How to prove a set of propositional connectives is NOT adequate?

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To prove a set of propositional connectives is not adequate, one must demonstrate that certain essential connectives cannot be formed from the set. For example, the set {and, or} is inadequate because it lacks the NOT operator, which is necessary for constructing implications. The absence of NOT prevents the generation of all logical relationships, including the implication connective. Resources like the provided links can offer further insights into functional completeness and the requirements for adequate sets. Understanding these concepts is crucial for exam preparation in propositional logic.
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I know how to prove if a set is adequate (all the main conncectives can be made from the set), but how would you prove that it is impossible to make all the connectives using this set?
For instance how would you prove if a set of connectives {and, or} is NOT adequate?

This is a question I thought of for preperation for a exam.

Any answer is appreciated.

Thanks
 
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Note that on the site I posted, K = "NOT 2nd" and M = "NOT 1st."

Also from http://en.wikipedia.org/wiki/Functional_completeness#Informal I surmise that {and, or} is not adequate because the "NOT" operator, which is excluded from the set, is necessary for generating the "--->" (if/then; implies) relationship.
 
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Note: moved this thread from Philosophy. This will likely be a better place to get help with this type of question.
 
I agree; I guess there is a difference between propositional logic and "philosophical" logic, and sometimes it gets ignored.
 

Thread 'Deductive proof in logic formal systems'

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