying to avoid a divide by zero there. – Grumdrig Apr 13 '13 at 4:44
• The projection of point `p` onto a line is the point on the line closest to `p`. (And a perpendicular to the line at the projection will pass through `p`.) The number `t` is how far along the line segment from `v` to `w` that the projection falls. So if `t` is 0 the projection falls right on `v`; if it's 1, it's on `w`; if it's 0.5, for example, then it's halfway between. If `t` is less than 0 or greater than 1 it falls on the line past one end or the other of the segment. In that case the distance to the segment will be the distance to the nearer end. – Grumdrig Jun 2 '16 at 19:01
• Oops - didn't notice someone had supplied a 3D version. @RogiSolorzano, you'll need to convert the lat,long coordinates into x,y,z coordinates in 3-space first. – Grumdrig Dec 24 '17 at 5:42

Here is the simplest complete code in Javascript.

x, y is your target point and x1, y1 to x2, y2 is your line segment.

UPDATED: fix for 0 length line problem from comments.

``````function pDistance(x, y, x1, y1, x2, y2) {

var A = x - x1;
var B = y - y1;
var C = x2 - x1;
var D = y2 - y1;

var dot = A * C + B * D;
var len_sq = C * C + D * D;
var param = -1;
if (len_sq != 0) //in case of 0 length line
param = dot / len_sq;

var xx, yy;

if (param < 0) {
xx = x1;
yy = y1;
}
else if (param > 1) {
xx = x2;
yy = y2;
}
else {
xx = x1 + param * C;
yy = y1 + param * D;
}

var dx = x - xx;
var dy = y - yy;
return Math.sqrt(dx * dx + dy * dy);
}
`````` • Of all the code I've seen to solve this problem, I like this one the best. It is very clear and easy to read. The math behind it though, is a little bit mystical. What does the dot-product divided by the length squared really represent, for example? – user1815201 Sep 27 '13 at 8:37
• The dot product divided by length squared gives you the projection distance from (x1, y1). This is the fraction of the line that the point (x,y) is closest to. Notice the final else clause where (xx, yy) is calculated - this the projection of the point (x,y) onto the segment (x1,y1)-(x2,y2). – Logan Pickup Feb 17 '14 at 23:10
• The check for line segments of length 0 is too far down in the code. 'len_sq' will be zero and the code will divide by 0 before it gets to the safety check. – HostedMetrics.com Aug 21 '14 at 14:33
• Meters. It is returned in meters. – Joshua Jun 23 '16 at 22:27
• @nevermind, let's call our point p0 and the points that define the line as p1 and p2. Then you get the vectors A = p0 - p1 and B = p2 - p1. Param is the scalar value that when multiplied to B gives you the point on the line closest to p0. If param <= 0, the closest point is p1. If param >= 1, the closest point is p1. If it's between 0 and 1, it's somewhere between p1 and p2 so we interpolate. XX and YY is then the closest point on the line segment, dx/dy is the vector from p0 to that point, and finally we return the length that vector. – Sean Feb 14 '18 at 20:54

This is an implementation made for FINITE LINE SEGMENTS, not infinite lines like most other functions here seem to be (that's why I made this).

Python:

``````def dist(x1, y1, x2, y2, x3, y3): # x3,y3 is the point
px = x2-x1
py = y2-y1

norm = px*px + py*py

u =  ((x3 - x1) * px + (y3 - y1) * py) / float(norm)

if u > 1:
u = 1
elif u < 0:
u = 0

x = x1 + u * px
y = y1 + u * py

dx = x - x3
dy = y - y3

# Note: If the actual distance does not matter,
# if you only want to compare what this function
# returns to other results of this function, you
# can just return the squared distance instead
# (i.e. remove the sqrt) to gain a little performance

dist = (dx*dx + dy*dy)**.5

return dist
``````

AS3:

``````public static function segmentDistToPoint(segA:Point, segB:Point, p:Point):Number
{
var p2:Point = new Point(segB.x - segA.x, segB.y - segA.y);
var something:Number = p2.x*p2.x + p2.y*p2.y;
var u:Number = ((p.x - segA.x) * p2.x + (p.y - segA.y) * p2.y) / something;

if (u > 1)
u = 1;
else if (u < 0)
u = 0;

var x:Number = segA.x + u * p2.x;
var y:Number = segA.y + u * p2.y;

var dx:Number = x - p.x;
var dy:Number = y - p.y;

var dist:Number = Math.sqrt(dx*dx + dy*dy);

return dist;
}
``````

Java

``````private double shortestDistance(float x1,float y1,float x2,float y2,float x3,float y3)
{
float px=x2-x1;
float py=y2-y1;
float temp=(px*px)+(py*py);
float u=((x3 - x1) * px + (y3 - y1) * py) / (temp);
if(u>1){
u=1;
}
else if(u<0){
u=0;
}
float x = x1 + u * px;
float y = y1 + u * py;

float dx = x - x3;
float dy = y - y3;
double dist = Math.sqrt(dx*dx + dy*dy);
return dist;

}
``````
• Sorry, but I tried this and it still gives me the results as if the line was extending into infinity. I've found Grumdig's answer to work, though. – Frederik Apr 22 '10 at 15:18
• In that case you're using it wrong or meaning something else with non-infinite. See an example of this code here: boomie.se/upload/Drawdebug.swf – quano Apr 22 '10 at 20:10
• Looks like a mistake in code or something, I get the same result as Frederik/ – Kromster Oct 7 '11 at 13:25
• The choice of variable names is far from good (p2, something, u, ...) – miguelSantirso Aug 23 '12 at 20:24
• I've tried the Python version of the function and found that it shows incorrect results if the parameters are integers. `distAnother(0, 0, 4, 0, 2, 2)` gives 2.8284271247461903 (incorrect). `distAnother(0., 0., 4., 0., 2., 2.)` gives 2.0 (correct). Please be aware of this. I think the code can be improved to have float conversion somewhere. – Vladimir Obrizan Feb 3 '13 at 21:20

In my own question thread how to calculate shortest 2D distance between a point and a line segment in all cases in C, C# / .NET 2.0 or Java? I was asked to put a C# answer here when I find one: so here it 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);
}
``````

I'm @SO not to answer but ask questions so I hope I don't get million down votes for some reasons but constructing critic. I just wanted (and was encouraged) to share somebody else's ideas since the solutions in this thread are either with some exotic language (Fortran, Mathematica) or tagged as faulty by somebody. The only useful one (by Grumdrig) for me is written with C++ and nobody tagged it faulty. But it's missing the methods (dot etc.) that are called.

• Thanks for posting this. But it looks like there's an obvious optimization possible in the last method: Don't compute dist until after it's determined that it's needed. – RenniePet Mar 31 '13 at 9:27
• The comment on DotProduct says it's computing AB.AC, but it's computing AB.BC. – Metal450 Jan 26 '17 at 1:51
• The cross product by definition returns a vector but returns a scalar here. – SteakOverflow Nov 4 '19 at 22:00

In F#, the distance from the point `c` to the line segment between `a` and `b` is given by:

