# Using scipy to perform discrete integration of the sample

I am trying to port from labview to python. In labview there is a function "Integral x(t) VI" that given a set of samples will perform a discrete integration of a list of samples and return a output list of values of the areas under the curve according to Simpsons rule.

I tried to find an equivalent function in scipy, e.g., scipy.integrate.simps, but those functions return the summed integral across the set of samples, as a float.

Can anyone suggest how to achieve this? Am I just looking at the problem the wrong way around?

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I think you may be using scipy.integrate.simps slightly incorrectly. The area returned by `scipy.integrate.simps` is the total area under `y` (the first parameter passed). The second parameter is optional, and are sample values for the x-axis (the actual x values for each of the y values). ie:

``````>>> import numpy as np
>>> import scipy
>>> a=np.array([1,1,1,1,1])
>>> scipy.integrate.simps(a)
4.0
>>> scipy.integrate.simps(a,np.array([0,10,20,30,40]))
40.0
``````

I think you want to return the areas under the same curve between different limits? To do that you pass the part of the curve you want, like this:

``````>>> a=np.array([0,1,1,1,1,10,10,10,10,0])
>>> scipy.integrate.simps(a)
44.916666666666671
>>> scipy.integrate.simps(a[:5])
3.6666666666666665
>>> scipy.integrate.simps(a[5:])
36.666666666666664
``````
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yeah that is what I wanted to achieve. I guess I was expecting there would be a 'quicker' way using the magic of maths. As an aside, is there a reason you coerce the Python list to a numpy.array? –  user1425750 May 30 '12 at 11:38
@user1425750 - If you have a bunch of start and end points you could do it like this:`[scipy.integrate.simps(y[s:e]) for s,e in [(s1,e1),(s2,e2),...etc.]]`. It is likely faster to use numpy arrays, and for some functions they are neccessary, particularly when using special axis features etc. But in this example it works on regular lists :) –  fraxel May 30 '12 at 11:46
Thanks! I am not so at sea that I cannot use a loop, but thanks for the tip. And the numpy arrays thing is as I thought. –  user1425750 May 30 '12 at 12:24