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.

  1. A.

    53, 81, 109

  2. B.

    54, 71, 109

  3. C.

    53, 71, 98

  4. D.

    54, 81, 108

Attempted by 23 students.

Show answer & explanation

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:

  1. Let A/2 = B/3 = C/4 = k, so A = 2k, B = 3k and C = 4k.

  2. Since the three parts must add up to 243: A + B + C = 243, i.e. 2k + 3k + 4k = 243.

  3. Combine the terms: 9k = 243, so k = 243/9 = 27.

  4. 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.

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