# 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. –  Krastanov Sep 9 '13 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. –  asmeurer Sep 9 '13 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. –  memecs Sep 10 '13 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
``````
-
Cool. I'll give it a try! –  memecs Apr 8 at 9:41