AP EAMCET 2013 MATHEMATICS CHAPTER WISE SYLLABUS.
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EAMCET stands for Engineering, Agriculture, Medicine Common Entrance Test. It will be led by Jawaharlal Nehru Technological University (JNTU). EAMCET is conducted for candidates to get admissions to various government and private colleges in Andhra Pradesh State which offers various training courses. Here, we describe about Ap Eamcet 2013 Syllabus mathematics. Interested and eligible candidates can go through the following details Eamcet Mathematics Syllabus 2013.
Chapter-I: Functions
Mathematical induction and applications
Permutations and Combinations
Binomial theorem
Partial fractions
Exponential and logarithmic series
Quadratic expressions, equations and inequations in one variable
Theory of equations
Matrices and determinants
Complex numbers and their properties
Chapter-II: Trigonometry
Trigonometric functions
Trigonometric ratios of compound angles
Trigonometric equations
Inverse trigonometric functions
Hyperbolic and inverse hyperbolic functions
Properties of Triangles
Heights and distances
Chapter-III: Vector Algebra
Algebra of vectors
Scalar and vector product of two vectors and their applications
Scalar and vector triple products
Chapter-IV: Probability
Random experiments
Random variables
Chapter-V: Coordinate Geometry
Locus, Translation of axes, rotation of axes
Straight line
Pair of straight lines
Circles
System of circles
Conics – Parabola ,Ellipse– Hyperbola
Polar Coordinates
Coordinates in three dimensions
Direction Cosines and direction ratios of a line
Cartesian equation of a plane
Sphere
Chapter-VI: Calculus
Functions – limits – Continuity
Differentiation – Methods of differentiation
Successive differentiation – Leibnitz’s theorem and its applications
Applications of differentiation
Partial differentiation including Euler’s theorem
Integration – methods of integration
Definite integrals and their applications
Numerical integration
Differential equations
ap eamcet 2013,ap eamcet 2013 notification,ap eamcet 2013 exam date,ap eamcet 2013 application,ap eamcet 2013 syllabus,ap eamcet 2013 online application,ap eamcet 2013 online application form,EAMCET 2013,eamcet 2013,eamcet 2013 date,eamcet 2013 exam date,eamcet 2013 notification,eamcet 2013 syllabus,eamcet 2013 medical,eamcet 2013 eligibility,eamcet 2013 medical notification,eamcet 2013 schedule,eamcet 2013 application form download
EAMCET stands for Engineering, Agriculture, Medicine Common Entrance Test. It will be led by Jawaharlal Nehru Technological University (JNTU). EAMCET is conducted for candidates to get admissions to various government and private colleges in Andhra Pradesh State which offers various training courses. Here, we describe about Ap Eamcet 2013 Syllabus mathematics. Interested and eligible candidates can go through the following details Eamcet Mathematics Syllabus 2013.
Chapter-I: Functions
Mathematical induction and applications
Permutations and Combinations
Binomial theorem
Partial fractions
Exponential and logarithmic series
Quadratic expressions, equations and inequations in one variable
Theory of equations
Matrices and determinants
Complex numbers and their properties
Chapter-II: Trigonometry
Trigonometric functions
Trigonometric ratios of compound angles
Trigonometric equations
Inverse trigonometric functions
Hyperbolic and inverse hyperbolic functions
Properties of Triangles
Heights and distances
Chapter-III: Vector Algebra
Algebra of vectors
Scalar and vector product of two vectors and their applications
Scalar and vector triple products
Chapter-IV: Probability
Random experiments
Random variables
Chapter-V: Coordinate Geometry
Locus, Translation of axes, rotation of axes
Straight line
Pair of straight lines
Circles
System of circles
Conics – Parabola ,Ellipse– Hyperbola
Polar Coordinates
Coordinates in three dimensions
Direction Cosines and direction ratios of a line
Cartesian equation of a plane
Sphere
Chapter-VI: Calculus
Functions – limits – Continuity
Differentiation – Methods of differentiation
Successive differentiation – Leibnitz’s theorem and its applications
Applications of differentiation
Partial differentiation including Euler’s theorem
Integration – methods of integration
Definite integrals and their applications
Numerical integration
Differential equations
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