``````let pointToLineSegmentDistance (a: Vector, b: Vector) (c: Vector) =
let d = b - a
let s = d.Length
let lambda = (c - a) * d / s
let p = (lambda |> max 0.0 |> min s) * d / s
(a + p - c).Length
``````

The vector `d` points from `a` to `b` along the line segment. The dot product of `d/s` with `c-a` gives the parameter of the point of closest approach between the infinite line and the point `c`. The `min` and `max` function are used to clamp this parameter to the range `0..s` so that the point lies between `a` and `b`. Finally, the length of `a+p-c` is the distance from `c` to the closest point on the line segment.

Example use:

``````pointToLineSegmentDistance (Vector(0.0, 0.0), Vector(1.0, 0.0)) (Vector(-1.0, 1.0))
``````
• I think the last line is incorrect, and should read: `(a + p - c).Length` – Blair Holloway Jun 3 '14 at 1:36
• That still does not fully fix the issue. One way to correct the function would be to redefine `lambda` and `p` as `let lambda = (c - a) * d / (s * s)` and `let p = a + (lambda |> max 0.0 |> min 1.0) * d`, respectively. After that the function returns correct distance e.g. for the case where `a = (0,1)`, `b = (1,0)` and `c = (1,1)`. – mikkoma Feb 3 '15 at 15:48

For anyone interested, here's a trivial conversion of Joshua's Javascript code to Objective-C:

``````- (double)distanceToPoint:(CGPoint)p fromLineSegmentBetween:(CGPoint)l1 and:(CGPoint)l2
{
double A = p.x - l1.x;
double B = p.y - l1.y;
double C = l2.x - l1.x;
double D = l2.y - l1.y;

double dot = A * C + B * D;
double len_sq = C * C + D * D;
double param = dot / len_sq;

double xx, yy;

if (param < 0 || (l1.x == l2.x && l1.y == l2.y)) {
xx = l1.x;
yy = l1.y;
}
else if (param > 1) {
xx = l2.x;
yy = l2.y;
}
else {
xx = l1.x + param * C;
yy = l1.y + param * D;
}

double dx = p.x - xx;
double dy = p.y - yy;

return sqrtf(dx * dx + dy * dy);
}
``````

I needed this solution to work with `MKMapPoint` so I will share it in case someone else needs it. Just some minor change and this will return the distance in meters :

``````- (double)distanceToPoint:(MKMapPoint)p fromLineSegmentBetween:(MKMapPoint)l1 and:(MKMapPoint)l2
{
double A = p.x - l1.x;
double B = p.y - l1.y;
double C = l2.x - l1.x;
double D = l2.y - l1.y;

double dot = A * C + B * D;
double len_sq = C * C + D * D;
double param = dot / len_sq;

double xx, yy;

if (param < 0 || (l1.x == l2.x && l1.y == l2.y)) {
xx = l1.x;
yy = l1.y;
}
else if (param > 1) {
xx = l2.x;
yy = l2.y;
}
else {
xx = l1.x + param * C;
yy = l1.y + param * D;
}

return MKMetersBetweenMapPoints(p, MKMapPointMake(xx, yy));
}
``````
• This appears to work well for me. Thanks for converting. – Gregir Jan 1 '14 at 5:23
• It's worth noticing, that (xx, yy) is location of closest point. I've edited a bit your code, so it return both the point and distance, refactored names so they describe what is what and provided example at: stackoverflow.com/a/28028023/849616. – Vive Jan 19 '15 at 15:27

## In Mathematica

It uses a parametric description of the segment, and projects the point into the line defined by the segment. As the parameter goes from 0 to 1 in the segment, if the projection is outside this bounds, we compute the distance to the corresponding enpoint, instead of the straight line normal to the segment.

``````Clear["Global`*"];
distance[{start_, end_}, pt_] :=
Module[{param},
param = ((pt - start).(end - start))/Norm[end - start]^2; (*parameter. the "."
here means vector product*)

Which[
param < 0, EuclideanDistance[start, pt],                 (*If outside bounds*)
param > 1, EuclideanDistance[end, pt],
True, EuclideanDistance[pt, start + param (end - start)] (*Normal distance*)
]
];
``````

Plotting result:

``````Plot3D[distance[{{0, 0}, {1, 0}}, {xp, yp}], {xp, -1, 2}, {yp, -1, 2}]
`````` Plot those points nearer than a cutoff distance: Contour Plot: Hey, I just wrote this yesterday. It's in Actionscript 3.0, which is basically Javascript, though you might not have the same Point class.

``````//st = start of line segment
//b = the line segment (as in: st + b = end of line segment)
//pt = point to test
//Returns distance from point to line segment.
//Note: nearest point on the segment to the test point is right there if we ever need it
public static function linePointDist( st:Point, b:Point, pt:Point ):Number
{
var nearestPt:Point; //closest point on seqment to pt

var keyDot:Number = dot( b, pt.subtract( st ) ); //key dot product
var bLenSq:Number = dot( b, b ); //Segment length squared

if( keyDot <= 0 )  //pt is "behind" st, use st
{
nearestPt = st
}
else if( keyDot >= bLenSq ) //pt is "past" end of segment, use end (notice we are saving twin sqrts here cuz)
{
}
else //pt is inside segment, reuse keyDot and bLenSq to get percent of seqment to move in to find closest point
{
var keyDotToPctOfB:Number = keyDot/bLenSq; //REM dot product comes squared
var partOfB:Point = new Point( b.x * keyDotToPctOfB, b.y * keyDotToPctOfB );
}

var dist:Number = (pt.subtract(nearestPt)).length;

return dist;
}
``````

Also, there's a pretty complete and readable discussion of the problem here: notejot.com

• Thanks - this is exactly the kind of code I was looking for. I've posted my own answer below, since I managed to put something together that works in current-era-browser-Javascript, but I've marked your answer as accepted because it's simple, well-written, easy-to-understand, and much appreciated. – Eli Courtwright May 13 '09 at 13:31
• Isn't this missing the dot-method? In any case, it is easy to calculate: vec1.x * vec2.x + vec1.y * vec2.y – quano Feb 9 '10 at 20:45

For the lazy, here's my Objective-C port of @Grumdrig's solution above:

``````CGFloat sqr(CGFloat x) { return x*x; }
CGFloat dist2(CGPoint v, CGPoint w) { return sqr(v.x - w.x) + sqr(v.y - w.y); }
CGFloat distanceToSegmentSquared(CGPoint p, CGPoint v, CGPoint w)
{
CGFloat l2 = dist2(v, w);
if (l2 == 0.0f) return dist2(p, v);

