Is it possible to have an arbitrary member x of set A such that x is not a subset of set A?
Or is it that for any arbitrary member x of A, x is always a subset of A?
I know that a set containing arbitrary member x of A is not a member of set A, unless A contains a set containing arbitrary member x of A.
Or is it that for any arbitrary member x of A, x is always a subset of A?
I know that a set containing arbitrary member x of A is not a member of set A, unless A contains a set containing arbitrary member x of A.
