Si° accord de guitare — schéma et tablature en accordage fake 8 string

Réponse courte : Si° est un accord Si dim avec les notes Si, Ré, Fa. En accordage fake 8 string, il y a 400 positions. Voir les diagrammes ci-dessous.

Aussi connu sous : Simb5, Simo5, Si dim, Si Diminished

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Comment jouer Si° au 7-String Guitar

Si°, Simb5, Simo5, Sidim, SiDiminished

Notes: Si, Ré, Fa

x,8,7,8,0,7,0 (x314.2.)
x,5,7,8,0,7,0 (x124.3.)
x,8,7,5,0,7,0 (x421.3.)
x,5,7,8,0,4,0 (x234.1.)
x,8,7,8,0,4,0 (x324.1.)
x,8,7,5,0,4,0 (x432.1.)
x,x,7,8,0,7,0 (xx13.2.)
x,8,7,8,0,10,0 (x213.4.)
x,x,7,8,0,4,0 (xx23.1.)
x,x,7,5,3,7,3 (xx32141)
x,x,7,5,3,4,0 (xx4312.)
x,x,7,5,3,7,0 (xx3214.)
x,x,7,5,3,4,3 (xx43121)
x,x,7,5,0,7,6 (xx31.42)
x,x,7,8,9,7,0 (xx1342.)
x,x,7,8,0,10,0 (xx12.3.)
x,x,7,5,0,4,6 (xx42.13)
x,x,x,2,3,4,3 (xxx1243)
x,x,7,8,0,7,6 (xx24.31)
x,x,7,8,0,4,6 (xx34.12)
x,x,x,2,0,4,6 (xxx1.23)
x,x,7,8,0,10,6 (xx23.41)
x,x,x,x,9,7,6 (xxxx321)
7,8,7,8,0,x,0 (1324.x.)
7,5,7,8,0,x,0 (2134.x.)
7,8,7,5,0,x,0 (2431.x.)
x,8,7,8,0,x,0 (x213.x.)
x,2,x,2,3,4,3 (x1x1243)
7,8,x,8,0,7,0 (13x4.2.)
x,8,7,5,0,x,0 (x321.x.)
x,5,7,8,0,x,0 (x123.x.)
7,8,10,8,0,x,0 (1243.x.)
7,8,7,8,9,7,x (121341x)
7,8,7,x,0,7,0 (142x.3.)
7,x,7,8,0,7,0 (1x24.3.)
7,5,x,8,0,7,0 (21x4.3.)
x,x,7,8,0,x,0 (xx12.x.)
7,8,x,5,0,7,0 (24x1.3.)
x,2,x,5,3,4,0 (x1x423.)
7,8,7,x,0,4,0 (243x.1.)
7,8,x,5,0,4,0 (34x2.1.)
7,5,x,8,0,4,0 (32x4.1.)
7,8,x,8,0,4,0 (23x4.1.)
7,x,7,8,0,4,0 (2x34.1.)
x,8,7,x,0,7,0 (x31x.2.)
x,5,7,5,3,x,0 (x2431x.)
7,8,x,8,0,10,0 (12x3.4.)
7,8,10,x,0,7,0 (134x.2.)
7,x,10,8,0,10,0 (1x32.4.)
7,x,10,8,0,7,0 (1x43.2.)
7,8,7,x,0,10,0 (132x.4.)
7,x,7,8,0,10,0 (1x23.4.)
7,8,10,x,0,10,0 (123x.4.)
x,5,7,5,x,7,6 (x131x42)
x,8,7,8,0,7,x (x314.2x)
x,8,7,x,0,4,0 (x32x.1.)
x,8,7,8,x,7,0 (x314x2.)
x,8,7,8,9,7,x (x21341x)
x,5,7,x,3,4,0 (x34x12.)
x,5,7,5,3,x,3 (x2431x1)
