Solm#5 acorde de guitarra — diagrama y tablatura en afinación Alex

Respuesta corta: Solm#5 es un acorde Sol m#5 con las notas Sol, Si♭, Re♯. En afinación Alex hay 303 posiciones. Ver diagramas abajo.

También conocido como: Sol-#5

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Cómo tocar Solm#5 en 7-String Guitar

Solm#5, Sol-#5

Notas: Sol, Si♭, Re♯

x,x,6,5,3,4,3 (xx43121)
x,x,x,5,3,4,3 (xxx3121)
x,x,6,5,0,4,6 (xx32.14)
x,x,1,5,0,4,3 (xx14.32)
x,x,x,x,3,4,3 (xxxx121)
x,x,x,5,0,4,6 (xxx2.13)
x,x,6,8,0,8,6 (xx13.42)
x,x,6,5,0,8,6 (xx21.43)
x,x,6,8,0,4,6 (xx24.13)
x,x,x,5,3,4,6 (xxx3124)
x,x,x,x,0,4,6 (xxxx.12)
x,x,x,8,0,4,6 (xxx3.12)
x,x,10,8,0,11,11 (xx21.34)
x,x,10,8,0,8,11 (xx31.24)
x,x,x,5,8,8,6 (xxx1342)
x,x,x,5,8,4,6 (xxx2413)
x,x,x,8,0,11,11 (xxx1.23)
x,x,x,8,0,8,11 (xxx1.23)
x,x,x,x,0,11,11 (xxxx.12)
x,5,x,5,3,4,3 (x3x4121)
x,5,1,5,0,4,x (x314.2x)
x,5,6,x,3,4,3 (x34x121)
x,5,6,5,3,x,3 (x2431x1)
x,5,6,5,0,x,6 (x132.x4)
x,5,1,x,0,4,3 (x41x.32)
x,5,6,x,0,4,6 (x23x.14)
x,5,x,5,0,4,6 (x2x3.14)
x,x,1,x,0,4,3 (xx1x.32)
x,8,6,8,0,8,x (x213.4x)
x,x,1,5,0,4,x (xx13.2x)
x,5,x,5,8,8,6 (x1x1342)
x,5,6,8,0,8,x (x123.4x)
x,5,6,5,8,x,6 (x1214x3)
x,x,6,x,3,4,3 (xx3x121)
x,8,6,5,0,8,x (x321.4x)
x,x,6,5,3,x,3 (xx321x1)
x,5,6,5,x,8,6 (x121x43)
x,8,6,5,0,4,x (x432.1x)
x,5,6,8,0,4,x (x234.1x)
x,8,6,8,0,4,x (x324.1x)
x,x,6,5,0,x,6 (xx21.x3)
x,x,6,x,0,4,6 (xx2x.13)
x,x,1,5,3,4,x (xx1423x)
x,8,6,8,0,x,6 (x314.x2)
x,x,1,x,3,4,3 (xx1x243)
x,8,6,x,0,8,6 (x31x.42)
x,x,6,5,3,4,x (xx4312x)
x,8,6,5,0,x,6 (x421.x3)
x,5,6,x,0,8,6 (x12x.43)
x,x,6,8,0,8,x (xx12.3x)
x,5,6,8,0,x,6 (x124.x3)
x,8,x,8,0,4,6 (x3x4.12)
x,8,x,5,0,4,6 (x4x2.13)
x,x,x,5,3,4,x (xxx312x)
x,8,6,x,0,4,6 (x42x.13)
x,5,x,8,0,4,6 (x2x4.13)
x,x,1,5,x,4,3 (xx14x32)
x,x,6,8,0,4,x (xx23.1x)
x,x,6,5,x,4,6 (xx32x14)
x,x,6,x,0,8,6 (xx1x.32)
x,x,6,5,3,x,6 (xx321x4)
x,x,6,8,0,x,6 (xx13.x2)
x,8,x,8,0,11,11 (x1x2.34)
x,8,10,x,0,11,11 (x12x.34)
x,8,x,8,0,8,11 (x1x2.34)
x,x,x,8,0,4,x (xxx2.1x)
x,8,10,x,0,8,11 (x13x.24)
x,x,x,5,x,4,6 (xxx2x13)
x,8,10,8,0,x,11 (x132.x4)
x,x,6,5,8,x,6 (xx214x3)
x,x,6,5,x,8,6 (xx21x43)
x,x,10,x,0,11,11 (xx1x.23)
x,x,10,8,0,x,11 (xx21.x3)
x,x,x,5,8,x,6 (xxx13x2)
x,x,x,8,0,x,11 (xxx1.x2)
1,5,1,5,x,4,x (1314x2x)
1,x,1,5,3,4,x (1x1423x)
1,x,1,x,3,4,3 (1x1x243)
1,5,1,x,3,4,x (141x23x)
6,8,6,8,0,x,x (1324.xx)
6,5,6,8,0,x,x (2134.xx)
6,8,6,5,0,x,x (2431.xx)
6,5,6,5,x,x,6 (2131xx4)
1,5,1,x,0,4,x (142x.3x)
1,5,x,5,0,4,x (13x4.2x)
1,5,1,x,x,4,3 (141xx32)
1,x,1,5,x,4,3 (1x14x32)
1,x,1,x,0,4,3 (1x2x.43)
1,x,1,5,0,4,x (1x24.3x)
6,5,6,x,3,x,3 (324x1x1)
6,5,x,5,3,x,3 (42x31x1)
