Hii aspirants

here I am mentioning few best books for iit jam mathematics preparation. These are

Mathematical Analysis - S.C. Malik,

Mathematical Analysis – Apostol,

Mathematical Analysis - H.C. Malik,

Calculus - Thomas & Finny,

Ordinary Differential Equations – Earl.A.Coddington,

Modern Algebra – A.R. Vasishtha

I hope my answer will help you out

Good luck

Hi

Here I'll give a brief comparison between two of these exams

TIFR GS

This exam is conducted on the first week of December

IIT JAM

This exam is conducted on the first week of February

now TIFR GS is a little harder here due to its timing. Because most of us have their semester exams on December or November so preparing for TIFR GS along with semester exams is difficult.On the other hand IITJAM has a quite good timing. Because the even semester starts on May .

Now TIFR GS is conceptual exam.

IIT JAM is formula based exam.

So here if you have a clear concept but you don't memorize formulae TIFR GS would be easy for you.

But if your subject knowledge is not that good but you practice a lot and have memorized every formulae IITJAM is easy for you.

Another thing is that TIFR GS is a two stage exam .You have to give written exam and interview.But IIT JAM is only an  exam of 3 hrs.

So these are the pros and cons .

Hope this helps

These are some of the books that you can refer for your own course to excel well in the IIT JAM exams. About life sciences, alomg with Pranav Kumar I'll suggest you to follow Usha Mina book too. It has great concepts covered as well..

.Life Sciences: Fundamentals and Practice – I, II: -Pranav Kumar, Usha Mina

.Principles of Genetics: -Gardner, Simmons, Snustad

.Cell and Molecular Biology: - Karp

.Biochemistry: -Jeremy M. Berg, Lubert Stryer, John L. Tymoczko

.Developmental Biology: - Scott F. Gilbert, Susan R. Singer

.Kuby Immunology: - Barbara A. Osborne, Richard Goldsby

.Essentials of Physiology: - Lauralee Sherwood

.Molecular Biology of the Cell: -Bruce Alberts

.Microbiology: -John P. Harley, Donald Klein.

Best wishes. Thank you.

Hii aspirants

here I am providing you list of some good books for iit jam geology. these are

IIT JAM M.Sc. Geology by Ajhar Hussain

Trend in Objective Geology by Ausaf Saeed

A Text book of Geology by P.K. Mukerjee

Principles of engineering Geology by K.M. Bangur

I hope my answer will help you out

Good luck

Structural Geology by Twiss & Moores

Hello Vidya Devi

IIT JAM exam form for registration was released on 5th September and last date for registration was 12th October. I am sorry to say but there is no possibility to apply for the exam after the last date of registration. Correction window will be open in first week of November.

Hope it helps you.

Hii aspirants

let me clear your doubt.

Yes you can give jam exam aftee completing your bsc. And here is the eligibility criteria for jam exam

A canditate after completing their bachelor degree are eligible for jam exam

A candidate belonging to general /obc (non creamy layer) should have atleast 55 percent aggregate marks ,without rounding off.

And those who belong to sc st should have at least 50 percent aggregate marks, without rounding off.

I hope my answer will help you out

Good luck

Integral calculus -Most of the questions are from definite integral. I referred Integral Calculus by Samvedna publications .

Differential calculus - Concentrate on Rolles theorem,Lagrange’s theorem, and Intermediate value theorem. Also focus on partial differentiation. I referred Differential equations by Samvedna publications .

Vector algebra - Concentrate on Stokes’ theorem, Divergence theorem and Greens’ theorem. Questions are asked from these topics only. I referred Vector calculus by Samvedna publications.

Differential calculus - This is the easiest topic. Only ordinary differential equations is in the syllabus. I referred Differential calculus by Samvedna publications.

Linear algebra -Questions are mostly application oriented.You can either refer Linear algebra by Hoffman and Kunze (which gives a strong theoretical foundation but lacks examples and exercises for practice) or Linear algebra by Gilbert Strang( which is more application oriented and has a lot of exercises for practice).If your sole aim is to crack JAM go for the latter. But if you also want to build a strong foundation,go for the first one.

Hello,

IIT-JAM Syllabus for Mathematics is mentioned below-

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 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 homomorphisms 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.