`Cons`

constructs a "cons cell". This has nothing to do with lists at first. A cons cell is a pair of two values. A cons cell is represented in written form by a "dotted pair", e.g. `(A . B)`

, which holds the two values `'A`

and `'B`

.

The two places in a cons cell are called "car" and "cdr". You can visualize such a cons cell as a bisected block:

```
car cdr
+-----+-----+
| A | B |
+-----+-----+
```

In Lisp, a value can also be a reference to something else, for example, another cons cell:

```
+-----+-----+ +-----+-----+
| A | --------> | B | C |
+-----+-----+ +-----+-----+
```

This would be represented in "dotted pair" form as `(A . (B . C))`

. You can continue like this:

```
+-----+-----+ +-----+-----+ +-----+-----+
| A | --------> | B | --------> | C | D |
+-----+-----+ +-----+-----+ +-----+-----+
```

This is `(A . (B . (C . D)))`

. As you can see, in such a structure, the values are always in the `car`

of a cons cell, and the `cdr`

points to the rest of the structure. An exception is the last value, which is in the last `cdr`

. We do not need this exception, though: there is a special value `NIL`

in Lisp, which denotes "nothing". By putting `NIL`

into the last `cdr`

, you have a handy sentinel value, and *all* your values are in the `car`

s:

```
+-----+-----+ +-----+-----+ +-----+-----+ +-----+-----+
| A | --------> | B | --------> | C | --------> | D | NIL |
+-----+-----+ +-----+-----+ +-----+-----+ +-----+-----+
```

This is how a list is constructed in Lisp. Since `(A . (B . (C . (D . NIL))))`

is a bit unwieldy, it can also be represented simply as `(A B C D)`

. `NIL`

is also called the empty list `()`

; these are exchangable notations for the same thing.

Now you can see why `(cons x list)`

returns another list. `Cons`

simply constructs another cons cell with `x`

in the `car`

and a reference to `list`

in the `cdr`

:

```
+-----+-----+
| X | --------> list
+-----+-----+
```

and if `list`

is `(A B)`

, it works out as:

```
+-----+-----+ +-----+-----+ +-----+-----+
| X | --------> | A | --------> | B | NIL |
+-----+-----+ +-----+-----+ +-----+-----+
```

So, `(cons x '(a b))`

evaluates to `(x a b)`

.

Lists are just one very common use of cons cells. You can also construct arbitrary trees from cons cells, or circular lists, or any directed graph, actually.