Acorde Solm#5 na 7-String Guitar — Diagrama e Tabs na Afinação fake 8 string

Resposta curta: Solm#5 é um acorde Sol m#5 com as notas Sol, Si♭, Re♯. Na afinação fake 8 string, existem 168 posições. Veja os diagramas abaixo.

Também conhecido como: Sol-#5

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Como tocar Solm#5 no 7-String Guitar

Solm#5, Sol-#5

Notas: Sol, Si♭, Re♯

x,1,3,1,1,3,4 (x121134)
x,x,3,1,1,3,4 (xx21134)
x,x,3,1,1,0,4 (xx312.4)
x,x,3,6,5,3,4 (xx14312)
x,x,3,1,5,0,4 (xx214.3)
x,x,x,10,8,8,8 (xxx2111)
x,x,x,x,5,3,4 (xxxx312)
x,x,x,10,8,8,11 (xxx2113)
x,x,x,x,8,0,4 (xxxx2.1)
3,1,3,1,1,3,x (213114x)
x,1,3,1,1,3,x (x12113x)
3,1,x,1,1,3,4 (21x1134)
3,1,3,1,1,x,4 (21311x4)
x,1,3,1,1,0,x (x1423.x)
3,6,3,6,5,3,x (131421x)
x,1,3,1,1,x,4 (x1211x3)
3,x,3,6,5,3,4 (1x14312)
3,6,3,6,x,3,4 (1314x12)
3,6,3,x,5,3,4 (141x312)
x,x,3,1,1,3,x (xx2113x)
x,x,3,1,1,0,x (xx312.x)
x,1,3,x,1,3,4 (x12x134)
x,1,3,1,x,3,4 (x121x34)
x,6,3,6,5,3,x (x31421x)
x,1,3,1,x,0,4 (x132x.4)
x,1,3,x,1,0,4 (x13x2.4)
x,1,3,1,5,x,4 (x1214x3)
x,6,3,6,x,3,4 (x314x12)
x,x,3,1,1,x,4 (xx211x3)
x,6,3,x,5,3,4 (x41x312)
x,x,3,6,5,3,x (xx1321x)
x,x,3,x,5,3,4 (xx1x312)
x,1,3,x,5,0,4 (x12x4.3)
x,x,3,1,x,0,4 (xx21x.3)
x,x,3,6,x,3,4 (xx13x12)
x,10,x,10,8,8,8 (x2x3111)
x,x,3,1,x,3,4 (xx21x34)
x,x,3,x,1,3,4 (xx2x134)
x,x,3,1,5,x,4 (xx214x3)
x,10,x,10,8,8,11 (x2x3114)
x,10,x,6,8,0,8 (x4x12.3)
x,x,x,10,8,8,x (xxx211x)
x,x,x,10,x,8,11 (xxx2x13)
3,1,3,1,1,x,x (21311xx)
3,1,x,1,1,3,x (21x113x)
x,1,3,1,1,x,x (x1211xx)
3,x,3,1,1,0,x (3x412.x)
3,1,x,1,1,0,x (41x23.x)
3,1,3,x,1,0,x (314x2.x)
3,x,3,1,1,3,x (2x3114x)
3,1,3,x,1,3,x (213x14x)
3,1,x,1,1,x,4 (21x11x3)
3,x,3,x,5,3,4 (1x1x312)
3,6,6,6,x,0,x (1234x.x)
3,6,3,x,5,3,x (131x21x)
x,1,3,x,1,3,x (x12x13x)
3,x,3,6,5,3,x (1x1321x)
3,6,3,6,x,3,x (1213x1x)
x,1,3,x,1,0,x (x13x2.x)
x,x,3,1,1,x,x (xx211xx)
3,1,x,x,1,3,4 (21xx134)
3,1,3,x,1,x,4 (213x1x4)
3,x,x,1,1,3,4 (2xx1134)
3,1,x,1,x,3,4 (21x1x34)
3,x,3,1,1,x,4 (2x311x4)
3,1,3,1,x,x,4 (2131xx4)
3,x,6,6,5,0,x (1x342.x)
3,6,6,x,5,0,x (134x2.x)
3,6,3,x,x,3,4 (131xx12)
3,6,6,6,x,3,x (1234x1x)
3,x,6,6,5,3,x (1x3421x)
3,6,x,6,5,3,x (13x421x)
3,x,3,6,x,3,4 (1x13x12)
3,6,6,x,5,3,x (134x21x)
3,1,x,1,5,x,4 (21x14x3)
3,1,x,1,x,0,4 (31x2x.4)
3,1,3,x,x,0,4 (213xx.4)
3,x,x,1,1,0,4 (3xx12.4)
3,1,x,x,1,0,4 (31xx2.4)
3,x,3,1,x,0,4 (2x31x.4)
3,6,x,6,x,3,4 (13x4x12)
x,1,3,x,1,x,4 (x12x1x3)
3,6,x,x,5,3,4 (14xx312)
3,x,6,x,5,3,4 (1x4x312)
3,x,x,6,5,3,4 (1xx4312)
3,6,6,x,x,3,4 (134xx12)
x,1,3,1,x,x,4 (x121xx3)
3,x,6,6,x,3,4 (1x34x12)
x,6,3,x,5,3,x (x31x21x)
x,6,3,6,x,3,x (x213x1x)
x,x,3,x,x,3,4 (xx1xx12)
3,1,x,x,5,0,4 (21xx4.3)
3,x,x,1,5,0,4 (2xx14.3)
3,6,6,x,x,0,4 (134xx.2)
x,1,3,x,x,0,4 (x12xx.3)
3,x,6,6,x,0,4 (1x34x.2)
3,x,6,x,5,0,4 (1x4x3.2)
