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I want to compute the ceiling division of strictly positive integers. I have the choice between the following two implementations:

var ceil = new Func<int, int, int>((a, b) => a % b > 0 ? a / b + 1 : a / b);
var x = ceil(y, z); // y and z being int previously defined

and

var x = (int)Math.Ceiling((double)y / (double)z);

This second version (Math.Ceiling) seems to be just the same as the first (with a lambda) but with 3 conversions added. So I feel like using the first one. Am I missing something?

(edited to precise the fact that it's meant to only deal with strictly positive integers)

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Why use a lambda here? Why not just use a normal function? –  Konrad Rudolph Dec 13 '11 at 15:40
5  
I doubt you'd see any significant performance degradation with the conversions. Plus the Math.Ceiling is far more readable in terms of intent. I wouldn't optimize until you know that this is a problematic piece of code. –  James Michael Hare Dec 13 '11 at 15:43
    
@Konrad I'm not sure to understand your question. Are you saying the second version is the one or are you thinking of something else ? –  Hugo Dec 13 '11 at 15:43
    
I'd also stick with Math.Ceiling. You can safely remove the cast before z because it isn't required to get floating point arithmetic on the division –  kev Dec 13 '11 at 15:49
1  
@kev I'd leave that cast in, because IMO it makes the code more self documenting. But that's just a matter of style. –  CodesInChaos Dec 13 '11 at 15:59

2 Answers 2

up vote 6 down vote accepted

Personally, I'd avoid worrying about optimizing out the int -> double conversions, these will typically be the least of your worries in performance. Yes, they can add up, but you'd need to be doing a lot in a tight loop or something similar.

I'd stick with the Math.Ceiling() since it's very obvious what you're trying to do and thus is easier to maintain. If you find your code is slow, then optimize and attack the biggest trouble-spots first.

Timing these over 1 billion iterations, it's 8,677 ms for lambda and 9,749 ms for Math.Ceiling(), but that's 0.0000087 ms vs 0.0000097 ms per call which is negligible.

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Note that this might not be an apples-to-apples comparison. For example, the jitter can inline the call to Math.Ceiling but cannot inline the delegate invocation. –  Eric Lippert Dec 13 '11 at 15:52
    
@EricLippert: Good point. Just to clarify I wasn't showing the times to say, "hey, the lambda is faster! Use it!" but to show that - roughly speaking - they are so close in performance that it's a very small optimization, if any, and loses some readability in the process. –  James Michael Hare Dec 13 '11 at 16:03
    
A question purely for those with a curiousity about the internals, but @EricLippert do you know if it actually can inline a call to Math.Ceiling, which is extern? –  Jon Hanna Dec 13 '11 at 16:17
    
@JonHanna: That's a good point, I forgot that it was extern'd. I don't know what the jitter does in that case. It would be interesting to find out. –  Eric Lippert Dec 13 '11 at 16:22
    
@EricLippert Please do if you can. The satisfaction to the curious will be worth the extra over-thinking by micro-optimisiers :) –  Jon Hanna Dec 13 '11 at 16:26

There is no reason to use a lambda instead of a method.

The second one is a bit ugly: You rely on floating point division to give an exact result when the dividend is an integral multiple of the divisor. While I can't think of a situation with 32 bit integers and double where this isn't the case, it still gives me a bad feeling. And if you later replace Int32 with Int64 it's suddenly no longer correct.

Just define a new normal method:

public static int IntDivisionCeiling(int dividend, int divisor)
{
  int quotient=dividend/divisor;
  if(dividend%divisor>0)
    return quotient;
  else
    return quotient+1;
}
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I don't think there's a bug. If the quotient is negative then so is the remainder. –  Eric Lippert Dec 13 '11 at 16:07
    
@Eric You're right. I misread that > as == and wasn't careful about the then vs. else part. –  CodesInChaos Dec 13 '11 at 18:02

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