Acorde Sio7b9 na Mandolin — Diagrama e Tabs na Afinação Modal D

Resposta curta: Sio7b9 é um acorde Si o7b9 com as notas Si, Re, Fa, La♭, Do. Na afinação Modal D, existem 216 posições. Veja os diagramas abaixo.

Também conhecido como: Si°7b9

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Como tocar Sio7b9 no Mandolin

Sio7b9, Si°7b9

Notas: Si, Re, Fa, La♭, Do

x,x,10,9,8,11,0,0 (xx3214..)
x,x,10,9,11,8,0,0 (xx3241..)
x,x,0,9,8,11,10,0 (xx.2143.)
x,x,0,9,11,8,10,0 (xx.2413.)
x,x,0,9,11,8,0,10 (xx.241.3)
x,x,0,9,8,11,0,10 (xx.214.3)
x,x,x,9,8,11,10,0 (xxx2143.)
x,x,x,9,11,8,10,0 (xxx2413.)
x,x,x,9,11,8,0,10 (xxx241.3)
x,x,x,9,8,11,0,10 (xxx214.3)
x,2,3,6,3,x,0,0 (x1243x..)
x,2,6,3,3,x,0,0 (x1423x..)
x,2,6,3,x,3,0,0 (x142x3..)
x,2,3,6,x,3,0,0 (x124x3..)
x,2,0,6,3,x,3,0 (x1.42x3.)
x,2,3,0,x,3,6,0 (x12.x34.)
x,2,0,3,x,3,6,0 (x1.2x34.)
x,2,6,0,3,x,3,0 (x14.2x3.)
x,2,0,6,x,3,3,0 (x1.4x23.)
x,2,0,3,3,x,6,0 (x1.23x4.)
x,2,6,0,x,3,3,0 (x14.x23.)
x,2,3,0,3,x,6,0 (x12.3x4.)
x,2,0,6,3,x,0,3 (x1.42x.3)
x,2,0,0,x,3,3,6 (x1..x234)
x,2,0,3,x,3,0,6 (x1.2x3.4)
x,2,0,0,3,x,6,3 (x1..2x43)
x,2,3,0,3,x,0,6 (x12.3x.4)
x,2,6,0,3,x,0,3 (x14.2x.3)
x,2,0,3,3,x,0,6 (x1.23x.4)
x,2,6,0,x,3,0,3 (x14.x2.3)
x,2,0,6,x,3,0,3 (x1.4x2.3)
x,2,0,0,3,x,3,6 (x1..2x34)
x,2,0,0,x,3,6,3 (x1..x243)
x,2,3,0,x,3,0,6 (x12.x3.4)
x,x,3,x,2,3,6,0 (xx2x134.)
x,x,6,x,3,2,3,0 (xx4x213.)
x,x,6,x,2,3,3,0 (xx4x123.)
x,x,3,x,3,2,6,0 (xx2x314.)
x,x,3,x,2,3,0,6 (xx2x13.4)
x,x,0,x,3,2,6,3 (xx.x2143)
x,x,0,x,2,3,6,3 (xx.x1243)
x,x,6,x,2,3,0,3 (xx4x12.3)
x,x,6,x,3,2,0,3 (xx4x21.3)
x,x,3,x,3,2,0,6 (xx2x31.4)
x,x,0,x,3,2,3,6 (xx.x2134)
x,x,0,x,2,3,3,6 (xx.x1234)
x,x,10,9,8,11,0,x (xx3214.x)
x,x,10,9,11,8,x,0 (xx3241x.)
x,x,10,9,11,8,0,x (xx3241.x)
x,x,10,9,8,11,x,0 (xx3214x.)
x,x,6,9,8,x,10,0 (xx132x4.)
x,x,6,9,x,8,10,0 (xx13x24.)
x,x,10,9,x,8,6,0 (xx43x21.)
