SolM7b5 accordo per chitarra — schema e tablatura in accordatura open G bluegrass

Risposta breve: SolM7b5 è un accordo Sol maj7b5 con le note Sol, Si, Re♭, Fa♯. In accordatura open G bluegrass ci sono 266 posizioni. Vedi i diagrammi sotto.

Conosciuto anche come: SolMa7b5, Solj7b5, SolΔ7b5, SolΔb5, Sol maj7b5

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Come suonare SolM7b5 su Dobro

SolM7b5, SolMa7b5, Solj7b5, SolΔ7b5, SolΔb5, Solmaj7b5

Note: Sol, Si, Re♭, Fa♯

6,7,5,0,0,5 (341..2)
0,7,5,6,0,5 (.413.2)
6,0,5,0,7,5 (3.1.42)
0,0,5,6,7,5 (..1342)
0,0,11,11,0,11 (..12.3)
11,0,11,0,0,11 (1.2..3)
0,0,9,11,0,11 (..12.3)
0,0,11,11,0,9 (..23.1)
11,0,9,0,0,11 (2.1..3)
0,0,9,6,7,9 (..3124)
6,7,9,0,0,9 (123..4)
11,0,11,0,0,9 (2.3..1)
6,0,9,0,7,9 (1.3.24)
0,7,9,6,0,9 (.231.4)
6,0,5,0,7,9 (2.1.34)
0,7,5,6,0,9 (.312.4)
6,7,9,0,0,5 (234..1)
0,7,9,6,0,5 (.342.1)
0,0,5,6,7,9 (..1234)
6,7,5,0,0,9 (231..4)
0,0,9,6,7,5 (..4231)
6,0,9,0,7,5 (2.4.31)
0,0,11,0,7,11 (..2.13)
0,7,9,0,0,11 (.12..3)
0,7,11,0,0,11 (.12..3)
0,0,11,0,7,9 (..3.12)
0,0,9,0,7,11 (..2.13)
x,7,5,6,0,5 (x413.2)
0,7,11,0,0,9 (.13..2)
x,0,5,6,7,5 (x.1342)
11,0,11,0,8,9 (3.4.12)
0,8,9,11,0,11 (.123.4)
11,0,9,0,8,11 (3.2.14)
11,8,11,0,0,11 (213..4)
0,0,11,11,8,11 (..2314)
0,0,9,11,8,11 (..2314)
0,8,11,11,0,9 (.134.2)
11,8,9,0,0,11 (312..4)
0,8,11,11,0,11 (.123.4)
11,8,11,0,0,9 (314..2)
11,0,11,0,8,11 (2.3.14)
0,0,11,11,8,9 (..3412)
0,0,9,11,7,11 (..2314)
0,7,11,11,0,9 (.134.2)
11,7,11,0,0,9 (314..2)
11,7,11,0,0,11 (213..4)
11,0,11,0,7,11 (2.3.14)
11,7,9,0,0,11 (312..4)
0,7,11,11,0,11 (.123.4)
0,7,11,0,8,9 (.14.23)
0,7,9,0,8,11 (.13.24)
0,8,9,0,7,11 (.23.14)
0,0,11,11,7,9 (..3412)
0,7,9,11,0,11 (.123.4)
0,0,11,11,7,11 (..2314)
0,7,9,0,7,11 (.13.24)
0,8,11,0,7,9 (.24.13)
11,0,9,0,7,11 (3.2.14)
0,7,11,0,7,9 (.14.23)
11,0,11,0,7,9 (3.4.12)
x,0,5,6,7,9 (x.1234)
x,0,9,6,7,5 (x.4231)
x,7,5,6,0,9 (x312.4)
x,7,9,6,0,5 (x342.1)
x,7,11,0,0,11 (x12..3)
x,0,11,0,7,9 (x.3.12)
x,0,11,0,7,11 (x.2.13)
x,7,9,0,0,11 (x12..3)
x,7,11,0,0,9 (x13..2)
x,0,9,0,7,11 (x.2.13)
x,7,9,0,7,11 (x13.24)
x,7,11,0,8,9 (x14.23)
x,7,9,0,8,11 (x13.24)
x,8,9,0,7,11 (x23.14)
x,7,11,0,7,9 (x14.23)
x,8,11,0,7,9 (x24.13)
x,x,9,6,7,5 (xx4231)
x,x,5,6,7,9 (xx1234)
x,x,9,0,7,11 (xx2.13)
x,x,11,0,7,9 (xx3.12)
6,7,5,0,0,x (231..x)
0,7,5,6,0,x (.312.x)
11,0,11,0,0,x (1.2..x)
6,7,9,0,0,x (123..x)
6,0,5,0,7,x (2.1.3x)
6,7,5,6,0,x (2413.x)
0,0,11,11,0,x (..12.x)
0,0,5,6,7,x (..123x)
0,7,11,0,0,x (.12..x)
4,7,5,6,0,x (1423.x)
6,7,5,4,0,x (3421.x)
0,7,9,6,0,x (.231.x)
6,0,x,0,7,5 (2.x.31)
6,0,5,6,7,x (2.134x)
0,0,x,6,7,5 (..x231)
11,8,11,0,0,x (213..x)
0,7,x,6,0,5 (.3x2.1)
6,7,x,0,0,5 (23x..1)
4,0,5,6,7,x (1.234x)
6,0,5,4,7,x (3.214x)
11,7,11,0,0,x (213..x)
x,7,5,6,0,x (x312.x)
0,0,9,6,7,x (..312x)
6,0,9,0,7,x (1.3.2x)
6,7,5,x,0,5 (341x.2)
6,0,5,x,7,5 (3.1x42)
6,7,x,6,0,5 (24x3.1)
11,0,x,0,0,11 (1.x..2)
0,0,x,11,0,11 (..x1.2)
0,8,11,11,0,x (.123.x)
6,0,x,6,7,5 (2.x341)
6,7,x,4,0,5 (34x1.2)
x,0,5,6,7,x (x.123x)
6,0,x,4,7,5 (3.x142)
0,7,11,11,0,x (.123.x)
0,0,11,0,7,x (..2.1x)
4,7,x,6,0,5 (14x3.2)
4,0,x,6,7,5 (1.x342)
0,8,9,6,7,x (.3412x)
6,8,9,0,7,x (134.2x)
6,7,x,0,0,9 (12x..3)
0,7,x,6,0,9 (.2x1.3)