x,5,7,x,3,4,3 (x34x121)
x,5,7,x,3,7,0 (x23x14.)
x,5,7,x,3,7,3 (x23x141)
x,8,7,5,x,7,0 (x421x3.)
x,x,7,5,3,x,0 (xx321x.)
x,2,x,5,0,4,6 (x1x3.24)
x,2,x,2,0,4,6 (x1x2.34)
x,5,7,8,0,7,x (x124.3x)
x,5,7,5,0,x,6 (x142.x3)
x,5,7,x,0,7,6 (x13x.42)
x,5,7,8,9,x,0 (x1234x.)
x,8,7,5,9,x,0 (x3214x.)
x,5,7,8,x,7,0 (x124x3.)
x,8,7,5,0,7,x (x421.3x)
x,8,7,5,x,4,0 (x432x1.)
x,5,7,8,0,4,x (x234.1x)
x,5,7,8,x,4,0 (x234x1.)
x,8,7,x,9,7,0 (x31x42.)
x,8,7,x,0,10,0 (x21x.3.)
x,8,7,5,0,4,x (x432.1x)
x,5,7,x,0,4,6 (x24x.13)
x,8,7,8,0,4,x (x324.1x)
x,x,7,8,0,7,x (xx13.2x)
x,x,7,8,9,7,x (xx1231x)
x,8,7,x,0,7,6 (x42x.31)
x,8,7,8,0,x,6 (x324.x1)
x,x,x,2,3,x,3 (xxx12x3)
x,x,7,8,x,7,0 (xx13x2.)
x,x,7,x,3,7,3 (xx2x131)
x,x,7,x,0,7,6 (xx2x.31)
x,5,7,8,0,x,6 (x134.x2)
x,8,7,5,0,x,6 (x431.x2)
x,5,7,5,9,x,6 (x1314x2)
x,x,7,x,3,4,3 (xx3x121)
x,x,7,x,3,7,0 (xx2x13.)
x,x,7,5,3,x,3 (xx321x1)
x,8,7,8,0,10,x (x213.4x)
x,8,7,x,0,4,6 (x43x.12)
x,x,7,5,0,x,6 (xx31.x2)
x,x,7,x,0,10,0 (xx1x.2.)
x,x,7,8,0,4,x (xx23.1x)
x,x,7,x,0,4,6 (xx3x.12)
x,x,7,5,3,4,x (xx4312x)
x,x,7,8,0,x,6 (xx23.x1)
x,x,7,5,3,7,x (xx3214x)
x,x,7,5,x,7,6 (xx31x42)
x,x,7,5,x,4,6 (xx42x13)
x,x,7,8,0,10,x (xx12.3x)
x,8,7,x,0,10,6 (x32x.41)
x,x,x,2,0,x,6 (xxx1.x2)
x,x,7,8,x,7,6 (xx24x31)
x,x,7,5,3,x,6 (xx421x3)
x,x,7,x,3,7,6 (xx3x142)
x,x,7,x,9,7,6 (xx2x431)
x,x,7,x,0,10,6 (xx2x.31)
x,x,7,5,9,x,6 (xx314x2)
7,8,7,x,0,x,0 (132x.x.)
7,8,x,8,0,x,0 (12x3.x.)
7,x,7,8,0,x,0 (1x23.x.)
x,8,7,x,0,x,0 (x21x.x.)
7,8,x,5,0,x,0 (23x1.x.)
7,5,x,8,0,x,0 (21x3.x.)
7,8,10,x,0,x,0 (123x.x.)
7,8,7,8,0,x,x (1324.xx)
x,2,x,2,3,x,3 (x1x12x3)
7,8,7,8,x,7,x (1213x1x)
7,8,7,5,x,x,0 (2431xx.)
7,5,7,8,x,x,0 (2134xx.)
7,5,7,8,0,x,x (2134.xx)
7,8,7,5,0,x,x (2431.xx)
x,2,x,5,3,x,0 (x1x32x.)
7,8,7,x,9,7,x (121x31x)
7,x,10,8,0,x,0 (1x32.x.)
7,x,x,8,0,7,0 (1xx3.2.)
7,x,7,8,9,7,x (1x1231x)
7,8,x,x,0,7,0 (13xx.2.)
7,5,7,x,3,x,0 (324x1x.)
7,x,7,5,3,x,0 (3x421x.)
