Masked man fallacy

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The masked man fallacy is a fallacy of formal logic in which substitution of identical designators in a true statement can lead to a false one. The name comes from the example "I do not know who the masked man is", which can be true even though the masked man is Jones, and I know who Jones is.

One form of the fallacy may be summarized as follows:

• Fact 1: I know who X is.
• Fact 2: I do not know who Y is.
• Conclusion: Therefore, X is not Y.

The problem arises from the fact that Fact 1 and Fact 2 can be simultaneously true even when X and Y refer to the same person. Consider the argument I know who my father is. I do not know who the thief is. Therefore, my father is not the thief. The premises may be true and the conclusion false if the father is the thief and the speaker does not know this particular thing about his father. Thus the argument is a fallacy.

If someone were to say, "I do not know the masked man," it implies, "If I do know the masked man, I do not know that he is the masked man." The Masked Man fallacy omits the implication.

[edit] See also

• Opaque context
• Transitivity of identity

v • d • e Formal fallacies Argument from fallacy • Fallacy of modal logic • Masked man fallacy • Appeal to probability • Bare assertion fallacy Fallacy of propositional logic: Affirming a disjunct • Affirming the consequent • False dilemma • Denying the antecedent Fallacy of quantificational logic: Existential fallacy • Illicit Conversion • Proof by example • Quantifier shift Syllogistic fallacy: Affirmative conclusion from a negative premise • Exclusive premises • Necessity • Four-term Fallacy • Illicit major • Illicit minor • Undistributed middle Other types of fallacy

[edit] References

• fallacyfiles.org