Parallel Axioms 1. Show that the Poincaré upper half space model H+ satisfies the hyperbolic parallel axiom. 2. (Harder) Show that there exists a bijective map between the Poincaré upper half space model H+ and the Poincaré disk model P that preserves the distance in each model, i.e. dh (A, B) = dp($(A), ¢(B))

Parallel Axioms 1. Show that the Poincaré upper half space model H+ satisfies the hyperbolic parallel axiom. 2. (Harder) Show that there exists a bijective map between the Poincaré upper half space model H+ and the Poincaré disk model P that preserves the distance in each model, i.e. dh (A, B) = dp($(A), ¢(B))

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter11: Topics From Analytic Geometry

Section11.3: Hyperbolas

Problem 29E

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Question

[Classical Geometries] How do you solve this question? Thank you

Parallel Axioms
1. Show that the Poincaré upper half space model H+ satisfies the hyperbolic
parallel axiom.
2. (Harder) Show that there exists a bijective map between the Poincaré
upper half space model H+ and the Poincaré disk model P that preserves
the distance in each model, i.e.
dh (A, B) = dp(ø(A), ¢(B))

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