7,5,x,5,3,x,0 (42x31x.)
x,8,7,8,0,x,x (x213.xx)
7,5,7,5,x,x,6 (3141xx2)
7,5,x,5,x,7,6 (31x1x42)
7,8,x,8,9,7,x (12x341x)
7,x,7,8,0,7,x (1x24.3x)
7,8,10,8,0,x,x (1243.xx)
7,x,x,8,0,4,0 (2xx3.1.)
x,8,7,5,x,x,0 (x321xx.)
7,x,7,8,x,7,0 (1x24x3.)
x,8,7,5,0,x,x (x321.xx)
x,5,7,8,x,x,0 (x123xx.)
x,5,7,8,0,x,x (x123.xx)
7,8,7,x,0,7,x (142x.3x)
7,8,10,8,x,x,0 (1243xx.)
7,8,x,x,0,4,0 (23xx.1.)
7,8,x,8,0,7,x (13x4.2x)
7,8,7,x,x,7,0 (142xx3.)
7,8,x,8,x,7,0 (13x4x2.)
7,5,x,x,3,7,0 (32xx14.)
7,x,7,x,0,7,6 (2x3x.41)
7,5,x,5,3,x,3 (42x31x1)
7,x,7,5,3,x,3 (3x421x1)
7,5,x,x,3,4,3 (43xx121)
7,x,7,x,3,4,3 (3x4x121)
7,x,x,5,3,7,0 (3xx214.)
7,x,7,x,3,7,0 (2x3x14.)
7,5,7,x,3,x,3 (324x1x1)
7,x,x,5,3,4,3 (4xx3121)
x,8,7,8,x,7,x (x213x1x)
7,5,x,x,3,7,3 (32xx141)
7,x,7,x,3,7,3 (2x3x141)
7,5,x,x,3,4,0 (43xx12.)
7,x,x,5,3,4,0 (4xx312.)
7,x,x,5,3,7,3 (3xx2141)
7,x,x,5,0,7,6 (3xx1.42)
7,5,x,8,9,x,0 (21x34x.)
7,8,x,5,0,7,x (24x1.3x)
x,5,7,x,3,x,0 (x23x1x.)
7,8,x,5,9,x,0 (23x14x.)
7,5,x,5,0,x,6 (41x2.x3)
7,5,x,8,0,7,x (21x4.3x)
x,x,7,8,0,x,x (xx12.xx)
7,8,x,5,x,7,0 (24x1x3.)
7,x,7,5,0,x,6 (3x41.x2)
7,5,x,8,x,7,0 (21x4x3.)
7,5,x,x,0,7,6 (31xx.42)
7,5,7,x,0,x,6 (314x.x2)
7,x,10,8,9,x,0 (1x423x.)
x,5,7,5,x,x,6 (x131xx2)
7,x,x,5,0,4,6 (4xx2.13)
x,2,x,5,3,4,x (x1x423x)
7,8,10,x,9,7,x (124x31x)
7,x,7,8,0,4,x (2x34.1x)
7,x,10,8,9,7,x (1x4231x)
7,x,x,8,0,10,0 (1xx2.3.)
7,x,10,x,0,10,0 (1x2x.3.)
7,x,7,x,0,4,6 (3x4x.12)
7,8,10,8,x,7,x (1243x1x)
7,8,x,8,0,4,x (23x4.1x)
7,x,7,x,0,10,0 (1x2x.3.)
7,5,x,x,0,4,6 (42xx.13)
7,8,7,x,0,4,x (243x.1x)
7,5,x,8,x,4,0 (32x4x1.)
7,8,x,5,0,4,x (34x2.1x)
7,8,x,5,x,4,0 (34x2x1.)
7,8,x,x,0,10,0 (12xx.3.)
7,5,x,8,0,4,x (32x4.1x)
x,2,x,x,3,4,3 (x1xx243)
7,8,x,x,9,7,0 (13xx42.)
7,8,10,x,9,x,0 (124x3x.)
7,x,x,8,9,7,0 (1xx342.)
x,8,7,x,0,7,x (x31x.2x)
7,x,7,8,0,x,6 (2x34.x1)
7,8,x,8,0,x,6 (23x4.x1)
7,8,7,x,0,x,6 (243x.x1)
x,8,7,x,x,7,0 (x31xx2.)
7,x,x,8,0,7,6 (2xx4.31)
