Solb° accordo per chitarra — schema e tablatura in accordatura Drop B Fifths

Risposta breve: Solb° è un accordo Solb dim con le note Sol♭, Si♭♭, Re♭♭. In accordatura Drop B Fifths ci sono 202 posizioni. Vedi i diagrammi sotto.

Conosciuto anche come: Solbmb5, Solbmo5, Solb dim, Solb Diminished

Accordi per pianoforteStrumentiAccordature

Come suonare Solb° su Guitar

Solb°, Solbmb5, Solbmo5, Solbdim, SolbDiminished

Note: Sol♭, Si♭♭, Re♭♭

1,0,1,2,0,4 (1.23.4)
1,0,1,5,0,4 (1.24.3)
x,0,1,2,0,4 (x.12.3)
7,0,7,8,0,7 (1.24.3)
x,3,1,2,0,4 (x312.4)
x,0,1,5,0,4 (x.13.2)
7,0,7,8,0,4 (2.34.1)
x,3,1,5,0,4 (x214.3)
x,0,1,5,3,4 (x.1423)
x,0,7,8,0,7 (x.13.2)
x,x,1,2,0,4 (xx12.3)
10,0,10,8,0,10 (2.31.4)
x,3,7,5,3,4 (x14312)
10,0,7,8,0,7 (4.13.2)
7,0,10,8,0,7 (1.43.2)
10,0,10,8,0,7 (3.42.1)
7,0,10,8,0,10 (1.32.4)
10,0,7,8,0,10 (3.12.4)
7,0,7,8,0,10 (1.23.4)
x,0,7,8,0,4 (x.23.1)
x,6,7,5,0,4 (x342.1)
x,x,1,5,0,4 (xx13.2)
x,0,7,5,3,7 (x.3214)
x,0,7,5,3,4 (x.4312)
x,0,10,8,0,10 (x.21.3)
x,0,10,8,0,7 (x.32.1)
x,6,7,8,0,4 (x234.1)
x,0,7,8,0,10 (x.12.3)
x,0,7,8,9,7 (x.1342)
x,x,1,5,3,4 (xx1423)
x,0,10,8,9,10 (x.3124)
x,0,10,8,9,7 (x.4231)
x,x,x,5,3,4 (xxx312)
x,x,7,8,0,4 (xx23.1)
x,x,7,5,3,4 (xx4312)
x,x,x,8,0,4 (xxx2.1)
1,0,1,2,0,x (1.23.x)
x,0,1,2,0,x (x.12.x)
1,3,1,2,3,x (13124x)
1,3,1,2,0,x (1423.x)
1,0,1,5,0,x (1.23.x)
x,3,1,2,0,x (x312.x)
x,x,1,2,0,x (xx12.x)
7,0,7,8,0,x (1.23.x)
1,3,1,x,3,4 (121x34)
1,0,x,2,0,4 (1.x2.3)
1,0,1,x,0,4 (1.2x.3)
1,3,1,2,x,4 (1312x4)
x,0,1,5,0,x (x.12.x)
1,3,1,x,0,4 (132x.4)
1,0,x,5,0,4 (1.x3.2)
1,x,1,2,0,4 (1x23.4)
1,3,x,2,0,4 (13x2.4)
1,0,1,5,3,x (1.243x)
1,3,1,5,x,4 (1214x3)
1,x,1,5,3,4 (1x1423)
x,0,7,8,0,x (x.12.x)
x,3,1,2,3,x (x3124x)
x,0,1,x,0,4 (x.1x.2)
10,0,10,8,0,x (2.31.x)
x,3,x,5,3,4 (x1x312)
1,x,1,5,0,4 (1x24.3)
1,3,x,5,0,4 (12x4.3)
1,0,x,5,3,4 (1.x423)
1,0,1,5,x,4 (1.24x3)
7,0,10,8,0,x (1.32.x)
10,0,7,8,0,x (3.12.x)
7,0,x,8,0,7 (1.x3.2)
7,3,x,5,3,4 (41x312)
7,0,7,5,3,x (3.421x)
x,0,1,5,3,x (x.132x)
7,3,7,x,3,4 (314x12)
x,3,1,x,0,4 (x21x.3)
x,0,x,5,3,4 (x.x312)
7,0,x,8,0,4 (2.x3.1)
7,6,x,5,0,4 (43x2.1)
7,0,7,8,x,7 (1.24x3)
x,3,x,2,3,4 (x2x134)
x,0,10,8,0,x (x.21.x)
7,6,7,x,0,4 (324x.1)
10,0,10,x,0,10 (1.2x.3)
x,0,1,5,x,4 (x.13x2)
x,6,x,5,0,4 (x3x2.1)
x,3,1,x,3,4 (x21x34)
7,0,x,5,3,4 (4.x312)
x,0,x,8,0,7 (x.x2.1)
7,0,7,x,3,7 (2.3x14)
x,3,1,2,x,4 (x312x4)
7,0,x,5,3,7 (3.x214)
10,0,x,8,0,10 (2.x1.3)
x,x,1,x,0,4 (xx1x.2)
