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I should create a program which computes the cosines and sines of a sequence of angles k*α, where k is a growing natural number (i.e., 0, 1, 2,...) and α is a constant angle which lies between 0 and π. I would like to make this program as fast as possibile.

Hence, I want to compute first the cosine of each angle, and then the related sine with sqrt(1-cos(k*α)^2). The problem is the sign of the sine, which should be determined by the position of the angle k*α on the real line.

I would like to know how I could implement this dynamic comparison as fast as possibile, or if the fastest way to proceed is to compute directly the sine, too.

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up vote 0 down vote accepted

After some time, I thought again about this problem and I found a really simple solution:

n = floor(k*alpha/pi);

if (n % 2 == 0)

    sin_alpha = +sqrt(1-pow(cos(k*alpha,2)));


    sin_alpha = -sqrt(1-pow(cos(k*alpha,2)));

Problem solved. :)

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