Sol7b9 accordo per chitarra — schema e tablatura in accordatura Modal D

Risposta breve: Sol7b9 è un accordo Sol 7b9 con le note Sol, Si, Re, Fa, La♭. In accordatura Modal D ci sono 312 posizioni. Vedi i diagrammi sotto.

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Come suonare Sol7b9 su Mandolin

Sol7b9

Note: Sol, Si, Re, Fa, La♭

x,10,0,9,8,11,0,0 (x3.214..)
x,10,0,9,11,8,0,0 (x3.241..)
x,x,9,5,8,5,5,6 (xx413112)
x,x,6,5,5,8,5,9 (xx211314)
x,x,9,5,5,8,5,6 (xx411312)
x,x,6,5,8,5,5,9 (xx213114)
x,x,9,5,8,5,6,5 (xx413121)
x,x,5,5,8,5,9,6 (xx113142)
x,x,5,5,5,8,9,6 (xx111342)
x,x,9,5,5,8,6,5 (xx411321)
x,x,5,5,8,5,6,9 (xx113124)
x,x,6,5,8,5,9,5 (xx213141)
x,x,6,5,5,8,9,5 (xx211341)
x,x,5,5,5,8,6,9 (xx111324)
x,x,x,5,5,8,9,6 (xxx11342)
x,x,x,5,5,8,6,9 (xxx11324)
x,x,x,5,8,5,9,6 (xxx13142)
x,x,x,5,8,5,6,9 (xxx13124)
11,10,0,9,8,x,0,0 (43.21x..)
8,10,0,9,11,x,0,0 (13.24x..)
5,x,9,5,5,8,6,5 (1x411321)
8,x,6,5,5,5,9,5 (3x211141)
5,x,6,5,8,5,5,9 (1x213114)
8,x,5,5,5,5,6,9 (3x111124)
5,x,6,5,8,5,9,5 (1x213141)
5,x,5,5,5,8,9,6 (1x111342)
8,x,6,5,5,5,5,9 (3x211114)
5,x,6,5,5,8,9,5 (1x211341)
11,10,0,9,x,8,0,0 (43.2x1..)
8,x,9,5,5,5,6,5 (3x411121)
8,x,9,5,5,5,5,6 (3x411112)
8,10,0,9,x,11,0,0 (13.2x4..)
5,x,5,5,8,5,9,6 (1x113142)
5,x,9,5,8,5,6,5 (1x413121)
5,x,6,5,5,8,5,9 (1x211314)
8,x,5,5,5,5,9,6 (3x111142)
5,x,5,5,5,8,6,9 (1x111324)
5,x,9,5,8,5,5,6 (1x413112)
5,x,9,5,5,8,5,6 (1x411312)
5,x,5,5,8,5,6,9 (1x113124)
x,10,9,6,8,x,0,0 (x4312x..)
x,10,6,9,8,x,0,0 (x4132x..)
x,10,9,6,x,8,0,0 (x431x2..)
x,10,6,9,x,8,0,0 (x413x2..)
x,10,0,9,11,8,0,x (x3.241.x)
x,10,9,x,11,8,0,0 (x32x41..)
x,10,0,9,11,8,x,0 (x3.241x.)
x,10,x,9,8,11,0,0 (x3x214..)
x,10,x,9,11,8,0,0 (x3x241..)
x,10,0,9,8,11,x,0 (x3.214x.)
x,10,0,9,8,11,0,x (x3.214.x)
x,10,9,x,8,11,0,0 (x32x14..)
x,x,3,5,2,x,6,0 (xx231x4.)
x,x,6,5,2,x,3,0 (xx431x2.)
x,x,3,5,x,2,6,0 (xx23x14.)
x,x,6,5,x,2,3,0 (xx43x12.)
x,10,0,9,8,x,6,0 (x4.32x1.)
x,10,0,6,x,8,9,0 (x4.1x23.)
x,10,0,6,8,x,9,0 (x4.12x3.)
