CUET Maths Syllabus 2023: Download Topic-wise Syllabus PDF

By BYJU'S Exam Prep

Updated on: September 11th, 2023

The CUET Maths syllabus is divided into four sections which are further divided into several chapters or sub-sections that have equal importance throughout the paper. Each unit is connected to the others. For a student to properly understand these topics from the CUET Maths Syllabus, they should be carefully studied.

Each section should be given the same time and effort by the candidate. Mathematics is an intellectual science that deals with numbers, quantity, and space as abstract concepts or applications in other fields such as physics and engineering. Candidates also have the option to download CUET Maths Syllabus PDF from the link given below.

CUET Maths Syllabus 2023

The National Testing Agency has released the CUET Mathematics Syllabus for candidates preparing for the CUET Mathematics exams. Aspirants must be completely familiar with the syllabus and topics in the CUET exam. Mathematics is an abstract science that deals with numbers, quantity, and space, either as abstract concepts (pure mathematics) or applied to other fields like physics and engineering (applied mathematics).

Relations & Functions, Algebra, Calculus, Vectors & Three-Dimensional Geometry, Linear Programming, and Probability are some topics from the CUET Mathematics Syllabus.

CUET Maths Syllabus PDF

Candidates must obtain the CUET Mathematics Syllabus in PDF format. The syllabus PDF can be downloaded from This may, however, appear to be a difficult task. Instead, you can download the official syllabus PDF from the direct link below.

CUET Mathematics Syllabus PDF

Referring to the syllabus PDF will not only prove to be useful but also time-saving. It is an offline resource which can be referred to at any given point in time.

CUET Maths Syllabus Unit-wise

The CUET Mathematics unit-wise syllabus has been demonstrated using the table below. You must review it to design an effective exam preparation strategy and succeed in the exam. To comprehend the exam completely, it is also necessary to be familiar with all the topics in the section. The following are some key topics from the CUET Syllabus of Mathematics:

CUET Mathematics Syllabus


(a) Relations and Functions.
Types of relations: Reflexive, symmetric, transitive, and equivalence.
– One-to-one and on-to functions, composite functions, the inverse of a function.
– Binary operations.

(b) Inverse Trigonometric Functions
Definition, range, domain, principal value branches.
Graphs of inverse trigonometric functions.
– Elementary properties of inverse trigonometric functions.


Matrices Concept, notation, order, equality, types of matrices, zero matrices, transpose of a matrix, symmetric and skew-symmetric matrices.
Addition, multiplication, and scalar multiplication of matrices, simple properties of addition, multiplication, and scalar multiplication.
Non-commutativity of multiplication of matrices and existence of non-zero matrices whose product is the zero matrices.
Concept of elementary row and column operations.
The invertible matrices and proof of the uniqueness of inverse fit exist.

Determinants of a square matrix (up to 3×3 matrices), properties of determinants, minors, cofactors, and applications of determinants in finding the area of a triangle.
Adjoint and inverse of a square matrix.
Consistency, inconsistency, and several solutions of a system of linear equations by examples, solving a system of linear equations in two or three variables using the inverse of a matrix.


(a) Continuity and Differentiability:
– A derivative of composite functions, chain rules, inverse trigonometric functions, and a derivative of implicit functions.
Concepts of exponential and logarithmic functions.
Derivatives of log x and ex.
Logarithmic differentiation.
Derivative of functions expressed in parametric forms.
Second-order derivatives.
Rolle’s and Lagrange’s Mean Value
Theorems and their geometric interpretations.

(b) Applications of Derivatives:
Rate of change, increasing/decreasing functions, tangents and normals, approximation, maxima, and minima.
Simple problems.
Tangent and Normal.

(c) Integration is an inverse process of differentiation:
Integration of various functions by substitution, partial fractions, and parts. Only simple integrals of the type are to be evaluated.
– Definite integrals as a limit of a sum.
Fundamental Theorem of Calculus.
Basic properties of definite integrals and evaluation of definite integrals. 

(d) Applications of the Integrals.
Applications in finding the area under simple curves, especially lines, arcs of circles/parabolas/ellipses, and the area between the above-said curves. 

(e) Differential Equations
Definition, order, degree, general and particular differential equation solutions.
Formation of differential equation whose general solution is given.
Solution of differential equations by separating variables, homogeneous differential equations of the first order, and first degree.
Solutions of linear differential equation of the type.


(a) Vectors and scalars, magnitude, and direction of a vector.
Direction cosines/ratios of vectors.
Types of vectors, position vector of a point, negative of a vector, components of a vector, the addition of vectors, multiplication of a vector by a scalar, position vector of a point dividing a line segment in a given ratio.
The scalar product of vectors, projection of a vector on a line.
Vector product of vectors, scalar triple product.

(b) Three-dimensional Geometry Direction cosines/ratios of a line joining two points.
Cartesian and vector equation of a line, coplanar and skew lines, the shortest distance between two lines.
Cartesian and vector equation of a plane.
The angle between
(i) Two lines,
(ii) Two planes, and
(iii) a line and a plane.
Distance of a point from a plane.


Introduction, Related terminology such as constraints, objective function, optimization, different types of linear programming problems, mathematical formulation of L.P.
Problems, graphical method of solving problems in two variables, feasible and infeasible regions, feasible and infeasible solutions, optimal feasible solutions.


Multiplications theorem on probability.
Conditional probability, independent events, total probability, Bayes theorem.
Random variable and its probability distribution, mean, and variance of haphazard variable.
Repeated independent trials and binomial distribution.

CUET Maths Syllabus Preparation Tips

Candidates should review the CUET Mathematics preparation tips listed below to improve and succeed in both their preparation and the actual exam. The important CUET preparation tips for Mathematics are as follows.

  • Concentrate intently on the syllabus, breaking it into sections and then thoroughly analyzing it to gain a thorough understanding.
  • Pay special attention to calculus because it will account for most of the paper.
  • Algebra and Vector & 3D should be prioritized next, as these two topics are expected to have the most questions.
  • Also, when learning Mathematics, your primary focus should not only be on memorizing shortcuts and solution procedures but also on delving deeply into the concept at hand and how things work.
  • Candidates should plan ahead of time and devote sufficient time to each subject. They must set attainable goals in their preparation to make it more manageable.
  • Candidates must attempt CUET previous year’s question papers and sample papers to evaluate their preparation.

Best Books for CUET Maths Syllabus

Studying for the CUET Maths exam can be tough, random, and confusing. If a student does not use the correct set of CUET books. It’s important to select appropriate books for your subject and adhere to a sensible study plan. Some of the most useful books for covering the CUET syllabus for Maths are as follows:-

  • NCERT Class 11th and 12th Mathematics Textbook.
  • RD Sharma Mathematics Textbook for Class 11th and 12th.


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