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While there are multiple ways to reverse bit order in a byte, I'm curious as to what is the "simplest" for a developer to implement. And by reversing I mean:

1110 -> 0111
0010 -> 0100

This is similar to, but not a duplicate of this PHP question.

This is similar to, but not a duplicate of this C question. This question is asking for the easiest method to implement by a developer. The "Best Algorithm" is concerned with memory and cpu performance.

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Simple or fast? – Andreas Rejbrand Apr 8 '10 at 19:38
Use inline assembly. Better, put the function into a separate translation unit. Have one assembly language module for each target platform. Let build process choose the modules. – Thomas Matthews Apr 8 '10 at 19:47
@Andreas Simplest implementation – nathan Apr 8 '10 at 20:12
then do it in hardware ;) – Hamish Grubijan Apr 8 '10 at 21:10
@FredOverflow, what question is this a duplicate to? I have addressed two supposed duplicates in the question. – nathan Nov 12 '14 at 22:28

20 Answers 20

up vote 61 down vote accepted

If you are talking about a single byte, a table-lookup is probably the best bet, unless for some reason you don't have 256 bytes available.

share|improve this answer
If we're talking about something that's simple to implement without copying a ready-made solution, creating the lookup table does still require another solution. (Of course one might do it by hand, but that's error-prone and time-consuming…) – Arkku Apr 8 '10 at 19:52
You can squeeze the array into somewhat fewer than 256 bytes if you ignore palindromes. – wilhelmtell Apr 8 '10 at 19:56
@wilhelmtell - you'd need a table to know which ones are the palindromes. – Mark Ransom Apr 8 '10 at 20:01
@wilhelmtell: Well, to write the script one still needs another solution, which was my point – a lookup table is simple to use but not simple to create. (Except by copying a ready-made lookup table, but then one might just as well copy any solution.) For example, if the “simplest” solution is considered one that could be written on paper in an exam or interview, I would not start making a lookup table by hand and making the program to do it would already include a different solution (which would be simpler alone than the one including both it and the table). – Arkku Apr 8 '10 at 20:18
@Arkku what I meant is write a script which outputs the table of the first 256 bytes and their reverse mapping. Yes, you're back to writing the reverse function, but now in your favourite scripting language, and it can be as nasty as you want -- you're going to throw it away as soon as it's done and you ran it once. Have the script's output as C code, even: unsigned int rtable[] = {0x800, 0x4000, ...};. Then throw away the script and forget you ever had it. It's much faster to write than the equivalent C++ code, and it will only ever run once, so you get O(1) runtime in your C++ code. – wilhelmtell Apr 8 '10 at 21:32

This should work:

unsigned char reverse(unsigned char b) {
   b = (b & 0xF0) >> 4 | (b & 0x0F) << 4;
   b = (b & 0xCC) >> 2 | (b & 0x33) << 2;
   b = (b & 0xAA) >> 1 | (b & 0x55) << 1;
   return b;

First the left four bits are swapped with the right four bits. Then all adjacent pairs are swapped and then all adjacent single bits. This results in a reversed order.

share|improve this answer
I see you came up with this answer two minutes before I looked into the question... damn you! ;-) – Daniel C. Sobral Apr 8 '10 at 19:43
Reasonably short and quick, but not simple. – Mark Ransom Apr 8 '10 at 19:58
+1 for some truly brazen bit twisting! – JustJeff Apr 9 '10 at 1:11
Not the simplest approach, but I like it +1. – nathan Apr 9 '10 at 14:10
Yes, it is simple. It's a kind of divide and conquer algorithm. Excellent! – kiewic May 11 '10 at 4:25

I think a lookup table has to be one of the simplest methods. However, you don't need a full lookup table.

