A9 7-String Guitar Akord — Diagram a Taby v Ladění fake 8 string

Krátká odpověď: A9 je A dom9 akord s notami A, C♯, E, G, B. V ladění fake 8 string existuje 328 pozic. Viz diagramy níže.

Známý také jako: A7/9, A79, A97, A dom9

Klavírní AkordyNástrojeLadění

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Jak hrát A9 na 7-String Guitar

A9, A7/9, A79, A97, Adom9

Noty: A, C♯, E, G, B

5,0,0,4,5,0,0 (2..13..)
5,4,0,0,5,0,0 (21..3..)
5,4,0,0,2,0,0 (32..1..)
5,0,0,4,2,0,0 (3..21..)
5,4,0,4,5,0,0 (31.24..)
5,4,0,2,2,0,0 (43.12..)
5,2,0,4,2,0,0 (41.32..)
5,4,0,4,2,0,0 (42.31..)
5,0,3,4,2,0,0 (4.231..)
5,4,5,0,2,0,0 (324.1..)
5,0,5,4,2,0,0 (3.421..)
5,2,0,4,5,0,0 (31.24..)
5,4,3,0,2,0,0 (432.1..)
5,4,0,2,5,0,0 (32.14..)
5,2,3,2,2,2,2 (3121111)
5,0,0,0,5,6,0 (1...23.)
5,0,0,4,5,4,0 (3..142.)
5,4,0,0,5,4,0 (31..42.)
5,4,0,0,7,0,0 (21..3..)
5,0,0,4,7,0,0 (2..13..)
5,0,0,4,5,2,0 (3..241.)
5,4,0,0,5,2,0 (32..41.)
5,4,3,2,2,2,2 (4321111)
5,2,3,2,2,4,2 (4121131)
5,2,3,4,2,2,2 (4123111)
5,7,0,4,7,0,0 (23.14..)
5,4,0,7,7,0,0 (21.34..)
5,4,0,7,5,0,0 (21.43..)
5,7,0,4,5,0,0 (24.13..)
x,0,5,4,2,0,0 (x.321..)
5,0,0,4,5,6,0 (2..134.)
x,4,5,0,2,0,0 (x23.1..)
5,4,0,0,5,6,0 (21..34.)
5,4,0,4,7,0,0 (31.24..)
5,2,0,0,5,0,2 (31..4.2)
5,2,3,2,2,6,2 (3121141)
5,0,0,0,5,4,2 (3...421)
5,0,0,7,5,6,0 (1..423.)
5,0,0,2,2,0,2 (4..12.3)
5,0,0,2,5,6,0 (2..134.)
5,0,3,0,2,6,0 (3.2.14.)
5,7,0,0,5,6,0 (14..23.)
5,2,0,0,2,0,2 (41..2.3)
5,2,0,0,5,6,0 (21..34.)
5,0,0,2,5,0,2 (3..14.2)
x,4,5,2,2,0,0 (x3412..)
x,2,5,4,2,0,0 (x1432..)
x,4,5,4,2,0,0 (x2431..)
x,4,5,4,5,4,5 (x121314)
5,7,9,0,9,0,0 (123.4..)
5,0,9,7,7,0,0 (1.423..)
5,7,9,0,5,0,0 (134.2..)
5,0,9,7,5,0,0 (1.432..)
5,7,9,0,7,0,0 (124.3..)
5,0,9,7,9,0,0 (1.324..)
x,7,5,4,5,0,0 (x4213..)
x,7,5,4,7,0,0 (x3214..)
x,x,5,4,2,0,0 (xx321..)
x,4,5,7,5,0,0 (x1243..)
x,0,9,7,9,0,0 (x.213..)