x,8,7,x,9,7,x (x21x31x)
7,8,x,x,0,7,6 (24xx.31)
7,8,x,5,0,x,6 (34x1.x2)
7,5,x,5,9,x,6 (31x14x2)
x,x,7,8,x,7,x (xx12x1x)
7,5,x,8,0,x,6 (31x4.x2)
x,5,7,5,3,x,x (x2431xx)
x,5,7,x,3,x,3 (x23x1x1)
7,8,10,x,0,10,x (123x.4x)
7,8,7,x,0,10,x (132x.4x)
7,8,10,x,x,10,0 (123xx4.)
7,x,10,8,x,10,0 (1x32x4.)
x,2,x,x,0,4,6 (x1xx.23)
x,5,7,x,0,x,6 (x13x.x2)
7,8,x,x,0,4,6 (34xx.12)
x,2,x,5,0,x,6 (x1x2.x3)
7,x,10,8,x,7,0 (1x43x2.)
7,x,10,8,0,10,x (1x32.4x)
7,x,x,8,0,4,6 (3xx4.12)
x,2,x,5,3,x,3 (x1x42x3)
7,8,10,x,x,7,0 (134xx2.)
7,x,10,8,0,7,x (1x43.2x)
7,x,7,8,0,10,x (1x23.4x)
7,8,x,8,0,10,x (12x3.4x)
x,2,x,2,0,x,6 (x1x2.x3)
7,8,10,x,0,7,x (134x.2x)
7,x,10,x,9,10,0 (1x3x24.)
x,8,7,x,0,4,x (x32x.1x)
x,5,7,x,3,4,x (x34x12x)
x,8,7,x,0,x,6 (x32x.x1)
x,5,7,x,3,7,x (x23x14x)
x,5,7,x,x,7,6 (x13xx42)
x,5,7,8,9,x,x (x1234xx)
x,2,x,5,x,4,6 (x1x3x24)
x,2,x,5,3,x,6 (x1x32x4)
x,5,7,8,x,7,x (x124x3x)
x,8,7,5,9,x,x (x3214xx)
x,x,7,x,0,x,6 (xx2x.x1)
x,x,7,5,3,x,x (xx321xx)
x,8,7,5,x,7,x (x421x3x)
x,x,7,x,3,x,3 (xx2x1x1)
7,x,10,x,0,10,6 (2x3x.41)
7,x,7,x,0,10,6 (2x3x.41)
x,5,7,x,x,4,6 (x24xx13)
x,5,7,8,x,4,x (x234x1x)
7,x,x,8,0,10,6 (2xx3.41)
7,8,10,x,0,x,6 (234x.x1)
7,x,10,8,0,x,6 (2x43.x1)
x,8,7,5,x,4,x (x432x1x)
x,8,7,x,0,10,x (x21x.3x)
7,x,10,x,0,7,6 (2x4x.31)
7,8,x,x,0,10,6 (23xx.41)
x,8,7,x,x,7,6 (x42xx31)
x,5,7,x,3,x,6 (x24x1x3)
x,8,7,5,x,x,6 (x431xx2)
x,x,7,x,x,7,6 (xx2xx31)
x,x,7,x,3,7,x (xx2x13x)
x,5,7,8,x,x,6 (x134xx2)
x,x,7,5,x,x,6 (xx31xx2)
x,x,7,x,0,10,x (xx1x.2x)
x,5,7,x,9,x,6 (x13x4x2)
7,8,x,x,0,x,0 (12xx.x.)
7,8,7,x,0,x,x (132x.xx)
7,x,x,8,0,x,0 (1xx2.x.)
7,x,7,8,0,x,x (1x23.xx)
7,8,7,x,x,7,x (121xx1x)
7,8,x,8,0,x,x (12x3.xx)
7,x,7,8,x,7,x (1x12x1x)
x,8,7,x,0,x,x (x21x.xx)
7,5,x,8,0,x,x (21x3.xx)
7,8,x,5,x,x,0 (23x1xx.)
7,5,x,8,x,x,0 (21x3xx.)
7,8,x,5,0,x,x (23x1.xx)
7,8,x,8,x,7,x (12x3x1x)
7,8,10,x,0,x,x (123x.xx)
7,8,10,x,x,x,0 (123xxx.)
7,5,x,x,3,x,0 (32xx1x.)
