ODD NUMBER in Cognitive Linguistics of WILLIAM CROFT and D. ALAN CRUSE












2















In the subsection 4.3.4.2 The ‘odd number paradox’ of Cognitive Linguistics by W. Croft & D. A. Cruse



We read:




The ‘odd number paradox’ has also been put forward as a problem for
prototype theory. Armstrong et al. (1983) found that people will grade ODD NUMBERS for centrality, even though the category ODD NUMBER has a clear definition in terms of necessary and sufficient features. Their proposed solution, the so-called ‘dual representation’ hypothesis, combines the prototype approach and the classical approach (Smith et al. 1974). The idea is that concepts have two representations, which have different functions. There is a ‘core’ representation, which has basically the form of a classical definition. This representation will govern the logical properties of the concept. The other representation is some sort of prototype system which prioritizes the most typical features, and whose function is to allow rapid categorization of instances encountered. With this set-up, the odd-number effect ceases to be a puzzle. However, this conjunction of two theories inherits most of the problems of both of them: in particular, it reinstates a major problem of the classical theory that prototype theory was intended to solve, namely, the fact that for a great many everyday concepts there is no available core definition.




It is clear for me that they speak about conjecture of the two representations of a concept.
But I is unclear for me what do they mean in this sentence 'people will grade ODD NUMBERS for centrality, even though the category ODD NUMBER has a clear definition in terms of necessary and sufficient features.'










share|improve this question









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    2















    In the subsection 4.3.4.2 The ‘odd number paradox’ of Cognitive Linguistics by W. Croft & D. A. Cruse



    We read:




    The ‘odd number paradox’ has also been put forward as a problem for
    prototype theory. Armstrong et al. (1983) found that people will grade ODD NUMBERS for centrality, even though the category ODD NUMBER has a clear definition in terms of necessary and sufficient features. Their proposed solution, the so-called ‘dual representation’ hypothesis, combines the prototype approach and the classical approach (Smith et al. 1974). The idea is that concepts have two representations, which have different functions. There is a ‘core’ representation, which has basically the form of a classical definition. This representation will govern the logical properties of the concept. The other representation is some sort of prototype system which prioritizes the most typical features, and whose function is to allow rapid categorization of instances encountered. With this set-up, the odd-number effect ceases to be a puzzle. However, this conjunction of two theories inherits most of the problems of both of them: in particular, it reinstates a major problem of the classical theory that prototype theory was intended to solve, namely, the fact that for a great many everyday concepts there is no available core definition.




    It is clear for me that they speak about conjecture of the two representations of a concept.
    But I is unclear for me what do they mean in this sentence 'people will grade ODD NUMBERS for centrality, even though the category ODD NUMBER has a clear definition in terms of necessary and sufficient features.'










    share|improve this question









    New contributor




    Ana Vardosanidze is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
    Check out our Code of Conduct.























      2












      2








      2


      1






      In the subsection 4.3.4.2 The ‘odd number paradox’ of Cognitive Linguistics by W. Croft & D. A. Cruse



      We read:




      The ‘odd number paradox’ has also been put forward as a problem for
      prototype theory. Armstrong et al. (1983) found that people will grade ODD NUMBERS for centrality, even though the category ODD NUMBER has a clear definition in terms of necessary and sufficient features. Their proposed solution, the so-called ‘dual representation’ hypothesis, combines the prototype approach and the classical approach (Smith et al. 1974). The idea is that concepts have two representations, which have different functions. There is a ‘core’ representation, which has basically the form of a classical definition. This representation will govern the logical properties of the concept. The other representation is some sort of prototype system which prioritizes the most typical features, and whose function is to allow rapid categorization of instances encountered. With this set-up, the odd-number effect ceases to be a puzzle. However, this conjunction of two theories inherits most of the problems of both of them: in particular, it reinstates a major problem of the classical theory that prototype theory was intended to solve, namely, the fact that for a great many everyday concepts there is no available core definition.




      It is clear for me that they speak about conjecture of the two representations of a concept.
      But I is unclear for me what do they mean in this sentence 'people will grade ODD NUMBERS for centrality, even though the category ODD NUMBER has a clear definition in terms of necessary and sufficient features.'










      share|improve this question









      New contributor




      Ana Vardosanidze is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
      Check out our Code of Conduct.












