NCERT Solutions for Class 12 Maths Chapter 8 Application of Integrals Exercises 8.1 and 8.2 with one miscellaneous Exercise available to download in English and Hindi Medium for CBSE and other State Board students. Topper Nation is providing NCERT Solutions for the main subjects like Physics, Chemistry, Biology, English, Accountancy, Business Studies and Hindi. You can download NCERT books and CBSE Board Papers of last year. **Chapter 8 Application of Integrals Solutions** have been given below.

## NCERT Class 12 Maths Chapter 8 Application of Integrals

In this chapter students will study two exercises 8.1 and 8.2. There are some importants concepts and topics like applications in finding the area under simple curves, especially lines, circles/ parabolas/ellipses, Area between any of the two above said curves. These are the concepts to be understood. Chapter 8 Solutions of two exercises is given below.

Class 12 Maths Solutions Exercise 8.1

- Read online Exercise 8.1 Solutions
- Download Exercise 8.1 Solutions in PDF
- Exercise 8.1 Solutions in Hindi

Class 12 Maths Solutions Exercise 8.2

- Read Online Exercise 8.2 Solutions
- Download Exercise 8.2 Solutions in PDF
- Exercise 8.2 Solutions in Hindi

Class 12 Maths Miscellaneous Exercise Solutions

- Read Online Miscellaneous Exercise
- Download Chapter 8 Miscellaneous Solutions in PDF
- Miscellaneous Solutions in Hindi

**Chapter 8 Application of Integrals **

- NCERT Book Chapter 8
- NCERT Book Answers

**Other Chapters**

- NCERT Solutions Maths 12 Chapter 1
- NCERT Solutions Maths 12 Chapter 2
- NCERT Solutions Maths 12 Chapter 3
- NCERT Solutions Maths 12 Chapter 4
- NCERT Solutions Maths 12 Chapter 5
- NCERT Solutions Maths 12 Chapter 6
- NCERT Solutions Maths 12 Chapter 7
- NCERT Solutions Maths 12 Chapter 9

### Chapter 8 – Application of Integrals

In geometry, we have learnt formulae to calculate areas of various geometrical figures including triangles, rectangles, trapezias and circles. Such formulae are fundamental in the applications of mathematics to many real life problems. The formulae of elementary geometry allow us to calculate areas of many simple figures. However, they are inadequate for calculating the areas enclosed by curves. For that we shall need some concepts of Integral Calculus.