I need to prove that the set of aff S = aff cl S in $R^n$ under the standard metric.
Definitions :
- cl S is the closure of S .
- Affinity hull of S is the smallest affine set that contains S. Notation: aff S is the affine hull of S.
My tentative approach:
-> aff S $\subset$ aff cl S.
We know that S is a subset of the closure of S, therefore, by the definition of affine hull, aff S is a subset of aff cl S.
<- aff cl S $\subset$ aff S.
I am not sure how to do the converse, any help would be appreciated.