Digon

Digon

• Dimensionality: 2
• Schläfli Symbol: '"`UNIQ--postMath-00000001-QINU`"'
• Symmetry: Digonal dihedral symmetry (D₂)

Subfacets

• Vertices: 2 points
• Edges: 2 line segments
• Faces: 1 digon

Hypervolumes

• Vertex Count: '"`UNIQ--postMath-00000002-QINU`"'
• Edge Length: '"`UNIQ--postMath-00000003-QINU`"'
• Surface Area: '"`UNIQ--postMath-00000004-QINU`"'

A digon is a two-dimensional polygon with two edges. In normal Euclidean space, it is degenerate, enclosing no area, but it can exist as a tiling of the circle.

In Euclidean space, it can be visualized as two line segments with shared endpoints.

Structure and Sections

Hypervolumes

• vertex count =${\displaystyle 2}$
• edge length =${\displaystyle 2 l}$
• surface area =${\displaystyle 0}$

Subfacets

• 1 null polytope (-1D)
• 2 points (0D)
• 2 line segments (1D)
• 1 digon (2D)

See Also

${\displaystyle \{0\}}$	${\displaystyle \{1\}}$	${\displaystyle \{2\}}$	${\displaystyle \{3\}}$	${\displaystyle \{4\}}$	${\displaystyle \{5\}}$	${\displaystyle \{\frac{5}{2}\}}$	${\displaystyle \{6\}}$	${\displaystyle \{7\}}$	${\displaystyle \{\frac{7}{2}\}}$	${\displaystyle \{\frac{7}{3}\}}$	${\displaystyle \{8\}}$	${\displaystyle \{\frac{8}{3}\}}$	${\displaystyle \{9\}}$	${\displaystyle \{\frac{9}{2}\}}$	${\displaystyle \{\frac{9}{4}\}}$	${\displaystyle \{10\}}$	${\displaystyle \{\frac{10}{3}\}}$	${\displaystyle \{11\}}$	${\displaystyle \{\frac{11}{2}\}}$	${\displaystyle \{\frac{11}{3}\}}$	${\displaystyle \{\frac{11}{4}\}}$	${\displaystyle \{\frac{11}{5}\}}$	${\displaystyle \{12\}}$	${\displaystyle \{\frac{12}{5}\}}$	${\displaystyle \{13\}}$	${\displaystyle \{\frac{13}{2}\}}$	${\displaystyle \{\frac{13}{3}\}}$	${\displaystyle \{\frac{13}{4}\}}$	${\displaystyle \{\frac{13}{5}\}}$	${\displaystyle \{\frac{13}{6}\}}$	${\displaystyle \{14\}}$	${\displaystyle \{\frac{14}{3}\}}$	${\displaystyle \{\frac{14}{5}\}}$	${\displaystyle \{15\}}$	${\displaystyle \{\frac{15}{2}\}}$	${\displaystyle \{\frac{15}{4}\}}$	${\displaystyle \{\frac{15}{7}\}}$	${\displaystyle \{16\}}$	${\displaystyle \{\frac{16}{3}\}}$	${\displaystyle \{\frac{16}{5}\}}$	${\displaystyle \{\frac{16}{7}\}}$	${\displaystyle \{17\}}$	${\displaystyle \{\frac{17}{2}\}}$	${\displaystyle \{\frac{17}{3}\}}$	${\displaystyle \{\frac{17}{4}\}}$	${\displaystyle \{\frac{17}{5}\}}$	${\displaystyle \{\frac{17}{6}\}}$	${\displaystyle \{\frac{17}{7}\}}$	${\displaystyle \{\frac{17}{8}\}}$	...	${\displaystyle \{\infty\}}$	${\displaystyle \{x\}}$	${\displaystyle \{\frac{\pi i}{\lambda}\}}$
Zerogon	Monogon	Digon	Triangle	Square	Pentagon	Pentagram	Hexagon	Heptagon	Heptagram	Great heptagram	Octagon	Octagram	Enneagon	Enneagram	Great enneagram	Decagon	Decagram	Hendecagon	Small hendecagram	Hendecagram	Great hendecagram	Grand hendecagram	Dodecagon	Dodecagram	Tridecagon	Small tridecagram	Tridecagram	Medial tridecagram	Great tridecagram	Grand tridecagram	Tetradecagon	Tetradecagram	Great tetradecagram	Pentadecagon	Small pentadecagram	Pentadecagram	Great pentadecagram	Hexadecagon	Small hexadecagram	Hexadecagram	Great hexadecagram	Heptadecagon	Tiny heptadecagram	Small heptadecagram	Heptadecagram	Medial heptadecagram	Great heptadecagram	Giant heptadecagram	Grand heptadecagram	...	Apeirogon	Failed star polygon (${\displaystyle x}$-gon)	Pseudogon (${\displaystyle \frac{\pi i}{\lambda}}$-gon)

Regular ${\displaystyle t_0 \{2\}}$	Rectified ${\displaystyle t_1 \{2\}}$	Truncated ${\displaystyle t_{0,1} \{2\}}$
Digon	Digon	Square

Regular ${\displaystyle t_0 \{1\}}$	Rectified ${\displaystyle t_1 \{1\}}$	Truncated ${\displaystyle t_{0,1} \{1\}}$
Monogon	Monogon	Digon