G7b5 7-String Guitar Akoru — Alex Akortunda Diyagram ve Tablar

Kısa cevap: G7b5, G, B, D♭, F notalarını içeren bir G dom7dim5 akorudur. Alex akortunda 327 pozisyon vardır. Aşağıdaki diyagramlara bakın.

Diğer adıyla: GM7b5, GM7b5, GM7b5, G dom7dim5

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Nasıl çalınır G7b5 üzerinde 7-String Guitar

G7b5, GM7b5, GM7b5, GM7b5, Gdom7dim5

Notalar: G, B, D♭, F

x,9,8,9,0,0,9 (x213..4)
x,x,4,5,4,6,7 (xx12134)
x,5,8,5,0,0,9 (x132..4)
x,5,8,9,0,0,9 (x123..4)
x,9,8,5,0,0,9 (x321..4)
x,x,8,9,0,0,9 (xx12..3)
x,x,4,5,0,6,7 (xx12.34)
x,11,8,9,0,0,9 (x412..3)
x,9,8,11,0,0,9 (x214..3)
x,11,8,11,0,0,9 (x314..2)
x,x,8,5,0,0,9 (xx21..3)
x,x,8,5,6,0,7 (xx412.3)
x,9,8,11,0,0,7 (x324..1)
x,11,8,9,0,0,7 (x423..1)
x,x,8,9,0,8,9 (xx13.24)
x,11,8,11,0,0,7 (x324..1)
x,x,8,9,0,6,9 (xx23.14)
x,x,8,5,6,0,9 (xx312.4)
x,x,8,11,0,0,9 (xx13..2)
x,x,x,5,6,6,7 (xxx1234)
x,x,8,11,0,0,7 (xx23..1)
x,x,10,9,0,6,9 (xx42.13)
x,x,x,9,0,6,9 (xxx2.13)
x,x,8,11,0,8,7 (xx24.31)
4,5,4,5,4,6,x (121314x)
4,5,8,5,0,0,x (1243..x)
8,5,4,5,0,0,x (4213..x)
4,5,4,x,4,6,7 (121x134)
4,x,4,5,4,6,7 (1x12134)
x,5,4,5,4,6,x (x21314x)
8,9,10,11,0,0,x (1234..x)
10,11,8,11,0,0,x (2314..x)
8,11,8,11,0,0,x (1324..x)
10,9,8,11,0,0,x (3214..x)
8,11,8,9,0,0,x (1423..x)
10,11,8,9,0,0,x (3412..x)
8,11,10,9,0,0,x (1432..x)
8,9,8,11,0,0,x (1324..x)
8,11,10,11,0,0,x (1324..x)
x,x,4,5,4,6,x (xx1213x)
8,9,x,9,0,0,9 (12x3..4)
8,x,8,9,0,0,9 (1x23..4)
8,9,8,x,0,0,9 (132x..4)
4,5,8,x,0,0,7 (124x..3)
8,5,4,x,0,0,7 (421x..3)
x,5,x,5,6,6,7 (x1x1234)
x,5,8,5,6,0,x (x1423.x)
x,9,8,11,0,0,x (x213..x)
4,x,8,5,0,0,7 (1x42..3)
x,11,8,9,0,0,x (x312..x)
x,11,8,11,0,0,x (x213..x)
8,x,4,5,0,0,7 (4x12..3)
x,5,4,x,4,6,7 (x21x134)
8,9,x,5,0,0,9 (23x1..4)
10,x,8,9,0,0,9 (4x12..3)
8,5,8,x,0,0,9 (213x..4)
8,5,x,9,0,0,9 (21x3..4)
8,x,10,9,0,0,9 (1x42..3)
10,9,8,x,0,0,9 (421x..3)
8,9,10,x,0,0,9 (124x..3)
8,x,8,5,0,0,9 (2x31..4)
8,5,x,5,0,0,9 (31x2..4)
x,9,8,5,6,0,x (x4312.x)
x,9,8,x,0,0,9 (x21x..3)
x,5,8,5,6,x,7 (x1412x3)
x,5,8,9,6,0,x (x1342.x)
x,x,8,5,6,0,x (xx312.x)
x,x,8,11,0,0,x (xx12..x)
x,5,4,x,0,6,7 (x21x.34)
