Kunci GmM7b9 Mandolin — Diagram dan Tab dalam Penyetelan Modal D

Jawaban singkat: GmM7b9 adalah kunci G mM7b9 dengan not G, B♭, D, F♯, A♭. Dalam penyetelan Modal D ada 294 posisi. Lihat diagram di bawah.

Dikenal juga sebagai: Gm#7b9, G-M7b9, G−Δ7b9, G−Δb9

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Cara memainkan GmM7b9 pada Mandolin

GmM7b9, Gm#7b9, G-M7b9, G−Δ7b9, G−Δb9

Not: G, B♭, D, F♯, A♭

x,10,0,8,11,9,0,0 (x3.142..)
x,10,0,8,9,11,0,0 (x3.124..)
x,x,5,5,9,5,6,8 (xx114123)
x,x,5,5,5,9,6,8 (xx111423)
x,x,6,5,5,9,5,8 (xx211413)
x,x,6,5,9,5,5,8 (xx214113)
x,x,5,5,5,9,8,6 (xx111432)
x,x,8,5,9,5,6,5 (xx314121)
x,x,5,5,9,5,8,6 (xx114132)
x,x,8,5,5,9,6,5 (xx311421)
x,x,8,5,5,9,5,6 (xx311412)
x,x,8,5,9,5,5,6 (xx314112)
x,x,6,5,5,9,8,5 (xx211431)
x,x,6,5,9,5,8,5 (xx214131)
x,x,x,5,5,9,6,8 (xxx11423)
x,x,x,5,5,9,8,6 (xxx11432)
x,x,x,5,9,5,6,8 (xxx14123)
x,x,x,5,9,5,8,6 (xxx14132)
11,10,0,8,9,x,0,0 (43.12x..)
9,10,0,8,11,x,0,0 (23.14x..)
9,x,8,5,5,5,6,5 (4x311121)
5,x,5,5,9,5,6,8 (1x114123)
5,x,8,5,9,5,5,6 (1x314112)
9,x,6,5,5,5,5,8 (4x211113)
9,x,8,5,5,5,5,6 (4x311112)
5,x,6,5,5,9,8,5 (1x211431)
5,x,5,5,5,9,8,6 (1x111432)
5,x,6,5,9,5,8,5 (1x214131)
9,x,5,5,5,5,6,8 (4x111123)
9,x,6,5,5,5,8,5 (4x211131)
5,x,8,5,5,9,6,5 (1x311421)
5,x,6,5,5,9,5,8 (1x211413)
5,x,8,5,9,5,6,5 (1x314121)
5,x,5,5,9,5,8,6 (1x114132)
5,x,5,5,5,9,6,8 (1x111423)
9,10,0,8,x,11,0,0 (23.1x4..)
5,x,6,5,9,5,5,8 (1x214113)
11,10,0,8,x,9,0,0 (43.1x2..)
9,x,5,5,5,5,8,6 (4x111132)
5,x,8,5,5,9,5,6 (1x311412)
x,10,8,6,9,x,0,0 (x4213x..)
x,10,6,8,9,x,0,0 (x4123x..)
x,10,8,6,x,9,0,0 (x421x3..)
x,10,6,8,x,9,0,0 (x412x3..)
x,10,8,x,9,11,0,0 (x31x24..)
x,10,0,8,11,9,x,0 (x3.142x.)
x,10,0,8,9,11,0,x (x3.124.x)
x,10,0,8,11,9,0,x (x3.142.x)
x,10,x,8,9,11,0,0 (x3x124..)
x,10,0,8,9,11,x,0 (x3.124x.)
x,10,x,8,11,9,0,0 (x3x142..)
x,10,8,x,11,9,0,0 (x31x42..)
