Quick Revision: NCERT based PPTs Maths & Pedagogy Paper 2 for CTET TET Exams - Important

Best NCERT PPTs for CTET Mathematics Pedagogy Preparation - Download Free PDF

Preparing for CTET and State TET Mathematics & Pedagogy Paper 2 requires comprehensive understanding of NCERT concepts from Classes 6 to 8. PowerPoint presentations offer a visual and structured approach to mastering mathematical concepts and pedagogical strategies essential for teaching aspirants. These NCERT-based PPTs cover critical topics like rational numbers, algebraic expressions, mensuration, and data handling, presented in a format that simplifies complex mathematical principles. Unlike traditional textbooks, PPTs break down each concept into digestible slides with diagrams, formulas, and step-by-step explanations. For instance, understanding quadrilaterals becomes easier when properties of parallelograms, rhombuses, and trapeziums are visually compared side-by-side. Similarly, topics like direct and inverse proportions are clarified through practical examples and graphical representations. These resources are particularly valuable for TET candidates who need to not only solve problems but also understand how to teach these concepts effectively to upper primary students. EduRev provides these comprehensive PPTs aligned with the latest NCERT curriculum, enabling systematic revision across all three class levels.

PPTs for Class 8 Mathematics - CTET & TET Preparation

PPT: Rational Numbers

This chapter introduces rational numbers as numbers expressible in p/q form where q ≠ 0. Students often struggle with understanding closure property and distributive laws when applied to rational numbers between integers. The PPT covers representation on number lines, operations including addition, subtraction, multiplication and division, and properties like commutativity and associativity with visual examples that help TET candidates explain these abstract concepts to students effectively.

• PPT: Rational Numbers

PPT: Linear Equations in One Variable

Linear equations form the foundation of algebraic problem-solving, yet many students confuse transposition with changing signs arbitrarily. This PPT systematically explains forming equations from word problems, solving through transposition method, and applications in real-life scenarios like age problems and number puzzles. Special emphasis is given to checking solutions by substitution, a step frequently skipped by learners that leads to undetected errors in competitive exam scenarios.

• PPT: Linear Equations in One Variable

PPT: Understanding Quadrilaterals

Quadrilaterals are classified based on properties of sides and angles, with students commonly mixing up properties of rectangles and parallelograms. The PPT covers angle sum property, types including trapezium, kite, parallelogram, rectangle, square and rhombus, with clear visual differentiation. Special attention is given to understanding how parallelograms are a broader category containing rectangles and rhombuses as special cases, a hierarchical relationship that clarifies classification confusion.

• PPT: Understanding Quadrilaterals

PPT: Data Handling

This chapter builds statistical literacy through organizing and interpreting data using frequency distribution tables, bar graphs, histograms, and pie charts. A common error is confusing histograms with bar graphs-histograms have no gaps and represent continuous data. The PPT demonstrates construction of each graph type, calculation of measures like mean, mode and median, and interpretation skills crucial for data-driven decision making in real-world contexts.

• PPT: Data Handling

PPT: Squares & Square Roots

Understanding perfect squares and methods to find square roots is essential for advanced mathematics. Students frequently struggle with prime factorization method for non-perfect squares and estimation techniques. This PPT covers patterns in square numbers, properties like the square of odd numbers being odd, finding square roots through repeated subtraction, prime factorization, and long division method with detailed step-by-step visual guidance for each technique.

• PPT: Squares & Square Roots

PPT: Comparing Quantities

This chapter extends ratio and percentage concepts to practical applications like profit-loss, discount, simple and compound interest. A typical confusion arises when calculating successive discounts-students often add percentages directly instead of applying them successively. The PPT clarifies such misconceptions with real shopping scenarios, bank interest calculations, and comparison between simple and compound interest with formula derivations and application problems.

• PPT: Comparing Quantities

PPT: Cubes and Cube Roots

This chapter explores three-dimensional number concepts through perfect cubes and cube root extraction. Students often memorize cubes without understanding the volumetric interpretation that aids retention. The PPT presents cubes of numbers 1-10, patterns in unit digits of cubes, prime factorization method for finding cube roots, and properties like the cube of a negative number being negative, with geometric representations enhancing conceptual clarity.

• PPT: Cubes and Cube Roots

PPT: Algebraic Expressions and Identities

Algebraic identities are fundamental tools for simplification, yet students mechanically apply formulas without understanding derivation. This PPT covers monomials, binomials, polynomials, addition and multiplication of expressions, and standard identities like (a+b)², (a-b)², and (a+b)(a-b). Emphasis is placed on geometric verification using area models, which helps students visualize why (a+b)² ≠ a²+b², a persistent algebraic misconception.

