sin(x) + sin(x*3)/3 + sin(x*5)/5 + sin(x*7)/7 + ...
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7:34
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I think the harmonic power is reduced when the number of cycles in the given period is increases
54indiasubbu 2 months ago
@boobtuber06 i think there are no even harmonics cause of the fourier coefficients, it probably turns out that the integral over one period of cos(nt)square(t) and sin(nt)square(t) is zero when n is even. It looks like the cos(nt)square(t) coefficient is zero for any n, and the sin(nt)square(t) coefficient for odd n is simply 1/n. dunno if that'll help.
tibbsy888 6 months ago
wow very nice
BankruptMonopoly 1 year ago
good work
usename80 1 year ago
why are there no eeven harmonics, what happened to them, why don't you want them. I do know odd harm holds the fund freq.
boobtuber06 1 year ago
Odd ordered harmonics ;)
fingerboy18 2 years ago
I'm happy to see octave-avifile in action!
sjvdwalt 3 years ago