In Stanford Scala course I've come across the following assignment:

**Exercise 1 – Sets as Functions:**

In this exercise we will represent sets as functions from Ints to Booleans:

```
type Set = Int => Boolean
```

**a**) Write a function "set" that takes an Int parameter and returns a Set containing that Int.

**b**) Write a function "contains" that takes a Set and an Int as parameters and returns true if the Int is in the Set and false otherwise.

**c**) Write the functions "union", "intersect", and "minus" that take two Sets as parameters and return a Set.

**d**) Can you write a function "subset" which takes two Sets as parameters and returns true if the first is a subset of the second and false otherwise?

Solutions to the **a**, **b** and **c** are fairly trivial:

```
def set(i: Int): Set = n => n == i
def contains(s: Set, i: Int) = s(i)
def union(a: Set, b: Set): Set = i => a(i) || b(i)
def intersect(a: Set, b: Set): Set = i => a(i) && b(i)
def minus(a: Set, b: Set): Set = i => a(i) && !b(i)
```

But is there any elegant solution for **d**?
Of course, strictly speaking, the answer to **d** is "yes", as I can write something like:

```
def subset(a: Set, b: Set) = Int.MinValue to Int.MaxValue filter(a) forall(b)
```

but that's probably not the right way.

isthe right way. – Malvolio Aug 6 '11 at 3:26