Tag: scales

How to use the Diminished Scale Pt 2

Continuation of the diminished scale video…in this Pt2 I show how to incorporate triads into phrases or altered chords voicings.

If we take a C half step/whole step scale C, Db, Eb, E, F#, G, A, Bb we see that four triads can be found within the notes of this scale: C major, Ebmajor, F#major, A major. In the video I show you how to add this new ‘flavour’ to your phrases.

Basic Music Theory for Beginners Pt 2:on Guitar, Practical Application.

Basic theory knowledge pt 2: on Guitar!

Let’s now go back to the basic theory post (quite successful over 10k views just the day I posted!) , and let’s see how things apply to guitar…just read the explanatins in red and watch the videos!

Let’s start again:

The natural sounds are:

English

C

D

E

F

G

A

B

You might also find in some books the name of these notes in Italian (nothing to do with ‘solfege’!) Do,Re,Mi,Fa,Sol,La,Si and in German C,D,E,F,G,A,H.

Sharps and flats.

# = sharp: raises the given note of a half step.

One half-step on guitar is a fret, easy. When you move up a fret (from the headstock to the body of the guitar) you are playing two notes that are a semitone/half-step apart from each other. From G natural to G# you would move up one fret.

## = double sharp: raises the given note of two half steps (also noted ‘x’).

From G natural to G## you would move up two frets.

b = flat: lowers the given note of a half step.

From G natural to Gb you would move down one fret.

bb = double flat: lowers the given note of two half steps.

From G natural to Gbb you would move down two frets.

= natural: cancels sharps and flats (double natural cancels double sharps and flats).

The Chromatic scale.

In this first video I start from the chromatic scale and show you how to build a major scale:

The chromatic scale contains all 12 natural and altered sound (using sharps and flats).

1 2 3 4 5 6 7 8 9 10 11 12
C C#/Db D D#/Eb E F F#/Gb G G#/Ab A A#/Bb B

Notes called with a different name, but identifying the same sound, are called enharmonic (i.e.: C# e Db). The shortest distance between two sound of the chromatic scale is a Half Step, the distance of a fret on the guitar.

Intervals.

An interval is the distance between two notes.

Intervals of a second, third, sixths and seventh are called major. If a major interval is raised by an half step it is calledaugmented. If a major interval is lowered by an half step it is called minor. If lowered by two half steps, diminuished.

Intervals of a fourth, fifth and octave are called perfect. If a perfect interval is raised by an half step it is calledaugmented. If a perfect interval is lowered by an half step it is called diminuished (note the difference).

All the intervals from the tonic of a major scale to any other note of tha scale are major or perfect (i.e. between C and D=major 2nd, C e E=major 3rd, C e F=perfect 4th, and so on…)

Intervals can also be calculated summing up half steps: one half-step on guitar is a fret, easy. When you move a fret up (from the headstock to the body of the guitar) you are playing two notes that are a semitone/half-step apart from each other.

N.of htps

1 2 3 4 5 6 6 7 8 8 9 10 10 11 12
Interval m2 M2

m3

M3

P4

4aug

5dim

P5

5aug

m6

M6

6aug

m7

M7

P8

where m=minor, M=major, P=perfect, dim=diminuished, aug=augmented.

How to build a major scale.

Read the theory and watch the video below:

The spacing of the notes in a major scales follow this rule:

WWHWWWH

Where W = Whole step (a major second)  H= Half step

Example : C major

To build major sales in other keys use exclusively either sharps or flats choosing the notes so that a note with the same name is never repeated. In doing so you will only use Diatonic half steps (given by two notes with different name, i.e. C-Db, opposite to Chromatic half steps given by two notes with the same name, as in D –D#).

ON GUITAR:

Major scale – fixed position patterns

These are the famous 5 ‘box’ movable patterns for the major scale. Of course you can
play all the major scales with these, as long as the tonic, aka the note that gives the name
to the scale, sits in the red circles. The example is in G major, like in the video, but as I
said, these patterns can be transposed to all major scales. The roman numeral stands for
the fret number.

The Major scale template above is from TrueGuitarist.com’s ‘The Guitar Kit’, a free collection of guitar templates.

CLICK HERE TO DOWNLOAD ‘THE GUITAR KIT’ FOR ALL THE SCALES AND TEMPLATES YOU’LL EVER NEED!!

This is a list of all the major scales in all keys. The order follows the amount of sharps and flats in the key.

Keys with flats.

C D E F G A B
F

G

A

Bb

C

D

E

Bb

C

D

Eb

F

G

A

Eb F G

Ab

Bb

C

D

Ab

Bb

C

Db Eb

F

G

Db

Eb F

Gb

Ab

Bb

C

Gb

Ab

Bb

Cb

Db

Eb

F

Cb

Db

Eb

Fb

Gb

Ab Bb

Keys with sharps.

