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kongruentes

Kongruentes is a mathematical term used to describe objects that are equal in shape and size, or more broadly to describe a relation of equivalence under a specific rule, depending on the context. In geometry, two figures are congruent if one can be transformed into the other by a rigid motion, such as a translation, rotation, or reflection. Congruent figures have corresponding parts that are equal in length, angle, and area, and the symbol ≅ is commonly used to denote congruence.

In triangle geometry, several criteria guarantee that two triangles are congruent. The SSS (side–side–side) criterion states

In number theory, congruence modulo n is a relation on integers: a ≡ b (mod n) if the

Congruence is distinct from similarity: congruent figures have identical size and shape, while similar figures have

that
if
all
three
corresponding
sides
are
equal,
the
triangles
are
congruent.
SAS
(two
sides
and
the
included
angle),
ASA
(two
angles
and
the
included
side),
AAS
(two
angles
and
a
non-included
side),
and
HL
(hypotenuse–leg,
for
right
triangles)
are
other
established
criteria.
When
congruent,
corresponding
parts—sides
and
angles—match
exactly.
difference
a
−
b
is
divisible
by
n.
This
partitions
integers
into
residue
classes
modulo
n
and
is
compatible
with
addition
and
multiplication.
For
example,
5
≡
2
(mod
3)
because
5
−
2
=
3
is
divisible
by
3.
the
same
shape
but
may
differ
in
size.
Kongruentes
thus
serves
as
a
foundational
concept
in
geometry,
algebra,
and
number
theory,
with
wide-ranging
applications
in
proofs,
cryptography,
computer
graphics,
and
calendar
calculations.
In
German-language
mathematics,
Kongruentes
is
the
adjective
form,
with
Kongruenz
as
the
noun
for
the
concept
of
congruence.