The Solution below shows the C-sharp major scale 7th chords, (I7, ii7, iii7, IV7, V7, vi7, viiø7) on a piano, with mp3 and midi audio.
The Lesson steps then explain the 7th chord construction from this scale, and how to name the quality of each chord based on note intervals.
For a quick summary of this topic, and to see the chord quality chart for this scale, have a look at Scale chord.
Key | C | [C#] | Db | D | D# | Eb | E | E# | Fb | F | F# | Gb | G | G# | Ab | A | A# | Bb | B | B# | Cb |
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The C-sharp major chord I7 is the C# maj 7 chord, and contains the notes C#, E#, G#, and B#.
This tonic 7th chords root / starting note is the 1st note (or scale degree) of the C# major scale.
The roman numeral for number 1 is 'I', and is used to indicate this is the 1st chord in the scale. It is in upper case to denote that the chord is a major chord.
Chord position | Link | a/b/c/d notation | Figured bass notation |
---|---|---|---|
Root position | C# major 7th chord in root position | Ia | I7 |
1st inversion | C# major 7th chord in 1st inversion | Ib | I65 |
2nd inversion | C# major 7th chord in 2nd inversion | Ic | I43 |
3rd inversion | C# major 7th chord in 3rd inversion | Id | I2 |
The C-sharp major chord ii7 is the D# min 7 chord, and contains the notes D#, F#, A#, and C#.
This supertonic 7th chords root / starting note is the 2nd note (or scale degree) of the C# major scale.
The roman numeral for number 2 is 'ii', and is used to indicate this is the 2nd chord in the scale. It is in lower case to denote that the chord is a minor chord.
Chord position | Link | a/b/c/d notation | Figured bass notation |
---|---|---|---|
Root position | D# minor 7th chord in root position | iia | ii7 |
1st inversion | D# minor 7th chord in 1st inversion | iib | ii65 |
2nd inversion | D# minor 7th chord in 2nd inversion | iic | ii43 |
3rd inversion | D# minor 7th chord in 3rd inversion | iid | ii2 |
The C-sharp major chord iii7 is the E# min 7 chord, and contains the notes E#, G#, B#, and D#.
This mediant 7th chords root / starting note is the 3rd note (or scale degree) of the C# major scale.
The roman numeral for number 3 is 'iii', and is used to indicate this is the 3rd chord in the scale. It is in lower case to denote that the chord is a minor chord.
Chord position | Link | a/b/c/d notation | Figured bass notation |
---|---|---|---|
Root position | E# minor 7th chord in root position | iiia | iii7 |
1st inversion | E# minor 7th chord in 1st inversion | iiib | iii65 |
2nd inversion | E# minor 7th chord in 2nd inversion | iiic | iii43 |
3rd inversion | E# minor 7th chord in 3rd inversion | iiid | iii2 |
The C-sharp major chord IV7 is the F# maj 7 chord, and contains the notes F#, A#, C#, and E#.
This subdominant 7th chords root / starting note is the 4th note (or scale degree) of the C# major scale.
The roman numeral for number 4 is 'IV', and is used to indicate this is the 4th chord in the scale. It is in upper case to denote that the chord is a major chord.
Chord position | Link | a/b/c/d notation | Figured bass notation |
---|---|---|---|
Root position | F# major 7th chord in root position | IVa | IV7 |
1st inversion | F# major 7th chord in 1st inversion | IVb | IV65 |
2nd inversion | F# major 7th chord in 2nd inversion | IVc | IV43 |
3rd inversion | F# major 7th chord in 3rd inversion | IVd | IV2 |
The C-sharp major chord V7 is the G# dom 7 chord, and contains the notes G#, B#, D#, and F#.
This dominant 7th chords root / starting note is the 5th note (or scale degree) of the C# major scale.
The roman numeral for number 5 is 'V', and is used to indicate this is the 5th chord in the scale. Just like a major chord, the dominant 7th chord is constructed using a major third interval,so the roman numeral is shown in upper case.
Chord position | Link | a/b/c/d notation | Figured bass notation |
---|---|---|---|
Root position | G# dominant 7th chord in root position | Va | V7 |
1st inversion | G# dominant 7th chord in 1st inversion | Vb | V65 |
2nd inversion | G# dominant 7th chord in 2nd inversion | Vc | V43 |
3rd inversion | G# dominant 7th chord in 3rd inversion | Vd | V2 |
The C-sharp major chord vi7 is the A# min 7 chord, and contains the notes A#, C#, E#, and G#.
