ReM9♯11 accordo per chitarra — schema e tablatura in accordatura Drop a

Risposta breve: ReM9♯11 è un accordo Re M9♯11 con le note Re, Fa♯, La, Do♯, Mi, Sol♯. In accordatura Drop a ci sono 166 posizioni. Vedi i diagrammi sotto.

Conosciuto anche come: Re9+11

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Come suonare ReM9♯11 su 7-String Guitar

ReM9♯11, Re9+11

Note: Re, Fa♯, La, Do♯, Mi, Sol♯

0,2,0,0,1,2,0 (.2..13.)
0,0,0,0,1,2,2 (....123)
x,2,0,0,1,2,0 (x2..13.)
4,2,0,0,1,2,0 (42..13.)
0,2,4,0,1,2,0 (.24.13.)
4,2,0,0,1,3,0 (42..13.)
0,2,4,0,1,3,0 (.24.13.)
x,0,0,0,1,2,2 (x...123)
4,0,0,0,1,3,2 (4...132)
5,2,0,0,1,2,0 (42..13.)
0,0,4,0,1,3,2 (..4.132)
0,2,5,0,1,2,0 (.24.13.)
4,0,0,0,1,2,2 (4...123)
4,2,0,0,1,5,0 (32..14.)
0,2,4,0,1,5,0 (.23.14.)
0,0,4,0,1,2,2 (..4.123)
0,4,0,0,6,7,0 (.1..23.)
0,0,5,0,1,2,2 (..4.123)
0,4,4,0,7,7,0 (.12.34.)
0,0,0,0,6,7,4 (....231)
0,0,4,0,1,5,2 (..3.142)
5,0,0,0,1,2,2 (4...123)
4,0,0,0,1,5,2 (3...142)
4,4,0,0,6,7,0 (12..34.)
5,4,0,0,6,7,0 (21..34.)
7,4,0,0,6,7,0 (31..24.)
0,4,4,0,6,7,0 (.12.34.)
0,4,5,0,6,7,0 (.12.34.)
0,4,7,0,6,7,0 (.13.24.)
4,4,0,0,7,7,0 (12..34.)
9,0,0,0,6,9,0 (2...13.)
9,9,0,0,9,9,0 (12..34.)
0,9,9,0,9,9,0 (.12.34.)
0,0,9,0,6,9,0 (..2.13.)
0,2,0,0,6,5,4 (.1..432)
0,4,0,0,6,5,2 (.2..431)
0,0,4,0,6,7,4 (..1.342)
7,0,0,0,6,7,4 (3...241)
4,0,0,0,7,7,4 (1...342)
0,0,4,0,7,7,4 (..1.342)
0,0,5,0,6,7,4 (..2.341)
0,0,7,0,6,7,4 (..3.241)
0,9,9,0,7,9,0 (.23.14.)
9,9,0,0,7,9,0 (23..14.)
4,0,0,0,6,7,4 (1...342)
5,0,0,0,6,7,4 (2...341)
x,4,0,0,6,7,0 (x1..23.)
9,9,0,0,6,9,0 (23..14.)
0,0,9,0,9,9,9 (..1.234)
0,9,0,0,11,9,0 (.1..32.)
0,9,9,0,6,9,0 (.23.14.)
9,0,0,0,9,9,9 (1...234)
0,5,9,0,6,9,0 (.13.24.)
9,5,0,0,6,9,0 (31..24.)
0,0,9,0,7,9,9 (..2.134)
9,0,0,0,7,9,9 (2...134)
0,9,11,0,11,10,0 (.13.42.)
x,0,0,0,6,7,4 (x...231)
0,10,9,0,6,9,0 (.42.13.)
0,0,0,0,11,9,9 (....312)
9,10,0,0,6,9,0 (24..13.)
0,0,9,0,6,9,9 (..2.134)
9,0,0,0,6,9,9 (2...134)
11,9,0,0,11,10,0 (31..42.)
0,9,11,0,11,9,0 (.13.42.)
0,9,9,0,11,9,0 (.12.43.)
11,9,0,0,11,9,0 (31..42.)
9,9,0,0,11,9,0 (12..43.)
0,0,9,0,6,9,5 (..3.241)
9,0,0,0,6,9,5 (3...241)
11,9,0,0,11,7,0 (32..41.)
7,9,0,0,11,9,0 (12..43.)
x,4,0,0,6,5,2 (x2..431)
x,2,0,0,6,5,4 (x1..432)
0,9,11,0,11,7,0 (.23.41.)
0,9,11,0,9,7,0 (.24.31.)
11,9,0,0,9,7,0 (42..31.)
0,9,11,0,7,7,0 (.34.12.)
11,9,0,0,7,7,0 (43..12.)
0,9,7,0,11,9,0 (.21.43.)
11,0,0,0,11,10,9 (3...421)
9,0,0,0,6,9,10 (2...134)
0,0,11,0,11,9,9 (..3.412)
0,0,9,0,6,9,10 (..2.134)
0,0,9,0,11,9,9 (..1.423)
0,0,11,0,11,10,9 (..3.421)
11,0,0,0,11,9,9 (3...412)
9,0,0,0,11,9,9 (1...423)
x,9,0,0,11,9,0 (x1..32.)
11,0,0,0,9,7,9 (4...213)
7,0,0,0,11,9,9 (1...423)
11,0,0,0,11,7,9 (3...412)
0,0,11,0,9,7,9 (..4.213)
0,0,7,0,11,9,9 (..1.423)
0,0,11,0,11,7,9 (..3.412)
x,5,9,0,6,9,0 (x13.24.)
11,0,0,0,7,7,9 (4...123)
0,0,11,0,7,7,9 (..4.123)
x,9,11,0,11,10,0 (x13.42.)
x,0,0,0,11,9,9 (x...312)
x,0,9,0,6,9,5 (x.3.241)
x,0,11,0,11,10,9 (x.3.421)
0,2,x,0,1,2,0 (.2x.13.)
0,2,4,0,1,x,0 (.23.1x.)
0,0,x,0,1,2,2 (..x.123)
4,2,0,0,1,x,0 (32..1x.)
4,0,0,0,1,x,2 (3...1x2)
0,0,4,0,1,x,2 (..3.1x2)
4,2,0,0,1,5,x (32..14x)
4,4,0,0,x,7,0 (12..x3.)
0,4,4,0,x,7,0 (.12.x3.)
0,4,x,0,6,7,0 (.1x.23.)
0,2,4,0,1,5,x (.23.14x)
9,9,0,0,x,9,0 (12..x3.)
0,9,9,0,x,9,0 (.12.x3.)
4,4,0,0,x,5,2 (23..x41)
4,2,0,0,x,5,4 (21..x43)
0,4,4,0,x,5,2 (.23.x41)
0,2,4,0,x,5,4 (.12.x43)
4,x,0,0,1,5,2 (3x..142)
0,4,7,0,6,7,x (.13.24x)
0,0,x,0,6,7,4 (..x.231)
7,4,0,0,6,7,x (31..24x)
4,0,0,0,x,7,4 (1...x32)
0,x,4,0,1,5,2 (.x3.142)
0,0,4,0,x,7,4 (..1.x32)
0,9,9,0,9,9,x (.12.34x)
11,9,0,0,11,x,0 (21..3x.)
0,x,9,0,6,9,0 (.x2.13.)
9,0,0,0,6,9,x (2...13x)
9,x,0,0,6,9,0 (2x..13.)
0,9,11,0,11,x,0 (.12.3x.)
9,0,0,0,x,9,9 (1...x23)
0,0,9,0,x,9,9 (..1.x23)
9,9,0,0,9,9,x (12..34x)
0,0,9,0,6,9,x (..2.13x)
0,2,x,0,6,5,4 (.1x.432)
0,4,x,0,6,5,2 (.2x.431)
7,x,0,0,6,7,4 (3x..241)
0,x,7,0,6,7,4 (.x3.241)
9,x,0,0,9,9,9 (1x..234)
0,x,9,0,9,9,9 (.x1.234)
0,9,x,0,11,9,0 (.1x.32.)
9,5,x,0,6,9,0 (31x.24.)
11,9,0,0,x,7,0 (32..x1.)
0,9,11,0,x,7,0 (.23.x1.)
11,0,0,0,11,x,9 (2...3x1)
0,0,x,0,11,9,9 (..x.312)
0,0,11,0,11,x,9 (..2.3x1)
11,9,9,0,x,10,0 (412.x3.)
9,9,11,0,x,10,0 (124.x3.)
11,9,x,0,11,10,0 (31x.42.)
9,0,x,0,6,9,5 (3.x.241)
7,9,0,0,11,9,x (12..43x)
0,0,11,0,x,7,9 (..3.x12)
11,9,0,0,9,7,x (42..31x)
11,0,0,0,x,7,9 (3...x12)
0,9,11,0,9,7,x (.24.31x)
0,9,7,0,11,9,x (.21.43x)
11,0,9,0,x,10,9 (4.1.x32)
11,0,x,0,11,10,9 (3.x.421)
9,0,11,0,x,10,9 (1.4.x32)
0,x,11,0,9,7,9 (.x4.213)
7,x,0,0,11,9,9 (1x..423)
11,x,0,0,9,7,9 (4x..213)
0,x,7,0,11,9,9 (.x1.423)

