Sol#mM7 acorde de guitarra — diagrama y tablatura en afinación fake 8 string

Respuesta corta: Sol#mM7 es un acorde Sol# minmaj7 con las notas Sol♯, Si, Re♯, Fax. En afinación fake 8 string hay 266 posiciones. Ver diagramas abajo.

También conocido como: Sol#m#7, Sol#-M7, Sol#−Δ7, Sol#−Δ, Sol# minmaj7

Acordes de pianoInstrumentosAfinaciones

Cómo tocar Sol#mM7 en 7-String Guitar

Sol#mM7, Sol#m#7, Sol#-M7, Sol#−Δ7, Sol#−Δ, Sol#minmaj7

Notas: Sol♯, Si, Re♯, Fax

4,6,4,6,5,4,4 (1314211)
x,2,4,2,1,0,0 (x2431..)
x,6,4,6,6,0,0 (x2134..)
x,6,4,6,5,0,0 (x3142..)
x,x,4,2,1,0,0 (xx321..)
x,2,4,6,6,0,0 (x1234..)
x,6,4,2,6,0,0 (x3214..)
x,2,4,6,5,0,0 (x1243..)
x,6,4,2,5,0,0 (x4213..)
x,6,4,6,5,4,4 (x314211)
x,x,4,6,6,0,0 (xx123..)
x,x,4,6,5,0,0 (xx132..)
x,x,4,6,5,4,4 (xx13211)
x,x,4,6,5,4,0 (xx1432.)
x,x,4,2,1,0,4 (xx321.4)
x,x,4,2,5,0,4 (xx214.3)
x,x,4,2,6,0,4 (xx214.3)
x,x,4,6,5,8,0 (xx1324.)
x,x,4,6,6,4,8 (xx12314)
x,x,4,6,5,4,8 (xx13214)
x,x,x,11,9,8,8 (xxx3211)
4,x,4,2,1,0,0 (3x421..)
4,2,4,x,1,0,0 (324x1..)
4,2,3,x,1,0,0 (423x1..)
4,x,3,2,1,0,0 (4x321..)
4,6,4,6,x,0,0 (1324x..)
4,2,x,2,1,0,0 (42x31..)
4,6,3,6,x,0,0 (2314x..)
4,2,4,6,x,0,0 (2134x..)
4,2,3,6,x,0,0 (3124x..)
4,6,3,2,x,0,0 (3421x..)
4,6,4,2,x,0,0 (2431x..)
4,6,4,x,6,0,0 (132x4..)
4,6,7,6,x,0,0 (1243x..)
4,6,x,6,6,0,0 (12x34..)
4,6,4,6,5,4,x (131421x)
4,6,x,6,5,0,0 (13x42..)
4,x,4,6,6,0,0 (1x234..)
4,x,4,6,5,0,0 (1x243..)
4,x,4,6,5,4,4 (1x13211)
4,6,4,x,5,0,0 (142x3..)
4,6,4,x,5,4,4 (131x211)
x,6,4,6,x,0,0 (x213x..)
x,2,4,x,1,0,0 (x23x1..)
4,6,3,x,5,0,0 (241x3..)
4,x,3,6,6,0,0 (2x134..)
4,6,3,x,6,0,0 (231x4..)
4,x,3,6,5,0,0 (2x143..)
4,6,x,2,5,0,0 (24x13..)
4,2,x,6,5,0,0 (21x43..)
4,2,x,6,6,0,0 (21x34..)
4,6,x,2,6,0,0 (23x14..)
x,2,4,6,x,0,0 (x123x..)
4,6,x,6,5,4,4 (13x4211)
4,x,7,6,6,0,0 (1x423..)
x,6,4,2,x,0,0 (x321x..)
4,x,7,6,5,0,0 (1x432..)
4,6,7,x,6,0,0 (124x3..)
4,6,7,x,5,0,0 (134x2..)
x,2,4,2,1,0,x (x2431.x)
x,6,4,x,6,0,0 (x21x3..)
x,6,4,x,5,0,0 (x31x2..)
x,x,4,x,1,0,0 (xx2x1..)
x,x,4,6,x,0,0 (xx12x..)
4,6,7,x,5,4,4 (134x211)
4,x,7,6,5,4,4 (1x43211)
x,6,4,6,5,4,x (x31421x)
x,6,4,6,5,x,0 (x3142x.)
x,6,4,x,5,4,4 (x31x211)
x,x,4,2,1,0,x (xx321.x)
x,x,4,x,5,4,4 (xx1x211)
4,6,4,x,5,4,8 (131x214)
x,6,4,2,5,x,0 (x4213x.)
x,2,4,2,x,0,4 (x132x.4)
x,2,4,6,6,0,x (x1234.x)
4,x,4,6,6,4,8 (1x12314)
