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Concentric

Concentric describes objects that share a common center. In geometry, the term is most often applied to circles, where two or more circles are concentric if they have the same center but different radii. The concept also extends to spheres, cylinders, or any set of figures arranged around a common point, producing rings or shells with increasing or decreasing radii.

Etymology: from Latin con- “together” and centrum “center,” the word is used to denote layers or rings

Properties: Concentric figures do not intersect each other; they are centered on a single point. Each circle

Examples: Concentric circles appear in many contexts, such as bullseye targets, clock faces, and decorative patterns.

See also: coaxial, annulus, rings, radial symmetry.

that
share
a
center.
It
entered
English
with
the
sense
of
layers
arranged
around
a
central
point.
or
sphere
has
a
constant
radius
from
the
common
center,
and
the
distance
between
any
two
concentric
figures
is
the
difference
of
their
radii.
Concentricity
implies
radial
symmetry
around
the
shared
center.
They
also
describe
onion
layers
and
tree
growth
rings,
where
successive
shells
surround
a
central
core.
In
urban
geography,
the
concentric
zone
model
describes
city
expansion
outward
from
a
central
business
district.
In
design
and
engineering,
concentric
rings
are
used
in
decorations,
gaskets,
seals,
and
mechanical
components.