# Python changing function definition in loop?

I was wondering if it is possible to do the following: If a function takes a function as argument, can I make it so that the argument of the inner function can be changed in a loop?

I have a function that takes any function f and integrates it over a, b. The problem is if I in a loop want to integrate cos(1* x) and then cos(2*x) ....cos(N*x) I don't know how to make my first function understand that when I say integrate(f(i),a,b) I don't mean integrate cos(1) or cos(2) BUT cos(1*x) or cos(2*x) and so on.

Eg:

def integrate(f,a,b):
h = float(b-a)/10;
I = 0;
for i in range(10):
I+= f(h*i);   <----(1)
return I;

A = zeros(N);
for k in range(N):
A[k] = integrate(cos(k), a,b)   <-----(2)


What I want is for cos(k) in (2) to be called such that in (1) it becomes f(k * h * i), does this make sense to you? I want to change the parameter of (1) by changing (2). I need this for a fourier series function I am doing. The way it currently works is that instead of calling cos() with (k * h* i) inside the paranthesis it will just call cos(k).

-
But you're not passing a function to integrate, you're passing the value returned by cos(k). –  Matt Ball Oct 5 '12 at 2:12
Yes exactly my problem, I want to pass the function cos(k * ) such that when it passes into integrate instead of f(h*i) it is now f(k*h*i). –  arynaq Oct 5 '12 at 2:15
There is an ugly way I can solve the problem, I just have to pass an evaluated function to integrate instead of a function to be integrated over a,b with N points. But this is ugly..and I don't want to hand in ugly code, the assignment doesn't care how I do it I just can't sleep. There must be a finer way of doing things. –  arynaq Oct 5 '12 at 2:17

You're not passing a function to integrate, you're passing the value returned by cos(k). If I understand your goal correctly, this should be fixable by passing a lambda (an anonymous function):

def integrate(f, a, b):
h = float(b-a)/10
I = 0;
for i in range(10):
I += f(h*i)

return I

A = zeros(N)
for k in range(N):
A[k] = integrate(lambda x: cos(k*x), a, b)


If that's hard to read, you can accomplish an equivalent end using a "normal" defd function which closes over k:

A = zeros(N)
for k in range(N):
def callback(x):
return k*x

A[k] = integrate(callback, a, b)


(code not tested)

-
This worked and already implemented, though partial looks very neat. Now to find a good benchmarking tool to see if partial is faster. –  arynaq Oct 5 '12 at 4:07

You can do this with functools.partial:

import functools

def cos_(k, x):
return cos(k * x)

#...
A[k] = integrate(functools.partial(cos_, k), a, b)


Also, Python doesn't require semicolons.

-