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In a system level programming language like C, C++ or D, what is the best type/encoding for storing latitude and longitude?

The options I see are:

  • IEEE-754 FP as degrees or radians
  • degrees or radians stored as a fixed point value in an 32 or 64 bit int
  • mapping of an integer range to the degree range: -> deg = (360/2^32)*val
  • degrees, minutes, seconds and fractional seconds stored as bit fields in an int
  • a struct of some kind.

The easy solution (FP) has the major down side that it has highly non uniform resolution (somewhere in England it can measure in microns, over in Japan, it can't). Also this has all the issues of FP comparison and whatnot. The other options require extra effort in different parts of the data's life cycle. (generation, presentation, calculations etc.)

One interesting option is a floating precision type that where as the Latitude increase it gets more bits and the Longitude gets less (as they get closer together towards the poles).

Related questions that don't quite cover this:

BTW: 32 bits gives you an E/W resolution at the equator of about 0.3 in. This is close to the scale that high grade GPS setups can work at (IIRC they can get down to about 0.5 in in some modes).

OTOH if the 32 bits is uniformly distributed over the earth's surface, you can index squares of about 344m on a side, 5 Bytes give 21m, 6B->1.3m and 8B->5mm.

I don't have a specific use in mind right now but have worked with this kind of thing before and expect to again, at some point.

share|improve this question
You've noted in a couple of answer comments and in this question the issue of resolution. What resolution do you require? It'd also be worth stating what operations you need to perform as well. If you're going to be doing Great Circle calcs then you'll need to convert to a double/float anyway. – cletus Dec 21 '08 at 23:26
Isn't a 64-bit double precision floating point value a better choice than the 32 bit int because it has a greater granularity? This is something you've commented on. It's also way easier to work with. – cletus Dec 22 '08 at 2:08

11 Answers 11

The easiest way is just to store it as a float/double in degrees. Positive for N and E, negative for S and W. Just remember that minutes and seconds are out of 60 (so 31 45'N is 31.75). Its easy to understand what the values are by looking at them and, where necessary, conversion to radians is trivial.

Calculations on latitudes and longitudes such as the Great Circle distance between two coordinates rely heavily on trigonometric functions, which typically use doubles. Any other format is going to rely on another implementation of sine, cosine, atan2 and square root, at a minimum. Arbitrary precision numbers (eg BigDecimal in Java) won't work for this. Something like the int where 2^32 is spread uniformly is going to have similar issues.

The point of uniformity has come up in several comments. On this I shall simply note that the Earth, with respect to longitude, isn't uniform. One arc-second longitude at the Arctic Circle is a shorter distance than at the Equator. Double precision floats give sub-millimetre precision anywhere on Earth. Is this not sufficient? If not, why not?

It'd also be worth noting what you want to do with that information as the types of calculations you require will have an impact on what storage format you use.

share|improve this answer
a valid point, but not addressing what I was hoping to have addressed. – BCS Dec 21 '08 at 23:18
this answer is what I would have given also - think you need to clarify your question if it does not answer it. – frankodwyer Dec 21 '08 at 23:29
I agree that this answers the question as asked. Most commercial systems that I've used employ FP degrees or radians internally. The lack or uniformity is a function of the definitions of lattitude and longitude, not the way they're stored. – Ken Paul Dec 22 '08 at 0:28
Do not forget that the math functions in C (and most languages) expect arguments in radians. Any system storing the value in degrees will need to convert to radians before using the math functions. That doesn't mean that storing in degrees is wrong; indeed, it is probably best. But be aware. – Jonathan Leffler Dec 22 '08 at 1:01

Longitudes and latitudes are not generally known to any greater precision than a 32-bit float. So if you're concerned about storage space, you can use floats. But in general it's more convenient to work with numbers as doubles.

Radians are more convenient for theoretical math. (For example, the derivative of sine is cosine only when you use radians.) But degrees are typically more familiar and easier for people to interpret, so you might want to stick with degrees.

