La#7b9 accordo per chitarra — schema e tablatura in accordatura Irish

Risposta breve: La#7b9 è un accordo La# 7b9 con le note La♯, Dox, Mi♯, Sol♯, Si. In accordatura Irish ci sono 304 posizioni. Vedi i diagrammi sotto.

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Come suonare La#7b9 su Mandolin

La#7b9

Note: La♯, Dox, Mi♯, Sol♯, Si

x,x,9,8,11,8,0,0 (xx3142..)
x,x,9,8,8,11,0,0 (xx3124..)
x,x,0,8,11,8,9,0 (xx.1423.)
x,x,0,8,8,11,9,0 (xx.1243.)
x,x,0,8,11,8,0,9 (xx.142.3)
x,x,0,8,8,11,0,9 (xx.124.3)
x,x,x,8,11,8,9,0 (xxx1423.)
x,x,x,8,8,11,9,0 (xxx1243.)
x,x,x,8,11,8,0,9 (xxx142.3)
x,x,x,8,8,11,0,9 (xxx124.3)
1,3,0,3,2,x,0,0 (13.42x..)
1,3,3,0,2,x,0,0 (134.2x..)
1,3,3,0,x,2,0,0 (134.x2..)
1,3,0,3,x,2,0,0 (13.4x2..)
1,3,0,0,2,x,3,0 (13..2x4.)
1,3,0,0,x,2,3,0 (13..x24.)
1,3,0,0,x,2,0,3 (13..x2.4)
1,3,0,0,2,x,0,3 (13..2x.4)
4,3,3,3,x,5,3,6 (2111x314)
4,3,6,3,x,5,3,3 (2141x311)
4,3,6,3,5,x,3,3 (21413x11)
4,3,3,3,5,x,6,3 (21113x41)
4,3,3,6,5,x,3,3 (21143x11)
4,3,3,3,5,x,3,6 (21113x14)
4,3,3,3,x,5,6,3 (2111x341)
4,3,3,6,x,5,3,3 (2114x311)
x,3,6,3,2,x,0,0 (x2431x..)
x,3,3,6,2,x,0,0 (x2341x..)
x,3,6,3,x,2,0,0 (x243x1..)
x,3,3,6,x,2,0,0 (x234x1..)
x,3,0,6,2,x,3,0 (x2.41x3.)
x,3,0,3,2,x,6,0 (x2.31x4.)
x,3,3,0,2,x,6,0 (x23.1x4.)
x,3,6,0,2,x,3,0 (x24.1x3.)
x,3,6,0,x,2,3,0 (x24.x13.)
x,3,0,3,x,2,6,0 (x2.3x14.)
x,3,3,0,x,2,6,0 (x23.x14.)
x,3,0,6,x,2,3,0 (x2.4x13.)
x,3,3,0,2,x,0,6 (x23.1x.4)
x,3,3,0,x,2,0,6 (x23.x1.4)
x,3,0,6,2,x,0,3 (x2.41x.3)
x,3,6,0,2,x,0,3 (x24.1x.3)
x,3,6,0,x,2,0,3 (x24.x1.3)
x,3,0,0,2,x,6,3 (x2..1x43)
x,3,0,3,x,2,0,6 (x2.3x1.4)
x,3,0,0,x,2,3,6 (x2..x134)
x,3,0,0,2,x,3,6 (x2..1x34)
x,3,0,6,x,2,0,3 (x2.4x1.3)
x,3,0,3,2,x,0,6 (x2.31x.4)
x,3,0,0,x,2,6,3 (x2..x143)
x,x,9,8,x,8,6,0 (xx42x31.)
x,x,9,8,8,x,6,0 (xx423x1.)
x,x,6,8,x,8,9,0 (xx12x34.)
x,x,6,8,8,x,9,0 (xx123x4.)
x,x,9,8,8,11,0,x (xx3124.x)
x,x,9,8,11,8,0,x (xx3142.x)
x,x,9,8,11,8,x,0 (xx3142x.)
