Course : P-06. Calculus Of Several Variables
Subject : Mathematics
No. of Modules : 70
| Sr. No. | Title | E-Text | Video | URL | Metadata |
|---|---|---|---|---|---|
| 1 | M-04. limits and continuity of scalar fields | - | Click Here | ||
| 2 | M-07. properties of vector derivatives | - | Click Here | ||
| 3 | M-02. scalar and vector fields | - | Click Here | ||
| 4 | M-03. linear transformations | - | Click Here | ||
| 5 | M-05. partial derivatives | - | Click Here | ||
| 6 | M-06. vector derivatives | - | Click Here | ||
| 7 | M-01. meaning of rn | - | Click Here | ||
| 8 | M-08. total derivative | - | - | Click Here | |
| 9 | M-14. on equality of mixed partial derivatives | - | Click Here | ||
| 10 | M-16. limits and continuity of vector fields | - | Click Here | ||
| 11 | M-17. vector derivative of a vector field | - | Click Here | ||
| 12 | M-13. homogeneous functions and euler's theorem | - | Click Here | ||
| 13 | M-12. chain rule for derivatives of scalar fields | - | Click Here | ||
| 14 | M-11. sufficient conditions for differentiability | - | Click Here | ||
| 15 | M-09. discussions on differentiability | - | Click Here | ||
| 16 | M-10. gradient of a scalar field | - | Click Here | ||
| 17 | M-15. taylor series for scalar fields | - | Click Here | ||
| 18 | M-26. necessary and sufficient conditions for a vector field to be gradient | - | Click Here | ||
| 19 | M-21. mean value theorem for a differentiable vector field | - | Click Here | ||
| 20 | M-19. discussions on differentiability of a vector field | - | Click Here | ||
| 21 | M-25. fundamental theorems of calculus on line integrals | - | Click Here | ||
| 22 | M-20. jacobian matrix of a differentiable vector field | - | Click Here | ||
| 23 | M-18. total derivative of a vector field | - | Click Here | ||
| 24 | M-23. on curves and their lengths | - | Click Here | ||
| 25 | M-22. introduction to integration | - | Click Here | ||
| 26 | M-24. on line integrals | - | Click Here | ||
| 27 | M-35. inverse function theorem and implicit function theorem | - | Click Here | ||
| 28 | M-34. stokes' theorem and divergence theorem | - | Click Here | ||
| 29 | M-30. change of variables in double integral | - | Click Here | ||
| 30 | M-32. introduction to surfaces | - | Click Here | ||
| 31 | M-29. green's theorem | - | Click Here | ||
| 32 | M-31. multiple integrals | - | Click Here | ||
| 33 | M-27. double integrals i | - | Click Here | ||
| 34 | M-33. surface integrals | - | Click Here | ||
| 35 | M-28. double integrals ii | - | - | Click Here | |
| 36 | M-02. scalar and vector fields | - | Click Here | ||
| 37 | M-03. linear transformations | - | Click Here | ||
| 38 | M-01. meaning of rn | - | Click Here | ||
| 39 | M-12. chain rule for derivatives of scalar fields | - | Click Here | ||
| 40 | M-11. sufficient conditions for differentiability | - | Click Here | ||
| 41 | M-04. limits and continuity of scalar fields | - | Click Here | ||
| 42 | M-07. properties of vector derivatives | - | Click Here | ||
| 43 | M-09. discussions on differentiability | - | Click Here | ||
| 44 | M-10. gradient of a scalar field | - | Click Here | ||
| 45 | M-05. partial derivatives | - | Click Here | ||
| 46 | M-06. vector derivatives | - | Click Here | ||
| 47 | M-08. total derivative | - | - | Click Here | |
| 48 | M-21. mean value theorem for a differentiable vector field | - | Click Here | ||
| 49 | M-19. discussions on differentiability of a vector field | - | Click Here | ||
| 50 | M-20. jacobian matrix of a differentiable vector field | - | Click Here | ||
| 51 | M-14. on equality of mixed partial derivatives | - | Click Here | ||
| 52 | M-16. limits and continuity of vector fields | - | Click Here | ||
| 53 | M-18. total derivative of a vector field | - | Click Here | ||
| 54 | M-17. vector derivative of a vector field | - | Click Here | ||
| 55 | M-13. homogeneous functions and euler's theorem | - | Click Here | ||
| 56 | M-15. taylor series for scalar fields | - | Click Here | ||
| 57 | M-26. necessary and sufficient conditions for a vector field to be gradient | - | Click Here | ||
| 58 | M-25. fundamental theorems of calculus on line integrals | - | Click Here | ||
| 59 | M-30. change of variables in double integral | - | Click Here | ||
| 60 | M-23. on curves and their lengths | - | Click Here | ||
| 61 | M-22. introduction to integration | - | Click Here | ||
| 62 | M-29. green's theorem | - | Click Here | ||
| 63 | M-28. double integrals ii | - | Click Here | ||
| 64 | M-27. double integrals i | - | Click Here | ||
| 65 | M-24. on line integrals | - | Click Here | ||
| 66 | M-35. inverse function theorem and implicit function theorem | - | Click Here | ||
| 67 | M-34. stokes' theorem and divergence theorem | - | Click Here | ||
| 68 | M-32. introduction to surfaces | - | Click Here | ||
| 69 | M-31. multiple integrals | - | Click Here | ||
| 70 | M-33. surface integrals | - | Click Here |