CGFloat t = ((p.x - v.x) * (w.x - v.x) + (p.y - v.y) * (w.y - v.y)) / l2;
if (t < 0.0f) return dist2(p, v);
if (t > 1.0f) return dist2(p, w);
return dist2(p, CGPointMake(v.x + t * (w.x - v.x), v.y + t * (w.y - v.y)));
}
CGFloat distanceToSegment(CGPoint point, CGPoint segmentPointV, CGPoint segmentPointW)
{
return sqrtf(distanceToSegmentSquared(point, segmentPointV, segmentPointW));
}
``````
• I get 'nan' returned from this line. Any idea why? (Thanks for typing this up in Obj-C, by the way!) `return dist2(p, CGPointMake(v.x + t * (w.x - v.x), v.y + t * (w.y - v.y)))` – Gregir Jan 1 '14 at 1:24
• sqrtf() is squaring x, not getting its square root – Senseful May 5 '14 at 7:01
• @Senseful Not sure what you mean. sqrtf is square root. developer.apple.com/library/mac/documentation/Darwin/Reference/… – awolf May 12 '14 at 21:47
• @awolf: Take a look at the first line of code above. It defines the method `sqrtf(x) = x*x`. – Senseful May 13 '14 at 22:35
• @Senseful thanks, it was misnamed rather than performing the wrong operation. – awolf May 14 '14 at 1:11

Couldn't resist coding it in python :)

``````from math import sqrt, fabs
def pdis(a, b, c):
t = b-a, b-a           # Vector ab
dd = sqrt(t**2+t**2)         # Length of ab
t = t/dd, t/dd               # unit vector of ab
n = -t, t                    # normal unit vector to ab
ac = c-a, c-a          # vector ac
return fabs(ac*n+ac*n) # Projection of ac to n (the minimum distance)

print pdis((1,1), (2,2), (2,0))        # Example (answer is 1.414)
``````

Ditto for fortran :)

``````real function pdis(a, b, c)
real, dimension(0:1), intent(in) :: a, b, c
real, dimension(0:1) :: t, n, ac
real :: dd
t = b - a                          ! Vector ab
dd = sqrt(t(0)**2+t(1)**2)         ! Length of ab
t = t/dd                           ! unit vector of ab
n = (/-t(1), t(0)/)                ! normal unit vector to ab
ac = c - a                         ! vector ac
pdis = abs(ac(0)*n(0)+ac(1)*n(1))  ! Projection of ac to n (the minimum distance)
end function pdis

program test
print *, pdis((/1.0,1.0/), (/2.0,2.0/), (/2.0,0.0/))   ! Example (answer is 1.414)
end program test
``````
• isn't this computing the distance of a point to a line instead of the segment? – balint.miklos Jun 18 '09 at 8:32
• This is indeed the distance to the line the segment is on, not to the segment. – Grumdrig Oct 22 '09 at 17:05
• This doesn't seem to work. If you've got a segment of (0,0) and (5,0), and try against point (7,0), it will return 0, which isn't true. The distance should be 2. – quano Feb 9 '10 at 22:32
• He's failed to consider the case where the projection of the point onto the segment is outside the interval from A to B. That might be what the questioner wanted, but not what he asked. – phkahler Feb 10 '10 at 16:32
• This is not what was originally asked. – Sambatyon Feb 24 '10 at 13:54

Here is a more complete spelling out of Grumdrig's solution. This version also returns the closest point itself.

``````#include "stdio.h"
#include "math.h"

class Vec2
{
public:
float _x;
float _y;

Vec2()
{
_x = 0;
_y = 0;
}

Vec2( const float x, const float y )
{
_x = x;
_y = y;
}

Vec2 operator+( const Vec2 &v ) const
{
return Vec2( this->_x + v._x, this->_y + v._y );
}

Vec2 operator-( const Vec2 &v ) const
{
return Vec2( this->_x - v._x, this->_y - v._y );
}

Vec2 operator*( const float f ) const
{
return Vec2( this->_x * f, this->_y * f );
}

float DistanceToSquared( const Vec2 p ) const
{
const float dX = p._x - this->_x;
const float dY = p._y - this->_y;

return dX * dX + dY * dY;
}

float DistanceTo( const Vec2 p ) const
{
return sqrt( this->DistanceToSquared( p ) );
}

float DotProduct( const Vec2 p ) const
{
return this->_x * p._x + this->_y * p._y;
}
};

// return minimum distance between line segment vw and point p, and the closest point on the line segment, q
float DistanceFromLineSegmentToPoint( const Vec2 v, const Vec2 w, const Vec2 p, Vec2 * const q )
{
const float distSq = v.DistanceToSquared( w ); // i.e. |w-v|^2 ... avoid a sqrt
if ( distSq == 0.0 )
{
// v == w case
(*q) = v;

return v.DistanceTo( p );
}

// consider the line extending the segment, parameterized as v + t (w - v)
// we find projection of point p onto the line
// it falls where t = [(p-v) . (w-v)] / |w-v|^2

const float t = ( p - v ).DotProduct( w - v ) / distSq;
if ( t < 0.0 )
{
// beyond the v end of the segment
(*q) = v;

return v.DistanceTo( p );
}
else if ( t > 1.0 )
{
// beyond the w end of the segment
(*q) = w;

return w.DistanceTo( p );
}

// projection falls on the segment
const Vec2 projection = v + ( ( w - v ) * t );

(*q) = projection;

return p.DistanceTo( projection );
}

float DistanceFromLineSegmentToPoint( float segmentX1, float segmentY1, float segmentX2, float segmentY2, float pX, float pY, float *qX, float *qY )
{
Vec2 q;

float distance = DistanceFromLineSegmentToPoint( Vec2( segmentX1, segmentY1 ), Vec2( segmentX2, segmentY2 ), Vec2( pX, pY ), &q );

(*qX) = q._x;
(*qY) = q._y;

return distance;
}

void TestDistanceFromLineSegmentToPoint( float segmentX1, float segmentY1, float segmentX2, float segmentY2, float pX, float pY )
{
float qX;
float qY;
float d = DistanceFromLineSegmentToPoint( segmentX1, segmentY1, segmentX2, segmentY2, pX, pY, &qX, &qY );
printf( "line segment = ( ( %f, %f ), ( %f, %f ) ), p = ( %f, %f ), distance = %f, q = ( %f, %f )\n",
segmentX1, segmentY1, segmentX2, segmentY2, pX, pY, d, qX, qY );
}

void TestDistanceFromLineSegmentToPoint()
{
TestDistanceFromLineSegmentToPoint( 0, 0, 1, 1, 1, 0 );
TestDistanceFromLineSegmentToPoint( 0, 0, 20, 10, 5, 4 );
TestDistanceFromLineSegmentToPoint( 0, 0, 20, 10, 30, 15 );
TestDistanceFromLineSegmentToPoint( 0, 0, 20, 10, -30, 15 );
TestDistanceFromLineSegmentToPoint( 0, 0, 10, 0, 5, 1 );
TestDistanceFromLineSegmentToPoint( 0, 0, 0, 10, 1, 5 );
}
``````
• Thanks for posting this. Very well structured and commented and formatted - almost made me forget how much I dislike C++. I've used this to make a corresponding C# version, which I've now posted here. – RenniePet Apr 1 '13 at 7:00

One line solution using arctangents:

The idea is to move A to (0, 0) and rotate triangle clockwise to make C lay on X axis, when this happen, By will be the distance. 1. a angle = Atan(Cy - Ay, Cx - Ax);
2. b angle = Atan(By - Ay, Bx - Ax);
3. AB length = Sqrt( (Bx - Ax)^2 + (By - Ay)^2 )
4. By = Sin ( bAngle - aAngle) * ABLength

C#