x,x,10,9,8,x,6,0 (xx432x1.)
x,x,0,9,11,8,10,x (xx.2413x)
x,x,0,9,8,11,10,x (xx.2143x)
x,x,6,9,8,x,0,10 (xx132x.4)
x,x,0,9,8,x,10,6 (xx.32x41)
x,x,10,9,8,x,0,6 (xx432x.1)
x,x,0,9,8,x,6,10 (xx.32x14)
x,x,0,9,x,8,6,10 (xx.3x214)
x,x,0,9,x,8,10,6 (xx.3x241)
x,x,6,9,x,8,0,10 (xx13x2.4)
x,x,10,9,x,8,0,6 (xx43x2.1)
x,x,0,9,11,8,x,10 (xx.241x3)
x,x,0,9,8,11,x,10 (xx.214x3)
3,2,3,6,x,x,0,0 (2134xx..)
3,2,6,3,x,x,0,0 (2143xx..)
3,2,0,6,x,x,3,0 (21.4xx3.)
3,2,6,0,x,x,3,0 (214.xx3.)
3,2,3,0,x,x,6,0 (213.xx4.)
3,2,0,3,x,x,6,0 (21.3xx4.)
x,2,3,6,3,x,x,0 (x1243xx.)
x,2,6,3,3,x,x,0 (x1423xx.)
x,2,3,6,3,x,0,x (x1243x.x)
x,2,6,3,3,x,0,x (x1423x.x)
3,2,0,6,x,x,0,3 (21.4xx.3)
3,2,0,3,x,x,0,6 (21.3xx.4)
8,x,10,9,11,x,0,0 (1x324x..)
11,x,10,9,8,x,0,0 (4x321x..)
3,2,0,0,x,x,6,3 (21..xx43)
3,2,0,0,x,x,3,6 (21..xx34)
3,2,3,0,x,x,0,6 (213.xx.4)
3,2,6,0,x,x,0,3 (214.xx.3)
x,2,3,6,x,3,0,x (x124x3.x)
x,2,6,3,x,3,x,0 (x142x3x.)
x,2,6,3,x,3,0,x (x142x3.x)
x,2,3,6,x,3,x,0 (x124x3x.)
11,x,10,9,x,8,0,0 (4x32x1..)
8,x,10,9,x,11,0,0 (1x32x4..)
x,2,x,3,x,3,6,0 (x1x2x34.)
x,2,6,x,x,3,3,0 (x14xx23.)
x,2,x,6,3,x,3,0 (x1x42x3.)
x,2,3,x,3,x,6,0 (x12x3x4.)
x,2,0,3,x,3,6,x (x1.2x34x)
x,2,6,0,3,x,3,x (x14.2x3x)
x,2,3,0,x,3,6,x (x12.x34x)
x,2,0,3,3,x,6,x (x1.23x4x)
x,2,3,0,3,x,6,x (x12.3x4x)
x,2,6,x,3,x,3,0 (x14x2x3.)
x,2,x,6,x,3,3,0 (x1x4x23.)
x,2,3,x,x,3,6,0 (x12xx34.)
x,2,x,3,3,x,6,0 (x1x23x4.)
x,2,0,6,x,3,3,x (x1.4x23x)
x,2,6,0,x,3,3,x (x14.x23x)
x,2,0,6,3,x,3,x (x1.42x3x)
8,x,0,9,x,11,10,0 (1x.2x43.)
11,x,0,9,x,8,10,0 (4x.2x13.)
8,x,0,9,11,x,10,0 (1x.24x3.)
11,x,0,9,8,x,10,0 (4x.21x3.)
x,2,3,x,3,x,0,6 (x12x3x.4)
x,2,0,x,3,x,3,6 (x1.x2x34)
x,2,x,3,x,3,0,6 (x1x2x3.4)
x,2,x,0,3,x,3,6 (x1x.2x34)
x,2,3,x,x,3,0,6 (x12xx3.4)
x,2,0,3,x,3,x,6 (x1.2x3x4)
x,2,6,x,3,x,0,3 (x14x2x.3)
x,2,x,0,3,x,6,3 (x1x.2x43)
x,2,x,6,3,x,0,3 (x1x42x.3)
