# How do I calculate distance between two latitude-longitude points?

How do I calculate the distance between two points specified by latitude and longitude?

EDIT: For clarification, I'd like the distance in kilometres; the points use the WGS84 system and I'd like to understand the relative accuracies of the approaches available.

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First hit on google with your header as search string: Calculate distance, bearing and more between two Latitude/Longitude points. –  Magnus Westin Aug 26 '08 at 12:57
Often called a "Great Circle" calculation –  Adam Davis Oct 19 '08 at 1:41
Missing definition in javascript code: if (typeof(Number.prototype.toRad) === "undefined") { Number.prototype.toRad = function() { return this * Math.PI / 180; } } –  Zibri Apr 27 '12 at 16:30
Please see my answer with an optimized version of Haversine distance. On average it runs twice as fast as the highest voted answer. –  Salvador Dali Feb 7 at 8:55

This link might be helpful to you, as it details the use of the Haversine formula to calculate the distance.

Excerpt:

This script [in Javascript] calculates great-circle distances between the two points – that is, the shortest distance over the earth’s surface – using the ‘Haversine’ formula.

``````function getDistanceFromLatLonInKm(lat1,lon1,lat2,lon2) {
var R = 6371; // Radius of the earth in 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; // Distance in km
return d;
}

return deg * (Math.PI/180)
}
``````
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Added excerpt (Stackoverflow's preference is to have enough information in the answer to answer the question, and links for deeper info) –  Adam Davis Oct 19 '08 at 1:39
Does this calculation/method account for the Earth being a spheroid (not a perfect sphere)? The original question asked for distance on between points on a WGS84 globe. Not sure how much error creeps in by using a perfect sphere, but I suspect it can be quite a lot depending on where the points are on the globe, thus the distinction is worth bearing in mind. –  locster Nov 8 '11 at 8:33
The Haversine formula doesn't account for the Earth being a spheroid, so you'll get some error introduced due to that fact. It can't be guaranteed correct to better than 0.5%. That may or may not be an acceptable level of error though. –  Brandon Dec 28 '11 at 16:20
Is there any reason to use `Math.atan2(Math.sqrt(a), Math.sqrt(1-a))` instead of `Math.asin(Math.sqrt(h))`, which would be the direct implementation of the formula that the Wikipedia article uses? Is it more efficient and/or more numerically stable? –  musiphil Dec 20 '12 at 3:47
@UsmanMutawakil Well, the 38 miles you get is distance on the road. This algorithm calculates a straight line distance on the earth's surface. Google Maps has a distance tool (bottom left, "Labs") that does the same, use that to compare. –  Pascal Jul 3 '13 at 17:35

Here is a C# Implementation:

``````class DistanceAlgorithm
{
const double PIx = 3.141592653589793;

/// <summary>
/// This class cannot be instantiated.
/// </summary>
private DistanceAlgorithm() { }

/// <summary>
/// </summary>
/// <param name="x">Degrees</param>
{
return x * PIx / 180;
}

/// <summary>
/// Calculate the distance between two places.
/// </summary>
/// <param name="lon1"></param>
/// <param name="lat1"></param>
/// <param name="lon2"></param>
/// <param name="lat2"></param>
/// <returns></returns>
public static double DistanceBetweenPlaces(
double lon1,
double lat1,
double lon2,
double lat2)
{
double dlon = Radians(lon2 - lon1);
double dlat = Radians(lat2 - lat1);

double a = (Math.Sin(dlat / 2) * Math.Sin(dlat / 2)) + Math.Cos(Radians(lat1)) * Math.Cos(Radians(lat2)) * (Math.Sin(dlon / 2) * Math.Sin(dlon / 2));
double angle = 2 * Math.Atan2(Math.Sqrt(a), Math.Sqrt(1 - a));
}
``````
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You are using the equatorial radius, but you should be using the mean radius, which is 6371 km –  Philippe Leybaert Jul 10 '09 at 12:18
Shouldn't this be `double dlon = Radians(lon2 - lon1);` and `double dlat = Radians(lat2 - lat1);` –  Chris Marisic Jan 15 '10 at 15:40
I agree with Chris Marisic. I used the original code and the calculations were wrong. I added the call to convert the deltas to radians and it works properly now. I submitted an edit and am waiting for it to be peer reviewed. –  Bryan Bedard Dec 4 '11 at 4:53
I submitted another edit because lat1 & lat2 also need to be converted to radians. I also revised the formula for the assignment to a to match the formula and code found here: movable-type.co.uk/scripts/latlong.html –  Bryan Bedard Dec 4 '11 at 6:48
@PhilippeLeybaert - perhaps he's taking his first steps into a larger world? :) –  Peter Wone Jul 10 '13 at 7:15