x,0,9,7,7,0,0 (x.312..)
x,4,5,7,7,0,0 (x1234..)
5,0,9,0,5,9,0 (1.3.24.)
x,0,7,7,5,6,0 (x.3412.)
x,7,5,0,5,6,0 (x41.23.)
x,0,9,7,5,0,0 (x.321..)
x,2,5,0,2,0,2 (x14.2.3)
x,0,5,2,2,0,2 (x.412.3)
x,0,5,7,5,6,0 (x.1423.)
5,0,0,0,9,6,8 (1...423)
5,0,9,0,9,0,5 (1.3.4.2)
x,x,5,4,5,4,5 (xx21314)
x,0,7,0,5,6,5 (x.4.132)
x,0,9,0,5,9,0 (x.2.13.)
x,0,9,7,11,0,0 (x.213..)
x,0,7,4,5,0,5 (x.412.3)
x,0,7,4,7,0,5 (x.314.2)
x,0,7,7,11,0,0 (x.123..)
x,0,9,10,9,9,0 (x.1423.)
x,0,9,0,9,9,8 (x.2.341)
x,0,9,0,9,0,5 (x.2.3.1)
x,0,9,7,5,9,0 (x.3214.)
x,0,9,7,5,6,0 (x.4312.)
x,0,9,10,7,9,0 (x.2413.)
x,x,5,7,5,6,0 (xx1423.)
x,0,9,7,9,0,8 (x.314.2)
x,x,5,2,2,0,2 (xx412.3)
x,0,9,10,11,9,0 (x.1342.)
x,0,9,7,9,0,5 (x.324.1)
x,0,7,10,11,9,0 (x.1342.)
x,0,9,7,9,0,10 (x.213.4)
x,0,7,7,11,0,10 (x.124.3)
x,0,7,0,11,9,8 (x.1.432)
x,0,7,7,11,0,8 (x.124.3)
5,4,0,0,x,0,0 (21..x..)
5,0,0,4,x,0,0 (2..1x..)
5,4,0,4,x,0,0 (31.2x..)
5,4,0,2,x,0,0 (32.1x..)
5,2,0,4,x,0,0 (31.2x..)
5,0,0,4,5,x,0 (2..13x.)
5,4,0,0,5,x,0 (21..3x.)
5,4,0,x,5,0,0 (21.x3..)
5,x,0,4,5,0,0 (2x.13..)
5,x,0,4,2,0,0 (3x.21..)
5,4,0,x,2,0,0 (32.x1..)
5,0,x,4,2,0,0 (3.x21..)
5,4,x,0,2,0,0 (32x.1..)
5,7,0,4,x,0,0 (23.1x..)
5,4,0,7,x,0,0 (21.3x..)
x,0,x,4,2,0,0 (x.x21..)
5,4,0,4,5,x,0 (31.24x.)
5,x,5,4,2,0,0 (3x421..)
5,4,x,2,2,0,0 (43x12..)
5,2,0,4,5,0,x (31.24.x)
5,0,3,4,2,x,0 (4.231x.)
5,4,0,2,5,0,x (32.14.x)
5,2,x,4,2,0,0 (41x32..)
5,0,0,x,5,6,0 (1..x23.)
5,4,x,4,2,0,0 (42x31..)
5,4,0,2,5,x,0 (32.14x.)
5,2,0,4,5,x,0 (31.24x.)
5,4,5,x,2,0,0 (324x1..)
5,4,0,2,2,0,x (43.12.x)
5,x,3,4,2,0,0 (4x231..)
5,x,0,0,5,6,0 (1x..23.)
5,2,3,4,2,2,x (412311x)
5,2,3,2,2,x,2 (31211x1)
5,7,9,0,x,0,0 (123.x..)
5,4,3,2,2,2,x (432111x)
5,4,3,x,2,0,0 (432x1..)
5,2,3,x,2,2,2 (312x111)
5,x,3,2,2,2,2 (3x21111)
5,2,0,4,2,0,x (41.32.x)
5,4,3,0,2,x,0 (432.1x.)
5,x,0,4,5,4,0 (3x.142.)
5,4,0,x,7,0,0 (21.x3..)
