The course will enable the students to
CourseOutcomes (COs):
Learning Outcome (at course level) | Learning and teaching strategies | Assessment Strategies |
---|---|---|
CO 19 Build a foundation of basic mathematical concepts needed for general computations. CO 20 Analyse, solve and compute real-world applications of mathematics. CO 21 Solve applied problems using matrices, differentiation and integration. CO 22 Demonstrate a working knowledge of set notation and elementary set theory. CO 23Compute limits, derivatives, and definite & indefinite integrals of algebraic, logarithmic and exponential functions. CO 24 Solve discrete mathematics problems that involve: computing permutations and combinations of a set. | Approach in teaching: Interactive Lectures, Discussion, Tutorials, Reading assignments, Demonstration.
Learning activities for the students: Self-learning assignments, Effective questions, Giving tasks.
| Class test, Semester end examinations, Quiz, Solving problems in tutorials, Assignments, Presentation. |
Matrices, Types of Matrices, Operations of addition, Scalar Multiplication and Multiplication of Matrices, Determinant of a Square Matrix, Minors and Cofactors. Transpose, adjoint and inverse of a matrix. Solving system of linear equations in two or three variables using inverse of a matrix.
Sets, Relation & Functions: Definition of Set, Type of Sets, Operations on Sets, Venn diagram, Cartesian Product, Relations, Functions, Types of function, Some elementary functions with their graphs (Exponential, logarithmic, modulus). Limit & continuity of a function (Simple Problems).
Differentiation: Derivative and its meaning, Differentiation of algebraic, trigonometric, exponential & logarithmic functions, Rules of Differentiation, Differentiation by substitution, Second order differentiation, Maxima and Minima of simple functions.
Integration: - Indefinite Integrals, Rules of Integration, Integration by substitution, Integration by Partial Fractions, Definite Integration, Properties of Definite Integral, finding areas of simple closed curves.
Permutation and Combination: Fundamental Principles of Counting, Addition Principle, Factorial, Permutations, Combinations. Coordinate Geometry: - 2D Cartesian Co-ordinate system. Straight line (Equation & Slope of a line). Circle: Equation of Circle, Equation to Tangent.