Solm#5 accordo per chitarra — schema e tablatura in accordatura Drop G#/Ab

Risposta breve: Solm#5 è un accordo Sol m#5 con le note Sol, Si♭, Re♯. In accordatura Drop G#/Ab ci sono 241 posizioni. Vedi i diagrammi sotto.

Conosciuto anche come: Sol-#5

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Come suonare Solm#5 su 7-String Guitar

Solm#5, Sol-#5

Note: Sol, Si♭, Re♯

x,4,2,2,4,0,0 (x3124..)
x,4,2,2,1,0,0 (x4231..)
x,x,x,x,1,0,0 (xxxx1..)
x,4,2,6,4,0,0 (x2143..)
x,4,7,6,4,0,0 (x1432..)
x,4,7,6,4,5,4 (x143121)
x,x,x,6,4,0,0 (xxx21..)
x,x,x,6,4,5,0 (xxx312.)
x,x,x,6,4,5,4 (xxx3121)
x,x,11,9,9,0,0 (xx312..)
x,x,x,6,9,0,0 (xxx12..)
x,x,11,9,9,9,0 (xx4123.)
x,x,x,6,4,5,7 (xxx3124)
x,x,x,6,9,0,7 (xxx13.2)
x,x,11,9,9,0,7 (xx423.1)
x,x,x,6,9,9,7 (xxx1342)
x,x,x,6,9,5,7 (xxx2413)
x,4,2,2,x,0,0 (x312x..)
x,4,x,2,4,0,0 (x2x13..)
x,4,2,x,4,0,0 (x21x3..)
x,4,2,x,1,0,0 (x32x1..)
x,4,x,2,1,0,0 (x3x21..)
x,4,2,2,4,0,x (x3124.x)
x,4,2,2,4,x,0 (x3124x.)
x,4,2,6,x,0,0 (x213x..)
x,4,2,2,1,x,0 (x4231x.)
x,4,x,6,4,0,0 (x1x32..)
x,4,2,2,1,0,x (x4231.x)
x,4,7,6,x,0,0 (x132x..)
x,4,2,2,4,5,x (x21134x)
x,4,2,2,4,x,4 (x2113x4)
x,4,7,x,4,0,0 (x13x2..)
x,x,x,6,x,0,0 (xxx1x..)
x,4,x,6,4,5,4 (x1x3121)
x,4,x,2,4,0,4 (x2x13.4)
x,4,x,2,4,5,0 (x2x134.)
x,4,2,x,4,5,0 (x21x34.)
11,7,11,9,x,0,0 (3142x..)
x,4,2,2,x,5,4 (x211x43)
11,7,7,9,x,0,0 (4123x..)
x,4,2,6,4,x,0 (x2143x.)
x,4,2,2,x,0,4 (x312x.4)
x,4,2,2,x,5,0 (x312x4.)
x,4,x,2,1,0,4 (x3x21.4)
11,x,11,9,9,0,0 (3x412..)
x,4,7,6,4,5,x (x14312x)
x,4,2,x,1,5,0 (x32x14.)
x,4,7,x,4,5,4 (x13x121)
x,4,7,6,4,x,0 (x1432x.)
x,4,7,6,4,0,x (x1432.x)
x,4,x,6,4,5,0 (x1x423.)
x,4,7,6,4,x,4 (x1321x1)
11,7,x,9,9,0,0 (41x23..)
11,7,7,x,9,0,0 (412x3..)
11,x,7,9,9,0,0 (4x123..)
x,4,2,6,x,5,0 (x214x3.)
11,7,11,x,9,0,0 (314x2..)
x,4,x,6,4,5,7 (x1x3124)
x,4,7,x,4,5,0 (x14x23.)
x,4,7,6,4,x,7 (x1321x4)
x,4,7,x,4,5,7 (x13x124)
x,x,x,6,4,x,0 (xxx21x.)
11,7,7,9,x,9,7 (4112x31)
11,7,7,9,9,x,7 (41123x1)
11,7,7,x,9,9,7 (411x231)
x,x,11,9,x,0,0 (xx21x..)
x,4,7,6,x,0,4 (x143x.2)
x,4,7,6,x,0,7 (x132x.4)
x,4,7,x,4,0,4 (x14x2.3)
x,4,7,x,4,0,7 (x13x2.4)
x,x,11,x,9,0,0 (xx2x1..)
x,x,11,9,9,9,x (xx2111x)
x,x,11,9,9,x,0 (xx312x.)
x,x,11,9,9,0,x (xx312.x)
x,x,x,6,4,5,x (xxx312x)
x,x,x,6,9,0,x (xxx12.x)
x,x,11,9,x,9,0 (xx31x2.)
x,x,x,6,x,5,7 (xxx2x13)
x,x,11,x,9,0,7 (xx3x2.1)
x,x,x,6,9,x,7 (xxx13x2)
x,x,11,x,9,9,7 (xx4x231)
x,x,11,9,9,x,7 (xx423x1)
x,4,2,x,x,0,0 (x21xx..)
x,4,x,2,x,0,0 (x2x1x..)
x,4,x,x,4,0,0 (x1xx2..)
x,4,2,2,4,x,x (x2113xx)
x,4,2,2,x,x,0 (x312xx.)
x,4,2,2,x,0,x (x312x.x)
x,4,7,x,x,0,0 (x12xx..)
x,4,x,6,x,0,0 (x1x2x..)
x,4,x,x,1,0,0 (x2xx1..)
x,4,x,2,4,0,x (x2x13.x)
x,4,x,2,4,x,0 (x2x13x.)
x,4,2,x,4,x,0 (x21x3x.)
x,4,2,x,1,x,0 (x32x1x.)
x,4,x,x,4,5,4 (x1xx121)
x,4,x,2,1,0,x (x3x21.x)
x,4,2,2,x,5,x (x211x3x)
x,4,2,2,x,x,4 (x211xx3)
x,4,2,6,x,x,0 (x213xx.)
11,7,11,x,x,0,0 (213xx..)
11,7,7,x,x,0,0 (312xx..)
x,4,2,2,1,x,x (x4231xx)
x,4,x,x,4,5,0 (x1xx23.)
11,x,11,9,x,0,0 (2x31x..)
x,4,x,6,4,x,0 (x1x32x.)
x,4,7,6,x,0,x (x132x.x)
x,4,7,6,4,x,x (x1321xx)
x,4,x,6,4,5,x (x1x312x)
11,7,x,9,x,0,0 (31x2x..)
11,x,7,9,x,0,0 (3x12x..)
x,4,x,2,x,0,4 (x2x1x.3)
x,4,2,x,x,5,0 (x21xx3.)
x,4,7,x,4,x,4 (x12x1x1)