x,10,0,9,x,8,6,0 (x4.3x21.)
x,10,0,x,8,11,9,0 (x3.x142.)
x,10,0,x,11,8,9,0 (x3.x412.)
x,x,0,5,x,2,3,6 (xx.3x124)
x,x,6,5,2,x,0,3 (xx431x.2)
x,x,9,5,8,5,6,x (xx41312x)
x,x,0,5,x,2,6,3 (xx.3x142)
x,x,3,5,x,2,0,6 (xx23x1.4)
x,x,0,5,2,x,3,6 (xx.31x24)
x,x,3,5,2,x,0,6 (xx231x.4)
x,x,6,5,5,8,9,x (xx21134x)
x,x,6,5,x,2,0,3 (xx43x1.2)
x,x,0,5,2,x,6,3 (xx.31x42)
x,x,9,5,5,8,6,x (xx41132x)
x,x,6,5,8,5,9,x (xx21314x)
x,10,0,9,8,x,0,6 (x4.32x.1)
x,10,0,9,x,8,0,6 (x4.3x2.1)
x,10,0,6,8,x,0,9 (x4.12x.3)
x,10,0,6,x,8,0,9 (x4.1x2.3)
x,10,0,x,11,8,0,9 (x3.x41.2)
x,10,0,x,8,11,0,9 (x3.x14.2)
x,x,9,5,8,5,x,6 (xx4131x2)
x,x,9,5,8,x,6,0 (xx413x2.)
x,x,6,5,8,x,9,0 (xx213x4.)
x,x,6,5,5,8,x,9 (xx2113x4)
x,x,9,5,x,8,6,0 (xx41x32.)
x,x,6,5,x,8,9,0 (xx21x34.)
x,x,9,5,5,8,x,6 (xx4113x2)
x,x,6,5,8,5,x,9 (xx2131x4)
x,x,0,5,8,x,9,6 (xx.13x42)
x,x,0,5,x,8,9,6 (xx.1x342)
x,x,6,5,8,x,0,9 (xx213x.4)
x,x,0,5,8,x,6,9 (xx.13x24)
x,x,0,5,x,8,6,9 (xx.1x324)
x,x,6,5,x,8,0,9 (xx21x3.4)
x,x,9,5,8,x,0,6 (xx413x.2)
x,x,9,5,x,8,0,6 (xx41x3.2)
8,10,6,9,x,x,0,0 (2413xx..)
8,10,9,6,x,x,0,0 (2431xx..)
8,x,6,5,5,5,9,x (3x21114x)
11,10,0,9,8,x,x,0 (43.21xx.)
5,x,6,5,8,5,9,x (1x21314x)
8,10,9,x,11,x,0,0 (132x4x..)
5,x,9,5,8,5,6,x (1x41312x)
8,x,9,5,5,5,6,x (3x41112x)
11,10,x,9,8,x,0,0 (43x21x..)
8,10,x,9,11,x,0,0 (13x24x..)
8,10,0,9,11,x,x,0 (13.24xx.)
5,x,6,5,5,8,9,x (1x21134x)
8,10,0,9,11,x,0,x (13.24x.x)
11,10,0,9,8,x,0,x (43.21x.x)
5,x,9,5,5,8,6,x (1x41132x)
11,10,9,x,8,x,0,0 (432x1x..)
5,x,5,5,x,8,6,9 (1x11x324)
8,x,9,5,x,5,5,6 (3x41x112)
8,10,0,9,x,11,x,0 (13.2x4x.)
5,x,9,5,8,x,5,6 (1x413x12)
8,x,9,5,5,x,5,6 (3x411x12)
5,x,x,5,5,8,9,6 (1xx11342)
5,x,6,5,x,8,5,9 (1x21x314)
8,x,x,5,5,5,6,9 (3xx11124)
8,x,5,5,x,5,6,9 (3x11x124)
5,x,5,5,x,8,9,6 (1x11x342)
5,x,9,5,5,8,x,6 (1x4113x2)
5,x,x,5,8,5,6,9 (1xx13124)
8,10,0,9,x,11,0,x (13.2x4.x)
5,x,5,5,8,x,6,9 (1x113x24)
5,x,9,5,8,5,x,6 (1x4131x2)
5,x,x,5,8,5,9,6 (1xx13142)
8,x,9,5,5,5,x,6 (3x4111x2)
8,x,6,5,x,5,5,9 (3x21x114)
5,x,6,5,5,8,x,9 (1x2113x4)
5,x,6,5,x,8,9,5 (1x21x341)
