# convert frequency to keyboard note

I'm trying to write an audio application.

I can play a cin wave from a frequency of 20 to 20K to hear sounds. my question is how can i convert frequencies to keyboard notes in order to create a virtual keyboard (or piano) ? is there some kind of formula to achieve this ?

The programming language that I use is not important because I don't want to use other tools that calculate it for me. i want to write it myself so i need to understand the math behind it. thanks

# update

i found the following url: http://www.reverse-engineering.info/Audio/bwl_eq_info.pdf

that contains the octave prequency chart. do i need to store that list or is there a formula that can be used instead ?

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There are a few different ways to tune instruments. The most commonly used for pianos is the 12 tone equal temperament, a formula for which can be found here. The idea is that each pair of adjacent notes has the same frequency ratio.

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+1 for mentioning that equal temperament isn't the "only" system out there. –  Chris Jester-Young Apr 25 '11 at 14:13
If you are doing this is a musical context at all, you will definitely need to use a GLUT (general lookup table) against the even tempered scale, otherwise it will sound out of tune in various keys. –  J_Y_C Apr 25 '11 at 14:15
@J_Y_C: Are you referring to the wolf interval? That seems to affect meantone temperament, not the 12-tone equal temperament. –  Chris Jester-Young Apr 25 '11 at 14:20
@J_Y_C why is that? –  Andrew Apr 25 '11 at 14:40
Indeed, I have to ask the same question. So, as far as I understand (and I'm no music theory expert), meantone temperament sounds great for some keys, and terrible for others (due to the wolf interval). Equal temperament sounds slightly terrible for all keys, but eliminates the wolf interval. –  Chris Jester-Young Apr 25 '11 at 14:56

First, you need to know about A440. This is the "standard" pitch to tune everything else against.

Double the frequency to raise an octave; halve the frequency to drop an octave. It's clear from this that the tones are logarithmic relative to the frequencies.

There are multiple systems for deciding where on the logarithmic line the rest of the notes fall. A straightforward approach is to divide the semitones geometrically along the logarithmic scale (which is the approach xofon's answer uses), but there may be better ways.

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