8,9,x,11,0,0,9 (12x4..3)
8,11,8,x,0,0,9 (142x..3)
8,11,x,11,0,0,9 (13x4..2)
8,11,10,x,0,0,9 (143x..2)
8,x,8,11,0,0,9 (1x24..3)
10,11,8,x,0,0,9 (341x..2)
8,11,x,9,0,0,9 (14x2..3)
8,x,10,11,0,0,9 (1x34..2)
10,x,8,11,0,0,9 (3x14..2)
8,9,x,11,0,0,7 (23x4..1)
10,x,8,11,0,0,7 (3x24..1)
8,x,10,11,0,0,7 (2x34..1)
x,5,8,x,6,0,7 (x14x2.3)
8,11,x,9,0,0,7 (24x3..1)
x,9,8,9,0,x,9 (x213.x4)
10,11,8,x,0,0,7 (342x..1)
x,5,8,x,0,0,9 (x12x..3)
8,11,10,x,0,0,7 (243x..1)
8,11,x,11,0,0,7 (23x4..1)
x,9,8,x,0,8,9 (x31x.24)
8,11,8,x,0,0,7 (243x..1)
8,x,8,11,0,0,7 (2x34..1)
x,x,2,5,6,6,x (xx1234x)
x,x,8,x,0,0,9 (xx1x..2)
x,x,4,x,0,6,7 (xx1x.23)
x,9,x,9,0,6,9 (x2x3.14)
x,9,8,x,0,6,9 (x32x.14)
x,9,8,11,0,8,x (x314.2x)
x,5,8,5,x,0,9 (x132x.4)
x,x,4,x,4,6,3 (xx2x341)
x,9,8,5,x,0,9 (x321x.4)
x,5,8,x,6,0,9 (x13x2.4)
x,5,8,9,0,x,9 (x123.x4)
x,9,8,5,0,x,9 (x321.x4)
x,5,8,9,x,0,9 (x123x.4)
x,5,x,9,0,6,9 (x1x3.24)
x,9,x,5,0,6,9 (x3x1.24)
x,11,8,9,0,8,x (x413.2x)
x,11,8,x,0,0,9 (x31x..2)
x,x,2,x,6,6,3 (xx1x342)
x,x,8,9,0,x,9 (xx12.x3)
x,11,8,x,0,0,7 (x32x..1)
x,9,10,x,0,6,9 (x24x.13)
x,x,4,5,x,6,7 (xx12x34)
x,9,8,11,0,x,9 (x214.x3)
x,11,8,9,0,x,9 (x412.x3)
x,x,8,5,x,0,9 (xx21x.3)
x,x,8,5,6,x,7 (xx412x3)
x,11,8,9,0,x,7 (x423.x1)
x,9,8,11,0,x,7 (x324.x1)
x,11,8,11,0,x,7 (x324.x1)
x,11,8,x,0,8,7 (x42x.31)
x,x,8,11,0,x,7 (xx23.x1)
4,5,8,x,0,0,x (123x..x)
4,5,4,x,4,6,x (121x13x)
8,5,4,x,0,0,x (321x..x)
4,x,4,5,4,6,x (1x1213x)
4,5,x,5,4,6,x (12x314x)
8,x,4,5,0,0,x (3x12..x)
4,x,8,5,0,0,x (1x32..x)
2,x,2,5,6,6,x (1x1234x)
8,11,8,x,0,0,x (132x..x)
10,11,8,x,0,0,x (231x..x)
8,11,10,x,0,0,x (132x..x)
2,5,2,x,6,6,x (121x34x)
4,5,8,5,4,x,x (12431xx)
4,5,8,5,x,0,x (1243x.x)
8,5,4,5,4,x,x (42131xx)
8,5,4,5,x,0,x (4213x.x)
x,5,4,x,4,6,x (x21x13x)
8,9,x,11,0,0,x (12x3..x)
4,x,2,5,0,6,x (2x13.4x)
8,5,8,x,6,0,x (314x2.x)
8,x,8,11,0,0,x (1x23..x)
2,5,4,x,0,6,x (132x.4x)
8,11,x,11,0,0,x (12x3..x)
4,5,2,x,0,6,x (231x.4x)
10,x,8,11,0,0,x (2x13..x)
8,11,x,9,0,0,x (13x2..x)
8,x,8,5,6,0,x (3x412.x)
2,x,4,5,0,6,x (1x23.4x)
2,x,2,x,6,6,3 (1x1x342)
8,x,10,11,0,0,x (1x23..x)
8,5,x,5,6,0,x (41x23.x)
4,x,8,5,4,8,x (1x3214x)
