Acordul B7sus24 la 7-String Guitar — Diagramă și Taburi în Acordajul fake 8 string

Răspuns scurt: B7sus24 este un acord B 7sus24 cu notele B, C♯, E, F♯, A. În acordajul fake 8 string există 242 poziții. Vedeți diagramele de mai jos.

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Cum se cântă B7sus24 la 7-String Guitar

B7sus24

Note: B, C♯, E, F♯, A

7,0,0,0,4,6,0 (3...12.)
7,4,5,4,4,4,5 (4121113)
7,7,9,7,7,9,7 (1121131)
7,4,0,0,4,4,0 (41..23.)
7,0,0,4,4,4,0 (4..123.)
7,0,0,7,4,6,0 (3..412.)
7,0,0,4,4,6,0 (4..123.)
7,4,0,0,4,6,0 (41..23.)
7,7,0,0,4,6,0 (34..12.)
7,0,0,0,7,6,7 (2...314)
7,0,0,0,4,6,7 (3...124)
7,9,9,7,7,9,7 (1231141)
7,7,9,9,7,9,7 (1123141)
7,0,0,0,4,6,5 (4...132)
7,9,0,0,7,6,0 (24..31.)
7,0,0,9,7,6,0 (2..431.)
7,9,0,0,9,6,0 (23..41.)
7,0,0,9,9,6,0 (2..341.)
7,0,0,0,11,11,0 (1...23.)
7,7,9,7,7,11,7 (1121131)
x,7,7,0,4,6,0 (x34.12.)
7,0,0,0,9,6,7 (2...413)
7,7,0,0,11,11,0 (12..34.)
7,7,7,7,11,11,10 (1111342)
7,9,9,7,7,11,7 (1231141)
7,0,0,7,11,11,0 (1..234.)
7,7,9,7,7,11,10 (1121143)
7,7,9,9,7,11,7 (1123141)
7,0,0,9,11,9,0 (1..243.)
7,9,0,0,11,9,0 (12..43.)
7,9,0,0,11,11,0 (12..34.)
7,0,0,9,11,11,0 (1..234.)
7,0,0,0,11,9,7 (1...432)
7,0,0,0,11,11,7 (1...342)
7,0,0,0,11,11,10 (1...342)
x,7,7,0,11,11,0 (x12.34.)
x,7,7,7,11,11,10 (x111342)
x,9,7,0,11,9,0 (x21.43.)
x,x,7,0,4,6,5 (xx4.132)
x,x,7,7,11,11,10 (xx11342)
x,x,7,0,11,9,7 (xx1.432)
7,0,0,4,4,x,0 (3..12x.)
7,4,0,0,4,x,0 (31..2x.)
7,7,9,7,7,x,7 (11211x1)
7,0,0,0,4,6,x (3...12x)
7,7,5,4,4,4,x (342111x)
7,4,5,7,4,4,x (312411x)
7,0,0,x,4,6,0 (3..x12.)
7,x,0,0,4,6,0 (3x..12.)
7,0,0,0,x,6,7 (2...x13)
7,0,0,7,4,6,x (3..412x)
7,0,x,7,4,6,0 (3.x412.)
7,x,9,7,7,9,7 (1x21131)
7,x,5,4,4,4,5 (4x21113)
7,7,x,0,4,6,0 (34x.12.)
7,4,5,x,4,4,5 (412x113)
7,7,9,x,7,9,7 (112x131)
7,0,0,4,4,6,x (4..123x)
7,7,9,9,7,9,x (112314x)
7,7,0,0,4,6,x (34..12x)
7,9,9,7,7,x,7 (12311x1)
7,9,9,7,7,9,x (123114x)
7,4,0,0,4,6,x (41..23x)
7,4,5,4,4,x,5 (41211x3)
7,7,9,9,7,x,7 (11231x1)
7,4,0,0,4,4,x (41..23x)
7,0,0,4,4,4,x (4..123x)
7,0,0,7,x,6,7 (2..3x14)
7,7,0,0,x,6,7 (23..x14)
7,x,0,0,7,6,7 (2x..314)
7,0,0,9,x,6,0 (2..3x1.)
7,9,0,0,x,6,0 (23..x1.)
7,0,0,x,7,6,7 (2..x314)
7,9,0,0,11,x,0 (12..3x.)
7,0,0,9,11,x,0 (1..23x.)
7,4,0,0,4,x,7 (31..2x4)
7,7,9,7,7,11,x (112113x)
7,9,9,0,x,9,0 (123.x4.)
7,0,9,9,x,9,0 (1.23x4.)
x,2,x,4,4,2,5 (x1x2314)
7,x,0,0,4,6,7 (3x..124)
7,x,9,9,7,9,7 (1x23141)
7,0,0,4,x,4,7 (3..1x24)
