# Implement division with bit-wise operator

How can I implement division using bit-wise operators (not just division by powers of 2)?

Describe it in detail.

• See How can I multiply and divide using only bit shifting and adding? for a compact, efficient, non-recursive C implementation. (And a similar x86-asm implementation.) Jun 20 '18 at 18:24
• If someone asks you this question in an interview, ask them "is this something what you do daily, implement division"? Apr 23 '19 at 5:07

The standard way to do division is by implementing binary long-division. This involves subtraction, so as long as you don't discount this as not a bit-wise operation, then this is what you should do. (Note that you can of course implement subtraction, very tediously, using bitwise logical operations.)

In essence, if you're doing `Q = N/D`:

1. Align the most-significant ones of `N` and `D`.
2. Compute `t = (N - D);`.
3. If `(t >= 0)`, then set the least significant bit of `Q` to 1, and set `N = t`.
4. Left-shift `N` by 1.
5. Left-shift `Q` by 1.
6. Go to step 2.

Loop for as many output bits (including fractional) as you require, then apply a final shift to undo what you did in Step 1.

• what do you mean by align the most significant ones of N and D, and do we do this in code. Mar 13 '11 at 4:56
• @Time: For instance if N=9 and D=3, then we have N=1001, D=11. So the first thing to do is to left shift D by 2 so that the leading one matches that of N, i.e. you work with D=1100. Mar 13 '11 at 10:03
• @Foli: What happens if t< 0. For N = 1001 and D =11, if I align N and D, then N is 1001 but D is 1100. N-D is negative. But your algorthim does not tell what to do then. Can you give a complete example Mar 14 '11 at 5:52
• @Programmer: Oh, I'd assumed it was implicit in step 3; if t >= 0, then set the lsb of Q and replace N, otherwise don't do either. If you've ever done long division by hand, this algorithm ought to be familiar (try dividing 1001 by 0011 by hand!). Mar 14 '11 at 8:27
• @OliverCharlesworth maybe I don't understand, I tried with N=7=111 and D=3=011. We are on 3 bits. I must do 7/3 1) Aligning, so N=111 and D=110 2) t = 7-6 = 1 > 0 3) Q = 001 and N = t = 001 4) N << 1 => N = 010 5) Q << 1 => Q = 010 I think that I should stop here. You wrote "Loop for as many output bits (including fractional) as you require", so in my example you say that I must loop 2 times because my result is on 2 bit (quotient = 10), but if I loop the second time, I will have wrong result... So I must cycle n-1 times (n is number of bits on output)? Jan 18 '15 at 4:00

Division of two numbers using bitwise operators.

``````#include <stdio.h>

int remainder, divisor;

int division(int tempdividend, int tempdivisor) {
int quotient = 1;

if (tempdivisor == tempdividend) {
remainder = 0;
return 1;
} else if (tempdividend < tempdivisor) {
remainder = tempdividend;
return 0;
}

do{

tempdivisor = tempdivisor << 1;
quotient = quotient << 1;

} while (tempdivisor <= tempdividend);

/* Call division recursively */
quotient = quotient + division(tempdividend - tempdivisor, divisor);

return quotient;
}

int main() {
int dividend;

printf ("\nEnter the Dividend: ");
scanf("%d", &dividend);
printf("\nEnter the Divisor: ");
scanf("%d", &divisor);

printf("\n%d / %d: quotient = %d", dividend, divisor, division(dividend, divisor));
printf("\n%d / %d: remainder = %d", dividend, divisor, remainder);
getch();
}
``````
• where do you pick up `divisor` from? Mar 29 '14 at 14:11
• it is user input coming from `scanf("%d", &divisor);` Apr 17 '16 at 0:38
• Only divides correctly if do a normal while (with tempdivisor << 1) instead of do-while. The quotient part screws it up. Mar 7 '17 at 21:10
• I like this as a starting point. But don't forget negative numbers. -4 divided by 2 is not "0 remainder -4". Still +1 for the concept. Nov 19 '20 at 18:20
``````int remainder =0;

int division(int dividend, int divisor)
{
int quotient = 1;

int neg = 1;
if ((dividend>0 &&divisor<0)||(dividend<0 && divisor>0))
neg = -1;

// Convert to positive
unsigned int tempdividend = (dividend < 0) ? -dividend : dividend;
unsigned int tempdivisor = (divisor < 0) ? -divisor : divisor;

if (tempdivisor == tempdividend) {
remainder = 0;
return 1*neg;
}
else if (tempdividend < tempdivisor) {
if (dividend < 0)
remainder = tempdividend*neg;
else
remainder = tempdividend;
return 0;
}
while (tempdivisor<<1 <= tempdividend)
{
tempdivisor = tempdivisor << 1;
quotient = quotient << 1;
}

// Call division recursively
if(dividend < 0)
quotient = quotient*neg + division(-(tempdividend-tempdivisor), divisor);
else
quotient = quotient*neg + division(tempdividend-tempdivisor, divisor);
return quotient;
}

void main()
{
int dividend,divisor;
char ch = 's';
while(ch != 'x')
{
printf ("\nEnter the Dividend: ");
scanf("%d", &dividend);
printf("\nEnter the Divisor: ");
scanf("%d", &divisor);

printf("\n%d / %d: quotient = %d", dividend, divisor, division(dividend, divisor));
printf("\n%d / %d: remainder = %d", dividend, divisor, remainder);

_getch();
}
}
``````
• I tested it. it can handle negative division Aug 29 '12 at 8:29