This submediant 7th chords root / starting note is the 6th note (or scale degree) of the C# major scale.
The roman numeral for number 6 is 'vi', and is used to indicate this is the 6th chord in the scale. It is in lower case to denote that the chord is a minor chord.
Chord position | Link | a/b/c/d notation | Figured bass notation |
---|---|---|---|
Root position | A# minor 7th chord in root position | via | vi7 |
1st inversion | A# minor 7th chord in 1st inversion | vib | vi65 |
2nd inversion | A# minor 7th chord in 2nd inversion | vic | vi43 |
3rd inversion | A# minor 7th chord in 3rd inversion | vid | vi2 |
The C-sharp major chord viiø7 is the B# half-dim7 chord, and contains the notes B#, D#, F#, and A#.
This subtonic 7th chords root / starting note is the 7th note (or scale degree) of the C# major scale.
The roman numeral for number 7 is 'vii', and is used to indicate this is the 7th chord in the scale. Just like a minor chord, the half-diminished 7th chord is constructed using a minor third interval, so the roman numeral is shown in lower case.
The half-diminished symbol 'ø' is placed after the roman numerals to indicate this is a half-diminished 7th chord.
Chord position | Link | a/b/c/d notation | Figured bass notation |
---|---|---|---|
Root position | B# half-diminished 7th chord in root position | viiøa | viiø7 |
1st inversion | B# half-diminished 7th chord in 1st inversion | viiøb | viiø65 |
2nd inversion | B# half-diminished 7th chord in 2nd inversion | viiøc | viiø43 |
3rd inversion | B# half-diminished 7th chord in 3rd inversion | viiød | viiø2 |
The white keys are named using the alphabetic letters A, B, C, D, E, F, and G, which is a pattern that repeats up the piano keyboard.
Every white or black key could have a flat(b) or sharp(#) accidental name, depending on how that note is used. In a later step, if sharp or flat notes are used, the exact accidental names will be chosen.
The audio files below play every note shown on the piano above, so middle C (marked with an orange line at the bottom) is the 2nd note heard.
The piano keyboard below contains the notes of the C# major scale.
Starting from the 1st scale note, each lesson step below will take each note in turn and construct a 7th chord using that note as the root / starting note of that chord.
The 7th chord will be built using only the notes of the scale we are interested in.
7th chords are built using the 1st, 3rd, 5th, and 7th notes of a scale, so the first 7th chord below will constructed a chord using notes C#, E#, G# and B#.
No. | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 |
---|---|---|---|---|---|---|---|---|
Note | C# | D# | E# | F# | G# | A# | B# | C# |
The second 7th chord below will repeat this, but this time starting on the 2nd note, so its notes will be D#, F#, A# and C# - ie. the 1st, 3rd, 5th and 7th positions relative to that 2nd root note.
This pattern is repeated for all 7 notes in the scale, resulting in 7 seventh chords.
Although the above method identifies each 7th chord notes from the scale used, it does not identify the complete chord name including its quality.
Should each 7th chord that we build be called diminished, half-diminished, minorminor-major, dominant, major, augmented, or augmented-major ?
Every 7th chord must have one of these quality names.
To decide the name the chord quality, each step below will use note intervals to calculate how many half-tones / semitones / piano keys between the root and the 3rd, 5th and 7th notes.).
Taken together, the combination of the 3rd, 5th and 7th note intervals will define the complete 7th chord quality name.
The steps below will show how this works for each 7th chord in turn, but in practice it might just be easier to memorize the triad quality table in the Scale chord summary for each scale type.
The table below shows the C# major scale, ordered to show the 1st note as the first column in the table.
To identify the 7th chord note names, use the 1st, 3rd, 5th and 7th columns / scale degrees, which are notes C#, E#, G#, and B#.
No. | 1 | 2 | 3 | 4 | 5 | 6 | 7 |
---|---|---|---|---|---|---|---|
Note | C# | D# | E# | F# | G# | A# | B# |
To identify the 7th chord quality that has these notes, begin by counting the number of half-tones / semitones between the root and each of the notes.
For the 3rd interval (note 2 on the diagram) the distance between C# and E# is 4 half-tones.
Now look at the complete Note interval table, and identify the note interval that has a distance of 3 half-tones (first column), and with an interval no. of 3 (last column).
