Lamaj7b5 accordo per chitarra — schema e tablatura in accordatura Modal D

Risposta breve: Lamaj7b5 è un accordo La maj7b5 con le note La, Do♯, Mi♭, Sol♯. In accordatura Modal D ci sono 405 posizioni. Vedi i diagrammi sotto.

Conosciuto anche come: LaM7b5, LaMa7b5, Laj7b5, LaΔ7b5, LaΔb5

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Come suonare Lamaj7b5 su Mandolin

LaM7b5, LaMa7b5, Laj7b5, LaΔ7b5, LaΔb5, Lamaj7b5

Note: La, Do♯, Mi♭, Sol♯

x,x,x,7,6,4,6,x (xxx4213x)
x,x,x,7,4,6,6,x (xxx4123x)
x,x,x,7,4,6,x,6 (xxx412x3)
x,x,x,7,6,4,x,6 (xxx421x3)
6,0,6,6,4,0,x,x (2.341.xx)
4,0,6,6,6,0,x,x (1.234.xx)
4,0,7,6,6,0,x,x (1.423.xx)
6,0,7,6,4,0,x,x (2.431.xx)
4,0,6,7,6,0,x,x (1.243.xx)
6,0,6,6,0,4,x,x (2.34.1xx)
6,0,6,7,4,0,x,x (2.341.xx)
0,0,6,6,4,6,x,x (..2314xx)
0,0,6,6,6,4,x,x (..2341xx)
4,0,6,6,0,6,x,x (1.23.4xx)
0,0,6,7,6,4,x,x (..2431xx)
0,0,6,x,6,4,6,x (..2x314x)
0,0,x,6,6,4,6,x (..x2314x)
0,0,6,7,4,6,x,x (..2413xx)
4,0,x,6,6,0,6,x (1.x23.4x)
6,0,7,6,0,4,x,x (2.43.1xx)
6,0,6,7,0,4,x,x (2.34.1xx)
6,0,x,6,0,4,6,x (2.x3.14x)
0,0,7,6,4,6,x,x (..4213xx)
4,0,6,x,0,6,6,x (1.2x.34x)
6,0,6,x,4,0,6,x (2.3x1.4x)
4,0,x,6,0,6,6,x (1.x2.34x)
0,0,6,x,4,6,6,x (..2x134x)
0,0,x,6,4,6,6,x (..x2134x)
4,0,6,7,0,6,x,x (1.24.3xx)
4,0,6,x,6,0,6,x (1.2x3.4x)
4,0,7,6,0,6,x,x (1.42.3xx)
6,0,x,6,4,0,6,x (2.x31.4x)
6,0,6,x,0,4,6,x (2.3x.14x)
0,0,7,6,6,4,x,x (..4231xx)
4,0,7,x,0,6,6,x (1.4x.23x)
4,0,x,6,0,6,7,x (1.x2.34x)
0,0,x,6,6,4,7,x (..x2314x)
0,0,6,x,6,4,7,x (..2x314x)
6,0,x,6,0,4,7,x (2.x3.14x)
4,0,x,6,0,6,x,6 (1.x2.3x4)
6,0,6,x,0,4,7,x (2.3x.14x)
4,0,x,6,6,0,7,x (1.x23.4x)
4,0,6,x,6,0,7,x (1.2x3.4x)
6,0,x,6,4,0,7,x (2.x31.4x)
6,0,6,x,4,0,7,x (2.3x1.4x)
0,0,x,7,4,6,6,x (..x4123x)
4,0,7,x,6,0,6,x (1.4x2.3x)
0,0,6,x,4,6,7,x (..2x134x)
0,0,x,6,4,6,7,x (..x2134x)
4,0,x,x,0,6,6,6 (1.xx.234)
0,0,x,x,6,4,6,6 (..xx2134)
0,0,7,x,4,6,6,x (..4x123x)
6,0,x,x,0,4,6,6 (2.xx.134)
0,0,x,x,4,6,6,6 (..xx1234)