//Index 1==0b0001 => 0b1000
//Index 7==0b0111 => 0b1110
static unsigned char lookup[16] = {
0x0, 0x8, 0x4, 0xc, 0x2, 0xa, 0x6, 0xe,
0x1, 0x9, 0x5, 0xd, 0x3, 0xb, 0x7, 0xf, };

uint8_t reverse(uint8_t n) {
   // Reverse the top and bottom nibble then swap them.
   return (lookup[n&0b1111] << 4) | lookup[n>>4];

// Detailed breakdown of the math
//  + lookup reverse of bottom nibble
//  |       + grab bottom nibble
//  |       |        + move bottom result into top nibble
//  |       |        |     + combine the bottom and top results 
//  |       |        |     | + lookup reverse of top nibble
//  |       |        |     | |       + grab top nibble
//  V       V        V     V V       V
// (lookup[n&0b1111] << 4) | lookup[n>>4]

This fairly simple to code and verify visually.
Ultimately this might even be faster than a full table. The bit arith is cheap and the table easily fits on a cache line.

share|improve this answer
That is an excellent way to reduce the complexity of the table solution. +1 – e.James Apr 8 '10 at 23:55
Nice, but will give you a cache miss. – Johan Kotlinski Nov 3 '10 at 17:42
@kotlinski: what will cause a cache miss? I think the small table version may be more cache efficient than the large one. On my Core2 a cache line is 64 bytes wide, the full table would span multiple lines, whereas the smaller table easily fits one a single line. – deft_code Oct 1 '11 at 14:20
@kotlinski: Temporal locality is more important for cache hits or replacement strategies, than address locality – cfi Sep 25 '13 at 16:39
@Harshdeep: Consider the binary encoded indexes of the table entries. index b0000(0) -> b0000(0x0) boring; b0001(1) -> b1000(0x8), b0010(2) -> b0100(0x4), b1010(10) -> b0101(0x5). See the pattern? It is simple enough that you can calculate it in your head (if you can read binary, otherwise you'll need paper to work it out). As for the leap that reversing an 8 bit integer is the same as reversing 4 bit parts then swapping them; I claim experience and intuition (or magic). – deft_code Jan 2 '14 at 20:48

See the bit twiddling hacks for many solutions. Copypasting from there is obviously simple to implement. =)

For example (on a 32-bit CPU):

uint8_t b = byte_to_reverse;
b = ((b * 0x0802LU & 0x22110LU) | (b * 0x8020LU & 0x88440LU)) * 0x10101LU >> 16;

If by “simple to implement” one means something that can be done without a reference in an exam or job interview, then the safest bet is probably the inefficient copying of bits one by one into another variable in reverse order (already shown in other answers).

share|improve this answer
From your URL: 32 bit CPU: b = ((b * 0x0802LU & 0x22110LU) | (b * 0x8020LU & 0x88440LU)) * 0x10101LU >> 16; – Joshua Apr 8 '10 at 20:13
@Joshua: That's my personal favourite as well. The caveat (as stated on the linked page) is that it needs to be assigned or cast into an uint8_t or there will be garbage in the upper bits. – Arkku Apr 8 '10 at 20:20

Since nobody posted a complete table lookup solution, here is mine:

