MiØ9 accord de guitare — schéma et tablature en accordage 7S Standard

Réponse courte : MiØ9 est un accord Mi Ø9 avec les notes Mi, Sol, Si♭, Ré, Fa♯. En accordage 7S Standard, il y a 340 positions. Voir les diagrammes ci-dessous.

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Comment jouer MiØ9 au 7-String Guitar

MiØ9

Notes: Mi, Sol, Si♭, Ré, Fa♯

x,0,1,0,0,3,2 (x.1..32)
5,3,5,4,3,3,3 (3142111)
x,0,1,4,0,3,0 (x.13.2.)
x,0,9,0,0,11,0 (x.1..2.)
5,6,7,0,0,7,0 (123..4.)
x,0,7,0,0,7,6 (x.2..31)
x,0,10,0,11,11,0 (x.1.23.)
7,0,7,0,0,7,6 (2.3..41)
x,0,1,2,0,3,2 (x.12.43)
11,0,9,0,0,11,0 (2.1..3.)
11,0,10,0,11,11,0 (2.1.34.)
x,0,5,8,0,7,0 (x.13.2.)
5,2,1,0,0,3,0 (421..3.)
7,0,5,8,0,7,0 (2.14.3.)
8,0,5,8,0,7,0 (3.14.2.)
11,0,9,0,0,8,0 (3.2..1.)
7,0,7,0,0,5,6 (3.4..12)
8,0,9,0,0,11,0 (1.2..3.)
7,0,5,8,0,8,0 (2.13.4.)
x,0,5,4,0,5,6 (x.21.34)
x,0,1,4,0,3,3 (x.14.23)
x,0,1,0,0,5,2 (x.1..32)
x,0,1,4,0,3,2 (x.14.32)
8,0,7,0,0,7,6 (4.2..31)
7,0,7,0,0,8,6 (2.3..41)
5,3,7,4,3,3,3 (3142111)
x,0,9,8,7,8,0 (x.4213.)
x,x,7,4,3,3,3 (xx32111)
7,0,7,0,0,11,0 (1.2..3.)
7,0,9,0,0,11,0 (1.2..3.)
11,0,9,0,0,7,0 (3.2..1.)
11,0,7,0,0,7,0 (3.1..2.)
x,0,9,0,0,11,10 (x.1..32)
x,0,5,5,3,7,0 (x.2314.)
8,0,10,0,11,11,0 (1.2.34.)
11,0,9,0,11,8,0 (3.2.41.)
x,0,5,4,0,3,6 (x.32.14)
5,6,9,0,0,7,0 (124..3.)
11,0,10,0,11,8,0 (3.2.41.)
x,0,9,0,0,7,6 (x.3..21)
5,6,9,0,0,8,0 (124..3.)
x,0,9,0,0,8,6 (x.3..21)
8,0,9,0,11,11,0 (1.2.34.)
7,0,7,0,0,3,6 (3.4..12)
8,0,9,0,0,8,6 (2.4..31)
7,0,9,0,0,8,6 (2.4..31)
11,0,9,0,0,11,10 (3.1..42)
x,0,10,0,11,11,10 (x.1.342)
x,0,5,4,0,7,6 (x.21.43)
8,0,9,0,0,7,6 (3.4..21)
x,0,10,8,7,7,0 (x.4312.)
7,0,9,0,0,7,6 (2.4..31)
8,0,9,0,7,11,0 (2.3.14.)
11,0,10,0,7,7,0 (4.3.12.)
7,0,10,0,11,11,0 (1.2.34.)
8,0,7,0,11,11,0 (2.1.34.)
7,0,10,0,7,11,0 (1.3.24.)
x,0,5,8,0,7,6 (x.14.32)
x,0,9,0,0,5,6 (x.3..12)
11,0,7,0,11,8,0 (3.1.42.)
11,0,9,0,7,8,0 (4.3.12.)
x,0,9,8,0,8,10 (x.31.24)
11,0,9,0,0,8,10 (4.2..13)
8,0,9,0,0,5,6 (3.4..12)