0,7,9,6,7,x (.2413x)
6,7,9,0,8,x (124.3x)
x,7,11,0,0,x (x12..x)
0,0,x,6,7,9 (..x123)
0,7,9,6,8,x (.2413x)
6,0,x,0,7,9 (1.x.23)
6,7,9,0,7,x (124.3x)
0,x,11,11,0,11 (.x12.3)
0,0,11,11,x,11 (..12x3)
11,0,11,0,x,11 (1.2.x3)
0,0,11,11,8,x (..231x)
11,x,11,0,0,11 (1x2..3)
11,0,11,0,8,x (2.3.1x)
0,0,x,0,7,11 (..x.12)
x,0,x,6,7,5 (x.x231)
11,0,11,0,7,x (2.3.1x)
0,0,11,11,7,x (..231x)
x,7,x,6,0,5 (x3x2.1)
0,7,x,0,0,11 (.1x..2)
6,x,9,0,7,9 (1x3.24)
0,x,11,11,0,9 (.x23.1)
6,7,9,0,x,9 (123.x4)
11,0,11,0,x,9 (2.3.x1)
6,7,x,0,8,9 (12x.34)
6,7,x,0,7,9 (12x.34)
0,x,9,11,0,11 (.x12.3)
11,x,11,0,0,9 (2x3..1)
6,8,x,0,7,9 (13x.24)
0,7,9,6,x,9 (.231x4)
0,7,x,6,7,9 (.2x134)
0,8,x,6,7,9 (.3x124)
0,0,9,11,x,11 (..12x3)
0,x,9,6,7,9 (.x3124)
0,0,11,11,x,9 (..23x1)
11,0,9,0,x,11 (2.1.x3)
0,7,x,6,8,9 (.2x134)
11,x,9,0,0,11 (2x1..3)
0,x,9,6,7,5 (.x4231)
6,x,9,0,7,5 (2x4.31)
6,x,5,0,7,9 (2x1.34)
6,7,5,0,x,9 (231.x4)
6,7,5,x,0,9 (231x.4)
0,x,5,6,7,9 (.x1234)
11,0,x,0,8,11 (2.x.13)
0,7,9,6,x,5 (.342x1)
6,0,9,x,7,5 (2.4x31)
6,7,9,x,0,5 (234x.1)
11,8,x,0,0,11 (21x..3)
6,0,5,x,7,9 (2.1x34)
0,8,x,11,0,11 (.1x2.3)
0,7,5,6,x,9 (.312x4)
0,0,x,11,8,11 (..x213)
6,7,9,0,x,5 (234.x1)
0,7,9,x,0,11 (.12x.3)
0,0,9,x,7,11 (..2x13)
0,x,9,0,7,11 (.x2.13)
0,0,11,x,7,11 (..2x13)
0,0,x,11,7,11 (..x213)
0,7,9,0,x,11 (.12.x3)
0,7,11,0,x,9 (.13.x2)
0,7,x,11,0,11 (.1x2.3)
0,0,11,x,7,9 (..3x12)
11,7,x,0,0,11 (21x..3)
0,7,11,x,0,9 (.13x.2)
11,0,x,0,7,11 (2.x.13)
0,7,11,x,0,11 (.12x.3)
0,x,11,0,7,9 (.x3.12)
x,0,11,0,7,x (x.2.1x)
0,x,11,11,8,9 (.x3412)
11,x,11,0,8,9 (3x4.12)
0,x,9,11,8,11 (.x2314)
0,8,9,11,x,11 (.123x4)
11,x,9,0,8,11 (3x2.14)
0,8,11,11,x,9 (.134x2)
11,8,11,0,x,9 (314.x2)
11,8,9,0,x,11 (312.x4)
0,7,9,11,x,11 (.123x4)
11,7,9,0,x,11 (312.x4)
0,x,11,11,7,9 (.x3412)
0,7,11,x,8,9 (.14x23)
0,7,11,x,7,9 (.14x23)
11,x,9,0,7,11 (3x2.14)
0,8,9,x,7,11 (.23x14)
11,7,11,0,x,9 (314.x2)
0,7,9,x,7,11 (.13x24)
11,x,11,0,7,9 (3x4.12)
0,8,11,x,7,9 (.24x13)
0,7,11,11,x,9 (.134x2)
0,7,9,x,8,11 (.13x24)
0,x,9,11,7,11 (.x2314)
x,7,x,0,0,11 (x1x..2)
x,0,x,0,7,11 (x.x.12)
x,7,5,6,x,9 (x312x4)
x,7,9,6,x,5 (x342x1)
x,7,11,0,x,9 (x13.x2)
x,7,9,0,x,11 (x12.x3)
6,7,x,0,0,x (12x..x)
0,7,x,6,0,x (.2x1.x)
6,7,5,x,0,x (231x.x)
6,0,x,0,7,x (1.x.2x)
0,0,x,6,7,x (..x12x)
11,x,11,0,0,x (1x2..x)
11,0,11,0,x,x (1.2.xx)
6,7,9,0,x,x (123.xx)
6,0,5,x,7,x (2.1x3x)
0,x,11,11,0,x (.x12.x)
0,0,11,11,x,x (..12xx)
6,7,5,4,x,x (3421xx)
4,7,5,6,x,x (1423xx)
0,7,11,x,0,x (.12x.x)
0,7,9,6,x,x (.231xx)
6,7,x,x,0,5 (23xx.1)
6,0,x,x,7,5 (2.xx31)
6,x,5,4,7,x (3x214x)
4,x,5,6,7,x (1x234x)
6,x,9,0,7,x (1x3.2x)
0,x,9,6,7,x (.x312x)
0,0,x,11,x,11 (..x1x2)
11,x,x,0,0,11 (1xx..2)
0,x,x,11,0,11 (.xx1.2)
11,0,x,0,x,11 (1.x.x2)
6,7,x,4,x,5 (34x1x2)
0,0,11,x,7,x (..2x1x)
6,x,x,4,7,5 (3xx142)
4,x,x,6,7,5 (1xx342)
4,7,x,6,x,5 (14x3x2)
0,7,x,6,x,9 (.2x1x3)
6,x,x,0,7,9 (1xx.23)
6,7,x,0,x,9 (12x.x3)
0,x,x,6,7,9 (.xx123)
0,7,x,x,0,11 (.1xx.2)
0,0,x,x,7,11 (..xx12)
0,x,11,11,x,9 (.x23x1)
11,x,11,0,x,9 (2x3.x1)
0,x,9,11,x,11 (.x12x3)
11,x,9,0,x,11 (2x1.x3)
6,7,5,x,x,9 (231xx4)
6,7,9,x,x,5 (234xx1)
6,x,5,x,7,9 (2x1x34)
6,x,9,x,7,5 (2x4x31)
0,7,9,x,x,11 (.12xx3)
0,x,11,x,7,9 (.x3x12)
0,7,11,x,x,9 (.13xx2)
0,x,9,x,7,11 (.x2x13)

