Sol7b13 accord de guitare — schéma et tablature en accordage Modal D

Réponse courte : Sol7b13 est un accord Sol 7b13 avec les notes Sol, Si, Ré, Fa, Mi♭. En accordage Modal D, il y a 294 positions. Voir les diagrammes ci-dessous.

Aussi connu sous : Sol7-13

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Comment jouer Sol7b13 au Mandolin

Sol7b13, Sol7-13

Notes: Sol, Si, Ré, Fa, Mi♭

x,x,3,5,2,6,0,0 (xx2314..)
x,x,3,5,6,2,0,0 (xx2341..)
x,10,0,9,8,6,0,0 (x4.321..)
x,10,0,9,6,8,0,0 (x4.312..)
x,x,0,5,2,6,3,0 (xx.3142.)
x,x,0,5,6,2,3,0 (xx.3412.)
x,x,0,5,2,6,0,3 (xx.314.2)
x,x,9,5,6,8,0,0 (xx4123..)
x,x,0,5,6,2,0,3 (xx.341.2)
x,x,9,5,8,6,0,0 (xx4132..)
x,x,0,5,8,6,9,0 (xx.1324.)
x,x,0,5,6,8,9,0 (xx.1234.)
x,x,x,5,2,6,3,0 (xxx3142.)
x,x,x,5,6,2,3,0 (xxx3412.)
x,x,0,5,8,6,0,9 (xx.132.4)
x,x,0,5,6,8,0,9 (xx.123.4)
x,x,x,5,6,2,0,3 (xxx341.2)
x,x,x,5,2,6,0,3 (xxx314.2)
x,x,x,5,8,6,9,0 (xxx1324.)
x,x,x,5,6,8,9,0 (xxx1234.)
x,x,x,5,6,8,0,9 (xxx123.4)
x,x,x,5,8,6,0,9 (xxx132.4)
6,10,0,9,8,x,0,0 (14.32x..)
8,10,0,9,6,x,0,0 (24.31x..)
6,10,0,9,x,8,0,0 (14.3x2..)
8,10,0,9,x,6,0,0 (24.3x1..)
5,x,5,5,6,8,9,5 (1x112341)
6,x,9,5,8,5,5,5 (2x413111)
8,x,9,5,5,6,5,5 (3x411211)
8,x,5,5,5,6,5,9 (3x111214)
5,x,9,5,8,6,5,5 (1x413211)
6,x,9,5,5,8,5,5 (2x411311)
5,x,9,5,6,8,5,5 (1x412311)
8,x,5,5,6,5,9,5 (3x112141)
6,x,5,5,8,5,9,5 (2x113141)
6,x,5,5,8,5,5,9 (2x113114)
6,x,5,5,5,8,5,9 (2x111314)
5,x,5,5,6,8,5,9 (1x112314)
8,x,5,5,5,6,9,5 (3x111241)
8,x,9,5,6,5,5,5 (3x412111)
5,x,5,5,8,6,5,9 (1x113214)
5,x,5,5,8,6,9,5 (1x113241)
6,x,5,5,5,8,9,5 (2x111341)
8,x,5,5,6,5,5,9 (3x112114)
x,x,3,5,2,6,0,x (xx2314.x)
x,x,3,5,6,2,x,0 (xx2341x.)
x,x,3,5,2,6,x,0 (xx2314x.)
x,x,3,5,6,2,0,x (xx2341.x)
x,10,9,x,8,6,0,0 (x43x21..)
x,x,3,5,x,2,1,0 (xx34x21.)
x,10,0,9,6,8,0,x (x4.312.x)
x,10,x,9,6,8,0,0 (x4x312..)
x,10,0,9,8,6,0,x (x4.321.x)
x,10,x,9,8,6,0,0 (x4x321..)
x,x,3,5,2,x,1,0 (xx342x1.)
x,10,0,9,6,8,x,0 (x4.312x.)
x,x,1,5,2,x,3,0 (xx142x3.)
x,10,0,9,8,6,x,0 (x4.321x.)
x,x,1,5,x,2,3,0 (xx14x23.)
x,10,9,x,6,8,0,0 (x43x12..)
x,x,0,5,2,6,3,x (xx.3142x)
x,x,0,5,6,2,3,x (xx.3412x)
x,x,0,5,x,2,3,1 (xx.4x231)
