Application of Integrals - Full Chapter Explanation, NCERT Solutions | Class 12 Maths Ch 8 | 2022-23

👉Previous Video :    • Integrals - Full Chapter Explanation and N...   👉Next Video :    • Differential Equations - Full Chapter Expl...   ✔️📚👉 Watch Full Free Course: https://www.magnetbrains.com ✔️📚👉 Get Any Class & Subject's Topic Video Here:- https://www.magnetbrains.com/get-topi... ✔️📚👉 Get All Subjects Playlists: ​https://www.pabbly.com/out/all-videos... ✔️📚👉 Grab Notes by Expert Teachers Here: https://www.pabbly.com/out/magnet-brains ✔️📚👉 Get E-Books Prepared by Our Expert Teachers: https://www.magnetbrains.com/book_pur... ======================================================= 📢 Full Playlist Link:    • Class 12 Maths - Full Chapter Videos (New ...   ✅ In this video, ✔️ Class: 12th ✔️ Subject: Maths ✔️ Chapter: Application of Integrals (Chapter 8) ✔️ Topic Name: Application of Integrals - Full Chapter Explanation, NCERT Solutions and MCQs | Class 12 Maths Chapter 8 | 2022-23 ✔️ Topics Covered In This Video : This video by Shivani Mam will provide detailed explanation of the chapter Application of Integrals. In this video, she will discuss and explain all the important concepts, NCERT Exercise solutions, MCQs and will also provide helpful tips on how to answer them during the exams. The video will help students to prepare for their upcoming board exams and score better in the examination. ======================================================= 00:00 Introduction: Application of Integrals 03:00 Exercise Introduction 8.1 05:40 Graphs 10:37 Parabola 21:09 Ellipse 28:09 Standard form of a straight line 44:39 How to find area? 01:10:52 Example & Solutions: Application of Integrals 01:27:49 Alternatively 01:41:06 The area of the region bounded by a curve and a line 02:34:53 Question 1 to 13: Exercise 8.1: (Page No. 365 & 366): Application of Integrals 1. Find the area of the region bounded by the curve y2 = x and the lines x = 1, x = 4 and the x-axis in the first quadrant. 05:07:00 Question 1 to 10: Miscellaneous Exercise: (Page No. 375): Application of Integrals 1. Find the area under the given curves and given lines: 08:00:46 Question 11 to 17: Miscellaneous Exercise: (Page No. 375): Application of Integrals 09:14:29 Question 1 to 10: Multiple Choice Questions (MCQs): Application of Integrals Que. 1 Area lying in the first quadrant and bounded by the circle x2+ y2 = 4 and the lines x = 0 and x = 2 is. 10:39:40 Basic Formula: Application of Integrals: Complete Chapter Revision 10:41:46 Concept Quick Recap 11:34:35 Question 1 to 7: Let's Answer the Following Questions: Application of Integrals Que. 1 Find the area of the region bounded by the ellipse. 12:50:32 Website Overview ======================================================= Why study from Magnet Brains? Magnet Brains is an online education platform that helps gives you NCERT/CBSE curriculum-based free full courses from Kindergarten to Class 12th so that you can perform well in any and all exams you give in your academic career. 👉 Contact us 🤑🤑 ➡️ Connect with us : [email protected] ➡️ Website : https://www.magnetbrains.com/ ➡️ Subscribe to us on YouTube:    / @magnetbrainseducation   ➡️ Subscribe to Magnet Brains Hindi Medium :    / @magnetbrainshindimedium   ➡️Facebook-: https://www.magnetbrains.com/out/face... ➡️Telegram-: https://www.magnetbrains.com/out/tele... ➡️Instagram:-https://www.magnetbrains.com/out/inst... #class12maths #ncertclass12 #boardexam2023 #magnetbrains application of integrals class 12 textbook pdf application of integrals class 12 notes application of integrals class 12 solutions application of integrals class 12 miscellaneous application of integrals class 12 solutions pdf application of integrals class 12 examples application of integrals class 12 formulas application of integrals class 12 notes pdf Disclaimer: "This video is for educational and informational purposes only and is not intended to infringe on any copyrights. If you believe that this video has used any copyrighted material in a way that constitutes copyright infringement, please contact us at [email protected] and we will take appropriate action."