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Matematik Seçkileri
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Paradokslar
=> Zeno's Paradoxes
=> Allais Paradox
=> Arnauld's Paradox
=> Banach-Tarski Paradox
=> Barber Paradox
=> Berry Paradox
=> Bottle Imp Paradox
=> Buchowski Paradox
=> Cantor's Paradox
=> Catalogue Paradox
=> Coin Paradox
=> Complex Number Paradox
=> Crocodile's Dilemma
=> Destructive Dilemma
=> Diagonal Paradox
=> Dilemma
=> Elevator Paradox
=> Epimenides Paradox
=> Eubulides Paradox
=> Grelling's Paradox
=> Hempel's Paradox
=> Liar's Paradox
=> Line Point Picking
=> Missing Dollar Paradox
=> Newcomb's Paradox
=> Parrondo's Paradox
=> Potato Paradox
=> Richard's Paradox
=> Russell's Antinomy
=> Skolem Paradox
=> Smarandache Paradox
=> Socrates' Paradox
=> Sorites Paradox
=> Strange Loop
=> Thompson Lamp Paradox
=> Unexpected Hanging Paradox
=> Fallacy
=> Plaindrome
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Sorites Paradox

Sorites paradoxes are a class of paradoxical arguments also known as little-by-little arguments. The name "sorites" derives from the Greek word soros, meaning "pile" or "heap." Sorites paradoxes are exemplified by the problem that a single grain of wheat does not comprise a heap, nor do two grains of wheat, three grains of wheat, etc. However, at some point, the collection of grains becomes large enough to be called a heap, but there is apparently no definite point where this occurs.
 

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