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Let's say I have a relation r^2 = x^2 + y^2. Now suppose after a calculation i get a complicated output of x and y, but which could in theory be simplified a lot by using the above relation. How do I tell Mathematica to do that?

I'm referring to situations where replacement rules x^2+y^2 -> r^2 and using Simplify/FullSimplify with Assumptions won't work, e.g. if the output is x/y + y/x = (x^2+y^2)/(xy) = r^2/(xy).

Simplification works really well with built in functions but not with user defined functions! So essentially I would like my functions to be treated like the built in functions!

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Welcome to StackOverflow. Please see this FAQ if you have questions about the site. –  Mr.Wizard May 7 '11 at 1:43

2 Answers 2

up vote 3 down vote accepted

I believe you are looking for TransformationFunctions.

f = # /. x^2 + y^2 -> r^2 &;

Simplify[x/y + y/x, TransformationFunctions -> {Automatic, f}]

(* Out=  r^2/(x y)  *)
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@Super, a word of caution about TransformationFunctions, the enable you to right replacement rules that violate mathematical rules. So, consider the transformation carefully before you use it. –  rcollyer May 7 '11 at 4:48
    
@rcollyer Or impose trivial assumptions that disable a whole family of solutions (denominator NEQ 0 is the classical example) –  belisarius May 7 '11 at 12:11

In the example you give

(x/y + y/x // Together) /. {x^2 + y^2 -> r^2}

==> r^2/(x y)

works. But I've learned that in many occasions replacements like this don't work. A tip I once got was to replace this replacement with one which has a more simpler LHS like: x^2 -> r^2-y^2 (or even x->Sqrt[r^2-y^2] if you know that the values of x and y allow this).

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I think the Mma box should come with a big red surgeon general's warning: "Don't expect this software to write formulas like you do". Much frustration could be avoided. –  belisarius May 7 '11 at 12:15
    
@Sjeord, that works precisely because Together makes the numerator x^2 + y^2 without any other terms present. If they're were other terms present, the likelihood of it working goes down quite a bit. Truthfully, I don't know if the TransformationFunction given by Mr. Wizard would work in that case. –  rcollyer May 7 '11 at 21:38

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