The note interval name for the 3rd note / scale degree is therefore major, also called M3 for short. More details of this interval are at C#-maj-3rd.
Repeating this for the 5th note / scale degree, the distance between C# and G# is 7 half-tones, and the note interval name is perfect (P5). More details of this interval are at C#-perf-5th.
Again the 7th note / scale degree, the distance between C# and B# is 11 half-tones, and the note interval name is major (M7). More details of this interval are at C#-maj-7th.
Finally, we have the name of the three note intervals of this 7th chord, and can now lookup the name of the 7th chord quality having these intervals.
Looking at the Seventh chord table, the name of the 7th chord quality having major(M3), perfect(P5) and major(M7) note intervals is major 7th.
And so the complete 7th chord Name prefixes the root note, C#, onto this quality, giving us the C# maj 7 chord.
The chord symbol I could be followed by the letter a to indicate that it is C# major 7th chord in root position (ie not inverted) - C-sharp major scale chord Ia.
Instead, I could be followed by the letter b to indicate that it is C# major 7th chord in 1st inversion - C-sharp major scale chord Ib.
Letter c could be used to indicate that it is C# major 7th chord in 2nd inversion - C-sharp major scale chord Ic.
Finally, letter d could be used to indicate that it is C# major 7th chord in 3rd inversion - C-sharp major scale chord Id.
In place of the a-d symbols above, figured bass symbols could be used to indicate chord positions after I:
So in this key, I7 refers to the C# major 7th chord in root position.
For 7th chord inversions, I65 refers to the C# major 7th chord in 1st inversion, I43 refers to the C# major 7th chord in 2nd inversion, and I2 refers to the C# major 7th chord in 3rd inversion.
The next step will need to calculate the 7th chord whose root / starting note is next scale note.
To do this, the first column we used in this step, C#, will be moved to the final column of the table.
The table below shows the C# major scale, ordered to show the 2nd note as the first column in the table.
To identify the 7th chord note names, use the 1st, 3rd, 5th and 7th columns / scale degrees, which are notes D#, F#, A#, and C#.
No. | 1 | 2 | 3 | 4 | 5 | 6 | 7 |
---|---|---|---|---|---|---|---|
Note | D# | E# | F# | G# | A# | B# | C# |
To identify the 7th chord quality that has these notes, begin by counting the number of half-tones / semitones between the root and each of the notes.
For the 3rd interval (note 2 on the diagram) the distance between D# and F# is 3 half-tones.
Now look at the complete Note interval table, and identify the note interval that has a distance of 3 half-tones (first column), and with an interval no. of 3 (last column).
The note interval name for the 3rd note / scale degree is therefore minor, also called m3 for short. More details of this interval are at D#-min-3rd.
Repeating this for the 5th note / scale degree, the distance between D# and A# is 7 half-tones, and the note interval name is perfect (P5). More details of this interval are at D#-perf-5th.
Again the 7th note / scale degree, the distance between D# and C# is 10 half-tones, and the note interval name is minor (m7). More details of this interval are at D#-min-7th.
Finally, we have the name of the three note intervals of this 7th chord, and can now lookup the name of the 7th chord quality having these intervals.
Looking at the Seventh chord table, the name of the 7th chord quality having minor(m3), perfect(P5) and minor(m7) note intervals is minor 7th.
And so the complete 7th chord Name prefixes the root note, D#, onto this quality, giving us the D# min 7 chord.
The chord symbol ii could be followed by the letter a to indicate that it is D# minor 7th chord in root position (ie not inverted) - C-sharp major scale chord iia.
Instead, ii could be followed by the letter b to indicate that it is D# minor 7th chord in 1st inversion - C-sharp major scale chord iib.
Letter c could be used to indicate that it is D# minor 7th chord in 2nd inversion - C-sharp major scale chord iic.
Finally, letter d could be used to indicate that it is D# minor 7th chord in 3rd inversion - C-sharp major scale chord iid.
In place of the a-d symbols above, figured bass symbols could be used to indicate chord positions after ii:
So in this key, ii7 refers to the D# minor 7th chord in root position.
For 7th chord inversions, ii65 refers to the D# minor 7th chord in 1st inversion, ii43 refers to the D# minor 7th chord in 2nd inversion, and ii2 refers to the D# minor 7th chord in 3rd inversion.
The next step will need to calculate the 7th chord whose root / starting note is next scale note.
To do this, the first column we used in this step, D#, will be moved to the final column of the table.
