# Using functions in definitions

I'm modeling a program in which users can choose from different operators and functions for writing queries (i.e. formulas) for the system. For showing these operators, here I defined `add` and `mul` functions and used nat datatype, instead of my program's functions and datatypes. How should I define `formula` that enables me to use it in definition `compute_formula`. I'm a bit stuck at solving this issue. Thank you.

``````Fixpoint add n m :=
match n with
| 0 => m
| S p => S (p + m)
end
where "n + m" := (add n m) : nat_scope.

Fixpoint mul n m :=
match n with
| 0 => 0
| S p => m + p * m
end
where "n * m" := (mul n m) : nat_scope.

Definition formula : Set :=

Definition compute_formula (f: formula) : nat :=
match f with

end.
``````

First, your syntax for defining a data type is not quite right: you need to use the `Inductive` keyword:

``````Inductive formula : Set :=
| Formula : nat -> nat -> ?operators_add_mul -> formula.
``````

It remains to figure out what the arguments to the `Formula` constructor should be. The Coq function type `->` is a type like any other, and we can use it as the third argument:

``````Inductive formula : Set :=
| Formula : nat -> nat -> (nat -> nat -> nat) -> formula.
``````

After defining this data type, you can write an expression like `Formula 3 5 add`, which denotes the addition of 3 and 5. To inspect the formula data type, you need to write `match` using the `Formula` constructor:

``````Definition compute_formula (f : formula) : nat :=
match f with
| Formula n m f => f n m
end.
``````