Acorde Sol#° na Guitar — Diagrama e Tabs na Afinação Collins

Resposta curta: Sol#° é um acorde Sol# dim com as notas Sol♯, Si, Re. Na afinação Collins, existem 190 posições. Veja os diagramas abaixo.

Também conhecido como: Sol#mb5, Sol#mo5, Sol# dim, Sol# Diminished

Acordes de PianoInstrumentosAfinações

Como tocar Sol#° no Guitar

Sol#°, Sol#mb5, Sol#mo5, Sol#dim, Sol#Diminished

Notas: Sol♯, Si, Re

7,6,7,6,6,7 (213114)
x,0,1,3,3,1 (x.1342)
7,6,10,6,6,10 (213114)
7,6,7,6,6,10 (213114)
10,0,10,9,0,10 (2.31.4)
7,6,10,6,6,7 (214113)
x,0,7,6,6,7 (x.3124)
10,0,10,9,0,7 (3.42.1)
10,0,7,9,0,7 (4.13.2)
7,0,10,9,0,7 (1.43.2)
7,0,7,9,0,10 (1.23.4)
10,0,7,9,0,10 (3.12.4)
x,x,7,6,6,7 (xx2113)
7,0,10,9,0,10 (1.32.4)
x,0,10,9,0,10 (x.21.3)
x,x,x,3,3,1 (xxx231)
x,0,10,9,0,7 (x.32.1)
x,0,7,9,0,10 (x.12.3)
x,0,10,6,6,10 (x.3124)
x,0,10,9,6,10 (x.3214)
x,0,10,6,6,7 (x.4123)
x,0,7,6,6,10 (x.3124)
x,0,10,9,6,7 (x.4312)
x,0,7,9,6,10 (x.2314)
x,x,7,6,6,10 (xx2113)
x,x,10,9,0,10 (xx21.3)
x,x,7,9,0,10 (xx12.3)
x,x,10,9,0,7 (xx32.1)
x,x,x,9,0,10 (xxx1.2)
x,x,7,9,6,10 (xx2314)
7,6,7,6,6,x (21311x)
7,6,7,6,0,x (3142.x)
7,6,x,6,6,7 (21x113)
x,0,1,3,3,x (x.123x)
10,0,10,9,0,x (2.31.x)
x,0,1,x,3,1 (x.1x32)
x,0,x,3,3,1 (x.x231)
7,3,7,3,6,x (31412x)
7,6,7,3,3,x (32411x)
7,6,7,6,x,7 (2131x4)
7,x,7,6,6,7 (2x3114)
7,0,7,6,6,x (3.412x)
7,0,10,9,0,x (1.32.x)
10,0,7,9,0,x (3.12.x)
7,0,x,6,6,7 (3.x124)
7,6,x,6,0,7 (31x2.4)
7,6,x,3,3,7 (32x114)
7,3,x,3,6,7 (31x124)
7,6,10,6,6,x (21311x)
x,0,7,6,6,x (x.312x)
x,0,10,9,0,x (x.21.x)
x,x,7,6,6,x (xx211x)
10,0,x,9,0,10 (2.x1.3)
7,6,10,6,0,x (3142.x)
7,6,10,9,0,x (2143.x)
7,6,x,6,6,10 (21x113)
7,6,10,9,6,x (21431x)
x,0,x,6,6,7 (x.x123)
10,0,x,9,0,7 (3.x2.1)
7,0,x,9,0,10 (1.x2.3)
7,6,7,x,6,10 (213x14)
7,6,7,6,x,10 (2131x4)
7,0,10,9,6,x (2.431x)
7,6,10,6,x,10 (2131x4)
10,0,7,9,6,x (4.231x)
10,0,10,6,6,x (3.412x)
7,6,x,9,6,10 (21x314)
7,0,10,6,6,x (3.412x)
7,6,10,6,x,7 (2141x3)
7,x,10,6,6,7 (2x4113)
7,x,10,6,6,10 (2x3114)
7,x,7,6,6,10 (2x3114)
7,6,10,x,6,10 (213x14)
7,6,10,x,6,7 (214x13)
10,0,10,9,6,x (3.421x)
10,0,10,9,x,10 (2.31x4)
10,0,7,6,6,x (4.312x)
x,0,x,9,0,10 (x.x1.2)
10,0,7,9,x,7 (4.13x2)
7,x,10,9,0,7 (1x43.2)
7,x,10,9,0,10 (1x32.4)
10,0,10,9,x,7 (3.42x1)
7,x,7,9,0,10 (1x23.4)
10,0,7,9,x,10 (3.12x4)
7,0,7,9,x,10 (1.23x4)
7,0,10,9,x,7 (1.43x2)
x,x,10,9,0,x (xx21.x)
7,0,10,9,x,10 (1.32x4)
10,0,7,x,6,7 (4.2x13)
10,0,7,x,6,10 (3.2x14)
7,6,10,x,0,7 (214x.3)
7,0,10,x,6,7 (2.4x13)
10,0,10,x,6,7 (3.4x12)
7,6,x,9,0,10 (21x3.4)
10,0,x,9,6,7 (4.x312)
10,0,x,9,6,10 (3.x214)
10,0,10,x,6,10 (2.3x14)
7,0,x,9,6,10 (2.x314)
10,0,x,6,6,7 (4.x123)
7,0,x,6,6,10 (3.x124)
10,0,x,6,6,10 (3.x124)
7,0,7,x,6,10 (2.3x14)
7,6,7,x,0,10 (213x.4)
7,6,x,6,0,10 (31x2.4)
7,6,10,x,0,10 (213x.4)
7,0,10,x,6,10 (2.3x14)
x,0,10,6,6,x (x.312x)
x,0,10,9,x,10 (x.21x3)
