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I have two GPS coordinates which link together to make a line. I also have a GPS point which is near to, but never exactly on, the line. My question is, how do I find the nearest point along the line to the given point?

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Note that, for being ABSOLUTELY PRECISE, you have to consider geodesic distance, which implies a somewhat "spiral" line between two arbitrary points when they are far from equator. But let's assume the points are very far away from one another, or are they? ;oP – heltonbiker Sep 20 '12 at 0:26

2 Answers 2

Game Dev has an answer to this, it is in C++ but it should be easy to port over. Which CarlG has kindly done (hopefully he does not mind me reposting):

public static Point2D nearestPointOnLine(double ax, double ay, double bx, double by, double px, double py,
        boolean clampToSegment, Point2D dest) {
    // Thanks StackOverflow!
    if (dest == null) {
        dest = new Point2D.Double();

    double apx = px - ax;
    double apy = py - ay;
    double abx = bx - ax;
    double aby = by - ay;

    double ab2 = abx * abx + aby * aby;
    double ap_ab = apx * abx + apy * aby;
    double t = ap_ab / ab2;
    if (clampToSegment) {
        if (t < 0) {
            t = 0;
        } else if (t > 1) {
            t = 1;
    dest.setLocation(ax + abx * t, ay + aby * t);
    return dest;
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aww - link is 404'ed – CarlG May 5 '11 at 16:32
1… Yeay for gamedev archiving content. – mlk May 5 '11 at 16:42
just saw that - thanks! – CarlG May 5 '11 at 17:10
That algorithm worked correctly for me - here it is ported to Java: – CarlG May 5 '11 at 17:42
@mk: Link fixed. – Michal Sznajder Jul 8 '11 at 6:29

Try this:

ratio = (((x1-x0)^2+(y1-y0)^2)*((x2-x1)^2 + (y2-y1)^2) - ((x2-x1)(y1-y0) - (x1-x0)(y2-y1))^2)^0.5
                                            ((x2-x1)^2 + (y2-y1)^2)

xc = x1 + (x2-x1)*ratio;
yc = y1 + (y2-y1)*ratio;

    x1,y1 = point#1 on the line
    x2,y2 = point#2 on the line
    x0,y0 = Another point near the line
    xc,yx = The nearest point of x0,y0 on the line
    ratio = is the ratio of distance of x1,y1 to xc,yc and distance of x1,y1 to x2,y2
    ^2    = square
    ^0.5  = square root

The formular is derived after we find the distant from point x0,y0 to line (x1,y1 -> x2,y3). See here

I've test this code here (this particular one I gave you above) but I've used it similar method years ago and it work so you may try.

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This only seems to work for points on the line segment, not the entire line that passes through the two points – CarlG May 5 '11 at 17:43

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