CONTENTS:-
Î-d Definition of The Limit of A Function; Continuous Functions and Classification of Discontinuties; Differentiability; Rolle’s Theorem, First and Second Mean Value Theorem, Taylor’s Theorem with Lagrange’s and Cauchy’s Forms of Remainder; Successive Differentiation and Leibnitz’s Theorem; Expansion of Functions; Indeterminate Forms; Partial Differentiations; Sequence; Infinite Series; Tangents and Normal; Curvature; Envelops, Evolutes and Involutes; Asymptotes; Singular Points : Curve Tracing; Real Numbers System; Beta and Gamma Function; Length of Curves (Rectification); Quadrature; Surface and Volume of Solids of Revolution; Multiple Integrals; Riemann Integral; Improper Integrals; Differentiation and Integration of Vectors; Gradient, Divergence and Curl; Green's Gauss's and Stoke's Theorems
