Fb7b13 Mandolin Chord — Chart and Tabs in Modal D Tuning

Short answer: Fb7b13 is a Fb 7b13 chord with the notes F♭, A♭, C♭, E♭♭, D♭♭. In Modal D tuning, there are 216 voicings. See the fingering diagrams below.

Also known as: Fb7-13

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How to Play Fb7b13 on Mandolin

Fb7b13, Fb7-13

Notes: F♭, A♭, C♭, E♭♭, D♭♭

x,x,6,2,2,3,0,0 (xx4123..)
x,x,6,2,3,2,0,0 (xx4132..)
x,x,0,2,2,3,6,0 (xx.1234.)
x,x,0,2,3,2,6,0 (xx.1324.)
x,x,0,2,2,3,0,6 (xx.123.4)
x,x,0,2,3,2,0,6 (xx.132.4)
x,x,x,2,2,3,6,0 (xxx1234.)
x,x,x,2,3,2,6,0 (xxx1324.)
x,x,x,2,2,3,0,6 (xxx123.4)
x,x,x,2,3,2,0,6 (xxx132.4)
5,x,6,2,3,2,2,2 (3x412111)
3,x,6,2,5,2,2,2 (2x413111)
3,x,2,2,2,5,2,6 (2x111314)
5,x,2,2,3,2,6,2 (3x112141)
5,x,6,2,2,3,2,2 (3x411211)
2,x,6,2,5,3,2,2 (1x413211)
2,x,2,2,5,3,2,6 (1x113214)
5,x,2,2,3,2,2,6 (3x112114)
2,x,2,2,3,5,2,6 (1x112314)
3,x,2,2,5,2,2,6 (2x113114)
5,x,2,2,2,3,2,6 (3x111214)
2,x,2,2,3,5,6,2 (1x112341)
3,x,6,2,2,5,2,2 (2x411311)
3,x,2,2,2,5,6,2 (2x111341)
2,x,2,2,5,3,6,2 (1x113241)
2,x,6,2,3,5,2,2 (1x412311)
3,x,2,2,5,2,6,2 (2x113141)
5,x,2,2,2,3,6,2 (3x111241)
x,x,6,2,3,2,0,x (xx4132.x)
x,x,6,2,3,2,x,0 (xx4132x.)
x,x,6,2,2,3,0,x (xx4123.x)
x,7,10,9,11,x,0,0 (x1324x..)
x,7,9,10,11,x,0,0 (x1234x..)
x,x,6,2,2,3,x,0 (xx4123x.)
x,x,0,2,2,3,6,x (xx.1234x)
x,7,9,10,x,11,0,0 (x123x4..)
x,x,0,2,3,2,6,x (xx.1324x)
x,7,10,9,x,11,0,0 (x132x4..)
x,7,0,9,11,x,10,0 (x1.24x3.)
x,x,0,2,3,2,x,6 (xx.132x4)
x,7,0,10,11,x,9,0 (x1.34x2.)
x,7,0,10,x,11,9,0 (x1.3x42.)
x,x,0,2,2,3,x,6 (xx.123x4)
x,7,0,9,x,11,10,0 (x1.2x43.)
x,7,0,10,11,x,0,9 (x1.34x.2)
x,7,0,10,x,11,0,9 (x1.3x4.2)
x,7,0,9,11,x,0,10 (x1.24x.3)
x,7,0,9,x,11,0,10 (x1.2x4.3)
2,x,6,2,3,x,0,0 (1x423x..)
3,x,6,2,2,x,0,0 (3x412x..)
3,x,2,2,5,2,6,x (2x11314x)
2,x,6,2,x,3,0,0 (1x42x3..)
2,x,2,2,5,3,6,x (1x11324x)
5,x,2,2,2,3,6,x (3x11124x)
3,x,6,2,x,2,0,0 (3x41x2..)
5,x,2,2,3,2,6,x (3x11214x)
2,x,6,2,3,5,2,x (1x41231x)
3,x,6,2,2,5,2,x (2x41131x)
2,x,6,2,5,3,2,x (1x41321x)
5,x,6,2,2,3,2,x (3x41121x)
3,x,6,2,5,2,2,x (2x41311x)
5,x,6,2,3,2,2,x (3x41211x)
2,x,2,2,3,5,6,x (1x11234x)
3,x,2,2,2,5,6,x (2x11134x)
2,x,x,2,3,5,2,6 (1xx12314)
3,x,x,2,5,2,2,6 (2xx13114)
5,x,6,2,3,2,x,2 (3x4121x1)
2,x,0,2,x,3,6,0 (1x.2x34.)
5,x,x,2,2,3,2,6 (3xx11214)
5,x,2,2,2,3,x,6 (3x1112x4)
3,x,x,2,5,2,6,2 (2xx13141)
2,x,2,2,5,3,x,6 (1x1132x4)
3,x,2,2,5,2,x,6 (2x1131x4)
5,x,x,2,3,2,6,2 (3xx12141)
2,x,2,2,3,5,x,6 (1x1123x4)
2,x,x,2,3,5,6,2 (1xx12341)
5,x,x,2,3,2,2,6 (3xx12114)
2,x,x,2,5,3,6,2 (1xx13241)
3,x,x,2,2,5,6,2 (2xx11341)
3,x,0,2,2,x,6,0 (3x.12x4.)
5,x,x,2,2,3,6,2 (3xx11241)
3,x,x,2,2,5,2,6 (2xx11314)
2,x,0,2,3,x,6,0 (1x.23x4.)
5,x,2,2,3,2,x,6 (3x1121x4)
2,x,6,2,3,5,x,2 (1x4123x1)
3,x,6,2,2,5,x,2 (2x4113x1)
2,x,6,2,5,3,x,2 (1x4132x1)
5,x,6,2,2,3,x,2 (3x4112x1)
3,x,0,2,x,2,6,0 (3x.1x24.)
3,x,6,2,5,2,x,2 (2x4131x1)
2,x,x,2,5,3,2,6 (1xx13214)
3,x,2,2,2,5,x,6 (2x1113x4)
11,7,10,9,x,x,0,0 (4132xx..)
11,7,9,10,x,x,0,0 (4123xx..)
2,x,0,2,3,x,0,6 (1x.23x.4)
3,x,0,2,x,2,0,6 (3x.1x2.4)
3,x,0,2,2,x,0,6 (3x.12x.4)
2,x,0,2,x,3,0,6 (1x.2x3.4)
11,7,0,9,x,x,10,0 (41.2xx3.)
11,7,0,10,x,x,9,0 (41.3xx2.)
x,7,10,9,11,x,x,0 (x1324xx.)
x,7,9,10,11,x,x,0 (x1234xx.)
x,7,9,10,11,x,0,x (x1234x.x)
x,7,10,9,11,x,0,x (x1324x.x)
11,7,0,9,x,x,0,10 (41.2xx.3)
11,7,0,10,x,x,0,9 (41.3xx.2)
x,7,9,10,x,11,x,0 (x123x4x.)
x,7,10,9,x,11,x,0 (x132x4x.)
x,7,10,9,x,11,0,x (x132x4.x)
x,7,9,10,x,11,0,x (x123x4.x)
x,7,6,9,x,x,10,0 (x213xx4.)
x,7,10,9,x,x,6,0 (x243xx1.)
x,7,10,6,x,x,9,0 (x241xx3.)
x,7,6,10,x,x,9,0 (x214xx3.)
x,7,9,10,x,x,6,0 (x234xx1.)
x,7,9,6,x,x,10,0 (x231xx4.)
x,7,9,x,x,11,10,0 (x12xx43.)
x,7,10,x,x,11,9,0 (x13xx42.)
x,7,10,x,11,x,9,0 (x13x4x2.)
x,7,x,10,x,11,9,0 (x1x3x42.)
x,7,0,9,x,11,10,x (x1.2x43x)
x,7,0,9,11,x,10,x (x1.24x3x)
x,7,x,10,11,x,9,0 (x1x34x2.)
x,7,0,10,11,x,9,x (x1.34x2x)
x,7,x,9,x,11,10,0 (x1x2x43.)
x,7,x,9,11,x,10,0 (x1x24x3.)
x,7,9,x,11,x,10,0 (x12x4x3.)
x,7,0,10,x,11,9,x (x1.3x42x)
x,7,9,6,x,x,0,10 (x231xx.4)
x,7,0,10,x,x,6,9 (x2.4xx13)
x,7,6,10,x,x,0,9 (x214xx.3)
x,7,6,9,x,x,0,10 (x213xx.4)
x,7,10,6,x,x,0,9 (x241xx.3)
x,7,0,6,x,x,10,9 (x2.1xx43)
x,7,10,9,x,x,0,6 (x243xx.1)
x,7,9,10,x,x,0,6 (x234xx.1)
x,7,0,9,x,x,6,10 (x2.3xx14)
x,7,0,10,x,x,9,6 (x2.4xx31)
x,7,0,6,x,x,9,10 (x2.1xx34)
x,7,0,9,x,x,10,6 (x2.3xx41)
x,7,x,9,x,11,0,10 (x1x2x4.3)
x,7,9,x,11,x,0,10 (x12x4x.3)
x,7,9,x,x,11,0,10 (x12xx4.3)
x,7,x,10,11,x,0,9 (x1x34x.2)
x,7,10,x,11,x,0,9 (x13x4x.2)
x,7,0,9,x,11,x,10 (x1.2x4x3)
x,7,0,9,11,x,x,10 (x1.24xx3)
x,7,0,x,11,x,9,10 (x1.x4x23)
x,7,x,9,11,x,0,10 (x1x24x.3)
x,7,x,10,x,11,0,9 (x1x3x4.2)
x,7,0,x,x,11,10,9 (x1.xx432)
x,7,0,10,x,11,x,9 (x1.3x4x2)
x,7,10,x,x,11,0,9 (x13xx4.2)
x,7,0,x,x,11,9,10 (x1.xx423)
x,7,0,10,11,x,x,9 (x1.34xx2)
x,7,0,x,11,x,10,9 (x1.x4x32)
5,x,6,2,3,2,x,x (3x4121xx)
2,x,6,2,5,3,x,x (1x4132xx)
3,x,6,2,2,5,x,x (2x4113xx)
3,x,6,2,2,x,x,0 (3x412xx.)
2,x,6,2,3,5,x,x (1x4123xx)
3,x,6,2,5,2,x,x (2x4131xx)
3,x,6,2,2,x,0,x (3x412x.x)
2,x,6,2,3,x,0,x (1x423x.x)
2,x,6,2,3,x,x,0 (1x423xx.)
5,x,6,2,2,3,x,x (3x4112xx)
3,x,x,2,2,5,6,x (2xx1134x)
2,x,x,2,3,5,6,x (1xx1234x)
3,x,x,2,5,2,6,x (2xx1314x)
2,x,x,2,5,3,6,x (1xx1324x)
3,x,6,2,x,2,0,x (3x41x2.x)
2,x,6,2,x,3,0,x (1x42x3.x)
5,x,x,2,3,2,6,x (3xx1214x)
5,x,x,2,2,3,6,x (3xx1124x)
3,x,6,2,x,2,x,0 (3x41x2x.)
2,x,6,2,x,3,x,0 (1x42x3x.)
3,x,x,2,5,2,x,6 (2xx131x4)
3,x,x,2,2,x,6,0 (3xx12x4.)
2,x,0,2,3,x,6,x (1x.23x4x)
2,x,x,2,3,x,6,0 (1xx23x4.)
3,x,0,2,x,2,6,x (3x.1x24x)
2,x,x,2,x,3,6,0 (1xx2x34.)
5,x,x,2,3,2,x,6 (3xx121x4)
3,x,0,2,2,x,6,x (3x.12x4x)
5,x,x,2,2,3,x,6 (3xx112x4)
2,x,0,2,x,3,6,x (1x.2x34x)
2,x,x,2,5,3,x,6 (1xx132x4)
3,x,x,2,2,5,x,6 (2xx113x4)
2,x,x,2,3,5,x,6 (1xx123x4)
3,x,x,2,x,2,6,0 (3xx1x24.)
11,7,10,9,x,x,0,x (4132xx.x)
11,7,10,9,x,x,x,0 (4132xxx.)
11,7,9,10,x,x,0,x (4123xx.x)
11,7,9,10,x,x,x,0 (4123xxx.)
3,x,x,2,x,2,0,6 (3xx1x2.4)
3,x,x,2,2,x,0,6 (3xx12x.4)
2,x,x,2,3,x,0,6 (1xx23x.4)
2,x,x,2,x,3,0,6 (1xx2x3.4)
2,x,0,2,x,3,x,6 (1x.2x3x4)
3,x,0,2,x,2,x,6 (3x.1x2x4)
2,x,0,2,3,x,x,6 (1x.23xx4)
3,x,0,2,2,x,x,6 (3x.12xx4)
11,7,0,9,x,x,10,x (41.2xx3x)
11,7,x,10,x,x,9,0 (41x3xx2.)
11,7,10,x,x,x,9,0 (413xxx2.)
11,7,0,10,x,x,9,x (41.3xx2x)
11,7,9,x,x,x,10,0 (412xxx3.)
11,7,x,9,x,x,10,0 (41x2xx3.)
11,7,0,10,x,x,x,9 (41.3xxx2)
11,7,x,9,x,x,0,10 (41x2xx.3)
11,7,10,x,x,x,0,9 (413xxx.2)
11,7,9,x,x,x,0,10 (412xxx.3)
11,7,0,x,x,x,9,10 (41.xxx23)
11,7,x,10,x,x,0,9 (41x3xx.2)
11,7,0,9,x,x,x,10 (41.2xxx3)
11,7,0,x,x,x,10,9 (41.xxx32)

