Acorde Lab° na 7-String Guitar — Diagrama e Tabs na Afinação 7S Standard

Resposta curta: Lab° é um acorde Lab dim com as notas La♭, Do♭, Mi♭♭. Na afinação 7S Standard, existem 337 posições. Veja os diagramas abaixo.

Também conhecido como: Labmb5, Labmo5, Lab dim, Lab Diminished

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Como tocar Lab° no 7-String Guitar

Lab°, Labmb5, Labmo5, Labdim, LabDiminished

Notas: La♭, Do♭, Mi♭♭

x,4,2,0,4,0,4 (x21.3.4)
x,4,2,0,1,0,4 (x32.1.4)
x,4,5,0,4,0,4 (x14.2.3)
x,4,5,0,1,0,4 (x24.1.3)
x,4,5,0,4,0,7 (x13.2.4)
x,4,5,0,7,0,4 (x13.4.2)
x,4,5,0,7,0,7 (x12.3.4)
x,x,x,6,7,0,7 (xxx12.3)
x,x,x,6,7,0,4 (xxx23.1)
x,x,x,6,4,3,4 (xxx4213)
x,x,11,9,7,9,7 (xx42131)
x,x,x,6,4,3,7 (xxx3214)
x,x,x,6,7,3,7 (xxx2314)
x,x,11,9,7,0,10 (xx421.3)
x,x,11,9,7,0,7 (xx431.2)
x,x,x,6,7,9,7 (xxx1243)
x,x,x,6,7,0,10 (xxx12.3)
x,4,2,0,4,0,x (x21.3.x)
x,4,5,0,4,0,x (x13.2.x)
x,4,2,0,1,0,x (x32.1.x)
x,4,5,0,1,0,x (x23.1.x)
x,4,x,0,4,0,4 (x1x.2.3)
x,4,2,0,4,3,x (x31.42x)
x,4,2,0,x,0,4 (x21.x.3)
x,4,5,6,4,x,4 (x1231x1)
x,4,5,6,4,0,x (x1342.x)
x,4,2,0,1,3,x (x42.13x)
x,4,5,0,x,0,4 (x13.x.2)
x,4,5,0,7,0,x (x12.3.x)
x,4,x,0,1,0,4 (x2x.1.3)
x,4,x,0,4,3,4 (x2x.314)
9,7,5,0,7,0,x (421.3.x)
x,4,5,0,4,3,x (x24.31x)
x,4,2,0,4,x,4 (x21.3x4)
x,4,2,0,x,3,4 (x31.x24)
9,7,x,9,7,9,7 (21x3141)
x,4,5,x,4,0,4 (x14x2.3)
x,4,5,0,4,x,4 (x14.2x3)
x,4,5,6,7,0,x (x1234.x)
x,4,2,0,1,x,4 (x32.1x4)
9,7,11,0,7,0,x (314.2.x)
9,10,11,0,7,0,x (234.1.x)
9,7,x,0,7,0,7 (41x.2.3)
x,4,5,6,4,x,7 (x1231x4)
x,4,x,0,7,0,4 (x1x.3.2)
x,4,x,0,4,0,7 (x1x.2.3)
x,4,5,0,x,0,7 (x12.x.3)
x,4,5,6,x,0,4 (x134x.2)
x,4,x,0,7,0,7 (x1x.2.3)
x,4,5,x,1,0,4 (x24x1.3)
9,10,11,9,x,9,10 (1241x13)
9,7,5,0,x,0,7 (421.x.3)
9,x,5,0,7,0,7 (4x1.2.3)
9,7,11,x,7,9,7 (214x131)
9,7,x,0,7,0,10 (31x.2.4)
9,10,x,0,7,0,10 (23x.1.4)
9,10,x,0,7,0,7 (34x.1.2)
9,7,11,9,7,x,7 (21431x1)
x,4,5,0,7,x,7 (x12.3x4)
x,4,5,6,x,0,7 (x123x.4)
9,10,11,0,x,0,10 (124.x.3)
x,4,5,x,4,0,7 (x13x2.4)
x,4,5,x,7,0,7 (x12x3.4)
x,x,x,6,7,0,x (xxx12.x)
x,4,5,0,4,x,7 (x13.2x4)
x,4,x,6,7,0,4 (x1x34.2)
x,4,5,x,7,0,4 (x13x4.2)
x,4,x,6,7,0,7 (x1x23.4)
x,4,x,0,7,3,7 (x2x.314)
x,4,5,0,x,3,7 (x23.x14)
x,4,x,0,4,3,7 (x2x.314)
9,10,11,0,x,0,7 (234.x.1)
