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What tone does each string on a guitar represent? Types of guitar tunings. Instrumental tunings in general

Non-classical settings are used for the convenience of playing certain musical genres or pieces of music.

Classic setting method

  1. tuning fork
  2. The 1st string is used to tune the 2nd string, which, being pressed at the V fret, should sound the same as the 1st open (not pressed) string.
  3. The 3rd string, pressed at the 4th fret, is tuned to the 2nd open string.
  4. The 4th string, pressed at the V fret, is tuned to the 3rd open string.
  5. The 5th string, pressed at the V fret, is tuned to the 4th open string.
  6. The 6th string, pressed at the V fret, is tuned to the 5th open string.

Tuning with harmonics and temperament

Allows for much more precise tuning, since the accuracy of the frets is not always sufficient.

  1. The 1st string is tuned using the reference sound - the sound of a tuning fork - or the sound of an already tuned musical instrument.
  2. The 6th string is tuned so that its harmonic at the 5th fret sounds in unison with the 1st string.
  3. The 5th string is tuned so that its harmonic at the 7th fret sounds in unison with the 1st string, and then it is slightly pulled up so that a beat occurs with a frequency of 0.372 Hz (one beat in 2.7 seconds).
  4. The 4th string is tuned so that its harmonic at the 7th fret sounds in unison with the harmonic of the 5th string at the 5th fret, and then slightly tightened so that a beat occurs with a frequency of 0.497 Hz (one beat per 2.01 seconds).
  5. The 3rd string is tuned so that its harmonic at the 7th fret sounds in unison with the harmonic of the 4th string at the 5th fret, and then slightly tightened so that a beat occurs with a frequency of 0.664 Hz (one beat per 1.51 seconds).
  6. The 2nd string is tuned so that its harmonic on the 5th fret sounds almost in unison with the harmonic of the 1st string on the 7th fret, but is slightly shortened so that a beat with a frequency of 1.12 Hz is heard (one beat per 0.9 seconds).

When tuning using the tuning fork A (“A”), the 5th string is tuned first (the harmonic on the V fret in unison with the tuning fork), then the 1st and 6th, and then the 4th, 3rd and 2nd.

With good hearing, and having accumulated sufficient experience, you can do without using harmonics, catching the beat of overtones in the sound of open strings.

Since changing the string tension leads to deformation of the guitar body and detuning of the remaining strings, it is recommended to tune the guitar in 2-3 iterations, the first of which can be done without temperament (without carefully calculating the beat frequency).

Lower tunings of a six-string guitar

Decreased (i.e. lower than the normal EBGDAE tuning) tunings are used for more comfortable playing a certain key, or to obtain a lower, “heavy” sound. In particular, many rock guitarists love the so-called. Drop tunings, which are named by adding to “Drop” a note on the 6th string that drops 1 tone below the first (for example: Drop C = DAFCGC). To change from a classical tuning to some lower tuning, all the strings of the guitar are lowered by a certain interval (for example, to change to tuning D, you need to lower all the strings of the guitar by a tone). To lower the guitar's tuning by more than a tone, you may need to change the strings to thicker ones due to the weakening of their tension. Also, for tunings below B (B), mostly baritone guitars are used.

String Scale E♭ (E-flat) Build D (re) Scale D♭ (D-flat) Build C (before) System B (si)
Note Frequency (in hertz) Note Frequency Note Frequency Note Frequency Note Frequency
First e♭¹ (E-flat first octave) 311.13 d¹ (D first octave) 293.66 d♭¹ (D-flat first octave) 277.18 c¹ (to the first octave) 261.63 b (B small octave) 246.94
Second b♭ (B-flat small octave) 233.08 a (A small octave) 220.00 a♭ (A-flat small octave) 207.00 g (small octave sol) 196.00 g♭ (G-flat small octave) 185.00
Third g♭ (G-flat small octave) 185.00 f (f small octave) 174.62 e (minor octave E) 164.81 e♭ (small octave E-flat) 155.56 d (small octave D) 147.83
Fourth d♭ (D-flat small octave) 138.59 c (to small octave) 130.82 B (big octave B) 123.48 B♭ (B-flat major octave) 116.54 A (A major octave) 110.00
Fifth A♭ (A-flat major octave) 103.80 G (major octave G) 98.00 G♭ (G flat major octave) 92.50 F (major octave F) 87.31 E (major octave E) 82.41
Sixth E♭ (major octave E-flat) 77.78 D (major octave D) 73.91 D♭ (D-flat major octave) 69.30 C (to major octave) 65.41 B¹ (B counter octave) 61.74
Notes



Open C

One of characteristic features is the ease of extracting basic major chords. A simple barre on the 2nd fret will give "D", 4th fret will give "E", 5th fret will give "F" and so on. Open strings will give you "C".

In order to tune a guitar in “Open C”, you need (starting from the “standard tuning”): 1st string (thin) Leave as in the “standard tuning” - “E” (“E”)
2nd string. Raise half a step to “C” (“C”)
3rd string. Leave as in “standard tuning” - “Salt” (“G”)
4th string. Lower one step to “Before” (“C”)
5th string. Lower one step to “Salt” (“G”)
6th string (thick). Lower by two steps from “E” to “Do” (“C”)

Raised tunings of a six-string guitar

Tuning a guitar, especially a classical one, can damage the instrument., as well as to injuries due to a sudden break of a tightened string.

To increase the tuning, you can use a capo. If rebuilding your guitar is necessary, it is recommended to use a thinner set of strings.

