Subject: Re: two sine tones simultaneously within one critical band From: Bob Masta <audio(at)DAQARTA.COM> Date: Fri, 7 Oct 2005 08:44:59 -0400On 7 Oct 2005 at 12:40, Reinhart Frosch wrote: > Sound pressure of first sine-tone: > > p_1(t) = p_0 * sin(99 * 2pi * t); > > sound pressure of second sine-tone: > > p_2(t) = p_0 * sin(101 * 2pi * t). > > [ * = multiplication sign; t = time in seconds.] > > Total sound pressure: > > p(t) = p_1(t) + p_2(t) = 2p_0 * cos(t) * sin(100 * t). > > That last formula implies a 100-hertz sine-tone > amplitude-modulated so that there are two beats per second. > > The 1-mm-long basilar membrane piece strongly excited by a > soft 99-hertz sine-tone and that strongly excited by > a soft 101-hertz sine-tone overlap almost completely. > Reinhart: I am completely at a loss to understand how you arrived at your last formula. It appears that you have not simply added the pressure waves, but multiplied them. This is not what happens in air at normal sound levels, where there is essentially no nonlinearity. In air the two original tones are linearly summed and spectral analysis of the waveform output from a (linear) microphone shows that only those components are present. The beat tones are only in the head of the listener. Best regards, Bob Masta audioATdaqartaDOTcom