unsigned char reverse_byte(unsigned char x)
    static const unsigned char table[] = {
        0x00, 0x80, 0x40, 0xc0, 0x20, 0xa0, 0x60, 0xe0,
        0x10, 0x90, 0x50, 0xd0, 0x30, 0xb0, 0x70, 0xf0,
        0x08, 0x88, 0x48, 0xc8, 0x28, 0xa8, 0x68, 0xe8,
        0x18, 0x98, 0x58, 0xd8, 0x38, 0xb8, 0x78, 0xf8,
        0x04, 0x84, 0x44, 0xc4, 0x24, 0xa4, 0x64, 0xe4,
        0x14, 0x94, 0x54, 0xd4, 0x34, 0xb4, 0x74, 0xf4,
        0x0c, 0x8c, 0x4c, 0xcc, 0x2c, 0xac, 0x6c, 0xec,
        0x1c, 0x9c, 0x5c, 0xdc, 0x3c, 0xbc, 0x7c, 0xfc,
        0x02, 0x82, 0x42, 0xc2, 0x22, 0xa2, 0x62, 0xe2,
        0x12, 0x92, 0x52, 0xd2, 0x32, 0xb2, 0x72, 0xf2,
        0x0a, 0x8a, 0x4a, 0xca, 0x2a, 0xaa, 0x6a, 0xea,
        0x1a, 0x9a, 0x5a, 0xda, 0x3a, 0xba, 0x7a, 0xfa,
        0x06, 0x86, 0x46, 0xc6, 0x26, 0xa6, 0x66, 0xe6,
        0x16, 0x96, 0x56, 0xd6, 0x36, 0xb6, 0x76, 0xf6,
        0x0e, 0x8e, 0x4e, 0xce, 0x2e, 0xae, 0x6e, 0xee,
        0x1e, 0x9e, 0x5e, 0xde, 0x3e, 0xbe, 0x7e, 0xfe,
        0x01, 0x81, 0x41, 0xc1, 0x21, 0xa1, 0x61, 0xe1,
        0x11, 0x91, 0x51, 0xd1, 0x31, 0xb1, 0x71, 0xf1,
        0x09, 0x89, 0x49, 0xc9, 0x29, 0xa9, 0x69, 0xe9,
        0x19, 0x99, 0x59, 0xd9, 0x39, 0xb9, 0x79, 0xf9,
        0x05, 0x85, 0x45, 0xc5, 0x25, 0xa5, 0x65, 0xe5,
        0x15, 0x95, 0x55, 0xd5, 0x35, 0xb5, 0x75, 0xf5,
        0x0d, 0x8d, 0x4d, 0xcd, 0x2d, 0xad, 0x6d, 0xed,
        0x1d, 0x9d, 0x5d, 0xdd, 0x3d, 0xbd, 0x7d, 0xfd,
        0x03, 0x83, 0x43, 0xc3, 0x23, 0xa3, 0x63, 0xe3,
        0x13, 0x93, 0x53, 0xd3, 0x33, 0xb3, 0x73, 0xf3,
        0x0b, 0x8b, 0x4b, 0xcb, 0x2b, 0xab, 0x6b, 0xeb,
        0x1b, 0x9b, 0x5b, 0xdb, 0x3b, 0xbb, 0x7b, 0xfb,
        0x07, 0x87, 0x47, 0xc7, 0x27, 0xa7, 0x67, 0xe7,
        0x17, 0x97, 0x57, 0xd7, 0x37, 0xb7, 0x77, 0xf7,
        0x0f, 0x8f, 0x4f, 0xcf, 0x2f, 0xaf, 0x6f, 0xef,
        0x1f, 0x9f, 0x5f, 0xdf, 0x3f, 0xbf, 0x7f, 0xff,
    return table[x];
share|improve this answer
Useful, thanks. Seems that my slower shifting method was limiting performance in an embedded app. Placed table in ROM on a PIC (with addition of rom keyword). – flend Apr 23 '12 at 10:02
template <typename T>
T reverse(T n, size_t b = sizeof(T) * CHAR_BITS)
    assert(b <= std::numeric_limits<T>::digits);

    T rv = 0;

    for (size_t i = 0; i < b; ++i, n >>= 1)
        rv = (rv >> 1) | (n & 0x01);

    return rv;


Converted it to a template with the optional bitcount

share|improve this answer
sizeof(T) ....? – N 1.1 Apr 8 '10 at 19:40
@nvl - fixed. I started building it as a template but decided halfway through to not do so... too many &gt &lt – andand Apr 8 '10 at 19:42
For extra pedenatry, replace sizeof(T)*8 with sizeof(T)*CHAR_BITS. – Pillsy Apr 8 '10 at 20:26
@Pillsy - Sure, why not... it's not like anybody could actually be too pedantic, now could they? – andand Apr 9 '10 at 1:01
@andand For extra extra pendantry, replace sizeof(T)*CHAR_BIT by std::numeric_limits<T>::digits (almost 4 years of pedantry later). – Morwenn Feb 25 '14 at 22:09

Although probably not portable, I would use assembly language.
Many assembly languages have instructions to rotate a bit into the carry flag and to rotate the carry flag into the word (or byte).

The algorithm is:

for each bit in the data type:
  rotate bit into carry flag
  rotate carry flag into destination.

The high level language code for this is much more complicated, because C and C++ do not support rotating to carry and rotating from carry. The carry flag has to modeled.

