*5. Prove that no two lines in hyperbolic geometry are equidistant from one another by showing that the distance from one line to another cannot haye the same yalue in more than two places.

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geometry proof

*5. Prove that no two lines in hyperbolic geometry are equidistant from
one another by showing that the distance from one line to another cannot
have the same value in more than two places.
Transcribed Image Text:*5. Prove that no two lines in hyperbolic geometry are equidistant from one another by showing that the distance from one line to another cannot have the same value in more than two places.
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