4,x,8,5,6,0,x (1x423.x)
4,x,8,5,4,6,x (1x4213x)
8,x,4,5,4,6,x (4x1213x)
8,5,4,x,6,0,x (421x3.x)
4,x,x,5,4,6,7 (1xx2134)
4,5,x,x,4,6,7 (12xx134)
4,x,8,5,4,0,x (1x432.x)
8,x,4,5,4,0,x (4x132.x)
4,5,8,x,4,0,x (134x2.x)
4,x,4,5,x,6,7 (1x12x34)
4,5,8,x,6,0,x (124x3.x)
8,5,4,x,4,0,x (431x2.x)
8,5,4,x,4,6,x (421x13x)
4,5,8,x,4,6,x (124x13x)
8,x,4,5,6,0,x (4x123.x)
8,5,4,x,4,8,x (321x14x)
x,11,8,x,0,0,x (x21x..x)
8,x,4,5,4,8,x (3x1214x)
4,5,8,x,4,8,x (123x14x)
4,5,4,x,x,6,7 (121xx34)
8,5,x,5,6,x,7 (41x12x3)
8,9,10,11,0,x,x (1234.xx)
8,x,x,9,0,0,9 (1xx2..3)
10,11,8,9,0,x,x (3412.xx)
8,11,10,9,0,x,x (1432.xx)
8,11,8,9,0,x,x (1423.xx)
2,x,4,x,0,6,3 (1x3x.42)
4,x,2,x,0,6,3 (3x1x.42)
8,x,8,x,0,0,9 (1x2x..3)
8,5,x,9,6,0,x (31x42.x)
8,9,8,11,0,x,x (1324.xx)
8,9,x,5,6,0,x (34x12.x)
10,9,8,11,0,x,x (3214.xx)
8,9,x,x,0,0,9 (12xx..3)
4,x,4,x,0,6,7 (1x2x.34)
4,5,x,x,0,6,7 (12xx.34)
8,5,4,x,4,x,7 (421x1x3)
x,5,8,x,6,0,x (x13x2.x)
8,x,4,x,0,0,7 (3x1x..2)
4,x,x,5,0,6,7 (1xx2.34)
4,x,8,5,4,x,7 (1x421x3)
8,x,4,5,4,x,7 (4x121x3)
4,5,8,x,4,x,7 (124x1x3)
4,x,8,x,0,0,7 (1x3x..2)
8,x,x,5,6,0,7 (4xx12.3)
8,9,x,x,0,8,9 (13xx.24)
8,5,x,x,0,0,9 (21xx..3)
8,x,8,9,0,x,9 (1x23.x4)
8,x,x,9,0,8,9 (1xx3.24)
8,x,x,5,0,0,9 (2xx1..3)
8,9,x,9,0,x,9 (12x3.x4)
10,x,8,x,0,0,9 (3x1x..2)
8,x,10,x,0,0,9 (1x3x..2)
8,5,x,x,6,0,7 (41xx2.3)
8,9,8,x,0,x,9 (132x.x4)
x,11,8,9,0,x,x (x312.xx)
4,5,8,x,x,0,7 (124xx.3)
8,x,4,5,x,0,7 (4x12x.3)
4,x,8,5,x,0,7 (1x42x.3)
4,5,8,x,0,x,7 (124x.x3)
8,5,4,x,x,0,7 (421xx.3)
x,9,8,11,0,x,x (x213.xx)
8,x,4,x,0,6,7 (4x1x.23)
8,5,4,x,0,x,7 (421x.x3)
8,x,4,x,0,8,7 (3x1x.42)
4,x,8,x,0,8,7 (1x3x.42)
4,x,8,x,0,6,7 (1x4x.23)
x,5,2,x,6,6,x (x21x34x)
8,x,4,5,0,x,7 (4x12.x3)
4,x,8,5,0,x,7 (1x42.x3)
8,x,x,9,0,6,9 (2xx3.14)
8,9,x,x,0,6,9 (23xx.14)
10,9,8,x,0,x,9 (421x.x3)
8,9,10,x,0,x,9 (124x.x3)
8,9,x,5,0,x,9 (23x1.x4)
8,5,x,9,x,0,9 (21x3x.4)
8,9,x,11,0,8,x (13x4.2x)
8,5,x,9,0,x,9 (21x3.x4)
8,x,x,5,6,0,9 (3xx12.4)
8,x,8,5,x,0,9 (2x31x.4)
8,5,x,x,6,0,9 (31xx2.4)
10,x,8,9,0,x,9 (4x12.x3)
8,11,x,9,0,8,x (14x3.2x)
8,9,x,5,x,0,9 (23x1x.4)
8,x,x,11,0,0,9 (1xx3..2)
8,x,10,9,0,x,9 (1x42.x3)
8,5,x,5,x,0,9 (31x2x.4)
