26. Rolle’s Theorem | Important Solved Examples | M1 Unit-III скачать в хорошем качестве

26. Rolle’s Theorem | Important Solved Examples | M1 Unit-III

In this video, we explain Rolle’s Theorem, the first and most fundamental Mean Value Theorem in Calculus (Unit III) of Engineering Mathematics – M1 (JNTUH R22 syllabus). We discuss its statement, geometrical interpretation, working rule, and solved examples to help you clearly understand the concept. 📌 In this video, you will learn: ✅ Statement and conditions of Rolle’s Theorem ✅ Geometrical meaning and interpretation ✅ Step-by-step working rule to verify the theorem ✅ Solved examples for better understanding ✅ Exam-oriented explanation with tips 💡 Why this topic is important: Rolle’s Theorem forms the base for Lagrange’s and Cauchy’s Mean Value Theorems, which are frequently asked in university and competitive exams. Understanding it clearly helps students build strong fundamentals in differential calculus. This video is part of our M1 Complete Course, where you get: 📖 Complete syllabus coverage for all 5 units 📝 Notes + Important Questions for preparation 🎥 Online sessions for doubt clarification 💬 Chat box support for student queries 📱 Access full course anytime on our mobile application 👉 Enroll now for the M1 Complete Course here: 🔗 Click to Join the Course Stay tuned for the next video, where we’ll explain Lagrange’s Mean Value Theorem with geometrical interpretation and examples.