C D E F G A B

G

A B C D E F#

D

E F# G A B C#

A

B C# D E F# G#
E F# G# A B C# D#
B C# D# E F# G# A#
F# G#

A#

B C# D# E#
C# D# E# F# G#

A#

B#

Relative minor (key)

Every major key has one relative minor which is made of the same notes, but starting from the sixth note. In other words, starting a minor third below (or a major sixth above) the root of the major scale. For example if we take C major its relative minor is A minor, spelled A B C D E F G.

On guitar: To play the relative minor, just start two notes before the note in the red circle.

Circle of fifths.

The circle of fifths one of the most used ways to summarize all I explained so far. It is very useful to memorize how many and which alterations a specific key has.

I find very useful to memorize FCGDAEB and the same sequence backwards BEADGCF. The first is the order of sharps the second, of flats. So if a key has, for example, 3 sharps (A major) they will be the first 3 notes in the first seqence (F# C# G#).

Harmonized major scale – How to build chords.

A practical application on guitar:

In the example below every note of a major scale identifies a ‘degree’ of the scale. In the example I have used C major, but this is valid for every other major scale in any key.

If I stack on every degree two more notes a diatonic third apart (basically every other one) I end up with different kinds of triads (triad=group of three notes). These triads are shown in the example below. If we analyse the intervals between notes:

Major Triad has a Maj 3rd and a Perf 5th (Eg. C-E-G: C-E=maj 3rd , C-G Perf 5th).

Minor Triad has a min 3rd and a Perf 5th.

Diminuished Triad has a min 3rd and a diminuished 5th.

You will have the same series of chords in all the other keys Eg: F major: F, Gm, Am, Bb, C, Dm, Em.

Already with this knowledge we can understand how to Analyze simple songs or how to write pop songs:

 

If we stack another note a diatonic third apart from the last note of the above triads we will have Seventh chords.

This again is valid for all the 12 keys. This concept is vital to understand how songs are built and how to pick the correct scale for a solo.

On Guitar this note choice for 7th chords might not work…let’s see some more popular choices to play this on guitar:

With this we can now analyse more complex songs like a simple jazz standard…watch the video:

I hope you enjoyed this lesson!

Basic Music Theory for Beginners

Basic theory knowledge

What follows is just a brief summary of basic theory and harmony necessary to understand practical applications on your instrument.

The natural sounds are:

C – D – E – F – G – A – B

You might also find in some books the name of these notes in Italian (nothing to do with ‘solfege’!)

Do, Re, Mi, Fa, Sol, La, Si and in German C, D, E, F, G, A, H.

Sharps and flats.

# = sharp: raises the given note of a half step.

## = double sharp: raises the given note of two half steps (also noted ‘x’).

b = flat: lowers the given note of a half step.

bb = double flat: lowers the given note of two half steps.

= natural: cancels sharps and flats (double natural cancels double sharps and flats).

The Chromatic scale.

The chromatic scale contains all 12 natural and altered sound (using sharps and flats).

1 2 3 4 5 6 7 8 9 10 11 12
C C#/Db D D#/Eb E F F#/Gb G G#/Ab A A#/Bb B

Notes called with a different name, but identifying the same sound, are called enharmonic (i.e.: C# e Db). The shortest distance between two sound of the chromatic scale is a Half Step, the distance of a fret on the guitar.

Intervals.

An interval is the distance between two notes.

Intervals of a second, third, sixths and seventh are called major. If a major interval is raised by an half step it is called augmented. If a major interval is lowered by an half step it is called minor. If lowered by two half steps, diminished.

Intervals of a fourth, fifth and octave are called perfect. If a perfect interval is raised by an half step it is calledaugmented. If a perfect interval is lowered by an half step it is called diminished (note the difference).

All the intervals from the tonic of a major scale to any other note of tha scale are major or perfect (i.e. between C and D=major 2nd, C e E=major 3rd, C e F=perfect 4th, and so on…)

Intervals can also be calculated summing up half steps:

N.of htps

1 2 3 4 5 6 6 7 8 8 9 10 10 11 12
Interval m2 M2

m3

M3

P4

4aug

5dim

P5

5aug

m6

M6

6aug

m7

M7

P8

where m=minor, M=major, P=perfect, dim=diminished, aug=augmented.

How to build a major scale.

The spacing of the notes in a major scales follow this rule:

WWHWWWH

Where W = Whole step (a major second)  H= Half step (a minor second)

Example : C major

To build major sales in other keys use exclusively either sharps or flats choosing the notes so that a note with the same name is never repeated. In doing so you will only use Diatonic half steps (given by two notes with different name, i.e. C-Db, opposite to Chromatic half steps given by two notes with the same name, as in D –D#).