``````public double Distance(Point a, Point b, Point c)
{
// normalize points
Point cn = new Point(c.X - a.X, c.Y - a.Y);
Point bn = new Point(b.X - a.X, b.Y - a.Y);

double angle = Math.Atan2(bn.Y, bn.X) - Math.Atan2(cn.Y, cn.X);
double abLength = Math.Sqrt(bn.X*bn.X + bn.Y*bn.Y);

return Math.Sin(angle)*abLength;
}
``````

One line C# (to be converted to SQL)

``````double distance = Math.Sin(Math.Atan2(b.Y - a.Y, b.X - a.X) - Math.Atan2(c.Y - a.Y, c.X - a.X)) * Math.Sqrt((b.X - a.X) * (b.X - a.X) + (b.Y - a.Y) * (b.Y - a.Y))
``````

Consider this modification to Grumdrig's answer above. Many times you'll find that floating point imprecision can cause problems. I'm using doubles in the version below, but you can easily change to floats. The important part is that it uses an epsilon to handle the "slop". In addition, you'll many times want to know WHERE the intersection happened, or if it happened at all. If the returned t is < 0.0 or > 1.0, no collision occurred. However, even if no collision occurred, many times you'll want to know where the closest point on the segment to P is, and thus I use qx and qy to return this location.

``````double PointSegmentDistanceSquared( double px, double py,
double p1x, double p1y,
double p2x, double p2y,
double& t,
double& qx, double& qy)
{
static const double kMinSegmentLenSquared = 0.00000001;  // adjust to suit.  If you use float, you'll probably want something like 0.000001f
static const double kEpsilon = 1.0E-14;  // adjust to suit.  If you use floats, you'll probably want something like 1E-7f
double dx = p2x - p1x;
double dy = p2y - p1y;
double dp1x = px - p1x;
double dp1y = py - p1y;
const double segLenSquared = (dx * dx) + (dy * dy);
if (segLenSquared >= -kMinSegmentLenSquared && segLenSquared <= kMinSegmentLenSquared)
{
// segment is a point.
qx = p1x;
qy = p1y;
t = 0.0;
return ((dp1x * dp1x) + (dp1y * dp1y));
}
else
{
// Project a line from p to the segment [p1,p2].  By considering the line
// extending the segment, parameterized as p1 + (t * (p2 - p1)),
// we find projection of point p onto the line.
// It falls where t = [(p - p1) . (p2 - p1)] / |p2 - p1|^2
t = ((dp1x * dx) + (dp1y * dy)) / segLenSquared;
if (t < kEpsilon)
{
// intersects at or to the "left" of first segment vertex (p1x, p1y).  If t is approximately 0.0, then
// intersection is at p1.  If t is less than that, then there is no intersection (i.e. p is not within
// the 'bounds' of the segment)
if (t > -kEpsilon)
{
// intersects at 1st segment vertex
t = 0.0;
}
// set our 'intersection' point to p1.
qx = p1x;
qy = p1y;
// Note: If you wanted the ACTUAL intersection point of where the projected lines would intersect if
// we were doing PointLineDistanceSquared, then qx would be (p1x + (t * dx)) and qy would be (p1y + (t * dy)).
}
else if (t > (1.0 - kEpsilon))
{
// intersects at or to the "right" of second segment vertex (p2x, p2y).  If t is approximately 1.0, then
// intersection is at p2.  If t is greater than that, then there is no intersection (i.e. p is not within
// the 'bounds' of the segment)
if (t < (1.0 + kEpsilon))
{
// intersects at 2nd segment vertex
t = 1.0;
}
// set our 'intersection' point to p2.
qx = p2x;
qy = p2y;
// Note: If you wanted the ACTUAL intersection point of where the projected lines would intersect if
// we were doing PointLineDistanceSquared, then qx would be (p1x + (t * dx)) and qy would be (p1y + (t * dy)).
}
else
{
// The projection of the point to the point on the segment that is perpendicular succeeded and the point
// is 'within' the bounds of the segment.  Set the intersection point as that projected point.
qx = p1x + (t * dx);
qy = p1y + (t * dy);
}
// return the squared distance from p to the intersection point.  Note that we return the squared distance
// as an optimization because many times you just need to compare relative distances and the squared values
// works fine for that.  If you want the ACTUAL distance, just take the square root of this value.
double dpqx = px - qx;
double dpqy = py - qy;
return ((dpqx * dpqx) + (dpqy * dpqy));
}
}
``````

I'm assuming you want to find the shortest distance between the point and a line segment; to do this, you need to find the line (lineA) which is perpendicular to your line segment (lineB) which goes through your point, determine the intersection between that line (lineA) and your line which goes through your line segment (lineB); if that point is between the two points of your line segment, then the distance is the distance between your point and the point you just found which is the intersection of lineA and lineB; if the point is not between the two points of your line segment, you need to get the distance between your point and the closer of two ends of the line segment; this can be done easily by taking the square distance (to avoid a square root) between the point and the two points of the line segment; whichever is closer, take the square root of that one.

Grumdrig's C++/JavaScript implementation was very useful to me, so I have provided a Python direct port that I am using. The complete code is here.

