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When truisms clash: Coping with a counterintuitive problem concerning the notorious two-child family
Thinking and Reasoning 17 (4):353 - 366 (2011)
Abstract
You know that a two-child family has a son. What is the probability that the family has two sons? And what is this probability if you know that the family has a son born on a Tuesday? The former question has been widely discussed previously. The latter adds a new puzzling twist to the situation. In both cases the answer should depend on the specifics of the assumed underlying procedure by which the given information has been obtained. Quantitative analysis, assuming one scenario, shows that the information on the son's day of birth changes the target probability. However, the relevance of being born on Tuesday to the question of the children's genders seems bizarre, since the same would be true for any other day. This apparent paradox is further probed in an attempt to alleviate the ensuing psychological difficultyOther Versions
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References found in this work
Some teasers concerning conditional probabilities.Maya Bar-Hillel & Ruma Falk - 1982 - Cognition 11 (2):109-122.
The psychology of the Monty Hall problem: discovering psychological mechanisms for solving a tenacious brain teaser.Stefan Krauss & X. T. Wang - 2003 - Journal of Experimental Psychology: General 132 (1):3.
A closer look at the probabilities of the notorious three prisoners.Ruma Falk - 1992 - Cognition 43 (3):197-223.
Intuitive reasoning about probability: Theoretical and experimental analyses of the “problem of three prisoners”.Shinsuke Shimojo & Shin'Ichi Ichikawa - 1989 - Cognition 32 (1):1-24.
The exchange paradox: Probabilistic and cognitive analysis of a psychological conundrum.Raymond S. Nickerson & Ruma Falk - 2006 - Thinking and Reasoning 12 (2):181 – 213.
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