Acorde Fa#7b13 na Mandolin — Diagrama e Tabs na Afinação Modal D

Resposta curta: Fa#7b13 é um acorde Fa# 7b13 com as notas Fa♯, La♯, Do♯, Mi, Re. Na afinação Modal D, existem 252 posições. Veja os diagramas abaixo.

Também conhecido como: Fa#7-13

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Como tocar Fa#7b13 no Mandolin

Fa#7b13, Fa#7-13

Notas: Fa♯, La♯, Do♯, Mi, Re

x,x,2,4,1,4,0,0 (xx2314..)
x,x,2,4,4,1,0,0 (xx2341..)
x,x,0,4,4,1,2,0 (xx.3412.)
x,x,0,4,1,4,2,0 (xx.3142.)
x,x,0,4,4,1,0,2 (xx.341.2)
x,x,0,4,1,4,0,2 (xx.314.2)
x,x,8,4,7,4,0,0 (xx4132..)
x,x,8,4,4,7,0,0 (xx4123..)
x,x,x,4,4,1,2,0 (xxx3412.)
x,x,x,4,1,4,2,0 (xxx3142.)
x,x,0,4,7,4,8,0 (xx.1324.)
x,x,0,4,4,7,8,0 (xx.1234.)
x,x,x,4,4,1,0,2 (xxx341.2)
x,x,x,4,1,4,0,2 (xxx314.2)
x,x,0,4,7,4,0,8 (xx.132.4)
x,x,0,4,4,7,0,8 (xx.123.4)
x,x,x,4,7,4,8,0 (xxx1324.)
x,x,x,4,4,7,8,0 (xxx1234.)
x,x,x,4,7,4,0,8 (xxx132.4)
x,x,x,4,4,7,0,8 (xxx123.4)
7,x,8,4,5,4,4,4 (3x412111)
4,x,4,4,5,7,8,4 (1x112341)
4,x,4,4,5,7,4,8 (1x112314)
4,x,8,4,5,7,4,4 (1x412311)
5,x,8,4,4,7,4,4 (2x411311)
4,x,8,4,7,5,4,4 (1x413211)
7,x,4,4,4,5,4,8 (3x111214)
7,x,8,4,4,5,4,4 (3x411211)
5,x,4,4,7,4,4,8 (2x113114)
7,x,4,4,5,4,8,4 (3x112141)
5,x,4,4,7,4,8,4 (2x113141)
7,x,4,4,5,4,4,8 (3x112114)
5,x,4,4,4,7,4,8 (2x111314)
7,x,4,4,4,5,8,4 (3x111241)
4,x,4,4,7,5,4,8 (1x113214)
4,x,4,4,7,5,8,4 (1x113241)
5,x,4,4,4,7,8,4 (2x111341)
5,x,8,4,7,4,4,4 (2x413111)
x,x,2,4,4,1,0,x (xx2341.x)
x,x,2,4,1,4,0,x (xx2314.x)
x,x,2,4,1,4,x,0 (xx2314x.)
x,x,2,4,4,1,x,0 (xx2341x.)
x,x,0,4,4,1,2,x (xx.3412x)
x,x,0,4,1,4,2,x (xx.3142x)
x,9,11,8,7,x,0,0 (x3421x..)
x,9,8,11,7,x,0,0 (x3241x..)
x,x,0,4,1,4,x,2 (xx.314x2)
x,x,0,4,4,1,x,2 (xx.341x2)
x,9,11,8,x,7,0,0 (x342x1..)
x,9,8,11,x,7,0,0 (x324x1..)
x,x,8,4,4,7,0,x (xx4123.x)
x,x,8,4,7,4,0,x (xx4132.x)
x,x,8,4,7,4,x,0 (xx4132x.)
x,x,8,4,4,7,x,0 (xx4123x.)
x,9,0,8,x,7,11,0 (x3.2x14.)
x,9,0,8,7,x,11,0 (x3.21x4.)
x,9,0,11,x,7,8,0 (x3.4x12.)
x,9,0,11,7,x,8,0 (x3.41x2.)
x,x,0,4,4,7,8,x (xx.1234x)
x,x,0,4,7,4,8,x (xx.1324x)
x,9,0,8,x,7,0,11 (x3.2x1.4)
x,9,0,8,7,x,0,11 (x3.21x.4)
x,9,0,11,x,7,0,8 (x3.4x1.2)
x,9,0,11,7,x,0,8 (x3.41x.2)
x,x,0,4,7,4,x,8 (xx.132x4)
x,x,0,4,4,7,x,8 (xx.123x4)
4,x,2,4,1,x,0,0 (3x241x..)
1,x,2,4,4,x,0,0 (1x234x..)
4,x,2,4,x,1,0,0 (3x24x1..)
1,x,2,4,x,4,0,0 (1x23x4..)
1,x,0,4,x,4,2,0 (1x.3x42.)
4,x,0,4,x,1,2,0 (3x.4x12.)
1,x,0,4,4,x,2,0 (1x.34x2.)
4,x,0,4,1,x,2,0 (3x.41x2.)
4,x,0,4,x,1,0,2 (3x.4x1.2)
