| 1 | Function concept, Relation, Properties of Continuous Function | [1] S.37-58, [2] S.31-44, [3] S. 100-162, [1] S.121-127, [2] S. 170-192, [3] S. 358-415 |
| 2 | Exponential, Logarithmic, Trigonometric and Inverse Trigonometric Functions | [1] S.37-58, [2] S.31-44, [3] S. 100-162, [1] S.121-127, [2] S. 170-192, [3] S. 358-415 |
| 3 | Limit of functions | [1] S.78-89, [2] S.45-75, [3] S. 162-235 |
| 4 | Continuous Function | [1] S.99-110, [2] S. 131-147, [3] S. 236-352 |
| 5 | Properties of Continuous Function | [1] S.121-127, [2] S. 170-192, [3] S. 358-415 |
| 6 | Derivative Concept and Derivative rules | [1] S.127-139, [2] S. 193-202, [3] S. 417-435 |
| 7 | Derivative of functions, concave-convex functions, Indeterminate shapes | [1] S.127-151, 178-194 [2] S. 193-214, [3] S. 417-476 |
| 8 | Curve Drawing in Cartesian and Polar Coordinates | [1] s. 186-197, [2] s. 272-278, 714-718 |
| 9 | Indefinite Integral and Integration Techniques | [1] s. 254-265, [2] s. 332-350 |
| 10 | Indefinite Integral and Integration Techniques | [1] s. 254-265, [2] s. 332-350 |
| 11 | Fundamental theorems of integral calculus | [1] s. 265-284, [2] s. 356-363, 376-379 |
| 12 | Applications of Definite Integral: Calculation of Area | [1] s. 186-197 |
| 13 | Non-Homogeneous Integrals and relating non-homogeneous integrals to sustainable engineering. | [1] s. 186-197 |