int x = n / 3; // < make this faster
// for instance
int a = n * 3; // < normal integer multiplication
int b = (n << 1) + n; // < potentially faster multiplication
The guy who said "leave it to the compiler" was right, but I don't have the "reputation" to mod him up or comment. I asked gcc to compile int test(int a) { return a / 3; } for an ix86 and then disassembled the output. Just for academic interest, what it's doing is roughly multiplying by 0x55555556 and then taking the top 32 bits of the 64 bit result of that. You can demonstrate this to yourself with eg:
$ ruby e 'puts(60000 * 0x55555556 >> 32)' 20000 $ ruby e 'puts(72 * 0x55555556 >> 32)' 24 $
The wikipedia page on Montgomery division is hard to read but fortunately the compiler guys have done it so you don't have to.

11This is easier to understand if you just call it "the reciprocal, stored in fixedpoint" Feb 4 '14 at 1:04

This isn't Montgomery division, It's more like the idea behind Barrett reduction. Sep 22 '17 at 3:01

This is by far the best answer, in my opinion. And I love how easy it is to choose the precision. For example, I needed one that worked on an 8bit input. It was simple: (x * 0x56) >> 8; Feb 28 '20 at 19:27

@AlltheRage
(x * 0x56) >> 8
is not a good choice for 8 bit input. For example, 251*86/256 = 84 which doesn't sound right.– jpalecekApr 12 '20 at 17:39 
1I guess I misspoke because my number range is really only 6 bits, but are stored in 8. To make it work for all 8 bit numbers, just choose more precision. This works, for example: (x * 0x556) >> 12 Apr 13 '20 at 20:08
This is the fastest as the compiler will optimize it if it can depending on the output processor.
int a;
int b;
a = some value;
b = a / 3;


3turns out regardless of some value being known the compiler will optimize it to something similar to n * 0x55555556 >> 32 thanks Oct 5 '08 at 2:43

1

2If
a
is a signed type, but is known to be positive,(unsigned)a/3
will likely be faster because when dividing a signed type the compiler will add extra code to ensure that negative values yield a truncatetowardzero result rather than the naturallycomputed floored division result.– supercatNov 13 '13 at 21:44 
7I feel like answers such as "let the compiler do it" are too flippant because in this age most of the people who would ask a question like this are compiler writers, hardware designers, or people who have found that the compiler did a crappy job. Basically we should have respect for the people who post questions on here. They generally need an answer with lots of thinking behind it. (Although I acknowledge that giving all of the potentially good answers, including the flippant, can be even more helpful.) Feb 28 '20 at 0:22
There is a faster way to do it if you know the ranges of the values, for example, if you are dividing a signed integer by 3 and you know the range of the value to be divided is 0 to 768, then you can multiply it by a factor and shift it to the left by a power of 2 to that factor divided by 3.
eg.
Range 0 > 768
you could use shifting of 10 bits, which multiplying by 1024, you want to divide by 3 so your multiplier should be 1024 / 3 = 341,
so you can now use (x * 341) >> 10
(Make sure the shift is a signed shift if using signed integers), also make sure the shift is an actually shift and not a bit ROLL
This will effectively divide the value 3, and will run at about 1.6 times the speed as a natural divide by 3 on a standard x86 / x64 CPU.
Of course the only reason you can make this optimization when the compiler cant is because the compiler does not know the maximum range of X and therefore cannot make this determination, but you as the programmer can.
Sometime it may even be more beneficial to move the value into a larger value and then do the same thing, ie. if you have an int of full range you could make it an 64bit value and then do the multiply and shift instead of dividing by 3.
I had to do this recently to speed up image processing, i needed to find the average of 3 color channels, each color channel with a byte range (0  255). red green and blue.
At first i just simply used:
avg = (r + g + b) / 3;
(So r + g + b has a maximum of 768 and a minimum of 0, because each channel is a byte 0  255)
After millions of iterations the entire operation took 36 milliseconds.
I changed the line to:
avg = (r + g + b) * 341 >> 10;
And that took it down to 22 milliseconds, its amazing what can be done with a little ingenuity.
This speed up occurred in C# even though I had optimisations turned on and was running the program natively without debugging info and not through the IDE.