7,4,0,0,x,4,7 (31..x24)
7,0,0,x,4,6,7 (3..x124)
7,0,0,4,4,x,5 (4..12x3)
7,x,0,0,4,6,5 (4x..132)
7,4,0,0,4,x,5 (41..2x3)
7,0,x,0,4,6,5 (4.x.132)
7,0,0,x,4,6,5 (4..x132)
7,0,0,4,7,x,7 (2..13x4)
7,9,9,x,7,9,7 (123x141)
7,4,0,0,7,x,7 (21..3x4)
7,4,0,0,x,6,7 (31..x24)
7,0,0,4,x,6,7 (3..1x24)
7,0,0,4,4,x,7 (3..12x4)
7,x,0,9,7,6,0 (2x.431.)
7,9,0,0,7,6,x (24..31x)
7,0,0,9,7,6,x (2..431x)
7,9,0,0,9,6,x (23..41x)
7,0,0,9,9,6,x (2..341x)
7,9,0,x,7,6,0 (24.x31.)
7,0,0,x,11,11,0 (1..x23.)
7,7,9,9,7,x,10 (11231x4)
7,x,0,0,11,11,0 (1x..23.)
7,x,9,7,7,11,7 (1x21131)
7,7,9,x,7,11,7 (112x131)
7,0,9,0,x,9,7 (1.3.x42)
7,9,9,7,7,11,x (123114x)
7,7,9,9,7,11,x (112314x)
7,9,9,7,7,x,10 (12311x4)
7,0,0,0,11,11,x (1...23x)
7,0,0,x,9,6,7 (2..x413)
7,0,0,9,x,6,7 (2..4x13)
x,7,7,0,4,6,x (x34.12x)
7,x,0,0,9,6,7 (2x..413)
7,9,0,0,x,6,7 (24..x13)
7,0,0,9,x,6,5 (3..4x21)
7,9,0,0,x,6,5 (34..x21)
x,7,7,0,x,6,7 (x23.x14)
7,7,9,7,x,11,10 (1121x43)
x,2,x,0,4,6,5 (x1x.243)
7,x,7,7,11,11,10 (1x11342)
7,7,x,7,11,11,10 (11x1342)
7,9,7,7,11,x,10 (12114x3)
7,0,0,9,11,9,x (1..243x)
7,7,7,9,11,x,10 (11124x3)
7,7,7,x,11,11,10 (111x342)
7,9,0,0,11,9,x (12..43x)
7,7,x,0,11,11,0 (12x.34.)
7,0,9,7,x,11,0 (1.32x4.)
7,7,0,0,11,11,x (12..34x)
7,9,0,0,11,11,x (12..34x)
7,7,9,x,7,11,10 (112x143)
7,0,0,7,11,11,x (1..234x)
7,0,0,0,11,x,7 (1...3x2)
7,0,x,7,11,11,0 (1.x234.)
7,0,0,9,11,11,x (1..234x)
7,x,9,7,7,11,10 (1x21143)
7,9,x,0,11,9,0 (12x.43.)
7,7,9,0,x,11,0 (123.x4.)
7,0,x,9,11,9,0 (1.x243.)
7,0,0,9,x,6,10 (2..3x14)
x,4,7,0,4,x,5 (x14.2x3)
7,9,0,0,x,6,10 (23..x14)
7,0,0,x,11,9,7 (1..x432)
7,0,0,x,11,11,7 (1..x342)
7,0,0,7,11,x,7 (1..24x3)
7,0,0,9,11,x,7 (1..34x2)
7,x,0,0,11,11,10 (1x..342)
7,9,0,0,11,x,10 (12..4x3)
7,0,x,0,11,9,7 (1.x.432)
7,x,0,0,11,9,7 (1x..432)
7,x,0,0,11,11,7 (1x..342)
7,0,0,x,11,11,10 (1..x342)
7,7,0,0,11,x,7 (12..4x3)
7,9,0,0,11,x,7 (13..4x2)
7,0,0,9,11,x,10 (1..24x3)
x,9,7,0,x,6,5 (x43.x21)
x,7,7,x,11,11,10 (x11x342)
x,9,7,0,11,9,x (x21.43x)
x,7,7,9,11,x,10 (x1124x3)
x,9,7,7,11,x,10 (x2114x3)
x,7,7,0,11,11,x (x12.34x)
x,7,7,0,11,x,7 (x12.4x3)
7,7,5,4,4,x,x (34211xx)
7,4,5,7,4,x,x (31241xx)
7,9,9,7,7,x,x (12311xx)
7,7,9,9,7,x,x (11231xx)
7,0,0,4,4,x,x (3..12xx)
7,4,0,0,4,x,x (31..2xx)
7,x,9,7,7,x,7 (1x211x1)
7,0,0,x,4,6,x (3..x12x)
7,7,9,x,7,x,7 (112x1x1)
7,x,0,0,4,6,x (3x..12x)
7,0,0,x,x,6,7 (2..xx13)
7,x,0,0,x,6,7 (2x..x13)
7,x,9,x,7,9,7 (1x2x131)
7,x,9,9,7,9,x (1x2314x)
