Latest EAMCET Syllabus for Engineering with pdf

Sep 10 • Exam Syllabus, General • 4314 Views • 1 Comment on Latest EAMCET Syllabus for Engineering with pdf

EAMCET Engineering, Agricultural and Medical Common Entrance Test is conducted by Jawaharlal Nehru Technological University for admission into various professional courses offered in University/ Private Colleges in the state of Andhra Pradesh.  Around 300,000 students appear for the engineering of EAMCET. This exam is based on Multiple Choice Questions type. We have attached the EAMCET Engineering syllabus in pdf to download.

Eligibility of EAMCET 

  • Intermediate Passed Candidates & Intermediate (12th) Appearing Candidates
  • Candidates should belong to the State of Andhra Pradesh
  • No Upper Age Limit
syllabus of eamcet

Admissions into AP

Top Colleges in Andhra Pradesh under EAMCET

  • OU College of Engineering,Hyderabad
  • JNTU, Hyderabad
  • AU College of Engineering, Visakhapatnam
  • CBIT, Hyderabad
  • JNTU, Kakinada, East Godavari
  • SVU College of Engineering, Tirupati
  • Vasavi College of Engineering, Rangareddy
  • JNTU, Ananthapur
  • Gayatri Vidyaparshit College of Engineering, Madhuravada, Visakhapatnam
  • Sri Nidhi Institute of Science and Technology, Ghatkesar, Rangareddy
  • MVSR Engineering College, Nadhargul, Visakhapatnam
  • RVR and JC College of Engineering, Chodavaram, Guntur
  • VNR Vignan Jyothi Institute of Engineering and Technology, Rangareddy
  • Gokaraju Rangaraju Institute Engineering & Technology, Miyapur, Rangareddy
  • VR Siddartha Engineering College, Vijayawada

Courses Options

  • B.E. / B.Tech.
  • B.Tech. in Ag. Engg.
  • B.Tech. in Bio-Technology
  • B.Tech. in Dairy Technology
  • B.Tech. in Food Science & Technology
  • B.Sc. in CA & BM
  • B.Pharm
  • Pharm-D

EAMCET Syllabus for Engineering

Section I
Subject :  Mathematics


    • a) Functions – Types of functions
      b) Mathematical induction and Applications
      c) Permutations and Combinations – linear and circular permutations.
      d) Binomial theorem for any rational index – applications
      e) Partial fractions
      f) Exponential
      g) Quadratic expressions, equations.
      h) Theory of equations : Relations between the roots and Coefficients in any equation – Transformation of equations – reciprocal equations.
      i) Matrices and determinants : Types of matrices Properties of determinants and three variables – Consistency and inconsistency of simultaneous equations.
      j) Complex numbers and their properties : Applications
      a) Trigonometric functions
      b) Trigonometric ratios of compound angles, multiple and sub-multiple angles, Transformations
      c) Trigonometric equations
      d) Inverse trigonometric functions
      e) Hyperbolic and inverse hyperbolic functions
      f) Properties of Triangles
      g) Heights and distances
      a) Algebra of vectors
      b) Scalar and vector product of two vectors
      c) Scalar and vector triple products, Scalar and vector products of four vectors
      a) Random experiments – Sample space – events – probability of an event – addition and multiplication theorems of probability – Conditional event and conditional probability
      b) Random variables
      a) Locus, Translation of axes, rotation of axes
      b) Straight line
      c) Pair of straight lines
      d) Circles
      e) System of circles
      f) Conics – Parabola – Hyperbola, normal,and polar at any point of these conics, asymptotes of hyperbola.
      g) Polar Coordinates
      h) Coordinates in three dimensions and tetrahedron.
      i) Direction Cosines and direction ratios of a line – angle between two lines
      j) Cartesian equation of a plane in (i) general form (ii) normal form and (iii) intercept form) Sphere – Cartesian equation – Centre and radius
      a) Functions – limits – Continuity
      b) Differentiation – Methods of differentiation
      c) Successive differentiation – Leibnitz’s theorem and its applications
      d) Applications of differentiation
      e) Partial differentiation including Euler’s theorem on homogeneous functions
      f) Integration – methods of integration
      g) Definite integrals and their applications to areas – reduction formulae
      h) Numerical integration – Trapezoidal and Simpson’s rules
      i) Differential equations order and degree – Formation of differential equations , Solution of differential equation by variables separable method , Solving homogeneous and linear differential equations of first order and first degree.

Section II 
 Subject : Physics

    • Work, Energy and Power
    • Waves
    • Thermal and Chemical Effects of Currents
    • Solids and Semiconductor Devices
    • Rotational Motion
    • Ray Optics and Optical Instruments
    • Oscillations
    • Magnetism
    • Magnetic Effect of Currents
    • Laws of Motion
    • Introduction and Measurement
    • Heat and Thermodynamics
    • Gravitation
    • Electrostatics
    • Electrons and Photons
    • Electromagnetic Waves (Qualitative Treatment)
    • Electromagnetic Induction and Alternating Currents
    • Description of Motion in Two and Three Dimensions
    • Description of Motion in One Dimension
    • Current Electricity
    • Atoms, Molecules and Nuclei

Subject : Chemistry

  • The d-and f-Block elements
  • Surface chemistry
  • States of matter
  • Some basic principles of Organic Chemistry
  • Some basic concepts in Chemistry
  • Solutions
  • Solid state Chemistry
  • s-Block Elements (Alkali and Alkaline Earth metals)
  • Redox reactions
  • Purification and characterization of carbon compounds
  • Polymers
  • p-Block Elements
  • Organic compounds with functional groups containing oxygen
  • Organic compounds with functional groups containing halogens (X)
  • Organic Compounds with functional group containing nitrogen
  • Hydrogen
  • Hydrocarbons
  • General principles and processes of isolation of elements
  • Equilibrium
  • Environmental Chemistry
  • Electrochemistry
  • Coordination Compounds
  • Classification of elements and periodicity in properties
  • Chemistry in everyday life
  • Chemical Thermodynamics
  • Chemical Kinetics
  • Chemical Energetics
  • Chemical bonding
  • Biomolecules
  • Atomic structure

DOWNLOAD EAMCET Syllabus for Engineering.PDF

Related Links : 

1. Sample Paper for EAMCET
2. Engineering EAMCET Paper
3. Top Coaching Centres for EAMCET in Andhra Pradesh



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