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I am trying to use the interpolation method in python (not the built-in one) to get the root of a function given an interval.

I have done the following and don't know where I am going wrong, I have done it with bisection and I though the only difference would be the test point.

x1 and x2 are the two ends of the interval, f is the function and epsilon is the tolerance

def interpolation (x1,x2,f,epsilon):
 i = 1
 n = 100
 while i<n:
    m =  (f(x2)- f(x1))/(x2-x1)
    b = f(x2) - m*(x2) 
    p = b
    print (i,p,f(p))
    if f(p) == 0 or b< epsilon:
        print ('The root is at ',p,'after',i,'iterations')
        break
    i+= 1
    if f(x1)*f(p) > 0:           #Equal signs
        x1 = p
    else:
        x2 = p

Running this with f = sin(x^2) simply returns 100 iterations oscillating as follows:

code

  (80, 1.3266674970489443, 0.98214554271216425)
  (81, 1.4900968376899661, 0.79633049173817871)
  (82, 1.3266674970489443, 0.98214554271216425)
  (83, 1.4900968376899661, 0.79633049173817871) 
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1  
Unrelated: Instead of while i<n: and i+=1, you can simply write for i in range(1, n):. Also, p and b are always equal. –  phihag Nov 20 '12 at 18:27
    
"I have done the following and don't know where I am going wrong". Can you at least tell us what is wrong with the behaviour of the code? –  Marcin Nov 20 '12 at 18:28
    
I added it, thanks –  user1778543 Nov 20 '12 at 18:33
    
@user1778543, include the definition of f that you're using and the values you passed to interpolation() which caused this behavior. –  Brian Cain Nov 20 '12 at 18:34
    
Your algorithm looks wrong to me. You are assigning p to one of the x values. But p is the return value of f. So it's in the wrong domain. –  David Heffernan Nov 20 '12 at 18:36

2 Answers 2

up vote 2 down vote accepted

It looks like you are trying to solve this using the secant method. The interpolation method requires three initial values.

I am not quite sure the direction you were going with your code, but I was able to adjust it a bit as following:

i = 1
n = 100
while i<n:
    print x1, x2
    m =  (f(x2)- f(x1))/(x2-x1)
    b = f(x2) - m*(x2) 
    p = -b/m #root for this line

    # are we close enough?
    if abs(f(p)) < epsilon:
        print ('The root is at ',p,'after',i,'iterations')
        break
    i+= 1

    x1 = x2
    x2 = p

It solved it in 4 iterations based on my starting positions of 1,2:

1 2
2 1.52648748495
1.52648748495 1.75820676726
1.75820676726 1.7754676477
('The root is at ', 1.7724406948343991, 'after', 4, 'iterations')
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Thank you, I see that I where I went wrong with the p, though I think it is better if you just point out mistakes rather than give the full answer –  user1778543 Nov 20 '12 at 22:19

In case what you actually want is to solve the problem (instead of developing a solution for exercise), I recommend you to use a ready-made module.

My first choice would be scipy.optimize.bisect() (docs)

This module has other methods, too, like Newton-Raphson, etc.

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I know but I am trying to do it for an exercise ;) –  user1778543 Nov 20 '12 at 18:50

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