6,x,6,5,3,x,3 (3x421x1)
6,x,x,5,3,4,3 (4xx3121)
6,x,6,x,3,4,3 (3x4x121)
6,5,x,x,3,4,3 (43xx121)
6,5,x,5,0,x,6 (31x2.x4)
6,5,6,x,0,x,6 (213x.x4)
x,8,6,8,0,x,x (x213.xx)
6,x,6,5,0,x,6 (2x31.x4)
x,5,x,x,3,4,3 (x3xx121)
1,5,x,x,0,4,3 (14xx.32)
6,x,6,x,0,4,6 (2x3x.14)
x,8,6,5,0,x,x (x321.xx)
6,x,x,5,0,4,6 (3xx2.14)
1,x,x,5,0,4,3 (1xx4.32)
x,5,6,8,0,x,x (x123.xx)
x,5,6,5,x,x,6 (x121xx3)
6,5,x,x,0,4,6 (32xx.14)
6,8,6,x,0,8,x (132x.4x)
6,8,10,8,0,x,x (1243.xx)
6,8,x,8,0,8,x (12x3.4x)
x,5,1,x,0,4,x (x31x.2x)
6,x,6,8,0,8,x (1x23.4x)
10,8,6,8,0,x,x (4213.xx)
x,5,6,x,3,x,3 (x23x1x1)
x,5,x,5,3,4,x (x3x412x)
6,5,x,5,8,x,6 (21x14x3)
6,5,x,5,x,8,6 (21x1x43)
x,x,1,x,0,4,x (xx1x.2x)
x,5,6,5,3,x,x (x2431xx)
6,5,x,8,0,8,x (21x3.4x)
6,8,x,5,0,8,x (23x1.4x)
6,5,x,8,0,4,x (32x4.1x)
6,8,6,x,0,4,x (243x.1x)
x,5,6,x,0,x,6 (x12x.x3)
6,x,6,8,0,4,x (2x34.1x)
6,8,x,5,0,4,x (34x2.1x)
x,x,6,8,0,x,x (xx12.xx)
6,8,x,8,0,4,x (23x4.1x)
6,x,6,8,0,x,6 (1x24.x3)
6,8,x,8,0,x,6 (13x4.x2)
x,5,1,5,x,4,x (x314x2x)
6,8,x,x,0,8,6 (13xx.42)
x,5,x,x,0,4,6 (x2xx.13)
6,x,6,x,0,8,6 (1x2x.43)
6,8,6,x,0,x,6 (142x.x3)
6,x,x,8,0,8,6 (1xx3.42)
x,5,1,x,3,4,x (x41x23x)
6,5,x,8,0,x,6 (21x4.x3)
6,x,x,5,0,8,6 (2xx1.43)
x,5,6,x,3,4,x (x34x12x)
6,5,x,x,0,8,6 (21xx.43)
x,8,6,x,0,8,x (x21x.3x)
6,8,x,5,0,x,6 (24x1.x3)
x,8,6,5,8,x,x (x3214xx)
x,x,6,x,0,x,6 (xx1x.x2)
x,5,6,8,8,x,x (x1234xx)
6,x,x,8,0,4,6 (2xx4.13)
x,x,6,x,3,x,3 (xx2x1x1)
x,5,x,5,8,x,6 (x1x13x2)
6,8,x,x,0,4,6 (24xx.13)
x,x,6,5,3,x,x (xx321xx)
x,5,1,x,x,4,3 (x41xx32)
x,8,6,x,0,4,x (x32x.1x)
x,8,x,5,0,4,x (x3x2.1x)
x,5,x,8,0,4,x (x2x3.1x)
x,8,x,8,0,4,x (x2x3.1x)
x,5,x,5,x,4,6 (x2x3x14)
x,5,6,x,x,4,6 (x23xx14)
6,x,10,8,0,8,x (1x42.3x)
10,x,6,8,0,8,x (4x12.3x)
6,8,10,x,0,8,x (124x.3x)
10,8,6,x,0,8,x (421x.3x)
x,x,1,5,x,4,x (xx13x2x)
x,8,6,x,0,x,6 (x31x.x2)
x,5,x,x,3,4,6 (x3xx124)
x,5,6,x,3,x,6 (x23x1x4)
x,x,1,x,x,4,3 (xx1xx32)
10,x,10,x,0,11,11 (1x2x.34)
x,8,x,5,8,8,x (x2x134x)
x,5,x,8,8,8,x (x1x234x)
x,8,6,5,x,8,x (x321x4x)
x,5,6,8,x,8,x (x123x4x)
6,x,10,x,0,8,6 (1x4x.32)
10,x,6,x,0,8,6 (4x1x.32)
10,x,6,8,0,x,6 (4x13.x2)
x,8,x,x,0,4,6 (x3xx.12)
x,5,x,8,8,4,x (x2x341x)
x,x,6,5,x,x,6 (xx21xx3)
10,8,6,x,0,x,6 (431x.x2)
x,8,x,5,8,4,x (x3x241x)
6,8,10,x,0,x,6 (134x.x2)
x,8,6,5,x,4,x (x432x1x)
x,5,6,8,x,4,x (x234x1x)
6,x,10,8,0,x,6 (1x43.x2)
10,8,x,8,0,x,11 (31x2.x4)
10,8,10,x,0,x,11 (213x.x4)
10,8,x,x,0,11,11 (21xx.34)
10,8,x,x,0,8,11 (31xx.24)
10,x,10,8,0,x,11 (2x31.x4)
10,x,x,8,0,11,11 (2xx1.34)
10,x,x,8,0,8,11 (3xx1.24)
x,8,6,5,x,x,6 (x421xx3)
x,5,6,8,x,x,6 (x124xx3)
x,5,6,x,x,8,6 (x12xx43)
x,5,x,x,8,8,6 (x1xx342)
x,8,x,5,8,x,6 (x3x14x2)
