Ratio, Proportion, Indices, LogarithmMCQMTP June 2023 Series IIQuestion 846 of 305
All Questions

If (x9):(3x+6)\displaystyle (x-9):(3x+6) is the duplicate ratio of 4:9\displaystyle 4:9, find the value of x\displaystyle x.

Options

Ax=9\displaystyle x=9
Bx=16\displaystyle x=16
Cx=36\displaystyle x=36
Dx=25\displaystyle x=25
For any discrepancies in this question, email contact@cadada.in

Correct Answer

Option dx=25\displaystyle x=25

All Options:

  • Ax=9\displaystyle x=9
  • Bx=16\displaystyle x=16
  • Cx=36\displaystyle x=36
  • Dx=25\displaystyle x=25

Ad

Detailed Solution & Explanation

The problem states that the ratio (x9):(3x+6)\displaystyle (x-9):(3x+6) is the duplicate ratio of 4:9\displaystyle 4:9. First, let us understand the definition of a duplicate ratio. The duplicate ratio of a:b\displaystyle a:b is defined as a2:b2\displaystyle a^2:b^2.
Applying this definition to 4:9\displaystyle 4:9, the duplicate ratio of 4:9\displaystyle 4:9 is 42:92\displaystyle 4^2:9^2. 42:92=16:814^2:9^2 = 16:81
According to the problem statement, (x9):(3x+6)\displaystyle (x-9):(3x+6) is equal to this duplicate ratio. Therefore, we can set up the following equality: (x9):(3x+6)=16:81(x-9):(3x+6) = 16:81
To solve for x\displaystyle x, we convert this ratio equality into a fractional equation. A ratio a:b\displaystyle a:b can be expressed as the fraction ab\displaystyle \frac{a}{b}. x93x+6=1681\frac{x-9}{3x+6} = \frac{16}{81}
Now, we can solve this equation by cross-multiplication. Multiply the numerator of the left side by the denominator of the right side, and vice versa. 81(x9)=16(3x+6)81(x-9) = 16(3x+6)
Next, distribute the numbers on both sides of the equation: 81x81×9=16×3x+16×681x - 81 \times 9 = 16 \times 3x + 16 \times 6 81x729=48x+9681x - 729 = 48x + 96
Now, we need to gather all terms involving x\displaystyle x on one side of the equation and all constant terms on the other side. Subtract 48x\displaystyle 48x from both sides: 81x48x729=9681x - 48x - 729 = 96 33x729=9633x - 729 = 96
Add 729\displaystyle 729 to both sides of the equation: 33x=96+72933x = 96 + 729 33x=82533x = 825
Finally, to find the value of x\displaystyle x, divide both sides by 33\displaystyle 33: x=82533x = \frac{825}{33}
To simplify the fraction, we can perform the division. Both 825\displaystyle 825 and 33\displaystyle 33 are divisible by 3\displaystyle 3: x=825÷333÷3=27511x = \frac{825 \div 3}{33 \div 3} = \frac{275}{11}
Now, divide 275\displaystyle 275 by 11\displaystyle 11: 275÷11=25275 \div 11 = 25 So, x=25x = 25

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

3x2:5x+6\displaystyle 3x-2:5x+6 the duplicate ratio of 2:3\displaystyle 2:3 then find the value x\displaystyle x.

If the ratio of two numbers is 7:11\displaystyle 7:11. If 7\displaystyle 7 is added to each number then the new ratio will be 2:3\displaystyle 2:3 then the numbers are.

If x:y=z:7=4:11\displaystyle x:y=z:7=4:11 then x+y+zz\displaystyle \frac{x+y+z}{z} is

The ratio of two numbers are 3:4\displaystyle 3:4. The difference of their squares is 28\displaystyle 28 greater is:

The price of scooter and moped are in the ratio 7:9\displaystyle 7:9. The price of moped is 1,600\displaystyle ₹1,600 more than that of scooter. Then the price of moped is:

If A:B=3:7\displaystyle A:B=3:7, then 3a+2b:4a+5b=?\displaystyle 3a+2b:4a+5b=?

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