# Derivatives Discretization with Sympy

Is there a way to discretize the derivative of an unknown function in sympy? I am trying to achieve the following:

``````from sympy import *

>>> f = Function('f')
>>> x = Symbol('x')

>>> dfdx = Derivative(f(x),x).somemethod()
>>> print dfdx
(f(x+1) - f(x-1)) / 2
>>> eq = lambdify((f,x),dfdx)
>>> w = np.array([1,5,7,9])
>>> print eq(w,1)
-3
``````
• There is no method already implemented, but it would be quite straightforward to do it yourself. You probably need to know about `subs` and nothing else. If you create such a method, the sympy team might be interested to get a pull request from you on github. Commented Sep 9, 2013 at 21:36
• I agree with Krastanov. The general version with higher order derivatives is complicated enough that it would be useful to have this in the library itself. Commented Sep 9, 2013 at 22:05
• Thanks both for the info! I'll look into that. I am a sympy newbie so I guess it won't be trivial to implement. Commented Sep 10, 2013 at 13:35

After reading this question I have implemented this functionality in Sympy and it is currently available in:

my branch: https://github.com/bjodah/sympy/tree/finite_difference

sympy master (https://github.com/sympy/sympy), and will be availble in 0.7.6

Here is an example:

``````>>> from sympy import symbols, Function, as_finite_diff
>>> x, h = symbols('x h')
>>> f = Function('f')
>>> print(as_finite_diff(f(x).diff(x), h))
-f(-h/2 + x)/h + f(h/2 + x)/h
``````