| Sl.No | Chapter Name | English |
|---|---|---|
| 1 | Introduction to Several Variables and Notion Of distance in Rn | Download To be verified |
| 2 | Countinuity And Compactness | Download To be verified |
| 3 | Countinuity And Connectdness | Download To be verified |
| 4 | Derivatives: Possible Definition | Download To be verified |
| 5 | Matrix Of Linear Transformation | Download To be verified |
| 6 | Examples for Differentiable function | Download To be verified |
| 7 | Sufficient condition of differentiability | Download To be verified |
| 8 | Chain Rule | Download To be verified |
| 9 | Mean Value Theorem | Download To be verified |
| 10 | Higher Order Derivatives | Download To be verified |
| 11 | Taylor\'s Formula | Download To be verified |
| 12 | Maximum And Minimum | Download To be verified |
| 13 | Second derivative test for maximum, minimum and saddle point | Download To be verified |
| 14 | We formalise the second derivative test discussed in Lecture 2 and do examples. | Download To be verified |
| 15 | Specialisation to functions of two variables | Download To be verified |
| 16 | Implicit Function Theorem | Download To be verified |
| 17 | Implicit Function Theorem -a | Download To be verified |
| 18 | Application of IFT: Lagrange\'s Multipliers Method | Download To be verified |
| 19 | Application of IFT: Lagrange\'s Multipliers Method- b | Download To be verified |
| 20 | Application of IFT: Lagrange\'s Multipliers Method - c | Download To be verified |
| 21 | Application of IFT: Inverse Function Theorem - c | Download To be verified |
| Sl.No | Language | Book link |
|---|---|---|
| 1 | English | Not Available |
| 2 | Bengali | Not Available |
| 3 | Gujarati | Not Available |
| 4 | Hindi | Not Available |
| 5 | Kannada | Not Available |
| 6 | Malayalam | Not Available |
| 7 | Marathi | Not Available |
| 8 | Tamil | Not Available |
| 9 | Telugu | Not Available |