# Division to the nearest 1 decimal place without floating point math?

I am having some speed issues with my C# program and identified that this percentage calculation is causing a slow down. The calculation is simply n/d * 100. Both the numerator and denominator can be any integer number. The numerator can never be greater than the denominator and is never negative. Therefore, the result is always from 0-100. Right now, this is done by simply using floating point math and is somewhat slow, since it's being calculated tens of millions of times. I really don't need anything more accurate than to the nearest 0.1 percent. And, I just use this calculated value to see if it's bigger than a fixed constant value. I am thinking that everything should be kept as an integer, so the range with 0.1 accuracy would be 0-1000. Is there some way to calculate this percentage without floating point math?

Here is the loop that I am using with calculation:

``````for (int i = 0; i < simulationList.Count; i++)
{
for (int j = i + 1; j < simulationList.Count; j++)
{
int matches = GetMatchCount(simulationList[i], simulationList[j]);
if ((float)matches / (float)simulationList[j].Catchments.Count > thresPercent)
{
simulationList[j].IsOverThreshold = true;
}
}
}
``````
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I assume it's a fairly sparse/tight loop where that might cause such a bottleneck. Can we see it? –  spender Apr 11 '10 at 0:53
I would guess that if this is really what's slowing down your program, cache effects will likely be playing just as big a role as the difference between integer and floating-point maths. Additionally boxing/unboxing or anything else that might cause allocation I would expect to have a bigger effect than the maths operations. –  Weeble Apr 11 '10 at 0:54
I just added the loop that I am using to the message. –  John Sheares Apr 11 '10 at 1:17

Instead of `n/d > c`, you can use `n > d * c` (supposing that `d > 0`).
(`c` is the constant value you are comparing to.)

This way you don't need division at all.

However, watch out for the overflows.

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This is good, since it even gets rid of division completely, which is usually more expensive than multiplication. –  Matti Virkkunen Apr 11 '10 at 0:52
Nowadays, division and multiplication cost the same on modenr CPUs. –  David R Tribble Apr 11 '10 at 1:15
@Loadmaster: isn't integer multiplication cheaper than conversion from ints to floats and floating point division? –  Vlad Apr 11 '10 at 1:19
@Loadmaster: Seems I'm a bit out of date then, since I always thought integer multiplication was less expensive than integer division. @Vlad: It is, however you can do it with integer division too by doing (1000 * n) / d –  Matti Virkkunen Apr 11 '10 at 1:22
@Matti: optimizing compilers replace integer division by a constant with integer multiplication and a bit shift, hence no difference in cost. I'm pretty sure division by a variable is still several times slower than multiplication. –  Ben Voigt Apr 11 '10 at 1:26

If your units are in tenths instead of ones, then you can get your 0.1 accuracy using integer arithmetic:

``````for (...)
{
float n = ...;
float d = ...;

if (n / d > 1.4) // greater than 140% ?
``````

...do something like:

``````for (...)
{
int n = 10 * ...;
int d = ...;
if (n / d > 14) // greater than 140% ?
``````
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For speed, use `double` instead of `float`. –  Henk Holterman Apr 11 '10 at 9:13
... or even int :-) –  Vlad Apr 11 '10 at 10:15

``````if ((float)matches / (float)simulationList[j].Catchments.Count > thresPercent)
``````

write this:

``````if (matches * theresPercent_Denominator > simulationList[j].Catchments.Count * thresPercent_Numerator)
``````

In this way, you get rid of the floating points.

Note: `thresPercent` can be expressed as `thresPercent_Numerator / theresPercent_Denominator`, as long as the number is a rational number.) I think this is the optimal way on PC. For some other platform, you may further optimize it by left-shift or right-shift, if theresPercent_Denominator and/or thresPercent_Numerator are 2's power. (Normally left-shift is enough, but may need use right-shift by rearrange the equation to division, to prevent from overflow)

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