11,10,9,x,x,8,0,0 (432xx1..)
8,x,x,5,5,5,9,6 (3xx11142)
11,10,x,9,x,8,0,0 (43x2x1..)
5,x,x,5,5,8,6,9 (1xx11324)
8,x,5,5,x,5,9,6 (3x11x142)
8,x,6,5,x,5,9,5 (3x21x141)
5,x,6,5,8,x,9,5 (1x213x41)
8,x,6,5,5,x,9,5 (3x211x41)
5,x,5,5,8,x,9,6 (1x113x42)
5,x,6,5,8,5,x,9 (1x2131x4)
5,x,6,5,8,x,5,9 (1x213x14)
8,10,9,x,x,11,0,0 (132xx4..)
5,x,9,5,x,8,6,5 (1x41x321)
8,10,x,9,x,11,0,0 (13x2x4..)
8,x,5,5,5,x,9,6 (3x111x42)
8,x,6,5,5,5,x,9 (3x2111x4)
8,x,6,5,5,x,5,9 (3x211x14)
11,10,0,9,x,8,x,0 (43.2x1x.)
8,x,9,5,x,5,6,5 (3x41x121)
5,x,9,5,x,8,5,6 (1x41x312)
8,x,5,5,5,x,6,9 (3x111x24)
5,x,9,5,8,x,6,5 (1x413x21)
11,10,0,9,x,8,0,x (43.2x1.x)
8,x,9,5,5,x,6,5 (3x411x21)
8,10,0,9,x,x,6,0 (24.3xx1.)
8,10,0,6,x,x,9,0 (24.1xx3.)
8,10,0,x,x,11,9,0 (13.xx42.)
11,10,0,x,x,8,9,0 (43.xx12.)
x,10,9,6,8,x,x,0 (x4312xx.)
8,10,0,x,11,x,9,0 (13.x4x2.)
11,10,0,x,8,x,9,0 (43.x1x2.)
x,10,6,9,8,x,x,0 (x4132xx.)
x,10,6,9,8,x,0,x (x4132x.x)
x,10,9,6,8,x,0,x (x4312x.x)
8,10,0,6,x,x,0,9 (24.1xx.3)
8,10,0,9,x,x,0,6 (24.3xx.1)
x,10,6,9,x,8,0,x (x413x2.x)
8,10,0,x,11,x,0,9 (13.x4x.2)
x,10,9,6,x,8,0,x (x431x2.x)
11,10,0,x,8,x,0,9 (43.x1x.2)
x,10,6,9,x,8,x,0 (x413x2x.)
x,10,9,6,x,8,x,0 (x431x2x.)
8,10,0,x,x,11,0,9 (13.xx4.2)
11,10,0,x,x,8,0,9 (43.xx1.2)
x,10,x,9,8,11,0,x (x3x214.x)
x,10,0,9,11,8,x,x (x3.241xx)
x,10,x,9,8,11,x,0 (x3x214x.)
x,10,9,x,8,11,x,0 (x32x14x.)
x,10,x,9,11,8,x,0 (x3x241x.)
x,10,9,x,11,8,x,0 (x32x41x.)
x,10,0,9,8,11,x,x (x3.214xx)
x,10,x,9,11,8,0,x (x3x241.x)
x,10,9,x,8,11,0,x (x32x14.x)
x,10,9,x,11,8,0,x (x32x41.x)
x,10,x,9,8,x,6,0 (x4x32x1.)
x,10,6,x,x,8,9,0 (x41xx23.)
x,10,0,6,8,x,9,x (x4.12x3x)
x,10,9,x,8,x,6,0 (x43x2x1.)
x,10,x,6,8,x,9,0 (x4x12x3.)
x,10,6,x,8,x,9,0 (x41x2x3.)
x,10,x,9,x,8,6,0 (x4x3x21.)
x,10,9,x,x,8,6,0 (x43xx21.)
x,10,0,9,8,x,6,x (x4.32x1x)
x,10,0,6,x,8,9,x (x4.1x23x)
x,10,x,6,x,8,9,0 (x4x1x23.)
x,10,0,9,x,8,6,x (x4.3x21x)
x,10,x,x,8,11,9,0 (x3xx142.)
x,10,0,x,8,11,9,x (x3.x142x)
x,10,x,x,11,8,9,0 (x3xx412.)
x,10,0,x,11,8,9,x (x3.x412x)
