This exam named as CSIR NET is conducted by CSIR (Council of Scientific and Industrial Research) with the objective to determine the eligibility of the candidates of India, which is awarded with Junior Research Fellowships (JRF) /NET (National Eligibility Test) and also to determine eligibility for the appointment of Lecturers (NET) in a number of subjects that fall under the stream of Science & Technology. Exams conducted by CSIR are in the following areas:-
M.sc or equivalent degree/B.E./B.Tech/MBBS/B.Pharma/BS-4years/Integrated BS-MS with 55% marks for general and OBC-Non Creamy layer candidates and 50% of SC/ST, Persons with disability (PwD) candidates.
Candidates who enrolled for M.Sc or having completed 10+2+3 years of the above qualifying examination, candidates whose result are awaited (RA) are also eligible to apply to the condition that they complete their degree with the requisite percentage of marks within the validity period of two years to avail the fellowship from the effective date of the award.
These types of candidates will have to submit the attestation format (Given on reverse of the application form) duly certified by the Head of the Department/Institute from where the candidate appears or has appeared.
B. SC (Hons) or equivalent degree holders or students enrolled in Integrated MS-PhD program with at least 55 % marks for general and OBC (Non Creamy Layer) candidates; 50% marks for Sc/ST, persons with disability (PwD) are also eligible. The candidates who acquired only a bachelor’s degree will be eligible for the fellowship only after getting enrolled/registered for PhD/ Integrated PhD program within the validity period i.e. 2 years.
The eligibility for lectureship of NET qualified candidates depends on the subject to fulfilling the criteria laid down by UGC. PhD degree holders who have passed Master Degree with minimum 50% marks eligible to apply for Lectureship only.
The exam will be conducted in more than 27 cities which are spread all over the India. Name of the centres is defined below
Any candidate may opt any of the above describe centers. No request for the change of the center would be granted, however, request in writing may entertain on the merits. If at any center the numbers of appearing candidates are not sufficient, then that particular center may be deleted or any other nearest center will be allotted to the candidate at the discretion of CSIR. No TA/ DA will be allotted to any candidate for attending the exam in any manner.
|Maximum 28 years at the time of appearing in the exam (This limit may be relaxed up to 5 years in case of SC/ST/OBC(non Creamy Layer)/ Persons with Disability and female applicants)
|No Upper Age Limit
There are three parts in the CSIR Question Paper named as (A, B & C) as per syllabus & Scheme of Exam.
Part A: This is common to all subjects. This part contains questions related to General Aptitude with emphasis on logical reasoning, graphical analysis, numerical ability, quantitative comparison, puzzles, series formation and analytics etc.
Part B: This part contains Multiple Choice Questions (MCQs) covering all the topics in the syllabus.
Part C: This is the trickiest part of paper which contains the High Value Question which is designed to test the knowledge on Scientific Concept of the candidates. The questions are analytical in nature where it is necessary for the candidate to apply their scientific logic to reach the solution of the given Scientific Problem.
Note: The revised exam scheme and model Question paper may be seen at CSIR HRDG website https://csirnet.nta.nic.in/
These are the full length programmes for the students which are looking for classroom coaching programmes for their exams. These classes are distributed in such a way that it runs over the time period of 4-6 month, when classes are conducted 5-6 days a week contributing 4-6 hours daily. The program is designed in such a manner that each and every student can consume the topics of subject and gets equal opportunity to learn and apply not like the other coaching institute which over burden the student with curriculum and in the end they get frustrated with the course. There is a unique methodology follows in the DIPS Academy and that methodology is to distinguish the student as per their understanding level and help them to achieve success in the examination as per their convenience. We know that the understanding level of all the students is not same and students hesitate in asking their problem many number of times so we try to differentiate students as per their understanding level and make separate batches for them under the program named as Basic Building Measures(BBM) which has two components.
1. BBM Tests: When Student attend the classes, after 2-3 classes on each topic we offer them a test called BBM Test and according to the result of these test we differentiate student as per their grasping power and give them extra attention so that not only topper student but also average student would crack their exams.
