# Matlab: how to calculate the definite integral of a function over multiple limits?

Assume:

``````z = [0.4 0.5 0.75]'
function y = myfunct(x)
``````

I'd like to calculate the definite integral of sin(x) from 0 to 0.4, to 0.5, and 0.75, using:

``````myfunct(z)
``````

However, Matlab returns:

``````??? Error using ==> quad at 70
The limits of integration must be scalars.
``````

I'd be thankful for any constructive suggestions.

-

You can also use `quadv` to do this. BUT, instead of making a vector of integration limits, make an array valued function so that when you integrate each element, the range of integration will be 0 to 1.

To be more specific, you want to integrate sin(x) from x = 0 to z. This is the same as integrating sin(u z)*z from u = 0 to 1 (u-substitution). Make an array function

``````F = @(u) [sin( .4 * u) * .4, sin( .5 * u ) * .5, sin( .75 * u ) * .75 ];
``````

Then do

``````quadv(F,0,1)
``````
-
I guess your way might be a bit faster than mine. But I'd restructure it a bit since you are repeating some information (i.e. when you want to change 1 limit, you have to change 2 numbers, when you want to change the function, you have to change 3 identifiers). The following code is equivalent to yours: `lims = [0.4 0.5 0.75]'; F = @(u)(sin(u.*lims).*lims); quadv(F,0,1)` –  Egon Oct 17 '11 at 6:38
agreed. that is a much cleaner way of doing it, and generalizes better. I guess I was trying to be too explicit. –  MarkV Oct 19 '11 at 3:23
Thank you both for the helpful comments. –  skitnik Oct 19 '11 at 16:36

You can use the `arrayfun` function in recent versions of MATLAB:

``````z = [0.4 0.5 0.75]';