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I was astounded to find that the System.Numerics.Complex data type in .NET doesn't yield mathematically accurate results.

Complex.Sqrt(-1) != Complex.ImaginaryOne

Instead of (0, 1), I get (6.12303176911189E-17, 1), which looks a lot like a rounding error.

Now I realize that floating point arithmetic will lead to results like this sometimes, but usually using integers will avoid rounding errors.

Why does this seemingly basic operation yield an obviously wrong result?

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3  
The type isn't broken, no reason for the dramatics. –  Henk Holterman Oct 9 '12 at 19:25
3  
@HenkHolterman Well, that's the best word I could find to describe it. –  Kendall Frey Oct 9 '12 at 19:26
    
Possible duplicate of Double precision problems on .NET and many others. –  Henk Holterman Oct 9 '12 at 19:27
1  
@HenkHolterman I know that. I know how floating point numbers work. And this is a case where it looks like it should work. –  Kendall Frey Oct 9 '12 at 19:55
1  
Given that Complex.Sqrt(-1) should equal Complex.ImaginaryOne, what is the suggested comparison operation if not an (in)equality check? –  Triynko Oct 9 '12 at 21:56

1 Answer 1

up vote 10 down vote accepted

Look at the decompiled Sqrt method.

public static Complex Sqrt(Complex value)
{
    return Complex.FromPolarCoordinates(Math.Sqrt(value.Magnitude), value.Phase / 2.0);
}

There is in fact a rounding error caused by using polar coordinates and radians. value.Phase / 2.0 will return pi/2, which isn't an exactly representable number. When converting from polar coordinates (1, pi/2), the rounding error becomes visible when the real coordinate nears zero.

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