7,4,5,x,4,x,5 (412x1x3)
7,9,9,x,7,9,x (123x14x)
7,x,5,4,4,x,5 (4x211x3)
7,0,x,7,4,6,x (3.x412x)
7,0,0,4,x,x,7 (2..1xx3)
7,7,x,0,4,6,x (34x.12x)
7,4,0,0,x,x,7 (21..xx3)
7,0,0,9,x,6,x (2..3x1x)
7,7,x,0,x,6,7 (23x.x14)
7,0,x,7,x,6,7 (2.x3x14)
7,9,0,0,x,6,x (23..x1x)
7,x,0,x,7,6,7 (2x.x314)
7,0,x,4,4,x,5 (4.x12x3)
7,x,x,0,4,6,5 (4xx.132)
7,0,x,x,4,6,5 (4.xx132)
7,9,9,0,x,9,x (123.x4x)
7,0,9,9,x,9,x (1.23x4x)
7,4,0,x,7,x,7 (21.x3x4)
7,x,9,7,7,11,x (1x2113x)
7,4,x,0,4,x,5 (41x.2x3)
7,x,0,4,7,x,7 (2x.13x4)
7,0,0,9,11,x,x (1..23xx)
7,9,0,0,11,x,x (12..3xx)
7,7,9,x,7,11,x (112x13x)
7,x,0,9,7,6,x (2x.431x)
7,9,0,x,7,6,x (24.x31x)
7,9,5,x,x,6,5 (341xx21)
7,x,5,9,x,6,5 (3x14x21)
7,x,0,0,11,11,x (1x..23x)
7,7,9,9,x,x,10 (1123xx4)
7,0,9,x,x,9,7 (1.3xx42)
7,0,0,x,11,11,x (1..x23x)
7,x,9,0,x,9,7 (1x3.x42)
7,9,9,7,x,x,10 (1231xx4)
7,0,9,7,x,x,7 (1.42xx3)
7,7,9,0,x,x,7 (124.xx3)
7,9,x,0,x,6,5 (34x.x21)
7,9,9,0,x,x,5 (234.xx1)
7,0,9,9,x,x,5 (2.34xx1)
7,0,x,9,x,6,5 (3.x4x21)
7,9,x,0,11,9,x (12x.43x)
7,9,x,7,11,x,10 (12x14x3)
7,x,9,7,x,11,10 (1x21x43)
7,7,9,x,x,11,10 (112xx43)
7,7,x,0,11,11,x (12x.34x)
7,0,x,9,11,9,x (1.x243x)
7,7,9,0,x,11,x (123.x4x)
7,x,x,7,11,11,10 (1xx1342)
7,0,9,7,x,11,x (1.32x4x)
7,7,x,x,11,11,10 (11xx342)
7,7,x,9,11,x,10 (11x24x3)
7,0,x,7,11,11,x (1.x234x)
7,0,0,x,11,x,7 (1..x3x2)
7,x,0,0,11,x,7 (1x..3x2)
7,x,0,9,x,6,10 (2x.3x14)
7,9,0,x,x,6,10 (23.xx14)
7,x,0,9,11,x,10 (1x.24x3)
7,x,0,x,11,11,10 (1x.x342)
7,9,0,x,11,x,10 (12.x4x3)
7,7,x,0,11,x,7 (12x.4x3)
7,0,x,x,11,9,7 (1.xx432)
7,0,x,7,11,x,7 (1.x24x3)
7,x,x,0,11,9,7 (1xx.432)

Rezumat Rapid

  • Acordul B7sus24 conține notele: B, C♯, E, F♯, A
  • În acordajul fake 8 string sunt disponibile 242 poziții
  • Fiecare diagramă arată pozițiile degetelor pe griful 7-String Guitar

Întrebări Frecvente

Ce este acordul B7sus24 la 7-String Guitar?

B7sus24 este un acord B 7sus24. Conține notele B, C♯, E, F♯, A. La 7-String Guitar în acordajul fake 8 string există 242 moduri de a cânta.

Cum se cântă B7sus24 la 7-String Guitar?

Pentru a cânta B7sus24 la în acordajul fake 8 string, utilizați una din cele 242 poziții afișate mai sus.

Ce note conține acordul B7sus24?

Acordul B7sus24 conține notele: B, C♯, E, F♯, A.

În câte moduri se poate cânta B7sus24 la 7-String Guitar?

În acordajul fake 8 string există 242 poziții pentru B7sus24. Fiecare poziție utilizează un loc diferit pe grif: B, C♯, E, F♯, A.