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Module Details

Course : P-06. Calculus Of Several Variables

Subject : Mathematics

No. of Modules : 70

Level : PG

Source : E-PG Pathshala

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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