# How to do substitution of a function in mathematica

I have the expression `D[f[x, y], x]`, and I want to substitute `f[x,y]` with `x*y`, I tried the following:

`D[f[x, y], x] /. {f[x,y] -> x*y}` and `D[f[x, y], x] /. {f -> x*y}`

But neither worked. Would appreciate your help! Thanks.

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The `FullForm` of the derivative in your expression is

``````In[145]:= D[f[x,y],x]//FullForm

Out[145]//FullForm= Derivative[1,0][f][x,y]
``````

This should explain why the first rule failed - there is no `f[x,y]` in your expression any more. The second rule failed because `Derivative` considers `f` to be a function, while you substitute it by an expression. What you can do is:

``````In[146]:= D[f[x,y],x]/.f->(#1*#2&)

Out[146]= y
``````

Note that the parentheses around a pure function are essential, to avoid precedence - related bugs.

Alternatively, you could define your r.h.s through patterns:

``````In[148]:=
fn[x_,y_]:=x*y;
D[f[x,y],x]/.f->fn

Out[149]= y
``````

HTH

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great, thanks. Initially, I did not understand the FullForm fully. :) –  Qiang Li Feb 12 '11 at 0:11
what does HTH mean? I saw this several times already, but never got its meaning. –  Qiang Li Feb 12 '11 at 0:15
"Hope this helps" –  joebolte Feb 12 '11 at 0:16
Lenoid's answer is correct. Slightly more generally, `D[f[x,y],x]/.f->Times` will work for any number of arguments to f. –  joebolte Feb 12 '11 at 0:21
HTH............ :) –  joebolte Feb 12 '11 at 0:23

Nothing new, just the way I usually think of it:

``````D[f[x, y], x] /. f -> Function[{x, y}, x y]
``````

Out

``````y
``````
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You can also try Hold and Release or Defer etc.

``````Hold@D[f[x, y], x] /. {f[x, y] -> x*y}

D[x y, x]

Hold@D[f[x, y], x] /. {f[x, y] -> x*y} // Release

y
``````
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