x,10,x,9,x,8,0,6 (x4x3x2.1)
x,10,0,6,8,x,x,9 (x4.12xx3)
x,10,9,x,8,x,0,6 (x43x2x.1)
x,10,x,6,8,x,0,9 (x4x12x.3)
x,10,0,x,8,x,9,6 (x4.x2x31)
x,10,x,6,x,8,0,9 (x4x1x2.3)
x,10,0,x,8,x,6,9 (x4.x2x13)
x,10,x,9,8,x,0,6 (x4x32x.1)
x,10,0,6,x,8,x,9 (x4.1x2x3)
x,10,0,9,x,8,x,6 (x4.3x2x1)
x,10,9,x,x,8,0,6 (x43xx2.1)
x,10,0,x,x,8,9,6 (x4.xx231)
x,10,6,x,x,8,0,9 (x41xx2.3)
x,10,0,9,8,x,x,6 (x4.32xx1)
x,10,6,x,8,x,0,9 (x41x2x.3)
x,10,0,x,x,8,6,9 (x4.xx213)
x,10,x,x,11,8,0,9 (x3xx41.2)
x,10,x,x,8,11,0,9 (x3xx14.2)
x,10,0,x,8,11,x,9 (x3.x14x2)
x,10,0,x,11,8,x,9 (x3.x41x2)
8,10,9,6,x,x,x,0 (2431xxx.)
8,10,6,9,x,x,x,0 (2413xxx.)
8,10,6,9,x,x,0,x (2413xx.x)
8,10,9,6,x,x,0,x (2431xx.x)
2,x,6,5,x,x,3,0 (1x43xx2.)
2,x,3,5,x,x,6,0 (1x23xx4.)
5,x,6,5,x,8,9,x (1x21x34x)
8,10,x,9,11,x,0,x (13x24x.x)
8,10,0,9,11,x,x,x (13.24xxx)
2,x,6,5,x,x,0,3 (1x43xx.2)
8,x,9,5,x,5,6,x (3x41x12x)
8,x,9,5,5,x,6,x (3x411x2x)
2,x,0,5,x,x,6,3 (1x.3xx42)
5,x,9,5,8,x,6,x (1x413x2x)
8,x,6,5,x,5,9,x (3x21x14x)
8,10,x,9,11,x,x,0 (13x24xx.)
8,10,9,x,11,x,x,0 (132x4xx.)
5,x,9,5,x,8,6,x (1x41x32x)
11,10,x,9,8,x,0,x (43x21x.x)
11,10,x,9,8,x,x,0 (43x21xx.)
11,10,9,x,8,x,0,x (432x1x.x)
11,10,9,x,8,x,x,0 (432x1xx.)
8,10,9,x,11,x,0,x (132x4x.x)
2,x,0,5,x,x,3,6 (1x.3xx24)
5,x,6,5,8,x,9,x (1x213x4x)
8,x,6,5,5,x,9,x (3x211x4x)
2,x,3,5,x,x,0,6 (1x23xx.4)
11,10,0,9,8,x,x,x (43.21xxx)
5,x,6,5,x,8,x,9 (1x21x3x4)
11,10,0,9,x,8,x,x (43.2x1xx)
8,10,0,9,x,11,x,x (13.2x4xx)
5,x,x,5,x,8,6,9 (1xx1x324)
8,x,6,5,x,5,x,9 (3x21x1x4)
8,x,9,5,5,x,x,6 (3x411xx2)
5,x,9,5,8,x,x,6 (1x413xx2)
8,x,9,5,x,5,x,6 (3x41x1x2)
8,x,6,5,x,x,9,0 (3x21xx4.)
8,x,x,5,x,5,6,9 (3xx1x124)
5,x,6,5,8,x,x,9 (1x213xx4)
11,10,9,x,x,8,0,x (432xx1.x)
5,x,9,5,x,8,x,6 (1x41x3x2)
8,x,6,5,5,x,x,9 (3x211xx4)
5,x,x,5,8,x,6,9 (1xx13x24)
11,10,x,9,x,8,0,x (43x2x1.x)
8,x,x,5,5,x,6,9 (3xx11x24)
8,10,9,x,x,11,0,x (132xx4.x)
8,10,x,9,x,11,0,x (13x2x4.x)
5,x,x,5,x,8,9,6 (1xx1x342)
8,x,x,5,x,5,9,6 (3xx1x142)
5,x,x,5,8,x,9,6 (1xx13x42)
11,10,9,x,x,8,x,0 (432xx1x.)
8,x,x,5,5,x,9,6 (3xx11x42)