8,5,8,x,x,0,9 (213xx.4)
8,11,x,x,0,0,9 (13xx..2)
x,9,8,x,0,x,9 (x21x.x3)
8,x,x,11,0,0,7 (2xx3..1)
8,11,x,x,0,0,7 (23xx..1)
x,5,x,x,6,6,7 (x1xx234)
x,5,8,9,6,x,x (x1342xx)
x,9,8,5,6,x,x (x4312xx)
10,x,x,9,0,6,9 (4xx2.13)
x,5,4,x,x,6,7 (x21xx34)
10,9,x,x,0,6,9 (42xx.13)
8,11,x,9,0,x,9 (14x2.x3)
x,9,x,x,0,6,9 (x2xx.13)
8,9,x,11,0,x,9 (12x4.x3)
8,11,x,9,0,x,7 (24x3.x1)
x,5,8,x,6,x,7 (x14x2x3)
x,5,8,x,x,0,9 (x12xx.3)
8,x,8,11,0,x,7 (2x34.x1)
8,11,x,11,0,x,7 (23x4.x1)
8,9,x,11,0,x,7 (23x4.x1)
x,5,x,9,6,6,x (x1x423x)
8,x,10,11,0,x,7 (2x34.x1)
8,11,10,x,0,x,7 (243x.x1)
10,11,8,x,0,x,7 (342x.x1)
8,11,8,x,0,x,7 (243x.x1)
8,11,x,x,0,8,7 (24xx.31)
x,9,x,5,6,6,x (x4x123x)
8,x,x,11,0,8,7 (2xx4.31)
10,x,8,11,0,x,7 (3x24.x1)
x,5,8,9,x,x,9 (x123xx4)
x,9,8,5,x,x,9 (x321xx4)
x,5,x,9,x,6,9 (x1x3x24)
x,9,x,5,x,6,9 (x3x1x24)
x,11,8,x,0,x,7 (x32x.x1)
4,x,8,x,0,0,x (1x2x..x)
8,x,4,x,0,0,x (2x1x..x)
8,11,x,x,0,0,x (12xx..x)
4,5,8,x,x,0,x (123xx.x)
8,5,4,x,x,0,x (321xx.x)
4,x,x,5,4,6,x (1xx213x)
4,5,x,x,4,6,x (12xx13x)
8,x,4,5,4,x,x (3x121xx)
8,x,4,5,x,0,x (3x12x.x)
4,x,8,5,x,0,x (1x32x.x)
4,x,8,5,4,x,x (1x321xx)
8,5,4,x,4,x,x (321x1xx)
4,5,8,x,4,x,x (123x1xx)
4,x,2,x,0,6,x (2x1x.3x)
2,x,4,x,0,6,x (1x2x.3x)
8,x,x,5,6,0,x (3xx12.x)
8,5,x,x,6,0,x (31xx2.x)
8,x,x,11,0,0,x (1xx2..x)
2,x,4,5,x,6,x (1x23x4x)
4,x,2,5,x,6,x (2x13x4x)
2,5,x,x,6,6,x (12xx34x)
2,5,4,x,x,6,x (132xx4x)
4,5,2,x,x,6,x (231xx4x)
8,9,x,11,0,x,x (12x3.xx)
8,11,x,9,0,x,x (13x2.xx)
8,x,x,x,0,0,9 (1xxx..2)
2,x,x,5,6,6,x (1xx234x)
4,x,x,x,0,6,7 (1xxx.23)
4,x,x,x,4,6,3 (2xxx341)
4,x,2,x,x,6,3 (3x1xx42)
8,9,x,x,0,x,9 (12xx.x3)
8,x,x,9,0,x,9 (1xx2.x3)
8,5,x,9,6,x,x (31x42xx)
2,x,x,x,6,6,3 (1xxx342)
8,9,x,5,6,x,x (34x12xx)
2,x,4,x,x,6,3 (1x3xx42)
4,x,8,x,0,x,7 (1x3x.x2)
4,5,x,x,x,6,7 (12xxx34)
8,x,4,x,0,x,7 (3x1x.x2)
4,x,x,5,x,6,7 (1xx2x34)
8,x,x,5,6,x,7 (4xx12x3)
8,5,x,x,6,x,7 (41xx2x3)
8,x,x,5,x,0,9 (2xx1x.3)
8,5,x,x,x,0,9 (21xxx.3)
8,x,4,5,x,x,7 (4x12xx3)
4,5,8,x,x,x,7 (124xxx3)
8,5,4,x,x,x,7 (421xxx3)
4,x,8,5,x,x,7 (1x42xx3)
8,5,x,9,x,x,9 (21x3xx4)
8,9,x,5,x,x,9 (23x1xx4)
8,x,x,11,0,x,7 (2xx3.x1)
8,11,x,x,0,x,7 (23xx.x1)

