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Given an integer x, how would you return an integer y that is lower than or equal to x and a multiple of 64?

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6 Answers 6

up vote 16 down vote accepted

Simply and it with the bit inversion of (64-1):

x = x & ~63
// 64  is 000...0001000000
// 63  is 000...0000111111
// ~63 is 111...1111000000

This basically clears out the lower six bits which is the same as rounding it down to a multiple of 64. Be aware that this will round towards negative infinity for negative numbers, not towards zero, but that seems to be what your question requires.

You can see the behaviour here in this multiple-of-four variant:

#include <stdio.h>
int main (void) {
    int i;
    for (i = -10; i <= 10; i++) {
        printf ("%3d -> %3d\n", i, i & ~3);
    }
    return 0;
}

This produces:

-10 -> -12
 -9 -> -12
 -8 ->  -8
 -7 ->  -8
 -6 ->  -8
 -5 ->  -8
 -4 ->  -4
 -3 ->  -4
 -2 ->  -4
 -1 ->  -4
  0 ->   0
  1 ->   0
  2 ->   0
  3 ->   0
  4 ->   4
  5 ->   4
  6 ->   4
  7 ->   4
  8 ->   8
  9 ->   8
 10 ->   8

Keep in mind this only works for powers of two (like 26 = 64) and two's complement (the ISO standard doesn't mandate that representation - see here for details - but I've never seen an C environment that doesn't use it and I've worked on systems from the puniest 8051 to the largest mainframes). If you want to use any other number for the divisor, you should probably use the proper math functions like floor.

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Hey, does this work on signed ints? –  Plynx May 5 '10 at 2:09
    
Great hack............. –  aviraldg May 5 '10 at 2:13
    
Thanks for specifying--love this answer though! –  Plynx May 5 '10 at 2:15
    
If you're assuming two's complement, you can just use x & -64 (not that there's any difference, but I find it more intuitive personally). –  Stephen Canon May 5 '10 at 3:34

Where x is the number you wish to round down to the nearest multiple of n, the method that you need is:

floor(x / n) * n

which you can implement really nicely in C++ (as opposed to C):

int n = 5;
for (int x = 0; x < 100; x++)
    cout << x << " -> " << (x / n) * n << endl;
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Right way to do it, however if you're dealing with a small, finite set of y, then a hard coded approach would be more efficient (eg. List allocators, etc.) –  aviraldg May 5 '10 at 2:06
3  
cout << x << " -> " << (x / n) * n << end; isn't C, my friend. –  Chris Lutz Nov 4 '10 at 4:09
    
Thanks @Chris Lutz. I'd better change that. –  icio Nov 11 '10 at 16:40

(x >> 6) << 6
First shifting 6 bits right, then left - lower bits filled with nulls.
No problems with sign

EDIT : I think most compilers will optimize x / 64 * 64 (and any divide / multiply with small powers of 2) to the same code, so there is no actual need in such bit magic, until you want your code to look really cool :)

(And AndreyT thinks there are even better optimizations for straightforward code, read comments to his post)

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That's actually pretty damned slick, you must work in C proper often enough, huh? –  jcolebrand May 5 '10 at 3:49
    
@drachenstern: PL/SQL, actually :) Just dreaming of C or C++ job –  Alexander Malakhov May 5 '10 at 3:53
    
lol, hmmm, whatashame. Guess it pays to keep in practice huh? –  jcolebrand May 5 '10 at 4:13
    
@drachenstern: of course its worth it. Because you can feel yourself incredibly smart inside PL/SQL community :) –  Alexander Malakhov May 5 '10 at 5:16

Assuming that you need the nearest such integer and that you are working with positive numbers:

x = x / 64 * 64;

Various bit hacks look intreresing, but there's absolutely no need for them in this specific case.

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Except bit hacks are shown to be faster than division most every time. And compilers usually optimize power of 2 MULT DIVs (for low powers of 2) into shifts where reasonable. –  jcolebrand May 5 '10 at 4:11
3  
@drachenstern: No, bit hacks are only faster when the precise intent is not expressible by means of the language. In this particular case any good compiler should generate the most efficient code, and if it happens to be a "bit hack", then the compiler should use it, not the author of the source code. And no, mul/div is not necessarily optimized into shifts - this is an old urban legend. They are normally optimized into the most efficient operation appropriate in each case, which could be a shift or something else. In fact, it is rarely a shift these days. –  AndreyT May 5 '10 at 5:12
1  
And, finally, by using a bit hack at the level of source code you are actually reducing the chances of efficient optimization taking place. In other words, for straightforward cases like this, bit hack are shown to be generally slower, not faster as you seem to be mistakenly believing. –  AndreyT May 5 '10 at 5:13
1  
@Alexander Malakhov: I don't have any dedicated and/or exhaustive links handy. Just by looking at the assembly code generated by modern compiler one can see that, for example, on x86 platform integer multiplication by a constant is usually translated into a lea operation, not into shifts. Like, multiplying something by 3 would turn into lea eax, [eax * 2 + eax] and so on. Multiplication by 4 simply turns into a lea eax, [eax * 4] since it is more efficient than a shift. –  AndreyT May 5 '10 at 5:43
1  
@drachenstern: Don't get me wrong. You will see shifts used to optimize arithmetic operations. They are not useless. All I'm saying is that the compiler's choice is not even remotely limited to shifts and explicit mul/div. The compiler has a lot more options these days, some of which could be more efficient than a shift. For this reason, trying to "force" a compiler to use some specific machine instructions by obfuscating your intent with a bit hack is counterproductive more often than not. –  AndreyT May 5 '10 at 16:12
int y = x;
while ( y % 64 )
    y--;
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For unsigned ints

return 0

For signed ints

return floor(-MAXINT/64)*64

;-)

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Funny, but humour should probably best be put in comments lest you risk the wrath of the downvote police :-) –  paxdiablo May 5 '10 at 2:12
    
It's actually a factually correct answer. And it works better than some other responses that would fail when given negatives or -MAXINT. Still, perhaps OP meant to specify greatest integer that meets the aforementioned requirements :) –  Plynx May 5 '10 at 2:13
    
It depends on how you parse the question. The precedence of logical operators in natural languages is usually a bit different ;) –  Georg Fritzsche May 5 '10 at 2:17
5  
"It's actually a factually correct answer" - remind me to never leave you alone with a customer during requirements gathering phase :-) –  paxdiablo May 5 '10 at 2:20
    
@Plynx: The question did say "nearest" (in the title) –  Ben Voigt Sep 18 '11 at 23:44

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