Acorde ReM9♯11 na Mandolin — Diagrama e Tabs na Afinação Modal D

Resposta curta: ReM9♯11 é um acorde Re M9♯11 com as notas Re, Fa♯, La, Do♯, Mi, Sol♯. Na afinação Modal D, existem 216 posições. Veja os diagramas abaixo.

Também conhecido como: Re9+11

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Como tocar ReM9♯11 no Mandolin

ReM9♯11, Re9+11

Notas: Re, Fa♯, La, Do♯, Mi, Sol♯

x,7,6,0,4,0,4,0 (x43.1.2.)
x,7,6,0,0,4,4,0 (x43..12.)
x,7,4,0,4,0,6,0 (x41.2.3.)
x,7,4,0,0,4,6,0 (x41..23.)
x,7,4,0,4,0,0,6 (x41.2..3)
x,7,0,0,0,4,6,4 (x4...132)
x,7,4,0,0,4,0,6 (x41..2.3)
x,7,6,0,0,4,0,4 (x43..1.2)
x,7,0,0,0,4,4,6 (x4...123)
x,7,0,0,4,0,6,4 (x4..1.32)
x,7,0,0,4,0,4,6 (x4..1.23)
x,7,6,0,4,0,0,4 (x43.1..2)
x,x,4,0,4,0,2,6 (xx2.3.14)
x,x,2,0,0,4,6,4 (xx1..243)
x,x,4,0,0,4,2,6 (xx2..314)
x,x,2,0,4,0,6,4 (xx1.2.43)
x,x,2,0,4,0,4,6 (xx1.2.34)
x,x,2,0,0,4,4,6 (xx1..234)
x,x,6,0,0,4,4,2 (xx4..231)
x,x,6,0,0,4,2,4 (xx4..213)
x,x,4,0,4,0,6,2 (xx2.3.41)
x,x,6,0,4,0,2,4 (xx4.2.13)
x,x,4,0,0,4,6,2 (xx2..341)
x,x,6,0,4,0,4,2 (xx4.2.31)
7,x,6,0,0,4,4,0 (4x3..12.)
7,9,11,0,11,0,0,x (123.4..x)
0,x,6,0,7,4,4,0 (.x3.412.)
4,x,6,0,0,7,4,0 (1x3..42.)
11,7,11,0,9,0,0,x (314.2..x)
4,7,4,0,0,x,6,0 (142..x3.)
0,7,4,0,4,x,6,0 (.41.2x3.)
4,7,4,0,x,0,6,0 (142.x.3.)
7,x,4,0,4,0,6,0 (4x1.2.3.)
11,9,11,0,7,0,0,x (324.1..x)
4,x,4,0,7,0,6,0 (1x2.4.3.)
0,7,4,0,x,4,6,0 (.41.x23.)
7,x,4,0,0,4,6,0 (4x1..23.)
7,11,11,0,9,0,0,x (134.2..x)
0,x,4,0,7,4,6,0 (.x1.423.)
4,x,4,0,0,7,6,0 (1x2..43.)
0,x,4,0,4,7,6,0 (.x1.243.)
11,9,11,0,7,0,x,0 (324.1.x.)
9,11,11,0,7,0,x,0 (234.1.x.)
11,7,11,0,9,0,x,0 (314.2.x.)
7,11,11,0,9,0,x,0 (134.2.x.)
9,7,11,0,11,0,x,0 (213.4.x.)
7,9,11,0,11,0,x,0 (123.4.x.)
4,7,6,0,0,x,4,0 (143..x2.)
0,7,6,0,4,x,4,0 (.43.1x2.)
4,7,6,0,x,0,4,0 (143.x.2.)
7,x,6,0,4,0,4,0 (4x3.1.2.)
9,7,11,0,11,0,0,x (213.4..x)
4,x,6,0,7,0,4,0 (1x3.4.2.)
9,11,11,0,7,0,0,x (234.1..x)
0,7,6,0,x,4,4,0 (.43.x12.)
0,x,6,0,4,7,4,0 (.x3.142.)
4,x,0,0,0,7,4,6 (1x...423)
0,x,0,0,7,4,4,6 (.x..4123)
4,7,6,0,0,x,0,4 (143..x.2)
11,9,11,0,0,7,0,x (324..1.x)
7,x,0,0,0,4,4,6 (4x...123)
0,7,0,0,x,4,4,6 (.4..x123)
4,x,0,0,7,0,4,6 (1x..4.23)
9,11,11,0,0,7,0,x (234..1.x)
0,11,11,0,9,7,0,x (.34.21.x)
7,x,0,0,4,0,4,6 (4x..1.23)
4,7,0,0,x,0,4,6 (14..x.23)
0,7,0,0,4,x,4,6 (.4..1x23)
4,7,0,0,0,x,4,6 (14...x23)
0,9,11,0,11,7,0,x (.23.41.x)
11,7,11,0,0,9,0,x (314..2.x)
0,x,4,0,4,7,0,6 (.x1.24.3)
4,x,4,0,0,7,0,6 (1x2..4.3)
7,11,11,0,0,9,0,x (134..2.x)
0,11,11,0,7,9,0,x (.34.12.x)
0,7,11,0,11,9,0,x (.13.42.x)
9,7,11,0,0,11,0,x (213..4.x)
7,9,11,0,0,11,0,x (123..4.x)
0,x,4,0,7,4,0,6 (.x1.42.3)
0,9,11,0,7,11,0,x (.23.14.x)
7,x,4,0,0,4,0,6 (4x1..2.3)
0,7,4,0,x,4,0,6 (.41.x2.3)
4,x,4,0,7,0,0,6 (1x2.4..3)
11,9,11,0,0,7,x,0 (324..1x.)
7,x,4,0,4,0,0,6 (4x1.2..3)
4,7,4,0,x,0,0,6 (142.x..3)
0,7,4,0,4,x,0,6 (.41.2x.3)
4,7,4,0,0,x,0,6 (142..x.3)
0,x,0,0,4,7,6,4 (.x..1432)
4,x,0,0,0,7,6,4 (1x...432)
0,x,0,0,7,4,6,4 (.x..4132)
9,11,11,0,0,7,x,0 (234..1x.)
0,11,11,0,9,7,x,0 (.34.21x.)
7,x,0,0,0,4,6,4 (4x...132)
0,7,0,0,x,4,6,4 (.4..x132)
4,x,0,0,7,0,6,4 (1x..4.32)
0,9,11,0,11,7,x,0 (.23.41x.)
11,7,11,0,0,9,x,0 (314..2x.)
7,x,0,0,4,0,6,4 (4x..1.32)
7,11,11,0,0,9,x,0 (134..2x.)
4,7,0,0,x,0,6,4 (14..x.32)
0,11,11,0,7,9,x,0 (.34.12x.)
0,7,0,0,4,x,6,4 (.4..1x32)