Thank you for your thorough explanation. I was missing the point up until now.– TimoJul 2 '15 at 19:05

Nice! I had a divide by 5 problem that I was anal about  averaging rgba values of a pixel and it's neighbors to north south west and east (poor man's wicked fast blur). I settled for a good approximation using the proportion 50/256 which is ~0.195. It's beautiful, you can count the clock cycles.
p[i] = ((a << 5) + (a << 4) + (a << 1) + a) >> 8;
– NoloMar 6 '16 at 9:17
See How To Divide By 3 for an extended discussion of more efficiently dividing by 3, focused on doing FPGA arithmetic operations.
Also relevant:

pretty cool stuff however, I should have specified that I am confined to something x86ish Oct 5 '08 at 1:37

10I know it's a bit annoying to poke at an ancient post, but the link you gave is DEAD (Aaaaaargh!) (I mean the first one). Sep 28 '14 at 12:28
Depending on your platform and depending on your C compiler, a native solution like just using
y = x / 3
Can be fast or it can be awfully slow (even if division is done entirely in hardware, if it is done using a DIV instruction, this instruction is about 3 to 4 times slower than a multiplication on modern CPUs). Very good C compilers with optimization flags turned on may optimize this operation, but if you want to be sure, you are better off optimizing it yourself.
For optimization it is important to have integer numbers of a known size. In C int has no known size (it can vary by platform and compiler!), so you are better using C99 fixedsize integers. The code below assumes that you want to divide an unsigned 32bit integer by three and that you C compiler knows about 64 bit integer numbers (NOTE: Even on a 32 bit CPU architecture most C compilers can handle 64 bit integers just fine):
static inline uint32_t divby3 (
uint32_t divideMe
) {
return (uint32_t)(((uint64_t)0xAAAAAAABULL * divideMe) >> 33);
}
As crazy as this might sound, but the method above indeed does divide by 3. All it needs for doing so is a single 64 bit multiplication and a shift (like I said, multiplications might be 3 to 4 times faster than divisions on your CPU). In a 64 bit application this code will be a lot faster than in a 32 bit application (in a 32 bit application multiplying two 64 bit numbers take 3 multiplications and 3 additions on 32 bit values)  however, it might be still faster than a division on a 32 bit machine.
On the other hand, if your compiler is a very good one and knows the trick how to optimize integer division by a constant (latest GCC does, I just checked), it will generate the code above anyway (GCC will create exactly this code for "/3" if you enable at least optimization level 1). For other compilers... you cannot rely or expect that it will use tricks like that, even though this method is very well documented and mentioned everywhere on the Internet.
Problem is that it only works for constant numbers, not for variable ones. You always need to know the magic number (here 0xAAAAAAAB) and the correct operations after the multiplication (shifts and/or additions in most cases) and both is different depending on the number you want to divide by and both take too much CPU time to calculate them on the fly (that would be slower than hardware division). However, it's easy for a compiler to calculate these during compile time (where one second more or less compile time plays hardly a role).

1I wish I could tell the compiler NOT to do that sort of thing sometimes. This makes for faster code, but also bigger code. May 18 '09 at 22:47

8Please don't do this, let the compiler do it. With a single 32bit multiply the compiler will have the result in a register. That is, it will be in the mul overflow register EDX. So, your optimization isn't and you've now converted a single 32bit multiply into a 64bit multiply and a 64bit shift. Jan 7 '11 at 6:06

1@Chris: There are those people that rely upon the compiler making their otherwise slow code fast and there are those, that try to make code fast, regardless of compiler. The first kind of people produce code that may fail horribly on some compilers and some platforms, the second one produces code that performs always good to very good, regardless of platform. The code I posted above does not produce a 64 bit multiply when using GCC on x86, in fact in only produces a 32 bit multiply (since a 32 bit multiply on x86 has a 64 bit result and GCC knows that).– MeckiJan 10 '11 at 12:31

4@Mecki: Actually, the latter tend to produce code that invokes undefined behavior and then stick their fingers in their ears when somebody tells them they're wrong. I'm not saying it's not sometimes worthwhile to attempt to write code that will be fast "even if your compiler sucks", but anyone doing so needs to have a thorough grasp of the C standard, undefined behavior, implementationdefined behavior, and what's valid and portable. Jun 9 '11 at 17:11

1@R..: Where does it produce undefined behavior? Multiplying a 64 bit uint a 32 bit uint is defined, bit shifting a 64 bit uint is defined and casting from uint64 to uint32 is defined as well; at least in ISOC. Is it because unsigned long long is not defined to be exactly 64 bit? Well, I'll fix that for you. Other than that, please show me one, only one ISOC compiler where code above does not produce the desired result or where a simple / 3 produces significant faster code (any architecture and platform is accepted).– MeckiJun 15 '11 at 18:54
For 64 bit numbers:
uint64_t divBy3(uint64_t x)
{
return x*12297829382473034411ULL;
}
However this isn't the truncating integer division you might expect. It works correctly if the number is already divisible by 3, but it returns a huge number if it isn't.
For example if you run it on for example 11, it returns 6148914691236517209. This looks like a garbage but it's in fact the correct answer: multiply it by 3 and you get back the 11!
If you are looking for the truncating division, then just use the / operator. I highly doubt you can get much faster than that.
Theory:
64 bit unsigned arithmetic is a modulo 2^64 arithmetic.
This means for each integer which is coprime with the 2^64 modulus (essentially all odd numbers) there exists a multiplicative inverse which you can use to multiply with instead of division. This magic number can be obtained by solving the 3*x + 2^64*y = 1
equation using the Extended Euclidean Algorithm.