• PPT: Algebraic Expressions and Identities

PPT: Mensuration

Mensuration deals with measurement of area and volume of geometric shapes. Students commonly confuse formulas, applying area formulas for perimeter or mixing up surface area with volume. This PPT systematically presents formulas for area of trapezium, general quadrilaterals, and special quadrilaterals, along with surface area and volume of cube, cuboid, and cylinder with derivation explanations and real-life applications like packaging and construction scenarios.

• PPT: Mensuration

PPT: Exponents and Power

Laws of exponents are essential for algebraic manipulation, but students often misapply rules like adding exponents during addition of like bases instead of multiplication. The PPT covers expressing large numbers in exponential form, laws including product rule, quotient rule, power of a power, and use of exponents to express small numbers in standard form, with emphasis on negative and zero exponents through practical examples.

• PPT: Exponents and Power

PPT: Direct and Inverse Proportions

Proportional relationships appear frequently in word problems, yet identifying whether a situation represents direct or inverse proportion challenges many learners. This PPT distinguishes between the two through relatable examples: more workers complete work faster (inverse) while more distance requires more fuel (direct). Clear graphical representations and problem-solving strategies help TET candidates teach proportional reasoning effectively to students.

• PPT: Direct and Inverse Proportions

PPT: Factorisation

Factorisation reverses expansion and is crucial for solving equations, yet students struggle identifying common factors and applying identities correctly. The PPT covers factorisation by taking out common factors, regrouping terms, using identities, and factorising expressions of the form x²+(a+b)x+ab. Particular attention is given to recognizing which method suits which expression type, with practice examples demonstrating strategic selection.

• PPT: Factorisation

PPT: Introduction to Graphs

Graphs provide visual representation of relationships between variables, essential for data interpretation skills. Students often plot points incorrectly by confusing x and y coordinates or fail to choose appropriate scales. This PPT introduces Cartesian plane, plotting points with given coordinates, reading coordinates from graphs, and interpreting distance-time and temperature-time graphs with real-world scenarios that build graphical literacy for mathematical communication.

• PPT: Introduction to Graphs

PPTs for Class 7 Mathematics - CTET & TET Preparation

PPT: Integers

Integers extend the number system to include negative numbers, with students frequently making sign errors during multiplication and division operations. This PPT covers properties of addition and subtraction, multiplication and division of integers, and closure property. Special emphasis is placed on the rule that multiplying two negatives gives a positive-explained through practical contexts like debt cancellation rather than rote memorization, enhancing conceptual retention.

• PPT: Integers

PPT: Fractions and Decimals

Fractions and decimals represent parts of wholes, yet converting between them and performing operations challenges many learners. Students commonly struggle with division of fractions, forgetting to invert and multiply. This PPT covers proper and improper fractions, mixed numbers, multiplication and division of fractions, conversion between fractions and decimals, and operations on decimals with place value emphasis, using visual fraction models for clarity.

• PPT: Fractions and Decimals

PPT: Data Handling

This chapter introduces data collection, organization, and representation through tally marks, frequency tables, bar graphs, and introduction to probability. A common mistake is confusing theoretical probability with experimental results. The PPT demonstrates how to collect and organize data, construct appropriate graphical representations, calculate arithmetic mean, mode, and median, and understand basic probability concepts through coin toss and dice roll experiments.

• PPT: Data Handling

PPT: Simple Equations

Simple equations introduce algebraic problem-solving by forming and solving equations with one variable. Students often set up equations incorrectly from word problems, mistranslating phrases like "5 less than a number" as 5-x instead of x-5. The PPT systematically covers writing equations from statements, solving by trial and error method, systematic method using balance concept, and application to practical problems with translation strategies explicitly taught.

• PPT: Simple-Equations

PPT: Lines and Angles

Understanding angle relationships formed by intersecting lines and transversals is foundational for geometry. Students frequently confuse corresponding angles with alternate angles or fail to identify angle pairs correctly. This PPT covers complementary and supplementary angles, adjacent angles, linear pairs, vertically opposite angles, and angles formed when a transversal intersects parallel lines, with visual identification exercises and property-based problem solving.

• PPT: Lines and Angles

PPT: The Triangles and its Properties

Triangles are classified by sides and angles, with properties including angle sum property and exterior angle property. A typical error is assuming any three line segments can form a triangle without checking the triangle inequality theorem. This PPT covers classification, median, altitude, properties of angles, congruence conditions, and Pythagoras theorem with proofs and applications, emphasizing the inequality condition that sum of two sides must exceed the third.

