I have appeared in EAMCET AC Entrance Exam this year. I am preparing for this Exam also. I need list of participating colleges of EAMCET AC Entrance Exam. So will you provide complete list of all participating colleges?

As you are looking for list of Participating Colleges of EAMCET AC Entrance Exam, so here I am providing complete list:

EAMCET AC Participating Colleges List

Nova College of Engineering & Technology, Vegavaram, Jangareddygudem, W. G. Dt
GDMM College of Engg & Tech, Ramannapet, Nandigama, Krishna Dt
Priyadarsini Institute of Tech & Mgt, Guntur
Newton’s Institute of Science & Tech, Macherla, Gnutur Dt
St. Mary’s Engg. College, Chebrolu,Guntur Dist
St. Mark Educational institution Society group of institutions, Bellari Road, Anthapur
Quba College of Engg & Tech, Nellore
Akshaya Bharathi institute of Technolgy, Kadapa
A1 Global of Engg & Tech, Markapur,Prakasm Dist
St. mary’s College of Pharmacy, Guntur
Priyadarsini Institute of Tech & Science, Guntur
St. Mary’s Women’s Engg. College.,Budampadu , Guntur
Indira Institute of Tech & Sciences, Markapur, Prakasm Dist
Nova’s Institute of Technology, Tangillamudi, Eluru

Here I am giving syllabus of EAMCET AC Entrance Exam for Engineering courses for your reference:

EAMCET AC Entrance Exam Syllabus for Engineering Courses

Mathematics
I. ALGEBRA: (a) Functions – Types of functions – Algebra of real valued functions (b) Mathematical induction and applications
(c) Permutations and Combinations – linear and circular permutations – combinations. (d) Binomial theorem – for a
positive integral index – for any rational index – applications – Binomial Coefficients. (e) Partial fractions (f) Exponential
and logarithmic series (g) Quadratic expressions, equations and inequations in one variable. (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 – Algebra of matrices – Properties of determinants – simultaneous linear
equations in two and three variables – Consistency and inconsistency of simultaneous equations. (j) Complex numbers
and their properties – De Moivre’s theorem – Applications – Expansions of trigonometric functions.

II. TRIGONOMETRY: (a) Trigonometric functions – Graphs – periodicity (b) Trigonometric ratios of compound angles, multiple
and sub-multiple angles, Transformations-sum and product rules (c) Trigonometric equations (d) Inverse trigonometric functions
(e) Hyperbolic and inverse hyperbolic functions (f) Properties of Triangles (g) Heights and distances (in two-dimensional plane).

III. VECTOR ALGEBRA : (a) Algebra of vectors – angle between two non-zero vectors – linear combination of vectors – vector
equation of line and plane (b) Scalar and vector product of two vectors and their applications c) Scalar and vector triple
products, Scalar and vector products of four vectors.

IV. PROBABILITY : (a) Random experiments – Sample space – events – probability of an event – addition and
multiplication theorems of probability – Conditional event and conditional probability - Baye’s theorem (b) Random
variables – Mean and variance of a random variable – Binomial and Poisson distributions

V. COORDINATE GEOMETRY : (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 – Ellipse – Hyperbola – Equations of tangent, normal, chord of
contact and polar at any point of these conics, asymptotes of hyperbola. (g) Polar Coordinates (h) Coordinates in three
dimensions, distance between two points in the space, section formula, centroid of a triangle 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 – angle between two planes (k) Sphere – Cartesian equation – Centre and radius

VI. CALCULUS : (a) Functions – limits – Continuity (b) Differentiation – Methods of differentiation (c) Successive
differentia-tion – Leibnitz’s theorem and its applications (d) Applications of differentiation (e) Partial differentiation including
Euler’s theo-rem 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
seperable method – Solving homogeneous and linear differential equations of first order and first degree.

EAMCET AC Entrance Exam Syllabus for Engineering Courses

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