This is a list of all the major scales in all keys. The order follows the amount of sharps and flats in the key.

Keys with flats.

C D E F G A B
F

G

A

Bb

C

D

E

Bb

C

D

Eb

F

G

A

Eb F G

Ab

Bb

C

D

Ab

Bb

C

Db Eb

F

G

Db

Eb F

Gb

Ab

Bb

C

Gb

Ab

Bb

Cb

Db

Eb

F

Cb

Db

Eb

Fb

Gb

Ab Bb

Keys with sharps.

C D E F G A B

G

A B C D E F#

D

E F# G A B C#

A

B C# D E F# G#
E F# G# A B C# D#
B C# D# E F# G# A#
F# G#

A#

B C# D# E#
C# D# E# F# G#

A#

B#

Relative minor (key)

Every major key has one relative minor which is made of the same notes, but starting from the sixth note. In other words, starting a minor third below (or a major sixth above) the root of the major scale. For example if we take C major its relative minor is A minor, spelled A B C D E F G.

Circle of fifths.

The circle of fifths one of the most used ways to summarize all I explained so far. It is very useful to memorize how many and which alterations a specific key has.

I find very useful to memorize FCGDAEB and the same sequence backwards BEADGCF. The first is the order of sharps the second, of flats. So if a key has, for example, 3 sharps (A major) they will be the first 3 notes in the first seqence (F# C# G#).

Harmonized major scale – How to build chords.

In the example below every note of a major scale identifies a ‘degree’ of the scale. In the example I have used C major, but this is valid for every other major scale in any key.

If I stack on every degree two more notes a diatonic third apart (basically every other one) I end up with different kinds of triads (triad=group of three notes). These triads are shown in the example below. If we analyse the intervals between notes:

Major Triad has a Maj 3rd and a Perf 5th (Eg. C-E-G: C-E=maj 3rd , C-G Perf 5th).

Minor Triad has a min 3rd and a Perf 5th.

Diminished Triad has a min 3rd and a diminished 5th.

You will have the same series of chords in all the other keys Eg: F major: F, Gm, Am, Bb, C, Dm, Em.

If we stack another note a diatonic third apart from the last note of the above triads we will have Seventh chords.

This again is valid for all the 12 keys. This concept is vital to understand how songs are built and how to pick the correct scale for a solo.

The above concept in all keys looks like this:

Harmonized major scale – Keys with flats.

Cmaj7

Dm7

Em7

Fmaj7

G7

Am7

Bm7b5

Fmaj7

Gm7

Am7

Bbmaj7

C7

Dm7

Em7b5

Bbmaj7

Cm7

Dm7

Ebmaj7

F7

Gm7

Am7b5

Ebmaj7

Fm7

Gm7

Abmaj7

Bb7

Cm7

Dm7b5

Abmaj7

Bbm7

Cm7

Dbmaj7

Eb7

Fm7

Gm7b5

Dbmaj7

Ebm7

Fm7

Gbmaj7

Ab7

Bbm7

Cm7b5

Gbmaj7

Abm7

Bbm7

Cbmaj7

Db7

Ebm7

Fm7b5

Cbmaj7

Dbm7

Ebm7

Fbmaj7

Gb7

Abm7

Bbm7b5

Harmonized major scale – Keys with sharps.

Cmaj7

Dm7

Em7

Fmaj7

G7

Am7

Bm7b5

Gmaj7

Am7

Bm7

Cmaj7

D7

Em7

F#m7b5

Dmaj7

Em7

F#m7

Gmaj7

A7

Bm7

C#m7b5

Amaj7

Bm7

C#m7

Dmaj7

E7

F#m7

G#m7b5

Emaj7

F#m7

G#m7

Amaj7

B7

C#m7

D#m7b5

Bmaj7

C#m7

D#m7

Emaj7

F#7

G#m7

A#m7b5

F#maj7

G#m7

A#m7

Bmaj7

C#7

D#m7

E#m7b5

C#maj7

D#m7

E#m7

F#maj7

G#7

A#m7

B#m7b5

In a simple chord progression/ tune things should now be easy to analyze:

| C7    | … the V7 of F major, the key is F major.

| Cm7 F7 | Bbmaj7 |  … a ii – V – I in Bb major. The Key is Bb major.

| A maj7 F#m7 Bm7 E7 | … a I-vi-ii-V in A

Of course this is  simple when the tune is all in one key, it becomes a skill to be able to spot these in a tune that features key changes and other compositional tricks. This is beyond the scope of this lesson.

Hope this helped!