x,0,x,2,2,0,2 (x.x12.3)
5,4,7,7,x,0,0 (2134x..)
5,x,0,4,7,0,0 (2x.13..)
5,0,0,4,5,4,x (3..142x)
5,7,5,4,x,0,0 (2431x..)
5,4,x,4,5,4,5 (21x1314)
5,4,0,x,5,4,0 (31.x42.)
5,7,7,4,x,0,0 (2341x..)
5,4,5,7,x,0,0 (2134x..)
5,4,0,0,5,4,x (31..42x)
5,4,3,7,x,0,0 (3214x..)
5,7,3,4,x,0,0 (3412x..)
5,0,9,7,x,0,0 (1.32x..)
5,2,0,0,x,0,2 (31..x.2)
5,2,3,2,2,6,x (312114x)
5,x,0,4,5,2,0 (3x.241.)
5,4,3,2,2,x,2 (43211x1)
5,2,3,x,2,4,2 (412x131)
5,0,0,2,x,0,2 (3..1x.2)
5,x,3,2,2,4,2 (4x21131)
5,4,0,x,5,2,0 (32.x41.)
5,2,3,4,2,x,2 (41231x1)
5,7,x,4,5,0,0 (24x13..)
5,7,0,4,5,x,0 (24.13x.)
5,4,x,7,7,0,0 (21x34..)
5,4,0,7,5,x,0 (21.43x.)
5,7,x,4,7,0,0 (23x14..)
5,4,0,x,5,6,0 (21.x34.)
x,4,5,x,2,0,0 (x23x1..)
5,4,x,7,5,0,0 (21x43..)
5,x,0,4,5,6,0 (2x.134.)
x,4,5,7,x,0,0 (x123x..)
x,7,5,4,x,0,0 (x321x..)
x,0,9,7,x,0,0 (x.21x..)
5,2,0,x,5,6,0 (21.x34.)
5,2,0,2,x,0,2 (41.2x.3)
5,x,0,0,5,4,2 (3x..421)
5,0,0,x,5,4,2 (3..x421)
5,0,3,x,2,6,0 (3.2x14.)
5,x,3,0,2,6,0 (3x2.14.)
5,4,0,2,x,0,2 (43.1x.2)
5,0,0,2,5,x,2 (3..14x2)
5,2,0,4,x,0,5 (31.2x.4)
5,0,0,2,5,6,x (2..134x)
5,x,7,7,5,6,5 (1x34121)
5,4,0,2,x,0,5 (32.1x.4)
5,7,0,x,5,6,0 (14.x23.)
5,2,0,4,x,0,2 (41.3x.2)
5,7,x,0,5,6,0 (14x.23.)
5,x,0,2,2,0,2 (4x.12.3)
5,2,0,x,2,0,2 (41.x2.3)
5,2,x,0,2,0,2 (41x.2.3)
5,x,3,2,2,6,2 (3x21141)
5,7,9,7,x,0,0 (1243x..)
5,x,0,2,5,0,2 (3x.14.2)
5,x,0,2,5,6,0 (2x.134.)
5,2,3,x,2,6,2 (312x141)
5,7,7,x,5,6,5 (134x121)
5,2,0,x,5,0,2 (31.x4.2)
5,2,0,0,5,x,2 (31..4x2)
5,2,0,0,5,6,x (21..34x)
5,0,x,7,5,6,0 (1.x423.)
5,x,0,7,5,6,0 (1x.423.)
5,0,x,2,2,0,2 (4.x12.3)
x,4,5,2,2,0,x (x3412.x)
x,2,5,4,2,0,x (x1432.x)
5,0,3,7,x,6,0 (2.14x3.)
5,7,3,0,x,6,0 (241.x3.)
x,4,5,x,5,4,5 (x12x314)
5,7,9,0,9,0,x (123.4.x)
5,x,9,7,9,0,0 (1x324..)
5,7,9,0,5,x,0 (134.2x.)
5,x,9,7,5,0,0 (1x432..)
5,0,9,7,5,x,0 (1.432x.)
5,7,9,x,7,0,0 (124x3..)
5,0,9,7,9,0,x (1.324.x)
