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parallelpostulaat

Parallelpostulaat, or Euclid’s fifth postulate, is a foundational axiom in plane geometry about parallels. In its standard form it states that through a point not on a given line there exists exactly one line that does not intersect the given line. This single postulate governs the behavior of lines and angles in Euclidean geometry.

Modern formulations often express the same idea as Playfair’s axiom: through a fixed point not on a

Historically, Euclid presented the postulate among his Elements as the fifth postulate, but it was long thought

The parallel postulate thus marks a boundary between Euclidean and non-Euclidean geometries. It underpins classical plane

line
there
is
exactly
one
line
parallel
to
the
given
line.
The
parallel
postulate
is
also
equivalent
to
the
statement
that
the
interior
angles
of
a
Euclidean
triangle
sum
to
180
degrees.
Together
with
the
other
four
postulates,
it
characterizes
flat
(zero-curvature)
geometry.
that
it
could
be
derived
from
the
first
four.
In
the
19th
century,
mathematicians
such
as
Bolyai,
Lobachevsky,
and
Gauss
showed
that
the
parallel
postulate
is
independent
of
the
first
four,
giving
rise
to
non-Euclidean
geometries.
In
hyperbolic
geometry,
through
a
point
not
on
a
line
there
are
infinitely
many
parallel
lines
to
the
given
line;
in
elliptic
geometry,
no
true
parallels
exist.
geometry
and
influences
various
fields,
including
mathematics,
physics,
and
computer
graphics,
where
the
assumption
of
flat
space
leads
to
standard
geometric
intuitions
and
calculations.