7,x,x,5,3,x,0 (3xx21x.)
7,5,7,8,x,x,x (2134xxx)
7,8,7,5,x,x,x (2431xxx)
7,5,x,5,x,x,6 (31x1xx2)
7,x,10,8,x,x,0 (1x32xx.)
7,8,x,x,9,7,x (12xx31x)
x,2,x,x,3,x,3 (x1xx2x3)
7,x,10,8,0,x,x (1x32.xx)
7,x,x,8,x,7,0 (1xx3x2.)
7,8,x,x,0,7,x (13xx.2x)
7,8,x,x,x,7,0 (13xxx2.)
7,x,x,8,0,7,x (1xx3.2x)
7,x,x,8,9,7,x (1xx231x)
x,2,x,5,3,x,x (x1x32xx)
7,x,7,x,0,x,6 (2x3x.x1)
7,x,x,x,0,7,6 (2xxx.31)
7,x,x,5,3,x,3 (3xx21x1)
7,x,x,x,3,7,0 (2xxx13.)
7,x,7,5,3,x,x (3x421xx)
7,x,x,x,3,4,3 (3xxx121)
7,x,7,x,3,x,3 (2x3x1x1)
7,5,7,x,3,x,x (324x1xx)
7,x,x,x,3,7,3 (2xxx131)
7,5,x,5,3,x,x (42x31xx)
x,8,7,x,x,7,x (x21xx1x)
7,5,x,x,3,x,3 (32xx1x1)
7,x,x,5,0,x,6 (3xx1.x2)
7,5,x,x,0,x,6 (31xx.x2)
7,x,x,x,0,4,6 (3xxx.12)
7,8,10,x,x,7,x (123xx1x)
7,x,x,x,0,10,0 (1xxx.2.)
7,8,10,8,x,x,x (1243xxx)
7,x,x,8,0,4,x (2xx3.1x)
7,8,x,x,0,4,x (23xx.1x)
7,x,10,8,x,7,x (1x32x1x)
x,8,7,5,x,x,x (x321xxx)
x,5,7,8,x,x,x (x123xxx)
7,x,7,x,x,7,6 (2x3xx41)
7,x,7,x,3,7,x (2x3x14x)
7,x,x,5,3,4,x (4xx312x)
7,5,x,x,3,4,x (43xx12x)
7,x,x,8,0,x,6 (2xx3.x1)
7,8,x,x,0,x,6 (23xx.x1)
7,x,x,5,3,7,x (3xx214x)
7,5,x,x,3,7,x (32xx14x)
7,5,x,x,x,7,6 (31xxx42)
7,5,x,8,x,7,x (21x4x3x)
x,5,7,x,3,x,x (x23x1xx)
7,5,x,8,9,x,x (21x34xx)
7,8,x,5,x,7,x (24x1x3x)
7,x,7,5,x,x,6 (3x41xx2)
7,8,x,5,9,x,x (23x14xx)
7,5,7,x,x,x,6 (314xxx2)
7,x,x,5,x,7,6 (3xx1x42)
7,8,10,x,9,x,x (124x3xx)
x,2,x,x,0,x,6 (x1xx.x2)
7,x,7,x,0,10,x (1x2x.3x)
7,8,x,5,x,4,x (34x2x1x)
7,x,10,8,9,x,x (1x423xx)
7,5,x,x,x,4,6 (42xxx13)
7,x,10,x,0,10,x (1x2x.3x)
7,x,x,5,x,4,6 (4xx2x13)
7,8,x,x,0,10,x (12xx.3x)
7,x,x,8,0,10,x (1xx2.3x)
7,5,x,8,x,4,x (32x4x1x)
7,x,10,x,x,10,0 (1x2xx3.)
7,x,x,x,3,7,6 (3xxx142)
7,8,x,x,x,7,6 (24xxx31)
7,x,x,5,3,x,6 (4xx21x3)
7,5,x,x,3,x,6 (42xx1x3)
7,x,x,8,x,7,6 (2xx4x31)
7,8,x,5,x,x,6 (34x1xx2)
7,5,x,8,x,x,6 (31x4xx2)
7,x,10,x,9,10,x (1x3x24x)
7,x,10,8,x,10,x (1x32x4x)
x,5,7,x,x,x,6 (x13xxx2)
7,8,10,x,x,10,x (123xx4x)