2. BBM Classes: After the BBM Test happen, separate batches of students are made on the basis of their understanding level so that they learn the concept of the subject. So that student got selected and academy would get result. So it is a win-win situation both for student and our Academy. DIPS Academy is famous among the student due to above described unique approach which is followed in our academy and other institutes are not keen interested in knowing the student and map their understanding level so that he/she take the most benefit from our coaching.
For Jia Sarai(South Delhi)
|NET/JRF Batch 1 (REGULAR)
|Seminar : 1st July 2020 Batch
Start : 2nd July 2020
|NET/JRF Batch 2 (REGULAR)
|Seminar : 10th July 2020 Batch
Start : 11th July 2020
|NET/JRF Batch 3 (CRASH COURSE)
For GTB Nagar (North Delhi)
|Net/JRF - Batch 1 (WEEKEND)
|Seminar : 18t July 2020 Batch
Start : 18th July 2020
|CSIR NET - RCP Batch
|IIT JAM Batch
This program is designed for the working students and the students which are not able to join the regular classroom program due to any reason. The duration of classes will be 10 to 12 hours on Saturday and Sunday. Students can get notes from the regular students or make their own to keep the pace with others and thus can be able to crack the exams while doing their jobs or attend the colleges. Hence this program is beneficial for them and those students also said it is a boon for them because due to this program they are able to fulfil their dreams of clearing JRF without leaving their jobs or college classes. This Program also beneficial for those students who are living nearby our center because they can easily come to join the classes on weekends and able to fulfil their dream of getting JRF and LS.
|Weekend Classroom program
|NET JRF Dual (Video Lecture)
Video Lectures of DIPS Academy is highly recommended for those CSIR Aspirants which are not able to attend the classroom program. Our Video lectures series are best suited to them to understand the concepts which are the part of their exam curriculum from award winning Mentor Mr. Rajendra Dubey. Our Video Lecture is recorded at the time of Live Classroom session not recorded at the studio. Hence, you will find the liveliness of classroom in our Video Lectures which gives you the feeling that you are taught personally by Famous Mathematician Mr. Rajendra Dubey with classroom rhythm and proper environment. Other Unique Feature is we provide support to all the student who buys our Video Lectures through mail and Skype. Due to these special features our Video Lectures are sell likes pancakes among the student and famous in the CSIR Aspirants
|Distance Learning Progarm
(DLP - Correspondence Course)
|Distance Learning Progarm
(DLP - Corres
|NET/JRF Study Material
|NET/JRF with GATE study Material
|NET / JRF Video Lecture
|NET / JRF Video Lecture with GATE
|NET / JRF Video Lecture Real Analysis
|NET / JRF Video Lecture Linear Algebra
|NET / JRF Video Lecture Complex Analysis
|NET / JRF Video Lecture Modern Algebra
|NET / JRF Video lecture Pure
|NET / JRF Video Lecture and Study Material
|NET / JRF Video Lecture and Study Material with GATE
If you do not want to leave the comfort of your home or cannot attend our regular classroom program due to any issue, then you can opt our correspondence study material which is designed by our research and development cell in a student friendly manner so that they can avail maximum benefit from it and clear their exams and achieve desired success. Our Research and development cell update the study material in a timely manner, so that students can get the material according to latest pattern of the exams and questions as per the exam weight-age. In our study material you can get to the point summaries of concept which are in the curriculum of the exam and huge number of questions which are enough for practice for the exam. You will not need to refer any other book for the exam except our study material.
Below Study Material We Provide To Regular Classroom Program And Distance Learning Program Students.
Today era is highly influenced by Information Technology and thus most crucial exams conducted online and since these exams are necessary for the scholars student as they achieve success by clearing them only For example CSIR, Gate and JAM. Most number of students of DIPS Academy got selected in these exams because our students experience the real exams temperament from the online test platform which is used by DIPS Academy. Our Online test platform is best in India and more or less same used by exams conducting body. All the students of DIPS Academy are provided by the unique User ID and Password. Students not only able to give the test by using these ID’s but also get a comprehensive analysis. Students from pan India can get the benefits of our Online Test. Our test Package is differentiated according to the needs of students and they can choose them as per their requirement which is not only helping them in preparation of exams but also they can check their all India Ranking. Our Online Test are merged with the classroom test so that students can compete themselves from our regular students and most sincere aspirants of the exams.