The table below shows the C# major scale, ordered to show the 3rd note as the first column in the table.
To identify the 7th chord note names, use the 1st, 3rd, 5th and 7th columns / scale degrees, which are notes E#, G#, B#, and D#.
No. | 1 | 2 | 3 | 4 | 5 | 6 | 7 |
---|---|---|---|---|---|---|---|
Note | E# | F# | G# | A# | B# | C# | D# |
To identify the 7th chord quality that has these notes, begin by counting the number of half-tones / semitones between the root and each of the notes.
For the 3rd interval (note 2 on the diagram) the distance between E# and G# is 3 half-tones.
Now look at the complete Note interval table, and identify the note interval that has a distance of 3 half-tones (first column), and with an interval no. of 3 (last column).
The note interval name for the 3rd note / scale degree is therefore minor, also called m3 for short. More details of this interval are at E#-min-3rd.
Repeating this for the 5th note / scale degree, the distance between E# and B# is 7 half-tones, and the note interval name is perfect (P5). More details of this interval are at E#-perf-5th.
Again the 7th note / scale degree, the distance between E# and D# is 10 half-tones, and the note interval name is minor (m7). More details of this interval are at E#-min-7th.
Finally, we have the name of the three note intervals of this 7th chord, and can now lookup the name of the 7th chord quality having these intervals.
Looking at the Seventh chord table, the name of the 7th chord quality having minor(m3), perfect(P5) and minor(m7) note intervals is minor 7th.
And so the complete 7th chord Name prefixes the root note, E#, onto this quality, giving us the E# min 7 chord.
The chord symbol iii could be followed by the letter a to indicate that it is E# minor 7th chord in root position (ie not inverted) - C-sharp major scale chord iiia.
Instead, iii could be followed by the letter b to indicate that it is E# minor 7th chord in 1st inversion - C-sharp major scale chord iiib.
Letter c could be used to indicate that it is E# minor 7th chord in 2nd inversion - C-sharp major scale chord iiic.
Finally, letter d could be used to indicate that it is E# minor 7th chord in 3rd inversion - C-sharp major scale chord iiid.
In place of the a-d symbols above, figured bass symbols could be used to indicate chord positions after iii:
So in this key, iii7 refers to the E# minor 7th chord in root position.
For 7th chord inversions, iii65 refers to the E# minor 7th chord in 1st inversion, iii43 refers to the E# minor 7th chord in 2nd inversion, and iii2 refers to the E# minor 7th chord in 3rd inversion.
The next step will need to calculate the 7th chord whose root / starting note is next scale note.
To do this, the first column we used in this step, E#, will be moved to the final column of the table.
The table below shows the C# major scale, ordered to show the 4th note as the first column in the table.
To identify the 7th chord note names, use the 1st, 3rd, 5th and 7th columns / scale degrees, which are notes F#, A#, C#, and E#.
No. | 1 | 2 | 3 | 4 | 5 | 6 | 7 |
---|---|---|---|---|---|---|---|
Note | F# | G# | A# | B# | C# | D# | E# |
To identify the 7th chord quality that has these notes, begin by counting the number of half-tones / semitones between the root and each of the notes.
For the 3rd interval (note 2 on the diagram) the distance between F# and A# is 4 half-tones.
Now look at the complete Note interval table, and identify the note interval that has a distance of 3 half-tones (first column), and with an interval no. of 3 (last column).
The note interval name for the 3rd note / scale degree is therefore major, also called M3 for short. More details of this interval are at F#-maj-3rd.
Repeating this for the 5th note / scale degree, the distance between F# and C# is 7 half-tones, and the note interval name is perfect (P5). More details of this interval are at F#-perf-5th.
Again the 7th note / scale degree, the distance between F# and E# is 11 half-tones, and the note interval name is major (M7). More details of this interval are at F#-maj-7th.
Finally, we have the name of the three note intervals of this 7th chord, and can now lookup the name of the 7th chord quality having these intervals.
Looking at the Seventh chord table, the name of the 7th chord quality having major(M3), perfect(P5) and major(M7) note intervals is major 7th.
And so the complete 7th chord Name prefixes the root note, F#, onto this quality, giving us the F# maj 7 chord.
The chord symbol IV could be followed by the letter a to indicate that it is F# major 7th chord in root position (ie not inverted) - C-sharp major scale chord IVa.
Instead, IV could be followed by the letter b to indicate that it is F# major 7th chord in 1st inversion - C-sharp major scale chord IVb.