``````class Point(object):
def __init__(self, x, y):
self.x = float(x)
self.y = float(y)

def square(x):
return x * x

def distance_squared(v, w):
return square(v.x - w.x) + square(v.y - w.y)

def distance_point_segment_squared(p, v, w):
# Segment length squared, |w-v|^2
d2 = distance_squared(v, w)
if d2 == 0:
# v == w, return distance to v
return distance_squared(p, v)
# Consider the line extending the segment, parameterized as v + t (w - v).
# We find projection of point p onto the line.
# It falls where t = [(p-v) . (w-v)] / |w-v|^2
t = ((p.x - v.x) * (w.x - v.x) + (p.y - v.y) * (w.y - v.y)) / d2;
if t < 0:
# Beyond v end of the segment
return distance_squared(p, v)
elif t > 1.0:
# Beyond w end of the segment
return distance_squared(p, w)
else:
# Projection falls on the segment.
proj = Point(v.x + t * (w.x - v.x), v.y + t * (w.y - v.y))
# print proj.x, proj.y
return distance_squared(p, proj)
``````

Matlab code, with built-in "self test" if they call the function with no arguments:

``````function r = distPointToLineSegment( xy0, xy1, xyP )
% r = distPointToLineSegment( xy0, xy1, xyP )

if( nargin < 3 )
selfTest();
r=0;
else
vx = xy0(1)-xyP(1);
vy = xy0(2)-xyP(2);
ux = xy1(1)-xy0(1);
uy = xy1(2)-xy0(2);
lenSqr= (ux*ux+uy*uy);
detP= -vx*ux + -vy*uy;

if( detP < 0 )
r = norm(xy0-xyP,2);
elseif( detP > lenSqr )
r = norm(xy1-xyP,2);
else
r = abs(ux*vy-uy*vx)/sqrt(lenSqr);
end
end

function selfTest()
%#ok<*NASGU>
disp(['invalid args, distPointToLineSegment running (recursive)  self-test...']);

ptA = [1;1]; ptB = [-1;-1];
ptC = [1/2;1/2];  % on the line
ptD = [-2;-1.5];  % too far from line segment
ptE = [1/2;0];    % should be same as perpendicular distance to line
ptF = [1.5;1.5];      % along the A-B but outside of the segment

distCtoAB = distPointToLineSegment(ptA,ptB,ptC)
distDtoAB = distPointToLineSegment(ptA,ptB,ptD)
distEtoAB = distPointToLineSegment(ptA,ptB,ptE)
distFtoAB = distPointToLineSegment(ptA,ptB,ptF)
figure(1); clf;
circle = @(x, y, r, c) rectangle('Position', [x-r, y-r, 2*r, 2*r], ...
'Curvature', [1 1], 'EdgeColor', c);
plot([ptA(1) ptB(1)],[ptA(2) ptB(2)],'r-x'); hold on;
plot(ptC(1),ptC(2),'b+'); circle(ptC(1),ptC(2), 0.5e-1, 'b');
plot(ptD(1),ptD(2),'g+'); circle(ptD(1),ptD(2), distDtoAB, 'g');
plot(ptE(1),ptE(2),'k+'); circle(ptE(1),ptE(2), distEtoAB, 'k');
plot(ptF(1),ptF(2),'m+'); circle(ptF(1),ptF(2), distFtoAB, 'm');
hold off;
axis([-3 3 -3 3]); axis equal;
end

end
``````
• Thanks, this Matlab code indeed calculates the shortest distance to the line SEGMENT and not the distance to the infinite line on which the segment lies. – Rudolf Meijering Mar 22 '12 at 14:14

And now my solution as well...... (Javascript)

It is very fast because I try to avoid any Math.pow functions.

As you can see, at the end of the function I have the distance of the line.

code is from the lib http://www.draw2d.org/graphiti/jsdoc/#!/example

``````/**
* Static util function to determine is a point(px,py) on the line(x1,y1,x2,y2)
* A simple hit test.
*
* @return {boolean}
* @static
* @private
* @param {Number} coronaWidth the accepted corona for the hit test
* @param {Number} X1 x coordinate of the start point of the line
* @param {Number} Y1 y coordinate of the start point of the line
* @param {Number} X2 x coordinate of the end point of the line
* @param {Number} Y2 y coordinate of the end point of the line
* @param {Number} px x coordinate of the point to test
* @param {Number} py y coordinate of the point to test
**/
graphiti.shape.basic.Line.hit= function( coronaWidth, X1, Y1,  X2,  Y2, px, py)
{
// Adjust vectors relative to X1,Y1
// X2,Y2 becomes relative vector from X1,Y1 to end of segment
X2 -= X1;
Y2 -= Y1;
// px,py becomes relative vector from X1,Y1 to test point
px -= X1;
py -= Y1;
var dotprod = px * X2 + py * Y2;
var projlenSq;
if (dotprod <= 0.0) {
// px,py is on the side of X1,Y1 away from X2,Y2
// distance to segment is length of px,py vector
// "length of its (clipped) projection" is now 0.0
projlenSq = 0.0;
} else {
// switch to backwards vectors relative to X2,Y2
// X2,Y2 are already the negative of X1,Y1=>X2,Y2
// to get px,py to be the negative of px,py=>X2,Y2
// the dot product of two negated vectors is the same
// as the dot product of the two normal vectors
px = X2 - px;
py = Y2 - py;
dotprod = px * X2 + py * Y2;
if (dotprod <= 0.0) {
// px,py is on the side of X2,Y2 away from X1,Y1
// distance to segment is length of (backwards) px,py vector
// "length of its (clipped) projection" is now 0.0
projlenSq = 0.0;
} else {
// px,py is between X1,Y1 and X2,Y2
// dotprod is the length of the px,py vector
// projected on the X2,Y2=>X1,Y1 vector times the
// length of the X2,Y2=>X1,Y1 vector
projlenSq = dotprod * dotprod / (X2 * X2 + Y2 * Y2);
}
}
// Distance to line is now the length of the relative point
// vector minus the length of its projection onto the line
// (which is zero if the projection falls outside the range
//  of the line segment).
var lenSq = px * px + py * py - projlenSq;
if (lenSq < 0) {
lenSq = 0;
}
return Math.sqrt(lenSq)<coronaWidth;
};
``````

coded in t-sql

the point is (@px, @py) and the line segment runs from (@ax, @ay) to (@bx, @by)

``````create function fn_sqr (@NumberToSquare decimal(18,10))
returns decimal(18,10)
as
begin
declare @Result decimal(18,10)
set @Result = @NumberToSquare * @NumberToSquare
return @Result
end
go

create function fn_Distance(@ax decimal (18,10) , @ay decimal (18,10), @bx decimal(18,10),  @by decimal(18,10))
returns decimal(18,10)
as
begin
declare @Result decimal(18,10)
set @Result = (select dbo.fn_sqr(@ax - @bx) + dbo.fn_sqr(@ay - @by) )
return @Result
end
go

create function fn_DistanceToSegmentSquared(@px decimal(18,10), @py decimal(18,10), @ax decimal(18,10), @ay decimal(18,10), @bx decimal(18,10), @by decimal(18,10))
returns decimal(18,10)
as
begin
declare @l2 decimal(18,10)
set @l2 = (select dbo.fn_Distance(@ax, @ay, @bx, @by))
if @l2 = 0
return dbo.fn_Distance(@px, @py, @ax, @ay)
declare @t decimal(18,10)
set @t = ((@px - @ax) * (@bx - @ax) + (@py - @ay) * (@by - @ay)) / @l2
if (@t < 0)
return dbo.fn_Distance(@px, @py, @ax, @ay);
if (@t > 1)
return dbo.fn_Distance(@px, @py, @bx, @by);
return dbo.fn_Distance(@px, @py,  @ax + @t * (@bx - @ax),  @ay + @t * (@by - @ay))
end
go

create function fn_DistanceToSegment(@px decimal(18,10), @py decimal(18,10), @ax decimal(18,10), @ay decimal(18,10), @bx decimal(18,10), @by decimal(18,10))
returns decimal(18,10)
as
begin
return sqrt(dbo.fn_DistanceToSegmentSquared(@px, @py , @ax , @ay , @bx , @by ))
end
go

