# Formulas in Azimuthal Equidistant Projection

Given a location(lat,lng), I want to get its coordinate in an Azimuthal Equidistant Projection. The formulas are explained here.

Below is the screenshot of the web page.

at the end of that page, it states

It looks like given any location (lat [-Pi/2, +Pi/2], lng [0, +2Pi)), and the center of the projection (latCenter, lngCenter), I can calculate its coordinate (x, y) in the map, and since no map Radius is provided, the value of x and y will fall in the range of [-1, +1] or [-Pi, +Pi].

My question is, what is the c in the formulas? If it is a value calculated from (x, y), how can it be used to calculate (x, y)?

Can somebody help me understand these formulas?

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Use equation 4 to compute `c` when projecting from lat/long to x,y. Equation 7 is for computing the inverse, ie going from x,y to lat/long. For your purposes, making a map, ignore equation 7.

`c` is the angle subtended at the centre of the Earth by the arc of the great circle from the centre of the projection (phi0, lambda0) to another point (phi, lambda).

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As you don't state the programming language you're working with here is an implementation in F# from a recent blogpost.

``````open System
module AzimuthalEquidistantProjection =

let inline degToRad d = 0.0174532925199433 * d; // (1.0/180.0 * Math.PI) * d

let project centerlon centerlat lon lat =
// http://mathworld.wolfram.com/AzimuthalEquidistantProjection.html