Chord progressions create a feeling of harmonic movement in a song. Musicians use their intuition and experience to arrange chords in ways that grab their listeners and take them for a musical ride. This notion of movement is important to understanding how to compose and improvise music. Chord progressions provide the foundation which supports the melody.
Usually the interplay between chords in a piece of music creates the feeling of movement and change. Some chord combinations sound uplifting, others sound somber, and some sound like ocean waves. While these harmonies and how we interpret them are nearly endless, there is a very simple principle at work.
Most pieces of music tend to first establish a feeling of stability, depart from it, create tension, then return to the feeling of stability. Though some pieces of music demonstrate this more dramatically than others, as you train your ear you will become increasingly aware of it.
Chord Progression Formulas
The way chords are placed one after the other in a piece of music is called a chord progression. The chords in a progression have different harmonic functions. Some chords provide the stability, some the departure, and some provide the dynamic tension.
Roman numerals are used to indicate the chords in a progression. The numerals are based on the scale pattern of the diatonic scale. For example, in the key of C major a I, IV, V7 (one, four, five) progression indicates the chords Cmaj, Fmaj, and Gdom7. In the key of F these chords would be Fmaj, Bbmaj, and Cdom7.
The diagram below shows the formulas of the more common chord progressions in major and minor keys.
The Roman numerals in a chord progression formula signify the triad form of the chord. It is harmonically permissible to extend these chords with additional diatonic tones to create different chords. In other words, you can add notes to these chords as long as the notes are part of the diatonic scale. The harmonic function of the chord does not change.
The Roman numerals refer to the position of each chord in the diatonic scale. The diagram below shows how the Roman numeral scale degree can be interpreted with different chords. All of the examples below can be interpreted from the same chord formula.
Chord formulas are written in Roman numerals to represent the generic form of the progression. Often musicians will learn a piece of music by its chord progression formula. One reason for this is that it is easier to remember since many songs are based on the same formula. Another reason is, it is easier to play a song in different keys if you know the formula. However, this assumes you know which chords make up which keys.
It's not uncommon for a rehearsal conversation to go like this:
Singer: "Hey, I've got this new song I want to do. It's basically a six-two-five progression."
Pianist: "What key do you like?"
Singer: "I don't know. Maybe Bb."
You can see if you are the pianist you need to be ready to play the same chord progression in several keys.
The chords indicated by the Roman numerals also have names. For instance, the first chord of the scale is the tonic. The fifth chord is the dominant. The diagram below shows the functional names and scale degree of the diatonic scale. Beneath this are notes from several common keys that match the function and degree.
Other scales whose scale patterns differ from the diatonic scale are assigned chord degrees according to the sharpness or flatness of their notes. That is, the diatonic scale creates a "ruler" that other scales are measured against. That is why the resulting chord based on the third note of the C natural minor scale is bIIIm (Ebm) and not III as in the diatonic scale.
The chart below shows how different scales compare. Because the notes of the scales are spaced differently they produce different chords.
To add variety to the movement you can substitute chords, play dominant chords in place of minor chords, and vise versa. Play diminished chords instead of a dominant. Play chords with extensions. In other words, explore the different ways you can link chords together to create harmonic movement.
One of the most common chord progressions in music is the I, IV, V (one, four, five) and say we want to explore this progression in the key of C major.
Since we are in the key of C Major our tonic chord will be a major chord with C as its root. There are several chords we could choose but for this example let's pick Cmaj7.
Next, we've got the IV (the four chord). It's also a major chord but since it is derived from the fourth degree of the C Major scale its root must be F. Normally we might choose Fmaj7 but let's bend the rules and experiment. Let's make this an Fm7b5 chord (F,Ab,B, Eb). F7 has an Eb and an Ab, neither which belong to the key of C Major. However, most importantly we are changing the major chord into a minor. That creates a completely different sound. That's where we are bending the rules. However, the most basic rule in music theory is that if it sounds okay, it's allowed.
The V chord can act as a stronger dominant chord if we add the 7th note of the Mixolydian mode. In this case we produce a Gdom7 (G, B, D, F). Now we have a I, IV7, V7 progression. We can spice up this progression even more.
The V (five chord) is the chord that expresses the most tension in a progression and if we want to add more tension we can alter the chord. This means we can add notes that don't belong to the key which almost always produces a dissonant harmony that creates tension.
So, if we sharp the fifth and the ninth degree of the G7 chord we end up with G7#5#9 (G, B, Eb, Bb). Our final formula is: Imaj7, IVm7b5, V7#5#9. Notice how this sounds compares to the original I, IV, V.
There are more substitutions that can be made. This is just the beginning. Experiment and explore to create different harmonic movements. Let your ear decide what's right and not right.
This is a chart of the chord symbols and their meaning.
Music Theory Topics
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