Thanks very much for all this. I used the following code in my Objective-C iPhone app:

``````const double PIx = 3.141592653589793;
const double RADIO = 6371; // Mean radius of Earth in Km

return val * PIx / 180;
}

-(double)kilometresBetweenPlace1:(CLLocationCoordinate2D) place1 andPlace2:(CLLocationCoordinate2D) place2 {

double dlon = convertToRadians(place2.longitude - place1.longitude);
double dlat = convertToRadians(place2.latitude - place1.latitude);

double a = ( pow(sin(dlat / 2), 2) + cos(convertToRadians(place1.latitude))) * cos(convertToRadians(place2.latitude)) * pow(sin(dlon / 2), 2);
double angle = 2 * asin(sqrt(a));

}
``````

Latitude and Longitude are in decimal. I didn't use min() for the asin() call as the distances that I'm using are so small that they don't require it.

It gave incorrect answers until I passed in the values in Radians - now it's pretty much the same as the values obtained from Apple's Map app :-)

Extra update:

If you are using iOS4 or later then Apple provide some methods to do this so the same functionality would be achieved with:

``````-(double)kilometresBetweenPlace1:(CLLocationCoordinate2D) place1 andPlace2:(CLLocationCoordinate2D) place2 {

MKMapPoint  start, finish;

start = MKMapPointForCoordinate(place1);
finish = MKMapPointForCoordinate(place2);

return MKMetersBetweenMapPoints(start, finish) / 1000;
}
``````
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thank you Stephen –  Tuyen Nguyen Oct 11 '11 at 15:47

Here is a java implementation of the Haversine formula.

``````public final static double AVERAGE_RADIUS_OF_EARTH = 6371;
public int calculateDistance(double userLat, double userLng, double venueLat, double venueLng) {

double latDistance = Math.toRadians(userLat - venueLat);
double lngDistance = Math.toRadians(userLng - venueLng);

double a = (Math.sin(latDistance / 2) * Math.sin(latDistance / 2)) +
(Math.sin(lngDistance / 2)) *
(Math.sin(lngDistance / 2));

double c = 2 * Math.atan2(Math.sqrt(a), Math.sqrt(1 - a));

}
``````

Note that here we are rounding the answer to the nearest km.

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Dude, you have a constant that's not defined here. –  Rob Jun 25 '13 at 3:33

On an ellipsoidal model of the earth, you want Vincenty's formulae. A Google search will return a lot of hits. One of them is at Geoscience Australia.

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Unless you use a method like Vincenty's your results will be approximate. –  Stonetip Mar 8 '11 at 18:41
FYI, this error can be pretty significant if you aren't careful. I was getting errors of 4-10KM on 60-80KM distances using this formula vs. a more accurate method (using the calc at the NGS site as a reference - ngs.noaa.gov/cgi-bin/Inv_Fwd/inverse2.prl) –  Brandon Dec 28 '11 at 21:42

I post here my working example.

List all points in table having distance between a designated point (we use a random point - lat:45.20327, long:23.7806) less than 50 KM, with latitude & longitude, in MySQL (the table fields are coord_lat and coord_long):

List all having DISTANCE<50, in Kilometres (considered Earth radius 6371 KM):

``````SELECT denumire, (6371 * acos( cos( radians(45.20327) ) * cos( radians( coord_lat ) ) * cos( radians( 23.7806 ) - radians(coord_long) ) + sin( radians(45.20327) ) * sin( radians(coord_lat) ) )) AS distanta
FROM obiective
WHERE coord_lat<>''
AND coord_long<>''
HAVING distanta<50
ORDER BY distanta desc
``````

The above example was tested in MySQL 5.0.95 and 5.5.16 (Linux).

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this is a simple PHP function that will give a very reasonable approximation (under +/-1% error margin).

``````<?php function distance(\$lat1, \$lon1, \$lat2, \$lon2) {

\$pi80 = M_PI / 180;
\$lat1 *= \$pi80;
\$lon1 *= \$pi80;
\$lat2 *= \$pi80;
\$lon2 *= \$pi80;

\$r = 6372.797; // mean radius of Earth in km
\$dlat = \$lat2 - \$lat1;
\$dlon = \$lon2 - \$lon1;
\$a = sin(\$dlat / 2) * sin(\$dlat / 2) + cos(\$lat1) * cos(\$lat2) * sin(\$dlon / 2) * sin(\$dlon / 2);
\$c = 2 * atan2(sqrt(\$a), sqrt(1 - \$a));
\$km = \$r * \$c;

//echo '<br/>'.\$km;
return \$km;

}
?>
``````

as said before: the earth is NOT a sphere. it is like an old, old baseball that mark mcguire decided to practice with - it is full of dents and bumps. the simpler calculations (like this) treat it like a sphere.

different methods may be more or less precise according to where you are on this irregular ovoid AND how far apart your points are (the closer they are, the smaller the absolute error margin). the more precise your expectation, the more complex the math.

