

Kickstart Your Journey to CUET PG Economics & UGC NET Success
Welcome to the Prarambh Series—a premium, foundations-first mathematical bridging course thoughtfully curated by ArthaPoint. If you are preparing for competitive postgraduate economics entrances but dread complex mathematical equations, you are in the exact right place. This free course breaks down advanced abstractions into simple, logical pieces, giving you the ultimate toolkit to conquer your exams.
Why Prarambh? We bridge the gap between abstract algebra and economic optimization, ensuring you build intuitive conceptual clarity from the absolute ground up.
The Roadmap: Core Learning Phases
The Prarambh curriculum is strategically separated into two vital academic building blocks:
Phase 1: Set Theory (Lectures 1–6): Master the grammar of discrete mathematics, learn to draw logical boundaries, and visually map data using Venn diagrams.
Phase 2: Relations & Coordinate Geometry (Lectures 7–8): Shift from static groups of data to active pairings, setting up the essential prerequisites for understanding economic optimization.
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"Prarambh Series" - Your First Step to CUET PG Economics 2027
Core Philosophy: A strong foundation is the secret to every top rank. The Prarambh Series is ArthaPoint's gift to every serious aspirant—a free, structured, and comprehensive launchpad that ensures no beginner is left behind. It transforms the daunting task of preparation into a clear, step-by-step journey.
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What is the Prarambh Series?
The Prarambh Series (Hindi for "Beginning") is a completely free, foundational video course designed specifically for students starting their preparation for the CUET PG Economics 2027 exam. It is the first step in ArthaPoint's "Mission CUET PG Economics 2027" and aims to build a rock-solid base in all essential subjects from the ground up
Module Breakdown & Video Lectures
Phase 1: Set Theory (The Grammar of Mathematics)
In this phase, we establish how mathematical groups are structured, classified, and altered using algebraic operations.​
Lecture 1: Set Theory Fundamentals & Roster Form
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Introduces the free mathematical series tailored specifically for CUET PG Economics and UGC NET aspirants.
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Explores the history of set theory founded by Georg Cantor.
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Defines a mathematical "set" as an objective, well-defined collection of objects.
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Reviews essential number systems including Natural numbers ($N$), Integers ($Z$), Rational numbers ($Q$), and Real numbers ($R$).
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Explains the Tabular/Roster form where distinct elements are neatly categorized inside curly brackets.
Lecture 2: Set Builder Form & Practice Exercises
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Transitions from basic listing to the descriptive Set Builder notation.
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Teaches you how to state sets by identifying the precise properties their elements must satisfy.
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Breaks down multiple real-world and algebraic practice problems step-by-step.
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Covers equation solution sets and string manipulation concepts like converting word strings into unique set characters.
Lecture 3: Null, Finite, Infinite & Equal Sets
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Opens with a quick concept check to verify your active learning progress.
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Defines the Empty (Null or Void) Set, mathematically denoted by $\emptyset$.
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Deeply analyzes the structural differences between Finite and Infinite sets.
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Demystifies why certain infinite spaces (like all real numbers) can never be written in Roster format.
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Introduces Equal Sets, highlighting that element repetition or altered indexing does not change set equality.
Lecture 4: Subsets, Intervals & Set Union
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Explores the concept of Subsets, where every element of set $A$ is fundamentally housed within set $B$.
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Establishes the real number system hierarchy formula: $N \subseteq Z \subseteq Q \subseteq R$.
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Maps out real number line intervals including open, closed, and semi-open parameters.
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Highlights the Universal Set ($U$) as the absolute boundary framework for given scenarios.
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Explains visual data mapping through Venn Diagrams and introduces the additive properties of Set Unions ($A \cup B$).
Lecture 5: Advanced Set Operations: Intersections, Differences & Complements
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Covers the Intersection of Sets ($A \cap B$) to extract elements common to multiple groups.
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Explains how to identify Disjoint Sets that share zero common data points.
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Covers the Difference of Sets ($A - B$), warning students that order is strictly non-commutative ($A - B \neq B - A$).
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Covers the Complement of a Set ($A^c$), representing everything in the universe except the set itself.
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Proves the vital properties of De Morgan's Laws both algebraically and visually.
Lecture 6: Set Theory Comprehensive Test Solutions
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A dedicated diagnostic review session walking through a live practice test.
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Provides step-by-step solutions to multiple-choice questions focusing on set formatting, intersections, and distributive properties.
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Concludes the comprehensive study of Chapter 1 (Set Theory).
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Previews linear coordinate variables to cleanly transition into the next module.
Phase 2: Relations & Coordinate Systems (The Foundation for Functions
This phase shifts your focus from isolated groups of numbers to dynamic interactions and dimensions.