x,10,0,8,9,x,6,0 (x4.23x1.)
x,10,0,8,x,9,6,0 (x4.2x31.)
x,10,0,6,9,x,8,0 (x4.13x2.)
x,10,0,6,x,9,8,0 (x4.1x32.)
x,10,0,x,11,9,8,0 (x3.x421.)
x,10,0,x,9,11,8,0 (x3.x241.)
x,x,8,5,5,9,6,x (xx31142x)
x,x,6,5,9,5,8,x (xx21413x)
x,x,6,5,5,9,8,x (xx21143x)
x,x,8,5,9,5,6,x (xx31412x)
x,10,0,8,9,x,0,6 (x4.23x.1)
x,10,0,6,x,9,0,8 (x4.1x3.2)
x,10,0,8,x,9,0,6 (x4.2x3.1)
x,10,0,6,9,x,0,8 (x4.13x.2)
x,10,0,x,11,9,0,8 (x3.x42.1)
x,10,0,x,9,11,0,8 (x3.x24.1)
x,x,8,5,5,9,x,6 (xx3114x2)
x,x,6,5,5,9,x,8 (xx2114x3)
x,x,6,5,x,9,8,0 (xx21x43.)
x,x,6,5,9,5,x,8 (xx2141x3)
x,x,8,5,9,5,x,6 (xx3141x2)
x,x,6,5,9,x,8,0 (xx214x3.)
x,x,8,5,x,9,6,0 (xx31x42.)
x,x,8,5,9,x,6,0 (xx314x2.)
x,x,8,5,x,9,0,6 (xx31x4.2)
x,x,0,5,x,9,8,6 (xx.1x432)
x,x,6,5,x,9,0,8 (xx21x4.3)
x,x,8,5,9,x,0,6 (xx314x.2)
x,x,0,5,9,x,8,6 (xx.14x32)
x,x,0,5,9,x,6,8 (xx.14x23)
x,x,6,5,9,x,0,8 (xx214x.3)
x,x,0,5,x,9,6,8 (xx.1x423)
9,10,8,6,x,x,0,0 (3421xx..)
9,10,6,8,x,x,0,0 (3412xx..)
11,10,0,8,9,x,0,x (43.12x.x)
11,10,0,8,9,x,x,0 (43.12xx.)
9,10,0,8,11,x,x,0 (23.14xx.)
5,x,8,5,9,5,6,x (1x31412x)
9,10,8,x,11,x,0,0 (231x4x..)
11,10,x,8,9,x,0,0 (43x12x..)
9,x,8,5,5,5,6,x (4x31112x)
5,x,8,5,5,9,6,x (1x31142x)
5,x,6,5,5,9,8,x (1x21143x)
11,10,8,x,9,x,0,0 (431x2x..)
9,10,x,8,11,x,0,0 (23x14x..)
5,x,6,5,9,5,8,x (1x21413x)
9,x,6,5,5,5,8,x (4x21113x)
9,10,0,8,11,x,0,x (23.14x.x)
5,x,x,5,5,9,8,6 (1xx11432)
5,x,6,5,9,x,5,8 (1x214x13)
9,10,8,x,x,11,0,0 (231xx4..)
9,10,x,8,x,11,0,0 (23x1x4..)
9,x,6,5,5,x,5,8 (4x211x13)
5,x,5,5,x,9,8,6 (1x11x432)
5,x,x,5,5,9,6,8 (1xx11423)
5,x,5,5,9,x,8,6 (1x114x32)
9,10,0,8,x,11,x,0 (23.1x4x.)
9,x,5,5,5,x,8,6 (4x111x32)
5,x,8,5,x,9,5,6 (1x31x412)
5,x,x,5,9,5,8,6 (1xx14132)
9,x,8,5,x,5,5,6 (4x31x112)
11,10,0,8,x,9,0,x (43.1x2.x)
5,x,8,5,9,x,5,6 (1x314x12)
5,x,5,5,x,9,6,8 (1x11x423)
9,x,8,5,5,x,5,6 (4x311x12)
9,x,8,5,5,5,x,6 (4x3111x2)
5,x,x,5,9,5,6,8 (1xx14123)