4,0,x,7,0,6,6,x (1.x4.23x)
6,0,6,x,4,0,x,6 (2.3x1.x4)
4,0,6,x,0,6,7,x (1.2x.34x)
4,0,6,x,0,6,x,6 (1.2x.3x4)
6,0,x,6,4,0,x,6 (2.x31.x4)
4,0,x,x,6,0,6,6 (1.xx2.34)
4,0,6,x,6,0,x,6 (1.2x3.x4)
0,0,x,7,6,4,6,x (..x4213x)
6,0,x,x,4,0,6,6 (2.xx1.34)
4,0,x,6,6,0,x,6 (1.x23.x4)
6,0,6,x,0,4,x,6 (2.3x.1x4)
0,0,7,x,6,4,6,x (..4x213x)
6,0,x,6,0,4,x,6 (2.x3.1x4)
6,0,x,7,0,4,6,x (2.x4.13x)
0,0,x,6,4,6,x,6 (..x213x4)
6,0,7,x,0,4,6,x (2.4x.13x)
0,0,6,x,6,4,x,6 (..2x31x4)
0,0,x,6,6,4,x,6 (..x231x4)
6,0,7,x,4,0,6,x (2.4x1.3x)
0,0,6,x,4,6,x,6 (..2x13x4)
6,0,x,7,4,0,6,x (2.x41.3x)
4,0,x,7,6,0,6,x (1.x42.3x)
x,0,6,6,4,6,x,x (x.2314xx)
x,0,6,6,6,4,x,x (x.2341xx)
0,0,x,x,4,6,7,6 (..xx1243)
4,0,7,x,6,0,x,6 (1.4x2.x3)
6,0,x,7,0,4,x,6 (2.x4.1x3)
6,0,x,x,0,4,6,7 (2.xx.134)
0,0,7,x,6,4,x,6 (..4x21x3)
4,0,x,6,0,6,x,7 (1.x2.3x4)
4,0,6,x,0,6,x,7 (1.2x.3x4)
4,0,x,x,6,0,7,6 (1.xx2.43)
6,0,x,x,0,4,7,6 (2.xx.143)
6,0,x,7,4,0,x,6 (2.x41.x3)
0,0,7,x,4,6,x,6 (..4x12x3)
0,0,x,6,6,4,x,7 (..x231x4)
0,0,x,x,6,4,6,7 (..xx2134)
6,0,7,x,4,0,x,6 (2.4x1.x3)
6,0,x,x,4,0,6,7 (2.xx1.34)
0,0,x,x,6,4,7,6 (..xx2143)
4,0,x,x,0,6,7,6 (1.xx.243)
6,0,x,6,0,4,x,7 (2.x3.1x4)
6,0,6,x,0,4,x,7 (2.3x.1x4)
0,0,x,6,4,6,x,7 (..x213x4)
4,0,7,x,0,6,x,6 (1.4x.2x3)
4,0,x,6,6,0,x,7 (1.x23.x4)
4,0,6,x,6,0,x,7 (1.2x3.x4)
6,0,7,x,0,4,x,6 (2.4x.1x3)
0,0,x,7,6,4,x,6 (..x421x3)
0,0,x,7,4,6,x,6 (..x412x3)
0,0,6,x,6,4,x,7 (..2x31x4)
0,0,6,x,4,6,x,7 (..2x13x4)
4,0,x,7,6,0,x,6 (1.x42.x3)
6,0,x,6,4,0,x,7 (2.x31.x4)
6,0,6,x,4,0,x,7 (2.3x1.x4)
0,0,x,x,4,6,6,7 (..xx1234)
4,0,x,x,6,0,6,7 (1.xx2.34)
6,0,x,x,4,0,7,6 (2.xx1.43)
4,0,x,x,0,6,6,7 (1.xx.234)
4,0,x,7,0,6,x,6 (1.x4.2x3)
x,0,6,x,6,4,6,x (x.2x314x)
x,0,x,6,6,4,6,x (x.x2314x)
x,0,7,6,6,4,x,x (x.4231xx)
x,0,6,7,4,6,x,x (x.2413xx)
x,0,6,7,6,4,x,x (x.2431xx)
x,0,7,6,4,6,x,x (x.4213xx)
x,0,x,6,4,6,6,x (x.x2134x)
x,0,6,x,4,6,6,x (x.2x134x)
x,0,6,x,4,6,7,x (x.2x134x)
x,0,x,6,6,4,x,6 (x.x231x4)
