"Mathematical Methods of Classical Mechanics" is an outstanding work written by the outstanding Russian mathematician and physicist Vladimir Igorevich Arnold .. This book is not just a textbook, but a real guide to the world of classical mechanics, which combines a strict mathematical base and a deep understanding of physical processes. Arnold, known for his work in differential geometry and dynamical systems, offers the reader a unique view of mechanical phenomena using powerful mathematical tools. The book covers a wide range of topics, ranging from the basics of mechanics to more complex concepts such as dynamical systems theories and variational principles. Arnold masterfully explains how mathematical methods can be used to analyze and solve problems related to the movement of bodies, their interaction and state change. He not only expounds the theory, but also reinforces it with practical examples, which makes the material more accessible and understandable. This book will be interesting not only for students and graduate students of physical and mathematical specialties, but also for everyone who is fond of science and wants to understand more deeply how the world around us works. If you are a student studying physics or mathematics, or just a science lover who wants to expand his knowledge, "Mathematical methods of classical mechanics" will become an indispensable source of information for you. The book will also be useful to teachers who want to enrich their lectures and seminars with practical examples and new approaches. One of the key topics raised in the book is the relationship between mathematics and physics. Arnold shows how abstract mathematical concepts can be applied to specific physical problems, making his work particularly valuable for those seeking an interdisciplinary approach to learning and research. It also addresses symmetry and conservation issues that are fundamental in mechanics, allowing the reader to see how these principles work in real-world physical systems. Arnold's style is clear and logical, which allows him to explain even the most complex ideas in a simple and accessible language. His ability to relate theory to practice makes the book not only a textbook, but also a fascinating read. Readers familiar with Arnold's other works, such as Geometry and Differential Equations or Ordinary Differential Equations, will appreciate his unique approach and deep understanding of the subject. This book also attracts attention due to its structured approach. Arnold divides the material into logical blocks, which allows the reader to gradually delve into the study of the topic. Each section contains not only theoretical calculations, but also tasks that will help to consolidate the knowledge gained in practice. This makes "Mathematical Methods of Classical Mechanics" an ideal tool for both self-study and for use in training courses. If you are looking for a book that will not only teach you the basics of classical mechanics, but also inspire further research in mathematics and physics, Vladimir Igorevich Arnold’s Mathematical Methods of Classical Mechanics will be your faithful companion on this fascinating journey. Do not miss the opportunity to immerse yourself in a world where mathematics and physics combine into a harmonious whole, opening up new horizons for your understanding of the world around you.