# What is the correct and smooth way to write a OCaml function?

I am learning Jason Hickey's Introduction to Objective Caml.

After I learned Chapter 3, I seem to understand how the `let` and `fun` work. But still, I have troubles to write my own `fun`.

Here is an example problem I am facing.

```Write a function sum that, given two integer bounds n and m and a function f, computes a summation (no for loop allowed). i.e., sum n m f = f(n) + f(n+1) + ... + f(m)```

So, how should I start to think about producing this function sum?

In Java or normal programming language, it is easy.

Since here for loop is not allowed, so I guess I should do it in `let rec` way?

Something like this:

`let rec sum n m f = fun i -> ....`

I need an `i` to be a cursor?

Whatever, I can't continue to think out.

Can anyone point a road for me to produce a OCaml fun?

This is my final solution:

`let rec sum n m f = if n <= m then (f n)+(sum n+1 m f) else 0;;`

but of course, it is wrong. The error is ```Error: This expression has type 'a -> ('a -> int) -> 'b but an expression was expected of type int```

Why? and what is 'a?

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FYI you should never think in terms of a loop again if you program in OCaml: even loops are syntactic sugar to `let rec` expressions. – Kristopher Micinski Dec 4 '12 at 15:26
@KristopherMicinski so OCaml prefer rec always? – Jackson Tale Dec 4 '12 at 15:26
Yes, that is the functional way to do any kind of recursion. In the case of OCaml, it's better to use tail recursive functions, which don't build up stack frames. Never use loops again (unless you do truly understand they are syntactic sugar and you have a good reason for preferring them over recursion). – Kristopher Micinski Dec 4 '12 at 15:28
@KristopherMicinski my solution is not tail recursive one, right? – Jackson Tale Dec 4 '12 at 15:31

I'm hoping this will help you to think in terms of recursion and not with loops (let's leave out tail recursion for a moment).

So you need to calculate `f(n) + f(n+1) + ... f(m)`. It might help you to think of this problem in an inductive fashion. That is, assume you know how to calculate `f(n+1) + ... + f(m)`, then what do you need to do in order to calculate the original result? well, you simply add `f(n)` to the latter, right? That is exactly what your code has to say:

``````let rec sum n m f =
if n = m then
f m
else
f n + sum (n + 1) m f;; (* here's the inductive step *)
``````

You can see how I have added `f(n)` to the result of `f(n+1) + .... + f(m)`. So, think inductively, break down the problem into smaller pieces and think about how you can put the results of those smaller pieces together.

Hope I didn't make things more confusing.

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let rec sum1 n m f = sum2 n m 0 and sum2 n m s = if n <= m then sum2 (n+1) m (s+f n) else s;; is this one tail recur? – Jackson Tale Dec 4 '12 at 16:58
Yes, the idea is that you use an accumulator to keep track of the sum calculated so far. So you are accumulating the sum as you go along the calculation... so at the end you can simply return the accumulated value. This avoids the need to operate on a result returned for a sub-problem (i.e, you can immediately return the result for the sub-problem). – Asiri Rathnayake Dec 4 '12 at 17:16

You have done a classic syntax mistake: `sum n+1 m f` is parsed as `(sum n) + (1 n f)` instead of what you expect. In OCaml, function application (space) has stronger precedence than infix operators.

The type error comes from the fact that `sum n` (which you use in a sum) is not an integer. It takes one more argument (`m`) and a function returning an integer. At this point of the type inference process (when the error occurs), OCaml represents this as `'a -> ('a -> int) -> 'b`: takes some unknown stuff `a`, a function from `a` to int, and returns some stuff `b`.

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Yes, thanks, I corrected it to `sum (n+1) m f`, it works fine now. But could you please tell me how to think in producing a `fun`? The logic is quite different from other easy programming language. – Jackson Tale Dec 4 '12 at 15:27
@JacksonTale doing this is not explained in a comment, it's explained by being a functional programmer for a while and forcing yourself to work through some examples. – Kristopher Micinski Dec 4 '12 at 15:31

`'a` is like the generic type in Java. For example: `let test a = 1` Its type is `'a -> int` This function would return 1 regardless of the type of your argument.

The error is that you need to put parentheses here `(sum (n+1) m f)`

Ocaml thought of it as extra arguments, and so it results in a different type than as you intended. Putting parentheses would make sure you have the right number of arguments. It is a subtle problem to debug when you have a lot of codes. So using parentheses in similar situations would save you so much time. :)

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