#1
22nd June 2015, 02:55 PM
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Syllabus For BARC OCES
I have applied for the Orientation Course for Engineering Grads and Science exam of the Bhabha Atomic Research Center and I don’t know the exam pattern and the syllabus of it so can you please provide me syllabus and exam pattern so that I can start my preparation?
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#2
18th July 2018, 03:42 PM
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Re: Syllabus For BARC OCES
Hello sir, Im preparing for BARC OCES exam. I want syllabus. Is there any one can provide me here Syllabus For BARC OCES?
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#3
18th July 2018, 03:45 PM
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Re: Syllabus For BARC OCES
The Bhabha Atomic Research Centre is organized written examination for various posts like OCES DGFS in different disciplines such as CSE, ECE, EEE, Civil, and Mechanical Engg. Candidates have to qualify written examination to grab BARC Jobs. Candidates who will clear BARC written examination of OCES DGFS will be invited for further process of BARC recruitment including interview and verification procedure. BARC Syllabus for Computer Science and Information Technology Engineering Mathematics Mathematical Logic Probability Set Theory & Algebra Combinatory Graph Theory Linear Algebra Numerical Methods Calculus Computer Science and Information Technology Digital Logic Computer Organization and Architecture Programming and Data Structures Algorithms Theory of Computation Compiler Design Operating System Databases Information Systems and Software Engineering Computer Networks Web technologies BARC Syllabus for Electrical Engineering (EE) Engineering Mathematics Linear Algebra Matrix Algebra Systems of linear equations Eigen values and Eigen vectors Calculus Mean value theorems Theorems of integral calculus Evaluation of definite and improper integrals Partial Derivatives Maxima and minima Multiple integrals Fourier series Vector identities Directional derivatives Line Surface and Volume integrals Stokes Gauss and Greens theorems Differential equations First order equation (linear and nonlinear) Higher order linear differential equations with constant coefficients Method of variation of parameters Cauchys and Eulers equations Initial and boundary value problems Partial Differential Equations Variable separable method Complex variables Analytic functions Cauchys integral theorem and integral formula Taylors and Laurent series Residue theorem Solution integrals Probability and Statistics Sampling theorems Conditional probability Mean, Median, mode and standard deviation Random variables Discrete and continuous distributions Poisson Normal and Binomial distribution Correlation and regression analysis Numerical Methods Solutions of non-linear algebraic equations Single and multi-step methods for differential equations Transform Theory Fourier transform Laplace transform Z-transform Here is PDF for Information brochure of Bhabha Atomic Research Centre OCES: Last edited by sumit; 14th December 2019 at 11:14 AM. |