4,6,4,6,x,4,8 (1213x14)
x,2,4,2,5,x,4 (x1214x3)
4,6,4,x,6,4,8 (121x314)
x,2,4,6,5,x,0 (x1243x.)
x,2,4,6,5,0,x (x1243.x)
4,x,4,6,5,4,8 (1x13214)
x,6,4,2,6,0,x (x3214.x)
x,6,4,2,5,0,x (x4213.x)
x,2,4,x,1,0,4 (x23x1.4)
x,6,4,x,5,4,0 (x41x32.)
x,x,4,6,5,x,0 (xx132x.)
x,x,4,6,5,4,x (xx1321x)
x,2,4,x,5,0,4 (x12x4.3)
x,x,4,2,x,0,4 (xx21x.3)
x,2,4,x,6,0,4 (x12x4.3)
x,2,4,6,x,0,4 (x124x.3)
x,6,4,2,x,0,4 (x421x.3)
x,6,4,x,5,4,8 (x31x214)
x,6,4,6,x,4,8 (x213x14)
x,6,4,x,6,4,8 (x21x314)
x,6,4,x,5,8,0 (x31x24.)
x,x,4,2,5,x,4 (xx214x3)
x,x,4,6,x,4,8 (xx12x13)
x,x,4,x,5,8,0 (xx1x23.)
x,11,x,10,9,8,0 (x4x321.)
x,11,x,10,9,8,8 (x4x3211)
x,11,x,11,9,8,8 (x3x4211)
4,6,4,x,x,0,0 (132xx..)
4,6,3,x,x,0,0 (231xx..)
4,6,x,6,x,0,0 (12x3x..)
4,x,x,2,1,0,0 (3xx21..)
4,2,x,x,1,0,0 (32xx1..)
4,x,3,x,1,0,0 (3x2x1..)
4,6,7,x,x,0,0 (123xx..)
4,x,4,6,x,0,0 (1x23x..)
4,x,4,x,1,0,0 (2x3x1..)
4,x,4,x,5,4,4 (1x1x211)
x,6,4,x,x,0,0 (x21xx..)
4,x,3,6,x,0,0 (2x13x..)
4,2,x,6,x,0,0 (21x3x..)
4,6,x,2,x,0,0 (23x1x..)
4,x,3,2,1,1,x (4x3211x)
4,6,4,x,5,4,x (131x21x)
4,x,4,6,5,4,x (1x1321x)
4,x,4,2,1,0,x (3x421.x)
4,x,x,6,6,0,0 (1xx23..)
4,x,3,2,1,0,x (4x321.x)
4,6,x,x,5,0,0 (13xx2..)
4,2,x,2,1,0,x (42x31.x)
4,6,x,x,6,0,0 (12xx3..)
4,2,4,x,1,0,x (324x1.x)
4,2,3,x,1,x,0 (423x1x.)
4,x,x,6,5,0,0 (1xx32..)
4,2,3,x,1,1,x (423x11x)
4,2,3,x,1,0,x (423x1.x)
4,x,3,2,1,x,0 (4x321x.)
4,x,7,6,x,0,0 (1x32x..)
4,6,3,6,x,x,0 (2314xx.)
4,2,4,6,x,0,x (2134x.x)
4,2,3,6,x,x,0 (3124xx.)
4,6,3,2,x,x,0 (3421xx.)
4,6,3,2,x,0,x (3421x.x)
4,2,3,2,x,x,4 (3121xx4)
4,6,4,2,x,0,x (2431x.x)
4,2,3,6,x,0,x (3124x.x)
4,6,7,6,x,0,x (1243x.x)
4,6,x,6,5,x,0 (13x42x.)
4,x,4,6,5,x,0 (1x243x.)
4,6,4,x,5,x,0 (142x3x.)
4,x,x,6,5,4,4 (1xx3211)
4,x,3,x,1,4,0 (3x2x14.)
4,6,x,6,5,4,x (13x421x)
4,6,x,x,5,4,4 (13xx211)
4,x,3,x,1,1,0 (4x3x12.)
4,x,3,6,6,x,0 (2x134x.)
4,6,3,x,6,x,0 (231x4x.)
x,2,4,x,1,0,x (x23x1.x)
4,x,3,6,5,x,0 (2x143x.)
4,6,3,x,5,x,0 (241x3x.)
4,6,x,2,6,0,x (23x14.x)
4,6,x,2,5,0,x (24x13.x)
4,x,3,2,x,0,4 (3x21x.4)
4,2,x,2,x,0,4 (31x2x.4)
4,2,x,6,6,0,x (21x34.x)
4,2,4,x,x,0,4 (213xx.4)
4,2,3,x,x,0,4 (312xx.4)
4,6,x,2,5,x,0 (24x13x.)
4,2,x,2,5,x,4 (21x14x3)
4,2,x,6,5,0,x (21x43.x)
4,x,4,2,x,0,4 (2x31x.4)
4,2,x,6,5,x,0 (21x43x.)
4,x,7,6,5,0,x (1x432.x)
4,x,7,6,5,x,0 (1x432x.)
x,2,4,6,x,0,x (x123x.x)
4,6,7,x,5,x,0 (134x2x.)