8,x,9,5,x,x,6,0 (3x41xx2.)
8,10,x,9,x,11,x,0 (13x2x4x.)
8,10,9,x,x,11,x,0 (132xx4x.)
11,10,x,9,x,8,x,0 (43x2x1x.)
8,10,0,9,x,x,6,x (24.3xx1x)
8,10,9,x,x,x,6,0 (243xxx1.)
8,10,x,9,x,x,6,0 (24x3xx1.)
8,10,0,6,x,x,9,x (24.1xx3x)
8,10,6,x,x,x,9,0 (241xxx3.)
8,10,x,6,x,x,9,0 (24x1xx3.)
8,x,6,5,x,x,0,9 (3x21xx.4)
8,x,9,5,x,x,0,6 (3x41xx.2)
8,x,0,5,x,x,6,9 (3x.1xx24)
11,10,0,x,8,x,9,x (43.x1x2x)
8,10,0,x,11,x,9,x (13.x4x2x)
8,x,0,5,x,x,9,6 (3x.1xx42)
11,10,x,x,x,8,9,0 (43xxx12.)
8,10,x,x,11,x,9,0 (13xx4x2.)
8,10,0,x,x,11,9,x (13.xx42x)
11,10,x,x,8,x,9,0 (43xx1x2.)
8,10,x,x,x,11,9,0 (13xxx42.)
11,10,0,x,x,8,9,x (43.xx12x)
8,10,0,x,x,x,6,9 (24.xxx13)
8,10,9,x,x,x,0,6 (243xxx.1)
8,10,0,6,x,x,x,9 (24.1xxx3)
8,10,x,9,x,x,0,6 (24x3xx.1)
8,10,x,6,x,x,0,9 (24x1xx.3)
8,10,0,x,x,x,9,6 (24.xxx31)
8,10,6,x,x,x,0,9 (241xxx.3)
8,10,0,9,x,x,x,6 (24.3xxx1)
8,10,0,x,11,x,x,9 (13.x4xx2)
8,10,0,x,x,11,x,9 (13.xx4x2)
11,10,x,x,8,x,0,9 (43xx1x.2)
8,10,x,x,x,11,0,9 (13xxx4.2)
8,10,x,x,11,x,0,9 (13xx4x.2)
11,10,x,x,x,8,0,9 (43xxx1.2)
11,10,0,x,x,8,x,9 (43.xx1x2)
11,10,0,x,8,x,x,9 (43.x1xx2)

Riepilogo

  • L'accordo Sol7b9 contiene le note: Sol, Si, Re, Fa, La♭
  • In accordatura Modal D ci sono 312 posizioni disponibili
  • Ogni diagramma mostra la posizione delle dita sulla tastiera della Mandolin

Domande frequenti

Cos'è l'accordo Sol7b9 alla Mandolin?

Sol7b9 è un accordo Sol 7b9. Contiene le note Sol, Si, Re, Fa, La♭. Alla Mandolin in accordatura Modal D, ci sono 312 modi per suonare questo accordo.

Come si suona Sol7b9 alla Mandolin?

Per suonare Sol7b9 in accordatura Modal D, usa una delle 312 posizioni sopra. Ogni diagramma mostra la posizione delle dita sulla tastiera.

Quali note contiene l'accordo Sol7b9?

L'accordo Sol7b9 contiene le note: Sol, Si, Re, Fa, La♭.

Quante posizioni ci sono per Sol7b9?

In accordatura Modal D ci sono 312 posizioni per l'accordo Sol7b9. Ciascuna usa una posizione diversa sulla tastiera con le stesse note: Sol, Si, Re, Fa, La♭.