filmov
tv
Easy Use of NEWTON LEIBNITZ RULE & L Hospital Rule |Limits Continuity and Differentiability Class 12
Показать описание
About this Video -
In this video we have discussed a Moderate LEVEL CONCEPT Question of IIT JEE Mains 2024 Limits, Continuity & Differentiability Chapter. Asked in JEE Mains 2024 January 29; Shift-1. It is a fundamental concept based question based on standard limits, where we have covered theoretical part of the concept as well. After seeing the video you will able to solve limits questions of jee advanced and such problems very easily......
Question:
. lim┬(x→π/2)(1/(x-π/2)^2 ∫_(x^3)^((π/2)^3)▒cos(t^(1/3) ) dt) is equal to
(A) 3π/8 (B) (3π^2)/4 (C) (3π^2)/8 (D) 3π/4
Ans: C [JEE Mains Jan 29, 2024; Shift-1]
NOTE : Please feel free to ask any doubt related from class 5 to class 12, IIT Advance and IIT Mains. We will definitely solve your doubt as soon as possible. Please Post your doubts in the comment box.
NOTE : Please feel free to ask any doubt related from class 5 to class 12, IIT Advance and IIT Mains. We will definitely solve your doubt as soon as possible. Please Post your doubts in the comment box.
Please Watch Related Videos
These videos are the very informative for all competitive examinations such as IIT JEE Advance, IIT JEE Mains, KVPY, Mathematics Olympiads and many more. You will be able to solve problems of IIT Advance and Mains by using the concept covered in the video.
Hi,
I am your Maths Guru. Welcome to my channel Aryabhata IIT Maths.
About this Channel -
Friends this channel is managed by very experienced IIT faculty and IITian. Friends here you will learn fundamental concepts and problem solving skills. Our moto is to provide coaching to all the students of class 11, class 12, IIT Aspirants, Olympiad, NDA and various other competitive examinations free of cost. Our aim is to provide basic and Advance level concepts to all those students who are willing to learn and not able to pay fee of reputed coaching institutes. Please watch the videos till the end to learn basic and Advance concepts. For doubt related to any topic in Mathematics, please write in the comment box.
#iit | #iitjee | #jeemains | #jee | #pyq | #iitadvanced | #problems #jee | #limit | #limits_and_continuity | #limitsclass11 | #continuity | #differentiability
In this video we have discussed a Moderate LEVEL CONCEPT Question of IIT JEE Mains 2024 Limits, Continuity & Differentiability Chapter. Asked in JEE Mains 2024 January 29; Shift-1. It is a fundamental concept based question based on standard limits, where we have covered theoretical part of the concept as well. After seeing the video you will able to solve limits questions of jee advanced and such problems very easily......
Question:
. lim┬(x→π/2)(1/(x-π/2)^2 ∫_(x^3)^((π/2)^3)▒cos(t^(1/3) ) dt) is equal to
(A) 3π/8 (B) (3π^2)/4 (C) (3π^2)/8 (D) 3π/4
Ans: C [JEE Mains Jan 29, 2024; Shift-1]
NOTE : Please feel free to ask any doubt related from class 5 to class 12, IIT Advance and IIT Mains. We will definitely solve your doubt as soon as possible. Please Post your doubts in the comment box.
NOTE : Please feel free to ask any doubt related from class 5 to class 12, IIT Advance and IIT Mains. We will definitely solve your doubt as soon as possible. Please Post your doubts in the comment box.
Please Watch Related Videos
These videos are the very informative for all competitive examinations such as IIT JEE Advance, IIT JEE Mains, KVPY, Mathematics Olympiads and many more. You will be able to solve problems of IIT Advance and Mains by using the concept covered in the video.
Hi,
I am your Maths Guru. Welcome to my channel Aryabhata IIT Maths.
About this Channel -
Friends this channel is managed by very experienced IIT faculty and IITian. Friends here you will learn fundamental concepts and problem solving skills. Our moto is to provide coaching to all the students of class 11, class 12, IIT Aspirants, Olympiad, NDA and various other competitive examinations free of cost. Our aim is to provide basic and Advance level concepts to all those students who are willing to learn and not able to pay fee of reputed coaching institutes. Please watch the videos till the end to learn basic and Advance concepts. For doubt related to any topic in Mathematics, please write in the comment box.
#iit | #iitjee | #jeemains | #jee | #pyq | #iitadvanced | #problems #jee | #limit | #limits_and_continuity | #limitsclass11 | #continuity | #differentiability
0:08:40
Introduction to Calculus: The Greeks, Newton, and Leibniz
0:17:40
The Leibniz rule for integrals: The Derivation
0:12:15
Leibnitz's Theorem - introduction | ExamSolutions
0:04:36
Easy Use of NEWTON LEIBNITZ RULE & L Hospital Rule |Limits Continuity and Differentiability Clas...
0:00:24
Newton Leibnitz formula
0:00:35
How REAL Men Integrate Functions
0:06:14
Newton-Leibniz formula
0:06:43
History of Calculus - Animated
0:20:46
Integration and the fundamental theorem of calculus | Chapter 8, Essence of calculus
0:04:22
The Feynman integration trick and Leibniz rule epitomized with three examples
0:29:03
Unizor - Definite Integrals - Examples on Newton-Leibniz Formula
0:22:18
Unizor - Definite Integrals - Newton-Leibniz Formula
1:54:32
Leibniz’ Theory of Space and the Newton Affair
0:07:13
Newton vs. Leibniz - Schreibweise der Ableitung | Bonus zu Kapitel 3.1 | Physikalische Arbeitsweisen
0:44:49
Integration-I : In the style of Newton and Leibnitz
0:11:18
Leibniz Integral Rule - updated! 💪
0:00:13
Differentiation Hack 🔥 | Differentiation Trick | Differentiation Formulas #fun #shorts #short #trend...
0:07:27
Newton and Leibniz were clueless as to why their methods worked.
0:00:59
Limits Previous Year Questions | Newton Leibniz Rule🔥 #jee #short #jeemath #umeedjee #jeepyq
0:06:16
Motion Education Muzaffarpur | Mathematics | JEE - Mains | Newton Leibnitz Rule of second Kind
0:00:26
Which mathematical concept did Isaac Newton and Leibniz co develop
0:59:07
Vasos Pavlika - The Calculus Wars : Newton vs Leibniz
0:05:25
Newton vs. Leibniz - The Controversy over the Discovery of the Calculus
0:01:22
'Leibniz vs. Newton: Who Really Invented Calculus?'
Комментарии