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I just wonder how can i round to the nearest zero bitwise? Previously, I perform the long division using a loop. However, since the number always divided by a number power by 2. I decide to use bit shifting. So, I can get result like this:


can I do this by performing the long division like usual?


if I use this kind of bit shifting, are the behavior different for different compiler? how about rounding up? I am using visual c++ 2010 compiler and gcc. thx

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I think it depends on a few factors, are you shifting signed or unsigned ints? What width? I found this link interesting for learning more about C and integers – Wayne Uroda Apr 9 '13 at 3:35
ah. it's signed int (32bit) – Jo Skorsev Apr 9 '13 at 3:37
In my experience if you write int x; int y; y = x/4; then any compiler worth a damn should convert that /4 into a bitshift for you (with optimisations turned on). – Wayne Uroda Apr 9 '13 at 3:51
Why is floating-point involved? – harold Apr 9 '13 at 8:14

1 Answer 1

up vote 3 down vote accepted

Bitwise shifts are equivalent to round-to-negative-infinity divisions by powers of two, meaning that the answer is never bigger than the unrounded value (so e.g. (-3) >> 1 is equal to -2).

For non-negative integers, this is equivalent to round-to-zero.

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what do you mean by round to negative infinity? so, you are saying, the behavior produced by bitwise shifts isn't vary from one compiler to different compiler? – Jo Skorsev Apr 9 '13 at 3:39
Provided you're using 2s-complement and arithmetic shifting for signed ints, it should be the same for all compilers. – nneonneo Apr 9 '13 at 3:48
Round to negative infinity means if the result is say 2.5 or -2.5, the rounding always makes the number smaller (to the next smaller integer), so 2.x => 2 and -2.x => -3. – Wayne Uroda Apr 9 '13 at 3:49
Hi @nneonneo ...can you offer a source or spec sheet somewhere so I can read more about this? I'm getting into JS and using bitwise operators, and I'm trying to wrap my head around exactly how a bitwise operator will always truncate numbers after a decimal point. Yours is the first answer I've found that offers an explanation, and I'd like to know where this knowledge came from. – TylerH Jul 31 '14 at 18:00 gives a good overview. – nneonneo Jul 31 '14 at 19:43

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