5,7,9,x,9,0,0 (123x4..)
5,x,9,7,7,0,0 (1x423..)
5,7,9,x,5,0,0 (134x2..)
5,4,7,0,x,0,5 (214.x.3)
5,0,7,4,x,0,5 (2.41x.3)
x,0,x,7,5,6,0 (x.x312.)
x,4,5,7,5,4,x (x12431x)
x,7,5,4,5,x,0 (x4213x.)
x,4,5,7,5,x,0 (x1243x.)
x,7,5,4,5,4,x (x42131x)
x,0,9,7,9,0,x (x.213.x)
x,0,x,4,5,4,5 (x.x1324)
5,x,9,0,5,9,0 (1x3.24.)
5,0,9,x,5,9,0 (1.3x24.)
x,0,7,7,5,6,x (x.3412x)
5,0,0,4,x,4,8 (3..1x24)
x,0,9,7,5,x,0 (x.321x.)
x,2,5,4,x,0,5 (x132x.4)
x,7,5,x,5,6,0 (x41x23.)
x,4,5,2,x,0,5 (x231x.4)
x,2,5,x,2,0,2 (x14x2.3)
5,4,0,0,x,4,8 (31..x24)
x,0,x,7,11,0,0 (x.x12..)
x,0,7,4,x,0,5 (x.31x.2)
5,0,9,x,9,0,5 (1.3x4.2)
5,x,0,0,9,6,8 (1x..423)
5,0,0,x,9,6,8 (1..x423)
5,x,9,0,9,0,5 (1x3.4.2)
x,0,9,10,x,9,0 (x.13x2.)
x,0,9,x,5,9,0 (x.2x13.)
x,0,x,2,5,6,5 (x.x1243)
x,0,7,x,5,6,5 (x.4x132)
x,4,5,7,x,4,8 (x123x14)
x,7,5,4,x,4,8 (x321x14)
x,0,7,7,11,0,x (x.123.x)
x,0,7,4,5,x,5 (x.412x3)
x,0,x,10,11,9,0 (x.x231.)
x,0,7,7,x,6,8 (x.23x14)
x,0,9,10,9,9,x (x.1423x)
x,0,9,x,9,0,5 (x.2x3.1)
x,0,9,x,9,9,8 (x.2x341)
x,0,9,7,9,x,8 (x.314x2)
x,0,x,7,9,6,8 (x.x2413)
x,0,7,10,11,9,x (x.1342x)
x,0,7,x,11,9,8 (x.1x432)
x,0,7,7,11,x,8 (x.124x3)
5,4,0,x,x,0,0 (21.xx..)
5,x,0,4,x,0,0 (2x.1x..)
5,2,0,4,x,0,x (31.2x.x)
5,4,0,2,x,0,x (32.1x.x)
5,x,0,4,5,x,0 (2x.13x.)
5,4,0,x,5,x,0 (21.x3x.)
5,x,x,4,2,0,0 (3xx21..)
5,4,3,2,2,x,x (43211xx)
5,2,3,4,2,x,x (41231xx)
5,4,x,x,2,0,0 (32xx1..)
5,4,x,7,x,0,0 (21x3x..)
5,7,x,4,x,0,0 (23x1x..)
5,4,3,x,2,x,0 (432x1x.)
5,2,3,x,2,x,2 (312x1x1)
5,x,0,x,5,6,0 (1x.x23.)
5,x,3,2,2,x,2 (3x211x1)
5,4,0,2,5,x,x (32.14xx)
5,2,x,4,2,0,x (41x32.x)
5,x,3,4,2,x,0 (4x231x.)
5,4,x,2,2,0,x (43x12.x)
5,7,9,x,x,0,0 (123xx..)
5,2,0,4,5,x,x (31.24xx)
5,x,0,4,5,4,x (3x.142x)
5,4,0,x,5,4,x (31.x42x)
5,7,7,4,x,0,x (2341x.x)
5,x,x,4,5,4,5 (2xx1314)
5,4,x,x,5,4,5 (21xx314)
5,4,7,7,x,0,x (2134x.x)
5,7,3,4,x,x,0 (3412xx.)
5,4,3,7,x,x,0 (3214xx.)
