Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

(I made some changes...)

very often I want to simplify the function's argument, or apply a pattern to it, eg. I want to change:



Exp[a b + a c]

simple pattern doesn't help:

Sin[a(b+c)] /. Sin[aaa_] -> Sin[Expand[aaa]]

gives again


However, with functions other than Simplify / Expand it seems to do what I expect:

Sin[a (b + c)] /. Sin[aaa_] -> Sin[f[aaa]] 


Sin[  f[a(b+c)]  ]

My usual solution was to use 2 patterns and Hold:

(Exp[a(b+c)] /. Exp[aaa_] -> Exp[Hold[  Expand[aaa]  ]] ) /. Hold[xxx_] -> xxx

which results in

E^(a*b + a*c)

The disadvantage of this method is that code gets more complicated than it's neccesary.


ppp2 = 
 ( ppp1  
    /. { ExpIntegralEi[aaa_] -> 
           ExpIntegralEi[Hold[aaa /. { u2 -> 0, w2 -> 0, u3 -> x, w3 -> x}]], 
         Log[aaa_] -> 
           Log[Hold[aaa /. {u2 -> 0, w2 -> 0, u3 -> x, w3 -> x}]]
 ) /.  Hold[xxx_] -> xxx;

where ppp1 is a long sum of terms containing u2, w2, u3, w3 and so on. I want to change the values of u, w2... ONLY in ExpIntegral and Log.

My other solution is a function:

ExpandArgument[expr_, what_] := Module[{list},
  list = Extract[expr, Position[   expr, what[_]   ]];
  list = Map[Rule[#, what[Expand[   #[[1]]   ]]] &, list];
  Return[expr /. list]

The function I wrote can be easily generalised to make it possible to use not only Expand but also Simplify and so on:

ApplyToArgument[expr_, ToWhat_, WhatFunction_] := Module[{list},
  list = Extract[expr, Position[   expr, ToWhat[_]   ]];
  list = Map[Rule[#, ToWhat[WhatFunction[   #[[1]]   ]]] &, list];
  Return[expr /. list]

For example:

ApplyToArgument[Sin[a (b + c)], Sin, Expand]


Sin[a b + a c]


ApplyToArgument[Sin[a b + a c ], Sin, Simplify]


Sin[a (b + c)]

This solution is easy to read but needs some refinement before being applied to many-argument functions (and I need these functions).

I guess I'm missing something fundamental about patterns in mathematica... How should I apply patterns to arguments of functions? (Or simplify, expand, etc. them)

Thanks a lot!

share|improve this question
You could use Map (or /@ for short) to apply a function to the arguments of another function. So for your example you could do Expand /@ Sin[a (b + c)] which returns Sin[a b + a c]. If you only want to apply the function to say the first argument, you could use MapAt, e.g. MapAt[Expand, g[a (b + c), d (e + f)], 1] –  Heike Nov 9 '11 at 11:46
@Heike Thanks a lot for the comment. I've changed my question to explain that I dont work with single functions, but with long sums of different functions and I want to change arguments of only one type of them. –  au700 Nov 9 '11 at 12:04
This question appears to be off-topic because it is about Mathematica and it should be moved to mathematica.stackexchange.com –  Saullo Castro Oct 16 '13 at 10:50

4 Answers 4

up vote 13 down vote accepted

For the first part of the question, you could consider using RuleDelayed:

Sin[a (b + c)] /. Sin[aaa_] :> Sin[Expand[aaa]]


Sin[a b + a c]
share|improve this answer
That is the thing I was looking for. Thanks a lot! –  au700 Nov 9 '11 at 13:19
I didn't mark this answer as an accepted one because I somehow didn't know how to do it. This answer was REALLY helpful, I use it a lot! –  au700 Nov 5 '12 at 22:29

Use :> instead of ->. With ->, the right hand side is immediately evaluated, and only then applied. Expansion of aaa of course gives just aaa, and therefore evaluation of Sin[Expand[aaa]] gives Sin[aaa], thus the rule asks for replacing each application of Sin by itself. Then you also should not need those Hold constructs.

In a related note: Instead of applying the rule Hold[xxx_]->xxx, you can just pass your expression to ReleaseHold, for example ReleaseHold[Hold[1+1] /. 1->2] gives 4.

share|improve this answer
Thanks a lot! I see the point. Thanks for suggesting ReleaseHold (and providing a nice example). –  au700 Nov 9 '11 at 13:23

Also consider using ExpandAll:

ExpandAll[Exp[a (b + c)]] // FullForm

will give:

Power[E, Plus[Times[a, b], Times[a, c]]]

(This will turn Exp[...] into E^... though)

share|improve this answer

This is not a direct answer (others provided that), but for these kinds of manipulations the Algebraic Manipulation Palette (Palettes -> Other) is often quite convenient:

enter image description here

The disadvantage is that unlike typed-in commands, this operation won't be "recorded" and saved in the notebook.

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.