      In the subsection 4.3.4.2 The ‘odd number paradox’ of Cognitive Linguistics by W. Croft & D. A. Cruse



      We read:




      The ‘odd number paradox’ has also been put forward as a problem for
      prototype theory. Armstrong et al. (1983) found that people will grade ODD NUMBERS for centrality, even though the category ODD NUMBER has a clear definition in terms of necessary and sufficient features. Their proposed solution, the so-called ‘dual representation’ hypothesis, combines the prototype approach and the classical approach (Smith et al. 1974). The idea is that concepts have two representations, which have different functions. There is a ‘core’ representation, which has basically the form of a classical definition. This representation will govern the logical properties of the concept. The other representation is some sort of prototype system which prioritizes the most typical features, and whose function is to allow rapid categorization of instances encountered. With this set-up, the odd-number effect ceases to be a puzzle. However, this conjunction of two theories inherits most of the problems of both of them: in particular, it reinstates a major problem of the classical theory that prototype theory was intended to solve, namely, the fact that for a great many everyday concepts there is no available core definition.




      It is clear for me that they speak about conjecture of the two representations of a concept.
      But I is unclear for me what do they mean in this sentence 'people will grade ODD NUMBERS for centrality, even though the category ODD NUMBER has a clear definition in terms of necessary and sufficient features.'







      cognitive-linguistics prototype-theory






      share|improve this question









      New contributor




      Ana Vardosanidze is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
      Check out our Code of Conduct.











      share|improve this question









      New contributor




      Ana Vardosanidze is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
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      share|improve this question




      share|improve this question








      edited 3 hours ago









      curiousdannii

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      asked 8 hours ago









      Ana VardosanidzeAna Vardosanidze

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          1 Answer
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          "people will grade ODD NUMBERS for centrality, even though the category ODD NUMBER has a clear definition in terms of necessary and sufficient features" means that you can ask people things like "which is a better example of an odd number, 19 or 1001" and at least some of them will answer with one or the other (I'd guess most people will go with 19) rather than rejecting the question by saying something like "they're both odd numbers, since neither is divisible by two, so they're equally good examples". Presumably whatever sources Croft and Cruse cite would have details on the exact nature of the experiments that have been done.






          share|improve this answer
























          • Thank you for your answer, it was very useful one. I have an additional question: Why do they call it paradox? Does the paradox mean choosing one of the odd numbers, when they are both the same type and one is not batter than another?

            – Ana Vardosanidze
            6 hours ago











          • The paradox is that the definition of odd numbers means that no odd number is more odd-like than another; but people act as if they were. And yet anybody who knows what's an odd number knows the definition. Therefore people seem to act in contradiction to the definition they themselves are using.

            – melboiko
            2 hours ago













          • Probably people would say that 444 was more even than 716; if we're presented with a forced choice, we'll cope. That doesn't say much about basic representations, though.

            – jlawler
            2 hours ago














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          1 Answer
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          1 Answer
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          active

          oldest

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          3














          "people will grade ODD NUMBERS for centrality, even though the category ODD NUMBER has a clear definition in terms of necessary and sufficient features" means that you can ask people things like "which is a better example of an odd number, 19 or 1001" and at least some of them will answer with one or the other (I'd guess most people will go with 19) rather than rejecting the question by saying something like "they're both odd numbers, since neither is divisible by two, so they're equally good examples". Presumably whatever sources Croft and Cruse cite would have details on the exact nature of the experiments that have been done.






          share|improve this answer
























          • Thank you for your answer, it was very useful one. I have an additional question: Why do they call it paradox? Does the paradox mean choosing one of the odd numbers, when they are both the same type and one is not batter than another?

            – Ana Vardosanidze
            6 hours ago











          • The paradox is that the definition of odd numbers means that no odd number is more odd-like than another; but people act as if they were. And yet anybody who knows what's an odd number knows the definition. Therefore people seem to act in contradiction to the definition they themselves are using.

            – melboiko
            2 hours ago













          • Probably people would say that 444 was more even than 716; if we're presented with a forced choice, we'll cope. That doesn't say much about basic representations, though.

            – jlawler
            2 hours ago


















          3














          "people will grade ODD NUMBERS for centrality, even though the category ODD NUMBER has a clear definition in terms of necessary and sufficient features" means that you can ask people things like "which is a better example of an odd number, 19 or 1001" and at least some of them will answer with one or the other (I'd guess most people will go with 19) rather than rejecting the question by saying something like "they're both odd numbers, since neither is divisible by two, so they're equally good examples". Presumably whatever sources Croft and Cruse cite would have details on the exact nature of the experiments that have been done.






          share|improve this answer
























          • Thank you for your answer, it was very useful one. I have an additional question: Why do they call it paradox? Does the paradox mean choosing one of the odd numbers, when they are both the same type and one is not batter than another?

