Prove that, in hyperbolic geometry, for each point P and a line l not containing P,...
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Prove that, in hyperbolic geometry, for each point P and a linel not containing P, there are infinitely many lines through Pparallel to l.
Prove that, in hyperbolic geometry, for each point P and a linel not containing P, there are infinitely many lines through Pparallel to l.
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Let ? be the intersecting set for ? and let ?,? be points on ? such that line ?? is on ?. If ?∈?, then ?∈? for every 0<?<? and there exist ?∈? such that ?∈?. ?0 is the critical number for ? and line ?? such that ? is the half open interval
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