# Square root in C using Newton-Raphson method

In the following code, I want to replace the termination condition to: if the ratio of guess square and x is close to 1, while loop should terminate. I tried various expressions, but none run the code properly. any suggestion?

``````# include<stdio.h>
float absolute(float x)
{
if (x < 0)
x = -x;
return x;
}

float square(float x)
{
float guess = 1;

while(absolute(guess*guess - x) >= 0.0001 )
guess = ((x/guess) + guess) / 2;

return guess;
}

int main(void)
{
printf("square root of 2 is %f\n", square(2));
printf("square root of 3 is %f\n", square(3));
return 0;
}
``````
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Don't reinvent the wheel. There's a `fabsf()` function in `<math.h>`. –  user529758 Dec 26 '12 at 9:30
@H2CO3 there's also `std::abs` in `<cmath>`. –  rubenvb Dec 26 '12 at 10:00
@rubenvb The questions is tagged C. –  Pascal Cuoq Dec 26 '12 at 11:04
@PascalCuoq oh wow. Sorry :) –  rubenvb Dec 26 '12 at 11:06

hit the answer: while statement should be like this:

`````` while  ( absoluteValue((guess * guess) / x  - 1.0) >= 0.0001 )
``````
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``````# include<stdio.h>

double sq_root(double x)
{
double rt = 1, ort = 0;
while(ort!=rt)
{
ort = rt;
rt = ((x/rt) + rt) / 2;
}
return rt;
}

int main(void)
{
int i;
for(i = 2; i<1001; i++) printf("square root of %d is %f\n",i, sq_root(i));
return 0;
}
``````
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if the ratio of guess square and x is close to 1

Then why are you subtracting? Use ratio operator:

``````while(absolute( (guess*guess) / x - 1) >= 0.0001 )
``````
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your suggestion sent me into infinity! it didn't work.. –  user1825355 Dec 26 '12 at 9:32
should't be `fabs(guess*guess / x - 1) >= 0.0001`? –  Kotte Dec 26 '12 at 9:37
@Kotte: yes, that happens while racing to post answer. –  Azodious Dec 26 '12 at 9:52

It's possible you can't reach that guess*guess will be enough close to x; imagine e.g. sqrt of 2e38 - every approximation will be no closer than ~1e31 and your exit condition won't ever succeed.

The variant good for all cases is that stopping for this method occur when guess stops to change. So you would write something like

``````prev_guess = 0; // any initial value is ok
while (guess != prev_guess) {
...
prev_guess = guess;
}
``````

at least it shall work for any IEEE754-compatible implementation not reaching overflow or underflow.

Also you can compare guess and prev_guess for difference (as soon as the goal is usually to match enough accuracy of root, not the value squared back).

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