# trapz intergation

I have an array of numbers and I want to integrate each column in the array seperatley, and in the end get back an array of numbers after the integration.

I tried "trapz" function but I get a single value, how can i do what I want above?

Here's my code:

``````t=-1:0.001:1;
x1=100*sinc(100*t);
x2= 100*(sinc(100*t)).^2;
W= -2000*pi:2*pi:2000*pi;
T=-1:0.001:1;
u=x1.*exp(-1i.*W.*t);
v=x2.*exp(-1i.*W.*t);
X11= trapz(t,u);
X22= trapz(t,v);
``````

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Am I mistaking or you are giving to trapz a 1D array, which are to be intended as values of a function on a grid. Therefore how can it return an array? –  Acorbe Jan 6 '13 at 18:26
Currently, you're indeed passing a 1D array, so the output you see is indeed the integral along that column. What is the 2D array you wanted to construct? –  Jonas Jan 6 '13 at 20:44
Doesn't W contain several columns, I want to eventually plot the fourier transform of x1 and x2 by trapezoind integration. –  MathematicalPhysicist Jan 7 '13 at 6:40
Out of sheer curiosity, why did you define both `T` and `t`? –  Eitan T Jan 7 '13 at 8:59

If I'm following you correctly, you need `u` and `v` to be matrices. For that purpose, you have to resolve two issues in your code:

1. the `ω⋅t` product should be a matrix rather than a vector. For that purpose, you need to use matrix multiplication `W.' * t` (note the added transpose!) and not element-wise multiplication (`.*`). This produces all the necessary combinations of `ω⋅t` required for the transform.

2. In a similar fashion, you need to multiply `x` by `exp(-iωt)` column-wise. Use `bsxfun` instead of the element-wise multiplication, like so:

``````u = bsxfun(@times, x1(:), exp(-i * W.' * t));
``````

The same applies for `v`.

Since you're using the same `exp(-i * W.' * t)` both for `u` and for `v`, I suggest computing it once and storing it in a variable:

``````E = exp(-i * W' * t);
u = bsxfun(@times, x1(:), E);
v = bsxfun(@times, x2(:), E);
``````

Following this fix, `trapz` should produce the desired results now, i.e. `X11` and `X12` should really be the Fourier Transform applied on `x1` and `x2`, respectively.

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Thanks, it helped a lot. –  MathematicalPhysicist Jan 7 '13 at 14:59