• PPT: The Triangles and its Properties

PPT: Rational Numbers

This chapter deepens understanding of rational numbers introduced earlier, covering operations and properties comprehensively. Students struggle with finding rational numbers between two given rationals, not realizing infinitely many exist. The PPT explains representation, equivalent forms, standard form, operations with detailed algorithms, properties including closure and distributivity, and the dense property of rationals with mean method for finding numbers between given rationals.

• PPT: Rational Numbers

PPT: Perimeter and Area

Calculating perimeter and area of plane figures requires careful formula selection and unit awareness. Students commonly mix up formulas or forget to square units for area. This PPT covers area and perimeter of squares, rectangles, parallelograms, triangles, and circles, with emphasis on circumference formula πd versus 2πr, area of composite figures by decomposition method, and conversion between different units of measurement with practical applications.

• PPT: Perimeter and Area

PPT: Algebraic Expressions

Algebraic expressions represent generalized arithmetic, yet students struggle with like and unlike terms during simplification. This PPT introduces variables, constants, terms, coefficients, monomials, binomials, trinomials, and polynomials. It covers addition and subtraction of expressions by combining like terms, value substitution, and using expressions to formulate problems. Special attention is given to identifying like terms, where students often incorrectly group x and x² together.

• PPT: Algebraic Expressions

PPT: Exponents and Powers

Exponents provide compact notation for repeated multiplication, with laws enabling simplification of complex expressions. Students frequently misapply laws, such as using (ab)^m = a^m b^m when bases are added instead of multiplied. This PPT covers exponential notation, laws of exponents including product rule, quotient rule, power of a power, expressing large numbers in standard form, and comparing very large and very small quantities scientifically.

• PPT: Exponents and Powers

PPT: Symmetry

Symmetry explores balance and regularity in shapes through line symmetry and rotational symmetry. Students often count lines of symmetry incorrectly or confuse rotational symmetry with reflection symmetry. This PPT covers identifying lines of symmetry in various shapes, symmetry in regular polygons, rotational symmetry and order of rotation, with hands-on activities like paper folding and pattern recognition that develop spatial reasoning essential for geometric understanding.

• PPT: Symmetry

PPT: Visualising Solid Shapes

Three-dimensional visualization skills are developed through understanding faces, edges, vertices, and different views of solid shapes. Students struggle with drawing 2D representations of 3D objects and identifying shapes from their nets. This PPT covers plane and solid figures, faces, edges, and vertices of polyhedra, Euler's formula V+F-E=2, nets of cubes and cuboids, and drawing 3D objects from different perspectives, enhancing spatial intelligence.

• PPT: Visualising Solid Shapes

PPTs for Class 6 Mathematics - CTET & TET Preparation

PPT: Knowing Our Numbers

This foundational chapter builds number sense through large numbers, estimation, and comparing quantities. Students often struggle with place value in large numbers beyond thousands, misreading or writing numbers incorrectly. The PPT covers Indian and International number systems, comparison using place value, forming largest and smallest numbers from given digits, estimation by rounding off, and using brackets in operations, with practical examples like population and distance measurements.

• PPT: Knowing Our Numbers

PPT: Whole Numbers

Whole numbers include natural numbers and zero, with properties governing operations. A common misconception is that subtraction and division are associative like addition and multiplication. This PPT covers the number line representation, properties like closure, commutativity, associativity, patterns in number sequences, and introduction to zero as the additive identity, with emphasis on properties that don't hold for subtraction and division through counterexamples.

• PPT: Whole Numbers

PPT: Playing with Numbers

Number theory concepts like factors, multiples, divisibility, prime and composite numbers form this chapter's core. Students frequently confuse factors with multiples or incorrectly identify 1 as prime. The PPT covers divisibility tests for 2, 3, 4, 5, 6, 8, 9, 10, 11, common factors and multiples, HCF and LCM by prime factorization method, prime factorization, and co-prime numbers, with applications to real-world problems like arranging objects.

• PPT: Playing with Numbers

PPT: Basic Geometrical Ideas

Geometry begins with understanding fundamental concepts like points, lines, line segments, rays, and angles. Students often confuse line segments with lines or rays, not recognizing the difference in endpoints. This PPT introduces point, line, line segment, ray, intersecting and parallel lines, curves, polygons, angles, triangles, quadrilaterals, and circles with their parts like radius, diameter, chord, and arc, establishing geometric vocabulary essential for further study.

• PPT: Basic Geometrical Ideas

PPT: Integers

Integers extend whole numbers to include negative numbers, essential for representing situations like temperature below zero or debts. Students commonly make errors with negative number operations, particularly believing that -5 is greater than -3 because 5 > 3. This PPT covers representation on number line, ordering, addition and subtraction with number line method, and introduction to properties, emphasizing that moving left decreases value regardless of sign.

