Tone (music)

A musical tone is the sound produced by a musical instrument playing a particular musical note. A laboratory determination of pitch is made by a subject listening to a note and to the tone of a single sinusoidal wave of one frequency (such as that produced by a tuning fork), and identifying at what frequency the note and the sinusoid sound alike. However, the tone of an instrument is determined only partially by pitch. The differences in tone between musical instruments can be analyzed using Fourier series to identify the frequencies comprising the tone.

The frequency spectrum of a musical instrument playing a particular note varies with the instrument and with the way that it is played. The manner of playing determines the sound envelope of a note, and therefore the amplitude of its constituent frequencies.

Some instruments (like the flute or the violin) exhibit a fundamental frequency and multiples of that frequency called harmonics, all of various amplitudes and phases, and others (like the cymbal or the drum) do not.

These ideas find application in the construction of music synthesizers and musical instruments of all kinds.

Helmholtz' theory
A single note is often referred to as a tone, the lowest frequency present as the fundamental or prime partial tone and harmonics of this frequency that appear when a note is played on an instrument as harmonic upper partial tones or upper tones or partial tones. Where only one frequency is present, as with a tuning fork, it is called a simple tone: These words identify the organ as a form of mechanical rather than electronic music synthesizer. They also lay out the characterization of a musical note by its constituent frequency components, in the same way that a Fourier series expresses a periodic waveform in terms of its harmonic components.

Fourier series
As the remarks of Helmholtz suggest, the sound of a note played upon each instrument is characterized by not only its fundamental tone or frequency, which is the same for all instruments, but by the higher partial tones or harmonics in the note, which are different in amplitude and in phase for each instrument, making them sound different.

A musical note is a a periodic function in time and in space, modulated by a sound envelope. That is, the note can be expressed in one spatial dimension as:
 * $$n(x,\ t) = s(x-vt)f(x-vt) \, $$

where s is the sound envelope that expresses the duration of the note at a fixed location or its extent in space at a fixed time, and f is a periodic function of its argument:
 * $$f(x+\lambda -vt)=f\left(x-v(t+T)\right) = f(x-vt) \, $$

with &lambda; the wavelength of f and T = &lambda;/v the period of f and v the speed of propagation of f through space.

The periodic factor in such a wave can be analyzed using a Fourier series to show it is made up of a summation of sinusoidal waves, each with their own frequency. These frequency components are useful in distinguishing the different characteristics of the same note played upon different instruments, as shown approximately in the figure. The spectrum is altered somewhat by the sound envelope, so the musician has some control over the tone.

Naturally, besides the tone produced by the instrument, the musical experience also depends upon how the ear responds to the tone, and how the tone is modified by the auditorium where it propagates.