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How do I remove for example 2 from 123 and returns 13, by using bitwise operators? I have no idea how to do this.. it's possible? Thanks in advance.

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you meant to obtain 13, 103 or 121? –  haylem Jun 8 '12 at 4:34
    
@haylem: 13. Updated question. –  Jack Jun 8 '12 at 4:37
    
is this homework? or why would you need to do this? –  Sahuagin Jun 8 '12 at 4:53
    
Are your numbers in base 8, 16, or 4? Then this is easy ;) –  Dave Jun 8 '12 at 5:15

4 Answers 4

up vote 3 down vote accepted

What you're suggesting is possible, but wouldn't really make sense to do. Below are the values representations in bits (only showing relevant bits, everything further left is a zero):

2: 000010 || 123: 1111011 || 13: 001101

There's no logical way to change 123 into 13 with bitwise operations. It would better to turn it into a string or character array, remove the two then cast it back to an int.

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Sure there is. If we aren't limited to just "use the constants 2 and 123" :-) –  user166390 Jun 8 '12 at 4:38
    
Thanks. I will convert it to string and back to int. I was just looking for a possible micro-optimization.. :) –  Jack Jun 8 '12 at 4:41
    
@pst Did you mean 'if we are' ? Generating a mask at run time would be so much harder than doing it with strings/char arrays. I can't imagine how you would even make that work... –  evanmcdonnal Jun 8 '12 at 4:49

What other cases are there? It may be possible to generalize this at an integer level if there is some sort of pattern, otherwise you're really just looking at string replacement.

The 2 in 123 is actually 2E1 (10100), and the 2 in 1234 would be 2E2 (11001000) neither of which are related to 2 (10), at least in bitwise form. Also, the "number" on the right side of the removed number would need to be added to the number on the left side of the removed number / 10.

i.e, to go from 123 to 13:

Located "2".
Number on left (x): 100
Number on right (y): 3
y + (x / 10) = 13

and to go from 1324 to 134

Located "2"
Number on left (x): 1300
Number on right (y): 4
y + (x / 10) = 134

Unless there's some pattern (i.e you know what positions the numbers are in), you'll just have to .ToString() the number, then do a .Replace("2", ""), before doing an int.Parse() on the result.

you could probably define some sort of recursive function to do this purely in integer form, but it'd be a lot of work for the small overhead of .ToString() and int.Parse()

Edit: Just because I'm bored I wrote a recursive "integer-only" version.

    static int remove_digit(int number, int digit)
    {
        int sum = 0;
        if (number > 0) //can't remove 0, doesn't matter if the "digit" is 0 also.
        {
            int factor = 1;
            int temp = number;
            while (temp > 0 && temp % 10 != digit)
            {
                sum += (temp % 10) * factor;
                factor *= 10;
                temp /= 10;
            }
            sum += remove_digit(temp / 10, digit) * factor;//recursion to remove any further digits.
        }
        return sum;
    }

didn't spend much time optimizing the code so there's probably some redundancy there. Feel free to modify it.

Console.WriteLine(remove_digit(125254443, 2));

Result: 1554443

EDIT: Revamped the code, slightly faster now.

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Did some testing and even with the lack of optimization, this out-performs int.Parse(1000000001.ToString().Replace("0", "")), not by a lot though haha –  Jason Larke Jun 8 '12 at 6:14

This is very awkward, but if you really do must have bitwise operations only, I suggest you convert the number to BCD. Once in BCD, you basically have an hexadecimal numbers with digits between 0 and 9, so removing a digit is very simple. Once you're done, convert back to binary.

I don't believe anybody would want to do that.

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Since we're working with base 10 numbers, manipulation in base 2 is ugly to say the least. Using some math, removing the nth digit from k, and shifting over is

(k/pow(10,n))*pow(10, n-1) + k%pow(10, n-1)

In base 2, the << and >> operator acts like multiplying by a pow(2, n), and & with a mask does the work of %, but in base 10 the bits don't line up.

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