You may have heard the terms overtone series and harmonic series while discussing music, but unless you have studied them previously, you may not realize the importance of this concept in creating tonality. The overtone series occurs naturally in all non-synthetic tone production. When a person sings, a harmonic series is present above every pitch. When any woodwind, string, or brass instrument creates a pitch, a harmonic series is present above every pitch. Perhaps even more importantly for our discussions, we can study the acoustics–or the math–behind this overtone series to explain the fundamentals of Western harmony.
The overtone series can help you to understand:
The overtone series is a series of intervals, or a harmonic series, above a given pitch. We call the lowest pitch the fundamental, and every tone above it is considered an overtone. In the example below, C2
is the fundamental, C3
is the first overtone, G3
is the second overtone, and so on.
You may also describe the tones of the overtone series by labeling each overtone as a partial. In this system, the fundamental is considered equal to all other tones, so it is labeled as the first partial. In the example below, C2
is the first partial, C3
is the second partial, G3
is the third partial, and so on.
For the example below, determine the numbering for each of these notes as both overtones and partials. Then practice transposing the entire series to other pitches.
Next, please watch this video of Leonard Bernstein discussing an entertaining supposition as to how the overtone series helps to explain harmony’s evolution throughout the ages. Keep in mind that each evolutionary step he discusses adds another partial from the overtone series.
The division of the octave into twelve parts is our brains’ interpretations of a simple mathematical phenomenon. When the frequency of a sound wave doubles, our brains hear those two frequencies as sharing some fundamental commonality, so it interprets those two pitches as the “same” but separated by an octave. Therefore, octaves always have a 2:1 ratio. A110, A220, A440, and A880 are all A
separated by octaves. The next two “simplest” ratios are a 3:2 ratio and a 4:3 ratio, which create a perfect 5th and a perfect 4th respectively.
The influence of these ratios is among the most important concepts for understanding the way in which humans process sound. This concept not only explains why humans which intervals find certain intervals consonant or dissonant–simpler ratios are heard as consonant whereas complex ratios are heard as dissonant–but these importance of simpler ratios is easily observed in the circle of fifths. If you begin on any pitch-class and begin moving by ascending perfect 5ths (or 4ths), you will find yourself back at the beginning after cycling through all twelve pitch-classes. We call this the circle of fifths.
C - G - D - A - E - B - F-sharp - C-sharp - G-sharp - D-sharp/E-flat - B-flat - F - C
Perhaps more important for our discussion, though, is what happens when we introduce a diminished 5th into the pattern. Try this quick exercise:
In essence, the diminished fifth creates a new, smaller self-repeating loop inside of the circle of fiths. This slight change–the addition of one diminished 5th–creates the necessary tension for keys to function diatonically, so diatonic function could be described as an imperfection on an otherwise perfect series of intervals.
This can be further shown by looking at the naturally occurring intervals if we write diatonic 5ths above the notes of a major scale.
Because we explored harmonic function in Unit 6, the tension provided by the one non-perfect 5th and its subsequent release should now be obvious.
Key signatures reflect the importance of the one non-perfect interval. When studying the consecutive key signatures, you should focus on which scale degree is changed between consecutive keys.
ti
.fa
.The overtone series, often referred to as the harmonic series, is a series of intervals built off of a pitch. There are two ways to label the overtone series.
The overtone series built off of C2
would be:
The overtone series occurs naturally and can be explained mathematically, so it is one of the few objective ways in which we can discuss the origin of music. Any interval can be viewed as a ratio comparing the frequncies of the two pitches that create the interval. The simplest ratio, other than 1:1, is 2:1. For example, C2
has a frequency of about 65.4 hertz (hz = vibrations per second), and C3
has a frequency of about 130.8: a ratio of 2:1. When we hear two frequencies that have a 2:1 ratio, our brains interpret this as “the same pitch separated by an octave”–an elegant solution to interpreting a physical phenomenon. This example demonstrates that all concepts associated with music, such as pitches, dividing octaves, intonation, etc., are human creations trying to organize and interpret the physical phenomenon of soundwaves entering our ear.
The overtone series orders intervals by decreasing size but increasing complexity. The first interval of the overtone series, a P8, is the “simplest” interval of 2:1. As the overtone series moves upward, each interval becomes smaller but more complex. A P5 has a ratio of 3:2, a P4 has a ratio of 4:3, a M3 has a ratio of 5:4, and onward.
The overtone series is notable because:
There are many ways to remember the overtone series.
re-mi-fi-sol
or the beginning of the Lydian mode of the fundamental.When looking at this final method for remembering the first 12 pitches of the overtone series, I find it fascinating that each group of four pitches implies a different key area:
sol-la-ti-do
in the key of the dominant.