A vector space must contain at least two vectors.
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This statement is not necessarily true. A vector space is a collection of vectors that satisfy certain properties, such as closure under vector addition and scalar multiplication. It is possible for a vector space to contain just one vector, as long as that vector satisfies these properties. For example, the zero vector is the only vector in the trivial vector space, and it still satisfies the axioms of a vector space. However, in practical situations, vector spaces typically contain more than one vector.
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