# Implementation of a math function

How can I implement the following function in C#? :

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I suggest you familiarize yourself with System.Math.Pow - msdn.microsoft.com/en-us/library/system.math.pow(VS.71).aspx - this will allow you to handle both exponents and nth roots. –  Steven Richards Dec 11 '09 at 23:37
Building a piano, are you? –  Eric Lippert Dec 12 '09 at 0:25
Yeah, and it's going to be a 3D piano in WPF ;) –  Alon Gubkin Dec 12 '09 at 8:34
The frequency of the 49th key from the left end of a piano is 440 Hz. That's the string you start tuning a piano from; you get it right, and then you tune every other string from it. The formula given is the formula for the frequency of the nth key on a piano. Incidentally, thanks for the great question Alon, I'll be writing a blog about this in January. –  Eric Lippert Dec 15 '09 at 17:14
And if you guys are interested in a short history and justification of the equal temperament, I wrote some blog articles about it a few years ago. blogs.msdn.com/ericlippert/archive/tags/Music/default.aspx –  Eric Lippert Dec 15 '09 at 17:16

double F = 440.0 * Math.Pow(2.0, (n-49.0)/12.0);
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+1 for calling Math.Pow only once –  ram Dec 11 '09 at 23:44
You are correct, the equation can be simplified to your answer, but I did a direct implementation. –  Yuriy Faktorovich Dec 11 '09 at 23:44
440 * Math.Pow(Math.Pow(2, 1.0/12), n - 49)
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+1, strict to point –  Rubens Farias Dec 11 '09 at 23:39
440 * 12th root of 2 raised to n-49
= 440 * (2 ^ 1/12) ^(n-49)
= 440 * 2^(n/12) / 2^(49/12)
= 440 * 2^(n/12) / (2^4 * 2^1/12)
= 440 * ( 1 / 2^4 ) * 2^((n-1) /12)
= 8 * 55 * ( 1/16 ) * 2^((n-1) /12)
= 27.5 * 2^((n-1) /12)

so ....

double d = 27.5 * Math.Pow(2, (n-1) / 12.0)

And since 12th root of 2 = 1.0594630943592952645618252949463, then

double d  = 27.5 * Math.Pow(1.0594630943592952645618252949463, (n-1))

so...

double d = 27.5 * Math.Pow(1.059463094359295, (n-1));
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I hope that if this solution is used, a comment is placed for maintainability. –  Yuriy Faktorovich Dec 12 '09 at 3:06
You sure that math is right? Try n = 49. You should get 440. –  Eric Lippert Dec 12 '09 at 5:27
good catch 12th root of 2 = 1.0594630943592952645618252949463, not .083333333333333 ... I ran Windows calc badly... I have edited to correct. –  Charles Bretana Dec 12 '09 at 16:11
Another thing. You have a 32 digit number there. Doubles are automatically rounded to around 15 digits, and the human ear cannot hear a difference between two tones that differ by so little anyway. You might want to lose about twenty of those digits: writing code that has ludicrous amounts of precision like this fools the reader into believing that such code is meaningful. –  Eric Lippert Dec 12 '09 at 16:45
@Eric, good point... I sort of expected the compiler to sqauwk at me if I put too many there... So when it didn't, I was too lazy to look up the limit for myself... You say it's around 15 digits ? I'll edit to that... ANd I tested with next three lower octaves of C, (n = 37, 25, and 13), and got 220, 110, and 55, respectively, so I 'spect it's right on now... –  Charles Bretana Dec 12 '09 at 23:08