Fab6/9 accordo per chitarra — schema e tablatura in accordatura open E country

Risposta breve: Fab6/9 è un accordo Fab 6/9 con le note Fa♭, La♭, Do♭, Re♭, Sol♭. In accordatura open E country ci sono 180 posizioni. Vedi i diagrammi sotto.

Conosciuto anche come: FabM6/9

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Come suonare Fab6/9 su Dobro

Fab6/9, FabM6/9

Note: Fa♭, La♭, Do♭, Re♭, Sol♭

x,2,2,0,0,0 (x12...)
x,0,2,0,2,0 (x.1.2.)
x,0,0,0,2,2 (x...12)
x,2,0,0,0,2 (x1...2)
x,7,9,0,0,0 (x12...)
x,9,9,10,0,0 (x123..)
2,5,4,5,0,0 (1324..)
4,5,2,5,0,0 (2314..)
x,0,9,0,7,0 (x.2.1.)
x,7,4,5,0,0 (x312..)
2,0,4,5,5,0 (1.234.)
x,0,9,10,9,0 (x.132.)
4,0,2,5,5,0 (2.134.)
x,0,0,0,7,9 (x...12)
x,0,4,5,7,0 (x.123.)
x,7,0,0,0,9 (x1...2)
9,9,7,0,7,0 (341.2.)
7,7,9,0,9,0 (123.4.)
7,9,9,0,7,0 (134.2.)
9,7,7,0,9,0 (312.4.)
0,0,4,5,5,2 (..2341)
4,5,0,5,0,2 (23.4.1)
0,5,4,5,0,2 (.324.1)
x,9,0,10,0,9 (x1.3.2)
x,0,0,10,9,9 (x..312)
2,5,0,5,0,4 (13.4.2)
4,0,0,5,5,2 (2..341)
0,5,2,5,0,4 (.314.2)
0,0,2,5,5,4 (..1342)
2,0,0,5,5,4 (1..342)
x,0,0,5,7,4 (x..231)
x,7,0,5,0,4 (x3.2.1)
0,9,9,0,7,7 (.34.12)
0,7,7,0,9,9 (.12.34)
7,7,0,0,9,9 (12..34)
0,9,7,0,7,9 (.31.24)
7,9,0,0,7,9 (13..24)
9,7,0,0,9,7 (31..42)
0,7,9,0,9,7 (.13.42)
9,9,0,0,7,7 (34..12)
9,7,7,0,5,0 (423.1.)
7,7,9,0,5,0 (234.1.)
7,5,9,0,7,0 (214.3.)
9,5,7,0,7,0 (412.3.)
x,9,7,5,7,0 (x4213.)
x,7,7,5,9,0 (x2314.)
9,7,0,0,5,7 (42..13)
9,5,0,0,7,7 (41..23)
7,7,0,0,5,9 (23..14)
0,5,7,0,7,9 (.12.34)
0,7,7,0,5,9 (.23.14)
7,5,0,0,7,9 (21..34)
0,5,9,0,7,7 (.14.23)
0,7,9,0,5,7 (.24.13)
x,9,0,5,7,7 (x4.123)
x,7,0,5,9,7 (x2.143)
2,2,0,0,0,x (12...x)
2,2,x,0,0,0 (12x...)
0,2,2,0,0,x (.12..x)
0,0,2,0,2,x (..1.2x)
2,0,x,0,2,0 (1.x.2.)
2,0,0,0,2,x (1...2x)
9,7,0,0,0,x (21...x)
9,7,x,0,0,0 (21x...)
0,0,x,0,2,2 (..x.12)
0,2,x,0,0,2 (.1x..2)
4,2,2,x,0,0 (312x..)
2,2,4,x,0,0 (123x..)
0,7,9,0,0,x (.12..x)
7,7,9,0,x,0 (123.x.)
9,7,7,0,x,0 (312.x.)
2,0,4,5,x,0 (1.23x.)
4,0,2,x,2,0 (3.1x2.)
4,2,2,3,x,0 (4123x.)
2,x,4,5,0,0 (1x23..)
2,2,4,3,x,0 (1243x.)
2,0,4,x,2,0 (1.3x2.)
4,0,2,5,x,0 (2.13x.)
4,x,2,5,0,0 (2x13..)
0,9,9,10,0,x (.123.x)
9,9,x,10,0,0 (12x3..)
9,9,0,10,0,x (12.3.x)
4,7,0,5,0,x (13.2.x)
0,7,4,5,0,x (.312.x)
9,0,0,0,7,x (2...1x)
0,0,9,0,7,x (..2.1x)
9,0,x,0,7,0 (2.x.1.)
4,7,x,5,0,0 (13x2..)
4,2,0,x,0,2 (31.x.2)
0,0,4,x,2,2 (..3x12)
4,x,2,3,2,0 (4x132.)
0,0,2,x,2,4 (..1x23)
2,2,0,x,0,4 (12.x.3)
0,2,2,x,0,4 (.12x.3)
0,2,4,x,0,2 (.13x.2)
4,0,0,x,2,2 (3..x12)
2,0,0,x,2,4 (1..x23)
2,x,4,3,2,0 (1x432.)
9,0,0,10,9,x (1..32x)
9,0,x,10,9,0 (1.x32.)
0,0,9,10,9,x (..132x)
4,0,0,5,7,x (1..23x)
4,7,7,5,x,0 (1342x.)
7,x,9,0,7,0 (1x3.2.)
0,7,x,0,0,9 (.1x..2)
0,0,x,0,7,9 (..x.12)
4,0,x,5,7,0 (1.x23.)
9,x,7,0,7,0 (3x1.2.)
0,0,4,5,7,x (..123x)
7,7,4,5,x,0 (3412x.)
0,x,4,3,2,2 (.x4312)
0,x,4,5,0,2 (.x23.1)
0,x,2,5,0,4 (.x13.2)
4,2,0,3,x,2 (41.3x2)
2,2,0,3,x,4 (12.3x4)
0,2,2,3,x,4 (.123x4)
2,x,0,3,2,4 (1x.324)
0,x,2,3,2,4 (.x1324)
2,0,0,5,x,4 (1..3x2)
0,2,4,3,x,2 (.143x2)
0,0,2,5,x,4 (..13x2)
4,0,0,5,x,2 (2..3x1)
4,x,0,5,0,2 (2x.3.1)
0,0,4,5,x,2 (..23x1)
4,x,0,3,2,2 (4x.312)
2,x,0,5,0,4 (1x.3.2)
0,0,x,10,9,9 (..x312)
0,9,x,10,0,9 (.1x3.2)
7,9,9,10,x,0 (1234x.)
9,7,0,0,x,7 (31..x2)
9,x,0,0,7,7 (3x..12)
0,x,9,0,7,7 (.x3.12)
0,0,x,5,7,4 (..x231)
0,7,x,5,0,4 (.3x2.1)
9,9,7,10,x,0 (2314x.)
0,x,7,0,7,9 (.x1.23)
0,7,7,0,x,9 (.12.x3)
7,7,0,0,x,9 (12..x3)
9,9,7,x,7,0 (341x2.)
7,9,9,x,7,0 (134x2.)
7,x,0,0,7,9 (1x..23)
7,7,9,x,9,0 (123x4.)
0,7,9,0,x,7 (.13.x2)
9,7,7,x,9,0 (312x4.)
4,x,7,5,7,0 (1x324.)
7,x,4,5,7,0 (3x124.)
7,7,0,5,x,4 (34.2x1)
7,x,9,10,9,0 (1x243.)
4,7,0,5,x,7 (13.2x4)
9,x,7,10,9,0 (2x143.)
0,x,7,5,7,4 (.x3241)
7,x,0,5,7,4 (3x.241)
0,7,7,x,9,9 (.12x34)
0,7,4,5,x,7 (.312x4)
9,9,0,x,7,7 (34.x12)
0,9,9,x,7,7 (.34x12)
7,7,0,x,9,9 (12.x34)
4,x,0,5,7,7 (1x.234)
0,7,7,5,x,4 (.342x1)
0,x,4,5,7,7 (.x1234)
9,7,0,x,9,7 (31.x42)
0,7,9,x,9,7 (.13x42)
7,9,0,x,7,9 (13.x24)
0,9,7,x,7,9 (.31x24)
7,9,x,5,7,0 (24x13.)
7,9,0,5,7,x (24.13x)
0,7,7,5,9,x (.2314x)
7,7,x,5,9,0 (23x14.)
7,7,0,5,9,x (23.14x)
0,9,7,5,7,x (.4213x)
0,x,7,10,9,9 (.x1423)
0,9,7,10,x,9 (.214x3)
7,9,0,10,x,9 (12.4x3)
0,9,9,10,x,7 (.234x1)
0,x,9,10,9,7 (.x2431)
9,x,0,10,9,7 (2x.431)
9,9,0,10,x,7 (23.4x1)
7,x,0,10,9,9 (1x.423)
0,7,x,5,9,7 (.2x143)
0,9,x,5,7,7 (.4x123)