x,0,7,0,3,7,3 (x.3.142)
8,0,9,0,0,11,10 (1.2..43)
x,0,9,0,9,8,6 (x.3.421)
7,0,9,0,0,5,6 (3.4..12)
x,0,9,0,7,8,6 (x.4.231)
x,0,7,4,0,3,6 (x.42.13)
x,0,5,4,0,8,6 (x.21.43)
x,0,7,8,0,7,10 (x.13.24)
x,0,9,8,0,7,10 (x.32.14)
x,x,7,4,0,3,6 (xx42.13)
7,0,9,0,0,11,10 (1.2..43)
11,0,7,0,0,7,10 (4.1..23)
11,0,9,0,0,7,10 (4.2..13)
7,0,7,0,0,11,10 (1.2..43)
x,0,9,8,0,11,10 (x.21.43)
x,0,10,0,7,7,6 (x.4.231)
x,x,7,8,0,7,10 (xx13.24)
x,0,10,0,9,7,6 (x.4.321)
11,0,9,0,0,x,0 (2.1..x.)
5,2,1,0,0,x,0 (321..x.)
x,0,1,0,0,x,2 (x.1..x2)
5,6,5,4,0,x,0 (2431.x.)
5,6,9,0,0,x,0 (123..x.)
5,3,5,4,3,3,x (314211x)
5,3,x,4,3,3,3 (31x2111)
11,0,10,0,11,x,0 (2.1.3x.)
5,6,x,0,0,7,0 (12x..3.)
5,6,5,5,7,7,x (121134x)
x,0,x,0,0,7,6 (x.x..21)
7,0,x,0,0,7,6 (2.x..31)
x,0,1,4,0,3,x (x.13.2x)
7,0,7,0,0,x,6 (2.3..x1)
x,0,1,x,0,3,2 (x.1x.32)
5,x,5,4,3,3,3 (3x42111)
8,0,x,8,7,7,0 (3.x412.)
7,0,x,8,7,8,0 (1.x324.)
5,6,7,0,0,7,x (123..4x)
x,0,9,0,0,11,x (x.1..2x)
5,x,5,5,7,7,6 (1x11342)
5,6,5,5,x,7,6 (1211x43)
5,6,5,x,0,7,0 (132x.4.)
x,0,x,4,3,3,3 (x.x4123)
7,0,x,0,0,5,6 (3.x..12)
5,6,x,4,0,3,0 (34x2.1.)
7,0,x,0,0,8,6 (2.x..31)
8,0,x,0,0,7,6 (3.x..21)
x,0,10,0,11,11,x (x.1.23x)
5,3,x,4,3,3,6 (31x2114)
x,0,5,4,0,x,6 (x.21.x3)
11,0,9,0,0,11,x (2.1..3x)
5,3,7,4,3,3,x (314211x)
5,6,x,4,3,3,3 (34x2111)
x,0,5,x,0,7,6 (x.1x.32)
5,2,1,0,0,3,x (421..3x)
x,0,5,8,0,7,x (x.13.2x)
5,2,1,0,0,5,x (321..4x)
11,0,x,0,0,7,0 (2.x..1.)
5,x,1,4,0,3,0 (4x13.2.)
5,2,1,x,0,3,0 (421x.3.)
11,0,10,0,11,11,x (2.1.34x)
7,0,x,0,0,11,0 (1.x..2.)
7,0,5,x,0,7,6 (3.1x.42)
8,0,x,0,11,11,0 (1.x.23.)
8,0,5,8,x,7,0 (3.14x2.)
5,x,5,8,0,7,0 (1x24.3.)
5,6,9,5,7,5,x (124131x)
11,0,x,0,11,8,0 (2.x.31.)
11,0,9,0,0,8,x (3.2..1x)
7,0,5,8,0,5,x (3.14.2x)
5,6,5,5,9,7,x (121143x)
x,0,9,0,0,x,6 (x.2..x1)
8,0,9,0,0,11,x (1.2..3x)
8,0,5,8,0,7,x (3.14.2x)
x,0,x,4,0,3,6 (x.x2.13)
7,0,5,8,0,7,x (2.14.3x)
7,0,5,8,x,8,0 (2.13x4.)
5,6,x,0,0,7,6 (12x..43)
7,0,5,x,0,5,6 (4.1x.23)
5,x,7,0,0,7,6 (1x3..42)
