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Areas related to circles allow students to calculate the exact space enclosed by circular shapes and their segments. Using radius, diameter, chord length, and arc measures, these formulas help determine the area of a full circle, sectors, segments, and rings. They also connect to real-world applications in geometry, construction, design, and physics, where precise measurements of circular regions are required. Understanding these formulas helps solve problems involving tangents, arcs, and combined figures efficiently. In this blog, you will get to know the key formulas for areas related to circles in Class 10 Maths and learn how to apply each one effectively. Areas Related to Circles – Class 10 Maths Formulas Understanding areas related to circles helps calculate spaces, lengths, and segments in circular shapes accurately. These formulas are essential in CBSE Class 10 Maths for solving questions on full circles, sectors, segments, rings, and combinations of circular regions. They are widely applied in construction, design, sports fields, and real-life measurement problems where precision is required. Core Formulas for Areas and Circumference of a Circle Students can use the following key formulas related to circles in Class 10 for quick reference and practice: Circumference of a circle = 2πr Area enclosed by a circle = πr² Length of an arc of a sector with radius r and central angle θ = (θ / 360) × 2πr Area of a sector with radius r and angle θ = (θ / 360) × πr² Area of a segment of a circle = Area of the sector − Area of the triangle Practical Applications of Circle Area Formulas Tips to Master Areas Related to Circle Formulas Area Related to Circle Class 10 – Solved Examples Example 1 A circular park has a boundary length of 220 m. The grass inside the park costs ₹5 per m² to maintain. Find the total maintenance cost of the park. Solution: Circumference of the park = 220 m Let the radius be r m 2πr = 220 r = 220 ÷ (2 × 3.14) r = 35 m Area of the park = πr²= 3.14 × 35²= 3846.5 m² Cost per m² = ₹5 Total maintenance cost = 3846.5 × 5= ₹19,232.50 Example 2 Two circular fields have radii 14 m and 21 m. Find the radius of a circle whose circumference is equal to the difference of the circumferences of the two fields. Solution: Circumference of first field= 2 × 3.14 × 14= 87.92 m Circumference of second field= 2 × 3.14 × 21= 131.88 m Difference of circumferences= 131.88 − 87.92= 43.96 m Let the required radius be R 2πR = 43.96 R = 43.96 ÷ (2 × 3.14) R = 7 m

A circle represents all points in a plane that lie at a fixed distance from a single point called the centre. This concept connects radius, diameter, chord, arc, and tangent through measurable relationships. In Class 10 Maths, circles help students analyze symmetry, angles, and length relationships using exact values rather than estimation. Circle-based problems also build logical reasoning skills used in coordinate geometry, trigonometry, and mensuration. Many real-world objects, such as wheels, gears, pipes, and orbits, follow circular geometry, which makes this topic both practical and foundational. In this blog, you will learn the important circle formulas for CBSE Class 10 Maths and understand how each formula helps solve exam-based problems. List of Important Formulas for Circles Class 10 Maths Circle formulas help students calculate length, area, and portions of a circle using the radius and central angle. Each formula solves a specific type of problem commonly asked in CBSE Class 10 board exams. Basic Circle Measurements Formulas Related to Sectors and Arcs Formula for a Segment of a Circle Applications of Circle Formulas in Class 10 Maths Circle formulas help solve practical and academic problems that involve curved shapes and circular motion. These formulas connect radius, circumference, area, and angles in a measurable way. Tips to Learn and Remember Circle Formulas for Class 10 Learning circle formulas becomes easier when students focus on understanding instead of memorising. Solved Examples Using Circle Formulas Example 1 Find the area of one-fourth of a circle when its perimeter measures 42 cm. Quadrant area = (π × radius²) ÷ 4Final answer = 35.02 cm² Example 2 A circle has a radius of 5 cm. An arc subtends 50 degrees at the centre. Find the arc length. Arc length = (50 ÷ 360) × 2 × 3.14 × 5Final answer = 4.36 cm

Quadratic equations for Class 10 form a fundamental part of the CBSE Mathematics curriculum and assess a student’s understanding of algebraic concepts. A quadratic equation involves a second-degree polynomial and helps students find unknown values, identify the nature of solutions, and solve exam-oriented problems accurately.  