1911 Encyclopædia Britannica/Free Reed Vibrator
FREE REED VIBRATOR (Fr. anche libre, Ger. durchschlagende Zunge, Ital. ancia or lingua libera), in musical instruments, a thin metal tongue fixed at one end and vibrating freely either in surrounding space, as in the accordion and concertina, or enclosed in a pipe or channel, as in certain reed stops of the organ or in the harmonium. The enclosed reed, in its typical and theoretical form, is fixed over an aperture of the same shape but just large enough to allow it to swing freely backwards and forwards, alternately opening and closing the aperture, when driven by a current of compressed air. We have to deal with air under three different conditions in considering the phenomenon of the sound produced by free reeds. (1) The stationary column or stratum in pipe or channel containing the reed, which is normally at rest. (2) The wind or current of air fed from the bellows with a variable velocity and pressure, which is broken up into periodic air puffs as its entrance into pipe or channel is alternately checked or allowed by the vibrator. (3) The disturbed condition of No. 1 when acted upon by the metal vibrator and by No. 2, whereby the air within the pipe is forced into alternate pulses of condensation and rarefaction. The free reed is therefore not the tone-producer but only the exciting agent, that is to say, the sound is not produced by the communication of the free reed’s vibrations to the surrounding air,[1] as in the case of a vibrating string, but by the series of air puffs punctuated by infinitesimal pauses, which it produces by alternately opening and almost closing the aperture.[2] A musical sound is thus produced the pitch of which depends on the length and thickness of the metal tongue; the greater the length, the slower the vibrations and the lower the pitch, while on the contrary, the thicker the reed near the shoulder at the fixed end, the higher the pitch. It must be borne in mind that the periodic vibrations of the reed determine the pitch of the sound solely by the frequency per second they impose upon the pulses of rarefaction and condensation within the pipe.
From J. B. Biot, Traité de physique experimentale.
A, Tuning wire.
D, Free reed.
R, Reed-box.
B,C, Feed pipe with
conical foot.
T, Part of resonating pipe,
the upper end with cap
and vent hole being shown
separately at the side.
Fig. 2.—Organ pipe fitted with beating reed.
AL, Beating reed.
R, Reed box.
Ff, Tuning wire.
TV, Feed pipe.
VV, Conical foot.
S, Hole through which
compressed air is fed.
The most valuable characteristic of the free reed is its power
of producing all the delicate gradations of tone between forte and
piano by virtue of a law of acoustics
governing the vibration of free reeds,
whereby increased pressure of wind
produces a proportional increase in the
volume of tone. The pitch of any sound
depends upon the frequency of the
sound-waves, that is, the number per
second which reach the ear; the fullness
of sound depends upon the amplitude
of the waves, or, more strictly speaking,
of the swing of the transmitting particles
of the medium—greater pressure in the
air current (No. 2 above) which sets the
vibrator in motion producing amplitude
of vibration in the air within the
receptacle (No. 3 above) serving as resonating
medium. The sound produced by
the free reed itself is weak and requires
to be reinforced by means of an
additional stationary column or stratum of
air. Free reed instruments are therefore
classified according to the nature of the
resonant medium provided:—(1) Free
reeds vibrating in pipes, such as the reed
stops of church organs on the continent
of Europe (in England the reed pipes are generally provided
with beating reeds, see Reed Instruments and Clarinet).
(2) Free reeds vibrating in reed compartments and reinforced
by air chambers of various shapes and sizes as in the harmonium
(q.v.). (3) Instruments like the accordion and
concertina having the free reed set in vibration through a valve,
but having no reinforcing medium.
The arrangement of the free reed in an organ pipe is simple, and does not differ greatly from that of the beating reed shown in fig. 2 for the purpose of comparison. The reed-box, a rectangular wooden pipe, is closed at the bottom and covered on one face with a thin plate of copper having a rectangular slit over which is fixed the thin metal vibrating tongue or reed as described above. The reed-box, itself open at the top, is enclosed in a feed pipe having a conical foot pierced with a small hole through which the air current is forced by the action of the bellows. The impact of the incoming compressed air against the reed tongue sets it swinging through the slit, thus causing a disturbance or series of pulsations within the reed-box. The air then finds an escape through the resonating medium of a pipe fitting over the reed-box and terminating in an inverted cone covered with a cap in the top of which is pierced a small hole or vent. The quality of tone of free reeds is due to the tendency of air set in periodic pulsations to divide into aliquot vibrations or loops, producing the phenomenon known as harmonic overtones or upper partials, which may, in the highly composite clang of free reeds, be discerned as far as the 16th or 20th of the series. The more intermittent and interrupted the air current becomes, the greater the number of the upper partials produced.[3] The power of the overtones and their relation to the fundamental note depend greatly upon the form of the tongue, its position and the amount of the clearance left as it swings through the aperture.
Free reeds not associated with resonating media as in the concertina are peculiarly rich in harmonics, but as the higher harmonics lie very close together, disagreeable dissonances and a harsh tone result. The resonating pipe or chamber when suitably accommodated to the reed greatly modifies the tone by reinforcing the harmonics proper to itself, the others sinking into comparative insignificance. In order to produce a full rich tone, a resonator should be chosen whose deepest note coincides with the fundamental tone of the reed. The other upper partials will also be reinforced thereby, but to a less degree the higher the harmonics.[4]
- ↑ See H. Helmholtz. Die Lehre von den Tonempfindungen (Brunswick, 1877), p. 166.
- ↑ See also Ernst Heinrich and Wilhelm Weber, Wellenlehre (Leipzig. 1825), where a particularly lucid explanation of the phenomenon is given, pp. 526-530.
- ↑ See Helmholtz, op. cit. p. 167.
- ↑ These phenomena are clearly explained at greater length by Sedley Taylor in Sound and Music, (London, 1896), pp. 134-153 and pp. 74-86. See also Friedrich Zamminer, Die Musik und die musikalischen Instrumente, &c. (Giessen, 1855), p. 261.