# Divide integer by 16 without using division or cast

OKAY... let me rephrase this question...

How can I obtain x 16ths of an integer without using division or casting to double....

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What is the type of frac? If it's an int, then if frac is 2, res will be 0 for any value of ref. –  Jon Skeet Dec 31 '10 at 17:24
@Jon, I'd go by the text, not the code which is an (incorrect) first pass, I think –  Paul Dec 31 '10 at 17:25
Have you tried "int res = (ref >> 4) * frac" ? –  DwB Dec 31 '10 at 17:25
@dwb - that will give 0 for ref between 0 and 15. Probably not what was intended. –  Paul Dec 31 '10 at 17:26
I think what Jon means by working is int res = (ref * frac)/16. The adaption is to turn the /16 into >> 4 –  Paul Dec 31 '10 at 17:28

int res = (ref * frac) >> 4


(but worry a a bit about overflow. How big can ref and frac get? If it could overflow, cast to a longer integer type first)

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In any operation of such kind it makes sense to multiply first, then divide. Now, if your operands are integers and you are using a compileable language (eg. C), use shr 4 instead of /16 - this will save some processor cycles.

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Assuming everything here are ints, any optimizing compiler worth its salt will notice 16 is a power of two, and shift frac accordingly -- so long as optimizations are turned on. Worry more about major optimizations the compiler can't do for you.

If anything, you should bracket ref * frac and then have the divide, as any value of frac less than 16 will result in 0, whether by shift or divide.

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It's possible the OP isn't using C (etc) as the implementation language but is asking more generally. There were no language-specific tags. –  Paul Dec 31 '10 at 17:30
Language is immaterial, only the number of values a bit can hold. If you want, real "compiler" as "compiler or interpreter" because honestly, a good dynamic language interpreter should notice the same things about primitive number types, IMO. –  Chris Charabaruk Dec 31 '10 at 17:32
Only if it can prove that the values are always numbers, really. If it has to check at runtime, the overhead of checking probably outweighs any possible optimization. –  Karl Knechtel Dec 31 '10 at 18:15

You can use left shift or right shift:

public static final long divisionUsingMultiplication(int a, int b) {
int temp = b;
int counter = 0;
while (temp <= a) {
temp = temp<<1;
counter++;
}
a -= b<<(counter-1);
long result = (long)Math.pow(2, counter-1);
if (b <= a) result += divisionUsingMultiplication(a,b);
return result;
}

public static final long divisionUsingShift(int a, int b) {
int absA = Math.abs(a);
int absB = Math.abs(b);
int x, y, counter;

long result = 0L;
while (absA >= absB) {
x = absA >> 1;
y = absB;
counter = 1;
while (x >= y) {
y <<= 1;
counter <<= 1;
}
absA -= y;
result += counter;
}
return (a>0&&b>0 || a<0&&b<0)?result:-result;
}

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I don't understand the constraint, but this pseudo code rounds up (?):

res = 0
ref= 10
frac = 2
denominator = 16
temp = frac * ref
while temp > 0
temp -= denominator
res += 1
repeat
echo res

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And probably takes the prize for the slowest implementation. Consider frac = 2, ref = MAXINT/2. It also has the overflow issues of the other solutions –  Paul Dec 31 '10 at 18:37
Hey, I think the whole thing is ill advised! :) Is there a real-world reason for the constraint of no division? –  horatio Dec 31 '10 at 18:39
Division on the platform I work on is about 25 times slower than addition/subtraction/shift and about 10 times slower than multiplication. For some applications there is enough code doing division in the hot path to try to find alternatives. –  Chuu Jun 28 '12 at 19:22