7,x,8,4,4,x,0,0 (3x412x..)
4,x,8,4,7,x,0,0 (1x423x..)
1,x,0,4,x,4,0,2 (1x.3x4.2)
1,x,0,4,4,x,0,2 (1x.34x.2)
4,x,0,4,1,x,0,2 (3x.41x.2)
7,9,8,11,x,x,0,0 (1324xx..)
5,x,4,4,7,4,8,x (2x11314x)
7,x,8,4,5,4,4,x (3x41211x)
4,x,4,4,5,7,8,x (1x11234x)
5,x,4,4,4,7,8,x (2x11134x)
7,x,8,4,x,4,0,0 (3x41x2..)
7,x,4,4,4,5,8,x (3x11124x)
5,x,8,4,7,4,4,x (2x41311x)
7,x,8,4,4,5,4,x (3x41121x)
4,x,8,4,7,5,4,x (1x41321x)
7,x,4,4,5,4,8,x (3x11214x)
4,x,8,4,5,7,4,x (1x41231x)
5,x,8,4,4,7,4,x (2x41131x)
4,x,8,4,x,7,0,0 (1x42x3..)
7,9,11,8,x,x,0,0 (1342xx..)
4,x,4,4,7,5,8,x (1x11324x)
5,x,x,4,4,7,4,8 (2xx11314)
5,x,4,4,7,4,x,8 (2x1131x4)
4,x,8,4,5,7,x,4 (1x4123x1)
7,x,4,4,5,4,x,8 (3x1121x4)
4,x,0,4,7,x,8,0 (1x.23x4.)
5,x,8,4,4,7,x,4 (2x4113x1)
7,x,4,4,4,5,x,8 (3x1112x4)
7,x,0,4,x,4,8,0 (3x.1x24.)
4,x,4,4,7,5,x,8 (1x1132x4)
7,x,x,4,4,5,4,8 (3xx11214)
4,x,8,4,7,5,x,4 (1x4132x1)
7,x,8,4,4,5,x,4 (3x4112x1)
4,x,0,4,x,7,8,0 (1x.2x34.)
5,x,8,4,7,4,x,4 (2x4131x1)
4,x,x,4,5,7,8,4 (1xx12341)
5,x,4,4,4,7,x,8 (2x1113x4)
5,x,x,4,7,4,4,8 (2xx13114)
4,x,x,4,7,5,4,8 (1xx13214)
5,x,x,4,4,7,8,4 (2xx11341)
7,x,8,4,5,4,x,4 (3x4121x1)
7,x,x,4,5,4,8,4 (3xx12141)
4,x,x,4,5,7,4,8 (1xx12314)
7,x,x,4,5,4,4,8 (3xx12114)
5,x,x,4,7,4,8,4 (2xx13141)
7,x,x,4,4,5,8,4 (3xx11241)
4,x,4,4,5,7,x,8 (1x1123x4)
7,x,0,4,4,x,8,0 (3x.12x4.)
4,x,x,4,7,5,8,4 (1xx13241)
7,x,0,4,x,4,0,8 (3x.1x2.4)
7,x,0,4,4,x,0,8 (3x.12x.4)
4,x,0,4,x,7,0,8 (1x.2x3.4)
4,x,0,4,7,x,0,8 (1x.23x.4)
7,9,0,11,x,x,8,0 (13.4xx2.)
7,9,0,8,x,x,11,0 (13.2xx4.)
x,9,11,8,7,x,0,x (x3421x.x)
x,9,8,11,7,x,0,x (x3241x.x)
x,9,8,11,7,x,x,0 (x3241xx.)
x,9,11,8,7,x,x,0 (x3421xx.)
7,9,0,8,x,x,0,11 (13.2xx.4)
7,9,0,11,x,x,0,8 (13.4xx.2)
x,9,11,8,x,7,x,0 (x342x1x.)
x,9,11,8,x,7,0,x (x342x1.x)
x,9,8,11,x,7,x,0 (x324x1x.)
x,9,8,11,x,7,0,x (x324x1.x)
x,9,8,x,7,x,11,0 (x32x1x4.)
x,9,0,8,7,x,11,x (x3.21x4x)
x,9,0,11,7,x,8,x (x3.41x2x)
x,9,11,x,x,7,8,0 (x34xx12.)
x,9,x,11,7,x,8,0 (x3x41x2.)
x,9,11,x,7,x,8,0 (x34x1x2.)
x,9,x,11,x,7,8,0 (x3x4x12.)
x,9,x,8,7,x,11,0 (x3x21x4.)
x,9,8,x,x,7,11,0 (x32xx14.)
x,9,x,8,x,7,11,0 (x3x2x14.)
x,9,0,11,x,7,8,x (x3.4x12x)
x,9,0,8,x,7,11,x (x3.2x14x)
x,9,0,x,x,7,8,11 (x3.xx124)
x,9,0,8,x,7,x,11 (x3.2x1x4)
x,9,0,8,7,x,x,11 (x3.21xx4)
x,9,x,11,7,x,0,8 (x3x41x.2)
x,9,x,11,x,7,0,8 (x3x4x1.2)
x,9,x,8,x,7,0,11 (x3x2x1.4)
x,9,8,x,x,7,0,11 (x32xx1.4)
x,9,11,x,7,x,0,8 (x34x1x.2)
x,9,0,x,x,7,11,8 (x3.xx142)
x,9,0,x,7,x,8,11 (x3.x1x24)
x,9,11,x,x,7,0,8 (x34xx1.2)