x,4,7,x,4,5,x (x13x12x)
11,x,11,x,9,0,0 (2x3x1..)
x,4,7,x,4,0,x (x13x2.x)
11,x,x,9,9,0,0 (3xx12..)
x,4,7,x,4,x,0 (x13x2x.)
11,x,11,9,9,9,x (2x3111x)
x,x,11,x,x,0,0 (xx1xx..)
x,4,x,2,4,5,x (x2x134x)
11,7,7,9,9,x,x (41123xx)
x,4,2,x,4,5,x (x21x34x)
11,7,7,9,x,x,0 (4123xx.)
11,7,x,x,9,0,0 (31xx2..)
11,x,7,x,9,0,0 (3x1x2..)
11,7,7,9,x,0,x (4123x.x)
11,7,11,9,x,x,0 (3142xx.)
x,4,x,2,4,x,4 (x2x13x4)
x,4,7,x,4,x,7 (x12x1x3)
11,x,11,9,9,x,0 (3x412x.)
11,x,11,9,9,0,x (3x412.x)
x,4,2,x,1,5,x (x32x14x)
x,4,x,x,4,5,7 (x1xx123)
11,7,7,x,9,x,7 (311x2x1)
11,7,7,x,9,9,x (411x23x)
11,7,7,x,x,9,7 (311xx21)
x,4,2,x,x,5,4 (x21xx43)
x,4,2,6,x,5,x (x214x3x)
11,7,x,9,9,0,x (41x23.x)
11,7,7,9,x,x,7 (3112xx1)
11,7,7,x,9,x,0 (412x3x.)
11,7,11,x,9,x,0 (314x2x.)
11,x,7,9,9,0,x (4x123.x)
11,7,x,9,9,x,0 (41x23x.)
11,x,7,9,9,x,0 (4x123x.)
11,7,11,x,9,0,x (314x2.x)
11,7,7,9,x,9,x (4112x3x)
11,7,7,x,9,0,x (412x3.x)
x,4,7,x,x,0,4 (x13xx.2)
x,4,7,x,x,0,7 (x12xx.3)
11,x,11,9,x,9,0 (3x41x2.)
11,x,x,9,9,9,0 (4xx123.)
11,x,7,9,9,x,7 (4x123x1)
x,x,11,9,x,x,0 (xx21xx.)
11,7,x,9,9,x,7 (41x23x1)
x,x,11,9,9,x,x (xx211xx)
11,7,7,x,x,9,0 (412xx3.)
11,7,11,x,x,9,0 (314xx2.)
11,x,7,9,x,9,7 (4x12x31)
11,7,x,9,x,9,0 (41x2x3.)
11,x,7,9,x,9,0 (4x12x3.)
11,x,7,x,9,9,7 (4x1x231)
11,7,11,x,9,x,7 (314x2x1)
11,7,x,x,9,9,0 (41xx23.)
11,7,x,x,9,9,7 (41xx231)
x,4,7,6,x,x,7 (x132xx4)
x,4,7,x,x,5,7 (x13xx24)
x,4,x,6,x,5,7 (x1x3x24)
11,7,7,x,x,0,7 (412xx.3)
11,x,7,x,9,0,7 (4x1x3.2)
11,x,11,x,9,0,7 (3x4x2.1)
11,x,x,9,9,0,7 (4xx23.1)
11,x,7,9,x,0,7 (4x13x.2)
11,7,x,x,9,0,7 (41xx3.2)
x,x,11,x,9,0,x (xx2x1.x)
x,x,11,x,9,x,7 (xx3x2x1)
x,4,x,x,x,0,0 (x1xxx..)
x,4,2,2,x,x,x (x211xxx)
x,4,2,x,x,x,0 (x21xxx.)
x,4,x,2,x,0,x (x2x1x.x)
x,4,x,x,4,x,0 (x1xx2x.)
11,x,11,x,x,0,0 (1x2xx..)
11,7,x,x,x,0,0 (21xxx..)
x,4,7,x,x,0,x (x12xx.x)
x,4,x,x,4,5,x (x1xx12x)
11,x,7,x,x,0,0 (2x1xx..)
x,4,x,2,4,x,x (x2x13xx)
x,4,7,x,4,x,x (x12x1xx)
11,x,x,9,x,0,0 (2xx1x..)
11,7,7,9,x,x,x (3112xxx)
11,7,11,x,x,x,0 (213xxx.)
11,7,7,x,x,0,x (312xx.x)
11,7,7,x,x,x,0 (312xxx.)
11,x,11,9,9,x,x (2x311xx)
11,x,11,9,x,x,0 (2x31xx.)
11,x,x,x,9,0,0 (2xxx1..)
11,x,x,9,9,9,x (2xx111x)
11,7,7,x,9,x,x (311x2xx)
11,7,x,9,x,x,0 (31x2xx.)
11,x,7,9,x,0,x (3x12x.x)
11,x,7,9,x,x,0 (3x12xx.)
x,4,2,x,x,5,x (x21xx3x)
11,x,11,x,9,0,x (2x3x1.x)
11,x,x,9,9,x,0 (3xx12x.)
11,x,x,9,9,0,x (3xx12.x)
11,7,7,x,x,9,x (311xx2x)
11,x,7,x,9,0,x (3x1x2.x)
11,7,x,x,9,0,x (31xx2.x)
11,7,x,x,9,x,0 (31xx2x.)
11,7,7,x,x,x,7 (211xxx1)
11,x,x,9,x,9,0 (3xx1x2.)
11,7,11,x,9,x,x (314x2xx)
11,7,x,x,x,9,0 (31xxx2.)
11,7,x,9,9,x,x (41x23xx)
11,x,7,9,9,x,x (4x123xx)
11,x,7,x,x,9,7 (3x1xx21)
11,x,7,x,9,x,7 (3x1x2x1)
11,7,x,x,9,x,7 (31xx2x1)
11,x,7,9,x,x,7 (3x12xx1)
x,4,7,x,x,x,7 (x12xxx3)
x,4,x,x,x,5,7 (x1xxx23)
11,x,7,9,x,9,x (4x12x3x)
11,7,x,x,9,9,x (41xx23x)
11,x,x,x,9,0,7 (3xxx2.1)
11,x,7,x,x,0,7 (3x1xx.2)
11,x,x,9,9,x,7 (4xx23x1)
11,x,11,x,9,x,7 (3x4x2x1)
11,x,x,x,9,9,7 (4xxx231)
11,x,x,x,x,0,0 (1xxxx..)
11,7,x,x,x,x,0 (21xxxx.)
11,7,7,x,x,x,x (211xxxx)
11,x,7,x,x,0,x (2x1xx.x)
11,x,x,9,x,x,0 (2xx1xx.)
11,x,x,9,9,x,x (2xx11xx)
11,x,x,x,9,0,x (2xxx1.x)
11,x,7,9,x,x,x (3x12xxx)
11,x,7,x,x,x,7 (2x1xxx1)
11,7,x,x,9,x,x (31xx2xx)
11,x,x,x,9,x,7 (3xxx2x1)