String Build F (fa) Tuning F# (F-sharp) Tuning G (sol) G# scale (G sharp) System A (la)
Note Frequency (in hertz) Note Frequency Note Frequency Note Frequency Note Frequency
First f¹ (fa first octave) 349.23 f¹# (F-sharp first octave) 369.99 g¹ (sol of the first octave) 392.00 g¹# (G-sharp first octave) 415.30 a¹ (A first octave) 440.00
Second с¹ (to the first octave) 261.63 с¹# (C-sharp of the first octave) 277.18 d¹ (D first octave) 293.66 D¹# (D-sharp first octave) 311.13 e¹ (E first octave) 311.13
Third g# (G-sharp small octave) 207.00 a (A small octave) 220.00 a# (A-sharp small octave) 233.08 b (B small octave) 246.94 c¹ (to the first octave) 261.63
Fourth d# (d-sharp small octave) 155.56 e (minor octave E) 164.81 f (f small octave) 174.62 f# (F-sharp small octave) 185.00 g (small octave sol) 196.00
Fifth A# (A-sharp major octave) 116.54 B (big octave B) 123.48 c (to small octave) 130.82 c# (C-sharp small octave) 138.59 d (small octave D) 147.83
Sixth F (major octave F) 87.31 F# (F-sharp major octave) 92.50 G (major octave G) 98.00 G# (G-sharp major octave) 103.80 A (A major octave) 110.00
Notes




"Drop D" formation

This tuning differs from the classical one in that it is lowered by tone sixth string. It is often used by hard rock electric guitarists because it makes it easier to play 5th chords. power-chord), also some works were written for him classical guitar(in the keys of D major and D minor).

"Drop C" formation

Used to produce an even lower and “heavier” sound on an electric guitar. Unlike the classical system, all strings except the sixth tune in to tone below and sixth string- on two tones.
Like Drop tuning D is used to play fifth chords.

Double Drop-D formation

The tuning is similar to Drop D, differing in that the first string is lowered a tone. For tuning from classical tuning first And sixth the string is lowered to tone.
In this tuning, the top four open strings of the guitar form a G major chord, making it easier to play with slide. Double drop D was often used by performer Neil Young.

Build "DADGAD"

The tuning most often used in folk music. It was invented by British guitarist David Graham for more convenient playing from notes recorded for violin or bagpipes.
To change the “DADGAD” system from the classic one, you need to lower it to tone first, second And sixth strings.

Build "DADDAD"

The “Papa-Papa” tuning is most suitable both for use in folk music (Celtic) and for playing rhythm guitar parts in “heavy” (alternative) music, 4 notes at a time. To change the tuning “DADDAD” from the classical one, you need to lower it to tone first, second And sixth strings. A third tune in unison with fourth.

Build "Open D"

In this tuning, the open strings form a D major chord. It is used primarily on slide guitars.
To rebuild into this system from the classical first, second And sixth strings drop to tone, third goes down to semitone.

"Open G" build

In this tuning, the open strings form a G major chord.
To change to "Open G" tuning from the classic first, fifth And sixth strings drop to tone.

"New Standard"

Also known as "Crafty tuning". A tuning developed by musician Robert Fripp and used by him since 1983. In contrast to the classical “quart” tuning, the tuning proposed by Robert Fripp is closer to bowed string instruments, and first, second And third the strings are tuned similarly to a violin. Tuning to this tuning may require replacing the lower strings with thicker ones and the upper strings with thinner ones.

"Alternative tuning Cross A"

E-A-E-A-E-A. "Sitar A" is an alternative lowered guitar tuning. Reminds me of the sound of an Indian sitar. Great for creating Indian (oriental) music.

Seven-string tunings

Standard

Build seven strings string guitar mixed - third-fourth, so the chord of the open strings is consonant (major quarter-sixth chord), unlike a six-string guitar. This system is considered classical (academic).

The guitar is one of the most famous and at the same time unpredictable instruments that can touch the most sensual strings of the soul. But the guitar itself also has them.

Few people pay attention to the name of the strings on a guitar, considering it completely unnecessary. But often the performance of any composition depends on the setting. Any dissonance causes associative rejection of the composition as a whole. But in this material the main focus will be on tuning the instrument and its use for beginning musicians.

Guitar string name: classic version

In general, it is considered a classic. However, one can recall quite a lot of examples of great composers who preferred seven strings to six (at least Vysotsky).

However, according to music theory and solfeggio, the names of the strings do not differ at all. Based on the rules established general theory music, the notes by which any instrument is built have their own names and abbreviations in the form of Latin symbols and language interpretations. In our case it is:

  • C - to.
  • D - re.
  • E - mi.
  • F - fa.
  • G - salt.
  • A - la.
  • H - B (B - B-flat is indicated separately).

(sharps, flats, bekars or their double versions) are applied accordingly. But there are only 6 strings.

The string on the guitar at the top of the neck has the same sound as the first string at the bottom three octaves apart. Therefore, both the first and sixth are, as it were, dominant, but only in relation to a 6-string instrument (the main tuning is in E minor).

Mi-si-sol-re-la-mi: is the sequence in tuning correct?

Quite often, many beginning guitarists who are trying to understand the basics of the technique are immediately faced with the problem of tuning, not knowing which string corresponds to which symbol in the designation or sound.

If you go through the search, sequentially from the sixth string to the first, it will look like “e-la-re-sol-si-mi”. And the above sequence is reverse.

Such a sequence is not suitable for a flat sequence, since it should look like “si-mi-la-re-sol-do-fa”. However, we digress from the topic.

Fundamental tone and tuning

The name of the strings, as is already clear, is standard for any instrument. As for the (6-string) this is done quite simply.

