# What is wrong with my logic for finding square root by Newton's Method?

I wrote the following code for finding square root by Newton's method by successive approximations but its not giving me the right answer.Can someone please explain it?

``````#include<stdio.h>
#include<stdlib.h>
#define square(x) x*x
double rootByNewtonApprox(int n);
double improve(double n);
double average(double a,double b);
int goodEnough(double guess);
double guess(int n);
int number;
int main(void)
{

double root;
printf("\nEnter the number you want square root of: ");
scanf("%d",&number);
if(number<0)
number = -1* number;
root = rootByNewtonApprox(number);
printf("\nThe square root of %d is %lf\n",number,root);
return 0;
}
double guess(int n)
{
return n/2;
}
double rootByNewtonApprox(int n)
{
if(goodEnough(guess(n)))
return guess(n);
else
rootByNewtonApprox(improve(guess(n)));
}

double improve(double guess)
{
return average(guess,(number/guess));
}
double average(double a,double b)
{
return ((a+b)/2);
}
int goodEnough(double guess)
{
if(abs(square(guess) - number) <= 0.001)
return 1;
else
return 0;
}
``````

Now when I give `n = 2` it gives the ouput `nan` and when I give `n = 9` it tells `segmentation Fault`.

-
See @J.S. Taylor's answer below for the code. What you're running into is integer division (which disallows remainders) so some of your functions are not returning the correct floating point values. –  Tieson T. Apr 30 '11 at 6:19

``````double guess(int n)
{
return  n / (double) 2;
}
``````
-
Or casting `n` to a double works as well. –  Tieson T. Apr 30 '11 at 6:17
Or dividing by 2.0 rather than 2. –  mu is too short Apr 30 '11 at 6:19

You forgot one `return`

``````double rootByNewtonApprox(int n)
{
if(goodEnough(guess(n)))
return guess(n);
else
return rootByNewtonApprox(improve(guess(n)));
^
}
``````
-
sir,after making all the above said changes still no ouput just `segmentation Fault` is staring at my face! –  user567797 Apr 30 '11 at 7:05
I saw no reason to repeat what J.S. Taylor pointed out. So I added the reason to your second problem - `n=2` returns nan. –  MByD May 1 '11 at 5:57