PART III-b: HARMONY AND CHORDS CONTINUED
Voice Leading and Leading Tones
V![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAALYAAAA9CAMAAAA3WWMtAAADAFBMVEUAAAAEBAQICAgMDAwcHBwkJCQoKCgsLCwwMDA4ODg8PDxERERMTExUVFR4eHiDg4OHh4ePj4+Tk5OXl5erq6uvr6+zs7O7u7vDw8PHx8fPz8/b29vn5+fr6+v39/f///8AAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAC5qjr4AAACUUlEQVR4nO2Y2VLDMAxFL1CgUPayb/n/v4RC7MaJZC0uTjNB04c2kq1jWb7OFM0kDWMD+Gx+2DfHOLp8yzuxMQ2GMi7GG2JTu8Pq8xEnkvMWFxoMI4cfe4kHjXOBVw1GNewDfCiczzhTYVRrEuSwo/MK17rJjMlt4R07zTVJdK7wpMKohr3+PnX3WAjOBd5VGNWwm/USh+cvglPJUxF7TJsp9kjLJtJWEtAiG6atpftF9tfYf7SswbQbaEOuvcG25doTbIyIXZB2qtiF4wtQZoptUcARsTEti9jpMobFDsGOCmX8pPbKxmATiDw1mQqCn3OVYFOVnQb2IDBz4e8HNtnFIBueT1ULe1oWseNCwtPB8qjn7H8ytZuEpuawwbV8ZWyaI9mc5DmXqi42Mm9/RLV/h9PY7ZKYJuIoa2FzvY1WfHjdJCnnpCRoKxRdSa0t7yQIn9hEoOZNf2RycNVuYgZyfvvl3s5KFyDM37ucnb0d2pFIZ8XelphFSevDq5ISm7pduFJwGwvBn4R1+tWPHR+l2OSc0saK/uSro7enZWm1G67azOUubay48btRkrS5uxOy2NlU4sZ3NrpASbalQVrs7uYk45FRioy/v+ExsxM71JQ7fmT+XIKtn0DtHUmvknSmJwnoZ6KScDPOVkkyZRBXXaAkzrx8qGp8sZL40lKhmS0ghsKnJEoWfWhoHeV4CNWU/N7Ypggbhe8k3tif+N5gbZP0j7bV740NQ4a/TPq5GyUxq04v1LbgbLDk98aGAV6Tlmg5ZEapLMEe0/6xa9oXwM90bymoAjQAAAAASUVORK5CYII=) oice leading is the art of arranging multi-part harmony such that the various notes within each chord lead gracefully to the notes in the next chord that follows. Voice leading applies to simple two-part vocal harmony in folk music, through arrangements for a jazz big band, or orchestrating an entire classical symphony.
[Chords 15a.png] This musical fragment we saw earlier shows how adding a 7th helps propel the C chord to the F that follows [play the three chords]. You’ll notice two things in this example: First, the top notes in the chords form a simple descending melody line that gives direction. The other is that notes within the C7 chord lead nicely to notes in the F chord that follows. In this case, the Bb in the C7 chord [point] leads strongly to the A note, and the E note [point] leads strongly to the F that follows. [Play the three chords, then play Bb-A, then E-F, then repeat the full C7 to F chords.]
In this example, both the Bb and E notes are called leading tones [“leading tones”]. The C note at the bottom of each chord is also part of the structure, providing a commonality for all three chords that helps bind them together. Earlier I mentioned changing chords while the bass note stays the same, and this is another example of that.