A clear understanding of how formulas work and how to apply them in different situations allows students to solve quadratic equations correctly and avoid common errors. In this blog, you will get to know the key quadratic equations formulas, how to use them to find roots, and how these formulas apply across different types of Class 10 problems. Important Quadratic Equations Formulas Class 10 Standard Form of a Quadratic Equation A quadratic equation represents a second-degree polynomial written as: ax² + bx + c = 0, where a ≠ 0 Here, a, b, and c are real numbers. The value of a controls the degree of the equation and confirms it as quadratic. Roots of a Quadratic Equation A real number α becomes a root of the equation ax² + bx + c = 0 when it satisfies the condition: aα² + bα + c = 0 If this equality holds true, then x = α solves the quadratic equation. Methods Used to Solve Quadratic Equations Factorisation Method This method works when the quadratic expression splits into two linear factors. After factorisation, equate each factor to zero to find the roots. Best used when coefficients remain small and factor pairs exist clearly. Completing the Square Method This approach converts a quadratic expression into a perfect square by rearranging terms. Key identities used: Quadratic Formula When the discriminant value stays zero or positive, the roots follow this formula: x = (−b ± √(b² − 4ac)) / 2a Discriminant of a Quadratic Equation The discriminant determines the type of roots and is defined as: D = b² − 4ac It provides immediate insight into the nature before solving the equation fully. Nature of Roots Based on Discriminant For the equation ax² + bx + c = 0: Quadratic Equation from Given Roots If the sum and product of roots are known, form the equation as: x² − (sum of roots)x + (product of roots) = 0 Sum and Product of Roots For the equation ax² + bx + c = 0: Applications of Quadratic Equations Class 10 Quadratic equations model situations where values follow a curved or changing pattern. Tips to Learn Quadratic Equations Class 10 Example Example 1: Find the discriminant of the quadratic equationx² − 4x + 5 = 0 and state the nature of its roots. Solution: The given equation follows the form ax² + bx + c = 0, wherea = 1, b = −4, and c = 5. The discriminant isD = b² − 4acD = (−4)² − 4(1)(5)D = 16 − 20D = −4 < 0 Since the discriminant is less than 0, the quadratic equation has no real roots.

Many maths problems do not work with one condition alone. They require two conditions to arrive at a correct answer. This idea forms the base of a pair of linear equations. When two equations represent the same situation, their common solution gives the result. When they fail to meet, no valid answer exists. When they overlap, more than one solution appears. Students apply this concept in questions that compare money, speed, distance, and quantity. The chapter helps you understand how equations behave, how graphs show solutions, and how algebraic methods give exact values. Board questions focus on method selection, formula application, and consistency conditions. In this blog, you will learn CBSE Class 10 Maths Chapter 3, Pair of Linear Equations in Two Variables. Along with important formulas, you will read all the required definitions and conditions. Key Definitions and Concepts: Pair of Linear Equations in Two Variables 1. Linear Equation in Two Variables A linear equation in two variables can be written in the formax + by + c = 0,where a, b, and c are real numbers and a and b cannot both be zero.The variables x and y represent unknown values. 2. Solution of a Pair of Linear Equations A solution refers to the values of x and y that satisfy both equations at the same time. Only the common values that make each equation true form the solution of the system. 3. Consistent System of Linear Equations A system of linear equations is called consistent when it has at least one solution. The equations may have one solution or infinitely many solutions. 4. Inconsistent System of Linear Equations A system is inconsistent when no pair of values satisfies both equations. In this case, the equations never meet. 5. Graphical Method for Solving a Pair of Linear Equations Consider the pair:a₁x + b₁y + c₁ = 0 a₂x + b₂y + c₂ = 0 Each equation represents a straight line on the Cartesian plane. The nature of their intersection decides the solution. Conditions and Their Graphical Meaning Coefficient Condition Line Position Nature of Solution a₁/a₂ ≠ b₁/b₂ Lines intersect One unique solution a₁/a₂ = b₁/b₂ = c₁/c₂ Lines overlap Infinitely many solutions a₁/a₂ = b₁/b₂ ≠ c₁/c₂ Lines remain parallel No solution Graph-Based Interpretation 6. Algebraic Methods to Solve a Pair of Linear Equations Students solve equations algebraically using these standard methods: Applications of Pair of Linear Equations in Two Variables Students use a pair of linear equations to solve problems where two conditions control two unknown values. Common Applications Tips to Memorize Chapter 3 Formulas and Concepts Tip 1: Remember the Standard Form Always rewrite equations as:ax + by + c = 0This form helps in checking consistency and applying cross multiplication. Tip 2: Use Ratio Logic for Graph Questions Link ratios with line behavior: Tip 3: Method Selection Shortcut Tip 4: Visual Memory Trick Think of three-line cases only: Every graph question fits one case. Example Based on a Pair of Linear Equations Question: The sum of two numbers is 10. Their difference is 2. Find the numbers. Step 1: Form equationsx + y = 10x − y = 2 Step 2: Solve using eliminationAdd both equations: 2x = 12, x = 6 Step 3: Find yy = 10 − 6y = 4 Answer: The two numbers are 6 and 4.