There are several ways in which a beginning musician can use the unison of an open string lower on the neck with one that is clamped at the fifth fret above. All strings, except the third, are built according to this rule. You can use the harmonic effect on different frets (the strings vibrate among themselves) or turn on a distortion effect, which will add drive and increase vibration. That is, the strings will have to be retuned until the sound matches completely. Professional electric guitars have a special micro-tuning device on the soundboard for this purpose).

Basic chords for beginners

Many beginning guitarists tend to associate the note “A” with the chord, which is the second easiest chord to use in guitar technique.

It consists of only three fingers: two on the second fret (fourth and third string) and one on the second string on the first fret. The note “A” in this case acts as a tonic.

But the simplest chord is still the E minor chord. There are only two strings - the fifth and fourth on the second fret. A major chord played from “E” involves holding the third string on the second fret, and a major chord with the tonic “A” is even simpler - three fingers on the second fret (second, third and fourth string).

Barre technique

Although the name of the strings on a guitar no longer causes misunderstanding, it is especially worth noting a technique called barre (clamping index finger all right).

Any standard chord can be built using this technique. In fact, the same simple applications indicated above can be applied to this case, but only the nut near the tuning mechanism on the headstock acts as a barre.

Varieties of playing techniques

The name of the strings on a guitar is often emphasized with certain symbols, although it is not directly advertised. For example, in the standard version the third, fifth, seventh and twelfth frets are designated (sometimes the ninth). For many famous guitarists you can find all sorts of signs, including skulls or something else. These guitars are made to order.

And playing any instrument is quite difficult, be it fingerpicking, strumming, tapping, sliding, etc. With the advent of “gadgets,” technology has reached new level. That alone is worth it... And modern guitarists generally demonstrate such miracles of technology that it simply boggles the mind.

The same Steve Vai, Marty Friedmann or Kirk Hammett are the only ones of our time. And by the way, even though they know classical school, do not always use it in their improvisations. For example, Friedman tends to play in fifths, or nine notes per pass. And everyone's technique is different. But if you set a goal, nothing is impossible. Maybe the modern reader will become a great guitarist in the future, who knows?

If you have already decided to start playing the guitar, then the first thing you need to do when you pick up the instrument is to tune the guitar. About how it is carried out 6 string guitar tuning and this article tells the story. Let's look at how to tune a guitar with and without a tuner. Never play an out of tune guitar - it will completely damage your hearing!

Standard guitar tuning

Tuning a guitar requires each string to sound a specific note. The set of notes of all strings is called the tuning of a guitar. Tuning a 6 string guitar can be done in different tunings, but we will focus on the most common one - classical system which is more often called standard formation guitars.

In short, any tuning is written as a sequence of notes of the open strings from the first to the sixth. The standard tuning is written like this:

E B G D A E

What does it mean in Russian:

Mi Si Sol Re La Mi

As you can see, the first and sixth strings sound the note Mi , but in the case of the sixth string it is Mi second octave (thick string), and the first string produces Mi fourth octave (thin). There will be more about this a little later.

Guitar tuner

In the age of technology, it would be strange if there was no gadget for tuning a guitar. But it exists and there are just a lot of options. Not only is this a very convenient thing, it is also very cheap.

This is a small clothespin that attaches to the headstock, i.e. to the place where the pegs are on the guitar. The clothespin contains a sensor that detects sound vibrations going about t strings Thanks to this, the tuner does not pick up external noise.

We will look at what these strange letters on the screen are, but for now I want to please you. The cost of this miracle on AliExpress only 3$. In music stores, such tuners are sold many times more expensive. I recommend purchasing it if necessary. It will come in handy, I use this myself. It's better to buy in this store .

Tuner for tuning a guitar on your phone

Today there is more than one online service for tuning a guitar. There are also enough programs for PC, for example the same Guitar Pro allows you to do this. But it is much more convenient to install the application on your smartphone and not depend on the Internet and/or computer.


There are tons of guitar tuning apps for smartphones. But the most complete and advanced among them all was and remains to this day the gStrings guitar tuner. I've been using it for 5 years now.

You can download it from Google Play Market A.

After all the changes made by the developers, the application has become maximally adapted to living conditions. You just need to take your phone out of your pocket, open the app and start plucking strings, not necessarily guitar strings. The application is omnivorous and is great for tuning a guitar, as well as for tuning a bass guitar, violin and any other instrument. Even the drums were once pulled up on it.

At the top of the tuner screen are consecutive notes. In the center is a tuned note, and an arrow indicates what to do with this note. If the arrow is to the left of the center of the screen, it means the note is not played. If it’s to the right, it’s overtightened.


A note is considered tuned if the arrow points to the center, i.e. on the note itself, while its color changes, in this case from gray to white. Today, all tuners have a similar intuitive interface.

As already shown above, notes are indicated by the first letters of the English alphabet. The letters go as in the English alphabet, in order, but starting with the note A:

  • Do - C
  • D - D
  • Mi - E
  • Fa - F
  • Salt G
  • A - A
  • C - B

When talking about standard tuning, octaves were mentioned. Which octave a note belongs to is indicated in the program by a number next to the note. Under the note, its frequency is indicated in Hertz (Hz). The center of the screen shows the sound frequency in this moment. For standard tuning this is:

  • 1 stringE 4329.63 Hz
  • 2nd stringB 3246.94 Hz
  • 3rd stringG 3196.00 Hz
  • 4th stringD 3146.83 Hz
  • 5 stringA 2110.00Hz
  • 6th stringE 282.41 Hz

Don't get confused! otherwise in best case scenario You'll break the string, or at worst, you'll damage the guitar.