Riepilogo

  • L'accordo Fab6/9 contiene le note: Fa♭, La♭, Do♭, Re♭, Sol♭
  • In accordatura open E country ci sono 180 posizioni disponibili
  • Scritto anche come: FabM6/9
  • Ogni diagramma mostra la posizione delle dita sulla tastiera della Dobro

Domande frequenti

Cos'è l'accordo Fab6/9 alla Dobro?

Fab6/9 è un accordo Fab 6/9. Contiene le note Fa♭, La♭, Do♭, Re♭, Sol♭. Alla Dobro in accordatura open E country, ci sono 180 modi per suonare questo accordo.

Come si suona Fab6/9 alla Dobro?

Per suonare Fab6/9 in accordatura open E country, usa una delle 180 posizioni sopra. Ogni diagramma mostra la posizione delle dita sulla tastiera.

Quali note contiene l'accordo Fab6/9?

L'accordo Fab6/9 contiene le note: Fa♭, La♭, Do♭, Re♭, Sol♭.

Quante posizioni ci sono per Fab6/9?

In accordatura open E country ci sono 180 posizioni per l'accordo Fab6/9. Ciascuna usa una posizione diversa sulla tastiera con le stesse note: Fa♭, La♭, Do♭, Re♭, Sol♭.

Quali altri nomi ha Fab6/9?

Fab6/9 è anche conosciuto come FabM6/9. Sono notazioni diverse per lo stesso accordo: Fa♭, La♭, Do♭, Re♭, Sol♭.