Polynomials form one of the most essential topics in CBSE Class 10 mathematics. They provide the foundation for understanding equations, algebraic expressions, and the relationship between zeroes and coefficients. A clear grasp of polynomial formulas not only helps in solving academic problems efficiently but also builds a strong base for higher mathematics. In this guide, we cover all major formulas for linear, quadratic, and cubic polynomials, their practical applications, tips to memorize them effectively, and step-by-step examples to help students prepare confidently for their CBSE exams. Understanding Polynomials and Their Types Polynomials are algebraic expressions that involve variables raised to whole-number powers. Depending on their degree: Key Concept: The degree of a polynomial determines the maximum number of roots it can have. Linear polynomials have 1 root, quadratic polynomials have 2, and cubic polynomials have 3. Essential Polynomial Formulas – Class 10 Quadratic Polynomial For a quadratic polynomial ax2+bx+c=0ax^2 + bx + c = 0ax2+bx+c=0, with roots α\alphaα and β\betaβ: Cubic Polynomials For a cubic polynomial ax3+bx2+cx+d=0ax^3 + bx^2 + cx + d = 0ax3+bx2+cx+d=0, with roots α,β,γ\alpha, \beta, \gammaα,β,γ: Additional Formulas Applications of Polynomial Formulas Polynomial formulas are not limited to classroom problems. They are widely applied in various fields: Tips to Memorize Polynomials Formulas Examples of Polynomial Formulas in Action Example 1: Construct a Quadratic Polynomial Problem: Form a quadratic equation whose roots are 4 and -3. Solution: Answer: x2−x−12=0x^2 – x – 12 = 0x2−x−12=0 Example 2: Construct a Cubic Polynomial Problem: Find a cubic polynomial with roots 1, 2, -3. Solution: Answer: x3−7x+6=0x^3 – 7x + 6 = 0x3−7x+6=0 Example 3: Find Roots Using Sum & Product Problem: A quadratic polynomial has sum of roots = 5, product of roots = 6. Form the polynomial. Solution: x2−(sum of roots)x+(product of roots)=x2−5x+6x^2 – (\text{sum of roots})x + (\text{product of roots}) = x^2 – 5x + 6×2−(sum of roots)x+(product of roots)=x2−5x+6 Answer: x2−5x+6=0x^2 – 5x + 6 = 0x2−5x+6=0

Real numbers form the foundation of Class 10 mathematics. From solving equations to calculating measurements, understanding these numbers is essential for both exams and practical applications. Real numbers include rational numbers, which can be expressed as fractions, and irrational numbers, which cannot. Mastering their formulas simplifies problem-solving, reduces errors, and builds confidence in algebra, HCF-LCM calculations, and more. This guide covers all important real number formulas, explains their applications with clear examples, and shares proven tips to memorize them quickly. CBSE Class 10 Maths Real Numbers Formulas 1. Euclid’s Division Lemma For any two positive integers aaa and bbb, there exist unique integers qqq (quotient) and rrr (remainder) such that: a=bq+r,0≤r<ba = bq + r, \quad 0 \le r < ba=bq+r,0≤r<b 2. HCF and LCM Formulas Example:For 12 and 18: 3. Fundamental Theorem of Arithmetic 4. Rational and Irrational Numbers 5. Irrationality Proofs Example: Prove that 2\sqrt{2}2​ is irrational. 6. Special Theorems Useful in proofs of irrationality and HCF calculations. 7. Number Type Reference Type Description Example Natural Numbers Counting numbers starting from 1 1, 2, 3, … Whole Numbers Natural numbers including 0 0, 1, 2, … Integers Positive & negative numbers including 0 -3, -2, -1, 0, 1, … Positive Integers All numbers > 0 1, 2, 3, … Negative Integers All numbers < 0 -1, -2, -3, … Rational Numbers Can be written as fraction p/q 4/5, -3/7 Irrational Numbers Cannot be written as fraction √2, π Real Numbers All numbers on number line Includes above types Applications of Real Numbers Formulas – Class 10 Tips to Master Real Numbers Formulas Real Numbers Formulas for Class 10 – Examples Example 1: Prove that √3 is an irrational number Solution: Conclusion: √3 cannot be expressed as a fraction; hence, it is irrational. Example 2: Organizing items into equal groups Problem: A shop has 540 red pencils and 360 blue pencils. How many pencils can be placed in each equal stack? Solution: Answer: Each stack will contain 180 pencils.

