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diameterrelated

Diameterrelated is a term used to describe properties, measurements, or relationships that involve a diameter, in particular the diameter of circles and the diameter of graphs or networks. It is applied across geometry and graph theory to discuss how diameter interacts with other attributes such as radius, chords, and distances.

In circle geometry, the diameter is a straight line that passes through the center and connects two

Chord geometry also uses diameterrelated concepts. For a circle of radius r, a chord at distance h

In graph theory, the diameter of a graph is the greatest distance between any pair of vertices,

points
on
the
circumference.
Its
length
is
twice
the
circle’s
radius.
The
diameter
is
the
circle’s
longest
chord.
Thales’
theorem
states
that
the
angle
subtended
by
a
diameter
at
any
point
on
the
circle
is
a
right
angle.
Related
formulas
express
diameter
in
terms
of
other
quantities:
with
diameter
d,
radius
r
=
d/2,
area
A
=
πr²
=
πd²/4,
and
circumference
C
=
2πr
=
πd.
from
the
center
has
length
L
=
2√(r²
−
h²).
This
ties
chord
lengths
to
the
circle’s
diameter
and
central
distances,
illustrating
how
diameter-related
measures
constrain
other
features
of
the
circle.
measured
as
the
length
of
the
shortest
path
between
them.
Related
notions
include
the
radius
(the
minimum
eccentricity
of
a
vertex)
and
the
center
(vertices
achieving
the
radius).
A
key
relation
is
that
the
diameter
is
at
most
twice
the
radius,
i.e.,
diameter
≤
2
×
radius,
and
radius
≤
diameter.
Diameterrelated
concepts
help
quantify
efficiency
and
reach
in
networks.