Tuning a 6 string guitar by notes

Today, given that everyone has a smartphone or two in their pocket, this option for tuning a guitar can be considered outdated, but you shouldn’t write it off. One way or another, everyone who plans to continue playing the guitar should know it. You never know, suddenly the battery on your smartphone runs out)


The method is based on the fact that each subsequent string is tuned to the previous one by ear, by resonance. As we already know, the open first string produces the note Mi. If we hold down the second string at the fifth fret, we will also get the same note Mi and a resonance will arise between them, i.e. they will begin to enhance each other's sound.

This means that in order to tune the second string, it needs to sound the same as the open first string at the fifth fret. Therefore, we clamp the second string at the fifth fret, pluck the first string, and then the second, and try to determine whether the second string sounds higher or lower.

At the same time, to make it easier to determine whether the second string is understretched or overtightened, you can move from the fifth fret to other frets and look for which fret the resonance will occur on. If it occurs on higher frets (6,7,8...) then the second string should be tightened even more. If resonance occurs if you hold the second string at lower frets (1-4), then the second string is overtightened.

Guitar beats and tuning

When you come very close to the desired note and the difference between the notes is very close, so-called beats occur. Beating is the result of a slight difference between two close frequencies that are trying to resonate, but because of the slight difference, the sound is either strengthened or weakened. Graphically it looks like this:


When setting acoustic guitar, the beats are not only perceptible by ear, but also clearly felt by the body when touching the soundboard (body) of the guitar. This is especially noticeable on the upper bass strings, due to their thickness and lower sound frequency.

The closer the sounds of two notes correspond to each other (the second string on the fifth fret and the open first), the faster the beats will occur. And when the notes coincide, the beats will stop altogether. You just have to feel it and then you can adjust it without thinking.

By analogy for the other strings. The third string should sound the same as the second open string when plucked at the fourth fret. To tune the 4th, 5th and 6th strings, you should clamp them at the fifth fret and compare their sound with the sound of the previous string.


It turns out that all strings except the third are tuned according to the resonance between them at the fifth fret and the previous string, and the third string is similar, but is clamped at the fourth fret.

Sheet music for guitar tuning

This way you can tune the guitar in reverse order or starting from any string, but there is one weak point in this method. Initially, one of the strings must be tuned from outside. The tuning fork was invented for these purposes. A standard tuning fork produces an A note with a frequency of 440 Hz. Those. This is the first string on the fifth fret.


Especially for you, a 20-second file with the note A (440Hz) produced by a standard tuning fork was created in the Audacity audio editor. Well, at the same time, 20 seconds of the sound of the first string.

Download or listen online sheet music for guitar tuning:


You can create the sound of any note yourself in Audacity. How to do this, read the article:

Another instrument, such as a piano or a second guitar, can also serve as a reference. But it’s better to memorize some melody for yourself, preferably using all the strings separately, by playing which you could accurately determine whether the instrument is out of tune and which strings should be tuned.

For me personally, such a melody is the introduction of Viktor Tsoi’s song “Aluminum Cucumbers.” If you develop auditory memory and remember the sound of notes, then you can tune a guitar without a tuning fork, and even more so without tuners, without any problems. It just takes practice and regular play.

And finally, a video showing another guitar tuning option:

The article was written exclusively for the site

Beginner guitarists often wonder: what tuning does this or that favorite rock band play in? How to tune a guitar so that you can comfortably play known and favorite songs? In this article I will briefly give examples guitar tunings in rock music and their representatives (musicians, groups).

I will immediately give a list of the notations used:

  • C - note C
  • D - note D
  • E - note E
  • F - note Fa
  • G - note Sol
  • A - note A
  • B (or H) - note B
  • # - sharp - raising a note by a semitone. Half a tone on a guitar - one fret.
  • b - flat - lowering the note by a semitone.
  • The notes in the tuning tablature are arranged in order from the 1st (thin) string to the 6th (thick) string. For example, E B G D A E.

1. Standard, E (standard, Spanish or classical tuning).

The simplest and most famous guitar tuning. Tablature of the system: E B G D A E - Mi Si Sol Re La Mi. This system is used mainly by rock music luminaries, old-school musicians and adherents of light genres.

Groups and musicians who play in standard tuning:

  • AC/DC
  • Led Zeppelin
  • Metallica
  • Gun's & Roses
  • Nightwish
  • Deep Purple
  • Nirvana (semitone lower)
  • Blink 182
  • Sum 41
  • Joe Satriani
  • Carlos Santana
  • Aria, Kipelov (half a tone lower)
  • Nickelback
  • Placebo
  • Rage Against The Machine
  • Queen
  • Red Hot Chili Peppers
  • Rise Against
  • Scorpions
  • Steve Vai
  • Chuck Berry
  • Bon Jovi
  • 30 Seconds To Mars

2. Drop D (lowered D)

This tuning differs from the standard one in that the 6th string on the guitar is lowered one tone. In consonance with the 4th and 5th strings it gives an octave. Tablature: E B G D A D. Like any low pitch it is convenient in that you can play “zeros” (the so-called open strings) on it and previously familiar chords can be pressed with just one finger, plus two more low chords are added that are not available when playing with standard tuning.

Bands that play in the Drop D tuning:

  • Asking Alexandria
  • Avenged Sevenfold
  • Evanescence
  • Linkin Park (later albums)
  • Papa Roach
  • Rage Against The Machine
  • three days Grace
  • Thousand Foot Krutch
  • Queens of the Stone Age
  • Deftones
  • fall out Boy
  • Shinedown
  • Amatory

3. Drop C# (lowered C sharp)

This is a tuning in which all the strings are lowered by another semitone, unlike the D tuning. Tablature: D# A# F# C# G# C#.

