Ratio, Proportion, Indices, LogarithmMCQMTP March 22Question 835 of 305
All Questions

If 3x25x6\displaystyle \frac{3x-2}{5x-6} is the duplicate ratio of 2/3\displaystyle 2/3 then the value of 'x\displaystyle x' is

Options

A2\displaystyle 2
B6/7\displaystyle -6/7
C5\displaystyle 5
D9\displaystyle 9
For any discrepancies in this question, email contact@cadada.in

Correct Answer

Option c5\displaystyle 5

All Options:

  • A2\displaystyle 2
  • B6/7\displaystyle -6/7
  • C5\displaystyle 5
  • D9\displaystyle 9

Ad

Detailed Solution & Explanation

To determine the value of 'x\displaystyle x', we first need to understand the definition of a duplicate ratio. **Step 1: Understanding Duplicate Ratio** The duplicate ratio of two quantities, say a\displaystyle a and b\displaystyle b, is defined as the ratio of their squares. If the ratio is given

About This Chapter: Ratio, Proportion, Indices, Logarithm

Paper

Paper 3: Quantitative Aptitude

Weightage

5-7 Marks

Key Topics

Ratio, Proportion, Indices, Logarithms

This chapter covers Ratio, Proportion, Indices, Logarithms and is part of Paper 3: Quantitative Aptitude in the CA Foundation exam.

View Official ICAI Syllabus

Exam Strategy Tip

This topic carries 5-7 Marks weightage. Focus on understanding core concepts rather than memorizing.

More Questions from Ratio, Proportion, Indices, Logarithm

Ready to Master Ratio, Proportion, Indices, Logarithm?

Practice all 305 questions with instant feedback, earn XP, track your streaks, and ace your CA Foundation exam.

Start Practicing — It's Free