--example execution for distance from a point at (6,1) to line segment that runs from (4,2) to (2,1)
select dbo.fn_DistanceToSegment(6, 1, 4, 2, 2, 1)
--result = 2.2360679775

--example execution for distance from a point at (-3,-2) to line segment that runs from (0,-2) to (-2,1)
select dbo.fn_DistanceToSegment(-3, -2, 0, -2, -2, 1)
--result = 2.4961508830

--example execution for distance from a point at (0,-2) to line segment that runs from (0,-2) to (-2,1)
select dbo.fn_DistanceToSegment(0,-2, 0, -2, -2, 1)
--result = 0.0000000000
``````

Looks like just about everyone else on StackOverflow has contributed an answer (23 answers so far), so here's my contribution for C#. This is mostly based on the answer by M. Katz, which in turn is based on the answer by Grumdrig.

``````   public struct MyVector
{

// Constructor
public MyVector(double x, double y)
{
_x = x;
_y = y;
}

// Distance from this point to another point, squared
private double DistanceSquared(MyVector otherPoint)
{
double dx = otherPoint._x - this._x;
double dy = otherPoint._y - this._y;
return dx * dx + dy * dy;
}

// Find the distance from this point to a line segment (which is not the same as from this
//  point to anywhere on an infinite line). Also returns the closest point.
public double DistanceToLineSegment(MyVector lineSegmentPoint1, MyVector lineSegmentPoint2,
out MyVector closestPoint)
{
return Math.Sqrt(DistanceToLineSegmentSquared(lineSegmentPoint1, lineSegmentPoint2,
out closestPoint));
}

// Same as above, but avoid using Sqrt(), saves a new nanoseconds in cases where you only want
//  to compare several distances to find the smallest or largest, but don't need the distance
public double DistanceToLineSegmentSquared(MyVector lineSegmentPoint1,
MyVector lineSegmentPoint2, out MyVector closestPoint)
{
// Compute length of line segment (squared) and handle special case of coincident points
double segmentLengthSquared = lineSegmentPoint1.DistanceSquared(lineSegmentPoint2);
if (segmentLengthSquared < 1E-7f)  // Arbitrary "close enough for government work" value
{
closestPoint = lineSegmentPoint1;
return this.DistanceSquared(closestPoint);
}

// Use the magic formula to compute the "projection" of this point on the infinite line
MyVector lineSegment = lineSegmentPoint2 - lineSegmentPoint1;
double t = (this - lineSegmentPoint1).DotProduct(lineSegment) / segmentLengthSquared;

// Handle the two cases where the projection is not on the line segment, and the case where
//  the projection is on the segment
if (t <= 0)
closestPoint = lineSegmentPoint1;
else if (t >= 1)
closestPoint = lineSegmentPoint2;
else
closestPoint = lineSegmentPoint1 + (lineSegment * t);
return this.DistanceSquared(closestPoint);
}

public double DotProduct(MyVector otherVector)
{
return this._x * otherVector._x + this._y * otherVector._y;
}

public static MyVector operator +(MyVector leftVector, MyVector rightVector)
{
return new MyVector(leftVector._x + rightVector._x, leftVector._y + rightVector._y);
}

public static MyVector operator -(MyVector leftVector, MyVector rightVector)
{
return new MyVector(leftVector._x - rightVector._x, leftVector._y - rightVector._y);
}

public static MyVector operator *(MyVector aVector, double aScalar)
{
return new MyVector(aVector._x * aScalar, aVector._y * aScalar);
}

// Added using ReSharper due to CodeAnalysis nagging

public bool Equals(MyVector other)
{
return _x.Equals(other._x) && _y.Equals(other._y);
}

public override bool Equals(object obj)
{
if (ReferenceEquals(null, obj)) return false;
return obj is MyVector && Equals((MyVector) obj);
}

public override int GetHashCode()
{
unchecked
{
return (_x.GetHashCode()*397) ^ _y.GetHashCode();
}
}

public static bool operator ==(MyVector left, MyVector right)
{
return left.Equals(right);
}

public static bool operator !=(MyVector left, MyVector right)
{
return !left.Equals(right);
}
}
``````

And here's a little test program.

``````   public static class JustTesting
{
public static void Main()
{
Stopwatch stopwatch = new Stopwatch();
stopwatch.Start();

for (int i = 0; i < 10000000; i++)
{
TestIt(1, 0, 0, 0, 1, 1, 0.70710678118654757);
TestIt(5, 4, 0, 0, 20, 10, 1.3416407864998738);
TestIt(30, 15, 0, 0, 20, 10, 11.180339887498949);
TestIt(-30, 15, 0, 0, 20, 10, 33.541019662496844);
TestIt(5, 1, 0, 0, 10, 0, 1.0);
TestIt(1, 5, 0, 0, 0, 10, 1.0);
}

stopwatch.Stop();
TimeSpan timeSpan = stopwatch.Elapsed;
}

private static void TestIt(float aPointX, float aPointY,
float lineSegmentPoint1X, float lineSegmentPoint1Y,
float lineSegmentPoint2X, float lineSegmentPoint2Y,
{
// Katz
double d1 = DistanceFromPointToLineSegment(new MyVector(aPointX, aPointY),
new MyVector(lineSegmentPoint1X, lineSegmentPoint1Y),
new MyVector(lineSegmentPoint2X, lineSegmentPoint2Y));

/*
// Katz using squared distance
double d2 = DistanceFromPointToLineSegmentSquared(new MyVector(aPointX, aPointY),
new MyVector(lineSegmentPoint1X, lineSegmentPoint1Y),
new MyVector(lineSegmentPoint2X, lineSegmentPoint2Y));
*/

/*
// Matti (optimized)
double d3 = FloatVector.DistanceToLineSegment(new PointF(aPointX, aPointY),
new PointF(lineSegmentPoint1X, lineSegmentPoint1Y),
new PointF(lineSegmentPoint2X, lineSegmentPoint2Y));
*/
}

private static double DistanceFromPointToLineSegment(MyVector aPoint,
MyVector lineSegmentPoint1, MyVector lineSegmentPoint2)
{
MyVector closestPoint;  // Not used
return aPoint.DistanceToLineSegment(lineSegmentPoint1, lineSegmentPoint2,
out closestPoint);
}

private static double DistanceFromPointToLineSegmentSquared(MyVector aPoint,
MyVector lineSegmentPoint1, MyVector lineSegmentPoint2)
{
MyVector closestPoint;  // Not used
return aPoint.DistanceToLineSegmentSquared(lineSegmentPoint1, lineSegmentPoint2,
out closestPoint);
}
}
``````

As you can see, I tried to measure the difference between using the version that avoids the Sqrt() method and the normal version. My tests indicate you can maybe save about 2.5%, but I'm not even sure of that - the variations within the various test runs were of the same order of magnitude. I also tried measuring the version posted by Matti (plus an obvious optimization), and that version seems to be about 4% slower than the version based on Katz/Grumdrig code.

Edit: Incidentally, I've also tried measuring a method that finds the distance to an infinite line (not a line segment) using a cross product (and a Sqrt()), and it's about 32% faster.

Here is devnullicus's C++ version converted to C#. For my implementation I needed to know the point of intersection and found his solution to work well.

