# power of an integer in c++

I need to get the result from `pow(a,b)` as an integer (both a and b are integers too). currently the calculations where `(int) pow( (double)a, (double)b)` is included are wrong. Maybe someone can help with a function that does the pow(a,b) with integers and returns an integer too?

But here is the odd part: I made my script in Linux with Geany (and g++/gcc compiler) and had just `pow(a,b)` the script compiled and worked fine. But in university I have Dev-C++ (and MS Windows). In Dev-C++ the script didn't compile with an error `[Warning] converting to `int' from `double'`

I need to make this scrpit work under Windows (and Mingw compiler) too.

-skazhy

-
What's wrong about it? –  Budric Oct 1 '09 at 18:36
A "Warning" is not an "Error". Technically, the C++ standard doesn't know either; it only knows "diagnostics". But while the standard requires diagnostics in certain cases, compiler vendors are free to add more when they think something is fishy. However, that doesn't mean that, if you untended to do something fishy, you're forbidden to do so. Just ask yourself why you do so. (Oh, and the cast should be a `static_cast`. This is tagged C++, after all.) –  sbi Oct 1 '09 at 20:18

A nice recursive approach you can show off:

``````int myPow(int x, int p) {
if (p == 0) return 1;
if (p == 1) return x;
return x * myPow(x, p-1);
}
``````
-
Linear complexity, dunno if it is worse than the for loop or not :x –  Matthieu M. Oct 1 '09 at 18:54
Cool, I had no idea the answer to 4^(-2) was "Maximum recursion depth exceeded" (I'm just kidding :p, but it's not hard to add the negative case also) –  Falaina Oct 1 '09 at 18:56
It is worse because it has the same behavior as a for loop plus the function call overhead. –  Jodi Oct 1 '09 at 18:58
@Falaina: whatever the answer to 4^(-2) is, it's not an integer, so negative exponents are not valid inputs. Next you'll be expecting `operator/` to give a sensible answer with operand 0... –  Steve Jessop Oct 1 '09 at 20:25
If you're going to show off with a nifty recursive implementation, at least make it use the O(log(N)) algorithm, and make it tail recursive. –  Stephen Canon Oct 1 '09 at 23:11
show 6 more comments

Binary powering, aka exponentiation by squaring.

``````int powi (int base, unsigned int exp)
{
int res = 1;
while (exp) {
if (exp & 1)
res *= base;
exp >>= 1;
base *= base;
}
return res;
}
``````

Note that this returns 1 for powi(0,0).

-

Why linearly? Try it logarithmic!!

``````long long powx( int val, int exp )
{
long long actual = val;
long long prod = 1;
int i;

for ( i = 0; i < 32; i++ )
{
if ( exp & 0x1 )
{
prod *= actual;
}

exp >>= 1;

actual *= actual;
}

return prod;
}
``````
-

Mostly in reply to Zeds simple recursion...

Why is recursion assumed better than iteration? Especially in C++. What's wrong with...

``````int myPow (int x, int p) {
int i = 1;
for (int j = 1; j <= p; j++)  i *= x;
return i;
}
``````

I'm not saying your answer is wrong or in any way worse - it's just that I got the impression you think it's good because it's recursive. IMO, in C++ particularly, that bias can lead to slow and even broken programs. Slow programs because you're growing a huge stack, causing cache and virtual memory paging. Broken programs because you get a stack overflow where an iterative solution would work.

Some would look at your answer and think it's tail recursive and would be optimised into iteration anyway. Of course that's not true - after each recursive call exits, there is a multiply still to do, so it is not tail recursive. The thing is, in C++, there are a lot of more subtle things that prevent tail recursion optimisations - even if the compiler does them at all. For example...

``````void myrecurse (plan *p)
{
plan i;
i.prev = p;
//  more plan setup, checks, and special case handling

myrecurse (&i);
}
``````

In this case, all the "plan" instances must remain on the stack. Therefore, stack frames cannot be discarded. Therefore this is not optimizable into iteration, even though there are precisely zero operations done after the recursive call. Not even hidden operations like destructor cleanups, since plan is assumed to be a POD struct.

Incidentally, this is based on something I've done in real code - a data structure operation that is planned during the recursion, but nothing is changed in the original nodes until the recursion reaches the root/leaf, all new nodes needed have been successfully allocated, all locks acquired, and there's no curruption to make worse. At that point, an iteration is done through that linked list of plan instances to commit the changes - the logic was clearer as an iteration than being broken up into fragments relating to the unwinding of the recursive calls.

The point here obviously isn't to claim that recursion is automatically bad. It just makes me nervous when people seem to assume recursion is better than iteration by default.