Riepilogo

  • L'accordo Solm#5 contiene le note: Sol, Si♭, Re♯
  • In accordatura Drop G#/Ab ci sono 241 posizioni disponibili
  • Scritto anche come: Sol-#5
  • Ogni diagramma mostra la posizione delle dita sulla tastiera della 7-String Guitar

Domande frequenti

Cos'è l'accordo Solm#5 alla 7-String Guitar?

Solm#5 è un accordo Sol m#5. Contiene le note Sol, Si♭, Re♯. Alla 7-String Guitar in accordatura Drop G#/Ab, ci sono 241 modi per suonare questo accordo.

Come si suona Solm#5 alla 7-String Guitar?

Per suonare Solm#5 in accordatura Drop G#/Ab, usa una delle 241 posizioni sopra. Ogni diagramma mostra la posizione delle dita sulla tastiera.

Quali note contiene l'accordo Solm#5?

L'accordo Solm#5 contiene le note: Sol, Si♭, Re♯.

Quante posizioni ci sono per Solm#5?

In accordatura Drop G#/Ab ci sono 241 posizioni per l'accordo Solm#5. Ciascuna usa una posizione diversa sulla tastiera con le stesse note: Sol, Si♭, Re♯.

Quali altri nomi ha Solm#5?

Solm#5 è anche conosciuto come Sol-#5. Sono notazioni diverse per lo stesso accordo: Sol, Si♭, Re♯.