4,7,0,0,0,x,6,4 (14...x32)
0,7,11,0,11,9,x,0 (.13.42x.)
9,7,11,0,0,11,x,0 (213..4x.)
7,9,11,0,0,11,x,0 (123..4x.)
0,9,11,0,7,11,x,0 (.23.14x.)
0,7,11,0,9,11,x,0 (.13.24x.)
0,7,6,0,4,x,0,4 (.43.1x.2)
4,7,6,0,x,0,0,4 (143.x..2)
7,x,6,0,4,0,0,4 (4x3.1..2)
0,7,11,0,9,11,0,x (.13.24.x)
4,x,6,0,7,0,0,4 (1x3.4..2)
0,7,6,0,x,4,0,4 (.43.x1.2)
7,x,6,0,0,4,0,4 (4x3..1.2)
0,x,0,0,4,7,4,6 (.x..1423)
0,x,6,0,7,4,0,4 (.x3.41.2)
4,x,6,0,0,7,0,4 (1x3..4.2)
0,x,6,0,4,7,0,4 (.x3.14.2)
11,9,x,0,7,0,11,0 (32x.1.4.)
11,7,0,0,0,9,11,x (31...24x)
0,9,x,0,7,11,11,0 (.2x.134.)
7,9,x,0,0,11,11,0 (12x..34.)
9,7,x,0,0,11,11,0 (21x..34.)
0,7,x,0,11,9,11,0 (.1x.324.)
0,11,x,0,7,9,11,0 (.3x.124.)
7,11,x,0,0,9,11,0 (13x..24.)
11,7,x,0,0,9,11,0 (31x..24.)
0,9,x,0,11,7,11,0 (.2x.314.)
0,11,x,0,9,7,11,0 (.3x.214.)
9,11,x,0,0,7,11,0 (23x..14.)
11,9,x,0,0,7,11,0 (32x..14.)
7,9,x,0,11,0,11,0 (12x.3.4.)
9,7,x,0,11,0,11,0 (21x.3.4.)
7,11,x,0,9,0,11,0 (13x.2.4.)
11,7,x,0,9,0,11,0 (31x.2.4.)
9,11,x,0,7,0,11,0 (23x.1.4.)
0,7,x,0,9,11,11,0 (.1x.234.)
0,7,0,0,9,11,11,x (.1..234x)
0,9,0,0,7,11,11,x (.2..134x)
7,9,0,0,0,11,11,x (12...34x)
9,7,0,0,0,11,11,x (21...34x)
0,7,0,0,11,9,11,x (.1..324x)
0,11,0,0,7,9,11,x (.3..124x)
7,11,0,0,0,9,11,x (13...24x)
0,9,0,0,11,7,11,x (.2..314x)
0,11,0,0,9,7,11,x (.3..214x)
9,11,0,0,0,7,11,x (23...14x)
11,9,0,0,0,7,11,x (32...14x)
7,9,0,0,11,0,11,x (12..3.4x)
9,7,0,0,11,0,11,x (21..3.4x)
7,11,0,0,9,0,11,x (13..2.4x)
11,7,0,0,9,0,11,x (31..2.4x)
9,11,0,0,7,0,11,x (23..1.4x)
11,9,0,0,7,0,11,x (32..1.4x)
11,7,x,0,9,0,0,11 (31x.2..4)
9,11,x,0,7,0,0,11 (23x.1..4)
11,9,x,0,7,0,0,11 (32x.1..4)
0,11,x,0,7,9,0,11 (.3x.12.4)
0,7,0,0,9,11,x,11 (.1..23x4)
7,11,x,0,0,9,0,11 (13x..2.4)
11,7,x,0,0,9,0,11 (31x..2.4)
0,9,0,0,7,11,x,11 (.2..13x4)
0,9,x,0,11,7,0,11 (.2x.31.4)
7,9,0,0,0,11,x,11 (12...3x4)
0,11,x,0,9,7,0,11 (.3x.21.4)
9,7,0,0,0,11,x,11 (21...3x4)
0,7,0,0,11,9,x,11 (.1..32x4)
9,11,x,0,0,7,0,11 (23x..1.4)
11,9,x,0,0,7,0,11 (32x..1.4)
7,9,x,0,11,0,0,11 (12x.3..4)
9,7,x,0,11,0,0,11 (21x.3..4)
0,11,0,0,7,9,x,11 (.3..12x4)
0,7,x,0,9,11,0,11 (.1x.23.4)
0,9,x,0,7,11,0,11 (.2x.13.4)
7,11,x,0,9,0,0,11 (13x.2..4)
7,9,x,0,0,11,0,11 (12x..3.4)
9,7,x,0,0,11,0,11 (21x..3.4)
0,7,x,0,11,9,0,11 (.1x.32.4)
11,9,0,0,7,0,x,11 (32..1.x4)
9,11,0,0,7,0,x,11 (23..1.x4)
11,7,0,0,9,0,x,11 (31..2.x4)
7,11,0,0,9,0,x,11 (13..2.x4)
9,7,0,0,11,0,x,11 (21..3.x4)
7,9,0,0,11,0,x,11 (12..3.x4)
11,9,0,0,0,7,x,11 (32...1x4)
9,11,0,0,0,7,x,11 (23...1x4)
0,11,0,0,9,7,x,11 (.3..21x4)
0,9,0,0,11,7,x,11 (.2..31x4)
11,7,0,0,0,9,x,11 (31...2x4)
7,11,0,0,0,9,x,11 (13...2x4)
4,x,6,0,x,0,4,2 (2x4.x.31)
0,x,2,0,x,4,4,6 (.x1.x234)
4,x,2,0,x,0,4,6 (2x1.x.34)
0,x,2,0,4,x,4,6 (.x1.2x34)
4,x,2,0,0,x,4,6 (2x1..x34)
0,x,4,0,x,4,2,6 (.x2.x314)
4,x,4,0,x,0,2,6 (2x3.x.14)
0,x,4,0,4,x,2,6 (.x2.3x14)
4,x,4,0,0,x,2,6 (2x3..x14)
0,x,2,0,x,4,6,4 (.x1.x243)
4,x,6,0,0,x,4,2 (2x4..x31)
0,x,6,0,4,x,4,2 (.x4.2x31)
0,x,6,0,4,x,2,4 (.x4.2x13)
4,x,2,0,x,0,6,4 (2x1.x.43)
0,x,6,0,x,4,4,2 (.x4.x231)
0,x,2,0,4,x,6,4 (.x1.2x43)
4,x,4,0,0,x,6,2 (2x3..x41)
4,x,2,0,0,x,6,4 (2x1..x43)
0,x,4,0,4,x,6,2 (.x2.3x41)
4,x,4,0,x,0,6,2 (2x3.x.41)
0,x,6,0,x,4,2,4 (.x4.x213)
0,x,4,0,x,4,6,2 (.x2.x341)
4,x,6,0,x,0,2,4 (2x4.x.13)
4,x,6,0,0,x,2,4 (2x4..x13)