Edit: Assembly language for example

;  Enter with value to reverse in R0.
;  Assume 8 bits per byte and byte is the native processor type.
   LODI, R2  8       ; Set up the bit counter
   RRC, R0           ; Rotate R0 right into the carry bit.
   RLC, R1           ; Rotate R1 left, then append carry bit.
   DJNZ, R2  Loop    ; Decrement R2 and jump if non-zero to "loop"
   LODR, R0  R1      ; Move result into R0.
share|improve this answer
I think this answer is the opposite of simple. Non-portable, assembly, and complex enough to be written in pseudo-code instead of the actual assembly. – deft_code Apr 8 '10 at 20:59
It is quite simple. I put it into pseudo-code because assembly mnemonics are specific to a breed of processor and there are a lot of breeds out there. If you would like, I can edit this to show the simple assembly language. – Thomas Matthews Apr 9 '10 at 16:53

Two lines:

     reversed |= ((original>>i) & 0b1)<<(7-i);

or in case you have issues with the "0b1" part:

     reversed |= ((original>>i) & 1)<<(7-i);

"original" is the byte you want to reverse. "reversed" is the result, initialized to 0.

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The simplest way is probably to iterate over the bit positions in a loop:

unsigned char reverse(unsigned char c) {
   int shift;
   unsigned char result = 0;
   for (shift = 0; shift < CHAR_BITS; shift++) {
      if (c & (0x01 << shift))
         result |= (0x80 >> shift);
   return result;
share|improve this answer

You may be interested in std::vector<bool> (that is bit-packed) and std::bitset

It should be the simplest as requested.

#include <iostream>
#include <bitset>
using namespace std;
int main() {
  bitset<8> bs = 5;
  bitset<8> rev;
  for(int ii=0; ii!= bs.size(); ++ii)
    rev[bs.size()-ii-1] = bs[ii];
  cerr << bs << " " << rev << endl;

Other options may be faster.

EDIT: I owe you a solution using std::vector<bool>

#include <algorithm>
#include <iterator>
#include <iostream>
#include <vector>
using namespace std;
int main() {
  vector<bool> b{0,0,0,0,0,1,0,1};
  reverse(b.begin(), b.end());
  copy(b.begin(), b.end(), ostream_iterator<int>(cerr));
  cerr << endl;

The second example requires c++0x extension (to initialize the array with {...}). The advantage of using a bitset or a std::vector<bool> (or a boost::dynamic_bitset) is that you are not limited to bytes or words but can reverse an arbitrary number of bits.


share|improve this answer
How is bitset any simpler than a pod here? Show the code, or it isn't. – wilhelmtell Apr 8 '10 at 19:53
Actu ally, I think that code will reverse the bitset, and then reverse it back to its original. Change ii != size(); to ii < size()/2; and it'll do a better job =) – Viktor Sehr Apr 8 '10 at 19:58
(@viktor-sehr no, it will not, rev is different from bs). Anyway I don't like the answer myself: I think this is a case where binary arithmetic and shift operators are better suited. It still remains the simplest to understand. – baol Apr 8 '10 at 20:07
ah, youre right, sorry – Viktor Sehr Apr 9 '10 at 7:26

For constant input, this costs no memory or CPU at run-time:

#define MSB2LSB(b) (((b)&1?128:0)|((b)&2?64:0)|((b)&4?32:0)|((b)&8?16:0)|((b)&16?8:0)|((b)&32?4:0)|((b)&64?2:0)|((b)&128?1:0))

I use this for ARINC-429 where the bit order of the label is opposite the rest of the word, and the label is often a constant (and conventionally in octal). For example:

#define LABEL_HF_COMM MSB2LSB(0205)
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I find the following solution simpler than the other bit fiddling algorithms I've seen in here.

unsigned char reverse_byte(char a)

  return ((a & 0x1)  << 7) | ((a & 0x2)  << 5) |
         ((a & 0x4)  << 3) | ((a & 0x8)  << 1) |
         ((a & 0x10) >> 1) | ((a & 0x20) >> 3) |
         ((a & 0x40) >> 5) | ((a & 0x80)  >> 7);

It gets every bit in the byte, and shifts it accordingly, starting from the first to the last. Explanation:

