Algebra focuses on the systematic study of matrices and their operational properties. Candidates must understand types of matrices, equality conditions, and the significance of the transpose. Mastery of symmetric and skew-symmetric matrices is required, alongside the algebra of matrices. The unit covers determinants, calculating the inverse of a matrix, and the application of matrix methods to solve simultaneous linear equations accurately.

Includes: Matrix Inverses, Transpose Properties, Determinant Calculation.

Calculus in Section A1 emphasizes the behavior and optimization of functions. It includes finding higher-order derivatives, specifically second-order derivatives, to understand curvature. Students will analyze increasing and decreasing functions to determine intervals of monotonicity. The most critical application is finding maxima and minima, which helps in solving real-world optimization problems where identifying peak efficiency or lowest cost is necessary for success.

Includes: Second Order Derivatives, Maxima-Minima Word Problems.

This unit introduces the concepts of anti-derivatives and spatial measurement. It starts with the indefinite integrals of simple functions and the systematic evaluation of indefinite integrals. Transitioning to definite integrals, the course focuses on calculating numerical values within boundaries. A major application is using integration to find the area under a curve, specifically for simple curves, providing a geometric understanding of accumulated totals over time.

Includes: Definite Integral Evaluation, Area Under Simple Curves.

Differential equations describe relationships between variables and their rates of change. Students must be able to identify the order and degree of differential equations to classify them correctly. The curriculum focuses on solving differential equations with the variables separable method, which is a fundamental technique for finding general solutions. Understanding these concepts is essential for modeling growth and decay processes in physics and chemistry contexts within the exam.

Includes: Degree/Order Identification, Variable Separable Method.

Probability distributions provide the framework for analyzing random events in a structured manner. The central concept here is the random variable, which assigns numerical outcomes to random experiments. Students will learn how to map these variables to their respective probabilities to predict long-term patterns. This chapter forms the basis for statistical reasoning, helping students evaluate likelihoods and expectancies in complex scenarios frequently encountered in the CUET quantitative sections.

Includes: Random Variable Mapping, Discrete Probabilities.

Linear Programming (LPP) is an optimization technique used to achieve the best outcome under constraints. Students will master the graphical method of solution for two-variable problems. This includes identifying the feasible and infeasible regions based on a set of linear inequalities. The ultimate objective is to find the optimal feasible solution that satisfies all constraints while maximizing or minimizing the objective function, which is a vital skill for resource management problems.

Includes: Graphical Maximization, Feasible Region Analysis.

This unit explores the logical connection between sets and their elements. It covers types of relations including reflexive, symmetric, and transitive, leading to equivalence relations. Students must differentiate between one-one (injective) and onto (surjective) functions. Furthermore, it delves into Inverse Trigonometric Functions, focusing on their domain, range, principal values, and the interpretation of their graphs, which is essential for solving advanced trigonometric problems.

Includes: Equivalence Proofs, Inverse Trig Principal Values.

The Core Algebra unit deepens the understanding of Matrices and Determinants. Topics include matrix notation, zero matrices, and non-commutativity of multiplication. It covers invertible matrices and the uniqueness of inverse. For Determinants, students learn to calculate up to 3×3 matrices, utilize minors and cofactors, find the area of a triangle, and apply the adjoint and inverse to solve systems of linear equations in two or three variables efficiently.

Includes: Matrices and Properties of matrices

Includes: 3×3 Determinants, Adjoint Method, Cramer’s Rule.

This comprehensive calculus unit covers Continuity and Differentiability using the Chain Rule, and derivatives of inverse trigonometric, logarithmic, and exponential functions. It explores logarithmic, parametric, and implicit differentiation. Techniques of integration involve substitution, partial fractions, and integration by parts. Students also study applications like rate of change and area under standard curves like circles, parabolas, and ellipses, alongside solving homogeneous and linear differential equations.

Topics: Applications Of Derivatives

Topics: Integration, Applications Of Integration.

Topics: Continuity And Differentiability

Topics: Differential Equations

Topics: Integration

Vector algebra involves the study of dot and cross products and their physical interpretations. In 3D Geometry, students focus on direction cosines and ratios to define lines in space. The unit covers the equation of a line in Cartesian and vector forms. Key concepts include finding the angle between two lines and the shortest distance between skew lines, which are fundamental for understanding three-dimensional spatial orientation and geometry problems.

