#1
5th May 2015, 12:34 PM
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IIIT Hyderabad M Tech Syllabus
As it was rumored that the syllabus of M Tech course of IIIT or International Institute of Information Technology, Hyderabad would be revised, can you tell if it has really revised? Provide me the revised syllabus of M Tech course of IIIT or International Institute of Information Technology, Hyderabad?
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#2
20th April 2018, 06:59 AM
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Re: IIIT Hyderabad M Tech Syllabus
I want to do M.Tech degree from International Institute of Information Technology, Hyderabad (IIIT Hyderabad) looking for entrance exam syllabus. Will you provide IIIT Hyderabad M Tech Syllabus for entrance exam so that I can prepare well for this university entrance exam?
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#3
20th April 2018, 07:00 AM
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Re: IIIT Hyderabad M Tech Syllabus
The International Institute of Information Technology, Hyderabad (IIIT Hyderabad) conducts Postgraduate Entrance Examination (PGEE) for admission to Postgraduate programmes. Postgraduate Entrance Examination (PGEE) Syllabus Paper I : General aptitude paper Objective Paper II : Objective paper (Paper II) Paper II Mathematics Subjective Computer Science Objective Electronics and Communications Engineering (Objective and Subjective) Structural Engineering (Subjective) Computational Natural Sciences and Bioinformatics Objective Computational Linguistics Paper I (General Aptitude) Click Here For Model questions Objective Duration : 1 1/2 hours (Compulsory for everyone). This is objective type question paper and will emphasize on basic aptitude, logical reasoning, basic questions on computers and mathematics. Note: A minimum cut-off score in this paper is compulsory for evaluation of candidate's subject paper (Paper II). Paper II is subject paper. Based on the graduation, candidate has to appear for relevant subject papers. Mathematics: Duration : 1 1/2 hours I. Finite Dimensional Linear Vector Space Linear Independence, Span, Basis, Orthonormal Set, Gram-Schmidt Orthogo- nalization Process, Inner Product, Dual Space, Eigen Space, Rank of a Matrix, Cayley-Hamiltonian Theorem, Similar Matrices, Linear Operator, Hermetian, Unitary and Normal Matrices, Spectral Decomposition. II. Group, Ring and Field Basic Concepts of Groups, Cyclic Group, Cosets, Elementary Concepts of Rings and Fields III. Real Analysis Concepts of sets of Real numbers, Sequence of Real Numbers, Continuous and Differentiable Functions, Rolles Theorem, Mean Value Theorem and Taylor Se- ries, Reimann Integration IV. Probability Theory Conditional Probability, Bayes Theorem, Random variable, PDF and CDF, Mo- ment Generating Function, Theoretical Distribution (Binomial, Poisson, Nor- mal, Uniform and Hyper geometric). V. Complex Analysis Analytic functions, Integration, Cauchys Integral Theorem, Cauchys Integral formula, Taylor and Laurent Series, Residue, Contour Integration. VI. Ordinary Differential Equation Equation of First order and First Degree, Second order Linear Equation with Constant coefficients. VII. Optimization Linear Programming Problem. |
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