I have to convert a binary number like for example unsigned int bin_number = 10101010 into its decimal representation (i.e. 170) as quickly as possible? What is the best algorithm?

  • 1
    Does 10101010 come from the user of your program, or is it just a literal in code? – Michael Kristofik Jun 8 '12 at 13:30
  • Can you give a better picture of where the binary number originates from? Is it known at compile time or only run-time? Is it stored in a string or some other structure? Knowing this will make answering the question much easier. – Component 10 Jun 8 '12 at 13:33
  • Yes, i'm sorry. Usually i get the number run-time, but sometimes at compile-time. I'm still learning. – Nick Jun 8 '12 at 13:52

Using templates you can solve this problem at compile-time.

template<unsigned long num>
struct binary
    static unsigned const value =
        binary<num/10>::value << 1 | num % 10;

// Specialization for zero
struct binary<0>
{ static unsigned const value = 0; };

The binary template is instantiated again with a smaller num, until num reaches zero and the specialization is used as a termination condition.

Example: std::cout << binary<10101010>::value;

For run-time problem:

unsigned binary_to_decimal(unsigned num)
    unsigned res = 0;

    for(int i = 0; num > 0; ++i)
        if((num % 10) == 1)
            res += (1 << i);

        num /= 10;

    return res;
  • 5
    Using templates you can compute anything at compile time, since they are turing complete. Does that however help the OP to get anything done? – PlasmaHH Jun 8 '12 at 13:12
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    -1: I doubt it. If OP had an ICE, which he'd need in order to use metaprogramming, he could just do const double d = 170.0; As it is he is sureley getting the inbound number at run-time, so metaprogramming is out. – John Dibling Jun 8 '12 at 13:14
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    It works! Can you add some notes? – Nick Jun 8 '12 at 13:19
  • 4
    Actually, I think this is rather clever - and more to the point it does work. True, it will not work on numbers only known at runtime and true, it's far more likely that the OP wants that but he hasn't specified that. – Component 10 Jun 8 '12 at 13:29
  • 2
    @gliderkite: Yep. :) The elaboration on the metaprogramming is educational to those that don't know about it, if not likely to be applicable to the actual problem. More importantly you have provided what is probably a solution to the actual problem. Though I don't know if it's the fastest possible algorithm, it's surely fast enough, and OP didn't specify what "best" means anyway. I've removed my downvote and given you +1. – John Dibling Jun 8 '12 at 13:54

Well, if this "number" is actually a string gotten from some source (read from a file or from a user) that you converted into a number (thinking it to be more appropriate for an actual number), which is quite likely, you can use a std::bitset to do the conversion:

#include <bitset>

unsigned int number = std::bitset<32>("10101010").to_ulong();

(Of course the 32 here is implementation-defined and might be more appropriately written as std::numeric_limits<unsigned int>::digits.)

But if it is really a number (integer variable) in the (very) first place you could do:

#include <string>

unsigned int number = std::bitset<32>(std::to_string(bin_number)).to_ulong();

(using C++11's to_string) But this will probably not be the most efficient way anymore, as others have presented more efficient algorithms based on numbers. But as said, I doubt that you really get this number as an actual integer variable in the very first place, but rather read it from some text file or from the user.

  • 1
    Thanks, this a good answer, but the number is not a string, i cannot use C++11 and i asked for a fast solution! – Nick Jun 8 '12 at 13:55
  • @Nick So may I ask where you got it from, you obviously have to get it from somewhere and I doubt you actually read a binary number, that represents a number just containing 0s and 1s, that would be rubbish. It really only makes sense to get such a number from some textual medium in the first place. The only exception is when you need binary constants, but for this you can just use another method (gliderkite's template program is very nice). But for most cases when it comes as a string, the bitset solution shouldn't be the slowest one (and it doesn't need C++11, either). – Christian Rau Jun 8 '12 at 14:02
  • btw you got my +1 – Nick Jun 8 '12 at 14:36

Actually if you write unsigned int bin_number = 10101010, this is interpreted as a decimal number by the compiler.

If you want to write a binary literal in your source code, you should use BOOST_BINARY. Then, you just need to print it using cout, decimal is the default...

unsigned int i = BOOST_BINARY(10101010);
std::cout << i; // This prints 170
  • What's BOOST_BINARY? – Nick Jun 8 '12 at 13:21
  • Some compilers also support the "0b" prefix (i = 0b10101010), but with boost you ensure portability. – Aurel Jun 8 '12 at 13:21
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    But macro is evil! – Nick Jun 8 '12 at 13:25
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    Not if used right, and I completely trust the boost libraries (seriously, you should take a look if you never used them!) – Aurel Jun 8 '12 at 13:28
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    @Nick Yes and no. In this case, the necessary precautions have been taken: a prefix to avoid name conflicts, and all in caps, so you know that it is a macro, and can take appropriate precautions. – James Kanze Jun 8 '12 at 13:38

Since C++11 (even if C++11 is more limited than C++14 in that regard), function can be constexpr so avoid necessity of template to have compile time value.

Here a version C++14 compatible:

constexpr unsigned binary_to_decimal(unsigned num)
    unsigned res = 0;

    while (num)
        res = 10 * res + num % 10;
        num /= 10;
    return res;

And for literals, you can even use binary literals since C++14:

0b1010'1010 // or 0b10101010 without separator

If you know the number of binary digits that you're dealing with and it's always fixed and the binary number comes in a string (as it would if read from a file or stdin) at runtime (i.e. compile time conversion not possible) then you could adopt this approach:

int to_binary( const char* c )
    return ( ( c[0] & 1 ) ? 0x80 : 0x00 ) |
           ( ( c[1] & 1 ) ? 0x40 : 0x00 ) |
           ( ( c[2] & 1 ) ? 0x20 : 0x00 ) |
           ( ( c[3] & 1 ) ? 0x10 : 0x00 ) |
           ( ( c[4] & 1 ) ? 0x08 : 0x00 ) |
           ( ( c[5] & 1 ) ? 0x04 : 0x00 ) |
           ( ( c[6] & 1 ) ? 0x02 : 0x00 ) |
           ( ( c[7] & 1 ) ? 0x01 : 0x00 );

This assumes an fixed eight digit binary number. called like this:

std::cout << to_binary("10101010") << std::endl;

If you had a sixteen bit number you could still use it:

const char* bin_number = "1010101010101010";

// Deal with 16 bits
std::cout << ( to_binary( bin_number ) << 8 | to_binary( bin_number + 8 ) ) << std::endl;

Note that there is clearly no bounds checking here and I'm relying on the fact that the LSB of '1' is always 1 and '0' is always 0 (so not validating that it's actually a binary input.)

Naturally, it's pretty specific and not very flexible, but it does the job and I'm not sure that you'd get much faster.

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