The theoretical basis of the synthesis of sine waves from square waves will now be described.
A square wave of angular repetition frequency to has the following components:
Sin wt+ /a sin 3 wt+ /5 sin 5 wt sin 7 wt+% sin wt-I- where the amplitude of the fundamental component, sin wt is one. Similarly the components of a square wave of amplitude one third of the fundamental component of the first square wave and three times its frequency are:
/3 sin 3 wt+ ,4 sin 9 wt+ sin 15 wt and those of a square wave of a fifth of the amplitude of the fundamental component of the first square wave and five times its frequency are:
/5 sin 5 wt+ sin 15 wt If the second square wave, i.e. that of angular frequency 3w, is subtracted from first or primary square wave no components of angular frequencies 3w, 9w and 15w will be present in the resultant signal. Similarly the components of angular frequency SW and 7w can be eliminated by taking the third square Wave, i.e. that of angular frequency SW, and one of angular frequency 7w from the first square wave. The process cannot be carried out indefinitely since some high frequency components do not continue to cancel. For example subtraction of the third square 'wave restores a component at angular frequency 15w which was eliminated by subtracting the second wave. However by subtracting square waves of angular frequency 3w, SW and 7w a sine wave with harmonic below 3% can be produced. 'Further harmonics may be removed by filters. Since the remaining harmonies are well removed in frequency from the fundamental and are already of low level in comparison with the fundamental, the filters required present little difliculty of design and require only a comparatively low loss at the frequency to be rejected. Moreover a single filter will suflice even where the fundamental frequency varies over a range of 2 to 1 or more.