-
shouldn't it be j <= p in myPow? otherwise for the case of p = 1 you return 1 and not x, which is not correct. –  Max DeLiso Mar 19 '13 at 19:08
@user931794 - You're right - hopefully it's correct now. –  Steve314 Mar 20 '13 at 8:43
You made some great points about recursion; I think that people who have a solid theory background tend to prefer recursive implementations, and those people also tend write higher quality code, but it is wrong to infer that recursion is always "better". Tail call optimization may fail unless you're aware of how it works and know how to check if it's been applied. In the end it's a trade-off between elegance and maybe some stack space. –  Max DeLiso Mar 20 '13 at 13:38
@user931794 - I think that's a classic case of though A and B are correlated that doesn't prove A causes B, with C (the solid theory background) as a probable common cause. Personally, I think the real issue is that some problems are naturally recursive and others naturally iterative, and then there's my favourites which don't care. For example, the solution could use classic functional list operations (`map`, `filter`, `fold` etc) so the choice of iteration vs. recursion (vs. multicore/distributed implementations etc) is abstracted away. –  Steve314 Mar 21 '13 at 7:10
naive non tail recursive: `(define (pow1 x n) (if (= n 0) 1 (* x (pow1 x (- n 1)))))` tail recursive: `(define (pow2 x n) (letrec ((powRec (lambda (k acc) (if (= k 0) acc (powRec (- k 1) (* x acc)))))) (powRec n 1)))` higher order: `(define (pow3 x n) (fold-left (lambda(a b) (* a b)) 1 (make-list n x)))` –  Max DeLiso Mar 21 '13 at 16:33
show 2 more comments

Wouldn't a tail-recursive function be best? Something like:

``````int myPow_helper(int x, int p, int result) {
if (p == 0) {
return result;
} else {
return myPow_helper(x, p-1, result*x);
}
}

int myPow(int x, int p) {
return myPow_helper(x, p, 1);
}
``````
-

Or you could use a litte bit of template metaprogramming :)

``````template<int X, int P>
struct Pow
{
enum { result = X*Pow<X,P-1>::result };
};
template<int X>
struct Pow<X,0>
{
enum { result = 1 };
};
template<int X>
struct Pow<X,1>
{
enum { result = X };
};

int main()
{
std::cout << "pow(3,7) is " << Pow<3,7>::result << std::endl;
return 0;
}
``````

This code has the best complexity, O(1), because the evaluation will happen at compile time. Of course this will only work with integer values. However, this function is is only provided for completeness (and fun).

-
I also must admit, that this will not work with older c++ compilers... –  fmuecke Oct 1 '09 at 22:32
But its still pretty awesome solution :) –  Nick Bedford Oct 1 '09 at 22:45
+1 for awesome metaprogramming, but -1 because it still linear in P. –  nibot Oct 5 '12 at 14:49
A newb question: why is the result an enum and not some integer type explicitly? –  Grzenio Feb 19 '13 at 15:33
@Grzenio Because using template metaprogramming you need to define a different type for each possible power that will be recursively computed during compilation. In this case, to compute 3^7, the compiler will generate the types Pow<3,1>, Pow<3,2>, ..., up to Pow<3,7>, and each of those structs will contain an enum storing the value of 3^1, 3^2, ... and 3^7. Hence, accessing Pow<3,7>::result is later O(1) during execution. There lies the magic of template metaprogramming. –  Auron Mar 12 '13 at 19:40

C++ standard doesn't have `int pow(int, int)` (It has `double pow(double, int)`, `float ...`). Microsoft's cmath uses C math.h that has not ipow. Some cmath headers define template version of `pow`.

``````\$ cat main.cpp
#include <cmath>

int main() {
std::pow(2,2);
}

\$ gcc main.cpp # this cmath has template pow
...snip... std::pow<int, int>(int, int)]+0x16): undefined reference to `pow'
collect2: ld returned 1 exit status
1 ;( user@host:
\$ gcc main.cpp -lm
``````

Search for function:ipow lang:c++ on Google Code .

Here's example from the first link:

``````template <typename Type1, typename Type2>
Type1 ipow(Type1 a, Type2 ex)
// Return a**ex
{
if ( 0==ex )  return 1;
else
{
Type1 z = a;
Type1 y = 1;
while ( 1 )
{
if ( ex & 1 )  y *= z;
ex /= 2;
if ( 0==ex )  break;
z *= z;
}
return y;
}
}
``````
-

A better recursive approach than Zed's, don't know why you failed so closed Zed :x

``````int myPow(int x, int p)
{
if (p == 0) return 1;
if (p == 1) return x;

int tmp = myPow(x, p/2);
if (p%2 == 0) return tmp * tmp;
else return x * tmp * tmp;
}
``````

Much better complexity there O(log²(p)) instead of O(p). I should add that this really is a classic...

-
Does it cope with negative p? –  Loki Astari Oct 1 '09 at 19:17
@Martin: of course not, it's Savagely Optimized™ –  John Millikin Oct 1 '09 at 19:33
Of course you could extend it to if (p == 2) return x * x; if (p == 3) return x * x * x; ... up to 2^32 –  Zed Oct 1 '09 at 19:33
Choosing the correct algorithm is never a premature optimization, especially when the algorithm is (a) so simple and (b) printed in Knuth. There is no excuse for not knowing and using this particular algorithm. –  Stephen Canon Oct 1 '09 at 23:12
@Zed - don't be silly - that should be a switch statement ;-) –  Steve314 Oct 2 '09 at 0:26
show 3 more comments

Instead of casting the double to an int in the `(int) pow((double)a, (double)b)` line, try rounding the results of pow, and then cast to int if necessary.

It's probably one of those floating point problem when you truncate, especially if your result's off by one.

-
Then, look in your textbook for how to multiply numbers in C. You'll want to use a `for` loop.