# How to design mathematical program which calculate the derivative of a function using python? [closed]

If I want to create a program which calculate the derivative of functions.

For the simple case, consider that the acceptable functions which our program can deal with are only polynomials.

My question are:

• What is the background needed to design such program using Python?
• Would this project be a difficult one for a beginner in Python?
• Is Python a suitable language which could be used to design such a program or would it be easier to accomplish in another language?
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## closed as not a real question by Silas Ray, Andy Hayden, DarkAjax, dandan78, SecatorApr 9 '13 at 16:20

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

I'm sorry, but are you mixing up mathematical functions and Python functions? –  Torxed Apr 9 '13 at 14:35
So you want to take a string containing a mathematical expression, parse it, transform it, and return the stringified transformation? –  Silas Ray Apr 9 '13 at 14:35
Please put more effort into your question. Spelling! Grammar! Formatting! –  John Kugelman Apr 9 '13 at 14:38
-1. I agree with @Torxed, before asking a question make sure that you have enough acquaintance upon what you're asking. –  etuardu Apr 9 '13 at 14:39
Lots of people recommend learnpythonthehardway.org but the tutorial (docs.python.org/3.3/tutorial) directly from the horse's mouth, so to speak, is also quite serviceable. If neither of those work for you, there's plenty of stuff you can find via Google and Wikipedia. –  Silas Ray Apr 9 '13 at 14:55

Taking a function is easy... it's just like any other argument.

``````def example(somefunc):
somefunc()

example(someFunction)
example(lambda x: x ** 2)
``````

Returning one is a little trickier, but not much.

You can return a lambda:

``````def example2():
return lambda x: x + 1
``````

Or you can build an inner function, and return that

``````def example3():
def rf(x):
return x + 2
return rf

myfunc = example3()
myfunc(2) #returns 4
``````
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math.sqrt(x) is NOT a (Python) function, math.sqrt is a function. Notice the missing (x). In the same vein, 1/(2 * math.sqrt(x)) is not a function but (lambda x: 1/(2 * math.sqrt(x))) is a function.

The issue is that

``````a = lambda x: x
``````

and

``````b = lambda x: x
``````

will yield two different python functions that are equivalent from a mathmatical point of view. So it is not that helpful to test functions for equality. You would need to actually "parse" them in order to find mathmatical derivatives.

Parsing the inner definitions is possible but not even close to simple.

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