Chapter 13 Limits and Derivatives

  • Board
    CBSE
  • Textbook
    NCERT
  • Class
    Class 11
  • Subject
    Maths
  • Chapter
    Chapter 13 Limits and Derivatives
  • Chapter Name
    Chapter 13 Limits and Derivatives
  • Category
    NCERT Solutions

NCERT Solutions for class 11 Maths Chapter 13 Limits and Derivatives

This page consists of NCERT Solutions for class 11 Maths Chapter 13 Limits and Derivatives prepared by HT experts. All the questions asked in Chapter 13 Limits and Derivatives are solved with detailed explanations. MCQ questions of Chapter 13 Limits and Derivatives are covered in this solution. 

What will you learn in Chapter 13 Limits and Derivatives?

Here Calculus will be introduced to students. Calculus Mathematics can be applied to the explanation of the course of nature. In this chapter first, we will get the intuitive idea of derivatives and then we will discuss the formula to find the derivative of a function.  The topics covered in this chapter are:

1. The intuitive idea of derivative

2. Concept of Limits

3. Algebra of Limits

4. 0/0 form of limit and evaluation of such kinds of limits

5. Some Standard Limits

6. Sandwich Theorem

7. Derivation of standard trigonometric limits in 0/0 form

8. Derivatives

9. The first principle of derivative

10. Algebra of derivative of functions(Derivative of sum, difference, product and quotient of two functions)

11. Derivative of polynomials and trigonometric functions

12. Some standard derivatives

Download the pdf of NCERT Solutions for class 11 Maths Chapter 13 Limits and Derivatives

Chapter 13 Limits and Derivatives
Chapter 13 Limits and Derivatives
Chapter 13 Limits and Derivatives
Chapter 13 Limits and Derivatives
Chapter 13 Limits and Derivatives
Chapter 13 Limits and Derivatives
Chapter 13 Limits and Derivatives
Chapter 13 Limits and Derivatives
Chapter 13 Limits and Derivatives
Chapter 13 Limits and Derivatives
Chapter 13 Limits and Derivatives
Chapter 13 Limits and Derivatives
Chapter 13 Limits and Derivatives
Chapter 13 Limits and Derivatives