x,2,x,0,x,3,3,6 (x1x.x234)
x,2,3,0,x,3,x,6 (x12.x3x4)
x,2,0,x,x,3,3,6 (x1.xx234)
x,2,0,3,3,x,x,6 (x1.23xx4)
x,2,6,x,x,3,0,3 (x14xx2.3)
x,2,0,x,x,3,6,3 (x1.xx243)
x,2,x,6,x,3,0,3 (x1x4x2.3)
x,2,6,0,3,x,x,3 (x14.2xx3)
x,2,0,x,3,x,6,3 (x1.x2x43)
x,2,3,0,3,x,x,6 (x12.3xx4)
x,2,0,6,3,x,x,3 (x1.42xx3)
x,2,6,0,x,3,x,3 (x14.x2x3)
x,2,0,6,x,3,x,3 (x1.4x2x3)
x,2,x,0,x,3,6,3 (x1x.x243)
x,2,x,3,3,x,0,6 (x1x23x.4)
8,x,0,9,x,11,0,10 (1x.2x4.3)
11,x,0,9,x,8,0,10 (4x.2x1.3)
8,x,0,9,11,x,0,10 (1x.24x.3)
11,x,0,9,8,x,0,10 (4x.21x.3)
3,2,3,6,x,x,x,0 (2134xxx.)
3,2,6,3,x,x,0,x (2143xx.x)
3,2,3,6,x,x,0,x (2134xx.x)
3,2,6,3,x,x,x,0 (2143xxx.)
3,x,3,x,2,x,6,0 (2x3x1x4.)
3,2,3,x,x,x,6,0 (213xxx4.)
3,2,0,6,x,x,3,x (21.4xx3x)
3,2,3,0,x,x,6,x (213.xx4x)
3,2,0,3,x,x,6,x (21.3xx4x)
2,x,3,x,x,3,6,0 (1x2xx34.)
3,x,3,x,x,2,6,0 (2x3xx14.)
2,x,3,x,3,x,6,0 (1x2x3x4.)
3,2,6,0,x,x,3,x (214.xx3x)
3,2,x,3,x,x,6,0 (21x3xx4.)
2,x,6,x,x,3,3,0 (1x4xx23.)
3,x,6,x,x,2,3,0 (2x4xx13.)
2,x,6,x,3,x,3,0 (1x4x2x3.)
3,x,6,x,2,x,3,0 (2x4x1x3.)
3,2,x,6,x,x,3,0 (21x4xx3.)
3,2,6,x,x,x,3,0 (214xxx3.)
3,x,3,x,2,x,0,6 (2x3x1x.4)
2,x,3,x,3,x,0,6 (1x2x3x.4)
3,2,6,x,x,x,0,3 (214xxx.3)
3,2,0,6,x,x,x,3 (21.4xxx3)
8,x,10,9,11,x,0,x (1x324x.x)
2,x,0,x,x,3,6,3 (1x.xx243)
2,x,0,x,3,x,6,3 (1x.x2x43)
3,x,3,x,x,2,0,6 (2x3xx1.4)
3,x,0,x,2,x,6,3 (2x.x1x43)
2,x,3,x,x,3,0,6 (1x2xx3.4)
3,2,x,0,x,x,6,3 (21x.xx43)
3,2,3,0,x,x,x,6 (213.xxx4)
3,2,0,3,x,x,x,6 (21.3xxx4)
3,2,0,x,x,x,6,3 (21.xxx43)
2,x,6,x,x,3,0,3 (1x4xx2.3)
11,x,10,9,8,x,x,0 (4x321xx.)
3,2,0,x,x,x,3,6 (21.xxx34)
3,2,x,0,x,x,3,6 (21x.xx34)
3,x,6,x,x,2,0,3 (2x4xx1.3)
3,x,0,x,2,x,3,6 (2x.x1x34)
2,x,0,x,3,x,3,6 (1x.x2x34)
3,x,0,x,x,2,6,3 (2x.xx143)
2,x,6,x,3,x,0,3 (1x4x2x.3)
3,2,3,x,x,x,0,6 (213xxx.4)
3,x,0,x,x,2,3,6 (2x.xx134)
3,x,6,x,2,x,0,3 (2x4x1x.3)
2,x,0,x,x,3,3,6 (1x.xx234)
3,2,x,3,x,x,0,6 (21x3xx.4)