• PPT: Integers

PPT: Fractions

Fractions represent parts of a whole, with concepts of proper, improper, and mixed fractions. Students struggle with comparing fractions having different denominators or adding fractions without finding common denominators. This PPT covers types of fractions, equivalent fractions, simplest form, comparison by cross-multiplication and LCM method, addition and subtraction with like and unlike denominators, and representing fractions on number lines with visual fraction circles and bars.

• PPT: Fractions

PPT: Decimals

Decimals provide another way to represent fractions, particularly tenths, hundredths, and thousandths. A common error is comparing decimals incorrectly, thinking 0.5 < 0.25 because 5 < 25 without considering place value. This PPT covers place value in decimals, conversion between fractions and decimals, representation on number line, comparison, addition and subtraction, and using decimals in money and measurement contexts with emphasis on aligning decimal points during operations.

• PPT: Decimals

PPT: Data Handling

Data handling introduces collecting, recording, organizing, and presenting data through pictographs and bar graphs. Students sometimes create misleading graphs by not using uniform scales or starting vertical axis at values other than zero. This PPT demonstrates systematic data recording in tables, tally marks, constructing pictographs with appropriate scales, drawing bar graphs with proper labeling, and interpreting data from graphical representations with real survey examples.

• PPT: Data Handling

PPT: Mensuration

Mensuration at this level focuses on perimeter and area of rectangles and squares, building measurement skills. Students often confuse perimeter with area or mix up formulas when dealing with composite shapes. This PPT covers concept of perimeter, perimeter of rectangles and squares, area concept with unit squares, area formulas for rectangles and squares, and solving problems involving composite figures by decomposition, with practical applications like fencing and flooring.

• PPT: Mensuration

PPT: Algebra

Algebra introduces the use of letters to represent numbers, creating generalized statements and formulas. Students initially struggle understanding that 3x means 3×x, not 3 and x separately. This PPT covers the idea of a variable, using variables in common rules and formulas, expressing patterns algebraically, forming equations from statements, and solving simple equations using trial and error method, transitioning from arithmetic to algebraic thinking.

• PPT: Algebra

PPT: Ratio & Proportion

Ratios compare quantities of the same kind while proportions state equality of two ratios. Students commonly make errors in maintaining order when writing ratios or solving proportion problems by incorrect cross-multiplication. This PPT covers concept of ratio, equivalent ratios, simplest form, unitary method for solving problems, concept of proportion, and identifying proportional relationships, with practical applications in recipes, scale drawings, and speed-distance-time problems that demonstrate real-world utility.

• PPT: Ratio & Proportion

Comprehensive CBSE NCERT Mathematics PPTs for CTET and State TET Success

Teaching mathematics effectively at the upper primary level requires both subject mastery and pedagogical expertise. These NCERT-aligned PPTs serve dual purposes for CTET aspirants: reinforcing mathematical concepts from Classes 6-8 and demonstrating effective visual teaching strategies. The progression from basic number systems in Class 6 to complex algebraic identities in Class 8 mirrors the cognitive development of learners, an understanding crucial for TET examinations. For instance, the Class 6 Algebra PPT introduces variables through pattern generalization, while Class 8 extends this to polynomial factorization-showing pedagogical sequencing. Effective TET candidates recognize common misconceptions at each level: Class 6 students confusing area with perimeter, Class 7 learners struggling with negative integers, and Class 8 students misapplying exponent laws. These PPTs address such challenges through visual clarification and step-by-step demonstrations, providing teaching models that exam candidates can replicate in classroom scenarios during practical assessments.

CBSE Mathematics PowerPoint Presentations for Upper Primary Teaching Methodology

CTET Paper 2 evaluates not just mathematical knowledge but the ability to make concepts accessible to students aged 11-14. These PPTs model effective instructional design through logical content sequencing, visual aids, and graded difficulty levels. For example, the Data Handling PPTs across all three classes show progression from simple pictographs to complex histograms and probability, demonstrating spiral curriculum principles tested in pedagogy sections. Similarly, mensuration evolves from perimeter and area of basic shapes to surface area and volume of 3D solids. TET examinations frequently include questions on identifying appropriate teaching aids and sequencing topics-these PPTs exemplify both. The visual representations of abstract concepts like rational numbers on number lines, geometric proofs using area models for algebraic identities, and graphical methods for solving proportions provide ready reference for pedagogical questions. Candidates using these resources develop dual competency: solving mathematical problems accurately and explaining solution strategies clearly, both essential for teaching certification success.