7,0,5,8,0,8,x (2.13.4x)
8,0,7,0,x,7,6 (4.2.x31)
5,3,5,x,3,7,3 (213x141)
5,x,7,4,3,3,3 (3x42111)
7,0,x,0,7,8,6 (2.x.341)
11,0,9,0,0,x,10 (3.1..x2)
8,0,x,0,7,7,6 (4.x.231)
7,0,7,0,x,8,6 (2.3.x41)
7,0,x,0,0,3,6 (3.x..12)
5,3,x,0,3,7,0 (31x.24.)
7,0,x,5,3,3,0 (4.x312.)
x,0,9,8,7,8,x (x.4213x)
7,0,9,0,0,x,6 (2.3..x1)
8,0,9,0,0,x,6 (2.3..x1)
11,0,10,0,x,7,0 (3.2.x1.)
x,0,5,5,x,7,6 (x.12x43)
5,x,1,0,0,3,2 (4x1..32)
7,0,10,0,x,11,0 (1.2.x3.)
11,0,10,0,11,x,10 (3.1.4x2)
7,0,9,0,0,11,x (1.2..3x)
x,0,x,5,7,7,6 (x.x1342)
x,0,x,5,3,3,2 (x.x4231)
7,0,7,0,0,11,x (1.2..3x)
5,x,1,0,0,5,2 (3x1..42)
5,2,1,0,0,x,2 (421..x3)
5,3,1,0,0,x,2 (431..x2)
5,2,1,0,0,x,3 (421..x3)
11,0,7,0,0,7,x (3.1..2x)
7,0,5,4,0,x,6 (4.21.x3)
11,0,9,0,0,7,x (3.2..1x)
5,6,9,0,0,7,x (124..3x)
11,0,9,0,9,8,x (4.2.31x)
7,0,5,x,0,8,6 (3.1x.42)
8,0,5,x,0,7,6 (4.1x.32)
5,6,x,0,0,5,2 (24x..31)
11,0,9,0,11,8,x (3.2.41x)
5,6,x,0,0,3,2 (34x..21)
5,x,9,5,7,5,6 (1x41312)
x,0,x,0,3,7,3 (x.x.132)
5,2,x,0,0,3,6 (31x..24)
5,x,5,5,9,7,6 (1x11432)
x,0,5,5,3,7,x (x.2314x)
x,0,9,x,0,11,10 (x.1x.32)
5,6,9,0,0,8,x (124..3x)
8,0,10,0,11,11,x (1.2.34x)
8,0,9,0,11,11,x (1.2.34x)
8,0,9,0,9,11,x (1.2.34x)
5,2,x,0,0,5,6 (21x..34)
5,6,9,0,0,5,x (134..2x)
11,0,10,0,11,8,x (3.2.41x)
x,0,x,8,0,7,10 (x.x2.13)
7,0,x,0,3,3,3 (4.x.123)
7,0,x,0,3,7,3 (3.x.142)
7,0,x,0,9,8,6 (2.x.431)
x,0,10,8,7,7,x (x.4312x)
7,0,x,4,0,3,6 (4.x2.13)
5,6,x,0,0,7,3 (23x..41)
8,0,9,0,9,x,6 (2.3.4x1)
11,0,9,x,0,11,10 (3.1x.42)
5,3,x,0,0,7,6 (21x..43)
7,0,x,0,3,5,3 (4.x.132)
x,0,1,5,x,3,2 (x.14x32)
8,0,9,0,7,x,6 (3.4.2x1)
8,0,x,0,9,7,6 (3.x.421)
x,0,10,x,11,11,10 (x.1x342)
7,0,7,x,0,3,6 (3.4x.12)
7,0,5,x,0,3,6 (4.2x.13)
11,0,9,0,7,8,x (4.3.12x)
8,0,7,0,11,11,x (2.1.34x)
7,0,x,0,0,11,10 (1.x..32)
8,0,x,8,0,7,10 (2.x3.14)
7,0,x,8,0,7,10 (1.x3.24)
8,0,9,0,7,11,x (2.3.14x)
7,0,10,0,7,11,x (1.3.24x)
7,0,10,0,11,11,x (1.2.34x)
7,0,x,8,0,8,10 (1.x2.34)
11,0,9,x,7,8,0 (4.3x12.)
8,0,9,x,7,11,0 (2.3x14.)
7,0,10,x,7,11,0 (1.3x24.)
