So I'm trying to calculate log_{a}b (and get a floating point back, not an integer). I was planning to do this as log(b)/log(a)
. Mathematically speaking, I can use any of the cmath log functions (base 2, e, or 10) to do this calculation; however I will be running this calculation a lot during my program, so I was wondering if one of them is significantly faster than the others (or better yet, if there is a faster, but still simple, way to do this). If it matters, both a and b are integers.



Since
I'll leave it to you to choose the best "fastlog" function for your needs. 


First, precalculate Edit: I originally said that the natural logarithm (base e) would be fastest, but others state that base 2 is supported directly by the processor and would be fastest. I have no reason to doubt it. Edit 2: I originally assumed that
Strangely enough Microsoft doesn't supply a base 2 log function, which explains why I was unfamiliar with it. Also the x86 instruction for calculating logs includes a multiplication automatically, and the constants required for the different bases are also available via an optimized instruction, so I'd expect the 3 different log functions to have identical timing (even base 2 would have to multiply by 1). 


How about this: write the code so it's readable and clear. Use it. If, and only if, this clean implementation is too slow to be used, then optimize it. 


The answer is:
You don't even mention your CPU type, the variable type, the compiler flags, the data layout. If you need to do lot's of these in parallel, I'm sure there will be a SIMD option. Your compiler will optimize that as long as you use alignment and clear simple loops (or valarray if you like archaic approaches). Chances are, the intel compiler has specific tricks for intel processors in this area. If you really wanted you could use CUDA and leverage GPU. I suppose, if you are unfortunate enough to lack these instruction sets you could go down at the bit fiddling level and write an algorithm that does a nice approximation. In this case, I can bet more than one applepie that 2log is going to be faster than any other baselog 


In the 8087 instruction set, there is only an instruction for the logarithm to base 2, so I would guess this one to be the fastest. Of course this kind of question depends largely on your processor/architecture, so I would suggest to make a simple test and time it. 


On the platforms for which I have data, Write an implementation that is clear. Then measure the performance. 