Bands that play in the Drop C# tuning:

  • Linkin Park
  • Attack! Attack!
  • Breaking Benjamin
  • Papa Roach (some songs from recent years)
  • Limp Bizkit
  • H-Blockx
  • Staind
  • Deftones

4. Drop C (lowered C)

This lowered tuning is quite common in alternative and metalcore music. Tablature: D A F C G C.

Bands that play in the Drop C tuning:

  • Bullet For My Valentine
  • As I Lay Dying
  • Atreyu
  • Periphery
  • three days Grace
  • System of a Down
  • Godsmack
  • Nine Lashes
  • Breaking Benjamin
  • 12 Stones
  • Disturbed
  • Lumen
  • Nickelback
  • Skillet
  • Rammstein
  • Evans Blue
  • August Burns Red

5. Drop B (lowered C)

The low B tuning is an alternative to the standard seven-string guitar tuning. It allows you to tune a six-string guitar as low as a seven-string guitar would sound, plus it allows you to play chords more comfortably. Tablature: C# G# E B F# B. Seven-string guitar tablature: E B G D A E B.

Bands that play in the Drop B tuning:

  • Parkway Drive
  • Slipknot
  • Thousand Foot Krutch
  • Bleeding Through
  • Linkin Park
  • Amatory
  • Limp Bizkit
  • Skillet
  • Veil of Maya
  • Stigmata

6. Drop A# (lowered A sharp)

This tuning is also an alternative to the seven-string guitar lowered by a semitone. Tablature: C G D# A# F A#. Seven-string guitar tablature: D# A# F# C# G# D# A#.

Bands that play in the Drop A# tuning:

  • Bring Me The Horizon
  • Parkway Drive
  • Breaking Benjamin
  • Obey The Brave
  • The Ghost Inside
  • Korn (7-strings)

7. Drop A (lowered A)

Extremely low build. Tablature: B F# D A E A. Seven-string guitar tablature: D A F C G D A.

Bands that play in Drop A tuning:

  • My Autumn
  • Betraying The Martyrs
  • Emmure
  • Born Of Osiris
  • Within The Ruins

This is not a complete list of all guitar tunings. In addition to standard and lowered schemes, others are used: for example, when not only the 6th string is lowered, but also the 1st string. This technique is used in blues; it allows you to produce beautiful sounds by playing a slide on the first three strings. Also, in addition to seven-string guitars and baritones (guitars with an increased scale), there are now eight-string and even nine-string electric guitars. Accordingly, the tunings of these guitars are much lower.

Do you know what strings are needed for a certain tuning?

The list of musicians and groups is also far from complete. If you have suggestions for adding to the article or questions about what tuning a certain group plays in, write in the comments!

Interesting topic. It seemed to me that on the Internet it was somehow not covered from the side that I would like (but maybe not only me?). Increased attention is paid to the actual pitch: I read on the wiki that the standard tuning is lowered by 0.5, 1, 1.5, 2, and 2.5 tones, raised by 0.5 and 1 tone, etc. What interests me is not the actual pitch of the sound, but the tuning, i.e. the relationship of string tuning to each other, and most importantly, what can be learned from this, in the context of a classical (or “near-classical”) guitar.

So, the usual tuning is E-A-D-G-B-E (strings 6 => 1). Allows you to at least play in the keys: C major, D major, E major, G major, A major, D minor, E minor, A minor, B minor. Particularly convenient:


  • A minor and A major (open basses of all major harmonic functions I, IV, V);

  • E minor, G major, C major, D major, D minor (just a lot of open strings and bass).

The keys E major and B minor are used a little less frequently than the others listed, because somewhat less convenient.

Drop sixth tuning: D-A-D-G-B-E (strings 6 => 1). Used almost exclusively to play in D major and D minor, because an open powerful tonic bass appears.

OPEN-G build: D-G-D-G-B-D (strings 6 => 1). It is used, as far as I understand, mainly for the convenience of accompaniment. The OPEN-G tuning actually corresponds to this form of a major triad (regular tuning):

This is where the popular systems end...

In Matteo Carcassi, at the very end of his School, we have five pieces with the “E major” tuning E-B-E- -B-E (strings 6 => 1), which actually corresponds to this form of a major triad (regular tuning):

New system inspires new musical thoughts. Changing tunings will allow you to use voicings and transitions between chord forms that would not normally be possible. The new tuning will make non-standard open strings available. Playing familiar fingerings on an unfamiliar fretboard is exciting - you never know exactly what to expect. Using familiar riffs on an unfamiliar fretboard often leads to new sound patterns and variations. This book will help you find alternative ways to make music.

Why is the standard guitar tuning standard? Where did this strange combination of a major third and four perfect fourths come from? It's part history (look at the guitar as a descendant of the lute), part technology (strings that are too high and thin tend to break, and those that are too low tend to be too soft) and part chance. However, the standard is the standard, and almost everyone who plays guitar knows the EBGDAE tuning. It turns out that only some folk musicians use different tunings, who do it only because they don’t play well enough?

Well, maybe Leo Kottke knows what he's doing, and maybe Wm. Ackerman and Michael Hedges are good, and it is possible that Adrian Belew is talented... But playing with changing tunings is impossible on stage, retuning is a nightmare... strings break, float and go out of tune, the neck is deformed. And the alternative - transporting five special guitars for five tunings - is extremely inconvenient. Back to EBGDAE.

