Murari has 9 pairs of dark-blue socks and 9 pairs of black socks (all loose in one bag). If he picks three socks at random, what is the probability that he gets at least one matching pair?

Aptitude Probability Difficulty: Easy
Choose an option
  • A
    9c3 x 9c1/ 18c3
  • B
    2 x 9c3 x 9c1/ 18c3
  • C
    1
  • D
    4/7

Answer

Correct Answer: 1

Explanation

Introduction / Context:With only two colours available (dark blue and black), any selection of three socks must contain at least two of the same colour by the pigeonhole principle. Therefore, a matching colour pair is guaranteed.

Given Data / Assumptions:

  • Two colours: dark blue and black.
  • Three socks drawn without replacement.
  • Pairs do not matter; colour matches are sufficient for a “pair.”

Concept / Approach:Pigeonhole Principle: placing 3 items into 2 categories ensures at least one category receives ≥2 items.

Step-by-Step Reasoning:Possible colour-count splits for 3 socks with 2 colours are 3–0 or 2–1; both contain a colour appearing at least twice.Hence the event “at least one matching pair by colour” occurs with certainty.

Verification / Alternative check:Trying to avoid a pair would require 3 socks all of different colours—impossible with only two colours available.

Why Other Options Are Wrong:Combinatorial expressions given in other options do not evaluate to 1 and misrepresent the structure of the sample space.

Common Pitfalls:Confusing identical socks within a pair with “colour” matching; here, only colour match is needed to constitute a pair.

Final Answer:1

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