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)
[Bach Chorale #8.png] When I went to music college years ago in the 1970s, one of the most valuable lessons they taught was how to analyze the four-part arrangements in J.S. Bach’s vocal chorales. Four-part vocal writing is a staple for groups ranging from the baroque era through barbershop, big band jazz, and even pop groups such as the Beach Boys. The four standard parts, from highest to lowest, are Soprano, Alto, Tenor, and Bass, often abbreviated SATB [“Soprano, Alto, Tenor, Bass = SATB”]. Voice leading is the key to successful four-part writing, and it’s important for leading tones to resolve up or down as appropriate, rather than jumping aimlessly to any random note in the target chord.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAPQAAAA3CAMAAAAMjZfWAAADAFBMVEUAAAD///8AAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAABnduxjAAACAklEQVR4nO2Y2XaFMAhF8f9/uqu9TavxHAYzquGtBoENBLmV7YUiowMYIQv6JlIc84K+iTwP2hGQqWIpoHMZmYlB0LKg2wj3MAb6G7k59XTQPs9lMhm01INWrCxo70tulTi007NDHgx9Kf4JoUPfrLtCy4sEJkVQoZN2LK3VKi22SsgxgAaACvMzoFFV3wANnnFLfaFhTaKO83NoU+BFNz00gFbT73a8pjdpHkkpDqY1XGnsfqf9WyJu1+x/Ag3MbH2gxQOtM5n9f4bGbxw6Q4kocIJvrg39QdbsWlv06VyUX1gVK03RHNCGR7v/B0FztDrQ3jtdazLeQbKsicg//7kIau7OT9kr0L5hruFGlqY0iCoaJe/hGaHlMxzzsMJRKmQi6gAeAo12EWEfP4ZmlXOe3fuPTLZs7LPdm6I1g6bpd1pf0ztlAVaaraE7M5cSjg1q2ubu4XOMujhbUejuXRuamttDaw69jrMhnU4OhRZG9/OwGjTP4eFO28zBfyKknod8YQ/khKI5oH0Sg+YtVg+ao9HL0gS60mC8hdCkhDIbG8T2J7yCWNZJyKUeOFkH5ii0Vv+AB62c7ZmD0ClUb1QMrUcPE/E4LoKmaEOZr1T6/JSaP4xEaKivqCHt9cCf3ngHNjETX/xoOXF7mI7ZuZwXxTwdszOk2YLuIgv6LfJK6C9qkCzGJPbKUwAAAABJRU5ErkJggg==)
[Voices 1.png] Before we look at examples of good four-part arranging, let’s first look at some bad examples! This will help you appreciate the difference. One of the first things you’ll learn in an arranging course is to avoid parallel fourth and fifth intervals, unless you’re going for an Oriental sound. The notes in all of these two-note chords are a fifth apart [play the example]. Sure, this sounds sort of like harmony, but to my ears it’s not very satisfying.
![](data:image/png;base64,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)
[Voices 2.png] Here’s a similar ascending line that’s harmonized in sixths instead of fifths [play example]. It sounds better overall, and the resolution at the end also sounds more final and more musical because the leading tone resolves in the proper direction.
![](data:image/png;base64,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)
[Voices 3.png] Extending this to three-part harmony, it’s still best to avoid parallel fourths and fifths. Rather than raise the G note in the first chord to an A in the second, it’s better to leave it alone [point to those two G notes]. Likewise for the C notes in the third and fourth beats [point]. [Play the example.] Again, the point here is not to teach music arranging, but to show what different types of voice leading sound like, both good and bad.
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)
[Bach Chorale #8.png] Here again are the first six bars from Bach Chorale Number 8, one of my favorite works from the literature. A full analysis of the entire piece is beyond the scope of this tutorial, though that’s available on my web site linked in the description for this video. The goal here is to highlight some of the internal note progressions within each part. This type of music is often printed on a piano staff, with the note stems [“stems”] pointing up or down to identify which voice is which.
These notes are the soprano part [point to first few soprano notes and show “Soprano”], and these are the alto part [point to first few alto notes and show “Alto”]. Likewise for the tenor and bass parts in the lower staff [highlight those and show “Tenor” and “Bass”]. Here’s what this excerpt sounds like when played on an organ, though I used a synthesizer for the bass line to make it easier to pick out the bass notes. [Play Bach Chorale #8.wav, point to each chord as the music progresses.] I’d be remiss if I didn’t mention my college music theory teacher, Dr. David Barnett, professor of music at the University of Bridgeport. Dr. Barnett was a huge influence for me, and he was also a world-class pianist who often performed publicly.
Note the fermata [“fermata”] symbol above the end of every second bar [point]. This half-circle with a dot tells the player to sustain that note or chord longer than the written duration. You may have noticed this effect as the music played.
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) ooking first at just the top melody line, all of the movement is simple half steps and whole steps [point to each note left to right]. The bass line at the bottom is similar, except for the occasional V-to-I jump. The inner lines are also mostly step-wise [point]. The bass notes in most pop music are the root of the chord, but in this piece the bass line is the root [point to first note], then the 7th [second note], then the 3rd [point], then the 5th [point]. I imagine Bach tossed off this exquisite example of four-part arranging in only a few minutes, though I’m not ashamed to say it took me a few hours to analyze all 20 bars when I was in music school! Using notes other than the root for bass lines is related to chord inversions mentioned earlier, because the bass note is the lowest note in the piece.