Resumo Rápido

  • O acorde ReM9♯11 contém as notas: Re, Fa♯, La, Do♯, Mi, Sol♯
  • Na afinação Modal D, existem 216 posições disponíveis
  • Também escrito como: Re9+11
  • Cada diagrama mostra as posições dos dedos no braço da Mandolin

Perguntas Frequentes

O que é o acorde ReM9♯11 na Mandolin?

ReM9♯11 é um acorde Re M9♯11. Contém as notas Re, Fa♯, La, Do♯, Mi, Sol♯. Na Mandolin na afinação Modal D, existem 216 formas de tocar.

Como tocar ReM9♯11 na Mandolin?

Para tocar ReM9♯11 na na afinação Modal D, use uma das 216 posições mostradas acima.

Quais notas compõem o acorde ReM9♯11?

O acorde ReM9♯11 contém as notas: Re, Fa♯, La, Do♯, Mi, Sol♯.

De quantas formas se pode tocar ReM9♯11 na Mandolin?

Na afinação Modal D, existem 216 posições para ReM9♯11. Cada posição usa uma região diferente do braço com as mesmas notas: Re, Fa♯, La, Do♯, Mi, Sol♯.

Quais são os outros nomes para ReM9♯11?

ReM9♯11 também é conhecido como Re9+11. São notações diferentes para o mesmo acorde: Re, Fa♯, La, Do♯, Mi, Sol♯.