9,7,11,0,x,0,7 (314.x.2)
9,7,11,0,x,0,10 (214.x.3)
9,x,11,0,7,0,7 (3x4.1.2)
9,x,11,0,7,0,10 (2x4.1.3)
x,x,x,6,4,3,x (xxx321x)
x,x,11,9,7,0,x (xx321.x)
x,x,11,9,x,9,10 (xx31x12)
x,x,x,6,7,x,7 (xxx12x3)
x,x,11,x,7,9,7 (xx3x121)
x,x,11,9,7,x,7 (xx321x1)
x,x,11,9,x,0,10 (xx31x.2)
x,x,x,6,x,3,7 (xxx2x13)
x,x,11,x,7,0,7 (xx3x1.2)
x,x,11,9,7,9,x (xx4213x)
x,x,11,x,7,0,10 (xx3x1.2)
x,x,x,6,x,0,10 (xxx1x.2)
x,x,11,9,7,x,10 (xx421x3)
x,4,2,0,x,0,x (x21.x.x)
x,4,5,0,x,0,x (x12.x.x)
x,4,x,0,4,0,x (x1x.2.x)
x,4,x,0,1,0,x (x2x.1.x)
9,7,5,0,x,0,x (321.x.x)
x,4,2,0,4,x,x (x21.3xx)
x,4,x,0,x,0,4 (x1x.x.2)
x,4,5,0,4,x,x (x13.2xx)
x,4,5,6,x,0,x (x123x.x)
x,4,5,6,4,x,x (x1231xx)
x,4,5,x,4,x,4 (x12x1x1)
9,10,11,0,x,0,x (123.x.x)
x,4,2,0,1,x,x (x32.1xx)
x,4,5,x,4,0,x (x13x2.x)
x,4,x,0,4,3,x (x2x.31x)
9,7,x,0,7,0,x (31x.2.x)
x,4,2,0,x,3,x (x31.x2x)
9,7,11,0,x,0,x (213.x.x)
x,4,5,x,1,0,x (x23x1.x)
x,4,x,0,7,0,x (x1x.2.x)
x,4,x,0,4,x,4 (x1x.2x3)
9,7,5,9,x,0,x (3214x.x)
9,7,5,6,x,0,x (4312x.x)
9,x,5,0,7,0,x (3x1.2.x)
9,7,x,9,7,9,x (21x314x)
x,4,2,0,x,x,4 (x21.xx3)
x,4,2,x,4,3,x (x31x42x)
9,10,x,0,7,0,x (23x.1.x)
9,7,x,9,7,x,7 (21x31x1)
9,7,x,x,7,9,7 (21xx131)
9,7,x,9,7,0,x (31x42.x)
x,4,x,6,7,0,x (x1x23.x)
x,4,5,x,x,0,4 (x13xx.2)
9,7,x,6,7,0,x (42x13.x)
x,4,2,x,1,3,x (x42x13x)
9,10,11,9,x,9,x (1231x1x)
9,10,11,9,x,0,x (1342x.x)
9,10,x,9,x,9,10 (12x1x13)
x,4,5,x,7,0,x (x12x3.x)
9,x,5,9,7,0,x (3x142.x)
9,x,5,6,7,0,x (4x123.x)
9,7,5,0,7,x,x (421.3xx)
x,4,x,x,4,3,4 (x2xx314)
9,7,5,x,7,0,x (421x3.x)
x,4,5,x,4,3,x (x24x31x)
9,7,11,9,7,x,x (21431xx)
9,7,x,0,7,9,x (31x.24x)
9,7,x,0,x,0,7 (31x.x.2)
9,x,x,0,7,0,7 (3xx.1.2)
9,x,x,9,7,9,7 (2xx3141)
9,10,x,9,7,0,x (24x31.x)
9,x,11,0,7,0,x (2x3.1.x)
x,4,2,x,x,3,4 (x31xx24)
x,4,x,0,x,0,7 (x1x.x.2)
9,10,x,0,x,0,10 (12x.x.3)
9,x,11,9,x,9,10 (1x31x12)
9,10,x,6,7,0,x (34x12.x)
x,4,5,x,4,x,7 (x12x1x3)
9,x,5,0,x,0,7 (3x1.x.2)
9,7,5,0,x,9,x (321.x4x)
x,4,x,6,4,3,x (x2x431x)
9,7,x,0,7,x,7 (41x.2x3)
9,7,x,x,7,9,10 (21xx134)
9,7,x,9,7,x,10 (21x31x4)
9,10,x,x,7,9,7 (24xx131)
9,10,x,0,x,0,7 (23x.x.1)
9,x,x,0,7,9,7 (3xx.142)
9,7,11,x,7,x,7 (213x1x1)
9,7,11,0,7,x,x (314.2xx)
9,x,x,9,7,0,7 (3xx41.2)
9,7,11,x,7,0,x (314x2.x)
