# Differentiating a product with an unknown function - sympy

I tried various searches but couldn't find a good google string to bring up the right results.

I have a product of the form

``````y = x*f(x)
``````

where f is a function of x which is not known. I want sympy to differentiate y with respect to x. Does anyone know how I can do this?

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Forget SymPy for a moment. How would you do it in general? I don't see how you can get a symbolic derivative for a functional form that is not know. How would you do this on pen and paper? –  user1132648 Sep 1 '13 at 0:00
It's just the simple product rule, so you would get y'(x) = f(x) + xf'(x). So in this case, that is the answer I'd like it to return. It must be able to do it, I just don't know how. –  user1654183 Sep 1 '13 at 0:03
How would you find f'(x) without knowing functional form? Do you want a numerical approximation? –  user1132648 Sep 1 '13 at 0:25

## 1 Answer

How about:

``````>>> x = sympy.Symbol("x")
>>> f = sympy.Function("f")
>>> y = x * f(x)
>>> y
x*f(x)
>>> y.diff(x)
x*Derivative(f(x), x) + f(x)
``````
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Perfect, I knew I was missing something simple. Thank you. –  user1654183 Sep 1 '13 at 1:24