3,2,x,6,x,x,0,3 (21x4xx.3)
11,x,10,9,8,x,0,x (4x321x.x)
8,x,10,9,11,x,x,0 (1x324xx.)
3,2,6,0,x,x,x,3 (214.xxx3)
11,x,10,9,x,8,0,x (4x32x1.x)
8,x,10,9,x,11,0,x (1x32x4.x)
8,x,10,9,x,11,x,0 (1x32x4x.)
11,x,10,9,x,8,x,0 (4x32x1x.)
8,x,10,9,x,x,6,0 (2x43xx1.)
8,x,6,9,x,x,10,0 (2x13xx4.)
8,x,x,9,x,11,10,0 (1xx2x43.)
8,x,0,9,11,x,10,x (1x.24x3x)
8,x,0,9,x,11,10,x (1x.2x43x)
11,x,0,9,8,x,10,x (4x.21x3x)
11,x,x,9,x,8,10,0 (4xx2x13.)
8,x,x,9,11,x,10,0 (1xx24x3.)
11,x,x,9,8,x,10,0 (4xx21x3.)
11,x,0,9,x,8,10,x (4x.2x13x)
8,x,0,9,x,x,6,10 (2x.3xx14)
8,x,0,9,x,x,10,6 (2x.3xx41)
8,x,6,9,x,x,0,10 (2x13xx.4)
8,x,10,9,x,x,0,6 (2x43xx.1)
11,x,x,9,x,8,0,10 (4xx2x1.3)
8,x,x,9,x,11,0,10 (1xx2x4.3)
11,x,x,9,8,x,0,10 (4xx21x.3)
8,x,0,9,x,11,x,10 (1x.2x4x3)
11,x,0,9,x,8,x,10 (4x.2x1x3)
8,x,0,9,11,x,x,10 (1x.24xx3)
11,x,0,9,8,x,x,10 (4x.21xx3)
8,x,x,9,11,x,0,10 (1xx24x.3)

Resumo Rápido

  • O acorde Sio7b9 contém as notas: Si, Re, Fa, La♭, Do
  • Na afinação Modal D, existem 216 posições disponíveis
  • Também escrito como: Si°7b9
  • Cada diagrama mostra as posições dos dedos no braço da Mandolin

Perguntas Frequentes

O que é o acorde Sio7b9 na Mandolin?

Sio7b9 é um acorde Si o7b9. Contém as notas Si, Re, Fa, La♭, Do. Na Mandolin na afinação Modal D, existem 216 formas de tocar.

Como tocar Sio7b9 na Mandolin?

Para tocar Sio7b9 na na afinação Modal D, use uma das 216 posições mostradas acima.

Quais notas compõem o acorde Sio7b9?

O acorde Sio7b9 contém as notas: Si, Re, Fa, La♭, Do.

De quantas formas se pode tocar Sio7b9 na Mandolin?

Na afinação Modal D, existem 216 posições para Sio7b9. Cada posição usa uma região diferente do braço com as mesmas notas: Si, Re, Fa, La♭, Do.

Quais são os outros nomes para Sio7b9?

Sio7b9 também é conhecido como Si°7b9. São notações diferentes para o mesmo acorde: Si, Re, Fa, La♭, Do.