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| There is no unified syllabus for M.C.A. Landmark follows the syllabus given below which covers the syllabi of all the Universities / Institutes. |
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| Part – 1 |
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| Mathematics |
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| Matrices & Determinants |
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| Matrix operation, Adjoint and inverse of a matrix, Rank of a Matrix; Cayley Hamilton Theorem, Eigen Values, Eigen Vectors, Latent Vectors, Linear System of equations, properties of determinants, Cramer’s rule. |
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| Differential Calculus |
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| Continuity and Limits, Total and Partial Differentiation,Properties of continuous Functions, Rolle’s Theorem, L.M.V. Theorem, Cauchy’s generalized mean value theorem,Taylor’s and Maclaurin’s Series, Maxima and Minima,Indeterminate form, L. Hospital’s rule, Curvature,Asymptotes, Tangent & normal, Tracing of curves,Successive Differentiation, Functions of two or more variables, Applications of derivatives such as tangent and normal, rate as a measure, increasing and decreasing functions etc. |
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| Integral Calculus |
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| Definite and Indefinite Integral, Evaluvation of Length, Area and Volume of Curves, Multiple Integration, Change of order, Change of Variables, Application to find Area, Volume. |
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| Differential Equations |
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| Differential equations of first order and their solutions, Linear differential equations with constant coefficients, Homogenous Linear Differential Equations, Orthogonal Trajectories, Introduction to Differential Equations of Second order, Complimentary Function, Particular Integrals. |
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| Real Analysis |
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| Real Number system, concept of neighbourhood and limit points, order completeness property, Archemedian Property, Sequence, Sequences of real Numbers, Bounded sequences, Covergent sequences, Cauchy Sequences, Monotonic sequences, Infinite series of positive terms and their different tests of convergence, Alternating series, Leibnitz’s test, Absolute convergence. Conditional Convergence |
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| Algebra |
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| Sets, Relations, functions, Simultaneous linear equations,Quardratic Equations, Indices, Logarithms, A.P., G.P., H.P.,Inequalities, Surds, Binomial Theorem, Complex numbers, Demoivere’s Theorem, Roots of unity, Roots of a complex number,geometry of complex numbers. |
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| Theory of Equations |
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| Polynomials and their characteristics, Roots of an equation, Relation between Roots and coefficients, Transformation of equations. |
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| Trigonometry |
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| Trigonometric Functions, Trigonometric Identities,Trigonometric Equations, Properties of triangles, Solution of triangles, Properties of Triangle, Height and distance; Inverse trigonometric function, Applications of trigonometry in coordinate geometry. |
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| Co-ordinate Geometry (2D) |
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| Slope of a line, Different forms of a straight line, Family of lines, Pair of straight lines, Translation of Axes, Circles, Family of circles, coaxial system of circles, Parabola, Ellipse, Hyperbola, Equation of Tangent, Pair of tangents from a point, Chord of contact, Equation of chord in terms of middle point, Pole and polar of a conic, Diameter of a conic, Conjugate Diameter, Classification of curves of second degree. |
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| Co-ordinate Geometry (3D) |
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| Straight Line, Plane, Sphere, Right Circular Cylinder, Cone. |
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| Abstract Algebra |
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Groups, Permutation groups, Subgroups, Lagrange’s theorem, Order of an element of a group, Normal subgroups, Quotient Groups, Homomorphism, Isomorphism, Automorphism, Endomorphism, Rings, Field, Vector spaces, Linear Dependence and Linear Independence of vectors, Basis, Dimension,Linear Transformation, Quardratic Forms, Diagonalisation of matrices. |
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| Numerical Techniques |
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| Interpolation, Extrapolation, Simpson’s 1/3rd rule, Trapezoidal rule, Numerical differentiation, Numerical Integration, Use of Iterative Methods (Bisection Method, Newton- Raphson method, Gauss Method, Gauss-Jacobi Method etc.) to solve system of equations, Convergence of various iterative methods, Rate of Convergence etc. |
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| Statistics |
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| Classifications of Data and Frequency distribution, Calculation of measures of Central tendency and measures of dispersion, Skewness & Kurtosis, Correlation & Regression, Index numbers, Time Series Analysis |
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| Probability |
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| Permutation & combination, Probability, Random Variables & distribution functions, Mathematical Expectations & generating functions, Binomial, Poisson, Geometric, Exponential & Normal Distributions, Sampling & large sample tests, Tests of significance based on t, Chi-square and F distributions. |
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| Part II |
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| General Aptitude and Logical Ability |
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| General Aptitude and Logical Ability |
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- It includes questions on Logical deduction, Vocabulary, Simple arithmetic,interpretation of Data, Problem and Puzzle solving, Flow charts and Algorithms.
- This test is mainly designed to test the grasping and logical ability of the candidate.
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| Part III |
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| Elementary English Awareness |
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| Elementary English Awareness |
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| This test is aimed to check the basic level understanding of candidate in English language. It includes reading comprehension,simple Synonyms,Antonyms, Idioms, Phrases etc. |
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| Part IV |
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| Computer Awareness |
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| Computer
Basics |
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| Organization of a computer, Central Processing Unit (CPU), Structure of instructions in CPU, input / output devices,computer Memory, memory organization, back-up devices. |
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| Computer Mathematics |
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| Mathematical Logic |
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| Venn Diagrams in logic, Logical operators, Negations, Logical Equivalence and Tautology, Flow Chart and Algorithms. |
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| Data Representation |
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| Representation of characters, integers, and fractions, binary and Hexadecimal representations. |
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| Binary Arithmetic |
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| Addition, subtraction, division, multiplication, single arithmetic and two complement arithmetic, floating point representation of numbers, normalized floating point representation, Boolean algebra, Truth tables, Venn diagrams. |
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| Computer Architecture |
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| Block Structure of computers, communication between processor and I / O devices, Interrupts. |
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