Comprehensive Introduction: Provides a thorough foundation in real analysis, covering topics such as limits, continuity, differentiation, and integration. Rigorous and Accessible: Presents complex concepts in a clear and understandable manner, making it suitable for both undergraduate and graduate students. Extensive Examples and Exercises: Includes numerous worked-out examples and exercises to reinforce understanding and develop problem-solving skills. Historical Context: Explores the historical development of real analysis, providing insights into the evolution of mathematical ideas.* Applications in Other Fields: Demonstrates the relevance of real analysis to other disciplines, such as physics, engineering, and economics.