| Sl.No | Chapter Name | MP4 Download |
|---|---|---|
| 1 | Lecture 1 : Introduction to the Course | Download |
| 2 | Lecture 2 : Concept of a Set, Ways of Representing Sets | Download |
| 3 | Lecture 3 : Venn Diagrams, Operations on Sets | Download |
| 4 | Lecture 4 : Operations on Sets, Cardinal Number, Real Numbers | Download |
| 5 | Lecture 5 : Real Numbers, Sequences | Download |
| 6 | Lecture 6 : Sequences, Convergent Sequences, Bounded Sequences | Download |
| 7 | Lecture 7 : Limit Theorems, Sandwich Theorem, Monotone Sequences, Completeness of Real Numbers | Download |
| 8 | Lecture 8 : Relations and Functions | Download |
| 9 | Lecture 9 : Functions, Graph of a Functions, Function Formulas | Download |
| 10 | Lecture 10 : Function Formulas, Linear Models | Download |
| 11 | Lecture 11 : Linear Models, Elasticity, Linear Functions, Nonlinear Models, Quadratic Functions | Download |
| 12 | Lecture 12 : Quadratic Functions, Quadratic Models, Power Function, Exponential Function | Download |
| 13 | Lecture 13 : Exponential Function, Exponential Models, Logarithmic Function | Download |
| 14 | Lecture 14 : Limit of a Function at a Point, Continuous Functions | Download |
| 15 | Lecture 15 : Limit of a Function at a Point | Download |
| 16 | Lecture 16 : Limit of a Function at a Point, Left and Right Limits | Download |
| 17 | Lecture 17 : Computing Limits, Continuous Functions | Download |
| 18 | Lecture 18 : Applications of Continuous Functions | Download |
| 19 | Lecture 19 : Applications of Continuous Functions, Marginal of a Function | Download |
| 20 | Lecture 20 : Rate of Change, Differentiation | Download |
| 21 | Lecture 21 : Rules of Differentiation | Download |
| 22 | Lecture 22 : Derivatives of Some Functions, Marginal, Elasticity | Download |
| 23 | Lecture 23 : Elasticity, Increasing and Decreasing Functions, Optimization, Mean Value Theorem | Download |
| 24 | Lecture 24 : Mean Value Theorem, Marginal Analysis, Local Maxima and Minima | Download |
| 25 | Lecture 25 : Local Maxima and Minima | Download |
| 26 | Lecture 26 : Local Maxima and Minima, Continuity Test, First Derivative Test, Successive Differentiation | Download |
| 27 | Lecture 27 : Successive Differentiation, Second Derivative Test | Download |
| 28 | Lecture 28 : Average and Marginal Product, Marginal of Revenue and Cost, Absolute Maximum and Minimum | Download |
| 29 | Lecture 29 : Absolute Maximum and Minimum | Download |
| 30 | Lecture 30 : Monopoly Market, Revenue and Elasticity | Download |
| 31 | Lecture 31 : Property of Marginals, Monopoly Market, Publisher v/s Author Problem | Download |
| 32 | Lecture 32 : Convex and Concave Functions | Download |
| 33 | Lecture 33 : Derivative Tests for Convexity, Concavity and Points of Inflection, Higher Order Derivative Conditions | Download |
| 34 | Lecture 34 : Convex and Concave Functions, Asymptotes | Download |
| 35 | Lecture 35 : Asymptotes, Curve Sketching | Download |
| 36 | Lecture 36 : Functions of Two Variables, Visualizing Graph, Level Curves, Contour Lines | Download |
| 37 | Lecture 37 : Partial Derivatives and Application to Marginal Analysis | Download |
| 38 | Lecture 38 : Marginals in Cobb-Douglas model, partial derivatives and elasticity, chain rules | Download |
| 39 | Lecture 39 : Chain Rules, Higher Order Partial Derivatives, Local Maxima and Minima, Critical Points | Download |
| 40 | Lecture 40 : Saddle Points, Derivative Tests, Absolute Maxima and Minima | Download |
| 41 | Lecture 41 : Some Examples, Constrained Maxima and Minima | Download |
| Sl.No | Chapter Name | English |
|---|---|---|
| 1 | Lecture 1 : Introduction to the Course | Download Verified |
| 2 | Lecture 2 : Concept of a Set, Ways of Representing Sets | Download Verified |
