F flat Is a Note

This post is one of a growing series of holistic investigations into various aspects of music theory. The full list can be found in the Posts page under the category Music Theory De-Mystified.

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Most notes have at least two possible names. For example, F# is the same pitch as Gb. Even naturals have alternative names. E could be called Fb and F could be called E#. And that’s not to mention double sharps and double flats. G could be called Abb and so on.

Why so many choices? First, some background…

Modes

Major and minor keys are based on patterns of 2 and 1 semitone intervals between consecutive notes. We call such a pattern a mode. The series of notes generated by the mode is called a scale. Typical Western scales have 7 notes per octave, the eighth note being the octave of the first (hence the name “octave”).

The starting note of the scale is called the root note or tonic. The root note is easy to recognise when playing a scale because it is first and last. Melodies make the root note apparent by highlighting it in various ways so we can tell which mode we’re in when we listen to the music.

The choice of mode imparts an overall character to the music, called tonality.

Keys

A key is the combination of a mode and a root note. Keys allow us to choose the mode and the root note independently.

Let’s look at the major mode as an example. The original major, made up of only naturals, is C major. The name C major indicates that this key uses the major mode with C as the root note.

C major

Any other major key needs at least one sharp or flat. By starting the mode on a different root note we need some different notes in the key to preserve the pattern of intervals from note to note. The pattern of intervals defines the mode, in this case, major.

We can work out the notes needed for a chosen key by placing the new root note at the start of the pattern and counting the semitones from note to note. Let’s look at D major; the major mode starting on D.

D major

The note naming rule

There is one simple rule that determines the right choice of note name. In a standard Western mode such as major or minor, each scale note must have its own letter.

The letters indicate consecutive scale notes, just like they are written on a stave. A musical stave only has positions for notes as letters: sharps and flats are written as symbols beside the note.

When we work out the note names for a key, we start from the root note and count up. As we go, each following note must use the next letter as its name. In the example above, D major, the 3rd note is called F#. Gb is the wrong name because the third letter up from D is F, not G.

B#, Cb, E# and Fb

Remember BCEF? (see my beginner’s tip). This is the extreme end of BCEF. These notes look like they should never be used because they have equivalent pitches which are just naturals. B# = C, Cb = B, E# = F and Fb = E, so why use them? In truth their use isn’t all that common, but they do get used in certain keys.

For example, B# is used in C# major and Fb is used in Cb major.

This potentially begs the question, why use C# major as the name of a key when it could be called Db major? C# major has 7 sharps whereas Db major has only(?) 5 flats…

A valid question. I can’t answer it comprehensively in this post but there are three main reasons:

  • ease of playing/reading on a given instrument
  • movement within the piece from the home key to other keys
  • altered notes in the melody or chords

Easy keys

Players of some instruments such as guitar find sharps keys easier to read and play. Brass players, on the other hand, prefer flats keys. It depends on the base key and playing logic of the instrument.

Singers can be very specific about their choice of key for a particular song based on how the melody suits the different registers of the singer’s voice. This may force the rest of the ensemble to play in a key which is awkward to read, whichever name they choose.

For example, F# major has 6 sharps and Gb major has 6 flats. F# major has the note E# and Gb major has Cb.

Keys within a key

Typically a melody starts in the home key and goes on a journey. This journey takes it through various, usually related, keys, some of which are fleeting moments in the journey while others are visiting points; temporary homes. Campsites, if you like.

Visiting keys are named according to how closely related they are to the home key: in other words, how many notes they have in common. In general, if we start in sharps we continue in sharps, and the same for flats.

For example, in E major, a major key 2 semitones up would be called F# major, not Gb major. This is because F# is a note in the home key (E major) and Gb is not. In fact, none of the note names in Gb major are used in E major.

Which keys are related to which? That’s for another post.

Altered notes: weird note names in normal keys

Sometimes a melody or chord uses a note that doesn’t belong to the key. This could be as a variation or ornament, or the melody just might not be in a conventional mode.

We think of such a note as a replacement of the normal scale note or chord note. The context of the music determines which scale note has been replaced. To preserve the note naming rule, the new note is named with the same letter as the note it replaces.

  • if the altered note is a semitone higher than the scale note it is sharpened
  • if the altered note is a semitone lower than the scale note it is flattened

Sharpening or flattening allows the music notation to reflect which scale note is being altered, just as we would hear when playing and listening. However, depending on the key of the piece, this may require a double sharp or double flat.

NOTE: To avoid too much rambling I have only given a brief outline of the various topics raised in this post. I hope to cover some of these in future posts.

Please feel welcome to share this post, make a comment or ask a question.

Graphics taken from The Tiny Music Theory Book, a short, easy to read guide to the essentials of music theory and notation, available here.

1. Note Names, Semitones and Octaves

This post is one of a 2-part series of free basic music theory lessons on my blog, musictheoryde-mystified.com. You can see the complete list here. Please feel welcome to make a comment or ask a question.

