LIVE Interactive Full Syllabus Course for Class 6 (2025-26)

This chapter provides an overview of Roman numerals, including their symbols and rules for combining them. It discusses the historical significance and practical usage of Roman numerals

This chapter introduces the basic concepts of natural numbers and whole numbers. It explains the differences between these two types of numbers, their definitions, and their uses in everyday counting and mathematics.

This section discusses the concepts of successor and predecessor within the set of whole numbers. It explains how to find the next number (successor) and the previous number (predecessor) of a given whole number, along with examples.

The chapter covers the number line as a visual representation of numbers. It demonstrates how numbers are arranged on the line, helping to understand their order, magnitude, and the concept of distance between numbers.

This part explores various properties of whole numbers, such as closure, commutative, associative, and distributive properties. These properties form the foundation for understanding how numbers interact in different operations.

This section focuses on developing mathematical skills and problem-solving abilities. It includes practice questions, tips, and strategies to improve aptitude in mathematics for various competitive exams and everyday applications.

This chapter introduces the concept of factors, which are numbers that divide another number exactly without leaving a remainder. It explains how to find factors of different numbers and discusses their importance in number theory.

This section covers multiples, which are numbers obtained by multiplying a given number by integers. It explores how to identify multiples and their significance in various mathematical problems.

This chapter describes the various types of numbers within the number system, including natural numbers, whole numbers, integers, rational numbers, irrational numbers, and real numbers, highlighting their characteristics and differences.

This section explains different rules and tests to determine whether a number is divisible by another, such as divisibility by 2, 3, 5, 9, and 10, aiding in quick mental calculations and problem-solving.

This chapter discusses the process of expressing a number as a product of its prime factors, which is fundamental in simplifying fractions, finding HCF and LCM, and understanding number properties.

This section introduces the concept of the HCF, which is the largest number that divides two or more numbers exactly. It explains methods to find the HCF and its applications.

This chapter provides various practice problems involving the calculation of HCF, helping students understand its application in different contexts and problem-solving scenarios.

This section explains the concept of LCM, which is the smallest number divisible by two or more numbers. It discusses methods to find LCM and its importance in solving problems involving multiple numbers.

This chapter offers practice exercises focused on calculating LCM, enabling students to apply their understanding in real-world and mathematical problems.

This final chapter reviews the key properties and relationships between HCF and LCM, including their connection through prime factorization and their use in simplifying calculations.