x,x,9,8,8,11,x,0 (xx3124x.)
x,x,6,8,8,x,0,9 (xx123x.4)
x,x,0,8,x,8,9,6 (xx.2x341)
x,x,9,8,x,8,0,6 (xx42x3.1)
x,x,0,8,x,8,6,9 (xx.2x314)
x,x,9,8,8,x,0,6 (xx423x.1)
x,x,0,8,8,x,6,9 (xx.23x14)
x,x,6,8,x,8,0,9 (xx12x3.4)
x,x,0,8,8,x,9,6 (xx.23x41)
x,x,0,8,8,11,9,x (xx.1243x)
x,x,0,8,11,8,9,x (xx.1423x)
x,x,0,8,8,11,x,9 (xx.124x3)
x,x,0,8,11,8,x,9 (xx.142x3)
1,3,0,3,2,x,x,0 (13.42xx.)
1,3,3,0,2,x,0,x (134.2x.x)
1,3,0,3,2,x,0,x (13.42x.x)
1,3,x,3,2,x,0,0 (13x42x..)
1,3,3,0,2,x,x,0 (134.2xx.)
1,3,3,x,2,x,0,0 (134x2x..)
1,3,0,3,x,2,x,0 (13.4x2x.)
1,3,x,3,x,2,0,0 (13x4x2..)
1,3,3,0,x,2,x,0 (134.x2x.)
1,3,3,0,x,2,0,x (134.x2.x)
1,3,3,x,x,2,0,0 (134xx2..)
1,3,0,3,x,2,0,x (13.4x2.x)
4,3,3,6,x,x,0,0 (3124xx..)
4,3,6,3,x,x,0,0 (3142xx..)
1,3,0,0,2,x,3,x (13..2x4x)
1,3,0,0,x,2,3,x (13..x24x)
1,3,x,0,x,2,3,0 (13x.x24.)
1,3,0,x,x,2,3,0 (13.xx24.)
1,3,x,0,2,x,3,0 (13x.2x4.)
1,3,0,x,2,x,3,0 (13.x2x4.)
1,3,x,0,2,x,0,3 (13x.2x.4)
1,3,x,0,x,2,0,3 (13x.x2.4)
1,3,0,0,x,2,x,3 (13..x2x4)
1,3,0,x,2,x,0,3 (13.x2x.4)
1,3,0,x,x,2,0,3 (13.xx2.4)
1,3,0,0,2,x,x,3 (13..2xx4)
4,3,3,6,x,5,3,x (2114x31x)
4,3,3,3,x,5,6,x (2111x34x)
4,3,6,3,5,x,3,x (21413x1x)
4,3,3,6,5,x,3,x (21143x1x)
4,3,6,3,x,5,3,x (2141x31x)
4,3,3,3,5,x,6,x (21113x4x)
4,x,6,8,8,x,0,0 (1x234x..)
4,3,3,x,x,5,3,6 (211xx314)
4,3,3,6,x,5,x,3 (2114x3x1)
4,3,x,6,5,x,3,3 (21x43x11)
4,3,6,0,x,x,3,0 (314.xx2.)
4,3,x,3,5,x,3,6 (21x13x14)
4,3,0,6,x,x,3,0 (31.4xx2.)
4,3,6,x,5,x,3,3 (214x3x11)
4,3,3,x,5,x,6,3 (211x3x41)
4,3,x,3,5,x,6,3 (21x13x41)
4,3,3,x,5,x,3,6 (211x3x14)
4,3,3,x,x,5,6,3 (211xx341)
4,3,x,3,x,5,6,3 (21x1x341)
4,3,6,x,x,5,3,3 (214xx311)
4,3,6,3,5,x,x,3 (21413xx1)
4,3,3,3,5,x,x,6 (21113xx4)
4,3,3,6,5,x,x,3 (21143xx1)
4,3,x,6,x,5,3,3 (21x4x311)
4,3,3,3,x,5,x,6 (2111x3x4)
4,3,0,3,x,x,6,0 (31.2xx4.)
4,3,x,3,x,5,3,6 (21x1x314)
4,3,6,3,x,5,x,3 (2141x3x1)
4,3,3,0,x,x,6,0 (312.xx4.)
x,3,3,6,2,x,x,0 (x2341xx.)
x,3,6,3,2,x,0,x (x2431x.x)