9,x,11,9,7,0,x (2x431.x)
9,10,11,x,7,0,x (234x1.x)
9,7,x,x,7,0,7 (41xx2.3)
9,7,x,0,x,9,7 (31x.x42)
x,4,2,6,x,3,x (x314x2x)
9,7,x,0,x,0,10 (21x.x.3)
9,10,x,9,7,x,7 (24x31x1)
9,7,11,x,7,9,x (214x13x)
9,x,x,0,7,0,10 (2xx.1.3)
x,4,x,0,7,x,7 (x1x.2x3)
x,4,x,0,4,x,7 (x1x.2x3)
x,4,5,x,x,0,7 (x12xx.3)
x,4,5,0,x,x,7 (x12.xx3)
9,x,11,0,x,0,10 (1x3.x.2)
x,4,x,x,7,0,7 (x1xx2.3)
9,10,11,9,x,x,10 (1241xx3)
x,4,x,x,7,0,4 (x1xx3.2)
9,x,x,6,7,0,7 (4xx12.3)
9,10,x,9,x,0,10 (13x2x.4)
9,x,5,x,7,0,7 (4x1x2.3)
9,x,5,0,7,x,7 (4x1.2x3)
9,x,5,0,x,9,7 (3x1.x42)
9,x,5,6,x,0,7 (4x12x.3)
x,4,x,0,x,3,7 (x2x.x13)
9,x,5,9,x,0,7 (3x14x.2)
9,7,5,0,x,x,7 (421.xx3)
9,7,5,x,x,0,7 (421xx.3)
9,10,11,x,7,x,7 (234x1x1)
9,10,x,x,7,0,7 (34xx1.2)
9,x,11,0,x,0,7 (2x3.x.1)
9,x,11,x,7,9,7 (2x4x131)
9,7,x,0,x,9,10 (21x.x34)
9,10,x,x,7,0,10 (23xx1.4)
9,7,x,0,7,x,10 (31x.2x4)
9,x,11,9,7,x,7 (2x431x1)
9,7,x,x,7,0,10 (31xx2.4)
9,7,11,0,x,9,x (214.x3x)
9,x,x,9,7,0,10 (2xx31.4)
9,10,x,0,7,x,7 (34x.1x2)
9,10,x,9,x,0,7 (24x3x.1)
9,10,x,0,x,9,7 (24x.x31)
9,7,x,9,x,0,10 (21x3x.4)
9,7,11,x,7,x,10 (214x1x3)
9,10,x,6,x,0,10 (23x1x.4)
9,x,11,9,x,0,10 (1x42x.3)
9,10,11,x,x,0,10 (124xx.3)
x,4,5,6,x,x,7 (x123xx4)
x,4,x,6,7,x,7 (x1x23x4)
9,x,x,6,7,0,10 (3xx12.4)
9,7,x,6,x,0,10 (32x1x.4)
9,10,x,6,x,0,7 (34x1x.2)
x,4,5,x,7,x,7 (x12x3x4)
x,4,x,6,x,3,7 (x2x3x14)
x,4,x,x,4,3,7 (x2xx314)
x,4,5,x,x,3,7 (x23xx14)
x,4,x,x,7,3,7 (x2xx314)
9,x,11,x,7,0,10 (2x4x1.3)
9,10,11,x,x,0,7 (234xx.1)
9,7,11,x,x,0,10 (214xx.3)
9,7,11,0,x,x,7 (314.xx2)
9,x,11,0,7,x,7 (3x4.1x2)
9,x,11,0,x,9,7 (2x4.x31)
9,10,11,0,x,x,7 (234.xx1)
9,x,11,x,7,0,7 (3x4x1.2)
9,7,11,0,x,x,10 (214.xx3)
x,x,11,x,7,0,x (xx2x1.x)
x,x,11,x,x,0,10 (xx2xx.1)
x,x,11,9,7,x,x (xx321xx)
x,x,11,x,7,x,7 (xx2x1x1)
x,x,11,9,x,x,10 (xx31xx2)
x,4,x,0,x,0,x (x1x.x.x)
9,7,x,0,x,0,x (21x.x.x)
x,4,2,0,x,x,x (x21.xxx)
x,4,5,x,x,0,x (x12xx.x)
9,10,x,0,x,0,x (12x.x.x)
x,4,5,x,4,x,x (x12x1xx)
x,4,x,0,4,x,x (x1x.2xx)
9,x,5,0,x,0,x (2x1.x.x)
9,x,11,0,x,0,x (1x2.x.x)
9,7,5,x,x,0,x (321xx.x)
9,7,5,0,x,x,x (321.xxx)
9,7,x,9,7,x,x (21x31xx)
9,x,x,0,7,0,x (2xx.1.x)
9,10,11,x,x,0,x (123xx.x)
9,10,x,9,x,0,x (13x2x.x)
9,10,x,9,x,9,x (12x1x1x)
9,10,11,9,x,x,x (1231xxx)
9,x,5,9,x,0,x (2x13x.x)