But all these “practical” reasons pale against the background of psychological inertia. "I spent years mastering one tuning, why should I try others?" Because there are whole musical worlds, waiting to be used. Once you've tuned in and explored the single extra tuning, you'll be captivated by unexpected fingerings, simple basses, "new" open-string chords. New tunings are a way to recapture the wonder you once felt when finding your way on the fretboard - but now you can become proficient in days rather than years!

And the "practical" reasons become less compelling with the introduction of guitar MIDI controllers, which actually allow guitarists to do much more than just play like a synthesizer. With the press of a button, you can change the tuning of all six strings - no dirty-sounding or broken strings, no extra guitars. And changing the tuning itself is no longer limited by the mechanics of string thickness and fingerboard load. How about a six bass string setup? A tuning that spans six octaves? String configurations that were impossible with wood and guttural strings can now be realized through the magic of MIDI.

The book will show you how to dip your guitar into all the popular alternative tunings, how to play them with barre and open string chords, includes diagrams of scales and pictures of the notes on the fretboard. Each setting is briefly discussed, exploring its benefits and limitations, helping you with your music studies. The book is divided into four large sections, corresponding to the four main types of alternative tunings: open, instrumental, systematic, and "special" tunings.

In open tuning, all six strings are tuned to form a simple chord. This makes it easier to use unusual transitions and interesting harmonies using resonances and “seasoned” strings. Slide guitar techniques and harmonics are great in open tuning because you can play full six-note chords. And you can play barre chords with one finger!

Instrumental scales based on the systems of modern and historical instruments, such as mandolin (extended for six strings), charango, zither, oud and many others. Players of these instruments will find tuning and chord charts helpful, and guitarists will find some really great ways to change the sound of their instrument.

IN systematic system the strings are tuned uniformly. This allows the chord shapes to move up and down the strings, similar to a regular barre chord moving along the fretboard. Learn a handful of chord forms in a systematic tuning and you'll know hundreds of chords!

Special tunings - collection different systems, most of which were created and/or popularized in last years various singers and songwriters.

Explore these alternative musical universes with this study guide, complete with handy chord and scale diagrams. Don't wait... rebuild your guitar now.

Open formations in general

When open strings form a simple chord, the tuning is called open; the "open C" tuning builds a C major chord, the "open G" tuning builds a G major chord, etc. This certainly makes it easier to play in a "natural" tuning key. But limiting playing to just a few keys would be a mistake, since most open tunings are versatile enough to play in many keys.

One of the most common uses open formation- the sound of open strings as a background or ostinato. This is an easy way to create unusual chord progressions and interesting continuous harmonies. When the harmonic movement is in the treble, the lower strings tend to be used as an ostinato, and vice versa.

Open tunings are ideal for using slide guitar techniques, as you can place a slide on any fret and play a full six-note chord. Likewise, harmonics are wonderful in open tuning. You can play all six harmonics at once on the 12th, 7th and 5th frets.

Many of the open tunings are highly coupled - they may differ by only one step on one string. For example, "Modal D" - "Open D" - "D Minor" or "Modal G" - "Open G" - "G Minor". The "G" tunings mentioned only differ on the second string. Consequently, chord fingerings can often "overlap", for example, a C major chord will be played with the same fingers in all three tunings (although it will not be completely identical).

Open C - C G C G C E (strings 6 => 1)

"Open C" is a deep, rich tuning that will allow you to play in many styles and keys. "Townsend Shuffle" by William Ackerman and "Requiem for Mississippi John Hurt" by John Fahey give general idea about the versatility and spaciousness of the "Open C" setting.

Three C strings and two G strings can be used to provide numerous chord variations with these notes.

Open D - D A D A D (strings 6 => 1)

The three bass strings can be used for power chords, as well as sustained ostinato sounds against the background (on thinner strings) of changing harmonies. Almost every chord type has a simple barre variation: major, minor, dominant seventh (7), sus4, 7sus4, major and minor with sixth (6). This makes "Open D" versatile and allows you to play in a variety of styles and keys. Two famous tunes in "Open D": "Big Yellow Taxi" by Joni Mitchel and "Little Martha" by Allman Brother.

Common variations of "Open D" are settings one tone higher or lower:
E B E B E (strings 6 => 1) (this is the Carcassi tuning mentioned above)
C G C E G D (strings 6 => 1)

As in many open formations, in "Open D" the numerous D and A strings can be used to make many variations of chords with these notes.

Modal D - D A D G A D (strings 6 => 1)

The open stuns of the "Modal D" tuning make up a wonderful Dsus4 chord that is neither major nor minor due to the lack of a third. Of course, it is possible to play in both major and minor keys.

This tuning is very close to "Open D" and differs only in the third string. Therefore, "Open D" chords can be used with minimal changes to the "Modal D" tuning, and vice versa.

Open D Minor - D A D F A D (strings 6 => 1)

The "Open D Minor" tuning shares five strings with "Open D", "Modal D", and "Pelican" (D A D E A D), differing only in the third string. As with all of these tunings, "Open D Minor" has three D strings and two A strings, resulting in a wide variety of simple chords with these notes.

Open G - D G D G B D (strings 6 => 1)

In "Open G" tuning, the strings are tuned like a G major chord, making it easier to play in the key of G and related keys. Although this tuning is often used in "folk" music, Jimmy Page's "Bron-Y-Aur Stomp" shows that it is more a matter of tradition than necessity.

The four thick strings match the banjo's tuning, so banjo players will find it makes life easier. Likewise, if you like "Open G", why not try the banjo?