x,10,0,x,8,6,9,0 (x4.x213.)
x,10,0,x,6,8,9,0 (x4.x123.)
x,x,0,5,2,x,1,3 (xx.42x13)
x,x,3,5,2,x,0,1 (xx342x.1)
x,x,3,5,x,2,0,1 (xx34x2.1)
x,x,1,5,2,x,0,3 (xx142x.3)
x,x,0,5,2,x,3,1 (xx.42x31)
x,x,1,5,x,2,0,3 (xx14x2.3)
x,x,0,5,x,2,1,3 (xx.4x213)
x,x,9,5,8,6,x,0 (xx4132x.)
x,x,0,5,6,2,x,3 (xx.341x2)
x,x,9,5,8,6,0,x (xx4132.x)
x,x,9,5,6,8,0,x (xx4123.x)
x,x,9,5,6,8,x,0 (xx4123x.)
x,x,0,5,2,6,x,3 (xx.314x2)
x,10,0,x,6,8,0,9 (x4.x12.3)
x,10,0,x,8,6,0,9 (x4.x21.3)
x,x,0,5,8,6,9,x (xx.1324x)
x,x,0,5,6,8,9,x (xx.1234x)
x,x,0,5,8,6,x,9 (xx.132x4)
x,x,0,5,6,8,x,9 (xx.123x4)
2,x,3,5,6,x,0,0 (1x234x..)
6,x,3,5,2,x,0,0 (4x231x..)
6,x,3,5,x,2,0,0 (4x23x1..)
2,x,3,5,x,6,0,0 (1x23x4..)
6,x,9,5,8,x,0,0 (2x413x..)
8,x,9,5,6,x,0,0 (3x412x..)
2,x,0,5,6,x,3,0 (1x.34x2.)
2,x,0,5,x,6,3,0 (1x.3x42.)
6,x,0,5,2,x,3,0 (4x.31x2.)
6,x,0,5,x,2,3,0 (4x.3x12.)
6,10,0,9,8,x,x,0 (14.32xx.)
8,10,0,9,6,x,x,0 (24.31xx.)
6,10,x,9,8,x,0,0 (14x32x..)
8,10,0,9,6,x,0,x (24.31x.x)
6,10,9,x,8,x,0,0 (143x2x..)
8,10,x,9,6,x,0,0 (24x31x..)
8,10,9,x,6,x,0,0 (243x1x..)
6,10,0,9,8,x,0,x (14.32x.x)
8,x,5,5,6,5,9,x (3x11214x)
8,x,9,5,5,6,5,x (3x41121x)
2,x,0,5,x,6,0,3 (1x.3x4.2)
6,x,0,5,2,x,0,3 (4x.31x.2)
5,x,5,5,8,6,9,x (1x11324x)
6,x,9,5,5,8,5,x (2x41131x)
5,x,9,5,6,8,5,x (1x41231x)
8,x,5,5,5,6,9,x (3x11124x)
8,x,9,5,x,6,0,0 (3x41x2..)
6,x,9,5,8,5,5,x (2x41311x)
6,x,5,5,5,8,9,x (2x11134x)
8,x,9,5,6,5,5,x (3x41211x)
5,x,9,5,8,6,5,x (1x41321x)
5,x,5,5,6,8,9,x (1x11234x)
6,x,5,5,8,5,9,x (2x11314x)
6,x,0,5,x,2,0,3 (4x.3x1.2)
6,x,9,5,x,8,0,0 (2x41x3..)
2,x,0,5,6,x,0,3 (1x.34x.2)
6,10,0,9,x,8,0,x (14.3x2.x)
6,10,0,9,x,8,x,0 (14.3x2x.)
8,10,0,9,x,6,x,0 (24.3x1x.)
8,10,0,9,x,6,0,x (24.3x1.x)
8,10,9,x,x,6,0,0 (243xx1..)
6,10,x,9,x,8,0,0 (14x3x2..)
6,10,9,x,x,8,0,0 (143xx2..)
8,10,x,9,x,6,0,0 (24x3x1..)
5,x,x,5,6,8,5,9 (1xx12314)
5,x,9,5,8,6,x,5 (1x4132x1)
8,x,5,5,6,5,x,9 (3x1121x4)
8,x,5,5,5,6,x,9 (3x1112x4)
6,x,5,5,8,5,x,9 (2x1131x4)
6,x,5,5,5,8,x,9 (2x1113x4)
6,x,9,5,8,5,x,5 (2x4131x1)
5,x,5,5,8,6,x,9 (1x1132x4)
6,x,x,5,8,5,9,5 (2xx13141)
5,x,5,5,6,8,x,9 (1x1123x4)
8,x,x,5,6,5,5,9 (3xx12114)
8,x,x,5,6,5,9,5 (3xx12141)