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You can use the build in CLLocationDistance to calculate this:

``````CLLocation *location1 = [[CLLocation alloc] initWithLatitude:latitude1 longitude:longitude1];
CLLocation *location2 = [[CLLocation alloc] initWithLatitude:latitude2 longitude:longitude2];
[self distanceInMetersFromLocation:location1 toLocation:location2]

- (int)distanceInMetersFromLocation:(CLLocation*)location1 toLocation:(CLLocation*)location2 {
CLLocationDistance distanceInMeters = [location1 distanceFromLocation:location2];
return distanceInMeters;
}
``````

In your case if you want kilometers just divide by 1000.

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It rather depends how accurate you want to be and what datum the lat and long are defined on. Very, very approximately you do a little spherical trig, but correcting for the fact that the earth is not a sphere makes the formulae more complicated.

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To calculate the distance between two points on a sphere you need to do the Great Circle calculation.

There are a number of C/C++ libraries to help with map projection at MapTools if you need to reproject your distances to a flat surface. To do this you will need the projection string of the various coordinate systems.

You may also find MapWindow a useful tool to visualise the points. Also as its open source its a useful guide to how to use the proj.dll library, which appears to be the core open source projection library.

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So modified the above procedure to call toRad method-

``````toRad(lat2-lat1)

``````

``````//degrees to radians
{
}
``````
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Here's an online calculator to do what you want. The code is client-side JavaScript, so you can view the source.

Here's an explanation of the math if you want to do it yourself.

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this online calculator does not work properly. i have just applied: -23.645, -46.6307 | -23.6385, -46.6302 which is under 1km and i got 64 km as an answer. so i downvoted, please consider removing this answer. –  tony gil Jun 24 '12 at 13:51

I condensed the computation down by simplifying the formula.

Here it is in Ruby:

``````include Math
radians = lambda { |deg| deg * PI / 180 }

# from/to = { :lat => (latitude_in_degrees), :lng => (longitude_in_degrees) }
def haversine_distance(from, to)
cosines_product = cos(to[:lat]) * cos(from[:lat]) * cos(from[:lng] - to[:lng])
sines_product = sin(to[:lat]) * sin(from[:lat])
return earth_radius_mi * acos(cosines_product + sines_product)
end
``````
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I needed to calculate a lot of distances between the points for my project, so I went ahead and tried to optimize the code, I have found here. On average in different browsers my new implementation runs 2 times faster then the most upvoted answer.

``````function distance(lat1, lon1, lat2, lon2) {
var R = 6371;
var a =
0.5 - Math.cos((lat2 - lat1) * Math.PI / 180)/2 +
Math.cos(lat1 * Math.PI / 180) * Math.cos(lat2 * Math.PI / 180) *
(1 - Math.cos((lon2 - lon1) * Math.PI / 180))/2;

return R * 2 * Math.asin(Math.sqrt(a));
}
``````

You can play with my jsPerf and see the results here.

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1st off thanks for tool jsperf.com and your advice –  Maxim Shoustin Feb 9 at 12:40
glad that I was able to help –  Salvador Dali Feb 9 at 12:42

Here is my java implementation for calculation distance via decimal degrees after some search. I used mean radius of world (from wikipedia) in km. İf you want result miles then use world radius in miles.

``````public static double distanceLatLong2(double lat1, double lng1, double lat2, double lng2)
{
double earthRadius = 6371.0d; // KM: use mile here if you want mile result

double dLat = toRadian(lat2 - lat1);
double dLng = toRadian(lng2 - lng1);

double a = Math.pow(Math.sin(dLat/2), 2)  +
Math.pow(Math.sin(dLng/2), 2);

double c = 2 * Math.atan2(Math.sqrt(a), Math.sqrt(1-a));

return earthRadius * c; // returns result kilometers
}

{
return (degrees * Math.PI) / 180.0d;
}
``````
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Thanks to the spherical nature of the earth the standard distance formula cannot be used. However, spherical geometry works well for this. The following article has a write up of exactly how to perform this operation. http://www.meridianworlddata.com/Distance-Calculation.asp

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LatLongLib is a library that provide the basic operations to deal with Latitude longitude points this post might help you

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I've used the above Haversine formula to implement a ruler for Google Maps v3. Here it is: http://www.barattalo.it/2009/12/19/ruler-for-google-maps-v3-to-measure-distance-on-map/ Thank you!