x,0,6,x,6,4,x,6 (x.2x31x4)
x,0,x,6,4,6,x,6 (x.x213x4)
x,0,x,7,6,4,6,x (x.x4213x)
x,0,x,6,6,4,7,x (x.x2314x)
x,0,6,x,6,4,7,x (x.2x314x)
x,0,x,x,6,4,6,6 (x.xx2134)
x,0,x,x,4,6,6,6 (x.xx1234)
x,0,6,x,4,6,x,6 (x.2x13x4)
x,0,x,7,4,6,6,x (x.x4123x)
x,0,x,6,4,6,7,x (x.x2134x)
x,0,7,x,4,6,6,x (x.4x123x)
x,0,7,x,6,4,6,x (x.4x213x)
x,0,6,x,4,6,x,7 (x.2x13x4)
x,0,x,7,6,4,x,6 (x.x421x3)
x,0,x,6,6,4,x,7 (x.x231x4)
x,0,7,x,4,6,x,6 (x.4x12x3)
x,0,x,x,6,4,7,6 (x.xx2143)
x,0,x,x,6,4,6,7 (x.xx2134)
x,0,6,x,6,4,x,7 (x.2x31x4)
x,0,x,7,4,6,x,6 (x.x412x3)
x,0,x,6,4,6,x,7 (x.x213x4)
x,0,x,x,4,6,6,7 (x.xx1234)
x,0,x,x,4,6,7,6 (x.xx1243)
x,0,7,x,6,4,x,6 (x.4x21x3)
x,x,6,7,6,4,x,x (xx2431xx)
x,x,6,7,4,6,x,x (xx2413xx)
6,0,x,6,4,0,x,x (2.x31.xx)
6,0,6,x,4,0,x,x (2.3x1.xx)
4,0,6,x,6,0,x,x (1.2x3.xx)
4,0,x,6,6,0,x,x (1.x23.xx)
4,0,x,6,0,6,x,x (1.x2.3xx)
6,0,6,6,4,x,x,x (2.341xxx)
4,0,6,x,0,6,x,x (1.2x.3xx)
0,0,6,x,4,6,x,x (..2x13xx)
0,0,x,6,6,4,x,x (..x231xx)
0,0,6,x,6,4,x,x (..2x31xx)
0,0,x,6,4,6,x,x (..x213xx)
6,0,x,6,0,4,x,x (2.x3.1xx)
6,0,6,x,0,4,x,x (2.3x.1xx)
4,0,6,6,6,x,x,x (1.234xxx)
4,0,6,x,6,4,x,x (1.3x42xx)
4,0,x,x,0,6,6,x (1.xx.23x)
6,0,6,7,4,x,x,x (2.341xxx)
4,0,6,6,x,6,x,x (1.23x4xx)
6,x,6,7,4,4,x,x (2x3411xx)
6,0,x,6,4,4,x,x (3.x412xx)
6,0,6,x,4,4,x,x (3.4x12xx)
4,0,6,x,4,6,x,x (1.3x24xx)
6,0,x,6,4,6,x,x (2.x314xx)
6,0,6,x,4,6,x,x (2.3x14xx)
4,x,6,7,4,6,x,x (1x2413xx)
6,0,6,6,x,4,x,x (2.34x1xx)
4,x,6,7,6,0,x,x (1x243.xx)
6,0,7,6,4,x,x,x (2.431xxx)
4,0,6,x,6,6,x,x (1.2x34xx)
6,0,x,x,4,0,6,x (2.xx1.3x)
6,0,x,x,0,4,6,x (2.xx.13x)
6,x,6,7,4,0,x,x (2x341.xx)
4,0,x,6,6,6,x,x (1.x234xx)
6,0,x,6,6,4,x,x (2.x341xx)
4,0,x,6,4,6,x,x (1.x324xx)
4,0,x,6,6,4,x,x (1.x342xx)
4,0,6,7,6,x,x,x (1.243xxx)
4,0,x,x,6,0,6,x (1.xx2.3x)
0,0,x,x,6,4,6,x (..xx213x)
6,0,6,x,6,4,x,x (2.3x41xx)
4,0,7,6,6,x,x,x (1.423xxx)
0,0,x,x,4,6,6,x (..xx123x)
4,x,6,7,6,4,x,x (1x2431xx)
6,0,x,6,4,x,6,x (2.x31x4x)
