What are subspaces

• A subspace is basically a set of vectors that is closed under linear combination (vector addition and scalar multiplication).
• So any element in the subspace can be represented as a linear combination of the other elements in the set.
• So subspace is very similar to span, except with span we define the set we are spanning across. Eg: $\text{Span }A$ is the linear combinations of vectors in $A$ specifically.