            – Ana Vardosanidze
            6 hours ago











          • The paradox is that the definition of odd numbers means that no odd number is more odd-like than another; but people act as if they were. And yet anybody who knows what's an odd number knows the definition. Therefore people seem to act in contradiction to the definition they themselves are using.

            – melboiko
            2 hours ago













          • Probably people would say that 444 was more even than 716; if we're presented with a forced choice, we'll cope. That doesn't say much about basic representations, though.

            – jlawler
            2 hours ago
















          3












          3








          3







          "people will grade ODD NUMBERS for centrality, even though the category ODD NUMBER has a clear definition in terms of necessary and sufficient features" means that you can ask people things like "which is a better example of an odd number, 19 or 1001" and at least some of them will answer with one or the other (I'd guess most people will go with 19) rather than rejecting the question by saying something like "they're both odd numbers, since neither is divisible by two, so they're equally good examples". Presumably whatever sources Croft and Cruse cite would have details on the exact nature of the experiments that have been done.






          share|improve this answer













          "people will grade ODD NUMBERS for centrality, even though the category ODD NUMBER has a clear definition in terms of necessary and sufficient features" means that you can ask people things like "which is a better example of an odd number, 19 or 1001" and at least some of them will answer with one or the other (I'd guess most people will go with 19) rather than rejecting the question by saying something like "they're both odd numbers, since neither is divisible by two, so they're equally good examples". Presumably whatever sources Croft and Cruse cite would have details on the exact nature of the experiments that have been done.







          share|improve this answer












          share|improve this answer



          share|improve this answer










          answered 7 hours ago









          sumelicsumelic

          10k12156




          10k12156













          • Thank you for your answer, it was very useful one. I have an additional question: Why do they call it paradox? Does the paradox mean choosing one of the odd numbers, when they are both the same type and one is not batter than another?

            – Ana Vardosanidze
            6 hours ago











          • The paradox is that the definition of odd numbers means that no odd number is more odd-like than another; but people act as if they were. And yet anybody who knows what's an odd number knows the definition. Therefore people seem to act in contradiction to the definition they themselves are using.

            – melboiko
            2 hours ago













          • Probably people would say that 444 was more even than 716; if we're presented with a forced choice, we'll cope. That doesn't say much about basic representations, though.

            – jlawler
            2 hours ago





















          • Thank you for your answer, it was very useful one. I have an additional question: Why do they call it paradox? Does the paradox mean choosing one of the odd numbers, when they are both the same type and one is not batter than another?

            – Ana Vardosanidze
            6 hours ago











          • The paradox is that the definition of odd numbers means that no odd number is more odd-like than another; but people act as if they were. And yet anybody who knows what's an odd number knows the definition. Therefore people seem to act in contradiction to the definition they themselves are using.

            – melboiko
            2 hours ago













          • Probably people would say that 444 was more even than 716; if we're presented with a forced choice, we'll cope. That doesn't say much about basic representations, though.

            – jlawler
            2 hours ago



















          Thank you for your answer, it was very useful one. I have an additional question: Why do they call it paradox? Does the paradox mean choosing one of the odd numbers, when they are both the same type and one is not batter than another?

          – Ana Vardosanidze
          6 hours ago





          Thank you for your answer, it was very useful one. I have an additional question: Why do they call it paradox? Does the paradox mean choosing one of the odd numbers, when they are both the same type and one is not batter than another?

          – Ana Vardosanidze
          6 hours ago













          The paradox is that the definition of odd numbers means that no odd number is more odd-like than another; but people act as if they were. And yet anybody who knows what's an odd number knows the definition. Therefore people seem to act in contradiction to the definition they themselves are using.

          – melboiko
          2 hours ago







          The paradox is that the definition of odd numbers means that no odd number is more odd-like than another; but people act as if they were. And yet anybody who knows what's an odd number knows the definition. Therefore people seem to act in contradiction to the definition they themselves are using.

          – melboiko
          2 hours ago















          Probably people would say that 444 was more even than 716; if we're presented with a forced choice, we'll cope. That doesn't say much about basic representations, though.

          – jlawler
          2 hours ago







          Probably people would say that 444 was more even than 716; if we're presented with a forced choice, we'll cope. That doesn't say much about basic representations, though.

          – jlawler
          2 hours ago












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