The second, third and fourth strings are tuned exactly as in standard setting E A D G B E (strings 6 => 1). All chords on these three strings remain the same, making "Open G" one of the simplest alternative settings, in which you can play.

As with any open tuning, multiple D and G strings can be used to create new ways to play simple chords. Note that the "Open G" tuning is similar to the "Open G Minor" and "Modal G" tunings, meaning the chord shapes of these tunings can be used mutually with minor modifications.

The "Open G" tuning is very close to the Russian seven-string guitar. In fact, it is a Russian seven-string guitar without a fifth string.

Modal G - D G D G C D (strings 6 => 1)

The open guitar strings in "Modal G" make up a Gsus4 chord, which is neither major nor minor. Two pairs of fourths on strings 3-6 give a powerful sound, while the small difference of the two highest strings makes a variety of sus chords viable and interesting.

Like other open settings, this setting makes it quite easy to create various options chords using three D strings and two G strings. Additionally, "Modal G" is closely related to "Open G" (only the second strings are different, and only in one fret).

Open G Minor - D G D G bB D (strings 6 => 1)

Used in "Orphan" and "Mist-Covered Mountains of Home" by John Renbourn, the "Open G Minor" tuning is likely a descendant of the G minor banjo tuned D G bB D, where the two lowest strings are doubled an octave down. This tuning differs from "Open G" only in the second string, so their chords are easy to carry.

The tuning of "Open G Minor" is very close to the minor gypsy tuning D G bB D G bB D (strings 7 => 1) of the Russian seven-string guitar. In fact, this is the same seven-string guitar, but without the fifth string.

Open A - E A E A E (strings 6 => 1)

Larry Sandberg says that the "Open A" tuning is especially useful for Delta Blues sounds, and it's a great tuning for slide guitar because it allows you to simply slide from minor to major on the fourth string.

As with all open tunings, it's easy to find an extra variation on a chord by taking advantage of strings that are tuned to an octave.

Instrumental tunings in general

Instrumental tunings are based on the tuning of instruments such as balalaika, charango, dobro and others. They are adapted for use on six strings by supplementing the tuning of instruments that have fewer than six strings in a practical, although not the only possible, way. For example, Zither tuning (2) expands the zither tuning of "C G C G C" to six strings, eventually becoming "C G C G C G". The balalaika tuning combines the bass (E A D) and prima (E E A) balalaika tunings to produce six strings tuned as "E A D E E A".

Balalaika - E A D E E A (strings 6 => 1)

Three thick strings are tuned exactly the same as in a regular guitar tuning. The third and second strings are tuned in unison, one tone higher than the fourth string. The first string is tuned like the third string in regular guitar tuning, held down on the second fret.

Balalaika - three-string Russian folk instrument with a characteristic triangular shape. The balalaika family extends from the large bass (EAD tuning), includes tenor, alto, and ends with the prima balalaika (EEA tuning). Balalaika guitar tuning combines the bass and prima balalaika tunings on the same neck for an interesting, almost authentic tuning.

The tuning benefits from the natural tones of E and A, and the hypnotic effect of two E strings tuned in unison. If you use regular strings, the second string will be very loose, giving the effect of a sitar sound.

Charango - X G C E A E (strings 6 => 1, 6th string not used)

This is what the scale looks like on the staff:

This seemed like a pretty monstrous setup to me. It cannot be used on regular strings - it is too low. Apparently, they also stretch the basses instead of the upper strings...

The charango is a ten-stringed instrument from the Andes region of Peru and Bolivia, for which the shell of an armadillo is often used as a resonator. The instrument is usually held high on the chest, and the strings are paired, like a mandolin or 12-string guitar. The third pair is usually tuned to an octave, while the other four pairs are in unison. Perhaps the main feature of the tuning is that the strings do not run uniformly from low to high. They form an Am7 chord (with an E bass) and are all within the same octave. This creates very interesting fingering patterns for right hand, since the bass (on the 3rd note) tends to syncopate.

In the Andean musical tradition, the charango plays three roles. When playing a melody, its double strings produce a mandolin-like sound. In finger style, the charango tends to sound "very fast", playing a role similar to the banjo in American folk tradition. Finally, charango players have perfected fast strumming, in which the first finger of the right hand quickly hammers back and forth across the strings. The loose wrist style of this style is reminiscent of the "Spanish" style rasgueado, although the higher pitched charango gives it a unique feel.

Zither (1) - C F C G C D (strings 6 => 1)

A zither is like a mandolin with an extra pair of strings. Zithers can be tuned in a variety of open tunings, such as CFCGC, DGDAD or GCGDG, any of which can be used with virtually the same fingering (in our guitar tuning, this is the fingering for strings 2-6). For example, to play DGDAD, all you have to do is move existing chord shapes down two frets.

Zither (2) - C G C G C G (strings 6 => 1)

Three pairs of fifths span three octaves and create a "wider" tuning than normal. The bass is deeper and the trebles are higher. Chords tend to be very wide, with large intervals between adjacent tones, and scales invariably require sliding up and down the fretboard. The stretches are too large to be comfortable playing in a single position.

Barre on all six strings is a chord that is neither major nor minor, and these three fifths are useful for pieces that are tonally indeterminate.

Moving a riff or fingering pattern an octave is simply a matter of moving two strings. New fingerings for some chords can be found simply by changing the strings. With this trick you can form hundreds of chords from just a few standard chords. Doubling some notes gives even more possibilities.

Dobro - G B D G B D (strings 6 => 1)

Dobro is a type of guitar with a metal resonator. It is usually held horizontally on the lap and used in a similar way to a slide guitar. It is typically tuned in a G major chord, which is different from the G major chord of "Open G" (D G D G B D), although the three high strings are identical. Therefore, the same chords can be fingered on the high strings of both tunings.

