Fields are Vector Spaces
# Statement
Let $(F, +, *, 0, 1)$ be a Field. Then $F$ is a Vector Space over itself.
# Proof
The result naturally follows from the Axioms of a Field. $\square$
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Let $(F, +, *, 0, 1)$ be a Field. Then $F$ is a Vector Space over itself.
The result naturally follows from the Axioms of a Field. $\square$