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  #1  
2nd June 2015, 04:20 PM
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IIT JEE Math

I am papering for the IIT JEE examination this year being a science student having completed my 12th in PCM stream with a good percentage. So regarding this entrance examination kindly provide me with the syllabus of the Math so that I can prepare well for this examination.
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  #2  
5th July 2018, 12:37 PM
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Re: IIT JEE Math

I want to do engineering degree as I completed 12th with PCM and want to apply for IIT JEE Exam searching for exam syllabus. Will you please provide me IIT JEE Math Syllabus so that I get to know list of subject and topics to study for this IIT JEE Exam Mathematics subject?
  #3  
5th July 2018, 12:38 PM
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Join Date: Aug 2012
Re: IIT JEE Math

JEE Main 2019 will be organized by NTA (National Testing Agency). It is a national level entrance test.

It is organized to offer admission in BE/B.Tech and B.Arch/B.Plan courses. NITs, CFTIs and various other colleges and institutions of India consider the JEE Main scores for providing admission.

Below I am providing you the IIT JEE Math Syllabus:

Unit 1: Sets, Relations, and Functions

Sets and their representation.

Union, intersection, and complement of sets and their algebraic properties.

Powerset.

Relation, Types of relations, equivalence relations.

Functions; one-one, into and onto functions, the composition of functions.

Unit 2: Complex Numbers & Quadratic Equations

Complex numbers as ordered pairs of reals.

Representation of complex numbers in the form (a+ib) and their representation in a plane, Argand diagram.

Algebra of complex numbers, modulus and argument (or amplitude) of a complex number, square root of a complex number.

Triangle inequality.

Quadratic equations in real and complex number system and their solutions.

The relation between roots and coefficients, nature of roots, the formation of quadratic equations with given roots.

Unit 3: Matrices & Determinants

Matrices: Algebra of matrices, types of matrices, and matrices of order two and three.

Determinants: Properties of determinants, evaluation of determinants, the area of triangles using determinants.

Adjoint and evaluation of inverse of a square matrix using determinants and elementary transformations.

Test of consistency and solution of simultaneous linear equations in two or three variables using determinants and matrices.

Unit 4: Permutations and Combinations

The fundamental principle of counting.

Permutation as an arrangement and combination as selection.

The meaning of P (n,r) and C (n,r). Simple applications.

Unit 5: Mathematical Induction

The principle of Mathematical Induction and its simple applications.

Unit 6: Binomial Theorem

Binomial theorem for a positive integral index.

General term and middle term.

Properties of Binomial coefficients and simple applications.

Unit 7: Sequence & Series

Arithmetic and Geometric progressions, insertion of arithmetic.

Geometric means between two given numbers.

The relation between A.M. and G.M.

Sum up to n terms of special series: Sn, Sn2, Sn3.

Arithmetico Geometric progression.

Unit 8: Limit, Continuity & Differentiability

Real-valued functions, algebra of functions, polynomials, rational, trigonometric, logarithmic and exponential functions, inverse functions.

Graphs of simple functions.

Limits, continuity, and differentiability.

Differentiation of the sum, difference, product, and quotient of two functions.

Differentiation of trigonometric, inverse trigonometric, logarithmic, exponential, composite and implicit functions; derivatives of order up to two.

Rolles and Lagranges Mean Value Theorems.

Applications of derivatives: Rate of change of quantities, monotonic increasing and decreasing functions, Maxima, and minima of functions of one variable, tangents, and normals.

Unit 9: Integral Calculus

Integral as an antiderivative.

Fundamental integrals involving algebraic, trigonometric, exponential and logarithmic functions.

Integration by substitution, by parts, and by partial fractions.

Integration using trigonometric identities.

Integral as limit of a sum.

Evaluation of simple integrals:


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