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I need an efficent algorithm to do math::power function between two floats, do you have any idea how to do this, (i need the algorithm not to use the function itself)

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Have you heard of Taylor/Maclaurin series? en.wikipedia.org/wiki/Taylor_series –  Alex Dec 23 '10 at 10:51
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pow(x,y) = exp(y*log(x)) - so if you are able to use exp() and log() you are done (or implement the series) –  ring0 Dec 23 '10 at 11:00
    
looking at that wikipedia article it look more like pow(x,y) = exp(x*log(y)) [Where x is the base and y is the exponent] –  pcantin Dec 23 '10 at 12:19
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@pcantin exp(y*log(x)) = exp(log(x^y)) = x^y –  Nabb Dec 23 '10 at 14:51
    
@ring0 & @Nabb Sorry my bad. It must be the Baileys in my coffee –  pcantin Dec 23 '10 at 15:26

3 Answers 3

up vote 6 down vote accepted

The general algorithm tends to be computing the float power as the combination of the integer power and the remaining root. The integer power is fairly straightforward, the root can be computed using either Newton - Raphson method or Taylor series. IIRC numerical recipes in C has some text on this. There are other (potentially better) methods for doing this too, but this would make a reasonable starting point for what is a surprisingly complex problem to implement. Note also that some implementations use lookup tables and a number of tricks to reduce the computation required.

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Here is the page on GMP's powering algorithm:

Info: (gmp) Normal Powering Algorithm

It contains a reference to Knuth section 4.6.3 (that is, Knuth's The Art of Computer Programming).

EDIT: I was not aware that GMP does not support non-integer exponents; thanks to marcog for bringing that up. As noted in comments, we could expand the algorithm to handle non-integer exponents by similarly taking repeated square roots for the fractional part of the exponent, but I would have to do some research to find out the numerical properties of this algorithm. I believe MPFR supports non-integer powers, and I know for a fact that Pari/GP does, and these are both open source projects. I've looked at Pari/GP source a bit, and from what I have seen, the code is extensively commented; on the other hand, since powering is handled via the ^ operator, I'm not sure where the actual code that handles that is located. Of course you can also consult the other answers for available algorithms. Sorry for the mix-up.

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That only works for integer powers. –  marcog Dec 23 '10 at 12:07
    
@marcog: Your claim "That only works for integer powers" is wrong. The "f" in "mpf" stands for float. I suppose you gave me a down vote? Oh well. –  Mitch Schwartz Dec 23 '10 at 12:11
    
@Mitch No downvote. It still only explains the integer algorithm. –  marcog Dec 23 '10 at 12:15
    
@marcog: I guess you mean Knuth 4.6.3? It's a long chapter; I'm looking it over. –  Mitch Schwartz Dec 23 '10 at 12:20
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@Mitch No worries, we all misinterpret things from time to time. –  marcog Dec 23 '10 at 13:37

See this wikipedia article which gives an overview of several methods used.

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