# numerical integration in mathematica given two lists of data

Is there a built-in routine for doing numerical integration in Mathematica given two lists of data as `{x1, x2, ..., xn}` and `{y1, y2, ..., yn}`?

I want to do something like trapezoidal integration or others. Doesn't seem `NIntegrate` can do that. Of course I can write it on my own. Just think there are probably too many numerical integration schemes to try out, especially when I am eager to get it going.

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Probably not what you have in mind, but you could set up an interpolation function:

``````dat = {#, Sin[#]} & /@ Range[0, 2*Pi, .1];
``````

creates a list of data points (in the form of `{x,y}`).

``````fun = Interpolation[dat];
``````

creates an interpolation functions (try plotting `Plot[fun[x],{x,0,2*Pi}]` to see what it is). You can then use `NIntegrate`:

``````NIntegrate[fun[x]^2, {x, 0, 2*Pi}]
``````

However, if you really want to do it the matlab way that's also possible.

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Also remember you can may use InterpolationOrder -> n if needed –  belisarius Dec 15 '11 at 23:04
This appears to be the recommended way, at least according to the docs. There was once an add-on package with a ListIntegrate function. Documentation for this states: "In Version 6, ListIntegrate has been superseded by Integrate[Interpolation[data, InterpolationOrder->k][x],{x,Max[Subscript[x, c]],Min[Subscript[x, c]]}], for data={{Subscript[x, 1],Subscript[y, 1]},...,{Subscript[x, n],Subscript[y, n]}} with Subscript[x, c]=data[[All,1]]. The default interpolation order is k=3." –  Daniel Lichtblau Dec 15 '11 at 23:31
As another point, some of the higher order numerical integration schemes are built on the ideas found in interpolation. –  rcollyer Dec 16 '11 at 3:22
(also to @littleEinstein) Since I'm doing this right now, I'd like to add that `Integrate`, `D` & fiends support `InterpolatingFunction` objects directly. This means that the antiderivative of `fun` can be constructed directly as `Derivative[-1][fun]`. The result is another `InterpolatingFunction`. –  Szabolcs Dec 28 '11 at 15:36
Sorry, I just realized that Daniel Lichtblau mentioned the same. –  Szabolcs Dec 28 '11 at 15:38
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