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a valid point, but not addressing what I was hoping to have addressed. (I've edited the question to clarify) – BCS Dec 21 '08 at 23:19
What resolution do you require? – cletus Dec 21 '08 at 23:25
@cletus, Uniform resolution is more of interest than high resolution but 32 bits uniformly spread is within an order of magnitude of anything I see needing. – BCS Dec 21 '08 at 23:29
Bear in mind that when it comes to longitude at least, the earth isn't uniform. 1 second of longitude at the Arctic Circle is a different distance than at the Equator. Why do you want/need uniformity? – cletus Dec 21 '08 at 23:31
FP works because most of the time the resolution that number is known to is proportional to it's magnitude. for Lat/Long the the zero point is totally arbitrary so that proportionality is not there. It seems bad to use n-bits and then in some places burn some of them for useless resolution. – BCS Dec 21 '08 at 23:38

A Decimal representation with precision of 8 should be more than enough according to this wikipedia article on Decimal Degrees.

0 decimal places, 1.0 = 111 km
7 decimal places, 0.0000001 = 1.11 cm
8 decimal places, 0.00000001 = 1.11 mm
share|improve this answer
log_2(365*10^8) ~= 35 therefor that takes ~70 bits, round to bytes: 9 bytes. Uniformly distributed, 9 bytes can resolve to regions of 0.1 mm^2. – BCS Jan 30 '12 at 15:53

0.3 inch resolution is getting down to the point where earthquakes over a few years make a difference. You may want to reconsider why you believe you need such fine resolution worldwide.

Some of the spreading centres in the Pacific Ocean change by as much as 15 cm/year.

share|improve this answer
0.3in is for uniform cases. with a 32bit FP who known what you get as lots (most?) of values are no longer valid. – BCS Dec 21 '08 at 23:41

Might the problems you mentioned with floating point values become an issue? If the answer is no, I'd suggest just using the radians value in double precision - you'll need it if you'll be doing trigonometric calculations anyway.

If there might be an issue with precision loss when using doubles or you won't be doing trigonometry, I'd suggest your solution of mapping to an integer range - this will give you the best resolution, can easily be converted to whatever display format you're locale will be using and - after choosing an appropriate 0-meridian - can be used to convert to floating point values of high precision.

PS: I've always wondered why there seems to be no one who uses geocentric spherical coordinates - they should be reasonably close to the geographical coordinates, and won't require all this fancy math on spheroids to do computations; for fun, I wanted to convert Gauss-Krüger-Koordinaten (which are in use by the German Katasteramt) to GPS coordinates - let me tell you, that was ugly: one uses the Bessel ellipsoid, the other WGS84, and the Gauss-Krüger mapping itself is pretty crazy on it's own...

share|improve this answer
For "fun"?! Sicko! :-) – cletus Dec 21 '08 at 23:51
I have no idea what you said. So +1 – Greg Dean Dec 21 '08 at 23:51
@Greg: Gauss-Krüger coordinates are derived from cylinder projections but 'enhanced' so that you get meaningful results when using your ruler on a map (for certain values of 'meaningful' ;)). It all began when I thought: hey, this shouldn't be too complicated... – Christoph Dec 22 '08 at 0:04

If by "storing" you mean "holding in memory", the real question is: what are you going to do with them?

I suspect that before these coordinates do anything interesting, they will have been funnelled as radians through the functions in math.h. Unless you plan on implementing quite a few transcendental functions that operate on Deg/Min/Secs packed into a bit field.

So why not keep things simple and just store them in IEEE-754 degrees or radians at the precision of your requirements?

share|improve this answer
For in memory, yah, not much will beat IEEE. On the other hand If you are storing lots of points (say high resolution vector maps) on disk or shipping them across a wire... – BCS Oct 1 '09 at 19:31

What encoding is "best" really depends on your goals/requirements.

If you are performing arithmetic, floating point latitude,longitude is often quite convenient. Other times cartesian coordinates (ie x,y,z) can be more convenient. For example, if you only cared about points on the surface of earth, you could use an n-vector.

As for longer term storage, IEEE floating point will waste bits for ranges you don't care about (for lat/lon) or for precision you may not care about in the case of cartesian coordinates (unless you want very good precision at the origin for whatever reason). You can of course map either type of coordinates to ints of your preferred size, such that the entire range of said ints covers the range you are interested in at the resolution you care about.

