# Calculate the power of any exponent (negative or positive)

I want to calculate the result, given any exponent (negative or positive) and a base of type integer. I am using recursion:

``````public static double hoch(double basis, int exponent) {
if (exponent > 0) {
return (basis * hoch(basis, exponent - 1));
} else if (exponent < 0) {
return ((1 / (basis * hoch(basis, exponent + 1))));
} else {
return 1;
}
}
``````

If exponent is negative 1.0 is returned but that is wrong. For e.g. hoch(2,-2) it should be 0.25. Any ideas what could be wrong?

-

`````` }else if(exponent < 0){
return ((1/(basis*hoch(basis, exponent+1))))
``````

should be

`````` }else if(exponent < 0){
return (1/hoch(basis, -exponent));
``````
-
what's the -exponent? why not use exponent-1 –  artworkad シ Dec 6 '10 at 9:03
if you don't increment/decrement the exponent, you'll end up with a stack overflow exception –  Andreas_D Dec 6 '10 at 9:03
oh I mean why not use exponent+1? whats the meaning of -exponent? –  artworkad シ Dec 6 '10 at 9:05
@Andreas_D, no, that's not the case. Since the next recursive call will be with a postive exponent, it will be decremented then. n**(-m) is the same as 1/(n**m) –  Paul Dec 6 '10 at 9:05
@ArtWorkAD, n**(-m) is the same as 1/(n**m) –  Paul Dec 6 '10 at 9:06

Your parentheses are the wrong way around. You want to be multiplying by the result of the recursive call, not dividing by it; and you want the thing you multiply by to be `1/basis` (which "peels off" one negative exponent).

-
``````public static double hoch(double basis, int exponent){
if(exponent > 0){
return basis*hoch(basis, exponent-1);
}else if(exponent < 0){
return hoch(basis, exponent+1)/basis;
}else{
return 1;
}
}
``````

although the more efficient (recursive) solution is

``````public static double hoch(double basis, int exponent){
if(exponent == 0)
return 1;
else{
double r = hoch(basis, exponent/2);
if(exponent % 2 < 0)
return r * r / basis;
else if(exponent % 2 > 0)
return r * r * basis;
else
return r * r;
}
}
``````
-
``````     1 / (-2 * (1 / (-1 * (1 / 1)))