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Is there a simple calculation I can do which will convert km into a value which I can add to a lat or lon float to calculate a bounding box for searches? It doesn't need to be completely accurate.

For instance: if I were given a lat/lon for London, England (51.5001524, -0.1262362) and I wanted calculate what the lat would be 25km east/west from that point, and what the lon would be 25km north/south of that point, what would I need to do to convert the 25km into a decimal to add to the values above?

I'm looking for a general rule-of-thumb, ie: 1km == +/- 0.XXX


My original search for "lat lon" didn't return this result:


The accepted answer seems adequate for my requirements.

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4 Answers 4

up vote 46 down vote accepted

The approximate conversions are:

Latitude: 1 deg = 110.54 km

Longitude: 1 deg = 111.320*cos(latitude) km

This doesn't fully correct for the Earth's polar flattening -- for that you'd probably want a more complicated formula using the WGS84 reference ellipsoid (the model used for GPS). But the error is probably negligible for your purposes.

Source: http://en.wikipedia.org/wiki/Latitude

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Do you mean cos(longitude) in the second formula? –  Odys Jul 8 at 11:52
How did you came up with this? I'm missing something, can you please elaborate on the Longitude calculations? Ty –  Odys Jul 8 at 11:59
@Odys: If you're comparing two points that lie on the same line of longitude (north/south), they lie on a great circle and the conversion factor is just the Earth's polar circumference divided by 360 degrees. But it's different for east-west measurements, because (except for the equator) you're not measuring along a "great circle", so the "circumference" at a given latitude is smaller. And the correction factor turns out to be the cosine of the latitude. –  Jim Lewis Jul 8 at 16:02
My explanation: cos(0°) = 1 => Therefore there is no correction factor applied doing the calculation at the equator. The longitudes are the widest there. cos(90°) = 0 => At the poles the longitudes meet in one point. There is no distance to be calculated. –  Jenny O'Reilly Sep 24 at 9:39

in that page there are some useful calculations..


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It depends on where you are:


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I think that site's down/gone. –  Adrian Mouat Aug 8 '13 at 8:14

If you're using Java, Javascript or PHP, then there's a library that will do these calculations exactly, using some amusingly complicated (but still fast) trigonometry:


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