| Module Name | Download |
|---|---|
| noc20_ma15_assigment_1 | noc20_ma15_assigment_1 |
| noc20_ma15_assigment_2 | noc20_ma15_assigment_2 |
| noc20_ma15_assigment_3 | noc20_ma15_assigment_3 |
| noc20_ma15_assigment_4 | noc20_ma15_assigment_4 |
| noc20_ma15_assigment_5 | noc20_ma15_assigment_5 |
| noc20_ma15_assigment_6 | noc20_ma15_assigment_6 |
| noc20_ma15_assigment_7 | noc20_ma15_assigment_7 |
| noc20_ma15_assigment_8 | noc20_ma15_assigment_8 |
| Sl.No | Chapter Name | MP4 Download |
|---|---|---|
| 1 | Functions of several variables | Download |
| 2 | Limits for multivariable functions-I | Download |
| 3 | Limits for multivariable functions-II | Download |
| 4 | Continuity of multivariable functions | Download |
| 5 | Partial Derivatives-I | Download |
| 6 | Partial Derivatives-II | Download |
| 7 | Differentiability-I | Download |
| 8 | Differentiability-II | Download |
| 9 | Chain rule-I | Download |
| 10 | Chain rule-II | Download |
| 11 | Change of variables | Download |
| 12 | Euler’s theorem for homogeneous functions | Download |
| 13 | Tangent planes and Normal lines | Download |
| 14 | Extreme values-I | Download |
| 15 | Extreme values-II | Download |
| 16 | Lagrange multipliers | Download |
| 17 | Taylor’s theorem | Download |
| 18 | Error approximation | Download |
| 19 | Polar-curves | Download |
| 20 | Multiple Integrals | Download |
| 21 | Change Of Order Of Integration | Download |
| 22 | Change of Variables in Multiple Integral | Download |
| 23 | Introduction to Gamma Function | Download |
| 24 | Introduction to Beta Function | Download |
| 25 | Properties of Beta and Gamma Functions-I | Download |
| 26 | Properties of Beta and Gamma Functions-II | Download |
| 27 | Dirichlet's Integral | Download |
| 28 | Applications of Multiple Integrals | Download |
| 29 | Vector Differentiation | Download |
| 30 | Gradient of a Scalar Field and Directional Derivative | Download |
| 31 | Normal Vector and Potential field | Download |
| 32 | Gradient(Identities), Divergence and Curl(Identities) | Download |
| 33 | Some Identities on Divergence and Curl | Download |
| 34 | Line Integral (I) | Download |
| 35 | Applications of Line Integrals | Download |
| 36 | Green's Theorem | Download |
| 37 | Surface Area | Download |
| 38 | Surface Integral | Download |
| 39 | Divergence Theorem of Gauss | Download |
| 40 | Stoke's Theorem | Download |
| Sl.No | Chapter Name | English |
|---|---|---|
| 1 | Functions of several variables | Download Verified |
| 2 | Limits for multivariable functions-I | Download Verified |
| 3 | Limits for multivariable functions-II | Download Verified |
| 4 | Continuity of multivariable functions | Download Verified |
| 5 | Partial Derivatives-I | Download Verified |
| 6 | Partial Derivatives-II | Download Verified |
| 7 | Differentiability-I | Download Verified |
| 8 | Differentiability-II | Download Verified |
| 9 | Chain rule-I | Download Verified |
| 10 | Chain rule-II | Download Verified |
| 11 | Change of variables | Download Verified |
| 12 | Euler’s theorem for homogeneous functions | Download Verified |
| 13 | Tangent planes and Normal lines | Download Verified |
| 14 | Extreme values-I | Download Verified |
| 15 | Extreme values-II | Download Verified |
| 16 | Lagrange multipliers | Download Verified |
| 17 | Taylor’s theorem | Download Verified |
| 18 | Error approximation | Download Verified |
| 19 | Polar-curves | Download Verified |
| 20 | Multiple Integrals | Download Verified |
| 21 | Change Of Order Of Integration | Download Verified |
| 22 | Change of Variables in Multiple Integral | Download Verified |
| 23 | Introduction to Gamma Function | Download Verified |
| 24 | Introduction to Beta Function | Download Verified |
| 25 | Properties of Beta and Gamma Functions-I | Download Verified |
| 26 | Properties of Beta and Gamma Functions-II | Download Verified |
| 27 | Dirichlet's Integral | Download Verified |
| 28 | Applications of Multiple Integrals | Download Verified |
| 29 | Vector Differentiation | Download Verified |
| 30 | Gradient of a Scalar Field and Directional Derivative | Download Verified |
| 31 | Normal Vector and Potential field | Download Verified |
| 32 | Gradient(Identities), Divergence and Curl(Identities) | Download Verified |
| 33 | Some Identities on Divergence and Curl | Download Verified |
| 34 | Line Integral (I) | Download Verified |
| 35 | Applications of Line Integrals | Download Verified |
| 36 | Green's Theorem | Download Verified |
| 37 | Surface Area | Download Verified |
| 38 | Surface Integral | Download Verified |
| 39 | Divergence Theorem of Gauss | Download Verified |
| 40 | Stoke's Theorem | Download Verified |
| Sl.No | Language | Book link |
|---|---|---|
| 1 | English | Download |
| 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 |