5,x,x,5,6,8,9,5 (1xx12341)
8,x,0,5,6,x,9,0 (3x.12x4.)
5,x,9,5,6,8,x,5 (1x4123x1)
6,x,x,5,5,8,5,9 (2xx11314)
6,x,x,5,5,8,9,5 (2xx11341)
6,x,0,5,8,x,9,0 (2x.13x4.)
6,x,x,5,8,5,5,9 (2xx13114)
8,x,x,5,5,6,5,9 (3xx11214)
5,x,x,5,8,6,9,5 (1xx13241)
8,x,0,5,x,6,9,0 (3x.1x24.)
5,x,x,5,8,6,5,9 (1xx13214)
8,x,9,5,5,6,x,5 (3x4112x1)
8,x,9,5,6,5,x,5 (3x4121x1)
6,x,0,5,x,8,9,0 (2x.1x34.)
6,x,9,5,5,8,x,5 (2x4113x1)
8,x,x,5,5,6,9,5 (3xx11241)
6,10,0,x,x,8,9,0 (14.xx23.)
8,10,0,x,x,6,9,0 (24.xx13.)
8,10,0,x,6,x,9,0 (24.x1x3.)
6,10,0,x,8,x,9,0 (14.x2x3.)
6,x,0,5,x,8,0,9 (2x.1x3.4)
8,x,0,5,6,x,0,9 (3x.12x.4)
8,x,0,5,x,6,0,9 (3x.1x2.4)
6,x,0,5,8,x,0,9 (2x.13x.4)
6,10,0,x,x,8,0,9 (14.xx2.3)
8,10,0,x,x,6,0,9 (24.xx1.3)
8,10,0,x,6,x,0,9 (24.x1x.3)
6,10,0,x,8,x,0,9 (14.x2x.3)
x,10,9,x,8,6,0,x (x43x21.x)
x,10,x,9,8,6,x,0 (x4x321x.)
x,10,9,x,8,6,x,0 (x43x21x.)
x,10,9,x,6,8,0,x (x43x12.x)
x,10,0,9,8,6,x,x (x4.321xx)
x,10,0,9,6,8,x,x (x4.312xx)
x,10,x,9,6,8,0,x (x4x312.x)
x,10,x,9,6,8,x,0 (x4x312x.)
x,10,9,x,6,8,x,0 (x43x12x.)
x,10,x,9,8,6,0,x (x4x321.x)
x,10,0,x,8,6,9,x (x4.x213x)
x,10,x,x,6,8,9,0 (x4xx123.)
x,10,x,x,8,6,9,0 (x4xx213.)
x,10,0,x,6,8,9,x (x4.x123x)
x,10,0,x,6,8,x,9 (x4.x12x3)
x,10,0,x,8,6,x,9 (x4.x21x3)
x,10,x,x,8,6,0,9 (x4xx21.3)
x,10,x,x,6,8,0,9 (x4xx12.3)
6,x,3,5,2,x,0,x (4x231x.x)
6,x,3,5,2,x,x,0 (4x231xx.)
2,x,3,5,6,x,x,0 (1x234xx.)
2,x,3,5,6,x,0,x (1x234x.x)
2,x,3,5,x,6,0,x (1x23x4.x)
6,x,3,5,x,2,0,x (4x23x1.x)
6,x,3,5,x,2,x,0 (4x23x1x.)
2,x,3,5,x,6,x,0 (1x23x4x.)
2,x,3,5,x,x,1,0 (2x34xx1.)
2,x,1,5,x,x,3,0 (2x14xx3.)
6,x,x,5,2,x,3,0 (4xx31x2.)
6,x,0,5,2,x,3,x (4x.31x2x)
2,x,0,5,6,x,3,x (1x.34x2x)
2,x,x,5,6,x,3,0 (1xx34x2.)
6,x,0,5,x,2,3,x (4x.3x12x)
6,x,9,5,8,x,x,0 (2x413xx.)
8,x,9,5,6,x,0,x (3x412x.x)
2,x,0,5,x,6,3,x (1x.3x42x)
6,x,9,5,8,5,x,x (2x4131xx)
6,x,9,5,5,8,x,x (2x4113xx)
2,x,x,5,x,6,3,0 (1xx3x42.)
5,x,9,5,6,8,x,x (1x4123xx)
6,x,9,5,8,x,0,x (2x413x.x)
6,x,x,5,x,2,3,0 (4xx3x12.)
8,x,9,5,5,6,x,x (3x4112xx)
5,x,9,5,8,6,x,x (1x4132xx)
8,x,9,5,6,5,x,x (3x4121xx)
8,x,9,5,6,x,x,0 (3x412xx.)
2,x,0,5,x,x,1,3 (2x.4xx13)
2,x,1,5,x,x,0,3 (2x14xx.3)
2,x,0,5,x,x,3,1 (2x.4xx31)
