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In grammar, a conjunction (abbreviated CONJ or CNJ) is a part of speech that connects words, phrases, or clauses, which are called its conjuncts.That description is vague enough to overlap with those of other parts of speech because what constitutes a "conjunction" must be defined for each language.
Car is also a coordinating conjunction meaning "because". [3] Or is sometimes considered a coordinating conjunction, but can also be treated as an adverb . [ 4 ] The grammatical reference work Le Bon Usage classes these six as conjunctions, but donc as an adverb—it also notes that other constructions such as puis , aussi and seulement have ...
logical conjunction: ... ∵\because because: because: ... One of this symbol’s uses is to mean “truthmakes” in the truthmaker theory of truth.
A complex sentence contains an independent clause and at least one dependent clause. A sentence with two or more independent clauses plus (one or more) dependent clauses is referred to as a compound-complex sentence. (Every clause contains a subject and predicate.) Here are some English examples: My sister cried because she scraped her knee ...
In logic, mathematics and linguistics, and is the truth-functional operator of conjunction or logical conjunction. The logical connective of this operator is typically represented as ∧ {\displaystyle \wedge } [ 1 ] or & {\displaystyle \&} or K {\displaystyle K} (prefix) or × {\displaystyle \times } or ⋅ {\displaystyle \cdot } [ 2 ] in ...
A conjunct is one of the terms that are conjoined in a conjoining construction. Conjuncts are conjoined by means of a conjunction, which can be coordinating, subordinating or correlative. Conjuncts can be words, phrases, clauses, or full sentences. [Gretchen and her daughter] bought [motor oil, spark plugs, and dynamite].
On the one hand, we enjoy looking at beautiful things. On the other hand, an attractive appearance can only get us so far. An item that is unusable but looks pretty serves no purpose.
Both conjunction and disjunction are associative, commutative and idempotent in classical logic, most varieties of many-valued logic and intuitionistic logic. The same is true about distributivity of conjunction over disjunction and disjunction over conjunction, as well as for the absorption law.