NIFT Eligibility Criteria

ELIGIBILITY CRITERIA (WHO CAN APPLY) For Bachelor Programmes :Maximum Age: 23 years as on 1st October, 2018. The upper age limit may be relaxed by a period of 5 (five) years for the candidates of Scheduled Castes/Scheduled Tribe/ Person With Disability (PWD) subject to following qualifications: Eligibility for Bachelor Programmes Read more…

Books Recommendation for IIT JAM Mathematics

Books Recommendation for IIT JAM Mathematics

Contemporary Abstract Algebra by Joseph A. Gallian Introduction to Real Analysis,4ed  by Donald R. Sherbert, Robert G. Bartle SCHAUM’S OUTLINE OF LINEAR ALGEBRA by Seymour Lipschutz VECTOR ANALYSIS: Schaum’sOutlines Series by MurraySpiegel , SeymourLipschutz , Dennis Spellman (Author)   Linear Algebra by Friedberg / Insel / Spence Differential Equations, 3ed  by Shepley L. Ross

IIT JAM Physics (PH) Syllabus

Mathematical Methods: Calculus of single and multiple variables, partial derivatives, Jacobian, imperfect and perfect differentials, Taylor expansion, Fourier series. Vector algebra, Vector Calculus, Multiple integrals, Divergence theorem, Green’s theorem, Stokes’ theorem. First order equations and linear second order differential equations with constant coefficients. Matrices and determinants, Algebra of complex numbers. Mechanics Read more…

IIT JAM MATHEMATICAL STATISTICS(MS) SYLLABUS

IIT JAM Mathematical Statistics (MS) Syllabus

< table width=”880″ style=”height: 1231px;”> The Mathematical Statistics (MS) test paper comprises of Mathematics (40% weightage) and Statistics (60% weightage).  Mathematics Sequences and Series: Convergence of sequences of real numbers, Comparison, root and ratio tests for convergence of series of real numbers. Differential Calculus: Limits, continuity and differentiability of functions of one Read more…

IIT JAM MATH MA Syllabus

IIT JAM Mathematics (MA) Syllabus

Sequences and Series of Real Numbers: Sequence of real numbers, convergence of sequences, bounded and monotone sequences, convergence criteria for sequences of real numbers, Cauchy sequences, subsequences, Bolzano-Weierstrass theorem. Series of real numbers, absolute convergence, tests of convergence for series of positive terms – comparison test, ratio test, root test; Leibniz Read more…