# NIntegrate evaluates a clearly non-zero integral to be zero. The integrand is a set of data points morphed into a distribution

I have a list of data points that are to represent a probability distribution. I need to integrate over this distribution. However since I didn't have a function and I only had a set of data points, I came up with the following code to represent the probability distribution:

``````dList1 = Import["Z-1.txt", "Table"];
dList2 = Import["Z_over-1.txt", "Table"];

dDist[X_,sym_] := (

dList = 0;

If[sym,
dList = dList1;
,
dList = dList2;
];

val = 0;

If[Abs[X] < Pi,
i = 2;
While[dList[[i]][[1]] < X, i++];

width = dList[[i]][[1]] - dList[[i-1]][[1]];

difX = dList[[i]][[1]] - X;
difY = dList[[i]][[2]] - dList[[i-1]][[2]];

val = dList[[i-1]][[2]] + (1-(difX/width)) difY;
];

Return[val];
);
``````

where the set of data points are in the text files.

Performing the following command:

``````Plot[dDist[x, True], {x, -1, 1}]
``````

gives this:

Whereas, performing this:

``````NIntegrate[dDist[x, True], {x, -1, 1}]
``````

evaluates to zero, along with this warning:

I have tried increasing MinRecursion to no avail. I'm not sure what to do and would be open to any suggestions, including modifying the dDist function.

-
–  Hot Licks Dec 12 '12 at 1:38
@HotLicks, the problem is not a mathematical one. The math is fine, mathematica is calculating it wrong for some reason. –  Silmaril89 Dec 12 '12 at 1:42
It would help a lot to have even a minimal set of data you're using. In general, you might try to interpolate your point before the integration or use `EmpiricalDistribution`. –  b.gatessucks Dec 12 '12 at 8:09