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I wrote very simple code:

public static void Main (string[] args)
    String str="1,0992748756871115E+41"; //yes, I know that is very large value

    Double x=Convert.ToDouble(str);

    Double res=Math.Cos(x);

    Double resRound=Math.Round(res);

    Console.WriteLine("x={0}\nres={1}\nresRound={2}", x, res, resRound);

And this code output very large value of res value: 1,09927487568711E+41 which a equals to Math.Cos's arguments: screen

I thought, that is a bug of Gtk# and decided to test what value returns this code compilled by .NET Framework and it returned same value! Is that so the meaning of the function cos(x) exceeds the limits of segment from -1 to 1? How does it possible?

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It means the the function isn't precise at such high magnitudes. –  SLaks Jan 11 '13 at 3:49
You can just mod the value by 2*PI and take the COS of that... –  Servy Jan 11 '13 at 4:03
@Servy: Not really; the result would be completely meaningless. –  Oliver Charlesworth Jan 11 '13 at 4:19
@OliCharlesworth Well, yeah, given that double doesn't have sufficient precision to represent the digits that actually matter. Didn't think about that. –  Servy Jan 11 '13 at 5:26

2 Answers 2

up vote 3 down vote accepted

From the documentation:

Acceptable values of d range from approximately -9223372036854775295 to approximately 9223372036854775295. For values outside this range, the Cos method returns d unchanged rather than throwing an exception.

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Thank you. But what the reason to make it? –  Mixim Jan 11 '13 at 4:16
@Mixim: Because numbers of this size no longer have the precision to make the calculation of cos, etc. meaningful. –  Oliver Charlesworth Jan 11 '13 at 4:18

You can break down the expression to get the values like

Cost(A+B)= CosA *CosB -SinA * SinB

Break down as low as you can get within the documentation limit

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That will not help. A double simply doesn't have enough precision to make these calculations meaningful. –  Oliver Charlesworth Jan 11 '13 at 4:24
Yes you can...just divide your number by 2 and continue to do that until u get below the limit, when you divide if there is a remainder, put it in one of the numbers like cos (7) = cos3 *cos4 -sin3 *sin4 ....do the same ... –  Dan Hunex Jan 11 '13 at 6:12
You can do that, but the calculation won't tell you anything useful; with an input of 1e41 (as in the OP's example), the error is roughly 1e25. –  Oliver Charlesworth Jan 11 '13 at 8:44

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