Is this function handle too long for MATLAB to integrate?

I have written the following code in order to try to plot the following integral against values of r, but MATLAB gives me an error -- is fun too long? am I going wrong somewhere else?

`````` figure(1); %f_1
r = 0:0.001:50;
q = zeros(1, size(r));
for m = 1:numel(r)
fun = @(t) ((-3*(r(m).^3)*sin(3*t) + 2*(r(m)^2)*cos(2*t) + 7*r(m)*cos(t) -2*sin(t))*(-6*(r(m)^3)*sin(3*t) + 2*(r(m)^3)*cos(3*t) - 3*(r(m)^4)*cos(4*t) - 2*(r(m)^3)*sin(3*t) + 2*(r(m)^2)*cos(2*t) + 7*(r(m)^2)*sin(2*t))) - ((3*(r(m).^3).*cos(3*t) + 2*(r(m).^2).*sin(2*t) + 7*r(m).*sin(t) - 2*r(m).*cos(t))*(-6*(r(m).^3).*cos(3*t) + 2*(r(m).^3).*sin(3*t) + 3*(r(m).^4).*sin(4*t) - 2* (r(m).^3).*cos(3*t) - 2*(r(m).^2).*sin(2*t) + 7*(r(m).^2).*cos(2*t)))./((-3*(r(m).^3).*sin(3.*t) + 2*(r(m).^2)*cos(2.*t) + 7*r(m).*cos(t) - 2*sin(t)).^2 + (3*(r(m).^3).*cos(3*t) + 2*(r(m).^2).*sin(2*t) + 7*r(m).*sin(t) - 2*r(m).*cos(t)).^2);
q(m) = quad(fun, 0, 2*pi);
end
``````

The error I get is

``````        Error using  *  Inner matrix dimensions must agree.

Error in @(t)......

Error in quad (line 76) y = f(x, varargin{:});
``````
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What's the error? –  Dan Apr 30 '13 at 10:09
@Dan. I think I just needed to use a vector vauled version of quad. –  user27182 Apr 30 '13 at 10:13
@Dan. In fact, this takes much too long.. –  user27182 Apr 30 '13 at 10:19
I think you have to exchange all your `*` operators with the respective element-wise `.*` one. –  fpe Apr 30 '13 at 10:26
most of them are scalar multiplications, but to avoid headache, you can replace all of the `*` by `.*`. –  Parag S. Chandakkar Apr 30 '13 at 10:36

I'll show you a way you may proceed, based on a retained `r` and `fun` (I did not pick all the terms of the native function):

``````r = 0:0.1:50;
q = zeros(size(r));

for ii = 1:numel(r)
fun = @(t) (-3.*(r(ii).^3).*sin(3.*t) + 2.*(r(ii).^2).*cos(2.*t) + 7.*r(ii).*cos(t) -2.*sin(t));
end
``````

Since your `r` is quite huge (50001 elements if I remember right), I'd go for `parfor` insted of simple `for` loop, too.

EDIT

As alternative solution, you could achieve the same results without any `anonymous function`, by following this way:

``````r = 0:.01:50;
fun1 = zeros(size(r));
t = 0:.001:(2*pi);
for ii = 1:numel(r)
fun1(ii) = trapz(t,(-3.*(r(ii).^3).*sin(3.*t) + 2.*(r(ii).^2).*cos(2.*t) + 7.*r(ii).*cos(t) -2.*sin(t)));
end
``````
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