# Difference between HashSet.IsSuperSetOf and IsProperSuperSetOf?

MSDN documentation of both methods looks very similar. Also the example cited beneath the remarks for `IsSupersetOf` is not very helpful either.

Can someone please explain to me the difference using simple language?

• en.wikipedia.org/wiki/Subset Commented Feb 24, 2014 at 22:31
• Good old math. Amazing how one quickly forgets stuff that is not used on a daily basis. Thanks for the link. Commented Feb 26, 2014 at 23:39

You can think of it like the difference between `>` and `>=`. IsSuperSetOf is doing something like `>=`, so your set could have exactly the same elements that are in the set you're comparing to. By contrast, a proper super set is kind of like `>` and has extra elements that the second set doesn't have.

For example, a set is a superset of itself, but it's not a proper superset of itself.

• Thanks for the simplification. Commented Feb 26, 2014 at 23:38

A superset of set `A` is a set that contains all of the elements of set `A`

A proper superset of `A` is a set that contains all of the elements of `A` but is not equal to `A`.

So if `A` = `{1,2,3}`, then `{1,2,3}` is a superset of `A` but not a proper superset, while `{1,2,3,4}` is a proper superset.

A proper subset cannot equal the set.

{1,2,3} is a subset of {1,2,3}, but not a proper subset

{1,2} is a proper subset (and subset) of {1,2,3}

http://www.mathsisfun.com/sets/sets-introduction.html

The answer is in the mathematical definitions underneath:

If A and B are sets and every element of A is also an element of B, then:

• B is a superset of (or includes) A, denoted by B ⊇ A.

If A is a subset of B, but A is not equal to B (i.e. there exists at least one element of B which is not an element of A), then

• B is a proper superset of A; this is written as B ⊋ A.

Source: Wikipedia