There are four sections to the CUET Maths Syllabus. Other sub-sections or chapter groups are equally important to the text’s four sections. Each unit has some connection to the others. To completely understand and apply these topics from the CUET syllabus for mathematics, a student needs to study them extensively.
The candidate should devote the same amount of time and effort to each section of the CUET Maths Syllabus. A branch of intellectual science known as mathematics deals with amount, size, and space as either abstract ideas or practical applications in other disciplines like physics and engineering.
CUET Maths Syllabus 2025
The National Testing Agency has made the Mathematics Syllabus available to applicants who plan to take the CUET exams. Candidates must be fully conversant with the subject matter and course material that may be covered in the mathematics CUET exam. When applied to other disciplines like physics and engineering or as abstract notions (pure mathematics), mathematics is an abstract science that deals with numbers, quantity, and space (applied mathematics).
Some subjects covered in the CUET Mathematics syllabus are relations and functions, algebra, calculus, vectors and three-dimensional Geometry, Linear Programming, and Probability. To better understand the exam, candidates can review the CUET Exam Pattern.
Units in CUET Maths Syllabus
The NTA has broadly divided the Maths syllabus of the CUET exam into 6 units. These units are further divided into sub-topics. Aspirants preparing for the exam must check the units to outperform the competitors in the exam: The units are
- Relations and Functions
- Calculus
- Linear Programming
- Algebra
- Probability
- Vectors & Three-Dimensional Geometry
CUET Mathematics Syllabus PDF
You can get the CUET Maths Syllabus PDF from the official website. However, it could seem as though this is a challenging task. Instead, you can get the official syllabus PDF using the direct URL below. The Mathematics syllabus must be downloaded in PDF format.
CUET Mathematics Syllabus Unit-wise
The CUET Mathematics unit-by-unit course has been made crystal plain using the table below. To create a successful exam preparation strategy and pass the exam, you must check the unit-wise syllabus. To fully understand the exam, being familiar with every subject covered in the section is vital. The following are some essential subjects from the CUET Maths syllabus:
| CUET Mathematics Syllabus | |
| RELATIONS AND FUNCTIONS | (a) Relations and Functions. – Types of relations: Reflexive, symmetric, transitive, and equivalence. – One-to-one and 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. | |
| ALGEBRA | – 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. | |
| CALCULUS | (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. – Define 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 two above-said curves. | |
| (e) Differential Equations – Definition, order, degree, general and particular solutions of a differential equation. – Formation of differential equations 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 equations of the type. | |
| VECTORS & THREE-DIMENSIONAL GEOMETRY | 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 an issue 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. |
| 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. | |
| LINEAR PROGRAMMING | Introduction, Related terminology such as constraints, objective function, optimization, different linear programming problems, mathematical formulation of L.P. Problems, graphical method of solution for problems in two variables, feasible and infeasible regions, feasible and infeasible solutions, optimal feasible solutions. |
| PROBABILITY | Multiplications theorem on probability. Conditional probability, independent events, total probability, Bayes theorem. Random variable and its probability distribution, mean, and variance of random variables. Repeated independent trials and binomial distribution. |
How to prepare for the CUET Mathematics Syllabus?
To enhance and succeed in their study and the actual exam, candidates should review the exam preparation advice provided by the mathematics syllabus. Here are some of the most crucial CUET preparation advice for mathematics.
- Pay close attention to the exam syllabus, deconstruct it into components, and then carefully analyze it to comprehend it completely.
- Calculus deserves extra attention because it will make up most of the exam.
- Next, focus on Algebra and Vector & 3D since these two subjects are anticipated to have the most questions.
- Additionally, when learning mathematics, you should emphasize understanding the subject matter and how things truly operate rather than just memorizing formulas and solutions.
- Make a preparation schedule and follow it. Making a study plan is essential before starting the exam preparation.
- Candidates should make a schedule in advance and allow enough time for each subject. To make it more achievable, they must set realistic targets during preparation.
- Continue to practice carefully, but only when directed by someone knowledgeable and moving in the right direction. You’ll need to spend a lot of time studying to pass the CUET mathematics exam, and the mock test can be used as a practice by candidates.
- Candidates must finish as many CUET sample papers and question papers from prior years as they can. A student’s score on exam day will rise as a result.
Also Check,
CUET Mathematics Syllabus FAQs
The Mathematics syllabus for CUET exam consists of four separate modules. Relations and functions, Algebra, Calculus, and Vector algebra are the four courses in question. Relations and Functions, Vector Algebra, Logarithms, Inequalities, Differentiation, Integration, and other important chapters are just a few of the significant ones in the Mathematics section of the CUET exam. The CUET Preparation Suggestions for the mathematics syllabus are available to candidates.
Candidates should solve CUET Previous Year Question Papers and Mock Tests to prepare for the Mathematics syllabus.
No! The official Maths syllabus hasn’t changed in a while. The National Testing Agency, which conducts the exams, will inform pupils in advance even if adjustments are made immediately.
Visit cuet.samarth.ac.in for additional information and to obtain the CUET Mathematics syllabus PDF. However, it could seem a difficult task. Instead, you can quickly and conveniently get the syllabus by using the direct link provided in the articles.
The Maths syllabus for CUET exam consists of four separate modules. The study of numbers, quantities, and space is known as mathematics, and it can be applied to various fields, including physics and engineering, or as pure abstract concepts (applied mathematics).