``````public static bool PointSegmentDistanceSquared(PointF point, PointF lineStart, PointF lineEnd, out double distance, out PointF intersectPoint)
{
const double kMinSegmentLenSquared = 0.00000001; // adjust to suit.  If you use float, you'll probably want something like 0.000001f
const double kEpsilon = 1.0E-14; // adjust to suit.  If you use floats, you'll probably want something like 1E-7f
double dX = lineEnd.X - lineStart.X;
double dY = lineEnd.Y - lineStart.Y;
double dp1X = point.X - lineStart.X;
double dp1Y = point.Y - lineStart.Y;
double segLenSquared = (dX * dX) + (dY * dY);
double t = 0.0;

if (segLenSquared >= -kMinSegmentLenSquared && segLenSquared <= kMinSegmentLenSquared)
{
// segment is a point.
intersectPoint = lineStart;
t = 0.0;
distance = ((dp1X * dp1X) + (dp1Y * dp1Y));
}
else
{
// Project a line from p to the segment [p1,p2].  By considering the line
// extending the segment, parameterized as p1 + (t * (p2 - p1)),
// we find projection of point p onto the line.
// It falls where t = [(p - p1) . (p2 - p1)] / |p2 - p1|^2
t = ((dp1X * dX) + (dp1Y * dY)) / segLenSquared;
if (t < kEpsilon)
{
// intersects at or to the "left" of first segment vertex (lineStart.X, lineStart.Y).  If t is approximately 0.0, then
// intersection is at p1.  If t is less than that, then there is no intersection (i.e. p is not within
// the 'bounds' of the segment)
if (t > -kEpsilon)
{
// intersects at 1st segment vertex
t = 0.0;
}
// set our 'intersection' point to p1.
intersectPoint = lineStart;
// Note: If you wanted the ACTUAL intersection point of where the projected lines would intersect if
// we were doing PointLineDistanceSquared, then intersectPoint.X would be (lineStart.X + (t * dx)) and intersectPoint.Y would be (lineStart.Y + (t * dy)).
}
else if (t > (1.0 - kEpsilon))
{
// intersects at or to the "right" of second segment vertex (lineEnd.X, lineEnd.Y).  If t is approximately 1.0, then
// intersection is at p2.  If t is greater than that, then there is no intersection (i.e. p is not within
// the 'bounds' of the segment)
if (t < (1.0 + kEpsilon))
{
// intersects at 2nd segment vertex
t = 1.0;
}
// set our 'intersection' point to p2.
intersectPoint = lineEnd;
// Note: If you wanted the ACTUAL intersection point of where the projected lines would intersect if
// we were doing PointLineDistanceSquared, then intersectPoint.X would be (lineStart.X + (t * dx)) and intersectPoint.Y would be (lineStart.Y + (t * dy)).
}
else
{
// The projection of the point to the point on the segment that is perpendicular succeeded and the point
// is 'within' the bounds of the segment.  Set the intersection point as that projected point.
intersectPoint = new PointF((float)(lineStart.X + (t * dX)), (float)(lineStart.Y + (t * dY)));
}
// return the squared distance from p to the intersection point.  Note that we return the squared distance
// as an optimization because many times you just need to compare relative distances and the squared values
// works fine for that.  If you want the ACTUAL distance, just take the square root of this value.
double dpqX = point.X - intersectPoint.X;
double dpqY = point.Y - intersectPoint.Y;

distance = ((dpqX * dpqX) + (dpqY * dpqY));
}

return true;
}
``````
• Works like a charm!! Saved me countless hours. Thanks so much!! – Steve Johnson Jan 11 '15 at 11:35

Here it is using Swift

``````    /* Distance from a point (p1) to line l1 l2 */
func distanceFromPoint(p: CGPoint, toLineSegment l1: CGPoint, and l2: CGPoint) -> CGFloat {
let A = p.x - l1.x
let B = p.y - l1.y
let C = l2.x - l1.x
let D = l2.y - l1.y

let dot = A * C + B * D
let len_sq = C * C + D * D
let param = dot / len_sq

var xx, yy: CGFloat

if param < 0 || (l1.x == l2.x && l1.y == l2.y) {
xx = l1.x
yy = l1.y
} else if param > 1 {
xx = l2.x
yy = l2.y
} else {
xx = l1.x + param * C
yy = l1.y + param * D
}

let dx = p.x - xx
let dy = p.y - yy

return sqrt(dx * dx + dy * dy)
}
``````

C#

``````public static double MinimumDistanceToLineSegment(this Point p,
Line line)
{
var v = line.StartPoint;
var w = line.EndPoint;

double lengthSquared = DistanceSquared(v, w);

if (lengthSquared == 0.0)
return Distance(p, v);

double t = Math.Max(0, Math.Min(1, DotProduct(p - v, w - v) / lengthSquared));
var projection = v + t * (w - v);

return Distance(p, projection);
}

public static double Distance(Point a, Point b)
{
return Math.Sqrt(DistanceSquared(a, b));
}

public static double DistanceSquared(Point a, Point b)
{
var d = a - b;
return DotProduct(d, d);
}

public static double DotProduct(Point a, Point b)
{
return (a.X * b.X) + (a.Y * b.Y);
}
``````
• Tried this code, doesn't seem to work quite correctly. Seems to get the wrong distance some times. – WDUK Apr 8 '17 at 6:04

A 2D and 3D solution

Consider a change of basis such that the line segment becomes `(0, 0, 0)-(d, 0, 0)` and the point `(u, v, 0)`. The shortest distance occurs in that plane and is given by

``````    u ≤ 0 -> d(A, C)
0 ≤ u ≤ d -> |v|
d ≤ u     -> d(B, C)
``````

(the distance to one of the endpoints or to the supporting line, depending on the projection to the line. The iso-distance locus is made of two half-circles and two line segments.) In the above expression, d is the length of the segment AB, and u, v are respectivey the scalar product and (modulus of the) cross product of AB/d (unit vector in the direction of AB) and AC. Hence vectorially,

