MTE-09 Online Classes | Real Analysis Online Classes | IGNOU


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Description MTE-09 Syllabus
Sample Video Classes MTE-09 Previous Year Question Papers 
What will you learn? How to buy
Material Includes Terms & Conditions

You will be able to see this class for a certain number of days in our app. So select the number of days accordingly.


Video Class Description

Total Number of Videos 25
Time Length Approx. 30 hours
Language Hindi + English
Course MTE-09 Online Class or Real Analysis Class


Sample Video Classes

MTE-09 Class-01

Class-01 Notes Download 

MTE-09 Class-02

Class-02 Notes Download

What will you learn?

  • Students who have completed the Calculus course and are ready for a more systematic and rigorous approach should take this course. For students who plan on pursuing a career in mathematics, this course will help bridge the gap between calculus and advanced calculus and give a solid foundation in conceptual mathematics.
  • The notion of restriction on the real line serves as the course’s overarching subject.
  • The construction of a real number system is the focus of the first of four blocks that make up this system. In Block-2, we learn about real number sequences and series. There are three units in this block and the Cauchy sequence notion is presented. An introduction to real-valued function limits and the ideas of continuity and uniformity are presented in Block-3….
  • There are three units in the fourth block that cover differentiability, mean value theory, and more. Riemann integration, sequence and series of functions, and related findings are discussed in Blcok-5.

Material Includes

  • Class Notes/Study Material
  • Important Questions Collection with Complete Solution
  • Doubts Solution 

MTE-09 Syllabus

Block:1 Real Numbers and Functions Block:2 Sequences and Series

Sets and Numbers


Structure of Real Numbers

Positive Term Series

Topology of Real Line

General Series

Real Functions



Block:3 Limit and Continuity Block:4 Differentiability

Limit of a Function



Mean Value Theorems

Properties of Continuous Functions

Higher Order Derivatives


Block:5 Integrability

The Riemann Integration

Integrability and Differentiability

Sequences and Series of Functions

MTE-09 Previous Year Question Papers

How to buy?

How will you get this video session?

Step-01 Complete the order.

Step-02 After receiving your order we will send login credentials to access our Abstract Classes app through email and Whatsapp. (While completing your order please provide your WhatsApp number for better communication)

Step-03 Download Abstract Classes assignment login app. (Available only for Android devices only)

Abstract Classes Assignment Login App

Step-04 Put the credentials in App and get your video session. You’ll find your paid video sessions in the Video section.

Remember: Our app is available only for android devices & A single id can be used on a single device. You cannot use it on more than one device.

Terms & Conditions

  • Users are requested to respect the copyright of the author.
  • The document is in read-only format. You will have no access to print, download and share this document/video. You can only view this solution/video in Mobile and tablets easily.
  • Users are instructed not to take printouts, screenshots, photos etc. of the copyrighted material.
  • Users are instructed not to communicate/share by any media and/or mode the copyrighted material of the author with the public for commercial gains without written permission from the author.
  • If any user is found to be infringing, copying and commercially dealing in the copyrighted material in any manner without express written permission from the author, then strict legal action will be taken against such users.
  • Already We have taken legal action against such users.
  • Our educational materials are solely available on our website and/or application only. Users and/or student can report the dealing or selling of the copied version of our educational materials by any third party at our email id ( and mobile number  (+91-9958288900). In return, such users/students can expect our educational materials free and other benefits as a bonafide gesture which will be completely dependent upon our discretion.

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MTE-09 Online Classes

MTE-09 Online Classes | Real Analysis Online Classes | IGNOU


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