Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

Question with integral to be programmed into the function

This is taken from a question paper for Python programming. I have the following code:

import numpy as np
from math import sin, pi

#Part a:
def f(x):
    return 2*x - x**2

def g(p,x):
    return p*sin(pi*x/2)


def hsum(p):
    s = 0
    for i,j in zip(np.arange(0,3,2E-4),np.arange(2E-4,3,2E-4)):
        delx = j - i
        ab = abs(f(i)-g(p,i))
        s += ab*delx
    return s



#print hsum(1)
#print hsum(0)        

#Part b:    
h = hsum(0)   
P = []
Q = []     
for p in np.arange(0,1.1,1E-3):
    k = hsum(p)
    if k<h:
        h = k
        P.append(hsum(p))
        Q.append(p)
print h
print min(P)
g = min(P)
t = P.index(g)
#print t
#print Q
print Q[t]

However, upon running it, the program returns a value of 0.001 for the so-called optimal P. This value should be close to 1 and before 1.1, according to the problem statement.

I thought that there may be a problem with floating points, but any combination I try gives me the same answer. Any suggestions?

EDIT: Using all the suggestions provided, I edited the original code and this one, although rather slow (runtime of 9:58!!), provides the correct answer of 1.071 Thanks for all the help. :D

share|improve this question
    
NumPy isn't going to help you if you don't use any vectorized operations. All you're using it for is arange, and if you're just going to iterate over the range, that doesn't give any advantage over xrange. – user2357112 Aug 11 '13 at 10:06
up vote 0 down vote accepted

In hsum, you reset s to 0 in every loop iteration. You should probably move that up, outside the loop.

In your code to find the best fit, you're appending the p values to P, but you don't keep any information about the quality of the fit. min(P) finds the lowest p, not the one that fits best. Store (p, hsum(p)) tuples and find the minimum by the H(p) values. The min function takes a key argument that can help you with that. (With a bit of simplification, you wouldn't even need to make the tuples.)

share|improve this answer
    
Aah I understand the problem now. However, how exactly can I store the (p, hsum(p)) tuple and then ask the code to return the p corresponding to the smallest hsum(p)? – TopGun Aug 11 '13 at 10:08

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.