# Mathematica: Simplify with user-defined function

Input:

``````f[x_] := Sqrt[x^2 + y^2]
f'[x]
``````

Output:

``````x / Sqrt[x^2 + y^2]
``````

How do I get Mathematica to replace the denominator by `f[x]` itself? (Note: this is a simple example of a more complicated differentiation problem, in which the function itself is complicated but shows up a lot in the derivative.)

That is, desired Output is:

``````x / f[x]
``````

I tried

``````Simplify[f'[x], TransformationFunctions -> {f}]
``````

but to no avail. Any help is appreciated!

-
If you do define `f`, it will not be possible to have it in the output as it would immediately auto-evaluate. If you type `x / f[x] ` and press shift-enter, it'll also give you `x / Sqrt[x^2 + y^2] ` –  Szabolcs Jun 21 '12 at 14:55

I think it's very hard to do this in general; in your specific example one can use a rule such as

``````rules = {z_^2 + y^2 -> Hold[f[z]^2]};
``````

and then

``````f'[x] /. rules

(* x/Sqrt[Hold[f[x]^2]] *)

f''[x] /. rules

(* -(x^2/Hold[f[x]^2]^(3/2)) + 1/Sqrt[Hold[f[x]^2]] *)
``````

Working with the square root is more difficult and I think one rule is not enough, the basic reason being :

``````Sqrt[x^2 + y^2] // FullForm
1/Sqrt[x^2 + y^2] // FullForm
``````
-

I think you can do it like this:

``````Clear[f,g]
g[expr_]:=expr/.(x_^2+y_^2):> (f[x])^2
Simplify[D[Sqrt[x^2+y^2],x],TransformationFunctions->{Automatic,g},Assumptions->f[x]>0]
``````

it will give `x/f[x]` as a result.

-