I will try giving you an answer, based on my experience with `quad`

function.

Starting from this:

```
k=0:5;
f=@(x) x.^2;
```

Notice the difference in your `f`

definition (incorrect) and mine (correct).

If you only mean to integrate `f`

within the range `(0,5)`

you can easily call

```
quad(f,k(1),k(end))
```

Without handle function, you may reach the same results in a different way, by making use of `trapz`

:

```
x = 0:5;
y = x.^2;
trapz(x,y)
```

If, instead, you mean to perform a step-by-step integration in the small range `[k(i),k(i+1)]`

you may type

```
arrayfun(@(ii) quad(f,k(ii),k(ii+1)),1:numel(k)-1)
```

For a sake of convenince, notice that

```
sum(arrayfun(@(ii) quad(f,k(ii),k(ii+1)),1:numel(k)-1)) == quad(f,k(1),k(end))
```

I hope this helps.

`0`

and`5`

as integrative limits? – fpe Feb 7 '13 at 16:04