x,5,x,8,8,x,6 (x1x34x2)
x,5,6,x,8,x,6 (x12x4x3)
x,8,x,5,x,4,6 (x4x2x13)
x,5,x,x,8,4,6 (x2xx413)
x,5,x,8,x,4,6 (x2x4x13)
x,8,10,x,0,x,11 (x12x.x3)
x,8,x,x,0,11,11 (x1xx.23)
x,8,x,8,0,x,11 (x1x2.x3)
x,8,x,x,0,8,11 (x1xx.23)
6,8,6,x,0,x,x (132x.xx)
1,x,1,5,x,4,x (1x13x2x)
1,x,1,x,x,4,3 (1x1xx32)
1,5,1,x,x,4,x (131xx2x)
1,x,1,x,0,4,x (1x2x.3x)
6,8,x,8,0,x,x (12x3.xx)
6,x,6,8,0,x,x (1x23.xx)
x,8,6,x,0,x,x (x21x.xx)
6,5,x,5,x,x,6 (21x1xx3)
6,5,x,8,0,x,x (21x3.xx)
6,8,x,5,0,x,x (23x1.xx)
1,5,x,x,0,4,x (13xx.2x)
1,x,x,5,0,4,x (1xx3.2x)
1,x,x,x,0,4,3 (1xxx.32)
6,x,6,5,3,x,x (3x421xx)
6,5,6,x,3,x,x (324x1xx)
6,x,x,x,3,4,3 (3xxx121)
6,5,x,5,3,x,x (42x31xx)
6,5,x,x,3,x,3 (32xx1x1)
6,x,6,x,0,x,6 (1x2x.x3)
6,x,6,x,3,x,3 (2x3x1x1)
10,8,6,x,0,x,x (321x.xx)
6,8,10,x,0,x,x (123x.xx)
6,x,x,5,3,x,3 (3xx21x1)
6,5,x,x,0,x,6 (21xx.x3)
6,x,x,5,0,x,6 (2xx1.x3)
6,5,6,8,x,x,x (2134xxx)
6,8,6,5,x,x,x (2431xxx)
1,x,x,5,3,4,x (1xx423x)
1,5,x,5,x,4,x (13x4x2x)
6,x,x,x,0,4,6 (2xxx.13)
1,5,x,x,3,4,x (14xx23x)
1,x,x,x,3,4,3 (1xxx243)
6,x,x,5,3,4,x (4xx312x)
10,x,6,8,0,x,x (3x12.xx)
6,x,10,8,0,x,x (1x32.xx)
6,8,x,x,0,8,x (12xx.3x)
6,x,x,8,0,8,x (1xx2.3x)
6,5,x,x,3,4,x (43xx12x)
x,5,6,x,3,x,x (x23x1xx)
6,8,x,5,8,x,x (23x14xx)
x,5,x,x,3,4,x (x3xx12x)
6,5,x,8,8,x,x (21x34xx)
6,x,6,5,x,x,6 (2x31xx4)
6,5,6,x,x,x,6 (213xxx4)
1,5,x,x,x,4,3 (14xxx32)
1,x,x,5,x,4,3 (1xx4x32)
6,8,x,x,0,4,x (23xx.1x)
6,x,x,8,0,4,x (2xx3.1x)
x,8,6,5,x,x,x (x321xxx)
x,5,6,8,x,x,x (x123xxx)
6,x,x,5,x,4,6 (3xx2x14)
6,5,x,x,x,4,6 (32xxx14)
6,8,x,x,0,x,6 (13xx.x2)
6,x,x,8,0,x,6 (1xx3.x2)
6,x,x,5,3,x,6 (3xx21x4)
6,x,x,x,0,8,6 (1xxx.32)
6,5,x,x,3,x,6 (32xx1x4)
x,5,1,x,x,4,x (x31xx2x)
6,5,x,8,x,8,x (21x3x4x)
6,8,x,5,x,8,x (23x1x4x)
6,8,x,5,x,4,x (34x2x1x)
x,5,6,x,x,x,6 (x12xxx3)
6,5,x,8,x,4,x (32x4x1x)
x,5,x,8,8,x,x (x1x23xx)
x,8,x,5,8,x,x (x2x13xx)
x,5,x,x,x,4,6 (x2xxx13)
x,8,x,x,0,4,x (x2xx.1x)
6,5,x,8,x,x,6 (21x4xx3)
6,8,x,5,x,x,6 (24x1xx3)
6,5,x,x,x,8,6 (21xxx43)
6,x,x,5,8,x,6 (2xx14x3)
6,x,x,5,x,8,6 (2xx1x43)
6,5,x,x,8,x,6 (21xx4x3)
10,x,x,x,0,11,11 (1xxx.23)
x,8,x,5,x,4,x (x3x2x1x)
10,x,6,x,0,x,6 (3x1x.x2)
6,x,10,x,0,x,6 (1x3x.x2)
x,5,x,8,x,4,x (x2x3x1x)
10,x,x,8,0,x,11 (2xx1.x3)
10,8,x,x,0,x,11 (21xx.x3)
x,5,x,x,8,x,6 (x1xx3x2)
x,8,x,x,0,x,11 (x1xx.x2)
6,8,x,x,0,x,x (12xx.xx)
1,x,x,x,0,4,x (1xxx.2x)
6,x,x,8,0,x,x (1xx2.xx)
6,x,x,5,3,x,x (3xx21xx)
6,x,x,x,0,x,6 (1xxx.x2)
6,5,x,x,3,x,x (32xx1xx)
6,x,x,x,3,x,3 (2xxx1x1)
6,5,x,8,x,x,x (21x3xxx)
6,8,x,5,x,x,x (23x1xxx)
1,5,x,x,x,4,x (13xxx2x)
1,x,x,x,x,4,3 (1xxxx32)
1,x,x,5,x,4,x (1xx3x2x)
6,5,x,x,x,x,6 (21xxxx3)
6,x,x,5,x,x,6 (2xx1xx3)

