# how to calculate the distance between two point on map? [duplicate]

Possible Duplicates:
help with GPS position
calculate distance between 2 gps coordinates

hi

i have this (x,y) point: `40.716948,-74.006138`

and i have this (x,y) point: `40.704977,-73.958588`

(this points are on google map)

how to calculate the distance between those points ?

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## marked as duplicate by Henk Holterman, Judge Maygarden, Andreas Rejbrand, dmckee, GravitonAug 11 '10 at 6:36

Are those coordinates or pixels? What unit you want your result to be in? –  NullUserException Aug 9 '10 at 12:49
Are you looking for the straight distance, the distance on the GPS earth model, the shortest connection on ground or the shortest path using roads? –  Peter G. Aug 9 '10 at 12:50
This might not be the answer you are looking for, but why not make use of a mapping engine, such as the open source MapServer, which has a c# API via MapScript. It can calculate all manner of spatial operations such as distance in it's sleep taking into account various projections and so on, and you can map the results graphically and so on. –  Matthew Lock Apr 6 '13 at 3:21

Here is a piece of code I have written not long ago :

``````double e=(3.1415926538*latitude1/180);
double f=(3.1415926538*longitude1/180);
double g=(3.1415926538*latitude2/180);
double h=(3.1415926538*longitude2/180);
double i=(Math.cos(e)*Math.cos(g)*Math.cos(f)*Math.cos(h)+Math.cos(e)*Math.sin(f)*Math.cos(g)*Math.sin(h)+Math.sin(e)*Math.sin(g));
double j=(Math.acos(i));
double k=(6371*j);

return k;
``````

Of course, 3.1415926538 is Pi, and 6371 is the radius of the earth.

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(in kilometers) –  BlueRaja - Danny Pflughoeft Aug 9 '10 at 21:15

Here is a Javascript implementation of the haversign formula:

``````var R = 6371; // km
var a = Math.sin(dLat/2) * Math.sin(dLat/2) +
Math.sin(dLon/2) * Math.sin(dLon/2);
var c = 2 * Math.atan2(Math.sqrt(a), Math.sqrt(1-a));
var d = R * c;
``````

http://www.movable-type.co.uk/scripts/latlong.html

Here is a similar question: http://stackoverflow.com/questions/365826/calculate-distance-between-2-gps-coordinates

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``````public class GeoMath
{
/// <summary>
/// The distance type to return the results in.
/// </summary>
public enum MeasureUnits { Miles, Kilometers };

/// <summary>
/// Returns the distance in miles or kilometers of any two
/// latitude / longitude points. (Haversine formula)
/// </summary>
public static double Distance(double latitudeA, double longitudeA, double latitudeB, double longitudeB, MeasureUnits units)
{
if (latitudeA <= -90 || latitudeA >= 90 || longitudeA <= -180 || longitudeA >= 180
|| latitudeB <= -90 && latitudeB >= 90 || longitudeB <= -180 || longitudeB >= 180)
{
throw new ArgumentException(String.Format("Invalid value point coordinates. Points A({0},{1}) B({2},{3}) ",
latitudeA,
longitudeA,
latitudeB,
longitudeB));
}

double R = (units == MeasureUnits.Miles) ? 3960 : 6371;
double dLat = toRadian(latitudeB - latitudeA);
double dLon = toRadian(longitudeB - longitudeA);
double a = Math.Sin(dLat / 2) * Math.Sin(dLat / 2) +
Math.Sin(dLon / 2) * Math.Sin(dLon / 2);
double c = 2 * Math.Asin(Math.Min(1, Math.Sqrt(a)));
double d = R * c;
return d;
}

/// <summary>
/// </summary>
{
return (Math.PI / 180) * val;
}

}
``````
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Convert the coordinates to UTM and then use sqrt((x1-x2)^2+(y1-y2)^2) to calculate distance. You can find many coordinate converters in codeplex.com

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I have found another member of the flat earth society! –  Tom Gullen Aug 9 '10 at 12:58
That's not actually true. In cases that distance of two points are less than 6 degrees (like this case), this method is enough accurate. –  M.Elmi Aug 9 '10 at 13:10
Only joking of course :) The problem is that OP didn't specify what sort of ranges he was expecting, so we should assume that we could be testing data over 6 degrees. –  Tom Gullen Aug 9 '10 at 13:12

The other solutions give a more accurate result, but they use transcendental functions and that might be a bit of performance issue if you are going to be running that many times.

(lifted from this post) Here's an alternative; an approximation that's way less computationally expensive:

Approximate distance in miles:

``````sqrt(x * x + y * y)

where x = 69.1 * (lat2 - lat1)
and y = 53.0 * (lon2 - lon1)
``````

You can improve the accuracy of this approximate distance calculation by adding the cosine math function:

Improved approximate distance in miles:

``````sqrt(x * x + y * y)

where x = 69.1 * (lat2 - lat1)
and y = 69.1 * (lon2 - lon1) * cos(lat1/57.3)
``````
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