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# C - finding cube root of a negative number with pow function

In real world cube root for a negative number should exist: `cuberoot(-1)=-1`, that means `(-1)*(-1)*(-1)=-1` or `cuberoot(-27)=-3`, that means `(-3)*(-3)*(-3)=-27`

But when I calculate cube root of a negative number in C using `pow` function, I get `nan` (not a number)

``````double cuber;
cuber=pow((-27.),(1./3.));
printf("cuber=%f\n",cuber);
``````

output: `cuber=nan`

Is there any way to calculate cube root of a negative number in C?

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7.12.7.1 The `cbrt` functions

Synopsis

``````#include <math.h>
double cbrt(double x);
float cbrtf(float x);
long double cbrtl(long double x);
``````

Description

The `cbrt` functions compute the real cube root of `x`.

If you're curious, `pow` can't be used to compute cube roots because one-third is not expressible as a floating-point number. You're actually asking `pow` to raise `-27.0` to a rational power very nearly equal to 1/3; there is no real result that would be appropriate.

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`pow` can be used to compute cube roots of positive numbers. – Steve Jessop Dec 13 '11 at 17:08
@SteveJessop: `pow` can be used to compute the `0.333333333333333314829616256247390992939472198486328125`th power of a positive number, which is often (but not always) the same as the cube root after rounding. – Stephen Canon Dec 13 '11 at 17:09
It's as close as the C standard guarantees `cbrt` to be (which is no guarantee at all). IEEE 754 might have something else to say, though, if it guarantees the accuracy of `cbrt`. – Steve Jessop Dec 13 '11 at 17:11
@SteveJessop: Right. I'm not suggesting that you should use `cbrt` for accuracy. You should use it for speed on some platforms, but the real reason to use it is because it gives you "the answer you want" for negative inputs -- `pow` can't do that, because there is no real 0.333333333333333314829616256247390992939472198486328125th power of a negative number. – Stephen Canon Dec 13 '11 at 17:13
I definitely agree with the last part, the reason the questioner should use it is that it accepts negative inputs. It's not in C89 though, and I suspect not on MSVC, so that's the only possible reason not to use it. – Steve Jessop Dec 13 '11 at 17:14

there is. Remember: x^(1/3) = -(-x)^(1/3). So the following should do it:

``````double cubeRoot(double d) {
if (d < 0.0) {
return -cubeRoot(-d);
}
else {
return pow(d,1.0/3.0);
}
}
``````

Written without compiling, so there may be syntax errors.

Greetings, Jost

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Using Newton's Method:

``````def cubicroot(num):
flag = 1
if num < 0:
flag = -1
num = num - num - num
x0 = num / 2.
x1 = x0 - (((x0 * x0 * x0) - num) / (3. * x0 * x0))
while(round(x0) != round(x1)):
x0 = x1
x1 = x0 - (((x0 * x0 * x0) - num) / (3. * x0 * x0))
return x1 * flag

print cubicroot(27)
``````
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he is using python – dns Dec 26 '13 at 20:20

As Stephen Canon answered, to correct function to use in this case is cbrt(). If you don't know the exponent beforehand, you can look into the cpow() function.

``````
#include <stdio.h>
#include <math.h>
#include <complex.h>

int main(void)
{
printf("cube root cbrt: %g\n", cbrt(-27.));
printf("cube root pow: %g\n", pow(-27., 1./3.));
double complex a, b, c;
a = -27.;
b = 1. / 3;
c = cpow(a, b);
printf("cube root cpow: (%g, %g), abs: %g\n", creal(c), cimag(c), cabs(c));
return 0;
}
```
```

prints

```cube root cbrt: -3
cube root pow: -nan
cube root cpow: (1.5, 2.59808), abs: 3
```

Keep in mind the definition of the complex power: cpow(a, b) = cexp(b* clog(a)).

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