Question:

The number of coins collected per week by two coin-collectors A and B are in the ratio 3 : 4. If the total number of coins collected by A in 5 weeks is a multiple of 7, and the total number of coins collected by B in 3 weeks is a multiple of 24, then the minimum possible number of coins collected by A in one week is

Updated On: Sep 4, 2024
  • 20
  • 42
  • 66
  • None of Above
Hide Solution
collegedunia
Verified By Collegedunia

The Correct Option is B

Solution and Explanation

Let, the number of coins collected by \(A\) and \(B\) in one week as \(3x\) and \(4x\) respectively.
The total number of coins collected by \(A\) in \(5\) weeks \(=15x\)
For \(15x\) to be a multiple of \(7\)\(x\) must be a multiple of \(7\).
Similarly, the total number of coins collected by \(B\) in \(3\) weeks \(=12x\)
For \(12x\) to be a multiple of \(24\)\(x\) must be a multiple of \(2\).
Thus, \(x\) must be a multiple of \(7×2 = 14\)
The minimum value for \(x\) \(=14\).
Therefore, the minimum number of coins collected by \(A\) in one week \(=3x = 3 × 14 = 42\).

So, the correct option is (B): \(42\)

Was this answer helpful?
1
2

Top Questions on Ratio and Proportion

View More Questions

Questions Asked in CAT exam

View More Questions