x,0,10,9,6,x (x.321x)
x,0,10,9,x,7 (x.32x1)
x,0,7,9,x,10 (x.12x3)
x,0,7,x,6,10 (x.2x13)
x,0,10,x,6,10 (x.2x13)
x,0,x,6,6,10 (x.x123)
x,0,10,x,6,7 (x.3x12)
x,0,x,9,6,10 (x.x213)
x,x,7,9,x,10 (xx12x3)
x,x,7,x,6,10 (xx2x13)
7,6,x,6,6,x (21x11x)
7,6,7,6,x,x (2131xx)
x,0,1,x,3,x (x.1x2x)
7,x,7,6,6,x (2x311x)
7,6,x,6,0,x (31x2.x)
7,0,x,6,6,x (3.x12x)
7,6,x,3,3,x (32x11x)
7,x,x,6,6,7 (2xx113)
7,6,x,6,x,7 (21x1x3)
7,3,x,3,6,x (31x12x)
x,0,x,x,3,1 (x.xx21)
10,0,x,9,0,x (2.x1.x)
x,0,x,6,6,x (x.x12x)
7,6,10,6,x,x (2131xx)
10,0,10,9,x,x (2.31xx)
7,6,10,x,0,x (213x.x)
10,0,7,9,x,x (3.12xx)
7,x,10,9,0,x (1x32.x)
7,0,10,9,x,x (1.32xx)
7,6,7,x,3,x (324x1x)
7,x,10,6,6,x (2x311x)
7,6,x,6,3,x (42x31x)
7,3,x,6,6,x (41x23x)
7,6,10,x,6,x (213x1x)
7,3,7,x,6,x (314x2x)
x,0,10,9,x,x (x.21xx)
7,x,7,9,x,10 (1x12x3)
7,x,10,9,x,7 (1x32x1)
7,6,x,x,3,7 (32xx14)
10,0,10,x,6,x (2.3x1x)
7,6,x,6,x,10 (21x1x3)
7,3,x,x,6,7 (31xx24)
7,6,10,9,x,x (2143xx)
10,0,7,x,6,x (3.2x1x)
7,6,x,x,6,10 (21xx13)
10,0,x,9,6,x (3.x21x)
7,0,10,x,6,x (2.3x1x)
7,x,x,6,6,10 (2xx113)
10,0,x,9,x,10 (2.x1x3)
10,0,x,6,6,x (3.x12x)
7,x,x,9,0,10 (1xx2.3)
10,0,x,9,x,7 (3.x2x1)
7,0,x,9,x,10 (1.x2x3)
7,6,x,x,0,10 (21xx.3)
7,0,x,x,6,10 (2.xx13)
10,0,x,x,6,10 (2.xx13)
10,0,x,x,6,7 (3.xx12)
7,x,10,9,6,x (2x431x)
x,0,x,9,x,10 (x.x1x2)
x,0,10,x,6,x (x.2x1x)
7,x,10,9,x,10 (1x32x4)
7,x,x,9,6,10 (2xx314)
7,6,10,x,x,10 (213xx4)
7,6,x,9,x,10 (21x3x4)
7,6,7,x,x,10 (213xx4)
7,x,10,x,6,10 (2x3x14)
7,x,10,x,6,7 (2x4x13)
7,6,10,x,x,7 (214xx3)
7,x,7,x,6,10 (2x3x14)
x,0,x,x,6,10 (x.xx12)
7,6,x,6,x,x (21x1xx)
7,x,x,6,6,x (2xx11x)
10,0,x,9,x,x (2.x1xx)
7,3,x,x,6,x (31xx2x)
7,6,x,x,3,x (32xx1x)
7,6,10,x,x,x (213xxx)
7,x,10,9,x,x (1x32xx)
10,0,x,x,6,x (2.xx1x)
7,x,10,x,6,x (2x3x1x)
7,x,x,9,x,10 (1xx2x3)
7,x,x,x,6,10 (2xxx13)
7,6,x,x,x,10 (21xxx3)

Resumo Rápido

  • O acorde Sol#° contém as notas: Sol♯, Si, Re
  • Na afinação Collins, existem 190 posições disponíveis
  • Também escrito como: Sol#mb5, Sol#mo5, Sol# dim, Sol# Diminished
  • Cada diagrama mostra as posições dos dedos no braço da Guitar

Perguntas Frequentes

O que é o acorde Sol#° na Guitar?

Sol#° é um acorde Sol# dim. Contém as notas Sol♯, Si, Re. Na Guitar na afinação Collins, existem 190 formas de tocar.

Como tocar Sol#° na Guitar?

Para tocar Sol#° na na afinação Collins, use uma das 190 posições mostradas acima.

Quais notas compõem o acorde Sol#°?

O acorde Sol#° contém as notas: Sol♯, Si, Re.

De quantas formas se pode tocar Sol#° na Guitar?

Na afinação Collins, existem 190 posições para Sol#°. Cada posição usa uma região diferente do braço com as mesmas notas: Sol♯, Si, Re.

Quais são os outros nomes para Sol#°?

Sol#° também é conhecido como Sol#mb5, Sol#mo5, Sol# dim, Sol# Diminished. São notações diferentes para o mesmo acorde: Sol♯, Si, Re.