9,x,5,5,5,x,6,8 (4x111x23)
5,x,6,5,x,9,5,8 (1x21x413)
9,x,x,5,5,5,6,8 (4xx11123)
9,x,x,5,5,5,8,6 (4xx11132)
5,x,8,5,5,9,x,6 (1x3114x2)
5,x,6,5,5,9,x,8 (1x2114x3)
5,x,8,5,9,5,x,6 (1x3141x2)
9,x,5,5,x,5,6,8 (4x11x123)
5,x,5,5,9,x,6,8 (1x114x23)
9,x,5,5,x,5,8,6 (4x11x132)
11,10,8,x,x,9,0,0 (431xx2..)
9,10,0,8,x,11,0,x (23.1x4.x)
5,x,6,5,x,9,8,5 (1x21x431)
5,x,6,5,9,5,x,8 (1x2141x3)
9,x,6,5,x,5,8,5 (4x21x131)
5,x,6,5,9,x,8,5 (1x214x31)
11,10,x,8,x,9,0,0 (43x1x2..)
9,x,6,5,5,x,8,5 (4x211x31)
9,x,6,5,x,5,5,8 (4x21x113)
5,x,8,5,x,9,6,5 (1x31x421)
11,10,0,8,x,9,x,0 (43.1x2x.)
9,x,8,5,x,5,6,5 (4x31x121)
5,x,8,5,9,x,6,5 (1x314x21)
9,x,8,5,5,x,6,5 (4x311x21)
9,x,6,5,5,5,x,8 (4x2111x3)
9,10,0,8,x,x,6,0 (34.2xx1.)
9,10,0,6,x,x,8,0 (34.1xx2.)
x,10,8,6,9,x,x,0 (x4213xx.)
x,10,6,8,9,x,0,x (x4123x.x)
x,10,6,8,9,x,x,0 (x4123xx.)
9,10,0,x,11,x,8,0 (23.x4x1.)
11,10,0,x,x,9,8,0 (43.xx21.)
x,10,8,6,9,x,0,x (x4213x.x)
11,10,0,x,9,x,8,0 (43.x2x1.)
9,10,0,x,x,11,8,0 (23.xx41.)
9,10,0,6,x,x,0,8 (34.1xx.2)
9,10,0,8,x,x,0,6 (34.2xx.1)
9,10,0,x,x,11,0,8 (23.xx4.1)
x,10,6,8,x,9,x,0 (x412x3x.)
9,10,0,x,11,x,0,8 (23.x4x.1)
11,10,0,x,x,9,0,8 (43.xx2.1)
11,10,0,x,9,x,0,8 (43.x2x.1)
x,10,8,6,x,9,x,0 (x421x3x.)
x,10,8,6,x,9,0,x (x421x3.x)
x,10,6,8,x,9,0,x (x412x3.x)
x,10,0,8,9,11,x,x (x3.124xx)
x,10,x,8,11,9,x,0 (x3x142x.)
x,10,8,x,9,11,0,x (x31x24.x)
x,10,x,8,11,9,0,x (x3x142.x)
x,10,8,x,11,9,x,0 (x31x42x.)
x,10,8,x,11,9,0,x (x31x42.x)
x,10,x,8,9,11,0,x (x3x124.x)
x,10,8,x,9,11,x,0 (x31x24x.)
x,10,x,8,9,11,x,0 (x3x124x.)
x,10,0,8,11,9,x,x (x3.142xx)
x,10,x,8,9,x,6,0 (x4x23x1.)
x,10,8,x,9,x,6,0 (x42x3x1.)
x,10,0,8,9,x,6,x (x4.23x1x)
x,10,6,x,9,x,8,0 (x41x3x2.)
x,10,0,6,x,9,8,x (x4.1x32x)
x,10,x,6,x,9,8,0 (x4x1x32.)
x,10,0,6,9,x,8,x (x4.13x2x)
x,10,6,x,x,9,8,0 (x41xx32.)
x,10,x,6,9,x,8,0 (x4x13x2.)
x,10,x,8,x,9,6,0 (x4x2x31.)
x,10,8,x,x,9,6,0 (x42xx31.)
