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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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4 Answers 4

up vote 11 down vote accepted

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
3  
@SteveJessop: pow can be used to compute the 0.333333333333333314829616256247390992939472198486328125th 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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