| 1 | Sets, Numbers, Exponents and Roots, Quadratic Equations and Inequalities | [1]p. 10-28 |
| 2 | Analytical examination of the line, Analytical examination of the circle, Functions | [1]p. 29-48 |
| 3 | Types of functions, Some practical drawings, Trigonometric functions | [1]p 48-78 |
| 4 | Exponential and Logarithmic functions, Hyperbolic functions and their inverses | [1]p. 78-90 |
| 5 | Limit, some trigonometric limits | [1]p. 90-95, 102-105 |
| 6 | Right and left sided limits, Uncertain cases | [1]p 95-106 |
| 7 | Continuity, Properties of continuous functions on a closed interval, Types of discontinuity | [1]p. 109-116 |
| 8 | Derivative concept, derivative definition and derivative calculation. Derivative definition, rules of derivation | [1]p. 122-131 |
| 9 | Derivative of Inverse Function, Trigonometric and inverse trigonometric functions, Exponential and logarithmic functions | [1]p. 132-144 |
| 10 | Derivative of hyperbolic functions, Derivative of inverse hyperbolic functions, Parametric differentiation, Derivative of implicit functions | [1]p. 146-151 |
| 11 | Higher order derivatives, Geometric meaning of derivative, Physical applications of derivative | [1]p. 152-168 |
| 12 | Maximum-minimum problems, Asymptotes | [1]p. 171-185 |
| 13 | Theorems on derivatives, Convex functions, Indeterminate shapes, Differentials | [1]p. 186- 202 |
| 14 | Curve Drawings | [1]p. 205-316 |