Tricky arithmetic or sleight of hand?

Vincent answered Fast Arc Cos algorithm by suggesting this function.

``````float arccos(float x)
{
x = 1 - (x + 1);
return pi * x / 2;
}
``````

The question is, why `x = 1 - (x + 1)` and not `x = -x`?

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Notice: Appearantly the solution provided up here is not quite right, but the question is still there. –  David Weng Aug 1 '10 at 5:36

It returns a different result only when (x + 1) causes a loss of precision, that is, x is many orders of magnitude larger or smaller than one.

But I don't think this is tricky or sleight of hand, I think it's just plain wrong.

``````cos(0) = 1 but f(1) = -pi/2
cos(pi/2) = 0 but f(0) = 0
cos(pi) = -1 but f(-1) = pi/2
``````

where `f(x)` is Vincent's `arccos` implementation. All of them are off by `pi/2`, a linear approximation that gets at least these three points correct would be

``````g(x) = (1 - x) * pi / 2
``````
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I don't still get loss of precision part, could you please provide an example? –  David Weng Aug 1 '10 at 5:48
@David, try `1.0 - (1.0 + 1e-16)` vs `-(1e-16)` –  Anycorn Aug 1 '10 at 5:56
Take a look at the graph of acos - a better linear approximation (based on the tangent line at x=0) would be `g(x) = pi/2 - x`, which is pretty accurate except when x is close to -1 or 1 –  BlueRaja - Danny Pflughoeft Aug 2 '10 at 20:38
@BlueRaja: I agree that simply connecting these three points isn't optimal (and neither does using the tangent line at x=0 minimize the mean-square error), just that it's the most trivial approximation that could possibly be useful. The original one given by Vincent definitely was not useful. –  Ben Voigt Aug 3 '10 at 2:13

I don't see the details instantly, but think about what happens as x approaches 1 or -1 from either side, and consider roundoff error.

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Addition causes that both numbers are normalized (in this case, relevant for x). IIRC, in Knuth's volume 2, in the chapter on floating-point arithmetic, you can even see an expression like x+0.

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