Hızlı Özet

  • G7b5 akoru şu notaları içerir: G, B, D♭, F
  • Alex akortunda 327 pozisyon mevcuttur
  • Şu şekilde de yazılır: GM7b5, GM7b5, GM7b5, G dom7dim5
  • Her diyagram 7-String Guitar klavyesindeki parmak pozisyonlarını gösterir

Sık Sorulan Sorular

7-String Guitar'da G7b5 akoru nedir?

G7b5 bir G dom7dim5 akorudur. G, B, D♭, F notalarını içerir. Alex akortunda 7-String Guitar'da 327 çalma yolu vardır.

7-String Guitar'da G7b5 nasıl çalınır?

Alex akortunda 'da G7b5 çalmak için yukarıda gösterilen 327 pozisyondan birini kullanın.

G7b5 akorunda hangi notalar var?

G7b5 akoru şu notaları içerir: G, B, D♭, F.

7-String Guitar'da G7b5 kaç şekilde çalınabilir?

Alex akortunda G7b5 için 327 pozisyon vardır. Her pozisyon klavyede farklı bir yer kullanır: G, B, D♭, F.

G7b5'in diğer adları nelerdir?

G7b5 ayrıca GM7b5, GM7b5, GM7b5, G dom7dim5 olarak da bilinir. Bunlar aynı akorun farklı gösterimleridir: G, B, D♭, F.