Divide 243 into three parts, so that half of the I part, 1/3rd of the II part…
2025
Divide 243 into three parts, so that half of the I part, 1/3rd of the II part and 1/4th of the III part shall be equal.
- A.
53, 81, 109
- B.
54, 71, 109
- C.
53, 71, 98
- D.
54, 81, 108
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Correct answer: D
Concept: A chain of equal ratios like A/2 = B/3 = C/4 means every fraction equals the same constant k, so each part can be written as a multiple of k (here A = 2k, B = 3k, C = 4k). Once the parts are expressed this way, any other condition -- such as a fixed total -- turns into a single equation in k.
Applying this to the given parts A, B and C:
Let A/2 = B/3 = C/4 = k, so A = 2k, B = 3k and C = 4k.
Since the three parts must add up to 243: A + B + C = 243, i.e. 2k + 3k + 4k = 243.
Combine the terms: 9k = 243, so k = 243/9 = 27.
Substitute k = 27 back: A = 2(27) = 54, B = 3(27) = 81, C = 4(27) = 108.
Cross-check: 54 + 81 + 108 = 243, and half of 54, one-third of 81 and one-fourth of 108 are each 27, so both conditions given in the question hold.