Resumen

  • El acorde Solm#5 contiene las notas: Sol, Si♭, Re♯
  • En afinación Alex hay 303 posiciones disponibles
  • También escrito como: Sol-#5
  • Cada diagrama muestra la posición de los dedos en el mástil de la 7-String Guitar

Preguntas frecuentes

¿Qué es el acorde Solm#5 en 7-String Guitar?

Solm#5 es un acorde Sol m#5. Contiene las notas Sol, Si♭, Re♯. En 7-String Guitar con afinación Alex, hay 303 formas de tocar este acorde.

¿Cómo se toca Solm#5 en 7-String Guitar?

Para tocar Solm#5 en afinación Alex, usa una de las 303 posiciones de arriba. Cada diagrama muestra la posición de los dedos en el mástil.

¿Qué notas tiene el acorde Solm#5?

El acorde Solm#5 contiene las notas: Sol, Si♭, Re♯.

¿Cuántas posiciones hay para Solm#5 en 7-String Guitar?

En afinación Alex hay 303 posiciones para el acorde Solm#5. Cada una usa una posición diferente en el mástil con las mismas notas: Sol, Si♭, Re♯.

¿Qué otros nombres tiene Solm#5?

Solm#5 también se conoce como Sol-#5. Son diferentes notaciones para el mismo acorde: Sol, Si♭, Re♯.