When discussing key signatures in Unit 2d, we created that a series of repeating intervals of a P5 will eventually cycle through all twelve pitch classes before repeating. And if we insert a diminished 5th at any point, we can “shortcut” back to six pitches earlier–and in doing so, we create a diatonic collection of seven pitches that we associate with Western diatonic tonality.
We can further demonstrate this effect by stacking them on top of each other to create basic harmonies. Listen to the next example which stacks diatonic 5ths–meaning 5ths that reflect the key signature used for this tonal center–to create a series of perfect 5ths. As you listen, you will probably hear each of these dyads as having an “open” or “undefined” sound. Feel free to experiment using the text entry box below the example to see if you can insert a note into those open 5ths that creates a pleasing sound.
As you probably noticed, you can create a variety of interesting harmonies, but the ones that felt the most familiar occurred when placed a pitch in each 5th that divided them equally. And in doing so, you created the basic harmonic structure for all diatonic music: the triad.
All diatonic triads have exactly three pitches, although chordal members may be doubled and certain chord members can occasionally be omitted (and therefore implied) depending on the context. We name the chord members by the distance above the bottom pitch when the chord is stacked in thirds:
This can be confusing to beginning theory students, because we refer to intervals, scale degrees, and chordal members using the same ordinal numbers–thirds, fifths, etc.–and most often do not use the word “chordal”. As you become more experienced in describing these things, you will be able to discern the meaning from context, but if you would like to avoid confusion for now, you can preface the ordinal number with the word “chordal” until you are comfortable.
As dyads have two pitches, the word “triad” implies any collection of three pitches. In diatonic music, however, we use this word to refer to a certain intervallic structure, so until we reach the unit on post-tonal harmony, you may assume that the word “triad” refers to the stacked thirds of diatonic harmony.
If the study of the evolution of music, you will find that early harmony focused on perfect intervals similar to this example, but diatonic harmony as we know did not truly begin until music began regularly featuring a third chordal member. By stacking two intervals of a third, we create a triad, which contains not only the two thirds, but also the interval of a fifth between the outer pitches. Any harmonic system which relies on stacking thirds is called tertian harmony.
Triads are important to almost all of Western music and form the basic unit in diatonic (key-based) harmony. While our ultimate goal is to describe how triads function harmonically, it is important that we are able to identify the structure of triads themselves independent of their diatonic functions, so we will begin by studying their intervallic structure.
Using the next example:
Your first goal should be to come up with a way to define each triad’s quality. To begin, you may classify triadic qualities by dividing them into two groups based on the defining chord members of the triads.
When looking at a diatonic triad in root position:
From this, we can create a couple of simple groupings based on the chord members:
Therefore, if a triad is in root position, you can determine triad qualities by the measuring the intervals of the stacked thirds.
Because triads have three pitches, there are three possible configurations that depend on which note of the triad is in the lowest voice. We will call these inversions, but they are sometimes referred to as positions. The system that we use to label inversions relies on the intervals within the triad.
Using the next example, you should:
NOTE: Because ABC notation is not capable of using superscript, the inversion figures in the next example are notated as fractions. If you were to write these by hand or use music notation software, you would notate all inversion figures in superscript as stacked numbers without a dividing line. For example, a major chord in first inversion would be written as M6
From the simple presentation of the above example, you should have realized that you cannot identify the inversion of the chord until you know the root. The simplest method for finding the root for any triad is to re-arrange the pitches until you have a triad that is stacked using only thirds. To be clear, this means no fourths, no sixths, and everything within a octave. You can even eliminate any duplicate pitches. Once you have this simplified arrangement of pitches, you can easily determine the root and quality of the chord using the method above.
For inversions, it is not necessary to know each interval within a triad, but instead, you only need to identify the chordal member in the bass.
5
and 3
refer to the simple intervals above the bass6
and 3
refer to the simple intervals above the bass6
and 4
refer to the simple intervals above the bassOf note, there are six different possible intervals in a triad, depending on the inversion: two thirds, two sixths, one fourth, and one fifth. These intervals always exist between the same two chord members.
Now that you understand the basic of triads and their inversions, we have to account for the variety of ways that they appear in music. When analyzing music, you must account for doubled pitches, implied harmonies, and a variety of spacings across the range of the performers; all of which can make it difficult to find the basic structure of the triad when looking at a musical score.
We will start by dealing with the issue of spacing, and to do so we must understand how the inversion interacts with the chord’s voicing.
Look at the following example, and compare the closed and open voicings listed there. You should:
As students develop the process for finding any inversion, they usually work through the following ideas:
A complete definition combines these ideas.
Understanding the difference between the terms root and bass is the last piece of information necessary to find the quality of any chord; students often confuse the two. The term bass always refers to the lowest voice of any chord. The root is the lowest member of the chord if the chord is in root position, meaning that the triad is stacked as two thirds. If a chord is in root position, the root and bass will be the same pitch, however if a triad is in first or second inversion, the root and bass will be different pitches.
Combining a knowledge of inversions and voicings is critical in correctly identifying chord qualities. Teachers often suggest to students that they can find chord qualities by putting a chord in root position, but a chord in root position can be spread across multiple staves and still difficult to parse. We really mean that they should put the chord in root position and closed voicing. This allows the student to look at the interval qualities and determine the quality of the triad based on their knowledge of triadic interval structures.
I also suggest that you look at the method for identifying triads from the Open Music Theory. You can find this listed under the Further Reading for this topic.