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)
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TBgY2qJJ3uiCp/gyMcxJ/pXFUZJ/39iOCxLmHmt1nrbAcj6hQ6GBFCa2XS7kTDxPLYXgYZ7WBonbzSQ0NorwKEV8sxmZVZkD9AEicEoxTWJIkXUW+OwUlicmKVwoIkCZPRxxiZJCke/SksR5ImkdtrR10OumTjQIXF9w1FKg+LkaT9z9qOW4MkffOiWf+JTRKrf7c+pbjOMSR9mob5Gbw0ex+FJok3XrY/awSSVDsFmhpYiCTmzGvEiWXF7R3kOhU7Bdpa0KWwDkkWC23+7zneexe/DF7Cpjk+Sc1St4P6n0WENmkb+7tlsM44ibv6enzQasU2AEnHFsklg3VI4npJ91vdTbvzzOklvR4jMhCG0CLpF/cIsBkn+c6chHWPyEAYQoMkC0N6qVI0Gmy6z5xEdY/IQBjCeiRZnblj5mQpvwyEIdRJuk8B6JnhiGUdRSkrklQzp6UyEIbQIOlmayJJrnM33cxpqQyEIVRJKrwE9Zg2SeVgqQyk03k5SUTFa6Woc7BkBiYk3eqptHE284WiN0kpX5JWzMCLJMsw/VPUkbRWBlYkpQtJtXFSehm94lPwwi3l3butl4GaJAjSiSBq+/vaTDfapG3eyIO4Kf//R02btFoGNr1bKpBEz932PQUELlneJKVCkLRUBjarANdI7vecHrJ6xafghVvKf8S9WgZWJF1K0yG9U+T7E3iTlApAkqcDwTHGFmokFbCpB7VeinIH62WAuRs0WQRRRHePNqlRar0Munu3IkitoFZLEQ741VEkJdVC7WopwgG/OoKkpPhQs+YAg9rWvo7+DkASHEy1gLkbZKUiUX/3X0oY4msqj3PWHDwzA6p3O346RfS9aJbWAp+z5uCZGdRISgm7vGscPDODOknvWyBJ5uCZGVRJ2m+CJJGDZ2aAuRtkpjJRaJPUDp6ZQWVl8jBQktc2U/4pgqQsgqTvV+f4fvENQ/724CCLImmfskXnKEKKcJBFkrQPvmcbEsvfIRxkYe4GGYkg6kpaXPk7hIOsFkkhTFblbxAOsmiStvaKZdLzmfinCAdZtbkb/91uIOnpDkASHFipStLpDk4ttp5GlB4hOMiqjJP+fvA8gqSnO2iuTAprsRFI+j0HjFUAUS02Akm/5wAkWQgOsqxIEm27w/Q0ovQIwUGWEUmybXeYnkaUHiE4yDLr3STb7jA9jSg9QnCQZUfS328mSfVC/vv0yQQHWWbjpPdvPkiVYnH26eMpjoMIrzV0j5Ner9N7m2plW6XSBhOntkjX0d/BAiSJjm7hIesrr49bzB7rZ5A+Pl4TSGKPMmy8SEiq1SLpKy8FTMb81TOIHx9z1lLZR5JUfZxXrnROm9lj7Qzyx8ectVT2cSQxH9fUJiGJ+1xBEqdqDUnVEU7X8f21SZokkKQ4BdtDgiCdSKI2rkR4BmiTmHVb+ojUJn3XY2bbIUnafm0vgjArfTZJc8f5RQdp/xK1OkoKp1qSPsel/bsmWJWCJDspx0nfNV2jurmHkCSlz5oOSGI+bk0Sv6c6ksSZv84kabdScgSSyo8bk8Tsqc4O3oOR1iFTSIIgnWiiTr/P9FVee7XAu6O232mTUinac62snuruoO1jYu/2ffw0d9vpolBahKRUvUkWF12fJiHcnup+5pAkpSJJtzG4zCFIYo2KP+NtKRlBSfr+fB1JUp5OUMqPpOun2AXjXf5si9Emcc59dlC6VS4vXsHsJOl6ov3ZkdfAxlRHbQYkbU8vtcrdHhfNtniNzSiSBE65lWLuBhmJIGqjqsidopct0mtTzrhN2oe528PHjFr1aGZbKo+NUqxxEtvpizlYq5BUOLqXIVktfiR9f8lI2jG0+0TMsHHSS9DDdpJUOtaGJFuNJEnWvuhnW73lFOOkF9cpt+kiSSLeTxLva5V1JJHh9JAkcODdJgk8dJJUPpBek/STiiQ6nAJJIxxE6OG7syrWhrkb1CmCKJK7aE2SytD5ud+qez/GrnjxNklYG5ekcCB1kFSrDyRJJSQpHki6PGiQtgol/zMg6Vgbu3cLJ3tP7w5O6wAkjah9hvwdg6RjbZi7QZ0awueT5dEm6TSmbpBkJZAE2ciWpJECSbEFkiAbgSTIRr+TJEiKrd9JEiTF1u8kCZKgyAJJkI1AEmQjkATZCCRBNvoHb1WE5TKoSgwAAAAASUVORK5CYII=)
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)
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[Bluesette Score 1.png, then cycle through Bluesette Score 6.png when playing the example.] The same methods and rules apply to arranging for a jazz big band. Voices should lead smoothly from one chord to another with minimal motion, and 4th or 5th intervals moving in parallel are best avoided. Harmony lines in thirds and sixths can move together, but other chord tones generally stay in place as the main harmonies pass through the intermediary chords. This score shows 24 bars of a big band arrangement I wrote years ago for the jazz standard Bluesette by Toots Thielemans. I made this cheesy synthesizer arrangement so you can hear it. [Play Bluesette.wav, show each of the six images in turn as this plays, move a position pointer too.]
