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I'm attempting to write a code to find the root of non-linear equations using the false position method.
I'm done with my code, but I still have a problem. For example, if I know that the root is between 5 and 6. so I enter the upper limit as 7 and the lower at 6. I still get the root. I don't understand how the false position method converges even when the two initial guesses are not bracketing the root.

Here is my code:

void main()
{   
    std::cout << "Enter the First Limit: " << std::endl;
    double x1;
    std::cin >> x1;

    std::cout << "Enter The Second Limit: " << std::endl;
    double x2;
    std::cin >> x2;

    std::cout << "\nThe root = " << iteration(x1,x2); << std::endl;
}

double f(double x)
{
  return pow(x,3) - 8*pow(x,2)+12*x-4;
}

// Evaluating the closer limit to the root
// to make sure that the closer limit is the
// one that moves and the other one is fixed

inline bool closerlimit(double u, double l)
{
  return fabs(f(u)) > fabs(f(l)));
}

double iteration(double u, double l)
{
  double s=0;
  for (int i=0; i<=10; i++)
  {
      s = u - ((f(u)*(l-u)) / (f(l)-f(u)));
      if (closerlimit(u,l))
        l = s;
      else
        u = s;
  }

  return s;
}
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2  
void main() is old. Please use int main() instead –  Karl von Moor Apr 25 '11 at 16:46
1  
Do you have a reference for the method you are using? It is different from the "method of false position" mentioned on Mathworld, in which x_1 remains constant throughout the process (unlike your 'u'). –  ShreevatsaR Apr 25 '11 at 16:52
    
Hmm, void main() is not "old" in C++. As far as I know, it's never been consistent with the standard. –  Cody Gray Apr 25 '11 at 16:52
    
@Cody void main() is mainly used in old C++ code. And a modern compiler will give you an error for void main() @AKenawy I've allowed me to make your code a bit shorter so it will be easier to answer. –  Karl von Moor Apr 25 '11 at 16:57
3  
Um, BTW, there is no root of x^3-8x^2+12x-4 between 5 and 6; there is a root between 6 and 7, which is what you're getting. Check your maths. :-) –  ShreevatsaR Apr 25 '11 at 16:57

2 Answers 2

Your function plot and roots:

enter image description here

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guys, i mentioned that right in the question. I know that there is a root between 6 and 7, but if you enter the limits 5 and 6, you will still get your root. I don't know how this happens. I thought that false position doesn't converges unless the limits are bracketing the root. –  AKenawy Apr 25 '11 at 19:39
2  
You say one thing, but mean something else. You clearly said that you knew the root was between 5 and 6 and that you used the interval 6 to 7. Please edit your question to reflect what you really mean. –  ralphtheninja Apr 25 '11 at 21:52

But the interval IS bracketing the root.

share|improve this answer
    
no, f(5) and f(6) are negative, so they are not bracketing the root. It's also apparent from the graph in the first answer –  AKenawy Apr 25 '11 at 19:50
1  
I meant the interval 6 to 7, which you said you were using. Not 5 to 6. –  ralphtheninja Apr 25 '11 at 21:53

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