# modulo vs bitwise op

Which of the following methods is more efficient ( in Scheme, but I guess it doesn't matter)? (The objective is to get the least significant bit)

`(define (lsb n) (- n (bitwise-and n (- n 1))))`

`(define (lsb n) (remainder n 2))`

(For those who aren't familiar with Scheme.

``````int lsb (int n)
{
return n % 2;
}
``````

vs

``````int lsb (int n)
{
return n - (n & (n - 1));
}
``````

Thanks!

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Before you care about performance, you need to make them do the same things. Just for example, given 1024 as the parameter, your first returns 1024 and your second returns 0. –  Jerry Coffin Sep 10 '12 at 5:07
`n % 2` is almost equivalent to `n & 1` (but not quite, `remainder` has the sign of the dividend), not to `n & -n` (which is what `n - (n & (n - 1))` is doing in a roundabout way). You've managed to make "least significant bit" ambiguous - do you mean the bit with a weight of one, or the lowest set bit? –  harold Sep 10 '12 at 9:46
by LSB, I meant the rightmost bit –  user1508893 Sep 10 '12 at 14:37
So `n & 1`, right? Or `modulo n 2`. I'd probably go for `n & 1` just to be safe - firstly, no compiler could even mess that up, and secondly, you're working with bits so work with bits, not remainders. –  harold Sep 10 '12 at 14:42
@user1508893: If you really want to know whether x is even, use 'x % 2 == 0'. If you want the lsb, use 'x & 1'. In general bit manipulations should be avoided as they force you to make assumption about the representation of numbers. –  Antoine Mathys Sep 11 '12 at 16:02
show 6 more comments

If DIV have become more efficient in new CPUs it certainly wouldn't be faster than a bitwise operation so bitwise-and would probably, on most architectures, knock the socks out of remainder (that implies a div instruction)

If all you care about is the lsb why not write it like this:

``````(define (lsb n)
(bitwise-and 1 n))
``````
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You write incorrect question. You're trying to compare performance of different functions. For example, for n == 2, your 1st function returns zero, when 2nd returns 2.

so, if you want optimize both functions, then they are:

1st:

``````return n & 1;
``````

2nd:

``````return n & -n;
``````
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