x,9,0,11,x,7,x,8 (x3.4x1x2)
x,9,0,x,7,x,11,8 (x3.x1x42)
x,9,x,8,7,x,0,11 (x3x21x.4)
x,9,0,11,7,x,x,8 (x3.41xx2)
x,9,8,x,7,x,0,11 (x32x1x.4)
1,x,2,4,4,x,x,0 (1x234xx.)
1,x,2,4,4,x,0,x (1x234x.x)
4,x,2,4,1,x,x,0 (3x241xx.)
4,x,2,4,1,x,0,x (3x241x.x)
1,x,2,4,x,4,0,x (1x23x4.x)
4,x,2,4,x,1,x,0 (3x24x1x.)
1,x,2,4,x,4,x,0 (1x23x4x.)
4,x,2,4,x,1,0,x (3x24x1.x)
4,x,0,4,x,1,2,x (3x.4x12x)
1,x,0,4,4,x,2,x (1x.34x2x)
1,x,x,4,x,4,2,0 (1xx3x42.)
4,x,x,4,x,1,2,0 (3xx4x12.)
1,x,x,4,4,x,2,0 (1xx34x2.)
4,x,x,4,1,x,2,0 (3xx41x2.)
4,x,0,4,1,x,2,x (3x.41x2x)
1,x,0,4,x,4,2,x (1x.3x42x)
4,x,8,4,7,x,0,x (1x423x.x)
4,x,x,4,1,x,0,2 (3xx41x.2)
1,x,0,4,x,4,x,2 (1x.3x4x2)
4,x,0,4,x,1,x,2 (3x.4x1x2)
1,x,0,4,4,x,x,2 (1x.34xx2)
4,x,0,4,1,x,x,2 (3x.41xx2)
7,x,8,4,4,5,x,x (3x4112xx)
4,x,8,4,7,5,x,x (1x4132xx)
4,x,x,4,x,1,0,2 (3xx4x1.2)
5,x,8,4,7,4,x,x (2x4131xx)
7,x,8,4,4,x,x,0 (3x412xx.)
5,x,8,4,4,7,x,x (2x4113xx)
4,x,8,4,7,x,x,0 (1x423xx.)
4,x,8,4,5,7,x,x (1x4123xx)
1,x,x,4,x,4,0,2 (1xx3x4.2)
1,x,x,4,4,x,0,2 (1xx34x.2)
7,x,8,4,4,x,0,x (3x412x.x)
7,x,8,4,5,4,x,x (3x4121xx)
4,x,8,4,x,7,0,x (1x42x3.x)
4,x,8,4,x,7,x,0 (1x42x3x.)
7,9,11,8,x,x,0,x (1342xx.x)
7,9,8,11,x,x,0,x (1324xx.x)
7,9,8,11,x,x,x,0 (1324xxx.)
7,9,11,8,x,x,x,0 (1342xxx.)
7,x,8,4,x,4,x,0 (3x41x2x.)
4,x,x,4,5,7,8,x (1xx1234x)
5,x,x,4,4,7,8,x (2xx1134x)
4,x,x,4,7,5,8,x (1xx1324x)
7,x,x,4,4,5,8,x (3xx1124x)
5,x,x,4,7,4,8,x (2xx1314x)
7,x,x,4,5,4,8,x (3xx1214x)
7,x,8,4,x,4,0,x (3x41x2.x)
5,x,x,4,4,7,x,8 (2xx113x4)
7,x,0,4,4,x,8,x (3x.12x4x)
4,x,x,4,7,5,x,8 (1xx132x4)
4,x,0,4,x,7,8,x (1x.2x34x)
7,x,x,4,x,4,8,0 (3xx1x24.)
7,x,x,4,5,4,x,8 (3xx121x4)
4,x,x,4,5,7,x,8 (1xx123x4)
4,x,x,4,x,7,8,0 (1xx2x34.)
7,x,0,4,x,4,8,x (3x.1x24x)
4,x,0,4,7,x,8,x (1x.23x4x)
4,x,x,4,7,x,8,0 (1xx23x4.)
5,x,x,4,7,4,x,8 (2xx131x4)
7,x,x,4,4,5,x,8 (3xx112x4)
7,x,x,4,4,x,8,0 (3xx12x4.)
4,x,0,4,7,x,x,8 (1x.23xx4)
7,x,0,4,x,4,x,8 (3x.1x2x4)
7,x,x,4,x,4,0,8 (3xx1x2.4)
4,x,x,4,x,7,0,8 (1xx2x3.4)
7,x,0,4,4,x,x,8 (3x.12xx4)
4,x,0,4,x,7,x,8 (1x.2x3x4)
4,x,x,4,7,x,0,8 (1xx23x.4)
7,x,x,4,4,x,0,8 (3xx12x.4)
7,9,x,11,x,x,8,0 (13x4xx2.)
7,9,0,8,x,x,11,x (13.2xx4x)
7,9,0,11,x,x,8,x (13.4xx2x)
7,9,11,x,x,x,8,0 (134xxx2.)
7,9,8,x,x,x,11,0 (132xxx4.)
7,9,x,8,x,x,11,0 (13x2xx4.)
7,9,x,11,x,x,0,8 (13x4xx.2)
7,9,8,x,x,x,0,11 (132xxx.4)
7,9,0,11,x,x,x,8 (13.4xxx2)
7,9,11,x,x,x,0,8 (134xxx.2)
7,9,0,8,x,x,x,11 (13.2xxx4)
7,9,0,x,x,x,8,11 (13.xxx24)
7,9,0,x,x,x,11,8 (13.xxx42)
7,9,x,8,x,x,0,11 (13x2xx.4)