9,x,5,6,x,0,x (3x12x.x)
x,4,x,x,4,3,x (x2xx31x)
9,7,x,x,7,x,7 (21xx1x1)
9,7,x,x,7,9,x (21xx13x)
9,7,x,0,7,x,x (31x.2xx)
9,x,x,9,7,0,x (2xx31.x)
9,7,11,0,x,x,x (213.xxx)
x,4,2,x,x,3,x (x31xx2x)
9,7,x,x,7,0,x (31xx2.x)
9,10,x,6,x,0,x (23x1x.x)
9,x,x,9,x,9,10 (1xx1x12)
x,4,x,x,7,0,x (x1xx2.x)
9,x,x,6,7,0,x (3xx12.x)
9,7,5,6,x,x,x (4312xxx)
9,7,5,9,x,x,x (3214xxx)
9,x,5,x,7,0,x (3x1x2.x)
9,7,11,x,7,x,x (213x1xx)
9,7,x,0,x,9,x (21x.x3x)
9,x,x,x,7,9,7 (2xxx131)
9,10,x,x,7,0,x (23xx1.x)
9,x,x,9,7,x,7 (2xx31x1)
9,x,x,0,x,0,7 (2xx.x.1)
9,7,x,6,7,x,x (42x13xx)
9,10,x,9,x,x,10 (12x1xx3)
9,x,x,0,x,0,10 (1xx.x.2)
9,x,5,9,7,x,x (3x142xx)
9,7,5,x,7,x,x (421x3xx)
9,x,x,0,7,x,7 (3xx.1x2)
9,x,x,x,7,0,7 (3xxx1.2)
9,10,x,x,7,x,7 (23xx1x1)
9,x,x,9,7,9,x (2xx314x)
9,x,11,x,7,0,x (2x3x1.x)
9,7,x,0,x,x,7 (31x.xx2)
9,10,x,9,7,x,x (24x31xx)
9,x,x,0,x,9,7 (2xx.x31)
9,7,x,x,7,x,10 (21xx1x3)
x,4,x,0,x,x,7 (x1x.xx2)
9,10,x,x,x,0,10 (12xxx.3)
9,x,x,9,x,0,10 (1xx2x.3)
9,x,11,9,x,x,10 (1x31xx2)
9,x,5,0,x,x,7 (3x1.xx2)
9,7,5,x,x,9,x (321xx4x)
9,x,5,9,x,9,x (2x13x4x)
9,x,5,x,x,0,7 (3x1xx.2)
9,7,x,x,x,0,10 (21xxx.3)
9,x,x,x,7,0,10 (2xxx1.3)
9,10,x,x,x,0,7 (23xxx.1)
9,x,11,9,7,x,x (2x431xx)
9,10,x,0,x,x,7 (23x.xx1)
9,x,11,x,7,x,7 (2x3x1x1)
9,7,x,0,x,x,10 (21x.xx3)
9,x,11,x,x,0,10 (1x3xx.2)
x,4,x,x,7,x,7 (x1xx2x3)
9,x,x,6,x,0,10 (2xx1x.3)
x,4,5,x,x,x,7 (x12xxx3)
9,x,x,6,7,x,7 (4xx12x3)
9,x,5,6,x,x,7 (4x12xx3)
9,x,5,x,7,x,7 (4x1x2x3)
9,x,5,x,x,9,7 (3x1xx42)
9,7,5,x,x,x,7 (421xxx3)
x,4,x,x,x,3,7 (x2xxx13)
9,x,5,9,x,x,7 (3x14xx2)
9,10,x,9,x,x,7 (24x3xx1)
9,7,x,9,x,x,10 (21x3xx4)
9,7,x,x,x,9,10 (21xxx34)
9,x,x,9,7,x,10 (2xx31x4)
9,10,x,x,x,9,7 (24xxx31)
9,x,11,0,x,x,7 (2x3.xx1)
9,10,x,6,x,x,7 (34x1xx2)
9,7,x,6,x,x,10 (32x1xx4)
9,7,11,x,x,x,10 (214xxx3)
9,10,11,x,x,x,7 (234xxx1)
9,x,x,0,x,0,x (1xx.x.x)
9,7,x,0,x,x,x (21x.xxx)
9,10,x,x,x,0,x (12xxx.x)
9,10,x,9,x,x,x (12x1xxx)
9,x,5,x,x,0,x (2x1xx.x)
9,7,x,x,7,x,x (21xx1xx)
9,7,5,x,x,x,x (321xxxx)
9,x,x,x,7,0,x (2xxx1.x)
9,x,5,9,x,x,x (2x13xxx)
9,x,x,9,7,x,x (2xx31xx)
9,x,x,x,7,x,7 (2xxx1x1)
9,x,x,9,x,x,10 (1xx1xx2)
9,x,x,0,x,x,7 (2xx.xx1)
9,x,x,x,x,0,10 (1xxxx.2)
9,x,5,x,x,x,7 (3x1xxx2)
9,10,x,x,x,x,7 (23xxxx1)
9,7,x,x,x,x,10 (21xxxx3)

