In geometry, a nonagon (or enneagon ) is a nine-sided polygon or 9-gon.
The name "nonagon" is a prefix hybrid formation, from Latin (nonus, "ninth" + gonon), used equivalently, attested already in the 16th century in French nonogone and in English from the 17th century. The name "enneagon" comes from Greek enneagonon (?????, "nine" + ????? (from ????? = "corner")), and is arguably more correct, though somewhat less common than "nonagon".
Video Nonagon
Regular nonagon
A regular nonagon is represented by Schläfli symbol {9} and has internal angles of 140°. The area of a regular nonagon of side length a is given by
where the radius r of the inscribed circle of the regular nonagon is
and where R is the radius of its circumscribed circle:
Maps Nonagon
Construction
Although a regular nonagon is not constructible with compass and straightedge (as 9 = 32, which is not a product of distinct Fermat primes), there are very old methods of construction that produce very close approximations.
It can be also constructed using neusis, or by allowing the use of an angle trisector.
The following is an approximate construction of a nonagon using a straightedge and compass.
Example to illustrate the error, when the constructed central angle is 39.99906°:
At a circumscribed circle radius r = 100 m, the absolute error of the 1st side would be approximately 1.6 mm.
Another two animations of an approximate construction
- Downsize the angle JMK (also 60°) with four bisections of angle and make a thirds of circular arc MON with an approximate solution between bisections of angle w3 and w4.
- Straight auxiliary line g aims over the point O to the point N (virtually a ruler at the points O and N applied), between O and N, therefore no auxiliary line.
- Thus, the circular arc MON is freely accessible for the later intersection point R.
- RMK = 40.0000000052441...°
- 360° ÷ 9 = 40°
- RMK - 40° = 5.2...E-9°
- Example to illustrate the error:
- At a circumscribed circle radius
- r = 100,000 km, the absolute error of the 1st side would be approximately 8.6 mm.
See also the calculation (Berechnung, German).
Symmetry
The regular enneagon has Dih9 symmetry, order 18. There are 2 subgroup dihedral symmetries: Dih3 and Dih1, and 3 cyclic group symmetries: Z9, Z3, and Z1.
These 6 symmetries can be seen in 6 distinct symmetries on the enneagon. John Conway labels these by a letter and group order. Full symmetry of the regular form is r18 and no symmetry is labeled a1. The dihedral symmetries are divided depending on whether they pass through vertices (d for diagonal) or edges (p for perpendiculars), and i when reflection lines path through both edges and vertices. Cyclic symmetries in the middle column are labeled as g for their central gyration orders.
Each subgroup symmetry allows one or more degrees of freedom for irregular forms. Only the g9 subgroup has no degrees of freedom but can seen as directed edges.
Tilings
The regular enneagon can tessellate the euclidean tiling with gaps. These gaps can be filled with regular hexagons and isosceles triangles. In the notation of symmetrohedron this tiling is called H(*;3;*;[2]) with H representing *632 hexagonal symmetry in the plane.
Graphs
The K9 complete graph is often drawn as a regular enneagon with all 36 edges connected. This graph also represents an orthographic projection of the 9 vertices and 36 edges of the 8-simplex.
Pop culture references
They Might Be Giants have a song entitled "Nonagon" on their children's album Here Come the 123s. It refers to both an attendee at a party at which "everybody in the party is a many-sided polygon" and a dance they perform at this party. Slipknot's logo is also a version of a nonagon, being a nine-pointed star made of three triangles. King Gizzard & the Lizard Wizard have an album titled 'Nonagon Infinity', the album art featuring a nonagonal complete graph.
Architecture
Temples of the Baha'i Faith are required to be nonagonal.
The U.S. Steel Tower is an irregular nonagon.
See also
- Enneagram (nonagram)
- Trisection of the angle 60°, Proximity construction
References
- Weisstein, Eric W. "Nonagon". MathWorld.
External links
- Properties of a Nonagon (with interactive animation)
Source of the article : Wikipedia