x,2,x,5,x,x,6 (x1x2xx3)
7,x,x,x,9,7,6 (2xxx431)
7,x,10,x,0,x,6 (2x3x.x1)
7,x,x,x,0,10,6 (2xxx.31)
7,x,x,5,9,x,6 (3xx14x2)
7,5,x,x,9,x,6 (31xx4x2)
7,x,10,x,9,x,6 (2x4x3x1)
7,x,10,x,x,7,6 (2x4xx31)
7,x,10,x,x,10,6 (2x3xx41)
7,x,10,8,x,x,6 (2x43xx1)
7,8,10,x,x,x,6 (234xxx1)
7,8,x,x,0,x,x (12xx.xx)
7,x,x,8,0,x,x (1xx2.xx)
7,8,x,x,x,7,x (12xxx1x)
7,x,x,8,x,7,x (1xx2x1x)
7,8,x,5,x,x,x (23x1xxx)
7,5,x,8,x,x,x (21x3xxx)
7,8,10,x,x,x,x (123xxxx)
7,x,x,x,0,x,6 (2xxx.x1)
7,x,x,5,3,x,x (3xx21xx)
7,5,x,x,3,x,x (32xx1xx)
7,x,x,x,3,x,3 (2xxx1x1)
7,x,10,8,x,x,x (1x32xxx)
7,x,x,x,3,7,x (2xxx13x)
7,x,x,x,x,7,6 (2xxxx31)
7,5,x,x,x,x,6 (31xxxx2)
7,x,x,5,x,x,6 (3xx1xx2)
7,x,x,x,0,10,x (1xxx.2x)
7,x,10,x,x,10,x (1x2xx3x)
7,x,10,x,x,x,6 (2x3xxx1)

Résumé

  • L'accord Si° contient les notes : Si, Ré, Fa
  • En accordage fake 8 string, il y a 400 positions disponibles
  • Aussi écrit : Simb5, Simo5, Si dim, Si Diminished
  • Chaque diagramme montre la position des doigts sur le manche de la 7-String Guitar

Questions fréquentes

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

Si° est un accord Si dim. Il contient les notes Si, Ré, Fa. À la 7-String Guitar en accordage fake 8 string, il y a 400 façons de jouer cet accord.

Comment jouer Si° à la 7-String Guitar ?

Pour jouer Si° en accordage fake 8 string, utilisez l'une des 400 positions ci-dessus. Chaque diagramme montre la position des doigts sur le manche.

Quelles notes composent l'accord Si° ?

L'accord Si° contient les notes : Si, Ré, Fa.

Combien de positions existe-t-il pour Si° ?

En accordage fake 8 string, il y a 400 positions pour l'accord Si°. Chacune utilise une position différente sur le manche avec les mêmes notes : Si, Ré, Fa.

Quels sont les autres noms de Si° ?

Si° est aussi connu sous le nom de Simb5, Simo5, Si dim, Si Diminished. Ce sont différentes notations pour le même accord : Si, Ré, Fa.