14 : 9 :: 26 : ? — Identify the numeric rule that maps the first number to the second (state your reasoning) and apply the same rule to find the missing term for 26.

Verbal Reasoning Analogy Difficulty: Medium
Choose an option
Answer

Correct Answer: 25

Explanation

Introduction / Context:In number analogies, the first pair reveals the hidden rule, which must then be applied to the second pair. Here, 14 maps to 9. We must discover a consistent transformation and use it to compute the image of 26.

Given Data / Assumptions:

  • The mapping is deterministic and single-valued: one input gives one output.
  • 14 is mapped to 9 in the first pair.
  • We seek the corresponding output for 26 using the same rule.
  • Standard transformations considered in such questions include squares, cubes, digit operations, and proximity to perfect powers.

Concept / Approach:The value 9 is the largest perfect square less than 14. This suggests the rule 'map any number to the nearest lower perfect square' (also described as 'greatest perfect square <= n', but excluding equality here since 14 is not itself a square). We test the idea on the second number, 26.

Step-by-Step Solution:1) List perfect squares around 14: 9 (3^2), 16 (4^2). The lower square is 9 → matches the given mapping.2) List perfect squares around 26: 25 (5^2), 36 (6^2). The lower square is 25.3) Therefore, by the same rule, 26 maps to 25.

Verification / Alternative check:Check for competing rules (digit sums, products, factorials). None of those standard manipulations land exactly on 9 from 14 as directly as the 'nearest lower perfect square' rule does. Applying it to 26 consistently gives 25.

Why Other Options Are Wrong:

  • 16/27/28/21: These are not the greatest perfect squares below 26; only 25 fits the rule.

Common Pitfalls:Choosing the 'nearest' square (which could be 25 or 36) instead of the 'nearest lower' square. The first pair (14 → 9) clarifies it must be 'lower'.

Final Answer:25

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