# Given a lat/lng coordinate, calculate the min and max lat/lng values for a 10 km area

Lets say I have a lat lng coordinate and I want to place that at the center of a square that is 10km wide and then get the minimum lat/lng and maximum lat/lng.

Is there an easy way to do this that already exists?

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How precise do you need the coordinates - just good enough for display, or for full-on GIS stuff? – Rup May 1 '12 at 13:46
It doesn't need to be hugely accurate - if its off by a km or two then that's fine. – Ger May 1 '12 at 13:48

If it doesn't need to be exact, it is pretty easy:

For the latitude, 1 km is 0.009 degrees (follows from the original definition of meter). Since your square is 5 km around the center, you just need to add and subtract 0.045 degrees from the center point.

For the longitude, it is slightly more complicated: Divide the above value with the cosine of the latitude.

In code:

``````lat_min = lat_center - 0.045;
lat_max = lat_center + 0.045;
long_min = long_center - (0.045 / Math.cos(lat_center*Math.PI/180);
long_max = long_center + (0.045 / Math.cos(lat_center*Math.PI/180);
``````

(`Math.PI/180` is needed to convert from degrees to radians).

Beware: Does not work around the poles.

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How is the square oriented? Parallel to the equator? If so, then just do a bearing of 45 deg, 5km * sqrt(2) distance from your lat/lon to get the upper right corner. Similar for the bottom left, use a bearing of 225 deg.

See Destination point given distance and bearing from start point at http://www.movable-type.co.uk/scripts/latlong.html

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You mean 10 * sqrt(2) distance? Yes, that's what I meant in my comment about how accurately he needs this. In practice though the actual max/min lat/longs are going to vary at each corner - the max longitude value is actually going to be at bearing 135, but if you're approximating it to a square rather for display there's probably nothing in it. – Rup May 2 '12 at 13:17
Technically, it should be 5 * sqrt(2) if the square is 10km wide. If you want the other corners, just add 90 deg to the bearings above. – TreyA May 2 '12 at 15:32
D'oh, yes, true. – Rup May 2 '12 at 15:36