This score shows only the five saxophone parts plus the bass, but the original was written for a jazz big band with a full brass section, piano, guitar, and drums. You can see three different key signatures in this piece [point]. The bass part is in Bb, which is the actual key of the piece. But saxophones are transposing instruments [“transposing instruments“]. This means the notes that sound are offset by some interval from what’s written.
Wind instruments come in many shapes and sizes, with many variations, each optimized to produce a specific range of notes. For consistency and ease of playing, the same fingerings are used for each instrument in a family. So the fingering to play middle C on a tenor sax also works on the alto sax, but a tenor sax plays the Bb a whole step lower than the written C, while the alto sax sounds a major sixth lower. Likewise for the soprano sax which sounds an octave high than a tenor sax. From the player’s perspective, the printed notes are fingered the same, but the pitches produced are different. The composer or arranger is responsible for transposing the written notes to create the desired pitches. [Play section of Collin Wade’s video from 10:27 to 10:52 where he compares alto and soprano saxes, show his name near beginning.]
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)
[Bluesette Lead Sheet.png] This lead sheet shows the melody and chords, which was the basis for the harmonies. The long curved line over the first six notes [point] is called a slur, and it tells brass players, or singers, that those notes are to be played or sung in one continuous breath to create an effect called legato [“legato”]. Without a slur each note would be articulated separately. The opposite of legato is staccato [“staccato”], where each note is separated from the next by playing it for a shorter duration than written. Slurs on string parts have a similar meaning, to indicate that all of the notes are played using a single bow stroke, without changing the bow direction. We’ll examine these playing styles in more detail later.
Note the bottom line where all four F notes are tied together [point]. All of the notes are the same pitch, so this is called a tie [“tie”] rather than a slur, though the effect is the same—the notes are played (or sung) with one breath or one continuous bow stroke. In other words, these notes are tied together to create a single note that extends for longer than one bar.
Also note the Greek Delta symbol [point], which is shorthand for major [“Δ=Major”]. The first chord in this piece is a Bb major 9th, so the Delta means a major 7th chord with an added 9th. Also note the measure numbers at the start of each line. In longer pieces this lets the band leader identify specific places in the music, for example “Let’s go back to bar 57 and try that again.”
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)
[Bluesette Saxes 1 Staff.png] This score shows all five saxophone parts on one staff in the same key, which is how the arrangement was created. Once I was satisfied with the harmonies I split each part to a separate staff, then transposed the notes to match the native key of the saxophone type that plays the part. If you care to analyze each chord, you’ll see the basic harmonies are in thirds or sixths, and the other notes are chord tones that stay in place as the melody notes pass through them.
You may have noticed that this tune is largely based on the circle of fifths mentioned earlier. Because the chords cycle through a number of different keys, many flats and naturals are needed. In fact, a piece like this is called chromatic [“chromatic”] because there are so many internal key changes. Notice the occasional accidental in parentheses [point to a few of those]. Accidentals apply only for the duration of the current bar, but as a courtesy to players it’s customary to remind them that an accidental no longer applies in the following measure. So if a note is flatted in one bar, a natural in parentheses is shown in the next bar [point to the C and its accidentals in bars 22 and 23].
Again, my goal isn’t to teach musical arranging, so we’ll leave this for now. [Show Dvořák yellow score cover, then inside pages. Do the same with other scores as the narration continues.] A huge amount of music to study can be found online, and full scores for every major classical composition are available for purchase. I’ll mention that the most difficult thing for beginners to deal with when analyzing scores is navigating all the different keys that are used simultaneously for the various transposing instruments. Not only keys, but clefs too, such as the tenor clef that’s sometimes used for cellos and trombones [point to a tenor clef in my cello concerto score], and the viola’s alto clef [point] which puts middle C on the middle line of the staff. But dedicated students eventually overcome that, and reading scores only gets easier with practice.
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