The two "triplet" dobro strings are exactly an octave apart, making it easier to visualize chord shapes and move them up and down an octave. For example, a chord can be played high or low, or the two octaves can be combined to create a more “complete” version.

Lefty - E B G D A E (strings 6 => 1)

This is a left-handed tuning - the strings are simply tensioned in the reverse order, in normal tuning. The author of the book claims that it can be played in a normal position.

Interestingly, it doesn't take long to become quite proficient with left-handed guitar (assuming you're fairly proficient with regular right-handed guitar), because left/right symmetry makes many chords easier to remember. In general, scales are more confusing than chords - the sound often goes up when you expect it to go down, and vice versa. Different kinds strumming acquires interesting character, because "alternative bass" becomes "alternative treble".

Overtone - C E G C D (strings 6 => 1)

This tuning is highly "compressed" - all six strings are within little more than a single octave. This sometimes creates very "tight" chords and harmonies. Many major, minor and seventh chords have repeating tones that create interesting sounds.

Pentatonic - A C D E G A (strings 6 => 1)

The six strings of this tuning are within a single octave of the pentatonic scale. The tuning is very "compressed" as all six strings span only one octave. Chords tend to contain multiple copies of tones, giving the impression choral singing and depth.

Systematic formations generally

In systematic tuning, all six strings are equally spaced from each other. This means that any fingering pattern can be moved up and down the fretboard in the same way that a regular barre chord can be moved along the fretboard. Systematic tunings make learning chords very easy, since each fingering pattern will be useful for so many chords.

Minor thirds - C A C (strings 6 => 1)

Strings tuned to minor thirds form a diminished chord. This is a very "compressed" tuning, as all six strings are tuned within one decime. This is the distance that most adults can stretch their fingers on the keyboard, and chords tend to end up in a tight arrangement, like on a keyboard.

Unlike the piano, however, chords in this tuning often contain multiple copies of a single note. This isn't necessarily a bad thing. The sound of the two notes is invariably different, and the doubled notes “strengthen” each other, just as the doubled strings of a twelve-string guitar add “chorality” and depth. When plucking or plucking a chord, the doubled notes can create a unique effect similar to the sound of a mandolin with double strings.

Major thirds - C E C E (strings 6 => 1)

This tuning could be called "Open C Augmented" since it contains two octaves of an augmented C triad. Thus, it has the properties of open settings described above. At the same time, it also has the above-described properties of systematic settings.

All Fourths - E A D G C F (strings 6 => 1)

All fourths are the closest systematic tuning to standard tuning. Looking at the ease of memorizing chord forms in a systematic tuning, the question arises: why does traditional tuning lower the two highest strings down a semitone?

One reason may be the lack of major and minor triads on the full six strings, even in open position. There are, however, numerous easy-to-finger four- and five-note chords that can easily move along the fretboard.

All chords and scales on the low four strings of standard tuning can be used literally, and they can be directly transferred to the top two strings. Electric guitar (bass) players often find this to be a very simple and good way to extend the tuning of four bass strings to six.

Aug Fourths - C C C (strings 6 => 1)

The augmented fourth is the only interval whose inversion is equal to itself. Augmented fourth tuning is the only tuning in which all chord shapes will remain the same when the strings are reversed (as for lefties). So this setting is its own "lefty". If we lived in peace with equal number left- and right-handed guitarists, then it is possible that this tuning would be the standard!

Mandoguitar - C G D A E B (strings 6 => 1)

The four strings of a mandolin (like a violin) are tuned in a sequence of perfect fifths. The mandoguitar tuning expands this to six strings, with one fifth below the violin and another fifth above. This provides deeper bass than on a guitar, and at the same time higher treble.

However, the first open string Tuned like the first string in standard tuning, pressed down at the seventh fret. Perhaps this is a little high - it will no longer be possible to use ordinary strings.

Minor Sixth - C E C E (strings 6 => 1)

The first string is tuned the same as in standard tuning, and the remaining strings go down in sixths. The fifth and sixth strings are so low that using standard strings no longer possible.

Like the "Major Thirds" tuning, this tuning could also be called "Open C Augmented", although the strings are ordered differently (C E instead of C E), with all that that implies.

Despite this formal similarity, the two settings are quite different. The "Minor Sixth" tuning is very broad and covers more than three octaves, while the "Major Thirds" tuning only covers one and a half octaves. Chords in the "Minor Sixth" tuning tend to be spread wide, with long intervals between notes, and have low bass and high treble at the same time. Chords in Major Thirds tuning, on the other hand, tend to "compress", often with multiple copies of the same note in the same octave.

Major Sixth - C A C A (strings 6 => 1)

The first string is tuned the same as the first string in standard tuning, pinned down at the fifth fret, with the remaining strings going down in sixths. You can no longer use standard strings.

As in the Minor Thirds tuning, the strings form a diminished C seventh chord. Both tunings contain the notes C A, although the strings are in different orders and double different tones.

Despite this superficial similarity, the two tunings are quite different, primarily because the six strings of the "Minor Thirds" tuning span little more than an octave, while the "Major Sixth" tuning spans more than three and a half octaves. As a result, chords in the "Major Sixth" tuning tend to sound sparse, with large intervals between adjacent notes. Scales will be awkward because they cannot be played in a single position. On the other hand, the tuning range is enormous, as there are five octaves from the lowest “C” to the highest “C”. That's as wide a spacing as most mid-sized keyboards!