Given a field extension L/K, L can be considered as a vector space over K, with vector addition being the field addition on L, and scalar multiplication being a restriction of the field multiplication on L. The dimension of this vector space is called the degree of the extension, and is denoted [L:K]. The extension is said to be finite or infinite according as the degree is finite or infinite.
See also: Algebraic extension, [Galois theory]?