Elementary set theory, finite, countable and uncountable sets. Real number system as a complete ordered field. Archimedean property, supremum, infimum. Sequences and series of real numbers and their convergence. limsup, liminf. Bolzano Weierstrass theorem, Heine Borel theorem. Continuity, uniform continuity, differentiability, mean value theorem. Sequences and series of functions, uniform convergence. Riemann sums and Riemann integral, Improper Integrals. Monotonic functions, types of discontinuity, functions of bounded variation, Lebesgue measure, Lebesgue integral. Functions of several variables, directional derivative, partial derivative, derivative as a linear transformation, inverse and implicit function theorems. Metric spaces, compactness, connectedness. Normed linear Spaces. Spaces of continuous functions as examples.
Principle of Mathematical Analysis -S.L.Gupta,N.R.Gupta(Pearson Publication). S.L.Gupta, N.R. Gupta (Pearson Publication)
Real Analysis - Robert G Bartle (Wiley Publication)
Real Analysis - M.D. Raisinghania (S. Chand Publication)
Vector spaces, subspaces, linear dependence, basis, dimension, algebra of linear transformations. Algebra of matrices, rank and determinant of matrices, linear equations. Eigenvalues and eigenvectors, Cayley-Hamilton theorem. Matrix representation of linear transformations. Change of basis, canonical forms, diagonal forms, triangular forms, Jordan forms. Inner product spaces, orthonormal basis. Quadratic forms, reduction and classification of quadratic forms.
Linear Algebra Schaum's Series - (Tata McGraw-Hill Publication)
Linear Algebra - Kenneth M Hoffman, Ray Kunze (PHI Publication)
Linear Algebra - Vivek Sahai, Vikas Bist (Narosa Publication)
Algebra of complex numbers, the complex plane, polynomials, power series, transcendental functions such as exponential, trigonometric and hyperbolic functions. Analytic functions, Cauchy-Riemann equations. Contour integral, Cauchy's theorem, Cauchy's integral formula, Liouville's theorem, Maximum modulus principle, Schwarz lemma, Open mapping theorem. Taylor series, Laurent series, calculus of residues. Conformal mappings, Mobius transformations.
Complex Variables - H.S. Kasana (PHI Publication )
Complex Analysis - S Ponnusamy (Narosa Publication)
Complex Analysis - R.V. Churchill (Tata McGraw - Hill Publication)
Permutations,combinations,pigeon-hole principle,inclusion-exclusion principle,derangements.Fundamental theorem of arithmetic, divisibility in Z, congruences, Chinese Remainder Theorem, Euler's Ø- function, primitive roots. Groups, subgroups, normal subgroups, quotient groups, homomorphisms, cyclic groups, permutation groups, Cayley's theorem, class equations, Sylow theorems. Rings, ideals, prime and maximal ideals, quotient rings, unique factorization domain, principal ideal domain, Euclidean domain. Polynomial rings and irreducibility criteria. Fields, finite fields, field extensions, Galois Theory.
Contemporary Abstract Algebra - Joseph A. Gallian (Narosa Publication)
Modern Algebra - Surjeet Singh and Qazi Zameeruddin (Vikas Publication)
Abstract Algebra - David S. Dummit, Richard M. Foote ( Wiley Publication)
Basis, Dense sets, subspace and product topology, separation axioms, connectedness and compactness.
Topology - K. D. Joshi (New Age International Publication)
ORDINARY DIFFERENTIAL EQUATIONS (ODE)
Existence and uniqueness of solutions of initial value problems for first order ordinary differential equations, singular solutions of first order ODE , system of first order ODE. General theory of homogenous and non-homogeneous linear ODEs, variation of parameters, Sturm-Liouville boundary value problem, Green's function.
Ordinary Differential Equations - MD Rai Singhania ( S.Chand Publication)
Differential Equations - Shepley L. Ross (Wiley Publication)
Differential Equations - Earl Codington (PHI Publication)
PARTIAL DIFFERENTIAL EQUATIONS (PDE)
Lagrange and Charpit methods for solving first order PDE, Cauchy problem for first order PDE. Classification of second order PDE, General solution of higher order PDE with constant coefficients, Method of separation of variables for Laplace, Heat and Wave equations.