Memorizing Class 10 Maths formulas becomes a challenge when students try to understand every chapter without seeing how these formulas actually support real problem-solving. Each formula strengthens core CBSE concepts and trains the brain to work with numbers, shapes, angles, and data in a precise way. When students build this foundation early, they handle board exam questions with more confidence and solve multi-step problems much faster. The value of these formulas also stretches far beyond schoolwork. Trigonometry helps in measurement and design, statistics supports data-driven fields, probability guides risk analysis, and algebra forms the base of countless technical applications. From engineering and architecture to finance, coding, and medical research, the ideas students learn in Class 10 appear in many modern careers. To help students prepare smarter and revise with clarity, every important Class 10 Maths formula is organized chapter-wise with simple explanations and quick examples in this blog. Important Class 10 Math Formulas  Class 10 Maths Formulas Chapter-Wise Class 10 Algebra Formulas Algebra helps students convert real-life situations into mathematical expressions. Understanding these identities makes it easier to simplify expressions, solve equations, and identify patterns quickly. Important Algebra Formulas Class 10 Arithmetic Progression Formulas Arithmetic Progression (AP) introduces the idea of number patterns where the difference between terms stays constant. These formulas help compute missing terms and total sums quickly. Important AP Formulas Class 10 Trigonometry Formulas Trigonometry studies the relationships between angles and sides of right-angled triangles. These formulas help calculate heights, distances, and angle-based measurements. Important Trigonometry Formulas Class 10 Circle Formulas Circle concepts revolve around radius, diameter, tangents, and chords. These formulas help solve geometric and coordinate-based problems. Important Circle Formulas Class 10 Surface Area and Volume Formulas These formulas are used to calculate space and surface measurements for 3D shapes like cylinders, spheres, cones, and prisms. Sphere Cylinder Hemisphere Prism Class 10 Statistics Formulas Statistics focuses on mean, median, and mode for grouped data. These formulas help analyze patterns and numerical trends. Mean Median Median = l + [(n/2 – cf) / f] × h Mode Mode = l + [(f₁ – f₀) / (2f₁ – f₀ – f₂)] × h Class 10 Probability Formulas Probability measures how likely an event is to happen. These formulas are essential for predicting outcomes in experiments and real-life situations. Important Probability Formulas Applications of Class 10 Maths Formulas Class 10 Maths formulas are practical and widely applicable, helping students solve real-life problems efficiently. Mastering them makes calculations quicker, improves accuracy, and helps spot patterns in numbers and shapes. Here’s how these formulas are used in everyday situations: Algebra & Quadratic Formulas: Quadratic equations are used to model situations involving motion, optimization, and design. For instance, they can calculate the maximum height of a projectile, estimate profits in business scenarios, or determine dimensions when planning rectangular spaces. Trigonometry Formulas: Trigonometric formulas are essential in fields like engineering, architecture, and navigation. They help calculate heights, distances, slopes, and angles—important when designing ramps, rooftops, bridges, or positioning satellites. Statistics & Probability Formulas: These formulas help interpret data and assess risks. They are applied in weather forecasting, quality control, insurance analysis, elections, and market research, enabling informed decisions. Surface Area & Volume Formulas: Geometry formulas are practical in construction, packaging, and manufacturing. Knowing the volume of a cylinder helps fill tanks, while surface area calculations assist in painting walls or designing containers. Arithmetic & Sequence Formulas: Arithmetic progression formulas are useful in financial planning, budgeting, and scheduling tasks that involve regular increases or decreases. Tips to Memorize Class 10 Maths Formulas Memorizing formulas is easier when understanding is combined with consistent practice. Here are some effective strategies: