Ab°b9 7-String Guitar Akord — Diagram a Taby v Ladění fake 8 string

Krátká odpověď: Ab°b9 je Ab dimb9 akord s notami A♭, C♭, E♭♭, G♭♭, B♭♭. V ladění fake 8 string existuje 327 pozic. Viz diagramy níže.

Známý také jako: Ab dimb9

Klavírní AkordyNástrojeLadění

Search chord by name:

 

OR

Search chord by notes:

Piano Companion
Piano CompanionFree

Want all chords at your fingertips? Get our free app with 10,000+ chords and scales — trusted by millions of musicians. Look up any chord instantly, anywhere.

Get It Free
ChordIQ
ChordIQFree

Ready to actually learn these chords? Train your ear, master the staff, and build real skills with interactive games — for guitar, ukulele, bass and more.

Get It Free

Jak hrát Ab°b9 na 7-String Guitar

Ab°b9, Abdimb9

Noty: A♭, C♭, E♭♭, G♭♭, B♭♭

4,0,1,0,0,1,0 (3.1..2.)
4,0,1,0,0,2,0 (3.1..2.)
4,0,1,0,0,4,0 (2.1..3.)
4,0,1,2,0,1,0 (4.13.2.)
4,0,1,2,0,4,0 (3.12.4.)
4,2,1,0,0,2,0 (421..3.)
4,0,1,2,0,2,0 (4.12.3.)
4,2,1,0,0,1,0 (431..2.)
4,2,1,0,0,4,0 (321..4.)
4,0,1,5,0,2,0 (3.14.2.)
4,0,1,5,0,1,0 (3.14.2.)
4,5,1,0,0,1,0 (341..2.)
4,5,1,0,0,2,0 (341..2.)
4,0,1,5,0,4,0 (2.14.3.)
4,0,1,0,0,4,3 (3.1..42)
4,5,1,0,0,4,0 (241..3.)
x,2,4,2,3,2,3 (x141213)
4,0,5,0,0,4,6 (1.3..24)
4,0,4,0,0,4,6 (1.2..34)
4,0,4,0,3,7,0 (2.3.14.)
4,0,5,0,3,7,0 (2.3.14.)
4,0,7,0,3,7,0 (2.3.14.)
x,0,4,5,3,4,0 (x.2413.)
x,5,4,0,3,4,0 (x42.13.)
x,0,4,0,3,4,3 (x.3.142)
4,0,7,8,0,7,0 (1.24.3.)
4,8,7,0,0,7,0 (142..3.)
4,0,4,8,0,7,0 (1.24.3.)
4,0,7,0,0,4,6 (1.4..23)
x,0,4,5,3,2,0 (x.3421.)
x,5,4,0,3,2,0 (x43.21.)
4,0,7,8,0,4,0 (1.34.2.)
4,8,5,0,0,7,0 (142..3.)
4,0,5,8,0,4,0 (1.34.2.)
4,0,4,8,0,4,0 (1.24.3.)
4,8,4,0,0,7,0 (142..3.)
4,0,5,8,0,7,0 (1.24.3.)
4,8,7,0,0,4,0 (143..2.)
4,8,5,0,0,4,0 (143..2.)
4,8,4,0,0,4,0 (142..3.)
4,0,7,0,0,7,6 (1.3..42)
x,5,4,0,3,1,0 (x43.21.)
x,0,4,0,0,4,6 (x.1..23)
x,0,4,5,3,1,0 (x.3421.)
x,0,4,0,3,7,0 (x.2.13.)
x,5,4,0,0,4,6 (x31..24)
x,8,4,0,0,7,0 (x31..2.)
x,0,4,8,0,7,0 (x.13.2.)
x,x,4,2,3,2,3 (xx41213)
x,0,4,5,0,4,6 (x.13.24)
x,0,4,8,0,4,0 (x.13.2.)
x,8,4,0,0,4,0 (x31..2.)
x,0,4,5,3,7,0 (x.2314.)
x,5,4,0,3,7,0 (x32.14.)
x,0,4,2,0,2,6 (x.31.24)
x,x,4,0,3,4,3 (xx3.142)
x,0,4,2,0,4,6 (x.21.34)
x,2,4,0,0,4,6 (x12..34)
x,2,4,0,0,2,6 (x13..24)
x,0,4,8,6,7,0 (x.1423.)
x,8,4,0,6,7,0 (x41.23.)
x,x,4,5,3,2,0 (xx3421.)
x,0,4,8,7,7,0 (x.1423.)
x,8,4,0,7,7,0 (x41.23.)
x,x,4,0,0,4,6 (xx1..23)
x,x,4,0,3,7,0 (xx2.13.)
x,8,4,0,0,4,6 (x41..23)
x,0,4,8,0,4,6 (x.14.23)
x,x,4,5,7,4,6 (xx12413)
x,x,4,2,0,2,6 (xx31.24)
x,x,4,8,7,7,0 (xx1423.)
4,0,1,0,0,x,0 (2.1..x.)
4,2,1,0,0,x,0 (321..x.)
4,0,1,2,0,x,0 (3.12.x.)
4,5,1,0,0,x,0 (231..x.)
4,0,1,5,0,x,0 (2.13.x.)
4,8,7,0,0,x,0 (132..x.)
4,0,1,x,0,4,0 (2.1x.3.)
4,0,1,0,0,4,x (2.1..3x)
4,0,1,x,0,2,0 (3.1x.2.)
4,8,5,0,0,x,0 (132..x.)
4,x,1,0,0,4,0 (2x1..3.)
4,x,1,0,0,2,0 (3x1..2.)
4,x,1,0,0,1,0 (3x1..2.)
4,0,1,x,0,1,0 (3.1x.2.)
4,8,4,0,0,x,0 (132..x.)
4,0,4,5,3,x,0 (2.341x.)
4,5,5,0,3,x,0 (234.1x.)
4,0,5,5,3,x,0 (2.341x.)
4,5,4,0,3,x,0 (243.1x.)
4,2,x,2,3,2,3 (41x1213)
4,0,1,5,3,x,0 (3.142x.)
4,0,5,8,0,x,0 (1.23.x.)
4,2,1,0,0,4,x (321..4x)
4,0,1,2,0,4,x (3.12.4x)
4,2,1,0,0,1,x (431..2x)
4,0,4,8,0,x,0 (1.23.x.)
4,0,1,2,0,1,x (4.13.2x)
4,2,1,0,0,2,x (421..3x)
4,x,1,2,0,2,0 (4x12.3.)
4,0,1,2,0,2,x (4.12.3x)
4,2,1,x,0,2,0 (421x.3.)
4,5,1,0,3,x,0 (341.2x.)
4,0,7,8,0,x,0 (1.23.x.)
4,0,x,5,3,4,0 (2.x413.)
4,5,x,0,3,4,0 (24x.13.)
x,8,4,0,0,x,0 (x21..x.)
4,0,x,0,3,4,3 (3.x.142)
x,0,4,5,3,x,0 (x.231x.)
4,5,x,0,3,2,0 (34x.21.)
x,5,4,0,3,x,0 (x32.1x.)
4,0,x,5,3,2,0 (3.x421.)
4,5,1,x,0,2,0 (341x.2.)
4,5,1,0,x,1,0 (341.x2.)
4,2,1,0,0,x,3 (421..x3)
4,0,1,2,0,x,3 (4.12.x3)
4,0,1,5,x,1,0 (3.14x2.)
4,8,5,5,0,x,0 (1423.x.)
4,x,1,5,0,2,0 (3x14.2.)
4,5,x,0,3,1,0 (34x.21.)
4,x,1,0,0,4,3 (3x1..42)
4,0,x,5,3,1,0 (3.x421.)
4,5,1,0,x,2,0 (341.x2.)
4,0,x,0,0,4,6 (1.x..23)
4,0,1,x,0,4,3 (3.1x.42)
4,5,1,0,0,4,x (241..3x)
4,8,5,8,0,x,0 (1324.x.)
4,0,1,5,0,4,x (2.14.3x)
4,5,1,0,x,4,0 (241.x3.)
4,0,1,5,x,4,0 (2.14x3.)
4,5,5,8,0,x,0 (1234.x.)
4,0,1,0,x,4,3 (3.1.x42)
4,0,1,5,x,2,0 (3.14x2.)
x,0,4,8,0,x,0 (x.12.x.)
4,0,7,5,3,x,0 (2.431x.)
4,0,x,0,3,7,0 (2.x.13.)
4,5,7,0,3,x,0 (234.1x.)
x,5,4,2,3,2,x (x43121x)
4,8,x,0,0,4,0 (13x..2.)
4,x,4,5,7,4,6 (1x12413)
4,x,5,0,0,4,6 (1x3..24)
4,0,5,x,0,4,6 (1.3x.24)
4,x,4,0,0,4,6 (1x2..34)
4,0,4,x,0,4,6 (1.2x.34)
x,2,4,x,3,2,3 (x14x213)
4,5,4,8,7,4,x (121431x)
4,8,4,5,7,4,x (141231x)
4,0,x,8,0,4,0 (1.x3.2.)
4,0,7,0,0,x,6 (1.3..x2)
4,5,4,x,7,4,6 (121x413)
4,0,x,8,0,7,0 (1.x3.2.)
x,2,4,5,3,2,x (x13421x)
4,0,x,5,0,4,6 (1.x3.24)
4,8,x,0,0,7,0 (13x..2.)
4,5,x,0,0,4,6 (13x..24)
4,0,5,x,3,7,0 (2.3x14.)
4,0,7,0,3,7,x (2.3.14x)
4,0,x,5,3,7,0 (2.x314.)
4,x,7,0,3,7,0 (2x3.14.)
4,x,5,0,3,7,0 (2x3.14.)
4,x,4,0,3,7,0 (2x3.14.)
4,5,x,0,3,7,0 (23x.14.)
4,0,7,x,3,7,0 (2.3x14.)
4,0,4,x,3,7,0 (2.3x14.)
4,2,4,0,0,x,6 (213..x4)
4,0,x,2,0,4,6 (2.x1.34)
4,2,x,0,0,2,6 (31x..24)
4,2,5,0,0,x,6 (213..x4)
x,0,4,5,3,4,x (x.2413x)
4,0,x,2,0,2,6 (3.x1.24)
4,0,5,2,0,x,6 (2.31.x4)
x,0,4,x,3,4,3 (x.3x142)
4,0,4,2,0,x,6 (2.31.x4)
x,5,4,0,3,4,x (x42.13x)
4,2,x,0,0,4,6 (21x..34)
4,x,5,8,0,7,0 (1x24.3.)
4,x,7,0,0,7,6 (1x3..42)
4,0,5,8,0,4,x (1.34.2x)
4,5,7,0,0,x,6 (124..x3)
4,0,7,8,x,7,0 (1.24x3.)
4,0,4,8,x,7,0 (1.24x3.)
4,8,5,x,0,7,0 (142x.3.)
4,0,7,8,0,4,x (1.34.2x)
4,0,7,5,0,x,6 (1.42.x3)
4,x,7,0,0,4,6 (1x4..23)
4,0,7,0,x,7,6 (1.3.x42)
4,8,7,0,x,7,0 (142.x3.)
4,0,5,8,x,7,0 (1.24x3.)
4,8,5,0,x,7,0 (142.x3.)
4,8,4,0,0,4,x (142..3x)
4,8,5,0,0,4,x (143..2x)
4,8,7,0,0,4,x (143..2x)
4,8,4,0,x,7,0 (142.x3.)
x,5,4,x,3,2,0 (x43x21.)
4,0,7,x,0,7,6 (1.3x.42)
4,8,7,0,0,7,x (142..3x)
4,x,5,8,0,4,0 (1x34.2.)
4,0,7,8,0,7,x (1.24.3x)
4,8,x,0,6,7,0 (14x.23.)
4,0,4,8,0,4,x (1.24.3x)
4,0,x,8,6,7,0 (1.x423.)
4,0,7,x,0,4,6 (1.4x.23)
x,2,4,0,3,x,3 (x14.2x3)
4,8,x,0,7,7,0 (14x.23.)
x,0,4,2,3,x,3 (x.412x3)
4,8,5,x,0,4,0 (143x.2.)
4,0,x,8,7,7,0 (1.x423.)
4,0,7,0,3,x,3 (3.4.1x2)
x,0,4,x,0,4,6 (x.1x.23)
x,0,4,x,3,7,0 (x.2x13.)
x,0,4,2,0,x,6 (x.21.x3)
x,5,4,2,x,2,6 (x321x14)
4,0,x,8,0,4,6 (1.x4.23)
x,2,4,5,x,2,6 (x123x14)
4,0,7,8,0,x,6 (1.34.x2)
4,8,x,0,0,4,6 (14x..23)
4,8,7,0,0,x,6 (143..x2)
x,2,4,0,0,x,6 (x12..x3)
x,5,4,8,7,4,x (x21431x)
x,11,x,0,0,10,0 (x2x..1.)
x,0,4,5,x,4,6 (x.13x24)
x,5,4,x,7,4,6 (x21x413)
x,0,4,8,x,7,0 (x.13x2.)
x,8,4,0,x,7,0 (x31.x2.)
x,8,4,0,0,4,x (x31..2x)
x,8,4,5,7,4,x (x41231x)
x,5,4,0,x,4,6 (x31.x24)
x,5,4,8,7,x,0 (x2143x.)
x,8,4,5,7,x,0 (x4123x.)
x,0,4,8,0,4,x (x.13.2x)
x,2,4,x,0,2,6 (x13x.24)
x,8,4,x,7,7,0 (x41x23.)
x,11,x,8,7,7,0 (x4x312.)
4,x,1,0,0,x,0 (2x1..x.)
4,0,1,x,0,x,0 (2.1x.x.)
4,2,1,0,0,x,x (321..xx)
4,5,1,0,x,x,0 (231.xx.)
4,0,1,2,0,x,x (3.12.xx)
4,8,x,0,0,x,0 (12x..x.)
4,0,1,5,x,x,0 (2.13xx.)
4,0,x,5,3,x,0 (2.x31x.)
4,5,x,0,3,x,0 (23x.1x.)
4,x,1,x,0,2,0 (3x1x.2.)
4,0,x,8,0,x,0 (1.x2.x.)
4,8,5,x,0,x,0 (132x.x.)
4,8,7,0,0,x,x (132..xx)
4,0,1,x,0,4,x (2.1x.3x)
4,x,1,0,0,4,x (2x1..3x)
4,x,5,5,3,x,0 (2x341x.)
4,5,5,x,3,x,0 (234x1x.)
4,5,x,2,3,2,x (34x121x)
4,2,x,x,3,2,3 (41xx213)
4,2,x,5,3,2,x (31x421x)
4,x,x,2,3,2,3 (4xx1213)
4,2,1,x,0,2,x (421x.3x)
4,x,5,8,0,x,0 (1x23.x.)
4,x,1,2,0,2,x (4x12.3x)
4,0,7,8,0,x,x (1.23.xx)
4,x,5,x,3,4,3 (2x4x131)
4,x,x,0,3,4,3 (3xx.142)
4,0,x,x,3,4,3 (3.xx142)
4,0,x,5,3,4,x (2.x413x)
4,5,x,0,3,4,x (24x.13x)
4,5,x,x,3,2,0 (34xx21.)
4,x,x,5,3,2,0 (3xx421.)
4,2,x,0,3,x,3 (41x.2x3)
4,0,x,2,3,x,3 (4.x12x3)
4,2,1,0,x,x,3 (421.xx3)
4,5,1,0,x,4,x (241.x3x)
4,0,1,5,x,4,x (2.14x3x)
4,x,1,5,x,2,0 (3x14x2.)
4,0,x,x,0,4,6 (1.xx.23)
4,5,1,x,x,2,0 (341xx2.)
4,x,5,5,x,4,6 (1x23x14)
4,x,x,0,0,4,6 (1xx..23)
4,8,5,5,x,x,0 (1423xx.)
4,5,5,x,x,4,6 (123xx14)
4,0,1,x,x,4,3 (3.1xx42)
4,5,5,8,x,x,0 (1234xx.)
4,x,1,0,x,4,3 (3x1.x42)
4,0,1,2,x,x,3 (4.12xx3)
4,5,7,0,3,x,x (234.1xx)
4,0,7,5,3,x,x (2.431xx)
4,0,x,x,3,7,0 (2.xx13.)
4,x,x,0,3,7,0 (2xx.13.)
4,2,x,0,0,x,6 (21x..x3)
4,2,x,5,x,2,6 (21x3x14)
4,5,x,2,x,2,6 (23x1x14)
4,0,x,2,0,x,6 (2.x1.x3)
4,8,x,0,x,7,0 (13x.x2.)
4,0,x,8,x,7,0 (1.x3x2.)
4,0,x,5,x,4,6 (1.x3x24)
4,x,5,x,0,4,6 (1x3x.24)
4,8,5,5,x,4,x (1423x1x)
4,5,5,8,x,4,x (1234x1x)
4,8,x,5,7,x,0 (14x23x.)
4,5,x,x,7,4,6 (12xx413)
4,5,x,8,7,4,x (12x431x)
4,8,x,5,7,4,x (14x231x)
4,x,7,0,0,x,6 (1x3..x2)
4,0,7,x,0,x,6 (1.3x.x2)
4,5,x,0,x,4,6 (13x.x24)
4,0,x,8,0,4,x (1.x3.2x)
4,5,x,8,7,x,0 (12x43x.)
4,8,x,0,0,4,x (13x..2x)
4,x,x,5,7,4,6 (1xx2413)
4,x,5,x,3,7,0 (2x3x14.)
4,0,7,x,3,7,x (2.3x14x)
4,x,7,0,3,7,x (2x3.14x)
4,x,x,2,0,2,6 (3xx1.24)
4,2,x,x,0,2,6 (31xx.24)
4,x,5,2,0,x,6 (2x31.x4)
4,2,5,x,0,x,6 (213x.x4)
4,x,5,8,x,7,0 (1x24x3.)
4,8,x,x,7,7,0 (14xx23.)
4,8,7,0,x,7,x (142.x3x)
4,0,7,5,x,x,6 (1.42xx3)
4,5,7,0,x,x,6 (124.xx3)
4,0,7,8,x,7,x (1.24x3x)
4,x,x,8,7,7,0 (1xx423.)
4,8,5,x,0,4,x (143x.2x)
4,0,7,x,x,7,6 (1.3xx42)
4,x,7,0,x,7,6 (1x3.x42)
4,8,5,x,x,7,0 (142xx3.)
4,x,5,8,0,4,x (1x34.2x)
4,0,7,x,3,x,3 (3.4x1x2)
4,x,7,0,3,x,3 (3x4.1x2)

Rychlý Přehled

  • Akord Ab°b9 obsahuje noty: A♭, C♭, E♭♭, G♭♭, B♭♭
  • V ladění fake 8 string je k dispozici 327 pozic
  • Zapisuje se také jako: Ab dimb9
  • Každý diagram ukazuje pozice prstů na hmatníku 7-String Guitar

Často Kladené Otázky

Co je akord Ab°b9 na 7-String Guitar?

Ab°b9 je Ab dimb9 akord. Obsahuje noty A♭, C♭, E♭♭, G♭♭, B♭♭. Na 7-String Guitar v ladění fake 8 string existuje 327 způsobů hry.

Jak hrát Ab°b9 na 7-String Guitar?

Pro zahrání Ab°b9 na v ladění fake 8 string použijte jednu z 327 pozic zobrazených výše.

Jaké noty obsahuje akord Ab°b9?

Akord Ab°b9 obsahuje noty: A♭, C♭, E♭♭, G♭♭, B♭♭.

Kolika způsoby lze hrát Ab°b9 na 7-String Guitar?

V ladění fake 8 string existuje 327 pozic pro Ab°b9. Každá využívá jiné místo na hmatníku: A♭, C♭, E♭♭, G♭♭, B♭♭.

Jaké jsou další názvy pro Ab°b9?

Ab°b9 je také známý jako Ab dimb9. Jedná se o různé zápisy stejného akordu: A♭, C♭, E♭♭, G♭♭, B♭♭.