# Bitwise manipulation: After a series of consecutive bits, propagate the leftmost different bit to the right [closed]

I'm having some trouble with an exercise in which we must implement functions using only bitwise operators (in C), the unary operators ~ and !, and signed integer variables. We are not allowed to use any conditionals, loops or arbitrary numbers -- hell, we're not even allowed to use minus(-), but there's a really easy workaround for that.

Basically, the task is to count the number of set bits from the most significant bit until it finds an unset bit. I thought I had this all figured out, except I'm having trouble finding and propagating the first non-set bit. My idea was to inverse and propagate the (now) leftmost 1-bit to the right to be able to isolate it and then shift to the right by three (since the isolation will shift it one up), the result should become the number of set 1 bits on the right from doing this.

My biggest obstacle in this is finding a leftmost bit (be it set or unset) and propagating it... Any ideas, hints or clues?

An example of what my theoretical algorithm would do:

``````1110 0101 1011 1100    // our target
0001 1010 0100 0011    // invert it
0001 1111 1111 1111    // propagate
0001 0000 0000 0000    // magic happens -- isolate the leftmost 1 bit
0000 0100 0000 0000    // shift by >>2
// it's at this point I realize I have no idea what I'm doing anymore
// this looks like 2^10 which is a bit too big...
``````

So basically, I have nothing. Can someone please just give me a hint as to what I should be reading about?

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Maybe you should show your code. –  paddy Sep 20 '12 at 23:44
Is the size of the number known/fixed (eg 32 bits)? –  James Sep 20 '12 at 23:49
Are you trying to get the answer `0000 0000 0000 1010`, to say that there were 10 bits set in the original value? Your description of the problem is a little unclear. –  paddy Sep 20 '12 at 23:56
@paddy: my reading of the question is that the answer should be 3, since that's the number of most significant bits set until the unset bit. But honestly, I'm not 100% sure. –  Michael Burr Sep 20 '12 at 23:58

## closed as too localized by Hans Passant, GWW, BЈовић, cHao, kapaSep 23 '12 at 18:41

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"Brute force" solution for 8-bit integers by testing each bit one by one:

``````int countLeadingBits(int8 x)
{
int isSetFirst1 = (!!(x & 0x80));               /* 1 if bit pattern is 1xxxxxxx */
int isSetFirst2 = (!!(x & 0x40)) & isSetFirst1; /* 1 if bit pattern is 11xxxxxx */
int isSetFirst3 = (!!(x & 0x20)) & isSetFirst2; /* 1 if bit pattern is 111xxxxx */
int isSetFirst4 = (!!(x & 0x10)) & isSetFirst3; /* etc */
int isSetFirst5 = (!!(x & 0x08)) & isSetFirst4;
int isSetFirst6 = (!!(x & 0x04)) & isSetFirst5;
int isSetFirst7 = (!!(x & 0x02)) & isSetFirst6;
int isSetFirst8 = (!!(x & 0x01)) & isSetFirst7;

return isSetFirst1 +
isSetFirst2 +
isSetFirst3 +
isSetFirst4 +
isSetFirst5 +
isSetFirst6 +
isSetFirst7 +
isSetFirst8;
}
``````

The idea is to isolate one bit like `x & 0x40`, then translate it to 0 or 1 using the double-negation `!!`, and then we can use `&` like a boolean operator on numbers that we know must be 0 or 1. Once we have tested all the bits we can simply count how many are set by adding them.

I will leave it to you to extend this to as many bits are you need.

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