``````AB.AC ≤ 0             -> |AC|
0 ≤ AB.AC ≤ AB²   -> |ABxAC|/|AB|
AB² ≤ AB.AC -> |BC|
``````

see the Matlab GEOMETRY toolbox in the following website: http://people.sc.fsu.edu/~jburkardt/m_src/geometry/geometry.html

ctrl+f and type "segment" to find line segment related functions. the functions "segment_point_dist_2d.m" and "segment_point_dist_3d.m" are what you need.

The GEOMETRY codes are available in a C version and a C++ version and a FORTRAN77 version and a FORTRAN90 version and a MATLAB version.

AutoHotkeys version based on Joshua's Javascript:

``````plDist(x, y, x1, y1, x2, y2) {
A:= x - x1
B:= y - y1
C:= x2 - x1
D:= y2 - y1

dot:= A*C + B*D
sqLen:= C*C + D*D
param:= dot / sqLen

if (param < 0 || ((x1 = x2) && (y1 = y2))) {
xx:= x1
yy:= y1
} else if (param > 1) {
xx:= x2
yy:= y2
} else {
xx:= x1 + param*C
yy:= y1 + param*D
}

dx:= x - xx
dy:= y - yy

return sqrt(dx*dx + dy*dy)
}
``````

Didn't see a Java implementation here, so I translated the Javascript function from the accepted answer to Java code:

``````static double sqr(double x) {
return x * x;
}
static double dist2(DoublePoint v, DoublePoint w) {
return sqr(v.x - w.x) + sqr(v.y - w.y);
}
static double distToSegmentSquared(DoublePoint p, DoublePoint v, DoublePoint w) {
double l2 = dist2(v, w);
if (l2 == 0) return dist2(p, v);
double t = ((p.x - v.x) * (w.x - v.x) + (p.y - v.y) * (w.y - v.y)) / l2;
if (t < 0) return dist2(p, v);
if (t > 1) return dist2(p, w);
return dist2(p, new DoublePoint(
v.x + t * (w.x - v.x),
v.y + t * (w.y - v.y)
));
}
static double distToSegment(DoublePoint p, DoublePoint v, DoublePoint w) {
return Math.sqrt(distToSegmentSquared(p, v, w));
}
static class DoublePoint {
public double x;
public double y;

public DoublePoint(double x, double y) {
this.x = x;
this.y = y;
}
}
``````

WPF version:

``````public class LineSegment
{

public LineSegment(Point start, Point end)
{
_offset = (Vector)start;
_vector = (Vector)(end - _offset);
}

public double DistanceTo(Point pt)
{
var v = (Vector)pt - _offset;

// first, find a projection point on the segment in parametric form (0..1)
var p = (v * _vector) / _vector.LengthSquared;

// and limit it so it lays inside the segment
p = Math.Min(Math.Max(p, 0), 1);

// now, find the distance from that point to our point
return (_vector * p - v).Length;
}
}
``````

Here's the code I ended up writing. This code assumes that a point is defined in the form of `{x:5, y:7}`. Note that this is not the absolute most efficient way, but it's the simplest and easiest-to-understand code that I could come up with.

``````// a, b, and c in the code below are all points

function distance(a, b)
{
var dx = a.x - b.x;
var dy = a.y - b.y;
return Math.sqrt(dx*dx + dy*dy);
}

function Segment(a, b)
{
var ab = {
x: b.x - a.x,
y: b.y - a.y
};
var length = distance(a, b);

function cross(c) {
return ab.x * (c.y-a.y) - ab.y * (c.x-a.x);
};

this.distanceFrom = function(c) {
return Math.min(distance(a,c),
distance(b,c),
Math.abs(cross(c) / length));
};
}
``````
• This code has a bug. A point near the line on which the segment lies, but far off one end of the segment, would be incorrectly judged to be near the segment. – Grumdrig Oct 22 '09 at 17:02
• Interesting, I'll look into this the next time I'm working on this codebase to confirm your assertion. Thanks for the tip. – Eli Courtwright Oct 23 '09 at 3:18

The above function is not working on vertical lines. Here is a function that is working fine! Line with points p1, p2. and CheckPoint is p;

``````public float DistanceOfPointToLine2(PointF p1, PointF p2, PointF p)
{
//          (y1-y2)x + (x2-x1)y + (x1y2-x2y1)
//d(P,L) = --------------------------------
//         sqrt( (x2-x1)pow2 + (y2-y1)pow2 )

double ch = (p1.Y - p2.Y) * p.X + (p2.X - p1.X) * p.Y + (p1.X * p2.Y - p2.X * p1.Y);
double del = Math.Sqrt(Math.Pow(p2.X - p1.X, 2) + Math.Pow(p2.Y - p1.Y, 2));
double d = ch / del;
return (float)d;
}
``````
• Does not answer the question. This only works for lines (the ones that extend infinitely in space) not line segments (which have a finite length). – Trinidad Sep 19 '11 at 15:17
• "above function" is an ambiguous reference. (Irritates me because sometimes this answer is shown beneath my answer.) – RenniePet Apr 5 '13 at 6:06

Here is same thing as the C++ answer but ported to pascal. The order of the point parameter has changed to suit my code but is the same thing.

``````function Dot(const p1, p2: PointF): double;
begin
Result := p1.x * p2.x + p1.y * p2.y;
end;
function SubPoint(const p1, p2: PointF): PointF;
begin
result.x := p1.x - p2.x;
result.y := p1.y - p2.y;
end;

function ShortestDistance2(const p,v,w : PointF) : double;
var
l2,t : double;
projection,tt: PointF;
begin
// Return minimum distance between line segment vw and point p
//l2 := length_squared(v, w);  // i.e. |w-v|^2 -  avoid a sqrt
l2 := Distance(v,w);
l2 := MPower(l2,2);
if (l2 = 0.0) then begin
result:= Distance(p, v);   // v == w case
exit;
end;
// Consider the line extending the segment, parameterized as v + t (w - v).
// We find projection of point p onto the line.
// It falls where t = [(p-v) . (w-v)] / |w-v|^2
t := Dot(SubPoint(p,v),SubPoint(w,v)) / l2;
if (t < 0.0) then begin
result := Distance(p, v);       // Beyond the 'v' end of the segment
exit;
end
else if (t > 1.0) then begin
result := Distance(p, w);  // Beyond the 'w' end of the segment
exit;
end;
//projection := v + t * (w - v);  // Projection falls on the segment
tt.x := v.x + t * (w.x - v.x);
tt.y := v.y + t * (w.y - v.y);
result := Distance(p, tt);
end;
``````
• There are several problems with this Answer: The type PointF is not declared (maybe that's a standard type in some Pascal implementations). It's probably a record x,y: double; end; 2. the functions Distance and MPower are not declared and there is no explanation what they do (we can guess, yes). 3. The variable projection is declared but never used. Overall that makes it a rather poor answer. – dummzeuch Jan 19 '18 at 15:05