4,x,7,x,5,4,4 (1x3x211)
x,6,4,2,x,0,x (x321x.x)
4,6,7,x,5,0,x (134x2.x)
4,x,x,2,1,0,4 (3xx21.4)
4,x,7,6,5,4,x (1x4321x)
4,2,x,x,1,0,4 (32xx1.4)
4,6,7,x,6,0,x (124x3.x)
4,6,7,x,5,4,x (134x21x)
4,6,x,x,5,4,0 (14xx32.)
4,x,x,6,5,4,0 (1xx432.)
4,x,7,6,6,0,x (1x423.x)
4,x,3,6,x,4,0 (2x14x3.)
4,6,3,x,x,4,0 (241xx3.)
x,6,4,x,5,4,x (x31x21x)
x,6,4,x,5,x,0 (x31x2x.)
4,2,x,x,5,0,4 (21xx4.3)
4,x,x,2,5,0,4 (2xx14.3)
x,2,4,x,x,0,4 (x12xx.3)
4,x,4,6,x,4,8 (1x12x13)
4,6,7,x,5,x,4 (134x2x1)
4,6,4,x,x,4,8 (121xx13)
4,x,7,6,5,x,4 (1x432x1)
4,2,x,6,x,0,4 (21x4x.3)
4,6,x,2,x,0,4 (24x1x.3)
4,2,x,x,6,0,4 (21xx4.3)
4,x,x,2,6,0,4 (2xx14.3)
4,6,7,x,x,4,8 (123xx14)
4,x,7,6,x,0,4 (1x43x.2)
4,x,x,6,5,8,0 (1xx324.)
x,6,4,2,5,x,x (x4213xx)
4,6,x,x,5,8,0 (13xx24.)
4,6,7,x,x,0,4 (134xx.2)
4,6,x,6,x,4,8 (12x3x14)
4,x,x,6,5,4,8 (1xx3214)
4,x,7,x,5,0,4 (1x4x3.2)
4,6,x,x,6,4,8 (12xx314)
4,x,7,x,5,8,4 (1x3x241)
4,x,7,x,5,8,0 (1x3x24.)
4,x,7,6,x,4,8 (1x32x14)
4,x,7,x,6,0,4 (1x4x3.2)
x,2,4,6,5,x,x (x1243xx)
4,x,4,x,5,8,0 (1x2x34.)
4,6,x,x,5,4,8 (13xx214)
4,x,x,6,6,4,8 (1xx2314)
4,6,7,x,x,0,8 (123xx.4)
4,x,7,6,x,0,8 (1x32x.4)
x,2,4,x,5,x,4 (x12x4x3)
x,6,4,x,x,4,8 (x21xx13)
x,11,x,x,9,8,8 (x3xx211)
x,11,x,10,x,8,0 (x3x2x1.)
x,11,x,10,9,8,x (x4x321x)
4,6,x,x,x,0,0 (12xxx..)
4,x,x,x,1,0,0 (2xxx1..)
4,x,x,6,x,0,0 (1xx2x..)
4,6,3,x,x,x,0 (231xxx.)
4,x,x,2,1,0,x (3xx21.x)
4,2,x,x,1,0,x (32xx1.x)
4,6,7,x,x,0,x (123xx.x)
4,x,x,x,5,4,4 (1xxx211)
4,x,3,x,1,x,0 (3x2x1x.)
4,x,3,6,x,x,0 (2x13xx.)
4,6,x,2,x,0,x (23x1x.x)
4,2,x,6,x,0,x (21x3x.x)
4,6,x,x,5,x,0 (13xx2x.)
4,x,x,6,5,x,0 (1xx32x.)
4,2,3,x,1,x,x (423x1xx)
4,x,x,6,5,4,x (1xx321x)
4,6,x,x,5,4,x (13xx21x)
4,x,3,2,1,x,x (4x321xx)
4,x,7,6,x,0,x (1x32x.x)
4,6,3,2,x,x,x (3421xxx)
4,x,x,2,x,0,4 (2xx1x.3)
4,2,3,6,x,x,x (3124xxx)
4,2,x,x,x,0,4 (21xxx.3)
4,x,3,x,1,4,x (3x2x14x)
4,x,3,x,x,4,4 (2x1xx34)
4,2,3,x,x,x,4 (312xxx4)
4,6,x,2,5,x,x (24x13xx)
4,x,3,2,x,x,4 (3x21xx4)
4,2,x,6,5,x,x (21x43xx)
4,x,7,x,5,x,4 (1x3x2x1)
4,6,7,x,5,x,x (134x2xx)
4,x,7,6,5,x,x (1x432xx)
4,x,3,6,x,4,x (2x14x3x)
4,6,3,x,x,4,x (241xx3x)
4,2,x,x,5,x,4 (21xx4x3)
4,x,x,2,5,x,4 (2xx14x3)
4,6,x,x,x,4,8 (12xxx13)
4,x,7,x,x,0,4 (1x3xx.2)
4,x,x,x,5,8,0 (1xxx23.)
4,x,x,6,x,4,8 (1xx2x13)
4,x,7,x,5,8,x (1x3x24x)
4,x,7,x,x,8,8 (1x2xx34)
4,6,7,x,x,x,8 (123xxx4)
4,x,7,6,x,x,8 (1x32xx4)

