A vector space over a field \(F\) is an non-empty set \(V\) together with binary operation called vector addition and a binary function called scalar multiplication that satisfies 8 axioms. The elements of a vector space are called vectors.
A vector space over a field \(F\) is an non-empty set \(V\) together with binary operation called vector addition and a binary function called scalar multiplication that satisfies 8 axioms. The elements of a vector space are called vectors.