Riepilogo

  • L'accordo SolM7b5 contiene le note: Sol, Si, Re♭, Fa♯
  • In accordatura open G bluegrass ci sono 266 posizioni disponibili
  • Scritto anche come: SolMa7b5, Solj7b5, SolΔ7b5, SolΔb5, Sol maj7b5
  • Ogni diagramma mostra la posizione delle dita sulla tastiera della Dobro

Domande frequenti

Cos'è l'accordo SolM7b5 alla Dobro?

SolM7b5 è un accordo Sol maj7b5. Contiene le note Sol, Si, Re♭, Fa♯. Alla Dobro in accordatura open G bluegrass, ci sono 266 modi per suonare questo accordo.

Come si suona SolM7b5 alla Dobro?

Per suonare SolM7b5 in accordatura open G bluegrass, usa una delle 266 posizioni sopra. Ogni diagramma mostra la posizione delle dita sulla tastiera.

Quali note contiene l'accordo SolM7b5?

L'accordo SolM7b5 contiene le note: Sol, Si, Re♭, Fa♯.

Quante posizioni ci sono per SolM7b5?

In accordatura open G bluegrass ci sono 266 posizioni per l'accordo SolM7b5. Ciascuna usa una posizione diversa sulla tastiera con le stesse note: Sol, Si, Re♭, Fa♯.

Quali altri nomi ha SolM7b5?

SolM7b5 è anche conosciuto come SolMa7b5, Solj7b5, SolΔ7b5, SolΔb5, Sol maj7b5. Sono notazioni diverse per lo stesso accordo: Sol, Si, Re♭, Fa♯.