Introduction to the Basics of Real Analysis

Introduction to the Basics of Real Analysis by Harendra Singh and H M Srivastava offers a clear, rigorous pathway into the foundational ideas of real analysis—designed for students, instructors, and self-learners in India and around the world.

Begin with a confident step into the subject: the book opens with intuitive explanations of limits, sequences, and continuity, then advances through series, differentiation, and the Riemann integral to metric spaces and convergence. Each chapter balances formal proofs with accessible commentary so readers develop both technique and mathematical intuition.

What makes this text indispensable is its thoughtful organization and learner-focused voice. Carefully structured chapters build concepts incrementally, while plentiful examples illustrate abstract ideas in concrete settings. Challenging exercises, illustrative problems, and worked examples give readers opportunities to test understanding and gain problem-solving confidence—ideal for undergraduate courses, competitive exam preparation, or independent study.

Readers will appreciate the book’s professional clarity and pedagogical strengths: precise definitions, transparent proofs, and helpful remarks point out common pitfalls and deeper connections across topics. Whether you’re transitioning from calculus to rigorous analysis or seeking a dependable classroom text, this volume supports steady progress from basics to more advanced material.

For students in India, South Asia, and global classrooms seeking a dependable introduction to mathematical analysis, Introduction to the Basics of Real Analysis by Harendra Singh and H M Srivastava is a practical, authoritative choice—order your copy today to master the fundamentals and build a strong foundation in real analysis.

Note: eBooks do not include supplementary materials such as CDs, access codes, etc.