- Definition
- Properties Proof
- See also
- References
In neutral or absolute geometry, and in hyperbolic geometry, there may be many lines parallel to a given line 
through a point 
not on line 
; however, in the plane, two parallels may be closer to than all others (one in each direction of ).
Thus it is useful to make a new definition concerning parallels in neutral geometry. If there are closest parallels to a given line they are known as the limiting parallel, asymptotic parallel or horoparallel (horo from {{lang-el|ὅριον }} — border).
For rays, the relation of limiting parallel is an equivalence relation, which includes the equivalence relation of being coterminal.
Limiting parallels may form two, or three sides of a limit triangle.
Definition
A ray 
is a limiting parallel to a ray 
if they are coterminal or if they lie on distinct lines not equal to the line 
, they do not meet, and every ray in the interior of the angle 
meets the ray .[1]
Properties
Distinct lines carrying limiting parallel rays do not meet.
Proof
Suppose that the lines carrying distinct parallel rays met. By definition the cannot meet on the side of which either 
is on. Then they must meet on the side of opposite to , call this point 
. Thus 
. Contradiction.
See also
- horocycle, In Hyperbolic geometry a curve whose normals are limiting parallels
- angle of parallelism
References
- Chehab
- Chehalem Airpark
- Chehalis 5, British Columbia
- Chehalis, British Columbia
- Chehalis County, Washington
- Chehalis High School
- Chehalis River
- Chehalis River (U.S.)
- Chehalis School District
- Chehalis Village
- Chehalis (WA)
- Chehalis Western Trail
- Chehalis–Centralia Railroad
- Cheh Chang
- Chehelsotoon
- Chehel sotun
- Chehlum
- Chehraa
- Chehraa (2004 film)
- Chehraa (2005 film)
- Chehragani
- Chehraganli
- Chehriq
- Cheia
- Cheia de sub Grind River