x,3,3,6,2,x,0,x (x2341x.x)
x,3,6,3,2,x,x,0 (x2431xx.)
4,x,6,8,x,8,0,0 (1x23x4..)
4,3,3,0,x,x,0,6 (312.xx.4)
4,3,0,0,x,x,3,6 (31..xx24)
4,3,6,0,x,x,0,3 (314.xx.2)
4,3,0,3,x,x,0,6 (31.2xx.4)
4,3,0,0,x,x,6,3 (31..xx42)
4,3,0,6,x,x,0,3 (31.4xx.2)
10,x,9,8,11,x,0,0 (3x214x..)
x,3,6,3,x,2,0,x (x243x1.x)
x,3,3,6,x,2,0,x (x234x1.x)
4,x,0,8,x,8,6,0 (1x.3x42.)
4,x,0,8,8,x,6,0 (1x.34x2.)
x,3,6,3,x,2,x,0 (x243x1x.)
x,3,3,6,x,2,x,0 (x234x1x.)
10,x,9,8,x,11,0,0 (3x21x4..)
x,3,6,0,2,x,3,x (x24.1x3x)
x,3,3,0,2,x,6,x (x23.1x4x)
x,3,6,x,x,2,3,0 (x24xx13.)
x,3,6,x,2,x,3,0 (x24x1x3.)
4,x,0,8,8,x,0,6 (1x.34x.2)
x,3,3,0,x,2,6,x (x23.x14x)
x,3,3,x,2,x,6,0 (x23x1x4.)
x,3,0,6,x,2,3,x (x2.4x13x)
x,3,x,3,2,x,6,0 (x2x31x4.)
x,3,6,0,x,2,3,x (x24.x13x)
x,3,0,3,x,2,6,x (x2.3x14x)
x,3,x,6,x,2,3,0 (x2x4x13.)
4,x,0,8,x,8,0,6 (1x.3x4.2)
x,3,x,6,2,x,3,0 (x2x41x3.)
x,3,3,x,x,2,6,0 (x23xx14.)
x,3,0,6,2,x,3,x (x2.41x3x)
x,3,0,3,2,x,6,x (x2.31x4x)
x,3,x,3,x,2,6,0 (x2x3x14.)
10,x,0,8,11,x,9,0 (3x.14x2.)
10,x,0,8,x,11,9,0 (3x.1x42.)
x,3,6,x,x,2,0,3 (x24xx1.3)
x,3,0,x,x,2,6,3 (x2.xx143)
x,3,x,0,x,2,6,3 (x2x.x143)
x,3,x,0,2,x,6,3 (x2x.1x43)
x,3,0,x,2,x,6,3 (x2.x1x43)
x,3,3,0,2,x,x,6 (x23.1xx4)
x,3,6,0,x,2,x,3 (x24.x1x3)
x,3,0,6,x,2,x,3 (x2.4x1x3)
x,3,0,3,2,x,x,6 (x2.31xx4)
x,3,6,0,2,x,x,3 (x24.1xx3)
x,3,3,0,x,2,x,6 (x23.x1x4)
x,3,0,3,x,2,x,6 (x2.3x1x4)
x,3,3,x,2,x,0,6 (x23x1x.4)
x,3,x,3,2,x,0,6 (x2x31x.4)
x,3,3,x,x,2,0,6 (x23xx1.4)
x,3,x,3,x,2,0,6 (x2x3x1.4)
x,3,x,6,x,2,0,3 (x2x4x1.3)
x,3,0,6,2,x,x,3 (x2.41xx3)
x,3,6,x,2,x,0,3 (x24x1x.3)
x,3,0,x,2,x,3,6 (x2.x1x34)
x,3,x,0,x,2,3,6 (x2x.x134)
x,3,0,x,x,2,3,6 (x2.xx134)
x,3,x,6,2,x,0,3 (x2x41x.3)
x,3,x,0,2,x,3,6 (x2x.1x34)
10,x,0,8,x,11,0,9 (3x.1x4.2)
10,x,0,8,11,x,0,9 (3x.14x.2)
1,3,3,0,2,x,x,x (134.2xxx)
1,3,3,x,2,x,x,0 (134x2xx.)
1,3,x,3,2,x,x,0 (13x42xx.)
1,3,x,3,2,x,0,x (13x42x.x)
1,3,3,x,2,x,0,x (134x2x.x)
1,3,0,3,2,x,x,x (13.42xxx)
1,3,3,0,x,2,x,x (134.x2xx)
