Please excuse the beginner question. I couldn't find an appropriate answer in any Mathematica tutorial.

I am confused why a definition as a function or a definition in terms of a simple replacement produce different results. Consider this example (Mathematica 9 code):

```
In[397]:= ClearAll["Global`*"]
In[398]:= Test := 3 c^2 + d^4
In[399]:= v[f_] := D[f, c]
In[400]:= v[Test]
Out[400]= 6 c
```

The first definition of this simple derivative function "v" acting on a variable is fine. Defining a replacement Test = ... to replace the variable produces the expected result (It derives 3c^2+d^4 with respect to c and answers 6c).

However if I define a function instead of a simple replacement this does not work:

```
In[401]:= TestFunction[a_, b_] := 3 a^2 + b^4
In[403]:= vFunction[f_[a_, b_]] := D[f[a, b], a]
In[405]:= vFunction[TestFunction[a, b]]
Out[405]= \!\(
\*SubscriptBox[\(\[PartialD]\), \(3\
\*SuperscriptBox[\(a\), \(2\)]\)]\((3\
\*SuperscriptBox[\(a\), \(2\)] +
\*SuperscriptBox[\(b\), \(4\)])\)\)
```

Why is that? I am risking to look like a moron here, but please enlighten me!

For your convenience, I uploaded a copy of my workbook here

Thanks a lot,

Michael

`TestFunction`

gets evaluated to`3 a ...`

first which doesn't match the pattern`f_[a_ ..`

Look up`HoldAll`

, and take this to mathematica.stackexchange.com – agentp Feb 13 '14 at 13:04