Resumen

  • El acorde Sol#mM7 contiene las notas: Sol♯, Si, Re♯, Fax
  • En afinación fake 8 string hay 266 posiciones disponibles
  • También escrito como: Sol#m#7, Sol#-M7, Sol#−Δ7, Sol#−Δ, Sol# minmaj7
  • Cada diagrama muestra la posición de los dedos en el mástil de la 7-String Guitar

Preguntas frecuentes

¿Qué es el acorde Sol#mM7 en 7-String Guitar?

Sol#mM7 es un acorde Sol# minmaj7. Contiene las notas Sol♯, Si, Re♯, Fax. En 7-String Guitar con afinación fake 8 string, hay 266 formas de tocar este acorde.

¿Cómo se toca Sol#mM7 en 7-String Guitar?

Para tocar Sol#mM7 en afinación fake 8 string, usa una de las 266 posiciones de arriba. Cada diagrama muestra la posición de los dedos en el mástil.

¿Qué notas tiene el acorde Sol#mM7?

El acorde Sol#mM7 contiene las notas: Sol♯, Si, Re♯, Fax.

¿Cuántas posiciones hay para Sol#mM7 en 7-String Guitar?

En afinación fake 8 string hay 266 posiciones para el acorde Sol#mM7. Cada una usa una posición diferente en el mástil con las mismas notas: Sol♯, Si, Re♯, Fax.

¿Qué otros nombres tiene Sol#mM7?

Sol#mM7 también se conoce como Sol#m#7, Sol#-M7, Sol#−Δ7, Sol#−Δ, Sol# minmaj7. Son diferentes notaciones para el mismo acorde: Sol♯, Si, Re♯, Fax.