# Optimizing a floating point division and conversion operation

I have the following formula

``````float mean = (r+b+g)/3/255.0f;
``````

I want to speed it up. There are the following preconditions

``````0<= mean <= 1  and 0 <= r,g,b <= 255 and r, g, b are unsigned chars
``````

so if I try to use the fact that >> 8 is like dividing by 256 and I use something like

``````float mean = (float)(((r+b+g)/3) >> 8);
``````

this will always return 0. Is there a way to skip the costly float division and still end up with a mean between 0 and 1?

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Pre-convert your divisions into a multiplicable constant:

``````a / 3 / 255
``````

is the same as

``````a * (1 / (3 * 255))
``````

so pre-compute:

``````const float AVERAGE_SCALE_FACTOR = 1.f / (3.f * 255.f)
``````

then just do

``````float mean = (r + g + b) * AVERAGE_SCALE_FACTOR;
``````

since multiplying is generally a lot faster than dividing.

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+1 for a solution that will most likely lead to a speed up and can be elegantly implemented. However it's worth measuring to ensure that it is really that faster. –  sharptooth Sep 2 '09 at 8:40
If your compiler is optimizing at all, the multiplication should be fine. The shift trick probably won't work for floats. It operates on bits, not numbers. –  Chris Lutz Sep 2 '09 at 8:48
gcc has -freciprocal-math option that does this optimization trick for you. –  Pavel Shved Sep 2 '09 at 9:03
A expression like "3/255.0f" will always be calculated and replaced by the resulting constant by the compiler. Its of course a good idea to create such a const for code clearness, but i strongly doubt that it will bring any performance increase. –  RED SOFT ADAIR Sep 2 '09 at 11:21
No, in this case it won't. The division operator in C associates left-to-right, so the first division is an integer division by 3, and the second is a floating point division by 255.0 - this sequence does not give the same result as a single division by (3 * 255.0), so the compiler is not free to do that. –  caf Sep 2 '09 at 23:54

you obviously compare the mean to something else, which is also between 0 and 1. how about you just multiply that something by 255 instead?

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unfortunately I can't skip the division. The normalization is mandatory because it has to eventually occur anyways for normalized cross correlation –  ldog Sep 2 '09 at 8:32
+1 for the pragmatic solution. –  Chris Lutz Sep 2 '09 at 8:32

Lets find out what a real compiler actually does with this code shall we? I like mingw gcc 4.3 (x86). I used "gcc test.c -O2 -S -c -Wall"

This function:

```float calc_mean(unsigned char r, unsigned char g, unsigned char b)
{
return (r+b+g)/3/255.0f;
}```
generates this object code (function entry and exit code removed for clarity. I hope the comments I added are roughly correct):
``` movzbl 12(%ebp), %edx    ; edx = g
movzbl 8(%ebp), %eax     ; eax = r
addl %eax, %edx        ; edx = eax + edx
movzbl 16(%ebp), %eax    ; eax = b
addl %eax, %edx        ; edx = eax + edx
movl \$1431655766, %eax ;
imull %edx              ; edx *= a const
flds LC0               ; put a const in the floating point reg
pushl %edx              ; put edx on the stack
fidivrl (%esp)            ; float reg /= top of stack
```

Whereas this function:

```float calc_mean2(unsigned char r, unsigned char g, unsigned char b)
{
const float AVERAGE_SCALE_FACTOR = 1.f / (3.f * 255.f);
return (r+b+g) * AVERAGE_SCALE_FACTOR;
}
```

generates this:

``` movzbl 12(%ebp), %eax
movzbl 8(%ebp), %edx
movzbl 16(%ebp), %edx
flds LC2
pushl %eax
fimull (%esp)
```

As you can see, the second function is better. Compiling with -freciprocal-math converts the fidivrl from the first function into an fimull, which ought to be an improvement. But the second function is still better.

However, if you consider that a modern desktop CPU has something like an 18 stage pipeline and that it is capable of executing several of these instructions per cycle, you can see that the performance of these functions will be dominated by stalls due to data dependencies. Hopefully your program has this code snippet inlined and with some loop unrolling.

Considering such a small code fragment in isolation isn't ideal. It's a bit like driving a car with binoculars glued to your eye sockets. Zoom out man!

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