## Description

**Downloadable Instructor’s Solution Manual for Geometry: Theorems and Constructions, Allan Berele, Jerry Goldman, ISBN-10: 0130871214, ISBN-13: 9780130871213, Instructor’s Solution Manual (Complete) Download**

**You are buying Solution Manual. A Solution Manual is step by step solutions of end of chapter questions in the text book. Solution manual offers the complete detailed answers to every question in textbook at the end of chapter. Please download sample for your confidential.**

Table of Contents

(NOTE: Each chapter concludes with a Chapter Summary.)

0. Notation and Conventions.

Notation. Constructions.

1. Congruent Triangles.

The Three Theorems. Proofs of the Three Theorems. Applications to Constructions. Applications to Inequalities.

2. Parallel Lines.

Existence and Uniqueness. Applications. Distance between Parallel Lines.

3. Area.

Area of Rectangles and Triangles. The Pythagorean Theorem. Area of Triangles. Cutting and Pasting.

4. Similar Triangles.

The Three Theorems. Applications to Constructions.

5. Circles.

Circles and Tangents. Arcs and Angles. Applications to Constructions. Application to Queen Dido’s Problem. More on Arcs and Angles.

6. Regular Polygons.

Constructibility. In the Footsteps of Archimedes.

7. Triangles and Circles.

Circumcircles. A Theorem of Brahmagupta. Inscribed Circles. An Old Chestnut (the Steiner-Lehmus Theorem.) Enscribed Circles. Euler’s Theorem.

8. Medians.

Center of Gravity. Length Formulas. Complementary and Anticomplementary Triangles.

9. Altitudes.

The Orthocenter. Fagnano’s Problem. The Euler Line. The Nine-Point Circle.

10. Miscellaneous Results about Triangles.

Ceva’s Theorem. Applications of Ceva’s Theorem. The Fermat Point. Properties of the Fermat Point.

11. Constructions with Indirect Elements.

Constructions with Indirect Elements.

12. Solid Geometry.

Lines and Planes in Space. Dihedral Angles. Projections. Trihedral Angles.

13. Combinatorial Theorems in Geometry.

The Triangulation Lemma. Euler’s Theorem. Platonic Solids. Pick’s Theorem.

14. Spherical Geometry.

Spheres and Great Circles. Spherical Triangles. Polar Triangles. Congruence Theorems for Triangles. Areas of Spherical Triangles. A Non-Euclidean Model.

15. Models for Hyperbolic Geometry.

Absolute Geometry. The Klein-Beltrami Disk. The PoincarÃ© Disk. The AAA Theorem in Hyperbolic Geometry. Geometry and the Physical Universe.