x,x,3,x,1,3,x (xx2x13x)
x,6,3,x,x,3,4 (x31xx12)
x,x,3,6,x,3,x (xx12x1x)
x,1,3,x,x,3,4 (x12xx34)
x,10,x,10,8,8,x (x2x311x)
x,10,x,x,8,8,8 (x2xx111)
x,1,3,x,5,x,4 (x12x4x3)
x,x,3,1,x,x,4 (xx21xx3)
x,10,x,6,8,0,x (x3x12.x)
x,10,x,x,8,8,11 (x2xx113)
x,10,x,6,8,8,x (x4x123x)
x,10,x,6,8,x,8 (x4x12x3)
x,10,x,10,x,8,11 (x2x3x14)
3,1,x,1,1,x,x (21x11xx)
3,x,3,1,1,x,x (2x311xx)
3,1,3,x,1,x,x (213x1xx)
3,x,x,1,1,3,x (2xx113x)
3,x,x,1,1,0,x (3xx12.x)
3,1,x,x,1,3,x (21xx13x)
3,1,x,x,1,0,x (31xx2.x)
3,6,6,x,x,0,x (123xx.x)
x,1,3,x,1,x,x (x12x1xx)
3,x,3,x,x,3,4 (1x1xx12)
3,x,3,6,x,3,x (1x12x1x)
3,6,3,x,x,3,x (121xx1x)
3,x,6,6,x,0,x (1x23x.x)
3,1,x,1,x,x,4 (21x1xx3)
3,x,3,x,1,3,x (2x3x14x)
3,1,x,x,1,x,4 (21xx1x3)
3,x,x,1,1,x,4 (2xx11x3)
3,x,x,6,5,3,x (1xx321x)
3,6,6,6,x,x,x (1234xxx)
3,6,x,x,5,3,x (13xx21x)
3,x,x,x,5,3,4 (1xxx312)
3,6,6,x,x,3,x (123xx1x)
3,x,6,6,x,3,x (1x23x1x)
3,6,x,6,x,3,x (12x3x1x)
3,x,x,1,x,0,4 (2xx1x.3)
3,1,x,x,x,0,4 (21xxx.3)
3,x,6,x,x,3,4 (1x3xx12)
3,x,x,6,x,3,4 (1xx3x12)
3,6,x,x,x,3,4 (13xxx12)
3,6,6,x,5,x,x (134x2xx)
3,x,6,6,5,x,x (1x342xx)
x,6,3,x,x,3,x (x21xx1x)
3,1,x,x,x,3,4 (21xxx34)
3,x,x,1,x,3,4 (2xx1x34)
3,1,3,x,x,x,4 (213xxx4)
3,x,x,x,1,3,4 (2xxx134)
3,x,3,1,x,x,4 (2x31xx4)
3,x,6,x,x,0,4 (1x3xx.2)
3,x,x,1,5,x,4 (2xx14x3)
3,1,x,x,5,x,4 (21xx4x3)
x,1,3,x,x,x,4 (x12xxx3)
3,x,6,6,x,x,4 (1x34xx2)
3,6,6,x,x,x,4 (134xxx2)
3,x,6,x,5,x,4 (1x4x3x2)
x,10,x,x,8,8,x (x2xx11x)
x,10,x,6,8,x,x (x3x12xx)
x,10,x,x,x,8,11 (x2xxx13)
3,x,x,1,1,x,x (2xx11xx)
3,1,x,x,1,x,x (21xx1xx)
3,x,x,x,x,3,4 (1xxxx12)
3,6,6,x,x,x,x (123xxxx)
3,x,x,x,1,3,x (2xxx13x)
3,6,x,x,x,3,x (12xxx1x)
3,x,6,6,x,x,x (1x23xxx)
3,x,x,6,x,3,x (1xx2x1x)
3,x,x,1,x,x,4 (2xx1xx3)
3,1,x,x,x,x,4 (21xxxx3)
3,x,6,x,x,x,4 (1x3xxx2)

Resumo Rápido

  • O acorde Solm#5 contém as notas: Sol, Si♭, Re♯
  • Na afinação fake 8 string, existem 168 posições disponíveis
  • Também escrito como: Sol-#5
  • Cada diagrama mostra as posições dos dedos no braço da 7-String Guitar

Perguntas Frequentes

O que é o acorde Solm#5 na 7-String Guitar?

Solm#5 é um acorde Sol m#5. Contém as notas Sol, Si♭, Re♯. Na 7-String Guitar na afinação fake 8 string, existem 168 formas de tocar.

Como tocar Solm#5 na 7-String Guitar?

Para tocar Solm#5 na na afinação fake 8 string, use uma das 168 posições mostradas acima.

Quais notas compõem o acorde Solm#5?

O acorde Solm#5 contém as notas: Sol, Si♭, Re♯.

De quantas formas se pode tocar Solm#5 na 7-String Guitar?

Na afinação fake 8 string, existem 168 posições para Solm#5. Cada posição usa uma região diferente do braço com as mesmas notas: Sol, Si♭, Re♯.

Quais são os outros nomes para Solm#5?

Solm#5 também é conhecido como Sol-#5. São notações diferentes para o mesmo acorde: Sol, Si♭, Re♯.