11,0,x,0,0,7,10 (3.x..12)
11,0,7,0,11,8,x (3.1.42x)
7,0,10,0,9,11,x (1.3.24x)
11,0,10,0,7,7,x (4.3.12x)
8,0,5,4,0,x,6 (4.21.x3)
11,0,10,0,9,7,x (4.3.21x)
11,0,10,x,7,7,0 (4.3x12.)
8,0,9,x,0,11,10 (1.2x.43)
5,x,9,0,0,5,6 (1x4..23)
11,0,x,0,11,8,10 (3.x.412)
11,0,9,x,0,8,10 (4.2x.13)
8,0,x,0,11,11,10 (1.x.342)
x,0,10,0,x,7,6 (x.3.x21)
x,0,9,x,7,8,6 (x.4x231)
5,x,9,0,0,8,6 (1x4..32)
5,6,9,0,0,x,6 (124..x3)
x,0,5,x,3,7,3 (x.3x142)
5,x,9,0,0,7,6 (1x4..32)
x,0,x,4,7,8,6 (x.x1342)
7,0,10,0,x,8,6 (2.4.x31)
7,0,10,0,x,7,6 (2.4.x31)
8,0,10,0,x,7,6 (3.4.x21)
7,0,10,0,9,x,6 (2.4.3x1)
x,0,10,8,x,7,10 (x.32x14)
7,0,10,0,7,x,6 (2.4.3x1)
7,0,10,0,x,11,10 (1.2.x43)
x,0,x,8,11,8,10 (x.x1423)
11,0,10,0,x,7,10 (4.2.x13)
7,0,7,x,0,11,10 (1.2x.43)
7,0,x,8,0,11,10 (1.x2.43)
x,0,9,5,7,x,6 (x.413x2)
11,0,x,8,0,7,10 (4.x2.13)
7,0,9,x,0,11,10 (1.2x.43)
11,0,9,x,0,7,10 (4.2x.13)
11,0,7,x,0,7,10 (4.1x.23)
x,0,10,x,7,7,6 (x.4x231)
11,0,9,0,0,x,x (2.1..xx)
5,2,1,0,0,x,x (321..xx)
5,3,x,4,3,3,x (31x211x)
5,6,5,4,0,x,x (2431.xx)
5,6,9,0,0,x,x (123..xx)
5,6,5,5,x,7,x (1211x3x)
5,x,x,4,3,3,3 (3xx2111)
7,0,x,0,0,x,6 (2.x..x1)
11,0,10,0,11,x,x (2.1.3xx)
5,x,5,5,x,7,6 (1x11x32)
5,6,x,5,7,7,x (12x134x)
5,6,x,0,0,7,x (12x..3x)
8,0,x,8,7,7,x (3.x412x)
7,0,x,8,7,8,x (1.x324x)
5,x,x,0,0,7,6 (1xx..32)
5,x,x,5,7,7,6 (1xx1342)
5,6,5,x,0,7,x (132x.4x)
7,0,5,x,0,x,6 (3.1x.x2)
5,6,9,5,7,x,x (12413xx)
8,0,x,0,x,7,6 (3.x.x21)
7,0,x,0,x,8,6 (2.x.x31)
5,3,5,x,3,7,x (213x14x)
5,6,x,4,0,3,x (34x2.1x)
5,x,1,0,0,x,2 (3x1..x2)
5,x,5,4,0,x,6 (2x31.x4)
5,x,1,4,0,3,x (4x13.2x)
11,0,x,0,0,7,x (2.x..1x)
5,2,1,x,0,3,x (421x.3x)
7,0,x,0,0,11,x (1.x..2x)
8,0,5,8,x,7,x (3.14x2x)
7,0,5,8,x,8,x (2.13x4x)
11,0,x,0,11,8,x (2.x.31x)
5,2,x,0,0,x,6 (21x..x3)
5,x,5,8,0,7,x (1x24.3x)
7,0,5,5,x,x,6 (4.12xx3)
5,x,5,x,0,7,6 (1x2x.43)
7,0,x,5,7,x,6 (3.x14x2)
5,6,x,0,0,x,2 (23x..x1)
8,0,x,0,11,11,x (1.x.23x)
5,3,x,0,3,7,x (31x.24x)
5,x,x,4,0,3,6 (3xx2.14)
11,0,9,x,0,x,10 (3.1x.x2)