2,x,3,5,x,x,0,1 (2x34xx.1)
6,10,9,x,8,x,0,x (143x2x.x)
8,10,0,9,6,x,x,x (24.31xxx)
6,10,x,9,8,x,0,x (14x32x.x)
8,10,9,x,6,x,x,0 (243x1xx.)
8,10,x,9,6,x,x,0 (24x31xx.)
6,10,9,x,8,x,x,0 (143x2xx.)
8,10,9,x,6,x,0,x (243x1x.x)
8,10,x,9,6,x,0,x (24x31x.x)
6,10,0,9,8,x,x,x (14.32xxx)
6,10,x,9,8,x,x,0 (14x32xx.)
8,x,x,5,6,5,9,x (3xx1214x)
6,x,x,5,8,5,9,x (2xx1314x)
6,x,x,5,x,2,0,3 (4xx3x1.2)
2,x,x,5,6,x,0,3 (1xx34x.2)
8,x,x,5,5,6,9,x (3xx1124x)
6,x,x,5,2,x,0,3 (4xx31x.2)
2,x,0,5,x,6,x,3 (1x.3x4x2)
6,x,9,5,x,8,x,0 (2x41x3x.)
5,x,x,5,8,6,9,x (1xx1324x)
6,x,9,5,x,8,0,x (2x41x3.x)
8,x,9,5,x,6,x,0 (3x41x2x.)
6,x,x,5,5,8,9,x (2xx1134x)
8,x,9,5,x,6,0,x (3x41x2.x)
5,x,x,5,6,8,9,x (1xx1234x)
2,x,x,5,x,6,0,3 (1xx3x4.2)
6,x,0,5,2,x,x,3 (4x.31xx2)
2,x,0,5,6,x,x,3 (1x.34xx2)
6,x,0,5,x,2,x,3 (4x.3x1x2)
8,10,x,9,x,6,0,x (24x3x1.x)
8,10,0,9,x,6,x,x (24.3x1xx)
6,10,9,x,x,8,0,x (143xx2.x)
8,10,9,x,x,6,0,x (243xx1.x)
8,10,x,9,x,6,x,0 (24x3x1x.)
6,10,x,9,x,8,0,x (14x3x2.x)
6,10,9,x,x,8,x,0 (143xx2x.)
6,10,x,9,x,8,x,0 (14x3x2x.)
6,10,0,9,x,8,x,x (14.3x2xx)
8,10,9,x,x,6,x,0 (243xx1x.)
8,x,x,5,x,6,9,0 (3xx1x24.)
8,x,x,5,5,6,x,9 (3xx112x4)
6,x,x,5,8,x,9,0 (2xx13x4.)
6,x,x,5,x,8,9,0 (2xx1x34.)
6,x,x,5,8,5,x,9 (2xx131x4)
6,x,0,5,x,8,9,x (2x.1x34x)
5,x,x,5,6,8,x,9 (1xx123x4)
5,x,x,5,8,6,x,9 (1xx132x4)
6,x,0,5,8,x,9,x (2x.13x4x)
8,x,0,5,x,6,9,x (3x.1x24x)
8,x,x,5,6,x,9,0 (3xx12x4.)
8,x,0,5,6,x,9,x (3x.12x4x)
8,x,x,5,6,5,x,9 (3xx121x4)
6,x,x,5,5,8,x,9 (2xx113x4)
8,10,x,x,x,6,9,0 (24xxx13.)
8,10,x,x,6,x,9,0 (24xx1x3.)
8,10,0,x,x,6,9,x (24.xx13x)
6,10,x,x,x,8,9,0 (14xxx23.)
6,10,0,x,x,8,9,x (14.xx23x)
8,10,0,x,6,x,9,x (24.x1x3x)
6,10,0,x,8,x,9,x (14.x2x3x)
6,10,x,x,8,x,9,0 (14xx2x3.)
6,x,x,5,x,8,0,9 (2xx1x3.4)
8,x,x,5,6,x,0,9 (3xx12x.4)
8,x,x,5,x,6,0,9 (3xx1x2.4)
8,x,0,5,6,x,x,9 (3x.12xx4)
6,x,x,5,8,x,0,9 (2xx13x.4)
6,x,0,5,8,x,x,9 (2x.13xx4)
8,x,0,5,x,6,x,9 (3x.1x2x4)
6,x,0,5,x,8,x,9 (2x.1x3x4)
6,10,x,x,x,8,0,9 (14xxx2.3)
8,10,x,x,6,x,0,9 (24xx1x.3)
8,10,0,x,x,6,x,9 (24.xx1x3)
6,10,x,x,8,x,0,9 (14xx2x.3)
6,10,0,x,8,x,x,9 (14.x2xx3)
8,10,x,x,x,6,0,9 (24xxx1.3)
8,10,0,x,6,x,x,9 (24.x1xx3)
6,10,0,x,x,8,x,9 (14.xx2x3)