x,0,7,5,3,x (x.321x)
x,3,7,x,3,4 (x13x12)
10,0,10,8,9,x (3.412x)
x,6,x,2,0,4 (x3x1.2)
10,0,7,x,0,10 (2.1x.3)
10,0,x,8,0,7 (3.x2.1)
7,6,x,8,0,4 (32x4.1)
7,0,10,8,9,x (1.423x)
7,0,10,x,0,10 (1.2x.3)
7,0,x,8,0,10 (1.x2.3)
7,0,x,8,9,7 (1.x342)
7,x,7,8,0,4 (2x34.1)
10,0,7,8,9,x (4.123x)
7,0,7,x,0,10 (1.2x.3)
x,0,x,8,0,4 (x.x2.1)
x,3,1,5,x,4 (x214x3)
10,0,10,x,9,10 (2.3x14)
x,0,10,x,0,10 (x.1x.2)
x,0,7,8,x,7 (x.13x2)
x,6,7,x,0,4 (x23x.1)
x,0,x,5,3,7 (x.x213)
10,0,10,8,x,10 (2.31x4)
10,0,x,8,9,10 (3.x124)
x,0,7,x,3,7 (x.2x13)
x,6,x,5,3,4 (x4x312)
10,0,10,8,x,7 (3.42x1)
7,0,10,8,x,7 (1.43x2)
10,0,7,8,x,7 (4.13x2)
10,0,7,8,x,10 (3.12x4)
x,0,10,8,9,x (x.312x)
7,0,10,8,x,10 (1.32x4)
7,0,10,x,9,10 (1.3x24)
10,0,x,8,9,7 (4.x231)
x,0,x,8,0,10 (x.x1.2)
10,0,7,x,9,10 (3.1x24)
x,0,7,x,0,10 (x.1x.2)
x,6,x,8,0,4 (x2x3.1)
x,0,x,8,9,7 (x.x231)
x,6,7,5,x,4 (x342x1)
x,0,10,x,9,10 (x.2x13)
x,x,1,5,x,4 (xx13x2)
x,0,10,8,x,10 (x.21x3)
x,0,10,8,x,7 (x.32x1)
1,0,1,x,0,x (1.2x.x)
x,0,1,x,0,x (x.1x.x)
1,0,x,2,0,x (1.x2.x)
1,x,1,2,0,x (1x23.x)
1,3,1,2,x,x (1312xx)
1,3,x,2,0,x (13x2.x)
1,0,x,5,0,x (1.x2.x)
1,0,x,x,0,4 (1.xx.2)
1,3,1,x,x,4 (121xx3)
1,0,1,5,x,x (1.23xx)
7,0,x,8,0,x (1.x2.x)
1,3,x,2,3,x (13x24x)
x,3,1,2,x,x (x312xx)
x,3,x,x,3,4 (x1xx12)
x,0,x,8,0,x (x.x1.x)
1,x,1,5,x,4 (1x13x2)
1,0,x,5,3,x (1.x32x)
x,3,x,2,3,x (x2x13x)
1,3,x,x,0,4 (12xx.3)
1,x,1,x,0,4 (1x2x.3)
1,x,x,2,0,4 (1xx2.3)
x,0,1,5,x,x (x.12xx)
x,0,x,5,3,x (x.x21x)
10,0,x,8,0,x (2.x1.x)
1,3,x,2,x,4 (13x2x4)
1,0,x,5,x,4 (1.x3x2)
x,6,x,2,0,x (x2x1.x)
1,3,x,x,3,4 (12xx34)
1,x,x,5,0,4 (1xx3.2)
7,3,x,x,3,4 (31xx12)
7,0,x,5,3,x (3.x21x)
10,0,10,8,x,x (2.31xx)
10,0,x,x,0,10 (1.xx.2)
1,3,x,5,x,4 (12x4x3)
7,0,10,8,x,x (1.32xx)
10,0,7,8,x,x (3.12xx)
7,0,x,8,x,7 (1.x3x2)
7,6,x,x,0,4 (32xx.1)
1,x,x,5,3,4 (1xx423)
x,6,x,x,0,4 (x2xx.1)
x,3,1,x,x,4 (x21xx3)
7,0,x,x,3,7 (2.xx13)
10,0,x,8,9,x (3.x12x)
x,0,10,8,x,x (x.21xx)
7,0,x,x,0,10 (1.xx.2)
7,6,x,5,x,4 (43x2x1)
10,0,10,x,x,10 (1.2xx3)
7,x,x,8,0,4 (2xx3.1)
x,0,x,8,x,7 (x.x2x1)
x,6,x,5,x,4 (x3x2x1)
7,x,x,5,3,4 (4xx312)
10,0,x,x,9,10 (2.xx13)
x,0,x,x,0,10 (x.xx.1)
10,0,x,8,x,10 (2.x1x3)
x,0,x,x,3,7 (x.xx12)
10,0,7,x,x,10 (2.1xx3)
7,0,10,x,x,10 (1.2xx3)
10,0,x,8,x,7 (3.x2x1)
x,0,10,x,x,10 (x.1xx2)
1,0,x,x,0,x (1.xx.x)
1,x,x,2,0,x (1xx2.x)
1,3,x,2,x,x (13x2xx)
1,0,x,5,x,x (1.x2xx)
1,x,x,x,0,4 (1xxx.2)
1,3,x,x,x,4 (12xxx3)
10,0,x,8,x,x (2.x1xx)
1,x,x,5,x,4 (1xx3x2)
10,0,x,x,x,10 (1.xxx2)

