AM – 102-ENGINEERING MATHEMATICS – II |
PART – A |
1. Matrices: Linear dependence of vectors and rank of matrices. Elementary
transformation, Gauss- Jordan method to find inverse of a matrix, reduction
to normal form, Consistency and solution of algebraic equations, Linear
transformations, Orthogonal transformations, Eigen values, Eigen Vectors,
Cayley Hamilton Theorem, Reduction to diagonal form, bilinear and
quadratic form, Orthogonal, unitary, Hermitian and similar matrices.
2. Ordinary Differential Equations: Exact Differential equations, equations
reducible to exact form by integrating factors; Equations of the first order and
higher degree. Clairaut’s equation.
3. Linear Differential Equations : Leibniz’s linear and Bernoulli’s equation,
methods of finding complementary functions and particular integrals.
Special methods for finding particular integrals: (i) method of variation of
parameters (ii) method of underdetermined coefficients. Cauchy’s
homogeneous and Legendre’s linear equation. Simultaneous linear equations
with constant coefficients.
4. Applications of Differential Equations: Applications to electric/electronic
L-R-C circuits. Deflection of beams, Simple harmonic motion, Oscillation of
a spring.
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PART-B |
5. Vector Calculus: Scalar and vector fields, differentiation of vectors, velocity
and acceleration. Vector differential operators Del, Gradient, Divergence
and curl, their physical interpretation. Formulae involving Del applied to
point functions and their products. Line, surface and volume integrals.
6. Application of Vector Calculus: Flux, solenoidal and irrotational vectors.
Gauss Divergence theorem. Green’s theorem in plane. Stoke’s theorem.
Applications to electro magnetics and fluid mechanics.
7. Statistics: Recapitulation of statistics and probability. Discrete and
continuous probability distributions. Binomial, Poisson and Normal
distribution, applications. Curve fitting.
8. Sampling and Testing of Hypothesis: Sampling methods. Student’s t-test,
Chi-square test, F-test and Fisher’s z-test.
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TEXT BOOKS |
1. Jain, R.K. and lyengar, S.R.K., Advanced Engineering Mathematics, Narosa
Publishing House, New Delhi.
2. Grewal, B.S., Higher Engineering Mathematics, Khanna Publishers, Delhi
3. Kreyszig, E., Advanced Engineering Mathematics, John Wiley.
4. Sastry, S.S., Engineering Mathematics, Vol. I & II, Prentice Hall of India, New
Delhi.
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REFERENCE BOOK |
1. Zill, D.G. and Cullen, M.R., Advanced Engineering Mathematics, CBS
Publishers
2. O’Nell, P.V., Advanced Engineering Mathematics, Brooks / Cole Publishing.
3. Pipes, L.A. and Harvill, L.R., Applied Mathematics for Engineers and Physicists,
McGraw Hill.
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