| 3 | Lecture 3 : Venn Diagrams, Operations on Sets | Download Verified |
| 4 | Lecture 4 : Operations on Sets, Cardinal Number, Real Numbers | Download Verified |
| 5 | Lecture 5 : Real Numbers, Sequences | Download Verified |
| 6 | Lecture 6 : Sequences, Convergent Sequences, Bounded Sequences | Download Verified |
| 7 | Lecture 7 : Limit Theorems, Sandwich Theorem, Monotone Sequences, Completeness of Real Numbers | Download Verified |
| 8 | Lecture 8 : Relations and Functions | Download Verified |
| 9 | Lecture 9 : Functions, Graph of a Functions, Function Formulas | Download Verified |
| 10 | Lecture 10 : Function Formulas, Linear Models | Download Verified |
| 11 | Lecture 11 : Linear Models, Elasticity, Linear Functions, Nonlinear Models, Quadratic Functions | Download Verified |
| 12 | Lecture 12 : Quadratic Functions, Quadratic Models, Power Function, Exponential Function | Download Verified |
| 13 | Lecture 13 : Exponential Function, Exponential Models, Logarithmic Function | Download Verified |
| 14 | Lecture 14 : Limit of a Function at a Point, Continuous Functions | Download Verified |
| 15 | Lecture 15 : Limit of a Function at a Point | Download Verified |
| 16 | Lecture 16 : Limit of a Function at a Point, Left and Right Limits | Download Verified |
| 17 | Lecture 17 : Computing Limits, Continuous Functions | Download Verified |
| 18 | Lecture 18 : Applications of Continuous Functions | Download Verified |
| 19 | Lecture 19 : Applications of Continuous Functions, Marginal of a Function | Download Verified |
| 20 | Lecture 20 : Rate of Change, Differentiation | Download Verified |
| 21 | Lecture 21 : Rules of Differentiation | Download Verified |
| 22 | Lecture 22 : Derivatives of Some Functions, Marginal, Elasticity | Download Verified |
| 23 | Lecture 23 : Elasticity, Increasing and Decreasing Functions, Optimization, Mean Value Theorem | Download Verified |
| 24 | Lecture 24 : Mean Value Theorem, Marginal Analysis, Local Maxima and Minima | Download Verified |
| 25 | Lecture 25 : Local Maxima and Minima | Download Verified |
| 26 | Lecture 26 : Local Maxima and Minima, Continuity Test, First Derivative Test, Successive Differentiation | Download Verified |
| 27 | Lecture 27 : Successive Differentiation, Second Derivative Test | Download Verified |
| 28 | Lecture 28 : Average and Marginal Product, Marginal of Revenue and Cost, Absolute Maximum and Minimum | Download Verified |
| 29 | Lecture 29 : Absolute Maximum and Minimum | Download Verified |
| 30 | Lecture 30 : Monopoly Market, Revenue and Elasticity | Download Verified |
| 31 | Lecture 31 : Property of Marginals, Monopoly Market, Publisher v/s Author Problem | Download Verified |
| 32 | Lecture 32 : Convex and Concave Functions | Download Verified |
| 33 | Lecture 33 : Derivative Tests for Convexity, Concavity and Points of Inflection, Higher Order Derivative Conditions | Download Verified |
| 34 | Lecture 34 : Convex and Concave Functions, Asymptotes | Download Verified |
| 35 | Lecture 35 : Asymptotes, Curve Sketching | Download Verified |
| 36 | Lecture 36 : Functions of Two Variables, Visualizing Graph, Level Curves, Contour Lines | Download Verified |
| 37 | Lecture 37 : Partial Derivatives and Application to Marginal Analysis | Download Verified |
| 38 | Lecture 38 : Marginals in Cobb-Douglas model, partial derivatives and elasticity, chain rules | Download Verified |
| 39 | Lecture 39 : Chain Rules, Higher Order Partial Derivatives, Local Maxima and Minima, Critical Points | Download Verified |
| 40 | Lecture 40 : Saddle Points, Derivative Tests, Absolute Maxima and Minima | Download Verified |
| 41 | Lecture 41 : Some Examples, Constrained Maxima and Minima | 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 |