Resumo Rápido

  • O acorde Lab° contém as notas: La♭, Do♭, Mi♭♭
  • Na afinação 7S Standard, existem 337 posições disponíveis
  • Também escrito como: Labmb5, Labmo5, Lab dim, Lab Diminished
  • Cada diagrama mostra as posições dos dedos no braço da 7-String Guitar

Perguntas Frequentes

O que é o acorde Lab° na 7-String Guitar?

Lab° é um acorde Lab dim. Contém as notas La♭, Do♭, Mi♭♭. Na 7-String Guitar na afinação 7S Standard, existem 337 formas de tocar.

Como tocar Lab° na 7-String Guitar?

Para tocar Lab° na na afinação 7S Standard, use uma das 337 posições mostradas acima.

Quais notas compõem o acorde Lab°?

O acorde Lab° contém as notas: La♭, Do♭, Mi♭♭.

De quantas formas se pode tocar Lab° na 7-String Guitar?

Na afinação 7S Standard, existem 337 posições para Lab°. Cada posição usa uma região diferente do braço com as mesmas notas: La♭, Do♭, Mi♭♭.

Quais são os outros nomes para Lab°?

Lab° também é conhecido como Labmb5, Labmo5, Lab dim, Lab Diminished. São notações diferentes para o mesmo acorde: La♭, Do♭, Mi♭♭.