Math Olympiad Geometry

Your Complete Guide to Math Olympiad Geometry Mastery

Success in math competitions starts with mastering the right topics. This book is your complete topic-by-topic guide to the essential geometry concepts, theorems, and techniques that appear most often in Math Olympiads. Inside, you'll find clear explanations of fundamental concepts, important formulas, classic theorems, and proven problem-solving techniques - all presented through carefully selected and fully solved practice problems.

Designed for both newcomers and experienced competitors, this book is organized into 44 concise chapters, each devoted to a specific topic or skill. It begins with the fundamentals of geometry-congruent triangles, isosceles triangles and trapezoids, inscribed and central angles, cyclic quadrilaterals, and the important points of a triangle (orthocenter, incenter, circumcenter, centroid, and excenters). It then moves on to Simson lines, geometric transformations, similar triangles, the power of a point, and the radical axis and radical center. The book concludes with more advanced topics, including Ceva's and Menelaus' theorems, isogonal lines and conjugates, and Pascal's and Desargues' theorems.

Whether you're just starting your competition journey or fine-tuning your skills before an upcoming contest, this book will help you:

Build a solid foundation in Math Olympiad geometry.

Review key techniques efficiently before a competition.

Identify areas that need more practice and improvement.

Written by a coach with over 20 years of experience, this book combines theory with fully solved practice problems - helping students understand why each method works and how to apply it effectively.

Inside, you'll find:

44 concise chapters, each focusing on a single concept or skill.

Key formulas, theorems, and problem-solving techniques.

A mix of classic, adapted, and original problems with detailed solutions.

Step-by-step guidance for both beginners and advanced competitors.