The major triad (Example A06.frequency.pd, Page ) shows one way to combine several sinusoids together by summing. There are many other possible ways to organize collections of sinusoids, of which we'll show two. Example A07.fusion.pd (Figure 1.14) shows four oscillators, whose frequencies are tuned in the ratio 1:2:3:4, with relative amplitudes 1, 0.1, 0.2, and 0.5. The amplitudes are set by multiplying the outputs of the oscillators (the *~ objects below the oscillators).
The second, third, and fourth oscillator are turned on and off using a toggle switch. This is a graphical control, like the number box introduced earlier. The toggle switch puts out 1 and 0 alternately when clicked on with the mouse. This value is multiplied by the sum of the second, third, and fourth oscillators, effectively turning them on and off.
Even when all four oscillators are combined (with the toggle switch in the ``1" position), the result fuses into a single tone, heard at the pitch of the leftmost oscillator. In effect this patch sums a four-term Fourier series to generate a complex, periodic waveform.
Example A08.beating.pd (Figure 1.15) shows another possibility, in which six oscillators are tuned into three pairs of neighbors, for instance 330 and 330.2 Hertz. These paris slip into and out of phase with each other, so that the amplitude of the sum changes over time. Called beating, this phenomenon is frequently used for musical effects.
Oscillators may be combined in other ways besides simply summing their output, and a wide range of resulting sounds is available. Example A09.frequency.mod.pd (not shown here) demonstrates frequency modulation synthesis, in which one oscillator controls another's frequency. This will be more fully described in Chapter 5.