(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+c)]
```

into

```
Exp[a b + a c]
```

simple pattern doesn't help:

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

gives again

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

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

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

gives

```
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.

MY REAL LIFE EXAMPLE is:

```
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]
```

gives

```
Sin[a b + a c]
```

and

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

gives

```
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!

`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