65537-gon

In geometry, a 65537-gon is a polygon with 65,537 sides. The sum of the interior angles of any non-self-intersecting is 11796300°.

Regular 65537-gon

The area of a regular is
The perimeter of a regular differs from that of the circumscribed circle by about 15 parts per billion.

Construction

The regular 65537-gon is of interest for being a constructible polygon: that is, it can be constructed using a compass and an unmarked straightedge. This is because 65,537 is a Fermat prime, being of the form 2^2ⁿ + 1.
Thus, the values and are 32768-degree algebraic numbers, and like any constructible numbers, they can be written in terms of square roots and no higher-order roots.
Although it was known to Carl Friedrich Gauss by 1801 that the regular 65537-gon was constructible, the first explicit construction of a regular 65537-gon was given by Johann Gustav Hermes. The construction is very complex; Hermes spent 10 years completing the 200-page manuscript. Another method involves the use of at most 1332 Carlyle circles, and the first stages of this method are pictured below. This method faces practical problems, as one of these Carlyle circles solves the quadratic equation x² + x − 16384 = 0.

Symmetry

The regular 65537-gon has D₆₅₅₃₇ symmetry, order 131074. Since 65537 is a prime number there is one subgroup with dihedral symmetry: D₁, and 2 cyclic group symmetries: Z₆₅₅₃₇, and Z₁.

65537-gram

A 65537-gram is a 65,537-sided star polygon. As 65,537 is prime, there are 32,767 regular forms generated by Schläfli symbols for all integers 2 ≤ n ≤ 32768 as.