Calculating numerical integral in Matlab using quad2d

I have a problem using quad2d in Matlab. The expression that is to be calculated is:

$\frac{8}{pi^2}\sum_{k=1}^{n}(\frac{sin(\frac{k*pi}{2}){k^2}e^-(k*pi)^2 sin(k*pi*x)$


I have written the following code:

fun = @(x,y) (8/(pi^2))*((sin(y.*pi/2))/(y.^2))*exp(-(((y.*pi)^2)*0.1))*sin(y.*pi*x.*1)



I would like to calculate the numerical integral of the expression above with two different variables. When I write this in Matlab, the error message I get is:

Warning: Matrix is singular to working precision.
There are a lot of error Messages. Does anyone have an idea to what should be done differently?

• As you can see, StackOverflow does not support TeX equations. Please replace it with an image or remove it. Commented Feb 16, 2015 at 23:59

The problem you are facing is the inconsistent and partly wrong use of * and .*. You have to know that quad2d uses matrices or vectors for x and y to do the integration. To make it clear:

• .* denotes element-wise multiplication. Similarly, ./ and .^ denote element-wise division or powers.
• * is a multiplication by a scalar if one argument is scalar (a number) and matrix multiplication if both inputs are vectors or matrices.

In your problem, as far as I see, you don't want any matrix multiplications. Thus, you will have to replace all *,/,^ where two matrices (i.e., x,y) are involved by the element-wise operations. You can still use * etc. for multiplying matrices with scalars. I did exactly this here:

fun = @(x,y) (8/(pi^2))*((sin(y*pi/2))./(y.^2)).*exp(-(((y*pi).^2)*0.1)).*sin(pi*y.*x);


Note that y*pi/2, e.g., doesn't need dots, as pi/2 is a scalar and y is a vector matrix. You could use .* there, both will work.

Now the integration works without errors:

ca=quad2d(fun,0,1,1,200)

ca =
0.0318