> Any other ideas? Another option is to use the 'plot as points' graph. You will get all the points that way, even if the size is too small.
> > I'm a bit new to FFT in the pd context, but I think I grok Nyquist -- > Sampling at S can, at best, yield the S/2 frequency (where S is the > sampling rate). But how does this relate to block size in the DFT? > Your original statement sounds like the max frequency out of the fft is > (block size)/2...but that can't be right, eh? exactly right. When you use rfft~ on a block-size of N, you will have N/2+1 points in the real part, indexed from 0 to N/2. You will have N/2-1 points in the imaginary part, indexed from 1 to N/2-1 (because the imaginary part of the fft of a real-valued signal is zero at the 0 frequency and at the Nyquist frequency). If you're using fft~, you will see the full spectrum from 0 to N-1, where the second half of the spectrum is the conjugate of the first half. For graphing purposes, you will probably just need the first half. _______________________________________________ PD-list@iem.at mailing list UNSUBSCRIBE and account-management -> http://lists.puredata.info/listinfo/pd-list