5,x,0,2,x,0,2 (3x.1x.2)
5,x,7,7,5,6,x (1x3412x)
5,2,3,x,2,6,x (312x14x)
5,x,3,2,2,6,x (3x2114x)
5,7,7,x,5,6,x (134x12x)
5,2,0,x,x,0,2 (31.xx.2)
5,x,7,x,5,6,5 (1x3x121)
5,x,3,x,2,4,2 (4x2x131)
5,x,9,7,x,0,0 (1x32x..)
5,4,x,7,5,4,x (21x431x)
5,4,x,7,5,x,0 (21x43x.)
5,7,x,4,5,x,0 (24x13x.)
5,7,x,4,5,4,x (24x131x)
5,2,0,x,5,x,2 (31.x4x2)
5,x,x,2,2,0,2 (4xx12.3)
5,4,x,2,x,0,5 (32x1x.4)
5,x,0,2,5,6,x (2x.134x)
5,x,0,2,5,x,2 (3x.14x2)
5,x,x,7,5,6,0 (1xx423.)
5,2,0,x,5,6,x (21.x34x)
5,7,x,x,5,6,0 (14xx23.)
5,2,x,x,2,0,2 (41xx2.3)
5,2,x,4,x,0,5 (31x2x.4)
5,x,3,x,2,6,0 (3x2x14.)
5,x,0,x,5,4,2 (3x.x421)
5,x,3,7,x,6,0 (2x14x3.)
5,7,3,x,x,6,0 (241xx3.)
5,x,9,7,9,0,x (1x324.x)
5,7,9,x,5,x,0 (134x2x.)
5,7,9,x,9,0,x (123x4.x)
5,x,9,7,5,x,0 (1x432x.)
5,4,x,7,x,4,8 (21x3x14)
5,x,7,4,x,0,5 (2x41x.3)
5,4,7,x,x,0,5 (214xx.3)
5,7,x,4,x,4,8 (23x1x14)
5,x,9,x,5,9,0 (1x3x24.)
5,x,0,4,x,4,8 (3x.1x24)
5,4,0,x,x,4,8 (31.xx24)
5,x,0,x,9,6,8 (1x.x423)
5,x,9,x,9,0,5 (1x3x4.2)

Rychlý Přehled

  • Akord A9 obsahuje noty: A, C♯, E, G, B
  • V ladění fake 8 string je k dispozici 328 pozic
  • Zapisuje se také jako: A7/9, A79, A97, A dom9
  • Každý diagram ukazuje pozice prstů na hmatníku 7-String Guitar

Často Kladené Otázky

Co je akord A9 na 7-String Guitar?

A9 je A dom9 akord. Obsahuje noty A, C♯, E, G, B. Na 7-String Guitar v ladění fake 8 string existuje 328 způsobů hry.

Jak hrát A9 na 7-String Guitar?

Pro zahrání A9 na v ladění fake 8 string použijte jednu z 328 pozic zobrazených výše.

Jaké noty obsahuje akord A9?

Akord A9 obsahuje noty: A, C♯, E, G, B.

Kolika způsoby lze hrát A9 na 7-String Guitar?

V ladění fake 8 string existuje 328 pozic pro A9. Každá využívá jiné místo na hmatníku: A, C♯, E, G, B.

Jaké jsou další názvy pro A9?

A9 je také známý jako A7/9, A79, A97, A dom9. Jedná se o různé zápisy stejného akordu: A, C♯, E, G, B.