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Here's a simple javascript function that may be useful from this link.. somehow related but we're using google earth javascript plugin instead of maps

``````function getApproximateDistanceUnits(point1, point2) {

var xs = 0;
var ys = 0;

xs = point2.getX() - point1.getX();
xs = xs * xs;

ys = point2.getY() - point1.getY();
ys = ys * ys;

return Math.sqrt(xs + ys);
}
``````

The units tho are not in distance but in terms of a ratio relative to your coordinates. There are other computations related you can substitute for the getApproximateDistanceUnits function link here

Then I use this function to see if a latitude longitude is within the radius

``````function isMapPlacemarkInRadius(point1, point2, radi) {
if (point1 && point2) {
} else {
return 0;
}
}
``````

point may be defined as

`````` \$\$.getPoint = function(lati, longi) {
var location = {
x: 0,
y: 0,
getX: function() { return location.x; },
getY: function() { return location.y; }
};
location.x = lati;
location.y = longi;

return location;
};
``````

then you can do your thing to see if a point is within a region with a radius say:

`````` //put it on the map if within the range of a specified radi assuming 100,000,000 units
var iconpoint = Map.getPoint(pp.latitude, pp.longitude);
var centerpoint = Map.getPoint(Settings.CenterLatitude, Settings.CenterLongitude);

//approx ~200 units to show only half of the globe from the default center radius
}
else {
otherSidePlacemarks.push({
latitude: pp.latitude,
longitude: pp.longitude,
name: pp.name
});

}
``````
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Here is the implementation VB.NET, this implementation will give you the result in KM or Miles based on an Enum value you pass.

``````Public Enum DistanceType
Miles
KiloMeters
End Enum

Public Structure Position
Public Latitude As Double
Public Longitude As Double
End Structure

Public Class Haversine

Public Function Distance(Pos1 As Position,
Pos2 As Position,
DistType As DistanceType) As Double

Dim R As Double = If((DistType = DistanceType.Miles), 3960, 6371)

Dim dLat As Double = Me.toRadian(Pos2.Latitude - Pos1.Latitude)

Dim dLon As Double = Me.toRadian(Pos2.Longitude - Pos1.Longitude)

Dim a As Double = Math.Sin(dLat / 2) * Math.Sin(dLat / 2) + Math.Cos(Me.toRadian(Pos1.Latitude)) * Math.Cos(Me.toRadian(Pos2.Latitude)) * Math.Sin(dLon / 2) * Math.Sin(dLon / 2)

Dim c As Double = 2 * Math.Asin(Math.Min(1, Math.Sqrt(a)))

Dim result As Double = R * c

Return result

End Function

Private Function toRadian(val As Double) As Double

Return (Math.PI / 180) * val

End Function

End Class
``````
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This site may give you some suggestions and you can calculate the distance between two points on that site.

Another tool you can use is Google Earth, you can use the ruler in Google Earth to calculate the distance.

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The haversine is definitely a good formula for probably most cases, other answers already include it so I am not going to take the space. But it is important to note that no matter what formula is used (yes not just one). Because of the huge range of accuracy possible as well as the computation time required. The choice of formula requires a bit more thought than a simple no brainer answer.

This posting from a person at nasa, is the best one I found at discussing the options

http://www.cs.nyu.edu/visual/home/proj/tiger/gisfaq.html

For example, if you are just sorting rows by distance in a 100 miles radius. The flat earth formula will be much faster than the haversine.

``````HalfPi = 1.5707963;
R = 3956; /* the radius gives you the measurement unit*/

u = a * a + b * b;
v = - 2 * a * b * cos(longdestrad - longoriginrad);
c = sqrt(abs(u + v));
return R * c;
``````

Notice there is just one cosine and one square root. Vs 9 of them on the Haversine formula.

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``````function getDistanceFromLatLonInKm(lat1,lon1,lat2,lon2,units) {
var R = 6371; // Radius of the earth in 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;
var miles = d / 1.609344;

if ( units == 'km' ) {
return d;
} else {
return miles;
}}
``````

Chuck's solution, valid for miles also.

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there is a good example in here to calculate distance with PHP http://www.geodatasource.com/developers/php :

`````` function distance(\$lat1, \$lon1, \$lat2, \$lon2, \$unit) {

\$theta = \$lon1 - \$lon2;
\$dist = acos(\$dist);
\$miles = \$dist * 60 * 1.1515;
\$unit = strtoupper(\$unit);

if (\$unit == "K") {
return (\$miles * 1.609344);
} else if (\$unit == "N") {
return (\$miles * 0.8684);
} else {
return \$miles;
}
}
``````
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