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tetragons

Tetragons, also known as quadrilaterals, are planar geometric figures bounded by four straight sides and four interior angles. In Euclidean geometry the sum of these interior angles always equals 360°, a property that distinguishes tetragons from polygons with a different number of sides. The term tetragon derives from the Greek words “tetra,” meaning four, and “gon,” meaning angle.

Classification of tetragons depends on side length, angle measure, and symmetry. Common subclasses include squares (four

Key theorems concerning tetragons include the Varignon theorem, which states that connecting the midpoints of a

Historically, studies of tetragons appear in Euclid’s Elements and later in the work of Arab mathematicians

In non‑Euclidean geometries the angle sum of a tetragon may differ from 360°, reflecting the curvature of

equal
sides
and
right
angles),
rectangles
(opposite
sides
equal
and
right
angles),
rhombuses
(all
sides
equal
but
angles
not
necessarily
right),
and
general
convex
quadrilaterals
where
no
sides
or
angles
are
equal.
Concave
tetragons
have
one
interior
angle
greater
than
180°,
while
self‑intersecting
forms
such
as
crossed
quadrilaterals
(also
called
bow‑ties)
are
non‑simple.
quadrilateral’s
sides
yields
a
parallelogram,
and
Brahmagupta’s
formula
for
the
area
of
cyclic
quadrilaterals,
those
that
can
be
inscribed
in
a
circle.
A
quadrilateral
is
cyclic
if
and
only
if
opposite
angles
sum
to
180°.
The
existence
of
a
unique
incircle
(tangential
quadrilateral)
requires
the
sums
of
lengths
of
opposite
sides
to
be
equal.
such
as
al‑Kashi.
Modern
applications
range
from
computer
graphics,
where
quadrilateral
meshes
approximate
surfaces,
to
architectural
design,
where
the
structural
properties
of
quadrilateral
panels
inform
material
selection.
the
underlying
space.
Nonetheless,
the
term
“tetragon”
remains
a
fundamental
concept
across
mathematical
disciplines,
providing
a
basis
for
exploring
more
complex
polygonal
and
polyhedral
structures.