Résumé

  • L'accord Sol7b13 contient les notes : Sol, Si, Ré, Fa, Mi♭
  • En accordage Modal D, il y a 294 positions disponibles
  • Aussi écrit : Sol7-13
  • Chaque diagramme montre la position des doigts sur le manche de la Mandolin

Questions fréquentes

Qu'est-ce que l'accord Sol7b13 à la Mandolin ?

Sol7b13 est un accord Sol 7b13. Il contient les notes Sol, Si, Ré, Fa, Mi♭. À la Mandolin en accordage Modal D, il y a 294 façons de jouer cet accord.

Comment jouer Sol7b13 à la Mandolin ?

Pour jouer Sol7b13 en accordage Modal D, utilisez l'une des 294 positions ci-dessus. Chaque diagramme montre la position des doigts sur le manche.

Quelles notes composent l'accord Sol7b13 ?

L'accord Sol7b13 contient les notes : Sol, Si, Ré, Fa, Mi♭.

Combien de positions existe-t-il pour Sol7b13 ?

En accordage Modal D, il y a 294 positions pour l'accord Sol7b13. Chacune utilise une position différente sur le manche avec les mêmes notes : Sol, Si, Ré, Fa, Mi♭.

Quels sont les autres noms de Sol7b13 ?

Sol7b13 est aussi connu sous le nom de Sol7-13. Ce sont différentes notations pour le même accord : Sol, Si, Ré, Fa, Mi♭.