SYLLABUS FOR UNION
PUBLIC SERVICE COMMISSION MAIN EXAMINATION
MATHEMATICS
PAPER
- I
(1)
Linear Algebra:
Vector
spaces over R and C, linear dependence and independence, subspaces, bases,
dimension; Linear transformations, rank and nullity, matrix of a linear
transformation. Algebra of Matrices; Row and column reduction, Echelon form,
congruence’s and similarity; Rank of a matrix; Inverse of a matrix; Solution of
system of linear equations; Eigenvalues and eigenvectors, characteristic
polynomial, Cayley- Hamilton theorem, Symmetric, kewsymmetric, Hermitian, skew-Hermitian,
orthogonal and unitary matrices and their
eigenvalues.
(2)
Calculus:
Real
numbers, functions of a real variable, limits, continuity, differentiability,
mean-value theorem, Taylor’s theorem with remainders, indeterminate forms,
maxima and minima, asymptotes; Curve tracing; Functions of two or three
variables: limits, continuity, partial derivatives, maxima and minima,
Lagrange’s method of multipliers, Jacobian. Riemann’s definition of definite
integrals; Indefinite integrals; Infinite and improper integrals; Double and
triple integrals (evaluation techniques only); Areas, surface and volumes.
(3)
Analytic Geometry:
Cartesian
and polar coordinates in three dimensions, second degree equations in three
variables, reduction to canonical forms, straight lines, shortest distance
between two skew lines; Plane, sphere, cone, cylinder, paraboloid, ellipsoid,
hyperboloid of one and two sheets and their properties.
(4)
Ordinary Differential Equations:
Formulation
of differential equations; Equations of first order and first degree,
integrating factor; Orthogonal trajectory; Equations of first order but not of
first degree, Clairaut’s equation, singular solution. Second and higher order
linear equations with constant coefficients, complementary function, particular
integral and general solution. Second order linear equations with variable
coefficients, Euler-Cauchy equation; Determination of Complete solution when one solution is known
using method of variation of parameters.
Laplace
and Inverse Laplace transforms and their properties; Laplace transforms of
elementary functions. Application to initial value problems for 2nd order
linear equations with constant coefficients.
(5)
Dynamics & Statics:
Rectilinear
motion, simple harmonic motion, motion in a plane, projectiles; constrained
motion; Work and energy, conservation of energy; Kepler’s laws, orbits under
central forces.
Equilibrium
of a system of particles; Work and potential energy, friction; common catenary;
Principle of virtual work; Stability of equilibrium, equilibrium of forces in
three dimensions.
(6)
Vector Analysis:
Scalar
and vector fields, differentiation of vector field of a scalar variable;
Gradient,
divergence
and curl in cartesian and cylindrical coordinates; Higher order derivatives;
Vector identities and vector equations. Application to geometry: Curves in
space, Curvature and torsion; Serret-Frenet’s formulae.Gauss and Stokes’
theorems, Green’s identities.
PAPER
- II
(1)
Algebra:
Groups,
subgroups, cyclic groups, cosets, Lagrange’s Theorem, normal subgroups,
quotient groups, homomorphism of groups, basic isomorphism theorems,
permutation groups, Cayley’s theorem. Rings, subrings and ideals, homomorphisms
of rings; Integral domains, principal ideal domains, Euclidean domains and
unique factorization domains; Fields, quotient fields.
(2)
Real Analysis:
Real
number system as an ordered field with least upper bound property; Sequences,
limit of a sequence, Cauchy sequence, completeness of real line; Series and its
convergence, absolute and conditional convergence of series of real and complex
terms, rearrangement
of
series. Continuity and uniform continuity of functions, properties of
continuous functions
on
compact sets. Riemann integral, improper integrals Fundamental theorems of
integral calculus. Uniform convergence, continuity, differentiability and
integrability for sequences
and
series of functions; Partial derivatives of functions of several (two or three)
variables, maxima and minima.
(3)
Complex Analysis:
Analytic
functions, Cauchy-Riemann equations, Cauchy’s theorem, Cauchy’s integral
formula, power series representation of an analytic function, Taylor’s series;
Singularities; Laurent’s series; Cauchy’s residue theorem; Contour integration.
(4)
Linear Programming:
Linear
programming problems, basic solution, basic feasible solution and optimal
solution; Graphical method and simplex method of solutions; Duality.
Transportation and assignment problems.
(5)
Partial differential equations:
Family
of surfaces in three dimensions and formulation of partial differential
equations; Solution of quasilinear partial differential equations of the first
order, Cauchy’s method of characteristics; Linear partial differential
equations of the second order with constant coefficients, canonical form;
Equation of a vibrating string, heat equation, Laplace equation
and
their solutions.
(6)
Numerical Analysis and Computer programming:
Numerical
methods: Solution of algebraic and transcendental equations of one variable
by
bisection, Regula-Falsi and Newton-Raphson methods; solution of system of
linear equations by Gaussian elimination and Gauss-Jordan (direct),
Gauss-Seidel(iterative) methods. Newton’s (forward and backward) interpolation,
Lagrange’s interpolation.
Numerical
integration: Trapezoidal rule, Simpson’s rules, Gaussian quadrature formula.
Numerical
solution of ordinary differential equations: Euler and Runga Kutta-methods.
Computer
Programming: Binary system; Arithmetic and logical operations on numbers;
Octal
and Hexadecimal systems; Conversion to and from decimal systems; Algebra of
binary numbers. Elements of computer systems and concept of memory; Basic logic gates and
truth
tables, Boolean algebra, normal forms.
Representation of unsigned integers, signed integers and reals, double
precision reals and long integers. Algorithms and flow charts for solving
numerical analysis problems.
(7)
Mechanics and Fluid Dynamics:
Generalized
coordinates; D’ Alembert’s principle and Lagrange’s equations; Hamilton
equations; Moment of inertia; Motion of rigid bodies in two dimensions.
Equation of continuity; Euler’s equation of motion for inviscid flow;
Stream-lines, path of a particle; Potential flow; Twodimensional and
axisymmetric motion; Sources and sinks, vortex motion;
Navier-Stokes
equation for a viscous fluid.
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