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Coordinate Conversion

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Haversine Formula

The Haversine formula can be used to find the shortest distance (great circle distance) between two points on the earth’s surface, given their latitude and longitude coordinates.

$$ d = 2r \cdot arcsin(\sqrt{sin^2(\frac{\varphi_2 - \varphi_1}{2}) + cos(\varphi_1)cos(\varphi_2)sin^2(\frac{\lambda_2 - \lambda_1}{2})}) $$

where:
\( d \) is the shortest (great circle) distance between the two points, in meters
\( r \) radius of the earth, in meters *(see below)
\( \varphi_1, \lambda_1 \) is the latitude and longitude of point 1, in radians
\( \varphi_2, \lambda_2 \) is the latitude and longitude of point 2, in radians

The typical value used for \( r \) is \( 6731 \times 10^3 m \), which is the mean radius of the earth.

The code for this formula in many different languages can be found at https://rosettacode.org/wiki/Haversine_formula.

You may also see this Haversine distance formula written as:

$$ a = sin^{2}(\frac{\varphi_2 - \varphi_1}{2}) + cos(\varphi_1) \cdot cos(\varphi_2) \cdot sin^{2}(\frac{\lambda_2 - \lambda_1}{2}) \\ c = 2 \cdot atan2(\sqrt{a}, \sqrt{1 - a}) \\ d = r \cdot c $$

where all the symbols have the same meaning as above

These two formulas are equivalent!

Bearing

This formula calculates the initial bearing, given a start and end co-ordinate.

$$ \theta = atan2(sin(\lambda_2 - \lambda_1) \cdot cos \varphi_2 \cdot cos \varphi_1 \cdot sin \varphi_2 - \\ sin \varphi_1 \cdot cos \varphi_2 \cdot cos(\lambda_2 - \lambda_1)) $$

where:
\( \theta \) is the initial bearing, in radians, from \( -\pi \) to \( +\pi \)
\( \varphi_1, \lambda_1 \) is the latitude and longitude of point 1, in radians
\( \varphi_2, \lambda_2 \) is the latitude and longitude of point 2, in radians

Note that this calculates the initial bearing, which is the bearing you would have to be pointing in at the first co-ordinate to travel to the second co-ordinate along a great circle (shortest path on the sphere). As you travel there, the bearing is likely to change (there are a few cases in where it wouldn’t change, one being if you were travelling exactly North).

Destination Coordinate Given Distance And Bearing From Start Coordinate

The following formula allows you to calculate a destination coordinate (lat/lon) if you know a starting coordinate (again, in lat/lon), ground distance (great circle distance) and initial bearing.

$$ \delta = \frac{d}{R} \\ p_{2,lat} = \arcsin(\sin p_{1,lat} \cdot \cos \delta + \cos p_{1,lat} \cdot \sin \delta \cdot \cos \theta ) \\ p_{2,lon} = p_{1,lon} + \arctan2(\sin \theta \cdot sin \delta \cdot \cos p_{1,lat}, \cos \delta - \sin p_{1,lat} \cdot \sin p_{2,lat}) $$

where:
\(\delta\) = angular distance, in radians
\(d\) = ground (great circle) distance between start coordinate and destination coordinate, in meters
\(R\) = radius of the earth, in meters \( (6871 \times 10^3m) \)
\(\theta\) = initial bearing from start to destination coordinate (clockwise from North), measured in radians
\(p_1\) = starting coordinate, latitude and longitude measured in radians
\(p_2\) = destination coordinate, latitude and longitude measured in radians

Note that \( p_{2,lon} \) depends on \( p_{2,lat} \), so you have to calculate the latitude of p2 before you can calculate the longitude.


Authors

Geoffrey Hunter

Dude making stuff.

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