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Solutions Manual for A Survey of Classical and Modern Geometries With Computer Activities 1st Edition By Arthur Baragar

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Solutions Manual for A Survey of Classical and Modern Geometries With Computer Activities 1st Edition By Arthur Baragar

Institución
Survey Of Classical And Mod
Grado
Survey of Classical and Mod

Vista previa del contenido

SOLUTION MANUAL l




For




ASURVEYOFCLASSICAL
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AND MODERN GEOMETRIES
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With Computer Activities
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1stEdition
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By
Arthur Baragar
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,Contents

1 Euclidean Geometry l 1
1.1 The Pythagorean Theorem ................................................................3
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1.2 The Axioms of Euclidean Geometry .................................................5
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1.3 SSS, SAS, and ASA ............................................................................7
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1.4 Parallel Lines ..................................................................................... 11
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1.5 Pons Asinorum .................................................................................. 12
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1.6 The Star Trek Lemma ..................................................................... 12
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1.7 Similar Triangles ............................................................................... 18
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1.8 Power of the Point ............................................................................. 24
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1.9 The Medians and Centroid.............................................................. 33
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1.10 The Incircle, Excircles, and the Law of Cosines........................... 35
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1.11 The Circumcircle and Law of Sines ............................................... 42
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1.12 The Euler Line .................................................................................. 48
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1.13 The Nine Point Circle ...................................................................... 50
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1.14 Pedal Triangles and the Simson Line ............................................. 57
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1.15 Menelaus and Ceva............................................................................ 67
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2 Geometry in Greek Astronomy l l 75 l



2.1 The Relative Size of the Moon and Sun........................................ 75
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2.2 The Diameter of the Earth .............................................................. 76
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3 Constructions Using a Compass and Straightedge l 81 l l l l



3.1 The Rules .......................................................................................... 81
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3.2 Some Examples .................................................................................. 81
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3.3 Basic Results ..................................................................................... 82
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3.4 The Algebra of Constructible Lengths .......................................... 92
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3.5 The Regular Pentagon ..................................................................... 94
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3.6 Other Constructible Figures ......................................................... 102
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3.7 Trisecting an Arbitrary Angle....................................................... 105
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4 Geometer’s Sketchpad l 111
4.1 The Rules of Constructions ........................................................... 111
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4.2 Lemmas and Theorems .................................................................. 111
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4.3 Archimedes’ Trisection Algorithm ................................................. 114
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, 4.4 Verification of Theorems .................................................................114
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4.5 Sophisticated Results ......................................................................117 l



4.6 Parabola Paper ................................................................................120
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5 Higher Dimensional Objects
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5.1 The Platonic Solids ........................................................................125
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5.2 The Duality of Platonic Solids .....................................................127
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5.3 The Euler Characteristic.................................................................127
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5.4 Semiregular Polyhedra ....................................................................127
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5.5 A Partial Categorization of Semiregular Polyhedra ...................130
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5.6 Four-Dimensional Objects ...............................................................138 l




6 Hyperbolic Geometry l 143
6.1 Models ...............................................................................................143
6.2 Results from Neutral Geometry.....................................................143
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6.3 The Congruence of Similar Triangles ...........................................145
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6.4 Parallel and Ultraparallel Lines .....................................................145
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6.5 Singly Asymptotic Triangles .........................................................146
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6.6 Doubly and Triply Asymptotic Triangles....................................146
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6.7 The Area of Asymptotic Triangles ...............................................147
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7 The lPoincaré Models of Hyperbolic Geometry l 149 l l l



7.1 The Poincar´e Upper Half Plane Model .........................................149
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7.2 Vertical (Euclidean) Lines ..............................................................149
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7.3 Isometries .........................................................................................149
7.4 Inversion in the Circle .....................................................................150
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7.5 Inversion in Euclidean Geometry ................................................... 161
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7.6 Fractional Linear Transformations ................................................164
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7.7 The Cross Ratio ...............................................................................169
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7.8 Translations ......................................................................................173
7.9 Rotations ...........................................................................................177
7.10 Reflections ........................................................................................181
7.11 Lengths..............................................................................................185
7.12 The Axioms of Hyperbolic Geometry ...........................................186
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7.13 The Area of Triangles.....................................................................186
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7.14 The Poincar´e Disc Model ................................................................188
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7.15 Circles and Horocycles ....................................................................190
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7.16 Hyperbolic Trigonometry ...............................................................195
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7.17 The Angle of Parallelism ................................................................207
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7.18 Curvature ..........................................................................................209

8 Tilings and Lattices l l 211
8.1 Regular Tilings .................................................................................211
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8.2 Semiregular Tilings ..........................................................................211
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8.3 Lattices and Fundamental Domains ..............................................212
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8.4 Tilings in Hyperbolic Space ...........................................................212
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8.5 Tilings in Art ................................................................................... 220
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, 9 Foundations 221
9.1 Theories ........................................................................................... 221
9.2 The Real Line ................................................................................. 221
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9.3 The Plane ........................................................................................ 221
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9.4 Line Segments and Lines ................................................................ 221
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9.5 Separation Axioms .......................................................................... 222
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9.6 Circles ............................................................................................... 225
9.7 Isometries and Congruence ............................................................ 226
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9.8 The Parallel Postulate .................................................................... 227
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9.9 Similar Triangles ............................................................................. 227
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10 Spherical Geometry l 229
10.1 The Area of Triangles .................................................................... 229
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10.2 The Geometry of Right Triangles ................................................ 231
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10.3 The Geometry of Spherical Triangles .......................................... 232
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10.4 Menelaus’ Theorem ......................................................................... 234
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10.5 Heron’s Formula .............................................................................. 241
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10.6 Tilings of the Sphere ...................................................................... 245
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10.7 The Axioms ..................................................................................... 247
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10.8 Elliptic Geometry ........................................................................... 247
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11 Projective Geometry l 249
11.1 Moving a Line to Infinity .............................................................. 249
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11.2 Pascal’s Theorem ............................................................................ 250
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11.3 Projective Coordinates ................................................................... 250
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11.4 Duality .............................................................................................. 255
11.5 Dual Conics and Brianchon’s Theorem ....................................... 257
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11.6 Areal Coordinates ........................................................................... 258
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12 The l Pseudosphere in Lorentz Space 265 l l l



12.1 The Sphere as a Foil....................................................................... 265
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12.2 The Pseudosphere .......................................................................... 272
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12.3 Angles and the Lorentz Cross Product ........................................ 280
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12.4 A Different Perspective .................................................................. 284
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12.5 The Beltrami-Klein Model............................................................. 286
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12.6 Menelaus’ Theorem ......................................................................... 286
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Escuela, estudio y materia

Institución
Survey of Classical and Mod
Grado
Survey of Classical and Mod

Información del documento

Subido en
13 de octubre de 2024
Número de páginas
292
Escrito en
2024/2025
Tipo
Examen
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