1,3,0,3,x,2,x,x (13.4x2xx)
1,3,3,x,x,2,x,0 (134xx2x.)
1,3,x,3,x,2,0,x (13x4x2.x)
1,3,3,x,x,2,0,x (134xx2.x)
1,3,x,3,x,2,x,0 (13x4x2x.)
4,3,3,6,5,x,x,x (21143xxx)
4,3,6,3,x,x,0,x (3142xx.x)
4,3,6,3,x,x,x,0 (3142xxx.)
4,3,3,6,x,x,x,0 (3124xxx.)
4,3,6,3,5,x,x,x (21413xxx)
4,3,3,6,x,x,0,x (3124xx.x)
1,3,x,x,x,2,3,0 (13xxx24.)
1,3,x,x,2,x,3,0 (13xx2x4.)
1,3,0,x,x,2,3,x (13.xx24x)
1,3,x,0,x,2,3,x (13x.x24x)
1,3,x,0,2,x,3,x (13x.2x4x)
1,3,0,x,2,x,3,x (13.x2x4x)
4,3,6,3,x,5,x,x (2141x3xx)
4,3,3,6,x,5,x,x (2114x3xx)
1,3,0,x,2,x,x,3 (13.x2xx4)
1,3,x,x,x,2,0,3 (13xxx2.4)
1,3,0,x,x,2,x,3 (13.xx2x4)
1,3,x,x,2,x,0,3 (13xx2x.4)
1,3,x,0,x,2,x,3 (13x.x2x4)
1,3,x,0,2,x,x,3 (13x.2xx4)
4,3,6,x,5,x,3,x (214x3x1x)
4,3,x,3,x,5,6,x (21x1x34x)
4,3,3,x,x,5,6,x (211xx34x)
4,3,x,6,5,x,3,x (21x43x1x)
4,3,x,3,5,x,6,x (21x13x4x)
4,3,3,x,5,x,6,x (211x3x4x)
4,3,6,x,x,5,3,x (214xx31x)
4,3,x,6,x,5,3,x (21x4x31x)
4,x,6,8,8,x,0,x (1x234x.x)
4,x,6,8,8,x,x,0 (1x234xx.)
4,3,x,x,x,5,6,3 (21xxx341)
4,3,3,x,5,x,x,6 (211x3xx4)
4,3,6,0,x,x,3,x (314.xx2x)
4,3,x,6,5,x,x,3 (21x43xx1)
4,3,0,6,x,x,3,x (31.4xx2x)
4,3,x,x,5,x,3,6 (21xx3x14)
4,3,x,3,x,x,6,0 (31x2xx4.)
4,3,3,x,x,5,x,6 (211xx3x4)
4,3,x,3,x,5,x,6 (21x1x3x4)
4,3,3,x,x,x,6,0 (312xxx4.)
4,3,x,x,5,x,6,3 (21xx3x41)
4,3,6,x,x,5,x,3 (214xx3x1)
4,3,x,3,5,x,x,6 (21x13xx4)
4,3,x,6,x,x,3,0 (31x4xx2.)
4,3,x,6,x,5,x,3 (21x4x3x1)
4,3,6,x,x,x,3,0 (314xxx2.)
4,3,6,x,5,x,x,3 (214x3xx1)
4,3,x,x,x,5,3,6 (21xxx314)
4,3,0,3,x,x,6,x (31.2xx4x)
4,3,3,0,x,x,6,x (312.xx4x)
3,x,3,x,x,2,6,0 (2x3xx14.)
3,x,3,x,2,x,6,0 (2x3x1x4.)
3,x,6,x,2,x,3,0 (2x4x1x3.)
3,x,6,x,x,2,3,0 (2x4xx13.)
4,x,6,8,x,8,0,x (1x23x4.x)
4,x,6,8,x,8,x,0 (1x23x4x.)
4,3,x,6,x,x,0,3 (31x4xx.2)
4,3,6,0,x,x,x,3 (314.xxx2)
4,3,3,0,x,x,x,6 (312.xxx4)
4,3,x,3,x,x,0,6 (31x2xx.4)
4,3,x,0,x,x,3,6 (31x.xx24)
4,3,6,x,x,x,0,3 (314xxx.2)
4,3,3,x,x,x,0,6 (312xxx.4)
4,3,0,x,x,x,6,3 (31.xxx42)
4,3,0,3,x,x,x,6 (31.2xxx4)
4,3,x,0,x,x,6,3 (31x.xx42)