6,0,6,x,4,x,6,x (2.3x1x4x)
4,x,6,7,0,6,x,x (1x24.3xx)
4,x,x,7,4,6,6,x (1xx4123x)
4,0,6,x,x,6,6,x (1.2xx34x)
4,0,x,x,6,0,x,6 (1.xx2.x3)
4,0,x,6,x,6,6,x (1.x2x34x)
4,0,x,x,6,6,6,x (1.xx234x)
6,x,6,7,0,4,x,x (2x34.1xx)
0,x,6,7,4,6,x,x (.x2413xx)
6,0,6,x,x,4,6,x (2.3xx14x)
6,0,6,7,x,4,x,x (2.34x1xx)
4,0,x,x,6,4,6,x (1.xx324x)
6,0,x,x,0,4,x,6 (2.xx.1x3)
4,0,7,6,x,6,x,x (1.42x3xx)
6,0,7,6,x,4,x,x (2.43x1xx)
4,x,6,x,0,6,6,x (1x2x.34x)
6,0,x,x,6,4,6,x (2.xx314x)
0,x,6,x,6,4,6,x (.x2x314x)
6,0,x,6,x,4,6,x (2.x3x14x)
6,x,6,x,0,4,6,x (2x3x.14x)
0,0,x,x,6,4,x,6 (..xx21x3)
6,x,6,x,4,0,6,x (2x3x1.4x)
0,x,6,7,6,4,x,x (.x2431xx)
4,x,6,x,6,0,6,x (1x2x3.4x)
4,0,x,6,6,x,6,x (1.x23x4x)
4,0,x,x,4,6,6,x (1.xx234x)
6,0,x,x,4,6,6,x (2.xx134x)
0,x,6,x,4,6,6,x (.x2x134x)
4,0,6,x,6,x,6,x (1.2x3x4x)
6,0,x,x,4,4,6,x (3.xx124x)
0,0,x,x,4,6,x,6 (..xx12x3)
4,x,x,7,6,4,6,x (1xx4213x)
6,x,x,7,4,4,6,x (2xx4113x)
6,0,x,x,4,0,x,6 (2.xx1.x3)
4,0,x,x,0,6,x,6 (1.xx.2x3)
4,0,6,7,x,6,x,x (1.24x3xx)
x,0,6,x,6,4,x,x (x.2x31xx)
x,0,x,6,6,4,x,x (x.x231xx)
x,0,6,x,4,6,x,x (x.2x13xx)
x,0,x,6,4,6,x,x (x.x213xx)
6,x,x,x,0,4,6,6 (2xxx.134)
6,0,6,x,4,x,7,x (2.3x1x4x)
6,x,6,x,4,0,x,6 (2x3x1.x4)
6,0,x,6,4,x,7,x (2.x31x4x)
6,0,x,x,x,4,6,6 (2.xxx134)
4,0,6,x,6,x,7,x (1.2x3x4x)
4,0,x,6,6,x,7,x (1.x23x4x)
6,x,6,x,4,0,7,x (2x3x1.4x)
4,x,x,7,0,6,6,x (1xx4.23x)
4,x,x,x,6,0,6,6 (1xxx2.34)
6,x,7,x,4,0,6,x (2x4x1.3x)
4,x,6,x,6,0,x,6 (1x2x3.x4)
4,x,6,x,6,0,7,x (1x2x3.4x)
0,x,x,7,6,4,6,x (.xx4213x)
4,0,x,7,6,x,6,x (1.x42x3x)
6,0,x,7,x,4,6,x (2.x4x13x)
6,x,x,x,4,0,6,6 (2xxx1.34)
6,0,x,6,x,4,7,x (2.x3x14x)
4,0,x,x,6,x,6,6 (1.xx2x34)
6,0,6,x,x,4,x,6 (2.3xx1x4)
6,0,x,x,4,x,6,6 (2.xx1x34)
6,0,x,6,x,4,x,6 (2.x3x1x4)
4,0,x,x,6,6,x,6 (1.xx23x4)
6,x,6,x,0,4,7,x (2x3x.14x)
4,x,7,x,6,0,6,x (1x4x2.3x)
6,0,7,x,4,x,6,x (2.4x1x3x)
6,x,6,x,0,4,x,6 (2x3x.1x4)
0,x,6,x,6,4,7,x (.x2x314x)
4,x,x,7,4,6,x,6 (1xx412x3)
6,x,x,7,4,0,6,x (2xx41.3x)