I assume we are discussing division of integers.

Consider that I got two number 1502 and 30, and I wanted to calculate 1502/30. This is how we do this:

First we align 30 with 1501 at its most significant figure; 30 becomes 3000. And compare 1501 with 3000, 1501 contains 0 of 3000. Then we compare 1501 with 300, it contains 5 of 300, then compare (1501-5*300) with 30. At so at last we got 5*(10^1) = 50 as the result of this division.

Now convert both 1501 and 30 into binary digits. Then instead of multiplying 30 with (10^x) to align it with 1501, we multiplying (30) in 2 base with 2^n to align. And 2^n can be converted into left shift n positions.

Here is the code:

``````int divide(int a, int b){
if (b != 0)
return;

//To check if a or b are negative.
bool neg = false;
if ((a>0 && b<0)||(a<0 && b>0))
neg = true;

//Convert to positive
unsigned int new_a = (a < 0) ? -a : a;
unsigned int new_b = (b < 0) ? -b : b;

//Check the largest n such that b >= 2^n, and assign the n to n_pwr
int n_pwr = 0;
for (int i = 0; i < 32; i++)
{
if (((1 << i) & new_b) != 0)
n_pwr = i;
}

//So that 'a' could only contain 2^(31-n_pwr) many b's,
//start from here to try the result
unsigned int res = 0;
for (int i = 31 - n_pwr; i >= 0; i--){
if ((new_b << i) <= new_a){
res += (1 << i);
new_a -= (new_b << i);
}
}

return neg ? -res : res;
}
``````

Didn't test it, but you get the idea.

This solution works perfectly.

``````#include <stdio.h>

int division(int dividend, int divisor, int origdiv, int * remainder)
{
int quotient = 1;

if (dividend == divisor)
{
*remainder = 0;
return 1;
}

else if (dividend < divisor)
{
*remainder = dividend;
return 0;
}

while (divisor <= dividend)
{
divisor = divisor << 1;
quotient = quotient << 1;
}

if (dividend < divisor)
{
divisor >>= 1;
quotient >>= 1;
}

quotient = quotient + division(dividend - divisor, origdiv, origdiv, remainder);

return quotient;
}

int main()
{
int n = 377;
int d = 7;
int rem = 0;

printf("Quotient : %d\n", division(n, d, d, &rem));
printf("Remainder: %d\n", rem);

return 0;
}
``````

Implement division without divison operator: You will need to include subtraction. But then it is just like you do it by hand (only in the basis of 2). The appended code provides a short function that does exactly this.

``````uint32_t udiv32(uint32_t n, uint32_t d) {
// n is dividend, d is divisor
// store the result in q: q = n / d
uint32_t q = 0;

// as long as the divisor fits into the remainder there is something to do
while (n >= d) {
uint32_t i = 0, d_t = d;
// determine to which power of two the divisor still fits the dividend
//
// i.e.: we intend to subtract the divisor multiplied by powers of two
// which in turn gives us a one in the binary representation
// of the result
while (n >= (d_t << 1) && ++i)
d_t <<= 1;
// set the corresponding bit in the result
q |= 1 << i;
// subtract the multiple of the divisor to be left with the remainder
n -= d_t;
// repeat until the divisor does not fit into the remainder anymore
}
return q;
}
``````

The below method is the implementation of binary divide considering both numbers are positive. If subtraction is a concern we can implement that as well using binary operators.