4,3,0,6,x,x,x,3 (31.4xxx2)
4,3,0,x,x,x,3,6 (31.xxx24)
3,x,3,x,2,x,0,6 (2x3x1x.4)
3,x,3,x,x,2,0,6 (2x3xx1.4)
3,x,0,x,x,2,6,3 (2x.xx143)
3,x,0,x,2,x,3,6 (2x.x1x34)
10,x,9,8,11,x,0,x (3x214x.x)
3,x,0,x,x,2,3,6 (2x.xx134)
3,x,6,x,x,2,0,3 (2x4xx1.3)
3,x,6,x,2,x,0,3 (2x4x1x.3)
10,x,9,8,11,x,x,0 (3x214xx.)
3,x,0,x,2,x,6,3 (2x.x1x43)
4,x,x,8,x,8,6,0 (1xx3x42.)
4,x,0,8,x,8,6,x (1x.3x42x)
4,x,0,8,8,x,6,x (1x.34x2x)
4,x,x,8,8,x,6,0 (1xx34x2.)
10,x,9,8,x,11,x,0 (3x21x4x.)
10,x,9,8,x,11,0,x (3x21x4.x)
4,x,x,8,x,8,0,6 (1xx3x4.2)
4,x,0,8,x,8,x,6 (1x.3x4x2)
4,x,0,8,8,x,x,6 (1x.34xx2)
4,x,x,8,8,x,0,6 (1xx34x.2)
10,x,9,8,x,x,6,0 (4x32xx1.)
10,x,6,8,x,x,9,0 (4x12xx3.)
10,x,x,8,x,11,9,0 (3xx1x42.)
10,x,x,8,11,x,9,0 (3xx14x2.)
10,x,0,8,11,x,9,x (3x.14x2x)
10,x,0,8,x,11,9,x (3x.1x42x)
10,x,6,8,x,x,0,9 (4x12xx.3)
10,x,0,8,x,x,9,6 (4x.2xx31)
10,x,9,8,x,x,0,6 (4x32xx.1)
10,x,0,8,x,x,6,9 (4x.2xx13)
10,x,x,8,11,x,0,9 (3xx14x.2)
10,x,0,8,x,11,x,9 (3x.1x4x2)
10,x,0,8,11,x,x,9 (3x.14xx2)
10,x,x,8,x,11,0,9 (3xx1x4.2)

Riepilogo

  • L'accordo La#7b9 contiene le note: La♯, Dox, Mi♯, Sol♯, Si
  • In accordatura Irish ci sono 304 posizioni disponibili
  • Ogni diagramma mostra la posizione delle dita sulla tastiera della Mandolin

Domande frequenti

Cos'è l'accordo La#7b9 alla Mandolin?

La#7b9 è un accordo La# 7b9. Contiene le note La♯, Dox, Mi♯, Sol♯, Si. Alla Mandolin in accordatura Irish, ci sono 304 modi per suonare questo accordo.

Come si suona La#7b9 alla Mandolin?

Per suonare La#7b9 in accordatura Irish, usa una delle 304 posizioni sopra. Ogni diagramma mostra la posizione delle dita sulla tastiera.

Quali note contiene l'accordo La#7b9?

L'accordo La#7b9 contiene le note: La♯, Dox, Mi♯, Sol♯, Si.

Quante posizioni ci sono per La#7b9?

In accordatura Irish ci sono 304 posizioni per l'accordo La#7b9. Ciascuna usa una posizione diversa sulla tastiera con le stesse note: La♯, Dox, Mi♯, Sol♯, Si.