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polyhedra

Polyhedra are three-dimensional solids bounded by polygonal faces, with straight edges and vertices. Each face is a polygon, and the surface is composed of a finite number of such faces. They can be convex or non-convex and may have various degrees of symmetry.

They are commonly classified as convex or non-convex and as regular, semi-regular (Archimedean), or irregular (such

There are five regular polyhedra, known as the Platonic solids: the tetrahedron, cube (hexahedron), octahedron, dodecahedron,

Archimedean solids are semi-regular polyhedra with faces that are more than one type of regular polygon but

Polyhedra exhibit duality: every polyhedron has a dual in which faces and vertices are interchanged. The cube

Euler’s formula V − E + F = 2 applies to convex polyhedra and to polyhedra homeomorphic to a

as
Johnson
solids).
Regular
polyhedra
have
congruent
regular
polygonal
faces
and
the
same
number
of
faces
meeting
at
every
vertex.
and
icosahedron.
They
are
often
described
by
Schläfli
symbols
{p,q},
where
p
is
the
number
of
sides
of
each
face
and
q
is
the
number
of
faces
meeting
at
each
vertex.
Examples
include
{4,3}
for
the
cube,
{3,4}
for
the
octahedron,
{5,3}
for
the
dodecahedron,
and
{3,5}
for
the
icosahedron.
with
identical
vertex
configurations;
there
are
13
such
solids.
Johnson
solids
are
strictly
convex
polyhedra
with
regular
polygonal
faces
that
are
not
uniform.
and
the
octahedron
are
duals,
as
are
the
dodecahedron
and
the
icosahedron.
sphere;
it
generalizes
in
more
complex
topologies.
Nets,
or
unfoldings,
represent
planar
layouts
of
a
polyhedron’s
surface
and
have
practical
use
in
design
and
modeling.
Polyhedra
appear
in
geometry,
crystallography,
architecture,
computer
graphics,
and
3D
printing.