### Code

``````-(int)binaryDivide:(int)numerator with:(int)denominator
{
if (numerator == 0 || denominator == 1) {
return numerator;
}

if (denominator == 0) {

#ifdef DEBUG
NSAssert(denominator == 0, @"denominator should be greater then 0");
#endif
return INFINITY;
}

// if (numerator <0) {
//     numerator = abs(numerator);
// }

int maxBitDenom = [self getMaxBit:denominator];
int maxBitNumerator = [self getMaxBit:numerator];
int msbNumber = [self getMSB:maxBitDenom ofNumber:numerator];

int qoutient = 0;

int subResult = 0;

int remainingBits = maxBitNumerator-maxBitDenom;

if (msbNumber >= denominator) {
qoutient |=1;
subResult = msbNumber - denominator;
}
else {
subResult = msbNumber;
}

while (remainingBits>0) {
int msbBit = (numerator & (1 << (remainingBits-1)))>0 ? 1 : 0;
subResult = (subResult << 1) |msbBit;
if (subResult >= denominator) {
subResult = subResult-denominator;
qoutient = (qoutient << 1) | 1;
}
else {
qoutient = qoutient << 1;
}
remainingBits--;
}
return qoutient;
}

-(int)getMaxBit:(int)inputNumber
{
int maxBit =0;
BOOL isMaxBitSet = NO;
for (int i=0; i<sizeof(inputNumber)*8; i++) {
if (inputNumber & (1 << i) ) {
maxBit = i;
isMaxBitSet=YES;
}
}
if (isMaxBitSet) {
maxBit += 1;
}
return maxBit;
}

-(int)getMSB:(int)bits ofNumber:(int)number
{
int numbeMaxBit = [self getMaxBit:number];
return number >> (numbeMaxBit -bits);
}
``````

For integers:

``````public class Division {

public static void main(String[] args) {
System.out.println("Division: " + divide(100, 9));
}

public static int divide(int num, int divisor) {
int sign = 1;
if((num > 0 && divisor < 0) || (num < 0 && divisor > 0))
sign = -1;

return divide(Math.abs(num), Math.abs(divisor), Math.abs(divisor)) * sign;
}

public static int divide(int num, int divisor, int sum) {
if (sum > num) {
return 0;
}

return 1 + divide(num, divisor, sum + divisor);
}
}
``````
• this does not take care of overflow . What if my dividend was -2^31 assuming 32 bits for integer ? Sep 29 '16 at 16:24

With the usual caveats about C's behaviour with shifts, this ought to work for unsigned quantities regardless of the native size of an int...

``````static unsigned int udiv(unsigned int a, unsigned int b) {
unsigned int c = 1, result = 0;

if (b == 0) return (unsigned int)-1 /*infinity*/;

while (((int)b > 0) && (b < a)) { b = b<<1; c = c<<1; }

do {
if (a >= b) { a -= b; result += c; }
b = b>>1; c = c>>1;
} while (c);

return result;
}
``````

This is my solution to implement division with only bitwise operations:

``````int align(int a, int b) {
while (b < a) b <<= 1;
return b;
}

int divide(int a, int b) {
int temp = b;
int result = 0;
b = align(a, b);
do {
result <<= 1;
if (a >= b) {
// sub(a,b) is a self-defined bitwise function for a minus b
a = sub(a,b);
result = result | 1;
}
b >>= 1;
} while (b >= temp);
return result;
}
``````

All these solutions are too long. The base idea is to write the quotient (for example, 5=101) as 100 + 00 + 1 = 101.

``````public static Point divide(int a, int b) {

if (a < b)
return new Point(0,a);
if (a == b)
return new Point(1,0);
int q = b;
int c = 1;
while (q<<1 < a) {
q <<= 1;
c <<= 1;
}
Point r = divide(a-q, b);
return new Point(c + r.x, r.y);
}

public static class Point {
int x;
int y;

public Point(int x, int y) {
this.x = x;
this.y = y;
}

public int compare(Point b) {
if (b.x - x != 0) {
return x - b.x;
} else {
return y - b.y;
}
}

@Override
public String toString() {
return " (" + x + " " + y + ") ";
}
}
``````

Since bit wise operations work on bits that are either 0 or 1, each bit represents a power of 2, so if I have the bits

1010

that value is 10.

Each bit is a power of two, so if we shift the bits to the right, we divide by 2

1010 --> 0101

0101 is 5

so, in general if you want to divide by some power of 2, you need to shift right by the exponent you raise two to, to get that value

so for instance, to divide by 16, you would shift by 4, as 2^^4 = 16.

• I don't think the OP is only interested in dividing by powers of 2. Mar 12 '11 at 19:38
• Oli is right! I want to divide by numbers that are not powers of 2 Mar 13 '11 at 4:56