Letter c could be used to indicate that it is F# major 7th chord in 2nd inversion - C-sharp major scale chord IVc.
Finally, letter d could be used to indicate that it is F# major 7th chord in 3rd inversion - C-sharp major scale chord IVd.
In place of the a-d symbols above, figured bass symbols could be used to indicate chord positions after IV:
So in this key, IV7 refers to the F# major 7th chord in root position.
For 7th chord inversions, IV65 refers to the F# major 7th chord in 1st inversion, IV43 refers to the F# major 7th chord in 2nd inversion, and IV2 refers to the F# major 7th chord in 3rd inversion.
The next step will need to calculate the 7th chord whose root / starting note is next scale note.
To do this, the first column we used in this step, F#, will be moved to the final column of the table.
The table below shows the C# major scale, ordered to show the 5th note as the first column in the table.
To identify the 7th chord note names, use the 1st, 3rd, 5th and 7th columns / scale degrees, which are notes G#, B#, D#, and F#.
No. | 1 | 2 | 3 | 4 | 5 | 6 | 7 |
---|---|---|---|---|---|---|---|
Note | G# | A# | B# | C# | D# | E# | F# |
To identify the 7th chord quality that has these notes, begin by counting the number of half-tones / semitones between the root and each of the notes.
For the 3rd interval (note 2 on the diagram) the distance between G# and B# is 4 half-tones.
Now look at the complete Note interval table, and identify the note interval that has a distance of 3 half-tones (first column), and with an interval no. of 3 (last column).
The note interval name for the 3rd note / scale degree is therefore major, also called M3 for short. More details of this interval are at G#-maj-3rd.
Repeating this for the 5th note / scale degree, the distance between G# and D# is 7 half-tones, and the note interval name is perfect (P5). More details of this interval are at G#-perf-5th.
Again the 7th note / scale degree, the distance between G# and F# is 10 half-tones, and the note interval name is minor (m7). More details of this interval are at G#-min-7th.
Finally, we have the name of the three note intervals of this 7th chord, and can now lookup the name of the 7th chord quality having these intervals.
Looking at the Seventh chord table, the name of the 7th chord quality having major(M3), perfect(P5) and minor(m7) note intervals is dominant 7th.
And so the complete 7th chord Name prefixes the root note, G#, onto this quality, giving us the G# dom 7 chord.
The chord symbol V could be followed by the letter a to indicate that it is G# dominant 7th chord in root position (ie not inverted) - C-sharp major scale chord Va.
Instead, V could be followed by the letter b to indicate that it is G# dominant 7th chord in 1st inversion - C-sharp major scale chord Vb.
Letter c could be used to indicate that it is G# dominant 7th chord in 2nd inversion - C-sharp major scale chord Vc.
Finally, letter d could be used to indicate that it is G# dominant 7th chord in 3rd inversion - C-sharp major scale chord Vd.
In place of the a-d symbols above, figured bass symbols could be used to indicate chord positions after V:
So in this key, V7 refers to the G# dominant 7th chord in root position.
For 7th chord inversions, V65 refers to the G# dominant 7th chord in 1st inversion, V43 refers to the G# dominant 7th chord in 2nd inversion, and V2 refers to the G# dominant 7th chord in 3rd inversion.
The next step will need to calculate the 7th chord whose root / starting note is next scale note.
To do this, the first column we used in this step, G#, will be moved to the final column of the table.
The table below shows the C# major scale, ordered to show the 6th note as the first column in the table.
To identify the 7th chord note names, use the 1st, 3rd, 5th and 7th columns / scale degrees, which are notes A#, C#, E#, and G#.
No. | 1 | 2 | 3 | 4 | 5 | 6 | 7 |
---|---|---|---|---|---|---|---|
Note | A# | B# | C# | D# | E# | F# | G# |
To identify the 7th chord quality that has these notes, begin by counting the number of half-tones / semitones between the root and each of the notes.
For the 3rd interval (note 2 on the diagram) the distance between A# and C# is 3 half-tones.
Now look at the complete Note interval table, and identify the note interval that has a distance of 3 half-tones (first column), and with an interval no. of 3 (last column).
The note interval name for the 3rd note / scale degree is therefore minor, also called m3 for short. More details of this interval are at A#-min-3rd.
Repeating this for the 5th note / scale degree, the distance between A# and E# is 7 half-tones, and the note interval name is perfect (P5). More details of this interval are at A#-perf-5th.
