Home

Kreissegment

Kreissegment, in geometry, is the region of a circle bounded by a chord and the arc that subtends that chord. The term corresponds to the English phrase circle segment. If the arc is the smaller one (less than 180 degrees) it is called a minor Kreissegment; if the arc is larger than a semicircle, it is a major Kreissegment.

Key quantities associated with a Kreissegment are the circle’s radius R, the chord length c, the sagitta

The area of a Kreissegment can be expressed in two common forms. In terms of the central

Notes: A Kreissegment is the difference between the area of the corresponding circle sector and the area

h
(the
distance
from
the
chord
to
the
arc),
and
the
central
angle
theta
in
radians
subtending
the
arc.
The
sagitta
and
chord
relate
to
the
radius
by
h
=
R
−
sqrt(R^2
−
(c/2)^2).
The
central
angle
relates
to
the
chord
by
theta
=
2
arcsin(c/(2R))
=
2
arccos((R
−
h)/R).
angle,
A
=
(R^2/2)(theta
−
sin
theta).
In
terms
of
the
sagitta
h,
A
=
R^2
arccos((R
−
h)/R)
−
(R
−
h)
sqrt(2Rh
−
h^2).
The
latter
formula
follows
from
the
circle
sector
minus
the
isosceles
triangle
formed
by
the
radii
to
the
segment’s
endpoints.
of
the
chord’s
triangle;
it
is
distinct
from
the
sector
itself,
which
is
bounded
by
radii
and
the
arc.
Kreissegmente
have
uses
in
geometry,
design,
and
shading
problems
where
curved
boundaries
are
involved.