CUCET Mathematics Syllabus

Hello, I want the syllabus of the mathematics course of CUCET exam. Please provide me as I want to apply.

[Kiran Chandar]

Hello, here I am providing you the details of the mathematics course of CUCET exam as under:

Algebra:
Definitions and simple properties of Groups and Subgroups, Permutation group, Cyclic group, Cosets, Lagrange’s theorem on the order of subgroups of a finite order group, Morphism of groups, Cayley’s theorem, Normal subgroups and quotient groups; Definitions and simple properties of Rings and Sub rings, Integral domain and Field.

Real Analysis:
Review of differentiation and integration, Real numbers a complete ordered field, Limit Point, Closed and Open sets, Union and Intersection of such sets; Concept of compactness, Connected sets; Real sequence – Limit and Convergence of a sequence and Monotonic sequences, Cauchy’s sequences and sub sequences; Series – Infinite series and convergent series, Tests for convergences of a series, Alternating series, Absolute convergence, Properties of Functions on closed intervals, Properties of derivable functions, Darbuox’s and Rolle’s theorem, Cauchy’s and Lagrange’s mean value theorems and their applications.

Complex Analysis:
Review of complex number system, Complex trigonometry & exponential functions and their simple properties, Complex Valued Functions – Limits, Continuity and Differentiability. Analytic functions, Cauchy – Riemann equations.

Dynamics:
Velocity and Acceleration – along radial and Transverse directions, along normal and tangential directions; SHM, Hook’s law, Motion in resisting medium – Resistance varies as velocity and square of velocity, Motion on a smooth curve in a vertical plane, Motion on the inside and outside of a smooth vertical circle.

Differential Equations:
Degree and order of a differential equation, Equations of first order and first degree, Equations in which the variables are separable, Homogeneous equations and equations reducible to homogeneous form, Linear equations and equations reducible to linear form, Exact differential equations and equations reducible to exact form, First order but higher degree differential equations, linear differential equations with constant coefficients, Complementary function and particular integral, Homogenous linear differentials equations. Partial differential equations of the first order. Lagrange’s linear equation. Charpit’s general method of solution. Homogeneous and non-homogeneous linear partial differential equations with constant coefficients.

Co-ordinate Geometry for Three Dimensions:
Sphere, Cone and Cylinder.

Calculus:
Curvature, Partial differentiation, Maxima and Minima of functions of two variables, Asymptotes, Multiple Points, Double and Triple Integral, Gamma and Beta functions.

Vector Calculus:
Scalar point functions, Vector point functions, Differentiation and Integration of vector point functions, Directional derivative, Differential operators, Gradient, Divergence and Curl.

Linear programming problem:
Problem Formulation. Graphical solution of linear programming problems. Basic solution. Some basic properties of convex sets, Simplex method for solution of a L.P.P. to simple problems.