# MATLAB integration of an anonymous function

I wanted to ask how can I can write this in MATLAB.

I want to integrate `fp(z)` with `z(0,x)`. I tried this :

``````fpz=@(z) f1x(z) ./ quadl(f1x(z),0,1);

sol=int(fpz,0,x)  --> i also tried sol=quadl(fpz,0,x)
y=solve('y=sol',x)

xf=@ (y) y ;   -->this is the function i want
``````

where `f1x=@ (x) 1 ./(x.^2+1)` and `fpx = @(x) f1x(x) ./ quadl(f1x,0,1);`

but it doesn't work.

Hello,thanks for helping. The problem is that i want an analytically solution and i can't get one. I want f1x to give me " 1/x^2+1" , fpx "4/pi*(1+x^2) and fpz "4ArcTan(x)/pi", instead of giving me "f1x=@ 1./(x^2+1)".. With the code you send me ,still the same problem. I managed to come into this :

f1x=@ (x) 1 ./(x.^2+1) fpx = @(x) f1x(x) ./ quadl(f1x,0,1) f2z=@ (z) 1 ./(z.^2+1); fpz=@(z) fpx(z) ./ quadl(f2z,0,1) sol=int(fpz(z),z,0,x) y=solve(subs('y=sol'),x) xf=@ (y) y

The "sol" and "y=" gives me analytically answer but it is wrong because i assume f1x and fpx,fpz doesn't return into analytically expressions.

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Correct me if I'm wrong, but as I see it, in your fpz function, f1x(z) will be a value for each z. So you cannot integrate a value. Its like calling e.g. quadl(2,0,1). quadl will fail as it cannot integrate a number 2. – Marcin Jan 29 '11 at 15:00
Hello, i just want to integrate fpz with z(o,x).I tried also this : f2z=@ (z) 1 ./(z.^2+1); fpz=@(z) f2z ./ quadl(f2z,0,1); sol=int(fpz,0,x) – George Jan 30 '11 at 13:22
I have done this so far : f2z=@ (z) 1 ./(z.^2+1); fpz=@(z) f2z(z) ./ quadl(f2z,0,1); sol=int('fpz','z',0,'x') y=solve('y=sol',x) xf=@ (y) y ; and it gives me --->>>sol = fpz*x Warning: Explicit solution could not be found. > In solve at 81 In sampling2 at 81 y = [ empty sym ] ,,81 line is :y=solve('y=sol',x) ..Any ideas? – George Jan 30 '11 at 17:32

0 Your definition of fpz doesn't make any sense; as Marcin already said, you're trying to integrate something that isn't a function. This shouldn't be a problem for your alternative version with f2z. I think the code in the original question should have had just f1x rather than f1x(z) in the first line.

1 Your revised version with f2z has a different problem: now in fpz you aren't actually providing the function with an argument.

The following code seems to be the kind of thing you had in mind, and works fine for me (in MATLAB R2008a, as it happens, but none of this should be different in other versions):

``````f1x = @(x) 1 ./ (x.^2+1);
fpx = @(x) f1x(x) ./ quadl(f1x,0,1);
fpz = @(z) fpx(z) ./ quadl(fpx,0,1);
``````

Now evaluating fpz(3), for instance, spins for about half a second (on my old slow laptop computer) and returns 0.1273.

So I think the problems you've been having with integration of anonymous functions are just a matter of not being quite careful enough to distinguish between the function itself and a particular value of the function.

You have some further questions about the "solve" and "int" functions in the Symbolic Math Toolbox. You should take the following with a pinch of salt because I don't have that toolbox and am relying on the online documentation for it.

3 You're feeding the names of functions you've defined in MATLAB to the Symbolic Math Toolbox functions. I don't think that is supposed to work; "int" and "solve" expect explicit algebraic expressions, not MATLAB functions. (And, further, your functions all use numerical integration -- quad, quadl, etc. -- and there's no possible way that the symbolic functions can do anything useful with that.)

Finally: When you're asking questions of this sort, it's helpful if rather than "it doesn't work" you say how it doesn't work. For instance, your most recent comment is much more useful ("it gives me ..." followed by the actual output you get from MATLAB).

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@George, please don't edit answers to respond - edit your own question or add a comment. – bdonlan Feb 6 '11 at 13:13
I edited my original post.Please check it. – George Feb 6 '11 at 17:19
Hello, i did "sol=int(fpz(z).*z,0,x)" and it works ,but still can't get the right result (4*tan^-1 /pi).. – George Feb 9 '11 at 15:09
Edit-->the right result is "4*tan^-1(x)/pi) – George Feb 10 '11 at 11:09
What do you mean by (1) "it works" and (2) "can't get the right result"? I mean, if you don't get the right result then it doesn't work, no? What result do you get? – Gareth McCaughan Feb 10 '11 at 23:56