Includes: Dot/Cross Product, Distance Between Skew Lines.

Focusing on optimization, this unit requires students to define constraints and objective functions for a given problem. Using the graphical solution method, students must visualize feasible and infeasible regions to pinpoint the optimal solution. This systematic approach allows for the maximization of profit or minimization of cost within the boundaries of linear inequalities, a core requirement for candidates aiming for high scores in the analytical sections of the exam.

Includes: Objective Function Formulation, Feasible Vertex Analysis.

Core Probability involves complex decision-making theories. It starts with conditional probability and the multiplication theorem for finding the likelihood of combined events. A major highlight is Baye’s theorem, which is essential for calculating posterior probabilities. The unit concludes with the study of random variables, ensuring students can handle multi-step probability problems that involve dependent and independent events commonly found in the CUET mathematics paper.

Includes: Baye’s Theorem Applications, Random Variable Variance.

Applied Mathematics starts with Modulo arithmetic and congruence modulo, vital for theoretical and computer logic. It includes practical competitive topics like Allegation and mixture, Boats and streams, and Pipes and cisterns. Students will also master Races and games and solve numerical inequalities. This unit is designed to enhance numerical speed and the ability to apply mathematical logic to common real-life scenarios and competitive entrance test problems.

Includes: Modulo Congruence, Boats & Streams Logic.

In the Applied stream, Algebra focuses on the utility of matrices and determinants in business and data analysis. This includes matrix operations and finding the inverse of a matrix to solve systems of equations involving up to three variables. This unit ensures students can handle multivariate data and solve for unknown factors in a systematic, matrix-driven approach, which is a standard requirement for data-centric professional fields.

Includes: Inverse Matrices, Solving 3-Variable Systems.

Applied Calculus connects mathematical change to economics. It covers higher-order derivatives alongside economic concepts like Marginal cost and Marginal revenue. Students will use maxima and minima to find optimal business points. The unit also introduces indefinite and definite integrals to calculate Consumer and producer surplus. Additionally, it explores differential equations specifically through growth and decay models, which are used to predict population trends and financial fluctuations.

Includes: Marginal Revenue, Consumer Surplus Integrals.

This unit expands on statistical distributions used in research. It covers random variables and mathematical expectation, which represents the average outcome. Students will calculate variance and standard deviation to measure data spread. The course details specific models: Binomial distribution for success/failure trials, Poisson distribution for rare events, and Normal distribution for naturally occurring data sets, providing a complete toolkit for analyzing probabilistic data in various applied fields.

Includes: Normal Distribution Z-Scores, Poisson Mean.

This unit focuses on analyzing data that changes over time, a crucial skill for economists and analysts. It introduces Time series and explores the various components of time series like seasonal and cyclical variations. Students will learn Trend analysis to predict future values based on historical data. Mastery of index numbers allows for the comparison of economic variables across different time periods, making this unit highly relevant for data interpretation tasks.

Includes: Trend Analysis, Moving Averages, Index Calculation.

Inferential statistics allow researchers to make predictions about a population based on sample data. This unit covers the difference between population and sample, and parameter versus statistic. Students will learn the Central Limit Theorem, which is the foundation of modern statistics. Additionally, it covers the t-test (both one-sample and two-sample), enabling students to determine if the differences observed in data are statistically significant or just due to chance.

Includes: t-test Hypothesis Testing, Sample vs Population.

Financial Mathematics provides tools for modern fiscal management. Students will calculate Perpetuity and Sinking funds for long-term investments. The unit details EMI calculation methods and determining the Rate of return. Concepts like Compound Annual Growth Rate (CAGR) are taught to measure investment performance over time. Finally, it covers the linear method of depreciation to account for the reduction in value of assets, preparing students for professional financial analysis roles.

Includes: EMI Formula, CAGR Calculation, Depreciation.

This applied unit focuses on the practical formulation of LPP from word problems. Students learn to translate business constraints into mathematical inequalities and define an objective function. The unit emphasizes the graphical solution for two variables, helping students visualize the feasible and infeasible regions. Identifying the optimal solution ensures that resources are utilized at their maximum efficiency, which is a key component of the CUET Applied Mathematics competitive syllabus.

Includes: Real-world LPP Formulation, Constraint Mapping.