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Is there a more stable implementation for the cotangent function than return 1.0/tan(x);?

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I assume you're problem with 1/tan is that its undefined at pi/2 when the function should return zero? – MerickOWA Sep 17 '10 at 19:46
    
Doing the inversion is dodgy when close to pi/2 yes... I was wondering if there was a better way to do this. – Meh. Sep 17 '10 at 19:57
up vote 31 down vote accepted

cot(x) = cos(x)/sin(x) should be more numerically stable close to π/2 than cot(x) = 1/tan(x). You can implement that efficiently using sincos on platforms that have it.

Another possibility is cot(x) = tan(M_PI_2 - x). This should be faster than the above (even if sincos is available), but it may also be less accurate, because M_PI_2 is of course only an approximation of the transcendental number π/2, so the difference M_PI_2 - x will not be accurate to the full width of a double mantissa -- in fact, if you get unlucky, it may have only a few meaningful bits.

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Ok. I guess this is the best I can do. Also I learnt about sincos, which I must admit I had never met before! – Meh. Sep 17 '10 at 20:35
2  
Just remembered a trig identity that lets you do much better & edited my answer. – zwol Sep 17 '10 at 21:13
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+1. Definitely use tan(pi/2 - x). – Alexandre C. Sep 17 '10 at 21:15

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