Master ratio-based questions with this simple trick. Learn how to calculate the consequent when the antecedent and ratio are known. Perfect for CUET, SSC, CA, SAT, and other competitive exams.

Confused by inverse ratio questions? Learn how to solve problems where you're given the consequent of the inverse ratio and need to find the antecedent. Ideal for CUET, SSC, CA, SAT, GMAT, and other exams.

Understand how to compare earnings when time worked differs. A must-know skill for CUET, SSC, Banking, SAT, and GRE aspirants.

Use ratio substitution to solve compound expressions like (2a + 3b) : (3a + 4b). Ideal for CUET, SSC, GMAT, and SAT aspirants.

Mastering duplicate ratios is key to solving advanced ratio problems in quantitative aptitude. This question involving 2𝑠 : 3𝑡 and 2𝑠 − 𝑝 : 3𝑡 − 𝑝 appears frequently in major competitive exams and helps assess your ability to work with algebraic ratios and their transformations.

Learn how to solve this classic quantitative aptitude question involving daily earnings and expenses ratio with a focus on savings. A great problem for mastering ratio applications in competitive exams.

Learn how to simplify expressions like 𝒙²𝒚 + 𝒙𝒚² to 𝒙³ + 𝒚³ using the ratio 𝒙 : 𝒚 = 𝟑 : 𝟒. Essential concept for many aptitude exams.

Master ratio transformation problems like this classic: when subtracting the same number changes the ratio. Common in CUET, SSC, SAT, and banking exams.

Learn how to solve compound ratio problems with multiple ratios like 2:3, 9:4, 5:6, and 8:10. Ideal for CUET, CA Foundation, SSC, GMAT, and SAT aspirants.

Explore how to solve ratio-based number difference problems. Essential for CUET, SSC, Banking, and SAT aspirants.

Explore this compound ratio problem involving variables and known ratios. A frequent type in aptitude exams, this question strengthens your understanding of ratio substitution and algebraic manipulation.

Smart ratio comparison trick: Use two given ratios with a common city to find the third. Perfect for all quantitative exams!

Solve this classic speed ratio problem in quantitative aptitude. Learn how to apply speed-time concepts when the speed ratio and distance covered by one object are known.

Learn to solve problems on duplicate ratios using 3:4. Useful for CUET, CA Foundation, SSC, CMAT, GMAT, SAT, and other quantitative exams.

Master ratio transformation techniques with this classic aptitude problem: What number must be subtracted from both 19 and 31 to make the ratio 1 : 4? Essential for exams like CA Foundation, CUET, SAT Math & more.

Understanding logarithms is vital for mastering algebraic manipulation, exponential equations, and advanced problem-solving. These MCQs cover every major concept in logarithmic expressions and simplifications—making them ideal practice for a range of competitive exams in India and abroad.

Understanding the laws of indices is crucial for success in a wide range of entrance and competitive exams. In this video, we solve 30 multiple-choice questions (MCQs) covering fundamental to advanced applications of exponents and powers. These questions are ideal for practice and concept reinforcement.

Ratios are foundational in arithmetic and algebra, forming the basis for comparisons, proportional reasoning, and advanced problem-solving. These questions are commonly tested in almost every competitive and entrance exam — both in India and internationally. Practicing them not only strengthens your basics but also improves your speed and accuracy under pressure.