Lec-6 | Real Analysis-II 4th Semester (Core-VIII) | Algebra Of Differentiable Functions | NEP 2020 скачать в хорошем качестве

Lec-6 | Real Analysis-II 4th Semester (Core-VIII) | Algebra Of Differentiable Functions | NEP 2020

Lec-6 | Real Analysis-II 4th Semester (Core-VIII) | Algebra Of Differentiable Functions | NEP 2020 🎬 In this video, we discuss Real Analysis-II (Core-VIII) for 4th Semester under NEP 2020. This lecture is specially made for Odisha Students who want to understand Differential Geometry clearly and confidently. Today’s topic: Algebra Of Differentiable Functions(Chain Rule). 🎯 What you’ll learn: Algebra Of Differentiable Functions(Chain Rule), Theorem: Statement and Prove, Let f:I to R are Differentiable and f(I) subset of J an interval and g: J to R is Differentiable at f(c), then g o f is Differentiable at c, With (g o f)'(c)=g'(f(c)).f'(c), Proof with Details Explanation. 🎥 Watch till the end to build strong basics for scoring well in Real Analysis-II!    • Real Analysis-II (4th Semester)   This video is especially useful for students under the NEP 2020 pattern. Don't forget to LIKE, SHARE, and SUBSCRIBE for more such videos. Drop your doubts and feedback in the comments below – I reply to every student! 📌Telegram Channel Link:https://telegram.me/simplifiedteaching 🔹Telegram Student Discussion Group: https://t.me/simplifiedteachinggroup Subscribe for more content in Odia + English style! #simplifiedteaching #realanalysis #maths #yt #realanalysis2 #odishaeducation #bscmaths #4thsememster #importanttopics #examtips #differentiability #caratheodorytheorem #continuity #theorem #proof #odisha #odia #chainrule #compositionoffunctions