Riepilogo

  • L'accordo Solb° contiene le note: Sol♭, Si♭♭, Re♭♭
  • In accordatura Drop B Fifths ci sono 202 posizioni disponibili
  • Scritto anche come: Solbmb5, Solbmo5, Solb dim, Solb Diminished
  • Ogni diagramma mostra la posizione delle dita sulla tastiera della Guitar

Domande frequenti

Cos'è l'accordo Solb° alla Guitar?

Solb° è un accordo Solb dim. Contiene le note Sol♭, Si♭♭, Re♭♭. Alla Guitar in accordatura Drop B Fifths, ci sono 202 modi per suonare questo accordo.

Come si suona Solb° alla Guitar?

Per suonare Solb° in accordatura Drop B Fifths, usa una delle 202 posizioni sopra. Ogni diagramma mostra la posizione delle dita sulla tastiera.

Quali note contiene l'accordo Solb°?

L'accordo Solb° contiene le note: Sol♭, Si♭♭, Re♭♭.

Quante posizioni ci sono per Solb°?

In accordatura Drop B Fifths ci sono 202 posizioni per l'accordo Solb°. Ciascuna usa una posizione diversa sulla tastiera con le stesse note: Sol♭, Si♭♭, Re♭♭.

Quali altri nomi ha Solb°?

Solb° è anche conosciuto come Solbmb5, Solbmo5, Solb dim, Solb Diminished. Sono notazioni diverse per lo stesso accordo: Sol♭, Si♭♭, Re♭♭.