Riepilogo

  • L'accordo ReM9♯11 contiene le note: Re, Fa♯, La, Do♯, Mi, Sol♯
  • In accordatura Drop a ci sono 166 posizioni disponibili
  • Scritto anche come: Re9+11
  • Ogni diagramma mostra la posizione delle dita sulla tastiera della 7-String Guitar

Domande frequenti

Cos'è l'accordo ReM9♯11 alla 7-String Guitar?

ReM9♯11 è un accordo Re M9♯11. Contiene le note Re, Fa♯, La, Do♯, Mi, Sol♯. Alla 7-String Guitar in accordatura Drop a, ci sono 166 modi per suonare questo accordo.

Come si suona ReM9♯11 alla 7-String Guitar?

Per suonare ReM9♯11 in accordatura Drop a, usa una delle 166 posizioni sopra. Ogni diagramma mostra la posizione delle dita sulla tastiera.

Quali note contiene l'accordo ReM9♯11?

L'accordo ReM9♯11 contiene le note: Re, Fa♯, La, Do♯, Mi, Sol♯.

Quante posizioni ci sono per ReM9♯11?

In accordatura Drop a ci sono 166 posizioni per l'accordo ReM9♯11. Ciascuna usa una posizione diversa sulla tastiera con le stesse note: Re, Fa♯, La, Do♯, Mi, Sol♯.

Quali altri nomi ha ReM9♯11?

ReM9♯11 è anche conosciuto come Re9+11. Sono notazioni diverse per lo stesso accordo: Re, Fa♯, La, Do♯, Mi, Sol♯.