Lecture 7: Cartesian Product of Sets & Coordinate Space
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Formally begins the study of Relations and Functions.
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Introduces the Cartesian Product ($A \times B$), which forms a comprehensive set of all ordered pairs.
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Explains that order is critical because coordinate pair $(3,1)$ does not equal $(1,3)$.
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Teaches the fundamental formula ($p \times q$) to determine the total elements within a product.
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Maps out multi-variable Ordered Triplets ($A \times B \times C$).
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Illustrates how $R \times R$ constructs a 2D coordinate space while $R \times R \times R$ builds a 3D coordinate model.
Lecture 8: Defining Relations, Domain, Range & Co-Domain
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Evaluates a Relation as a highly specific, rule-bound subset of a Cartesian product.
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Uses visual arrow diagrams to cleanly map inputs to outputs.
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Establishes core terminology: the Image (destination element $y$), the Domain (all starting elements with outgoing maps), the Range (the specific set of destination images), and the Co-domain (the entire target set).
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Proves that the Range is always a subset of the overarching Co-domain.
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Introduces the exponential formula ($2^{pq}$) utilized to calculate the total number of possible relations between sets.
Phase 3: Core Functions & Absolute Values (The Foundation for Economic Models)
We advance from general relations into strict, operational functions that mirror consumer behavior and economic variables.
Lecture 9: Introduction to Functions & Unique Mappings
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Formalizes the logical transition from basic mathematical relations to strict Functions.
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Decodes the specific criteria required for a relation to qualify as a function (where every distinct input connects to exactly one unique output).
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Breaks down function notation ($f(x)$) and dependent versus independent variables.
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Introduces the structural mapping concepts foundational to constructing supply and demand parameters.
Lecture 10: Special Functions & Modulus Rules
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Delves deeply into high-weightage special functions, with a clear focus on the Modulus (Absolute Value) Function.
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Teaches how to algebraically define, split up piece-wise, and correctly plot modulus equations ($|x|$).
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Demonstrates how absolute values model distances, deviations, and symmetry constraints in advanced microeconomics and econometrics.
Lecture 11: Modulus Functions | MA Economics Entrance | CUET PG ECO
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In this session, Arzoo Ma’am will discuss MODULUS FUNCTION for CUET PG Economics preparation.
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If you are preparing for CUET PG Economics 2027, this session will strengthen your conceptual clarity and help in solving PYQs confidently.
Lecture 12: CUET PG ECONOMICS 2027 | Trigonometry | MA Economics Entrance
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In this session, Arzoo Ma’am will discuss Trigonometry for CUET PG Economics preparation.
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If you are preparing for CUET PG Economics 2027, this session will strengthen your conceptual clarity and help in solving PYQs confidently.
Lecture 13: CUET PG ECONOMICS 2027 | Trigonometry Functions | MA Economics Entrance | CUET ECO - Prarambh Series
Lecture 14: CUET PG ECONOMICS 2027 | Trigonometry | MA Economics Entrance | CUET PG ECO ArthaPoint - One Stop Platform For Economics - Prarambh Series
Lecture 15: CUET PG ECONOMICS 2027 | Permutation Combination | MA Economics Entrance - Prarambh Series
Lecture 16: CUET PG ECONOMICS 2027 | Permutation Combination | MA Economics Entrance - Prarambh Series
Lecture 17: CUET PG ECONOMICS 2027 | Quadratic Equation & Complex Numbers | MA Economics - Prarambh Series
Lecture 18: Prarambh LEC 18: CUET PG ECONOMICS 2027 | Complex Numbers | MA Economics - Prarambh Series
Lecture 19: Prarambh LEC 19: CUET PG ECONOMICS 2027 | Coordinate Geometry | MA Economics - Prarambh Series
Lecture 20: Prarambh LEC 20: CUET PG ECONOMICS 2027 | Inequalities | MA Economics - Prarambh Series
Start with Prarambh Series today!
For a beginner, the vast syllabus of CUET PG Economics (covering Microeconomics, Macroeconomics, Statistics, Econometrics, Mathematical Economics, and Indian Economy) can be overwhelming. This series solves that by:
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Providing a Clear Starting Point:** It tells you *exactly* where to begin and what to study first.
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Building Fundamental Concepts:** It ensures you understand the "why" and "how" of core topics, not just the formulas.
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Being Completely Free: Quality education without any financial barrier, reflecting ArthaPoint's commitment to student success.
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Offering a Proven Path:** The content is structured by expert faculty (like Arzoo Ma'am from DSE and Arun Sir, ex-IITian) who have guided hundreds of toppers.