Again the 7th note / scale degree, the distance between A# and G# is 10 half-tones, and the note interval name is minor (m7). More details of this interval are at A#-min-7th.
Finally, we have the name of the three note intervals of this 7th chord, and can now lookup the name of the 7th chord quality having these intervals.
Looking at the Seventh chord table, the name of the 7th chord quality having minor(m3), perfect(P5) and minor(m7) note intervals is minor 7th.
And so the complete 7th chord Name prefixes the root note, A#, onto this quality, giving us the A# min 7 chord.
The chord symbol vi could be followed by the letter a to indicate that it is A# minor 7th chord in root position (ie not inverted) - C-sharp major scale chord via.
Instead, vi could be followed by the letter b to indicate that it is A# minor 7th chord in 1st inversion - C-sharp major scale chord vib.
Letter c could be used to indicate that it is A# minor 7th chord in 2nd inversion - C-sharp major scale chord vic.
Finally, letter d could be used to indicate that it is A# minor 7th chord in 3rd inversion - C-sharp major scale chord vid.
In place of the a-d symbols above, figured bass symbols could be used to indicate chord positions after vi:
So in this key, vi7 refers to the A# minor 7th chord in root position.
For 7th chord inversions, vi65 refers to the A# minor 7th chord in 1st inversion, vi43 refers to the A# minor 7th chord in 2nd inversion, and vi2 refers to the A# minor 7th chord in 3rd inversion.
The next step will need to calculate the 7th chord whose root / starting note is next scale note.
To do this, the first column we used in this step, A#, will be moved to the final column of the table.
The table below shows the C# major scale, ordered to show the 7th note as the first column in the table.
To identify the 7th chord note names, use the 1st, 3rd, 5th and 7th columns / scale degrees, which are notes B#, D#, F#, and A#.
No. | 1 | 2 | 3 | 4 | 5 | 6 | 7 |
---|---|---|---|---|---|---|---|
Note | B# | C# | D# | E# | F# | G# | A# |
To identify the 7th chord quality that has these notes, begin by counting the number of half-tones / semitones between the root and each of the notes.
For the 3rd interval (note 2 on the diagram) the distance between B# and D# is 3 half-tones.
Now look at the complete Note interval table, and identify the note interval that has a distance of 3 half-tones (first column), and with an interval no. of 3 (last column).
The note interval name for the 3rd note / scale degree is therefore minor, also called m3 for short. More details of this interval are at B#-min-3rd.
Repeating this for the 5th note / scale degree, the distance between B# and F# is 6 half-tones, and the note interval name is diminished (d5). More details of this interval are at B#-dim-5th.
Again the 7th note / scale degree, the distance between B# and A# is 10 half-tones, and the note interval name is minor (m7). More details of this interval are at B#-min-7th.
Finally, we have the name of the three note intervals of this 7th chord, and can now lookup the name of the 7th chord quality having these intervals.
Looking at the Seventh chord table, the name of the 7th chord quality having minor(m3), diminished(d5) and minor(m7) note intervals is half-diminished 7th.
And so the complete 7th chord Name prefixes the root note, B#, onto this quality, giving us the B# half-dim7 chord.
The chord symbol viiø could be followed by the letter a to indicate that it is B# half-diminished 7th chord in root position (ie not inverted) - C-sharp major scale chord viiøa.
Instead, viiø could be followed by the letter b to indicate that it is B# half-diminished 7th chord in 1st inversion - C-sharp major scale chord viiøb.
Letter c could be used to indicate that it is B# half-diminished 7th chord in 2nd inversion - C-sharp major scale chord viiøc.
Finally, letter d could be used to indicate that it is B# half-diminished 7th chord in 3rd inversion - C-sharp major scale chord viiød.
In place of the a-d symbols above, figured bass symbols could be used to indicate chord positions after viiø:
So in this key, viiø7 refers to the B# half-diminished 7th chord in root position.
For 7th chord inversions, viiø65 refers to the B# half-diminished 7th chord in 1st inversion, viiø43 refers to the B# half-diminished 7th chord in 2nd inversion, and viiø2 refers to the B# half-diminished 7th chord in 3rd inversion.
This completes the set of all 7th chords that harmonize with the C# major scale.
Key | C | [C#] | Db | D | D# | Eb | E | E# | Fb | F | F# | Gb | G | G# | Ab | A | A# | Bb | B | B# | Cb |
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