The Joint Admission Test (JAM) Maths for MSc in Mathematics is an all-India online entrance exam held every year on a rotational basis by the Indian Institutes of Technology (IITs) on behalf of the Ministry of Human Resources Development (MHRD), Government of India.
IIT JAM is held to select applicants for MSc and other postgraduate courses at IITs. JAM scores are also accepted for integrated Ph.D. programs at the Indian Institute of Science (IISc) in Bangalore. It is also accepted by a number of National Institutes of Technology (NITs) and Centrally Funded Technical Institutes (CFTIs) for MSc admissions.
IIT JAM Maths Exam Pattern
IIT JAM follows a predetermined pattern for Mathematics. To achieve the objectives, all aspirants must have a thorough understanding of the exam.
|Mode of Exam||Online( Computer-based test)|
|Type of Questions||Multiple Choice Questions, Multiple Select Questions, Numerical Answer Type Questions|
Section-wise IIT JAM Maths Exam Pattern
There will be three sections to the JAM Mathematics paper. The exam pattern is shown below.
|Sections||Type of Questions||Negative Marking|
||No Negative marking|
||No Negative marking|
Best IIT JAM Maths Books
The subject of mathematics is concerned with the logic of structure, quantity, and order. Math is present in every aspect of our lives. Everything in our everyday lives is built on it, including mobile devices, laptops, software, historic and modern architecture, art, money, engineering, and even sports. The mathematical requirements become more complex as a civilization becomes more complex.
With greater complexity comes greater responsibility. To study complex mathematics you need to clear the IIT JAM Mathematics exam. Let us discuss the syllabus.
IIT JAM Maths Syllabus
When preparing for the paper, understanding the entire maths syllabus for IIT JAM is a great place to start. This is the initial step toward preparing for the exam. You should be conversant with the most significant topics on the syllabus.
|Sequences and Series of Real Numbers||Sequence of real numbers, the 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 test for convergence of alternating series.|
|Functions of One Real Variable||Limit, continuity, intermediate value property, differentiation, Rolle’s Theorem, mean value theorem, L’Hospital rule, Taylor’s theorem, maxima, and minima|
|Functions of Two or Three Real Variables||Limit, continuity, partial derivatives, differentiability, maxima, and minima|
|Integral Calculus||Integration as the inverse process of differentiation, definite integrals, and their properties, fundamental theorem of calculus. Double and triple integrals, change of order of integration, calculating surface areas and volumes using double integrals, calculating volumes using triple integrals.|
|Differential Equations||Ordinary differential equations of the first order of the form y’=f(x,y), Bernoulli’s equation, exact differential equations, integrating factor, orthogonal trajectories, homogeneous differential equations, variable separable equations, linear differential equations of second order with constant coefficients, Method of variation of parameters, Cauchy-Euler equation.|
|Vector Calculus||Scalar and vector fields, gradient, divergence, curl, line integrals, surface integrals, Green, Stokes, and Gauss theorems|
|Group Theory||Groups, subgroups, Abelian groups, non-Abelian groups, cyclic groups, permutation groups, normal subgroups, Lagrange’s Theorem for finite groups, group homomorphism, and basic concepts of quotient groups.|
|Linear Algebra||Finite dimensional vector spaces, linear independence of vectors, basis, dimension, linear transformations, matrix representation, range space, null space, rank-nullity theorem. Rank and inverse of a matrix, determinant, solutions of systems of linear equations, consistency conditions, eigenvalues, and eigenvectors for matrices, Cayley-Hamilton theorem.|
|Real Analysis||Interior points, limit points, open sets, closed sets, bounded sets, connected sets, compact sets, completeness of R. Power series (of real variable), Taylor’s series, radius and interval of convergence, term-wise differentiation, and integration of power series.|
|Topic||Easy||Moderate||Difficult||Low Weightage||High Weightage|
|Sequences and Series of Real Numbers||✓||✓|
|Functions of One Real Variable||✓||✓|
|Functions of Two or Three Real Variables||✓||✓|
Best Mathematics Books For IIT JAM
With the syllabus in your hand, you will now know which book will be the best choice for you. Here is the list of the best maths books for you.
Best Mathematics Books for IIT JAM Mathematics
|Book Name||Author/Publisher||Price||Buy Now|
|Introduction to Real Analysis||Donald R. Sherbert||₹ 1499||Buy Now|
|Group Theory for IIT JAM||DR AP Singh||₹ 260||Buy Now|
|IIT JAM Mathematics||Gajendra Purohit||₹ 395||Buy Now|
|Linear Algebra for IIT JAM||Vikas Deoarshi||₹ 295||Buy Now|
|IIT JAM Mathematics||Kuldeep Chaudhary||₹ 271||Buy Now|
|M.SC. Mathematics||Suraj Singh||₹ 465||Buy Now|
|Differential Equation||Vishal Deorashi||₹ 240||Buy Now|
|IIT JAM Mathematics Solved Paper sets||Rajendra Dubey||₹ 650||Buy Now|
|IIT JAM M.SC Maths||AP Singh||₹ 415||Buy Now|
IIT JAM Preparation Tips For Mathematics
The candidate must take an effective approach and follow some suggestions in order to score higher than the average. According to the report, mathematics is one of the highest-scoring subjects in IIT JAM. The following are some pointers for the subject’s preparation:
- Candidates should develop a list of all topics and identify the precise sections in which they are weak, as well as focus on those topics.
- Each day, the candidate must answer all of the questions from at least two chapters.
- All applicants must create a timeline to complete all components of the IIT JAM Syllabus for Mathematics and adhere to it on a regular basis.
- To improve speed and confidence, the candidate should solve all of the previous year’s problems.
- Giving mock tests as many times as feasible per week can assist the candidate’s aptitude or where they stand, which will lead to improvement.
- Last but not least, practicing is the ideal approach to ace the exam and achieve the highest possible mark, particularly in Mathematics.
This is our list of the Best books for IIT JAM Mathematics books. IIT JAM is one of the most competitive tests in India for admission to Master’s programs. You should have all of the information and the greatest study materials at your disposal.
We hope that our collection of Mathematics books, as well as the preparation techniques we recommend, will help you prepare for the IIT JAM Mathematics exam. In the comments area below, please let us know which book you intend to use for your preparation.
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