# pow() seems to be out by one here

What's going on here:

``````#include <stdio.h>
#include <math.h>
int main(void) {
printf("17^12 = %lf\n", pow(17, 12));
printf("17^13 = %lf\n", pow(17, 13));
printf("17^14 = %lf\n", pow(17, 14));
}
``````

I get this output:

``````17^12 = 582622237229761.000000
17^13 = 9904578032905936.000000
17^14 = 168377826559400928.000000
``````

13 and 14 do not match with wolfram alpa cf:

``````12: 582622237229761.000000
582622237229761

13: 9904578032905936.000000
9904578032905937

14: 168377826559400928.000000
168377826559400929
``````

Moreover, it's not wrong by some strange fraction - it's wrong by exactly one!

If this is down to me reaching the limits of what `pow()` can do for me, is there an alternative that can calculate this? I need a function that can calculate `x^y`, where `x^y` is always less than ULLONG_MAX.

-
yes but exactly one? –  trideceth12 Jan 30 '14 at 9:45
Fun fact: this loop does not terminate: `for (float f = 0; f < INT_MAX; f++) { }` –  ntoskrnl Jan 30 '14 at 12:59
The `l` in `%lf` does not do anything. You are printing `double`s, and if your compilation platforms maps `double` to IEEE 754's double-precision format, you will never print `9904578032905937.0` this way, as there is no such double-precision number. –  Pascal Cuoq Jan 30 '14 at 14:36
@ntoskrnl: might not terminate. It did on Crays and systems where `int` was 16 bits. –  MSalters Jan 30 '14 at 15:07

`pow` works with `double` numbers. These represent numbers of the form s * 2^e where s is a 53 bit integer. Therefore `double` can store all integers below 2^53, but only some integers above 2^53. In particular, it can only represent even numbers > 2^53, since for e > 0 the value is always a multiple of 2.

17^13 needs 54 bits to represent exactly, so e is set to 1 and hence the calculated value becomes even number. The correct value is odd, so it's not surprising it's off by one. Likewise, 17^14 takes 58 bits to represent. That it too is off by one is a lucky coincidence (as long as you don't apply too much number theory), it just happens to be one off from a multiple of 32, which is the granularity at which `double` numbers of that magnitude are rounded.

For exact integer exponentiation, you should use integers all the way. Write your own `double`-free exponentiation routine. Use exponentiation by squaring if `y` can be large, but I assume it's always less than 64, making this issue moot.

-
@trideceth12 That is the obvious way you should be doing. And it's too simple to constitute reinventing the wheel. Given that you're constrained into the range of a 64 bit integer and `x` and `y` are integers, there are neither precision issues to solve nor big performance challenges that call for sophisticated algorithms (10, 20 or even 60 multiplications are cheap, cheaper than any I/O for example). –  delnan Jan 30 '14 at 9:58
A bit of modular arithmetic: 17 % 16 = 1, so 17^n % 16 = 1 (meaning the four least significant bits in the binary representation of 17^n will always be 0001). –  tom Jan 30 '14 at 10:10
@tom That's what I meant by applying too much number theory +1 Though it's not a full explanation, as it needs to be 1 (as opposed to 17) modulo 32 to be off by one. There probably isn't much of a pattern though, 17^15 is more-than-one off. –  delnan Jan 30 '14 at 10:22
@delnan I missed 17^14 having five truncated bits. But 17^2 % 32 = 1, so 17^14 % 32 = (17^2)^7 % 32 = 1. –  tom Jan 30 '14 at 10:40
@trideceth12 There is the square-and-multiply algo which has runtime logarithmic in the exponent instead of linear. –  CodesInChaos Jan 30 '14 at 16:00

The numbers you get are too big to be represented with a `double` accurately. A double-precision floating-point number has essentially 53 significant binary digits and can represent all integers up to `2^53` or 9,007,199,254,740,992.

For higher numbers, the last digits get truncated and the result of your calculation is rounded to the next number that can be represented as a `double`. For `17^13`, which is only slightly above the limit, this is the closest even number. For numbers greater than `2^54` this is the closest number that is divisible by four, and so on.

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Ahh.. the closest even number makes sense –  trideceth12 Jan 30 '14 at 9:47

If your input arguments are non-negative integers, then you can implement your own `pow`.

Recursively:

``````unsigned long long pow(unsigned long long x,unsigned int y)
{
if (y == 0)
return 1;
if (y == 1)
return x;
return pow(x,y/2)*pow(x,y-y/2);
}
``````

Iteratively:

``````unsigned long long pow(unsigned long long x,unsigned int y)
{
unsigned long long res = 1;
while (y--)
res *= x;
return res;
}
``````

Efficiently:

``````unsigned long long pow(unsigned long long x,unsigned int y)
{
unsigned long long res = 1;
while (y > 0)
{
if (y & 1)
res *= x;
y >>= 1;
x *= x;
}
return res;
}
``````
-
The recursive version is useless because it doesn't reuse the answer. One recursive call is sufficient: `root = y ? pow(x, y / 2) : 1; return root * root * (y&1 ? x : 1);` –  tom Jan 30 '14 at 10:32
@chux: Just noticed that missing `if (y == 1)`... I can't believe it's been there for so long without me noticing it. Thanks a lot!!!!! :) –  barak manos Aug 26 '14 at 17:19
@tom Right you are. Missed the "eventually multiplies by pow(0, 1)". –  chux Sep 6 '14 at 14:39

A small addition to other good answers: under x86 architecture there is usually available x87 80-bit extended format, which is supported by most C compilers via the `long double` type. This format allows to operate with integer numbers up to `2^64` without gaps.

There is analogue of `pow()` in `<math.h>` which is intended for operating with `long double` numbers - `powl()`. It should also be noticed that the format specifier for the `long double` values is other than for `double` ones - `%Lf`. So the correct program using the `long double` type looks like this:

``````#include <stdio.h>
#include <math.h>
int main(void) {
printf("17^12 = %Lf\n", powl(17, 12));
printf("17^13 = %Lf\n", powl(17, 13));
printf("17^14 = %Lf\n", powl(17, 14));
}
``````

As Stephen Canon noted in comments there is no guarantee that this program should give exact result.

-
(a) The length modifier for `long double` is `L`, not `ll`. (b) There’s no guarantee that `powl` delivers a sub-ulp accurate result (which is necessary for this to give the “right” answer); on some platforms it doesn’t. –  Stephen Canon Jan 30 '14 at 20:25
@StephenCanon (a) `llf` is nonstandard variant, it is my error, thank you. (b) Of course you are right, but I didn't write that this program would give correct results. –  Constructor Jan 30 '14 at 20:36
I'd even point out that `powl` gives wildly wrong results on many implementations. –  tmyklebu Jan 30 '14 at 20:56
@tmyklebu Even if CPU supports x87 instruction set? –  Constructor Jan 30 '14 at 21:06
Thanks for the tip.. I have a reasonably extensive unit testing suite (which is what turned up the original problem), So It's good to have another option - and if it passes my tests it works perfectly every time for every possible input, right? ;) –  trideceth12 Jan 31 '14 at 4:37