4,0,7,x,x,6,6,x (1.4xx23x)
4,x,x,7,6,0,6,x (1xx42.3x)
0,x,7,x,4,6,6,x (.x4x123x)
6,0,x,x,4,4,x,6 (3.xx12x4)
6,x,x,7,4,4,x,6 (2xx411x3)
4,0,6,x,x,6,7,x (1.2xx34x)
4,0,x,6,x,6,7,x (1.x2x34x)
4,x,6,x,0,6,7,x (1x2x.34x)
4,0,x,x,6,4,x,6 (1.xx32x4)
6,0,x,x,6,4,x,6 (2.xx31x4)
0,x,6,x,6,4,x,6 (.x2x31x4)
6,x,7,x,0,4,6,x (2x4x.13x)
4,0,x,7,x,6,6,x (1.x4x23x)
0,x,6,x,4,6,7,x (.x2x134x)
4,0,7,x,6,x,6,x (1.4x2x3x)
0,x,7,x,6,4,6,x (.x4x213x)
6,0,x,7,4,x,6,x (2.x41x3x)
0,x,x,7,4,6,6,x (.xx4123x)
0,x,x,x,4,6,6,6 (.xxx1234)
6,0,6,x,4,x,x,6 (2.3x1xx4)
4,x,x,7,6,4,x,6 (1xx421x3)
6,x,x,7,0,4,6,x (2xx4.13x)
6,0,x,6,4,x,x,6 (2.x31xx4)
4,x,x,x,0,6,6,6 (1xxx.234)
4,0,6,x,x,6,x,6 (1.2xx3x4)
4,0,x,x,x,6,6,6 (1.xxx234)
4,0,x,6,x,6,x,6 (1.x2x3x4)
0,x,6,x,4,6,x,6 (.x2x13x4)
6,0,x,x,4,6,x,6 (2.xx13x4)
4,0,x,x,4,6,x,6 (1.xx23x4)
4,x,7,x,0,6,6,x (1x4x.23x)
4,x,6,x,0,6,x,6 (1x2x.3x4)
4,0,6,x,6,x,x,6 (1.2x3xx4)
6,0,6,x,x,4,7,x (2.3xx14x)
4,0,x,6,6,x,x,6 (1.x23xx4)
0,x,x,x,6,4,6,6 (.xxx2134)
6,0,7,x,x,4,6,x (2.4xx13x)
x,0,x,x,4,6,6,x (x.xx123x)
x,0,x,x,6,4,6,x (x.xx213x)
6,0,7,x,4,x,x,6 (2.4x1xx3)
0,x,x,x,4,6,6,7 (.xxx1234)
4,0,x,7,x,6,x,6 (1.x4x2x3)
4,0,7,x,x,6,x,6 (1.4xx2x3)
4,x,x,x,0,6,6,7 (1xxx.234)
0,x,7,x,4,6,x,6 (.x4x12x3)
0,x,x,7,6,4,x,6 (.xx421x3)
0,x,7,x,6,4,x,6 (.x4x21x3)
6,0,6,x,x,4,x,7 (2.3xx1x4)
4,0,x,x,x,6,6,7 (1.xxx234)
6,x,x,7,0,4,x,6 (2xx4.1x3)
0,x,x,7,4,6,x,6 (.xx412x3)
6,x,7,x,0,4,x,6 (2x4x.1x3)
6,0,x,7,x,4,x,6 (2.x4x1x3)
0,x,x,x,6,4,6,7 (.xxx2134)
6,0,7,x,x,4,x,6 (2.4xx1x3)
4,x,x,7,6,0,x,6 (1xx42.x3)
4,x,7,x,6,0,x,6 (1x4x2.x3)
6,x,x,x,0,4,6,7 (2xxx.134)
6,x,x,7,4,0,x,6 (2xx41.x3)
6,x,7,x,4,0,x,6 (2x4x1.x3)
6,0,x,x,x,4,6,7 (2.xxx134)
4,0,x,7,6,x,x,6 (1.x42xx3)
4,0,7,x,6,x,x,6 (1.4x2xx3)
4,x,x,x,6,0,6,7 (1xxx2.34)
6,0,x,7,4,x,x,6 (2.x41xx3)
6,x,x,x,4,0,6,7 (2xxx1.34)
6,0,x,6,x,4,x,7 (2.x3x1x4)
4,0,x,x,6,x,6,7 (1.xx2x34)
4,x,x,7,0,6,x,6 (1xx4.2x3)
6,0,x,x,4,x,7,6 (2.xx1x43)
4,0,x,x,6,x,7,6 (1.xx2x43)
