The syllabus of TS EAMCET (Telangana State Engineering, Agriculture and Medical Common Entrance Test) is as follows:

Subject: MATHEMATICS

1) ALGEBRA :
a) Functions: Types of functions – Definitions - Inverse functions and Theorems - Domain, Range, Inverse of real valued functions.

b)Mathematical Induction : Principle of Mathematical Induction & Theorems - Applications of Mathematical Induction - Problems on divisibility.

c) Matrices:Types of matrices - Scalar multiple of a matrix and multiplication of matrices - Transpose of a matrix - Determinants - Adjoint and Inverse of a matrix -
Consistency and inconsistency of Equations- Rank of a matrix - Solution of simultaneous linear equations.

d) Complex Numbers: Complex number asan ordered pair of real numbers- fundamental operations - Representation of complex numbers in the form a+ib - Modulus and amplitude of complex
numbers –Illustrations - Geometrical and Polar Representation of complex numbers in Argand plane- Argand diagram.

e) De Moivre’s Theorem: De
Moivre’s theorem- Integral and Rational indices - nth roots of unity- Geometrical Interpretations – Illustrations.

f) Quadratic Expressions: Quadratic
expressions, equations in one variable - Sign of quadratic expressions – Change in signs – Maximum and minimum values - Quadratic inequations.

g) Theory of Equations: The relation between the roots and coefficients in an equation - Solving the equations when two or more roots of it are
connected by certain relation - Equation with real coefficients, occurrence of complex roots in conjugate pairs and its consequences - Transformation of
equations - Reciprocal Equations.

h) Permutations and Combinations: Fundamental Principle of counting – linear and circular permutationsPermutations
of ‘n’ dissimilar things taken ‘r’ at a time - Permutations when repetitions allowed - Circular permutations - Permutations with constraint
repetitions - Combinations-definitions, certain theorems.

i) Binomial Theorem: Binomial theorem for positive integral index - Binomial theorem for
rational Index (without proof) - Approximations using Binomial theorem. j) Partial fractions: Partial fractions of f(x)/g(x) when g(x) contains non –repeated
linear factors - Partial fractions of f(x)/g(x) when g(x) contains repeated and/or non-repeated linear factors - Partial fractions of f(x)/g(x) when g(x)
contains repeated and non-repeated irreducible factors only.

Attached Files

EAMCET TS Syllabus.pdf (143.1 KB, 60 views)