Hyperbolic Geometry Chapter 11
Hyperbolic Lines and Segments Poincaré disk model Line = circular arc, meets fundamental circle orthogonally Note: Lines closer to center of fundamental circle are closer to Euclidian lines Why?
Poincaré Disk Model Model of geometric world Different set of rules apply Rules Points are interior to fundamental circle Lines are circular arcs orthogonal to fundamental circle Points where line meets fundamental circle are ideal points -- this set called Can be thought of as “infinity” in this context
Poincaré Disk Model Euclid’s first four postulates hold 1.Given two distinct points, A and B, a unique line passing through them 2.Any line segment can be extended indefinitely A segment has end points (closed) 3.Given two distinct points, A and B, a circle with radius AB can be drawn 4.Any two right angles are congruent
Hyperbolic Triangles Recall Activity 2 – so … how do you find measure? We find sum of angles might not be 180
Hyperbolic Triangles Lines that do not intersect are parallel lines What if a triangle could have 3 vertices on the fundamental circle?
Hyperbolic Triangles Note the angle measurements What can you conclude when an angle is 0 ?
Hyperbolic Triangles Generally the sum of the angles of a hyperbolic triangle is less than 180 The difference between the calculated sum and 180 is called the defect of the triangle Calculate the defect
Hyperbolic Polygons What does the hyperbolic plane do to the sum of the measures of angles of polygons?
Hyperbolic Circles A circle is the locus of points equidistant from a fixed point, the center Recall Activity 11.2 What seems “wrong” with these results?
Hyperbolic Circles What happens when the center or a point on the circle approaches “infinity”? If center could be on fundamental circle “Infinite” radius Called a horocycle
Distance on Poincarè Disk Model Rule for measuring distance metric Euclidian distance Metric Axioms 1.d(A, B) = 0 A = B 2.d(A, B) = d(B, A) 3.Given A, B, C points, d(A, B) + d(B, C) d(A, C)
Distance on Poincarè Disk Model Formula for distance Where AM, AN, BN, BM are Euclidian distances M N
Distance on Poincarè Disk Model Now work through axioms 1.d(A, B) = 0 A = B 2.d(A, B) = d(B, A) 3.Given A, B, C points, d(A, B) + d(B, C) d(A, C)
Circumcircles, Incircles of Hyperbolic Triangles Consider Activity 11.6a Concurrency of perpendicular bisectors
Circumcircles, Incircles of Hyperbolic Triangles Consider Activity 11.6b Circumcircle
Circumcircles, Incircles of Hyperbolic Triangles Conjecture Three perpendicular bisectors of sides of Poincarè disk are concurrent at O Circle with center O, radius OA also contains points B and C
Circumcircles, Incircles of Hyperbolic Triangles Note issue of bisectors sometimes not intersecting More on this later …
Circumcircles, Incircles of Hyperbolic Triangles Recall Activity 11.7 Concurrence of angle bisectors
Circumcircles, Incircles of Hyperbolic Triangles Recall Activity 11.7 Resulting incenter
Circumcircles, Incircles of Hyperbolic Triangles Conjecture Three angle bisectors of sides of Poincarè disk are concurrent at O Circle with center O, radius tangent to one side is tangent to all three sides
Congruence of Triangles in Hyperbolic Plane Visual inspection unreliable Must use axioms, theorems of hyperbolic plane First four axioms are available We will find that AAA is now a valid criterion for congruent triangles!!
Parallel Postulate in Poincaré Disk Playfair’s Postulate Given any line l and any point P not on l, exactly one line on P that is parallel to l Definition 11.4 Two lines, l and m are parallel if the do not intersect l P
Parallel Postulate in Poincaré Disk Playfare’s postulate Says exactly one line through point P, parallel to line What are two possible negations to the postulate? 1. No lines through P, parallel 2. Many lines through P, parallel Restate the first – Elliptic Parallel Postulate There is a line l and a point P not on l such that every line through P intersects l
Elliptic Parallel Postulate Examples of elliptic space Spherical geometry Great circle “Straight” line on the sphere Part of a circle with center at center of sphere
Elliptic Parallel Postulate Flat map with great circle will often be a distorted “straight” line
Elliptic Parallel Postulate Elliptic Parallel Theorem Given any line l and a point P not on l every line through P intersects l Let line l be the equator All other lines (great circles) through any point must intersect the equator
Hyperbolic Parallel Postulate There is a line l and a point P not on l such that … more than one line through P is parallel to l
Parallel Lines, Hyperbolic Plane Lines outside the limiting rays will be parallel to line AB Called ultraparallel or superparallel or hyperparallel Note line ED is limiting parallel with D at
Parallel Lines, Hyperbolic Plane Consider Activity 11.8 Note the congruent angles, DCE FCD
Parallel Lines, Hyperbolic Plane Angles DCE & FCD are called the angles of parallelism The angle between one of the limiting rays and CD Theorem 11.4 The two angles of parallelism are congruent
Hyperbolic Parallel Postulate Result of hyperbolic parallel postulate Theorem 11.4 For a given line l and a point P not on l, the two angles of parallelism are congruent Theorem 11.5 For a given line l and a point P not on l, the two angles of parallelism are acute
The Exterior Angle Theorem Theorem 11.6 If ABC is a triangle in the hyperbolic plane and BCD is exterior for this triangle, then BCD is larger than either CAB or ABC.
Parallel Lines, Hyperbolic Plane Note results of Activity 11.8 CD is a common perpendicular to lines AB, HF Can be proved in this context If two lines do not intersect then either they are limiting parallels or have a common perpendicular
Quadrilaterals, Hyperbolic Plane Recall results of Activity angles at B and A`
Quadrilaterals, Hyperbolic Plane Recall results of Activity angles at B, A, and D only Called a Lambert quadrilateral
Quadrilaterals, Hyperbolic Plane Saccheri quadrilateral A pair of congruent sides Both perpendicular to a third side
Quadrilaterals, Hyperbolic Plane Angles at A and B are base angles Angles at E and F are summit angles Note they are congruent Side EF is the summit You should have found not possible to construct rectangle (4 right angles)
Hyperbolic Geometry Chapter 11