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# CIEAT 2018 Crescent Institute Engineering Admission Test B.Tech : B.S Abdur Rahman University

** Organisation **: B.S.Abdur Rahman Crescent Institute of Science & Technology

**: CIEAT 2018 Crescent Institute Engineering Admission Test B.Tech Admission**

__Entrance Exam__**: 28-04-2018**

__Date of Examination__**: bsauniv.ac.in/index**

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Contents

## B.S.Abdur Rahman University CIEAT

1. Civil Engineering

2. Mechanical Engineering

3. Automobile Engineering

Related: B.S. Abdur Rahman University Ph.D Entrance Exam 2015 Admission : www.entrance.net.in/5539.html

4. Aeronautical Engineering

5. Polymer Engineering

6. Electrical & Electronics Engineering

7. Electronics & Communication Engineering

8. Electronics & Instrumentation Engineering

9. Computer Science & Engineering

10. Information Technology

11. Biotechnology

B.Tech(LATERAL ENTRY)-3 YEARS

## Eligibility For B.Tech

1. Candidates should have passed 12th standard examination conducted by State Board / CBSE / ICSE or equivalent examination with a minimum aggregate of 60% marks in Mathematics, Physics and Chemistry. For Biotechnology a Minimum 60% aggregate in Mathematics (or) Biology, Physics and Chemistry.

2. Candidates should have appeared for the Crescent Institute Engineering Admission Test (CIEAT 2018) or should have a valid score in JEE (Main).

3. Candidates who have studied in Regular, Full time and Formal Education alone are eligible to apply.

4. Age Limit: Candidates date of birth should fall on or after 1st July 1996.

## Selection Process

Candidates shall be selected for admission based on marks in qualifying plus two examination and marks scored in Engineering Entrance Examination (CIEAT)conducted by the B.S.Abdur Rahman Crescent Institute of Science and Technology.

## Exam Centres

** Tamilnadu **:

**:**

__Crescent Institute Engineering Admission Test (CIEAT)will be conducted in the following cities__Chennai, Coimbatore, Dharmapuri, Madurai, Nagapattinam, Tirunelveli, Tiruchirappalli, Ramanathapuram, Salem, Vaniyambadi

** Exam Centres in other States **:

Bengaluru, Calicut, Kolkata, Nellore, New Delhi, Lucknow, Puducherry, Pune, Thrissur, Patna, Ranchi, Vishakapatnam

## Important Dates

Application Process Starts : Jan 1st,2018

Dates of Entrance Exam : 21st April 2018 to 30th April 2018 (In the Institute Campus)

Date of Exam at other Centres : 28th April 2018

Last Date for Apply Online :30th April 2018

** Contact us **:

Director(Admissions)

B.S.Abdur Rahman Crescent Institute of Science & Technology

Vandalur, Chennai – 600 048.

**: admissions AT bsauniv.ac.in**__E-Mail__

Ph. 91 +44 – 22751347, 22759236

**: +91 95432 77888**

__Help Desk__## Syllabus For Entrance Exam

** Mathematics **:

**:**

__Applications of matrices and Determinants__Adjoin, Inverse-Properties, Computation of inverses, solution of system of linear equations by matrix inversion method. Rank of a Matrix – Elementary transformation on a matrix, consistency of a system of linear equations, Cramer’s rule, Non-homogeneous equations, homogeneous linear system, rank method.

** Vector Algebra **:

Scalar Product–Angle between two vectors, properties of scalar product, applications of dot products. Vector Product – Right handed and left handed systems, properties of vector product, applications of crossproduct. Product of three vectors – Scalar triple product, properties of scalar triple product, vector triple product, vector productof four vectors, scalar product of four vectors.

Lines – Equation of a straight line passing through a given point and parallel to a given vector, passing through two given points (derivations are not required). Angle between two lines. Skew lines – Shortest distance between two lines, condition for two lines to intersect, point of intersection, collinearity of three points.

Planes – Equation of a plane (derivations are not required), passing through a given point and perpendicular to a vector, given the distance from the origin and unit normal, passing through a given point and parallel to two given vectors, passing through two given points and parallel to a given vector, passing through three given non-collinear points, passing through the line of intersection of two given planes, the distance between a point and a plane, the plane which contains two given lines, angle between two given planes, angle between a line and a plane.

Sphere – Equation of the sphere (derivations are not required) whose centre and radius are given, equation of a sphere when the extremities of the diameter are given.

** Complex Numbers **:

Complex number system, Conjugate – properties, ordered pair representation. Modulus – properties, geometrical representation, meaning, polar form, principal value, conjugate, sum, difference, product, quotient, vector interpretation, solutions of polynomial equations, De Moivre’s theorem and its applications. Roots of a complex number – nth roots, cube roots, fourth roots.

** Analytical geometry **:

Definition of a Conic – General equation of a conic, classification with respect to the general equation of a conic, classification of conics with respect to eccentricity.

Parabola – Standard equation of a parabola (derivation and tracing the parabola are not required), other standard parabolas, the process of shifting the origin, general form of the standard equation, some practical problems.

Ellipse – Standard equation of the ellipse (derivation and tracing the ellipse are not required), x2/a2 + y2/b2 = 1, (a > b), Other standard form of the ellipse, general forms, some practical problems, Hyperbola – standard equation (derivation and tracing the hyperbola are not required), x2/a2 – y2/ b2 = 1, Other form of the hyperbola, parametric form of conics, chords.

Tangents and Normals – Cartesian form and Parametric form, equation of chord of contact of tangents from a point (x1, y1), Asymptotes, Rectangular hyperbola – standard equation of a rectangular hyperbola.

** Differential Calculus – Applications I **:

Derivative as a rate measure – rate of change – velocity – acceleration – related rates – Derivative as a measure of slope – tangent, normal and angle between curves. Maxima and Minima. Mean value theorem – Rolle’s Theorem – Lagrange Mean Value Thorem – Taylor’s and Maclaurin’s series, l’ Hôpital’s Rule, stationary points – increasing, decreasing, maxima, minima, concavity convexity, points of inflexion.

** Differential Calculus – Applications II **:

Errors and approximations- absolute, relative, percentage errors, curve tracing, partial derivatives – Euler’s theorem. Integral Calculus & its Applications Properties of definite integrals, reduction formulae for sinnx and cosnx (only results), Area, length, volume and surface area.

** Differential Equations **:

Formation of differential equations, order and degree, solving differential equations (1st order) – variable separable homogeneous, linear equations. Second order linear equations with constant coefficients f(x) = emx, sin mx, cos mx, x, x2.

** Discrete mathematics **:

Mathematical Logic – Logical statements, connectives, truth tables, Tautologies.

** groups **:

Binary Operations – Semi groups – monoids, groups (Problems and simple properties only), order of a group, order of an element.

** Probability Distributions **:

Random Variable, Probability density function, distribution function, mathematical expectation, variance, Discrete Distributions – Binomial, Poisson, Continuous Distribution – Normal distribution.