6,x,x,x,4,0,7,6 (2xxx1.43)
6,0,x,x,4,x,6,7 (2.xx1x34)
4,x,x,x,6,0,7,6 (1xxx2.43)
0,x,6,x,4,6,x,7 (.x2x13x4)
6,0,x,x,x,4,7,6 (2.xxx143)
6,x,x,x,0,4,7,6 (2xxx.143)
4,x,6,x,0,6,x,7 (1x2x.3x4)
0,x,x,x,6,4,7,6 (.xxx2143)
4,0,x,6,x,6,x,7 (1.x2x3x4)
4,x,7,x,0,6,x,6 (1x4x.2x3)
4,0,x,x,x,6,7,6 (1.xxx243)
4,x,x,x,0,6,7,6 (1xxx.243)
4,0,6,x,x,6,x,7 (1.2xx3x4)
0,x,x,x,4,6,7,6 (.xxx1243)
0,x,6,x,6,4,x,7 (.x2x31x4)
6,x,6,x,0,4,x,7 (2x3x.1x4)
6,0,6,x,4,x,x,7 (2.3x1xx4)
6,0,x,6,4,x,x,7 (2.x31xx4)
4,0,6,x,6,x,x,7 (1.2x3xx4)
4,0,x,6,6,x,x,7 (1.x23xx4)
6,x,6,x,4,0,x,7 (2x3x1.x4)
4,x,6,x,6,0,x,7 (1x2x3.x4)
x,0,x,x,4,6,x,6 (x.xx12x3)
x,0,x,x,6,4,x,6 (x.xx21x3)
4,x,6,x,6,0,x,x (1x2x3.xx)
6,x,6,x,4,0,x,x (2x3x1.xx)
6,0,x,6,4,x,x,x (2.x31xxx)
6,0,6,x,4,x,x,x (2.3x1xxx)
4,0,6,x,6,x,x,x (1.2x3xxx)
4,0,x,6,6,x,x,x (1.x23xxx)
0,x,6,x,4,6,x,x (.x2x13xx)
4,x,6,x,0,6,x,x (1x2x.3xx)
6,0,6,x,x,4,x,x (2.3xx1xx)
6,0,x,6,x,4,x,x (2.x3x1xx)
4,0,x,6,x,6,x,x (1.x2x3xx)
4,0,6,x,x,6,x,x (1.2xx3xx)
0,x,6,x,6,4,x,x (.x2x31xx)
6,x,6,x,0,4,x,x (2x3x.1xx)
6,x,x,x,4,0,6,x (2xxx1.3x)
0,x,x,x,6,4,6,x (.xxx213x)
4,x,x,x,6,0,6,x (1xxx2.3x)
6,0,x,x,x,4,6,x (2.xxx13x)
0,x,x,x,4,6,6,x (.xxx123x)
4,0,x,x,x,6,6,x (1.xxx23x)
6,x,6,7,4,x,x,x (2x341xxx)
4,0,x,x,6,x,6,x (1.xx2x3x)
4,x,6,7,6,x,x,x (1x243xxx)
4,x,x,x,0,6,6,x (1xxx.23x)
6,x,x,x,0,4,6,x (2xxx.13x)
6,0,x,x,4,x,6,x (2.xx1x3x)
6,0,x,x,x,4,x,6 (2.xxx1x3)
6,x,6,7,x,4,x,x (2x34x1xx)
0,x,x,x,4,6,x,6 (.xxx12x3)
6,0,x,x,4,x,x,6 (2.xx1xx3)
4,x,x,x,0,6,x,6 (1xxx.2x3)
4,x,6,7,x,6,x,x (1x24x3xx)
4,0,x,x,6,x,x,6 (1.xx2xx3)
4,0,x,x,x,6,x,6 (1.xxx2x3)
6,x,x,x,4,0,x,6 (2xxx1.x3)
4,x,x,x,6,0,x,6 (1xxx2.x3)
0,x,x,x,6,4,x,6 (.xxx21x3)
6,x,x,x,0,4,x,6 (2xxx.1x3)
6,x,x,7,4,x,6,x (2xx41x3x)
4,x,x,7,x,6,6,x (1xx4x23x)
6,x,x,7,x,4,6,x (2xx4x13x)
4,x,x,7,6,x,6,x (1xx42x3x)
6,x,x,7,x,4,x,6 (2xx4x1x3)
4,x,x,7,6,x,x,6 (1xx42xx3)
4,x,x,7,x,6,x,6 (1xx4x2x3)
6,x,x,7,4,x,x,6 (2xx41xx3)