x,10,0,8,x,9,6,x (x4.2x31x)
x,10,0,x,9,11,8,x (x3.x241x)
x,10,x,x,11,9,8,0 (x3xx421.)
x,10,x,x,9,11,8,0 (x3xx241.)
x,10,0,x,11,9,8,x (x3.x421x)
x,10,0,8,x,9,x,6 (x4.2x3x1)
x,10,0,6,x,9,x,8 (x4.1x3x2)
x,10,0,x,9,x,8,6 (x4.x3x21)
x,10,0,x,x,9,6,8 (x4.xx312)
x,10,0,8,9,x,x,6 (x4.23xx1)
x,10,0,6,9,x,x,8 (x4.13xx2)
x,10,6,x,x,9,0,8 (x41xx3.2)
x,10,0,x,x,9,8,6 (x4.xx321)
x,10,x,8,x,9,0,6 (x4x2x3.1)
x,10,8,x,x,9,0,6 (x42xx3.1)
x,10,x,8,9,x,0,6 (x4x23x.1)
x,10,8,x,9,x,0,6 (x42x3x.1)
x,10,x,6,x,9,0,8 (x4x1x3.2)
x,10,0,x,9,x,6,8 (x4.x3x12)
x,10,x,6,9,x,0,8 (x4x13x.2)
x,10,6,x,9,x,0,8 (x41x3x.2)
x,10,0,x,9,11,x,8 (x3.x24x1)
x,10,x,x,9,11,0,8 (x3xx24.1)
x,10,0,x,11,9,x,8 (x3.x42x1)
x,10,x,x,11,9,0,8 (x3xx42.1)
9,10,8,6,x,x,x,0 (3421xxx.)
9,10,6,8,x,x,x,0 (3412xxx.)
9,10,6,8,x,x,0,x (3412xx.x)
9,10,8,6,x,x,0,x (3421xx.x)
11,10,x,8,9,x,0,x (43x12x.x)
9,x,6,5,5,x,8,x (4x211x3x)
9,x,8,5,x,5,6,x (4x31x12x)
9,10,x,8,11,x,0,x (23x14x.x)
9,10,8,x,11,x,0,x (231x4x.x)
11,10,0,8,9,x,x,x (43.12xxx)
5,x,8,5,x,9,6,x (1x31x42x)
9,10,8,x,11,x,x,0 (231x4xx.)
5,x,6,5,x,9,8,x (1x21x43x)
5,x,8,5,9,x,6,x (1x314x2x)
11,10,x,8,9,x,x,0 (43x12xx.)
11,10,8,x,9,x,0,x (431x2x.x)
9,x,6,5,x,5,8,x (4x21x13x)
9,10,0,8,11,x,x,x (23.14xxx)
5,x,6,5,9,x,8,x (1x214x3x)
11,10,8,x,9,x,x,0 (431x2xx.)
9,10,x,8,11,x,x,0 (23x14xx.)
9,x,8,5,5,x,6,x (4x311x2x)
5,x,x,5,9,x,8,6 (1xx14x32)
11,10,8,x,x,9,x,0 (431xx2x.)
5,x,x,5,9,x,6,8 (1xx14x23)
11,10,x,8,x,9,x,0 (43x1x2x.)
5,x,8,5,x,9,x,6 (1x31x4x2)
9,x,6,5,x,5,x,8 (4x21x1x3)
5,x,x,5,x,9,6,8 (1xx1x423)
5,x,6,5,9,x,x,8 (1x214xx3)
9,x,6,5,5,x,x,8 (4x211xx3)
9,10,8,x,x,11,x,0 (231xx4x.)
9,10,0,8,x,11,x,x (23.1x4xx)
9,10,x,8,x,11,x,0 (23x1x4x.)
5,x,x,5,x,9,8,6 (1xx1x432)
11,10,8,x,x,9,0,x (431xx2.x)
11,10,x,8,x,9,0,x (43x1x2.x)
9,x,x,5,x,5,8,6 (4xx1x132)
9,x,x,5,5,x,6,8 (4xx11x23)
11,10,0,8,x,9,x,x (43.1x2xx)
9,x,8,5,x,x,6,0 (4x31xx2.)