  ((a & 0x1)  << 7) //get first bit on the right and shift it into the first left position 
  | //add it to
  ((a & 0x2) // << 5) //the second bit, shifted to the second position from the left
  //and so on
share|improve this answer

Table lookup or

uint8_t rev_byte(uint8_t x) {
    uint8_t y;
    uint8_t m = 1;
    while (m) {
       y >>= 1;
       if (m&x) {
          y |= 0x80;
       m <<=1;
    return y;


Look here for other solutions that might work better for you

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a slower but simpler implementation:

static int swap_bit(unsigned char unit)
     * swap bit[7] and bit[0]
    unit = (((((unit & 0x80) >> 7) ^ (unit & 0x01)) << 7) | (unit & 0x7f));
    unit = (((((unit & 0x80) >> 7) ^ (unit & 0x01))) | (unit & 0xfe));
    unit = (((((unit & 0x80) >> 7) ^ (unit & 0x01)) << 7) | (unit & 0x7f));

     * swap bit[6] and bit[1]
    unit = (((((unit & 0x40) >> 5) ^ (unit & 0x02)) << 5) | (unit & 0xbf));
    unit = (((((unit & 0x40) >> 5) ^ (unit & 0x02))) | (unit & 0xfd));
    unit = (((((unit & 0x40) >> 5) ^ (unit & 0x02)) << 5) | (unit & 0xbf));

     * swap bit[5] and bit[2]
    unit = (((((unit & 0x20) >> 3) ^ (unit & 0x04)) << 3) | (unit & 0xdf));
    unit = (((((unit & 0x20) >> 3) ^ (unit & 0x04))) | (unit & 0xfb));
    unit = (((((unit & 0x20) >> 3) ^ (unit & 0x04)) << 3) | (unit & 0xdf));

     * swap bit[4] and bit[3]
    unit = (((((unit & 0x10) >> 1) ^ (unit & 0x08)) << 1) | (unit & 0xef));
    unit = (((((unit & 0x10) >> 1) ^ (unit & 0x08))) | (unit & 0xf7));
    unit = (((((unit & 0x10) >> 1) ^ (unit & 0x08)) << 1) | (unit & 0xef));

    return unit;
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Before implementing any algorithmic solution, check the assembly language for whatever CPU architecture you are using. Your architecture may include instructions which handle bitwise manipulations like this (and what could be simpler than a single assembly instruction?).

If such an instruction is not available, then I would suggest going with the lookup table route. You can write a script/program to generate the table for you, and the lookup operations would be faster than any of the bit-reversing algorithms here (at the cost of having to store the lookup table somewhere).

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Can this be fast solution?

int byte_to_be_reversed = 

Gets rid of the hustle of using a for loop! but experts please tell me if this is efficient and faster?

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unsigned reverse(unsigned x)
   unsigned a=1;
   a <<=sizeof(a)*8-1;
   unsigned b=1;
   unsigned y=0;
   while(a) {
      if(x & b) 
         y |= a;
      a >>= 1;
      b <<= 1;
   return y;
share|improve this answer
please do add some explanation to your answer. – Haris Nov 8 '15 at 8:35


 #include <stdio.h>
#include <stdlib.h>

int main()
    int i;
    unsigned char rev = 0x70 ; // 0b01110000
    unsigned char tmp = 0;

    tmp |= ( ((rev & (1<<i))?1:0) << (7-i));
    rev = tmp;

    printf("%x", rev);       //0b00001110
    return 0;
share|improve this answer
Please add some explanation. – zcui93 Apr 5 at 12:33

How about this one...

int value = 0xFACE;

value = ((0xFF & value << 8) | (val >> 8);
share|improve this answer
This reverses the bytes in a (16-bit) word, but doesn't alter the order of the bits within the byte, so not really a solution. – Eric Brown Sep 25 '13 at 16:38
Ah, thank you Eric. My mistake. – Valdo Sep 25 '13 at 18:29

How about just XOR the byte with 0xFF.

unsigned char reverse(unsigned char b) { b ^= 0xFF; return b; }

share|improve this answer
what about 00111100? u get 11000011 what is wrong answer. – lord.didger Apr 6 '13 at 13:45

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