8,0,x,x,7,7,6 (4.xx231)
7,0,x,x,0,3,6 (3.xx.12)
5,x,5,x,3,7,3 (2x3x141)
7,0,x,x,7,8,6 (2.xx341)
7,0,x,5,3,3,x (4.x312x)
5,x,1,x,0,3,2 (4x1x.32)
7,0,10,0,x,11,x (1.2.x3x)
11,0,10,x,11,x,10 (3.1x4x2)
5,3,1,0,x,x,2 (431.xx2)
5,2,1,0,x,x,3 (421.xx3)
11,0,10,0,x,7,x (3.2.x1x)
8,0,5,x,x,7,6 (4.1xx32)
5,2,5,x,0,x,6 (213x.x4)
5,2,x,x,0,3,6 (31xx.24)
5,x,9,0,0,x,6 (1x3..x2)
5,x,9,5,7,x,6 (1x413x2)
7,0,5,x,x,8,6 (3.1xx42)
5,6,5,x,0,x,2 (243x.x1)
5,6,x,x,0,3,2 (34xx.21)
7,0,x,x,3,3,3 (4.xx123)
5,3,x,0,x,7,6 (21x.x43)
7,0,x,5,x,3,6 (4.x2x13)
5,6,x,0,x,7,3 (23x.x41)
8,0,9,x,7,x,6 (3.4x2x1)
5,x,x,0,3,7,3 (3xx.142)
7,0,10,0,x,x,6 (2.3.xx1)
8,0,x,8,x,7,10 (2.x3x14)
11,0,9,x,7,8,x (4.3x12x)
7,0,x,8,x,8,10 (1.x2x34)
11,0,x,x,0,7,10 (3.xx.12)
11,0,10,x,7,7,x (4.3x12x)
7,0,10,x,7,11,x (1.3x24x)
8,0,9,x,7,11,x (2.3x14x)
8,0,x,4,7,x,6 (4.x13x2)
7,0,x,x,0,11,10 (1.xx.32)
11,0,x,x,11,8,10 (3.xx412)
8,0,x,x,11,11,10 (1.xx342)
7,0,10,x,7,x,6 (2.4x3x1)
7,0,10,x,x,11,10 (1.2xx43)
11,0,10,x,x,7,10 (4.2xx13)

Résumé

  • L'accord MiØ9 contient les notes : Mi, Sol, Si♭, Ré, Fa♯
  • En accordage 7S Standard, il y a 340 positions disponibles
  • Chaque diagramme montre la position des doigts sur le manche de la 7-String Guitar

Questions fréquentes

Qu'est-ce que l'accord MiØ9 à la 7-String Guitar ?

MiØ9 est un accord Mi Ø9. Il contient les notes Mi, Sol, Si♭, Ré, Fa♯. À la 7-String Guitar en accordage 7S Standard, il y a 340 façons de jouer cet accord.

Comment jouer MiØ9 à la 7-String Guitar ?

Pour jouer MiØ9 en accordage 7S Standard, utilisez l'une des 340 positions ci-dessus. Chaque diagramme montre la position des doigts sur le manche.

Quelles notes composent l'accord MiØ9 ?

L'accord MiØ9 contient les notes : Mi, Sol, Si♭, Ré, Fa♯.

Combien de positions existe-t-il pour MiØ9 ?

En accordage 7S Standard, il y a 340 positions pour l'accord MiØ9. Chacune utilise une position différente sur le manche avec les mêmes notes : Mi, Sol, Si♭, Ré, Fa♯.