Section – A
Matrices

Adjoint and Inverse of a matrix : Transpose of a matrix. Symmetric and skew symmetric matrices. Adjoint of matrix. Inverse of a matrix. Existence and uniqueness of inverse of a matrix, Properties of inverse.
Rank of Matrix : Elementary transformations. Equivalent matrices, Elementary matrices. Rank of a matrix. Invarience of rank under elementary transformations. Reduction of a matrix to its normal form, Non-singular matrix as a product of E-Matrices. Rank of Product of two matrices.
System of linear equations : Consistency and solution of homogeneous and non-homogeneous linear equations.
Eigen Values and Eigen Vectors : Eigen values and eigen vectors of a square matrix. Characteristic equation of a matrix Cayley-Hamilton Theorem (statement only) and verification. Inverse of a matrix by using Cayley-Hamilton Theorem, Differential Equations
Differential Equation of first order and first degree : Homogeneous equation. Non-homogeneous equation. Exact equation. Integrating factor. Linear differential equation. Bernoulli’s differential equation.
Differential Equation of first order and higher degree : Solvable for p, y, x. Clairaut’s equation.
Application of Differential Equations : Orthogonal trajectories, Singular Solutions Envelopes.
Section – B
Geometry
1) Co-ordinates in space, 2) Plane, 3) Line, 4) Sphere
Algebra
5) Divisibility of integers, 6) Congruence classes, 7) Complex numbers, 8) De-Moivre’s Theorem
Graph Theory
9) Graphs, 10) Connected Graphs, 11) Trees, 12) Eulerian and Hamiltonian Graph, 13) Planar and Dual graphs, 14) Directed graph (Digraph), 15) Matrix Representation of a graph