@AMDG The equation
A*x + B*y = 1
has an unique integer solution if the greatest common divisor of A and B is 1. Jul 13 '21 at 21:07 
what is the relationship between the variables here, and the dividend and divisor in the general case of dividing two integers?– AMDGJul 13 '21 at 22:37
What if you really don't want to multiply or divide? Here is is an approximation I just invented. It works because (x/3) = (x/4) + (x/12). But since (x/12) = (x/4) / 3 we just have to repeat the process until its good enough.
#include <stdio.h>
void main()
{
int n = 1000;
int a,b;
a = n >> 2;
b = (a >> 2);
a += b;
b = (b >> 2);
a += b;
b = (b >> 2);
a += b;
b = (b >> 2);
a += b;
printf("a=%d\n", a);
}
The result is 330. It could be made more accurate using b = ((b+2)>>2); to account for rounding.
If you are allowed to multiply, just pick a suitable approximation for (1/3), with a powerof2 divisor. For example, n * (1/3) ~= n * 43 / 128 = (n * 43) >> 7.
This technique is most useful in Indiana.


unfortunately it won't work for multiples of 3 (it'll return 0 for n = 3 and 1 for n = 6). You need some more special checks on that– phuclvJul 27 '18 at 6:08

Hacker's delight have some rounding after the shift step. Unfortunate I can't understand how that works– phuclvJul 29 '18 at 3:37
I don't know if it's faster but if you want to use a bitwise operator to perform binary division you can use the shift and subtract method described at this page:
 Set quotient to 0
 Align leftmost digits in dividend and divisor
 Repeat:
 If that portion of the dividend above the divisor is greater than or equal to the divisor:
 Then subtract divisor from that portion of the dividend and
 Concatentate 1 to the right hand end of the quotient
 Else concatentate 0 to the right hand end of the quotient
 Shift the divisor one place right
 Until dividend is less than the divisor:
 quotient is correct, dividend is remainder
 STOP

I suspect that this is not faster. It is more or less a algorithm for doing binary division. Oct 5 '08 at 1:22

3I finally found it! Years and years ago I came across a 6502 assembly routine for division and somehow lost it over time. 6502 has no mul/div opcodes, so this is the only way. Now I know! Thanks.– spoulsonOct 7 '08 at 14:12
For really large integer division (e.g. numbers bigger than 64bit) you can represent your number as an int[] and perform division quite fast by taking two digits at a time and divide them by 3. The remainder will be part of the next two digits and so forth.
eg. 11004 / 3 you say
11/3 = 3, remaineder = 2 (from 113*3)
20/3 = 6, remainder = 2 (from 206*3)
20/3 = 6, remainder = 2 (from 206*3)
24/3 = 8, remainder = 0
hence the result 3668
internal static List<int> Div3(int[] a)
{
int remainder = 0;
var res = new List<int>();
for (int i = 0; i < a.Length; i++)
{
var val = remainder + a[i];
var div = val/3;
remainder = 10*(val%3);
if (div > 9)
{
res.Add(div/10);
res.Add(div%10);
}
else
res.Add(div);
}
if (res[0] == 0) res.RemoveAt(0);
return res;
}
If you really want to see this article on integer division, but it only has academic merit ... it would be an interesting application that actually needed to perform that benefited from that kind of trick.

Not sure what's supposed to be "academic" here. Pretty much every compiler optimizes divisions by constants with this or very similar techniques.– socJan 30 '15 at 22:34
Easy computation ... at most n iterations where n is your number of bits:
uint8_t divideby3(uint8_t x)
{
uint8_t answer =0;
do
{
x>>=1;
answer+=x;
x=x;
}while(x);
return answer;
}

The cool thing here is that this is a naive hardware implementation for this problem. The less cool thing is that this basically cannot be faster then any hardware implementation, unless the hardware implementation of the CPU is trying.– CheironAug 18 '17 at 12:09
A lookup table approach would also be faster in some architectures.
uint8_t DivBy3LU(uint8_t u8Operand)
{
uint8_t ai8Div3 = [0, 0, 0, 1, 1, 1, 2, 2, 2, 3, 3, 3, 4, ....];
return ai8Div3[u8Operand];
}