Quick Summary

  • The Fb7b13 chord contains the notes: F♭, A♭, C♭, E♭♭, D♭♭
  • In Modal D tuning, there are 216 voicings available
  • Also written as: Fb7-13
  • Each diagram shows finger positions on the Mandolin fretboard

Frequently Asked Questions

What is the Fb7b13 chord on Mandolin?

Fb7b13 is a Fb 7b13 chord. It contains the notes F♭, A♭, C♭, E♭♭, D♭♭. On Mandolin in Modal D tuning, there are 216 ways to play this chord.

How do you play Fb7b13 on Mandolin?

To play Fb7b13 on in Modal D tuning, use one of the 216 voicings shown above. Each diagram shows finger positions on the fretboard, with numbers indicating which fingers to use.

What notes are in the Fb7b13 chord?

The Fb7b13 chord contains the notes: F♭, A♭, C♭, E♭♭, D♭♭.

How many ways can you play Fb7b13 on Mandolin?

In Modal D tuning, there are 216 voicings for the Fb7b13 chord. Each voicing uses a different position on the fretboard while playing the same notes: F♭, A♭, C♭, E♭♭, D♭♭.

What are other names for Fb7b13?

Fb7b13 is also known as Fb7-13. These are different notations for the same chord with the same notes: F♭, A♭, C♭, E♭♭, D♭♭.