Riepilogo

  • L'accordo Lamaj7b5 contiene le note: La, Do♯, Mi♭, Sol♯
  • In accordatura Modal D ci sono 405 posizioni disponibili
  • Scritto anche come: LaM7b5, LaMa7b5, Laj7b5, LaΔ7b5, LaΔb5
  • Ogni diagramma mostra la posizione delle dita sulla tastiera della Mandolin

Domande frequenti

Cos'è l'accordo Lamaj7b5 alla Mandolin?

Lamaj7b5 è un accordo La maj7b5. Contiene le note La, Do♯, Mi♭, Sol♯. Alla Mandolin in accordatura Modal D, ci sono 405 modi per suonare questo accordo.

Come si suona Lamaj7b5 alla Mandolin?

Per suonare Lamaj7b5 in accordatura Modal D, usa una delle 405 posizioni sopra. Ogni diagramma mostra la posizione delle dita sulla tastiera.

Quali note contiene l'accordo Lamaj7b5?

L'accordo Lamaj7b5 contiene le note: La, Do♯, Mi♭, Sol♯.

Quante posizioni ci sono per Lamaj7b5?

In accordatura Modal D ci sono 405 posizioni per l'accordo Lamaj7b5. Ciascuna usa una posizione diversa sulla tastiera con le stesse note: La, Do♯, Mi♭, Sol♯.

Quali altri nomi ha Lamaj7b5?

Lamaj7b5 è anche conosciuto come LaM7b5, LaMa7b5, Laj7b5, LaΔ7b5, LaΔb5. Sono notazioni diverse per lo stesso accordo: La, Do♯, Mi♭, Sol♯.