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Mathematical Methods for Economics-I
- To orient the students with the preliminary concepts of mathematics.
- To comprehend the concepts of functions, matrices and determinants.
- To acquaint the students with the technique of differentiation and its applications in economics.
Course Outcomes (COs):
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Course |
Outcome (at course level) |
Learning and teaching strategies |
Assessment Strategies |
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Paper Code |
Paper Title |
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ECO 112 |
Mathematical Methods for Economics-I |
CO5: Students will comprehend the different mathematical techniques like Indices; Surds; Logarithms, linear and quadratic equations. CO6: Students will implement the techniques of functions, differential calculus, matrices and determinants for economic analysis and optimizing functions.
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Approach in teaching: Interactive Lectures and Discussions.
Learning activities for the students: Practice Modules and Assignments. |
Class activity, Assignments and Semester end examinations. |
Basics of a Mathematical Model-variables, constants & parameters, equations & identities; Real-Number System; Sets and sets operations; Indices; Surds; Logarithms; Arithmetic, Geometric and Harmonic Progression; Permutations and combinations; Binomial expansion.
Relations and Functions; Types of Functions- Constant, linear, quadratic, cubic, power, exponential and logarithmic functions;
Linear Equations and Graphs- slopes, intercepts, the slope-intercept form; determining the equation of a straight-line; Systems of equations-Solution by Elimination and Substitution methods, Graphical Solution, Equilibrium Analysis in Economics.
Quadratic equations- solution and applications.
Matrix and matrix operations; determinants: solution and properties; systems of linear equations and their solution.
Nature of Comparative Statics; Rate of change and the derivative; Derivatives and the slope of a curve; Concept of Limit; Limit Theorems; Continuity and Differentiability of a Function.
Rules of differentiation; Higher order derivatives.
Increasing and decreasing functions; Concavity and convexity; Inflection points; Marginal concepts; Optimization- local and global optima using calculus; and its applications.
- Chiang, A. C. & Kevin Wainwright, Fundamental Methods of Mathematical Economics (Fourth Edition), McGraw Hill, 2013.
- Dowling, E. T., Schaum’s Outline of Theory and Problems of Mathematical Methods for Business and Economics, McGraw Hill, .
- K. Sydsaeter and P. Hammond, Mathematics for Economic Analysis, Pearson Educational Asia, Delhi, 2002.