If note names mean nothing to you, start here…

In my posts:

  • A PIECE is any musical work.
  • A PART is one instrument’s component of a piece.
  • An ENSEMBLE is any combination of instruments collaborating to perform a piece, be it one person singing and playing, a band, choir or orchestra.

Note names

Most musicians are familiar with the note names A to G. After G comes A again and the pattern continues repeating from the lowest pitches to the highest.

A B C D E F G A B C etc.

Over the audible pitch range there are many A’s, many B’s and so on.

From one A to the next is an octave, as is from any letter to the next instance of the same letter.

Octaves

Notes which are an octave (or several octaves) apart enjoy a special relationship. When played together, the higher note blends in to the lower note. If they’re perfectly in tune (that’s for a later post), the higher note blends in so well that it almost merges inside the lower note. Even when played one after the other, what we hear sounds more like a change in register (or voice) than a different note.

Try this on your instrument. If you can play two notes at once or play one and sing the other, the effect will be the clearest, but you can still tell by playing one after the other.

Now try combinations of two different notes, such as A and G or A and C. None feel as closely connected as when they’re an octave apart (or a unison; two notes of exactly the same pitch).

In musical terms, in an ensemble, any part can be played an octave higher or lower without clashing with the other parts. All chords or harmonies will still fit. It is because of this relationship that notes which are octaves apart can, and do, share the same note name.

Intervals

The difference in pitch between one note and another is called an interval. A to the next A, an octave, is an interval, A to G is an interval, F to C is an interval.

Intervals can be measured in octaves and semitones. Each octave is divided into 12 musically equal intervals called semitones. This gives us 12 different notes, the 13th being an octave. The semitone is the centimetre (or inch) of pitch.

  • On a piano, 1 semitone is the interval between consecutive keys, regardless of the key’s colour.
  • On a guitar, 1 semitone is the interval from one fret to the next (or from an open string to the first fret).

We started with the letters A to G, followed by A etc. that’s 7 letters, the 8th being the octave of the first (as it happens, octave means 8th). So how do 7 letters add up to 12 semitones?

Not all letters are 1 semitone apart: in fact, most are 2 semitones apart. This is how the letters are spaced:

A . B C . D . E F . G . A
2 1 2 2 1 2 2 = 12

This means that 5 of the 12 different notes (per octave), the ones represented here by dots, have no name.

On a piano keyboard, all the named notes are white keys. You can see when two white keys are 2 semitones apart because there is a black key to represent the so far un-named note between them.

Piano keyboard layout showing naturals for 1 octave

On a guitar, you can find the named notes by starting on an open string, then following the above pattern by skipping a fret for every 2-semitone interval. The dots above represent the frets you skip.

Guitar fingerboard layout, A string, showing naturals for 1 octave

The named notes are called naturals. The un-named notes can be described as being 1 semitone higher or 1 semitone lower than the nearest natural.

Sharps and flats

Any natural can be raised by 1 semitone by adding the sharp symbol, #.
Any natural can be lowered by 1 semitone by adding the flat symbol, b.

For instance, the note between A and B could be called A# (A plus 1 semitone) or Bb (B minus 1 semitone).

This may seem confusing: we’ve gone from having no names for some notes to having two names. Fear not. For now, either name will do. The most common note names in general terms are:

A Bb B C C# D Eb E F F# G G# or Ab

Once we look at the notes in the context of a piece of music, the choice of note names will matter but by then it will be quite obvious which names to use. The correct note names for a piece are based on its key, a subject for a future post.

The graphic below shows how any natural can be raised by 1 semitone by adding a sharp or lowered by 1 semitone by adding a flat, resulting in two possible note names for most notes. Notice that even some of the naturals have an alternate name, although their use is relatively uncommon in most keys.

In my next basic post we will look at how note pitches are written on a stave.

Try These…

How many semitones between the following pairs of notes? (count up from the first note until you reach the second note of the pair):

  • A to C
  • A to C#
  • A to E
  • A to G
  • Bb to F
  • B to F
  • C to A
  • C# to A
  • D to Bb

Answers at the end of this post.

This post is one of a growing series of free basic music theory lessons on my blog, musictheoryde-mystified.com. You can see the complete list here.

Please feel welcome to like, comment or to share this post. If you have any questions, pleased leave them as a comment and I will respond as soon as I can. If you enjoy my posts and would like to be kept up to date, please subscribe.

NEXT LESSON: 2. Notes on a Stave: Pitch

PART 1 CONTENTS: Basic Music Theory Course Contents








Answers to Try These…

  • A to C = 3 semitones
  • A to C# = 4 semitones
  • A to E = 7 semitones
  • A to G = 10 semitones
  • Bb to F = 7 semitones
  • B to F = 6 semitones
  • C to A = 9 semitones
  • C# to A = 8 semitones
  • D to Bb = 8 semitones