Resumo Rápido

  • O acorde Fa#7b13 contém as notas: Fa♯, La♯, Do♯, Mi, Re
  • Na afinação Modal D, existem 252 posições disponíveis
  • Também escrito como: Fa#7-13
  • Cada diagrama mostra as posições dos dedos no braço da Mandolin

Perguntas Frequentes

O que é o acorde Fa#7b13 na Mandolin?

Fa#7b13 é um acorde Fa# 7b13. Contém as notas Fa♯, La♯, Do♯, Mi, Re. Na Mandolin na afinação Modal D, existem 252 formas de tocar.

Como tocar Fa#7b13 na Mandolin?

Para tocar Fa#7b13 na na afinação Modal D, use uma das 252 posições mostradas acima.

Quais notas compõem o acorde Fa#7b13?

O acorde Fa#7b13 contém as notas: Fa♯, La♯, Do♯, Mi, Re.

De quantas formas se pode tocar Fa#7b13 na Mandolin?

Na afinação Modal D, existem 252 posições para Fa#7b13. Cada posição usa uma região diferente do braço com as mesmas notas: Fa♯, La♯, Do♯, Mi, Re.

Quais são os outros nomes para Fa#7b13?

Fa#7b13 também é conhecido como Fa#7-13. São notações diferentes para o mesmo acorde: Fa♯, La♯, Do♯, Mi, Re.