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not comparable
(geometry) In hyperbolic geometry, lines that do not intersect in a common point in the plane and do not intersect at a common limit point at infinity, but rather, occur outside the limit set by parallel lines which intersect at infinity. quotations examples
Two hyperparallel lines have one and only one common perpendicular.
1995, Howard Eves, College Geometry, page 246
Let l and m be two hyperparallel lines. All the transversals to l and m that form congruent corresponding angles with l and m lie in a pencil.
2012, G. E. Martin, The Foundations of Geometry and the Non-Euclidean Plane, page 357
In order that two distinct lines K and L be hyperparallel it is necessary and sufficient that they lie in one plane and that there exists a line M intersecting both of them perpendicularly.
2018, Karol Borsuk, Wanda Szmielew, Foundations of Geometry, page 292