Lune (geometry)

In plane geometry, a lune is the concave-convex region bounded by two circular arcs. It has one boundary portion for which the connecting segment of any two nearby points moves outside the region and another boundary portion for which the connecting segment of any two nearby points lies entirely inside the region. A convex-convex region is termed a lens.
Formally, a lune is the relative complement of one disk in another. Alternatively, if and are disks, then is a lune.

Squaring the lune

In the 5th century BC, Hippocrates of Chios showed that the Lune of Hippocrates and two other lunes could be exactly squared by straightedge and compass. Around 1000, Alhazen attempted to square a circle using a pair
of lunes now bearing his name. In 1766 the Finnish mathematician Daniel Wijnquist, quoting Daniel Bernoulli, listed all five geometrical squareable lunes, adding to those known by Hippocrates. In 1771 Leonhard Euler gave a general approach and obtained a certain equation to the problem. In 1933 and 1947 it was proven by Nikolai Chebotaryov and his student Anatoly Dorodnov that these five are the only squarable lunes.

Area

The area of a lune formed by circles of radii a and b with distance c between their centers is
where is the inverse cosine or arccosine, and where
is the area of a triangle with sides a, b and c.