Wikipedia says we can approximate Bark scale with the equation:
b(f) = 13*atan(0.00076*f)+3.5*atan(power(f/7500,2))
How can I divide frequency spectrum into
n intervals of the same length on Bark scale (interval division points will be equidistant on Bark scale)?
The best way would be to analytically inverse function (express
x by function of
y). I was trying doing it on paper but failed. WolframAlpha search bar couldn't do it also. I tried Octave
finverse function, but I got error.
Octave says (for simpler example):
octave:2> x = sym('x'); octave:3> finverse(2*x) error: `finverse' undefined near line 3 column 1
finverse description from Matlab: http://www.mathworks.com/help/symbolic/finverse.html
There could be also numerical way to do it. I can imagine that you just start from dividing the
y axis equally and search for ideal division by binary search. But maybe there are some existing tools that do it?