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I was searching about isolating the Right-most bit stuff in binary :

And I got this solution :

y = x & (-x)

so :

    10111100  (x)
&   01000100  (-x)
    --------
    00000100

But now , I want to find the magnitude of a number by finding the left most digit ( not the sign though...)

How can I elaborate the solution of mine to find the most left-bit ?

examples :

10111100

01000100

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Why not just use Math.log? –  Bergi Jan 25 '13 at 11:26
    
Because this question is tagged as binary. –  Royi Namir Jan 25 '13 at 11:41
    
Actually, Math.log is probably the best way. –  Potatoswatter Jan 25 '13 at 12:16

1 Answer 1

up vote 3 down vote accepted

There's no similar O(1) bitwise trick to find the magnitude of a number. Many microprocessor instruction sets include a special instruction to "count leading zeroes." There is no such operator in the C language family which gave JavaScript its bitwise functionality.

The only O(1) alternative is to use Math.floor( Math.log( n ) / Math.LN2 ) A quick trial of

for ( var i = 0; i == Math.floor( Math.log( 1<<i ) / Math.LN2 ); ++ i ) ;

gives i == 31 as the result, due to the << operator using 32-bit two's complement signed arithmetic.

If you want to be a purist, you can repeatedly right-shift by one, which is O( log n ), or you can repeatedly right-shift by 16 >> i, for i from 0 to 4, rejecting shifts when the result is zero and otherwise accumulating 16 >> i. That is O(log log N) where N is the maximum possible value for n, which means constant time, but in all probability slower than Math.log.

Code for the O( log log N ) algo:

var mag = function( n ) {
     var acc = 0;
     for ( var i = 16; i; i >>= 1 ) {
         if ( n >> i ) {
             n >>= i;
             acc += i;
         }
     }
     return acc;
};

Of course, for any of these, you have to left-shift one by the result to obtain the "leftmost 1-bit" rather than an index.

EDIT: Note, the log based implementation returns -Infinity for zero, whereas the mag function returns 0, which is the same as its result for 1. If you want to account for the possibility of no leftmost 1-bit existing, better to make it a special case.

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isnt it suppose to be :Math.pow(2,Math.log(1000)/Math.log(2)) ? –  Royi Namir Jan 25 '13 at 13:32
    
@RoyiNamir That pow call is the same as the left shift I mentioned in the last paragraph before "EDIT." Take your pick. (Although using pow allows it to work with numbers outside the 32-bit range, so that's a major advantage.) –  Potatoswatter Jan 25 '13 at 13:40

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