How to find center point of two latitude longitude? [duplicate]

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I have two latitude, longitude, now how i can find the center latitude,longitude of that two latitude longitude. Can anybody help me?

marked as duplicate by Dipesh Parmar, hjpotter92, davidcesarino, madth3, doctorlessMar 22 '13 at 2:22

• Which projection are you using? – sectus Mar 21 '13 at 11:04
• This is quite simple just add the both lat and divide by 2 and similar to longitude add both and divide by 2. – Code Lღver Mar 21 '13 at 11:06
• You can use search for example ;) answer – Denis O. Mar 21 '13 at 11:06

Define what is 'center' for you. Mostly, i use simple average. Better solution is to compute two vectors (from center of the earth), add them and normalize result. Calculate the center point of multiple latitude/longitude coordinate pairs

Also, be careful about longitudes. The midpoint between two points at 170° E and 170° W should be at 180° E (or W), but you may end up with 0° E.

Download Map Projections: A Working Manual, by John P. Snyder, from the USGS. http://pubs.er.usgs.gov/publication/pp1395. It's free.

Convert your latitudes and longitudes to radians, then

\$deltaLongitude = \$endPointLongitude - \$startPointlongitude;

\$xModified = cos(\$endPointLatitude) * cos(\$deltaLongitude);
\$yModified = cos(\$endPointLatitude) * sin(\$deltaLongitude);

\$midpointLatitude = atan2(
sin(\$startPointlatitude) + sin(\$endPointLatitude),
sqrt((cos(\$startPointLatitude) + \$xModified) * (cos(\$startPointLatitude) + \$xModified) +
\$yModified * \$yModified
)
);
\$midpointLongitude = \$startPointLongitude +
atan2(\$yModified,
cos(\$startPointLatitude) + \$xModified
);
• Clearly I'm wrong from the downvote: anybody care to explain so that I can learn from the gurus as well – Mark Baker Mar 21 '13 at 11:15
• +1 for having a stab at it. I think (without trying to get a headache) it is down to Riemannian circle - Now the heady duty maths come into play. – Ed Heal Mar 21 '13 at 11:23
• Thanks, looks like more reading (and heavy math) – Mark Baker Mar 21 '13 at 11:26
• Here is a reference en.wikipedia.org/wiki/Great_circles – Ed Heal Mar 21 '13 at 11:49