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Definition of the limit of a function, Continuous functions and classification of discontinuities, Differentiability, Chain rule of differentiabilit .... Read More
Definition of the limit of a function, Continuous functions and classification of discontinuities, Differentiability, Chain rule of differentiability, Rolle's theorem, First and second mean value theorems, Taylor's theorems with Lagrange's and Cauchy's forms of remainder, Successive differentiation and Leibnitz's theorem.
Sr | Chapter Name | No Of Page |
---|---|---|
1 | Real Number System | 28 |
2 | Limit and Continuity | 55 |
3 | Differentiability | 53 |
4 | Successive Differentiation | 34 |
5 | Expansions of Functions | 23 |
6 | Indeterminate Form | 25 |
7 | Partial Differentiations | 40 |
8 | Jacobians | 25 |
9 | Maxima and Minima | 20 |
10 | Tangent and Normals | 19 |
11 | Curvature | 38 |
12 | Envelopes and Evolutes | 47 |
13 | Asymptotes | 38 |
14 | Singular Points and Curve Tracing | 27 |
15 | Reduction Formulae | 38 |
16 | Beta and Gamma Function | 26 |
17 | Rectification of Curves | 24 |
18 | Quadrature (Area of Bounded Curves) | 31 |
19 | Multiple Integrals | 31 |