CUET PG Mathematics Syllabus 2025 is designed to evaluate the aspirant’s proficiency in core mathematical concepts and problem-solving abilities. The CUET PG Mathematics syllabus includes chapters like algebra, integral calculus, real analysis, differential equations, vector calculus, complex analysis, linear programming, etc. Those who are aiming to pursue post-graduation studies in Mathematics must understand the syllabus to build a solid foundation that would help them excel in the exam.
CUET PG Mathematics Syllabus 2025
The Common University Entrance Test (CUET) is conducted for students seeking admission into PG programmes in Central and participating Universities. As the CUET PG 2025 Exam is scheduled from March 13 to 31, 2025, aspirants must analyse the CUET PG Mathematics syllabus to cover all the exam-oriented concepts. Similarly, they must also review the CUET PG Mathematics exam pattern to fully understand the latest exam format and scoring criteria. Read on to learn more about the CUET PG Mathematics syllabus, exam pattern, strategy, and best books.
CUET PG Mathematics Syllabus PDF
Get your hands on the free CUET PG Mathematics exam syllabus PDF and customise your study schedule. By integrating this resource, you can focus only on the crucial topics and significantly strengthen your preparation through strategic practice.
| CUET PG Mathematics Syllabus 2025 PDF |
CUET PG Mathematics Syllabus 2025 Topic Wise
The CUET PG Mathematics exam syllabus typically covers topics such as algebra, integral calculus, real analysis, differential equations, vector calculus, complex analysis, linear programming, etc. Understanding concepts across all chapters is crucial to succeed in the exam. Let’s discuss the topic-wise CUET PG Mathematics Syllabus below for the reference of the candidates.
| Topics | Syllabus |
| Algebra | Groups, subgroups, Abelian groups, non-abelian groups, cyclic groups, permutation groups; Normal subgroups, Lagrange's Theorem for finite groups, group homomorphism and quotient groups, Rings, Subrings, Ideal, Prime ideal; Maximal ideals; Fields, quotient field. Vector spaces, Linear dependence and Independence of vectors, basis, dimension, linear transformations, matrix representation with respect to an ordered basis, Range space and null space, rank-nullity theorem; Rank and inverse of a matrix, determinant, solutions of systems of linear equations, consistency conditions. Eigenvalues and eigenvectors. Cayley-Hamilton theorem. Symmetric, Skew symmetric, Hermitian, Skew-Hermitian, Orthogonal and Unitary matrices. |
| Real Analysis | Sequences and series of real numbers. Convergent and divergent sequences, bounded and monotone sequences, Convergence criteria for sequences of real numbers, Cauchy sequences, absolute and conditional convergence; Tests of convergence for series of positive terms-comparison test, ratio test, root test, Leibnitz test for convergence of alternating series. Functions of one variable: limit, continuity, differentiation, Rolle's Theorem, Cauchy’s Taylor's theorem. Interior points, limit points, open sets, closed sets, bounded sets, connected sets, compact sets; completeness of R, Power series (of real variable) including Taylor's and Maclaurin's, domain of convergence, term-wise differentiation and integration of power series. Functions of two real variables: limit, continuity, partial derivatives, differentiability, maxima and minima. Method of Lagrange multipliers, Homogeneous functions including Euler's theorem. Complex Analysis: Functions of a complex Variable, Differentiability and analyticity, Cauchy Riemann Equations, Power series as an analytic function, properties of line integrals, Goursat Theorem, Cauchy theorem, a consequence of simple connectivity, index of closed curves. Cauchy’s integral formula, Morera’s theorem, Liouville’s theorem, Fundamental theorem of Algebra |
| Complex Analysis | Functions of a complex Variable, Differentiability and analyticity, Cauchy Riemann Equations, Power series as an analytic function, properties of line integrals, Goursat Theorem, Cauchy theorem, consequence of simple connectivity, index of closed curves. Cauchy’s integral formula, Morera’s theorem, Liouville’s theorem, Fundamental theorem of Algebra, and Harmonic functions. |
| 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-separable solutions, Linear differential equations of second and higher order with constant coefficients, method of variation of parameters. Cauchy-Euler equation. |
| Vector Calculus | Scalar and vector fields, gradient, divergence, curl and Laplacian. Scalar line integrals and vector line integrals, scalar surface integrals and vector surface integrals, Green's, Stokes and Gauss theorems and their applications. |
| Linear Programing | Convex sets, extreme points, convex hull, hyper plane & polyhedral Sets, convex function and concave functions, Concept of basis, basic feasible solutions, Formulation of Linear Programming Problem (LPP), Graphical Method of LPP, Simplex Method. |
CUET PG Mathematics Exam Pattern 2025
The CUET PG Mathematics Exam Pattern must be analysed by the candidates to understand weightage and scoring parameters. It comprises a total of 75 questions related to the subject and will be asked in bilingual (English/Hindi) language. According to the marking scheme, each question carries 4 marks and a negative marking of one mark will be applicable for every wrong answer in the exam.
| Subject | Number of Questions | Duration |
| Mathematics | 75 questions | 90 minutes |
How to Prepare for CUET PG Mathematics Syllabus 2025
To excel in the CUET PG Mathematics exam, aspirants must follow the tips and tricks shared below for reference purposes:
- Prioritise important topics like algebra, real analysis, complex analysis, integral calculus, differential equations, vector calculus, linear programming, etc.
- Practice questions from previous year's question papers and mock tests to strengthen the concepts.
- Memorise formulas, and short-cut techniques to improve the speed of solving questions.
- Choose the best books for each topic to effortlessly master the fundamentals and core concepts.
Books for CUET PG Mathematics Syllabus 2025
While a wide variety of books exists, candidates generally get their hands on those that align completely with the CUET PG Mathematics syllabus. Here is the list of the expert-recommended CUET PG Mathematics books shared below for the ease of the aspirants.
- A Problem Book in Mathematical Analysis authored by GN Berman
- Skills in Mathematics by Arihant
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