There are of course other things to think about than merely not wasting bits in the encoding. For example, (Geohashes)[] have the nice property that it is easy to find other geohashes in the same area. (Most will have the same prefix, and you can compute the prefix the others will have.) Unfortunately, they maintain the same precision in degrees longitude near the equator as near the poles. I'm currently using 64-bit geohashes for storage, which gives about 3 m resolution at the equator.

The Maidenhead Locator System has some similar characteristics, but seems more optimized for communicating locations between humans rather than storing on a computer. (Storing MLS strings would waste a lot of bits for some rather trivial error detection.)

The one system I found that does handle the poles differently is the Military Grid Reference System, although it too seems more human-communications oriented. (And it seems like a pain to convert from or to lat/lon.)

Depending on what you want exactly, you could use something similar to the Universal polar sereographic coordinate system near the poles along with something more computationally sane than UTM for the rest of the world, and use at most one bit to indicate which of the two systems you're using. I say at most one bit, because it's unlikely most of the points you care about would be near the poles. For example, you could use "half a bit" by saying 11 indicates use of the polar system, while 00, 01, and 10 indicate use of the other system, and are part of the representation.

Sorry this is a bit long, but I wanted to save what I had learned recently. Sadly I have not found any standard, sane, and efficient way to represent a point on earth with uniform precision.

Edit: I found another approach which looks a lot more like what you wanted, since it more directly takes advantage of the lower precision needed for longitude closer to the poles. It turns out there is a lot of research on storing normal vectors. Encoding Normal Vectors using Optimized Spherical Coordinates describes such a system for encoding normal vectors while maintaining a minimum level of accuracy, but it could just as well be used for geographical coordinates.

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At the equator, an arc-second of longitude approximately equals an arc-second of latitude, which is 1/60th of a nautical mile (or 101.27 feet or 30.87 meters).

32-bit float contains 23 explicit bits of data.
180 * 3600 requires log2(648000) = 19.305634287546711769425914064259 bits of data. Note that sign bit is stored separately and therefore we need to amount only for 180 degrees.
After subtracting from 23 the bits for log2(648000) we have remaining extra 3.694365712453288230574085935741 bits for sub-second data.
That is 2 ^ 3.694365712453288230574085935741 = 12.945382716049382716049382716053 parts per second.
Therefore a float data type can have 30.87 / 12.945382716049382716049382716053 ~= 2.38 meters precision at equator.

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You can use decimal datatype:

  `latitude` decimal(18,15) DEFAULT NULL,
  `longitude` decimal(18,15) DEFAULT NULL 
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A Java program for comuting max rounding error in meters from casting lat/long values into Float/Double:

import java.util.*;
import java.lang.*;
import com.javadocmd.simplelatlng.*;
import com.javadocmd.simplelatlng.util.*;

public class MaxError {
  public static void main(String[] args) {
    Float flng = 180f;
    Float flat = 0f;
    LatLng fpos = new LatLng(flat, flng);
    double flatprime = Float.intBitsToFloat(Float.floatToIntBits(flat) ^ 1);
    double flngprime = Float.intBitsToFloat(Float.floatToIntBits(flng) ^ 1);
    LatLng fposprime = new LatLng(flatprime, flngprime);

    double fdistanceM = LatLngTool.distance(fpos, fposprime, LengthUnit.METER);
    System.out.println("Float max error (meters): " + fdistanceM);

    Double dlng = 180d;
    Double dlat = 0d;
    LatLng dpos = new LatLng(dlat, dlng);
    double dlatprime = Double.longBitsToDouble(Double.doubleToLongBits(dlat) ^ 1);
    double dlngprime = Double.longBitsToDouble(Double.doubleToLongBits(dlng) ^ 1);
    LatLng dposprime = new LatLng(dlatprime, dlngprime);

    double ddistanceM = LatLngTool.distance(dpos, dposprime, LengthUnit.METER);
    System.out.println("Double max error (meters): " + ddistanceM);