Partial Differential Equations - T. Amaranath (Narosa Publication)
Introduction To Partial Differential Equations - K. Sankara Rao (PHI Publication)
Numerical solutions of algebraic equations, Method of iteration and Newton-Raphson method, Rate of convergence, Solution of systems of linear algebraic equations using Gauss elimination and Gauss-Seidel methods, Finite differences, Lagrange, Hermite and spline interpolation, Numerical differentiation and integration, Numerical solutions of ODEs using Picard, Euler, modified Euler and Runge-Kutta methods.
Numerical Analysis - R.K. Jain, S.R.K. Iyengar (New Age Publication )
Calculus Of Variations
Variation of a functional, Euler-Lagrange equation, Necessary and sufficient conditions for extrema. Variational methods for boundary value problems in ordinary and partial differential equations.
Calculus of Variations - A. S. GUPTA (Narosa Publication )
Linear Integral Equations
Linear integral equation of the first and second kind of Fredholm and Volterra type, Solutions with separable kernels. Characteristic numbers and eigenfunctions, resolvent kernel.
Linear Integral Equations - M D Raisinghania (S.Chand Publication )
Generalized coordinates, Lagrange's equations, Hamilton's canonical equations, Hamilton's principle and principle of least action, Two-dimensional motion of rigid bodies, Euler's dynamical equations for the motion of a rigid body about an axis, theory of small oscillations.
Classical Mechanics - J. C. Upadhyaya (Himalaya Publication)
Descriptive Statistics, Exploratory Data Analysis
Sample space, discrete probability, independent events, Bayes theorem. Random variables and distribution functions (univariate and multivariate); expectation and moments. Independent random variables, marginal and conditional distributions. Characteristic functions. Probability inequalities (Tchebyshef, Markov, Jensen). Modes of convergence, weak and strong laws of large numbers, Central Limit theorems (i.i.d. case). Markov chains with finite and countable state space, classification of states, limiting behaviour of n-step transition probabilities, stationary distribution, Poisson and birth-and-death processes. Standard discrete and continuous univariate distributions. sampling distributions, standard errors and asymptotic distributions, distribution of order statistics and range.
Methods of estimation, properties of estimators, confidence intervals. Tests of hypotheses: most powerful and uniformly most powerful tests, likelihood ratio tests. Analysis of discrete data and chi-square test of goodness of fit. Large sample tests.Simple nonparametric tests for one and two sample problems, rank correlation and test for independence. Elementary Bayesian inference. Gauss-Markov models, estimability of parameters, best linear unbiased estimators, confidence intervals, tests for linear hypotheses. Analysis of variance and covariance. Fixed, random and mixed effects models.
Simple and multiple linear regression. Elementary regression diagnostics. Logistic regression. Multivariate normal distribution, Wishart distribution and their properties. Distribution of quadratic.
forms. Inference for parameters, partial and multiple correlation coefficients and related tests data reduction techniques: Principle component analysis, Discriminant analysis, Cluster analysis, Canonical correlation.
Simple random sampling, stratified sampling and systematic sampling. Probability proportional to size sampling. Ratio and regression methods. Completely randomized designs,randomized block designs and Latin-square designs. Connectedness and orthogonality of block designs, BIBD. 2K factorial experiments: confounding and construction. Hazard function and failure rates, censoring and life testing, series and parallel systems.
Probablity and statistics - S. C. Gupta and V. K. Kapoor (S.Chand Publication)
Linear Programming Problem And Operations Research
Simplex methods, duality. Elementary queuing and inventory models. Steady-state solutions of Markovian queuing models: M/M/1, M/M/1 with limited waiting space, M/M/C, M/M/C with limited waiting space, M/G/1.
Operations Research - Prem Kumar Gupta, D. S. Hira (S.Chand Publication )
All trainers of our Classroom courses are working Analytics professionals. INFOMATHS has a pool of very competent full-time faculty.
All the questions in the Modules are solved by Faculty and Videos are made available to the Student. Highly researched study material to crack to universities.
Guest Lecture sessions cover topics from how to build a successful career. The Study Material used in thoroughly revised keeping in view the changing patterns.
INFRASTRUCTURE IS well-equipped high tech means of study gadgets and machines to make study sessions go interesting and fully advanced in technology.
Test prep at your fingertips. Learn anytime, anywhere