Lesson 4: Resonance and Standing Waves

Natural Frequency

As has been previously mentioned in this unit, a sound wave is created as a result of a vibrating object. The vibrating object is the source of the disturbance which moves through the medium. The vibrating object which creates the disturbance could be the vocal chords of a person, the vibrating string and sound board of a guitar or violin, the vibrating tines of a tuning fork, or the vibrating diaphragm of a radio speaker. Any object which vibrates will create a sound. The sound could be musical or it could be noisy; but regardless of its quality, the sound was created by a vibrating object.

Nearly all objects, when hit or struck or plucked or strummed or somehow disturbed, will vibrate. If you drop a meter stick or pencil on the floor, it will begin to vibrate. If you pluck a guitar string, it will begin to vibrate. If you blow over the top of a pop bottle, the air inside will vibrate. When each of these objects vibrate, they tend to vibrate at a particular frequency or a set of frequencies. The frequency or frequencies at which an object tends to vibrate with when hit, struck, plucked, strummed or somehow disturbed is known as the natural frequency of the object. If the amplitude of the vibrations are large enough and if natural frequency is within the human frequency range, then the object will produce sound waves which are audible.

All objects have a natural frequency or set of frequencies at which they vibrate. The quality or timbre of the sound produced by a vibrating object is dependent upon the natural frequencies of the sound waves produced by the objects. Some objects tend to vibrate at a single frequency and they are often said to produce a pure tone. A flute tends to vibrate at a single frequency, producing a very pure tone. Other objects vibrate and produce more complex waves with a set of frequencies which have a whole number mathematical relationship between them; these are said to produce a rich sound. A tuba tends to vibrate at a set of frequencies which are mathematically related by whole number ratios; it produces a rich tone. Still other objects will vibrate at a set of multiple frequencies which have no simple mathematical relationship between them. These objects are not musical at all and the sounds which they create are best described as noise. When a meter stick or pencil is dropped on the floor, a vibrates with a number of frequencies, producing a complex sound wave which is clanky and noisy.

The actual frequency at which an object will vibrate at is determined by a variety of factors. Each of these factors will either effect the wavelength or the speed of the object. Since

an alteration in either speed or wavelength will result in an alteration of the natural frequency. The role of a musician is to control these variables in order to produce a given frequency from the instrument which is being played. Consider a guitar as an example. There are six strings, each having a different linear density (the wider strings are more dense on a per meter basis), a different tension (which is controllable by the guitarist, and a different length (also controllable by the guitarist). The speed at which waves move through the strings is dependent upon the properties of the medium - in this case the tightness (tension) of the string and the linear density of the strings. Changes in these properties would effect the natural frequency of a particular string. The vibrating portion of a particular string can be shortened by pressing the string against one of the frets on the neck of the guitar; this modification in the length of the string would effect the wavelength of the wave and in turn the natural frequency at which a particular string vibrates at. Controlling the speed and the wavelength in this manner allows a guitarist to control the natural frequencies of the vibrating object (a string) and thus produce the intended musical sounds. The same principles can be applied to any string instrument - whether it be the piano, harp, harpsichord, violin or guitar.

As another example, consider the trombone with its long cylindrical tube which is bent upon itself twice and ends in a flared end. The trombone is an example of a wind instrument. The "tube" of any wind instrument acts as a container for a vibrating air column; the air inside the tube will be set into vibrations by a vibrating reed or the vibrations of a musicians lips against a mouthpiece. While the speed of sound waves within the air column is not alterable by the musician (they can only be altered by changes in room temperature), the length of the air column is. For a trombone, the length is altered by pushing the tube outward away from the mouthpiece to lengthen it or pulling it in to shorten it. This causes the length of the air column to be changed, and subsequently changes the wavelength of the waves it produces. And of course, a change in wavelength will result in a change in the frequency. So the natural frequency of a wind instrument such as the trombone is dependent upon the length of the air column of the instrument. The same principles can be applied to any wind instrument -whether it be the tuba, flute, wind chime, organ pipe, clarinet, or pop bottle.

There were a variety of classroom demonstrations (some of which were phun and some of which were corny) which illustrated the idea of natural frequencies and their modification. First recall the pop bottle instrument. A pop bottle was partly filled with water leaving a column of air inside which was capable of vibrating. When air was blown over the top of the instrument, the air inside was set into vibrational motion (turbulence above the lip of the bottle creates disturbances within the bottle). These vibrations resulted in a sound wave which was audible to students. Of course, the frequency can be modified by altering the length of the air column (adding or removing water) which changes the wavelength and in turn the frequency. As we know from our understanding of the frequency-wavelength relation, a shorter air column means a shorter wavelength and a higher frequency.

Then there was the toilet paper roll medley. Different lengths of toilet paper rolls (or wrapping paper rolls) will vibrate with different frequencies when struck against a students head. A properly selected set of rolls will result in the production of sounds which are capable of a Tony Award rendition of "Mary Had a Little Lamb."

Maybe you are familiar with the popular water goblet prom trick which was demonstrated in class. Obtain a water goblet and clean your fingers. Then gently slide your finger over the rim of the water goblet. If you are fortunate enough, you might be able to set the goblet into vibration by means of slip-stick friction. (It is not necessary to use a crystal goblet; it is often said that crystal goblets work better, but I have been able to perform the trick just as easily with clean fingers and an inexpensive goblet.) Like a violin bow string being pulled across a violin string, the finger sticks to the glass molecules, pulling them apart at a given point until the tension becomes so great. The finger then slips off the glass and subsequently finds another microscopic surface to stick to; the finger pulls the molecules at that surface, slips and then sticks at another location. This process of stick-slip friction is sufficient to set the molecules in the glass into vibration at its natural frequency. The result is enough to impress your dinner guests. Try it at home!!

Perhaps you recall a simple pendulum demonstration. While a pendulum does not produce a noise when it oscillates, it does illustrate an important principle. The pendulums consisting of the longer strings vibrate with a longer period and thus a lower frequency. Once more, there is an inverse relationship between the length of the vibrating object and the natural frequency at which the object vibrates. This very relationship carries over to any vibrating instrument - whether it be a guitar string, a xylophone, a pop bottle instrument, or a kettle drum.

To conclude, all objects have a natural frequency or set of frequencies at which they vibrate when struck, plucked, strummed or somehow disturbed. The actual frequency is dependent upon the properties of the material the object is made of (this effects the speed of the wave) and the length of the material (this effects the wavelength of the wave). It is the goal of musicians to find instruments which possess the ability to vibrate with sets of frequencies which are musically sounding (i.e., mathematically related by simple whole number ratios) and to vary the lengths and (if possible) properties to create the desired sounds.

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