Float max error (meters): 1.7791213425235692
Double max error (meters): 0.11119508289500799
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The following code packs the WGS84 coordinates losslessly coordinates into an unsigned long (i.e. into 8 bytes):

using System;
using System.Collections.Generic;
using System.Text;

namespace Utils
    /// <summary>
    /// Lossless conversion of OSM coordinates to a simple long.
    /// </summary>
    unsafe class CoordinateStore
        private readonly double _lat, _lon;
        private readonly long _encoded;

        public CoordinateStore(double lon,double lat)
            // Ensure valid lat/lon
            if (lon < -180.0) lon = 180.0+(lon+180.0); else if (lon > 180.0) lon = -180.0 + (lon-180.0);
            if (lat < -90.0) lat = 90.0 + (lat + 90.0); else if (lat > 90.0) lat = -90.0 + (lat - 90.0);

            _lon = lon; _lat = lat;

            // Move to 0..(180/90)
            var dlon = (decimal)lon + 180m;
            var dlat = (decimal)lat + 90m;

            // Calculate grid
            var grid = (((int)dlat) * 360) + ((int)dlon);

            // Get local offset
            var ilon = (uint)((dlon - (int)(dlon))*10000000m);
            var ilat = (uint)((dlat - (int)(dlat))*10000000m);

            var encoded = new byte[8];
            fixed (byte* pEncoded = &encoded[0])
                ((ushort*)pEncoded)[0] = (ushort) grid;
                ((ushort*)pEncoded)[1] = (ushort)(ilon&0xFFFF);
                ((ushort*)pEncoded)[2] = (ushort)(ilat&0xFFFF);
                pEncoded[6] = (byte)((ilon >> 16)&0xFF);
                pEncoded[7] = (byte)((ilat >> 16)&0xFF);

                _encoded = ((long*) pEncoded)[0];

        public CoordinateStore(long source)
            // Extract grid and local offset
            int grid;
            decimal ilon, ilat;
            var encoded = new byte[8];
            fixed(byte *pEncoded = &encoded[0])
                ((long*) pEncoded)[0] = source;
                grid = ((ushort*) pEncoded)[0];
                ilon = ((ushort*)pEncoded)[1] + (((uint)pEncoded[6]) << 16);
                ilat = ((ushort*)pEncoded)[2] + (((uint)pEncoded[7]) << 16);

            // Recalculate 0..(180/90) coordinates
            var dlon = (uint)(grid % 360) + (ilon / 10000000m);
            var dlat = (uint)(grid / 360) + (ilat / 10000000m);

            // Returns to WGS84
            _lon = (double)(dlon - 180m);
            _lat = (double)(dlat - 90m);

        public double Lon { get { return _lon; } }
        public double Lat { get { return _lat; } }
        public long   Encoded { get { return _encoded; } }

        public static long PackCoord(double lon,double lat)
            return (new CoordinateStore(lon, lat)).Encoded;
        public static KeyValuePair<double, double> UnPackCoord(long coord)
            var tmp = new CoordinateStore(coord);
            return new KeyValuePair<double, double>(tmp.Lat,tmp.Lon);


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While this link may answer the question, it is better to include the essential parts of the answer here and provide the link for reference. Link-only answers can become invalid if the linked page changes. - From Review – Alistra Feb 23 at 8:48
Fixed, thank you. – Augustin Feb 23 at 8:55
You can't "losslessly" pack even the mantissas for the two doubles (104 bits) into 64 bits. Pigeonhole principle. – BCS Mar 1 at 16:13
@BCS: But GPS is not taking advantage of the full possible range of the doubles. – Augustin Mar 1 at 16:37
You didn't say anything about GPS. It might be true that the above preservers more accuracy than a typical GPS provides, but that's not what you said. -- Also note, that uniformly distributed, 8 bytes has a maximum precision over the earths surface of ~5mm, which is close to the ~10mm that is practically obtainable from high end GPS (and longer than what's obtainable via other tools). -- Also, I know GPS doesn't use the full range, that's why I only counted the mantissas bits. – BCS Mar 1 at 18:24

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