Differential Equations
This course will enable the students to -
- Differentiate the different types of Differential Equations and apply the appropriate analytical technique for finding the solution of first order and selected higher order ordinary differential equations.
- Evaluate first order differential equations including separable, homogeneous, exact, and linear.
Course Outcomes (COs):
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Course |
Learning outcomes (at course level) |
Learning and teaching strategies |
Assessment Strategies |
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|---|---|---|---|---|
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Course Code |
Course Title |
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CMAT 201 |
Differential Equations (Theory)
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The students will be able to –
CO9: Distinguish between linear, nonlinear, partial, and ordinary differential equations. CO11: Solve basic application problems described by second order linear differential equations with constant coefficients. CO12: Learn about the solution of first order linear partial differential equations using CO13: Know how to solve second order linear partial differential equations with constant |
Approach in teaching:
Interactive Lectures, Discussion, Power Point Presentations, Informative videos
Learning activities for the students: Self learning assignments, Effective questions, presentations, Giving tasks |
Quiz, Poster Presentations, Power Point Presentations, Individual and group projects, Open Book Test, Semester End Examination
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Linear differential equation of first order first degree and irreducible forms, Exact differential equation and equation which can be made exact using I.F. First order higher degree differential equations solvable for x, y, p, Clairaut’s form.
Linear differential equation with constant coefficients, Complementary function and particular integral, Homogeneous linear differential equations with variable coefficients, Simultaneous differential equations.
Linear differential equation of second order: Linear independence of solutions, Solution by transformation of the equations by changing the dependent and independent variable, Factorization of operators, Method of variation of parameters.
Partial differential equations of the first order, Lagrange’s linear equation, Charpit’s general method of solution.
Linear partial differential equations with constant coefficients: Homogeneous and non Homogeneous linear with all cases.
- Zafar Ahsan, Differential Equations & Their Applications, PHI, New Delhi, 2004.
- J. L. Bansal and H.S. Dhami, Differential Equations, JPH, 2012.
- K.K. Gupta and D.C. Agarwal, Linear Difference Equation, Krishna Prakashan, 2004.
- A.R. Forsyth, A Treatise on Differential Equations, Macmillan and Co. Ltd, London, 2005.
- Frank Ayres, Theory and Problems of Differential Equations, TMH, 2002.
- D. A. Murray, Introductory Course on Differential Equations, Orient Longman, 2004.
- I. N. Sneddon, Elements of Partial Differential Equations, TMH, 2001.
- Walter G. Kelley and Allan C. Peterson, Difference Equation: An Introduction with Applications, Academic Press London, 2001.
- Saber Elaydi, An Introduction to Difference Equation, Springer, 2005.