9,10,x,8,x,11,0,x (23x1x4.x)
9,x,x,5,5,x,8,6 (4xx11x32)
9,x,8,5,5,x,x,6 (4x311xx2)
9,x,x,5,x,5,6,8 (4xx1x123)
9,10,8,x,x,11,0,x (231xx4.x)
5,x,6,5,x,9,x,8 (1x21x4x3)
5,x,8,5,9,x,x,6 (1x314xx2)
9,x,6,5,x,x,8,0 (4x21xx3.)
9,x,8,5,x,5,x,6 (4x31x1x2)
9,10,x,6,x,x,8,0 (34x1xx2.)
9,10,6,x,x,x,8,0 (341xxx2.)
9,10,x,8,x,x,6,0 (34x2xx1.)
9,10,8,x,x,x,6,0 (342xxx1.)
9,10,0,8,x,x,6,x (34.2xx1x)
9,10,0,6,x,x,8,x (34.1xx2x)
9,x,0,5,x,x,8,6 (4x.1xx32)
9,x,6,5,x,x,0,8 (4x21xx.3)
9,x,8,5,x,x,0,6 (4x31xx.2)
9,10,0,x,11,x,8,x (23.x4x1x)
9,10,0,x,x,11,8,x (23.xx41x)
9,x,0,5,x,x,6,8 (4x.1xx23)
9,10,x,x,11,x,8,0 (23xx4x1.)
11,10,x,x,9,x,8,0 (43xx2x1.)
11,10,x,x,x,9,8,0 (43xxx21.)
9,10,x,x,x,11,8,0 (23xxx41.)
11,10,0,x,x,9,8,x (43.xx21x)
11,10,0,x,9,x,8,x (43.x2x1x)
9,10,0,x,x,x,6,8 (34.xxx12)
9,10,0,6,x,x,x,8 (34.1xxx2)
9,10,x,8,x,x,0,6 (34x2xx.1)
9,10,0,x,x,x,8,6 (34.xxx21)
9,10,0,8,x,x,x,6 (34.2xxx1)
9,10,6,x,x,x,0,8 (341xxx.2)
9,10,x,6,x,x,0,8 (34x1xx.2)
9,10,8,x,x,x,0,6 (342xxx.1)
9,10,x,x,11,x,0,8 (23xx4x.1)
9,10,0,x,11,x,x,8 (23.x4xx1)
11,10,x,x,9,x,0,8 (43xx2x.1)
11,10,x,x,x,9,0,8 (43xxx2.1)
9,10,x,x,x,11,0,8 (23xxx4.1)
9,10,0,x,x,11,x,8 (23.xx4x1)
11,10,0,x,x,9,x,8 (43.xx2x1)
11,10,0,x,9,x,x,8 (43.x2xx1)

Ringkasan Cepat

  • Kunci GmM7b9 berisi not: G, B♭, D, F♯, A♭
  • Dalam penyetelan Modal D tersedia 294 posisi
  • Juga ditulis sebagai: Gm#7b9, G-M7b9, G−Δ7b9, G−Δb9
  • Setiap diagram menunjukkan posisi jari pada fretboard Mandolin

Pertanyaan yang Sering Diajukan

Apa itu kunci GmM7b9 di Mandolin?

GmM7b9 adalah kunci G mM7b9. Berisi not G, B♭, D, F♯, A♭. Di Mandolin dalam penyetelan Modal D ada 294 cara memainkan.

Bagaimana cara memainkan GmM7b9 di Mandolin?

Untuk memainkan GmM7b9 di dalam penyetelan Modal D, gunakan salah satu dari 294 posisi yang ditampilkan di atas.

Not apa saja dalam kunci GmM7b9?

Kunci GmM7b9 berisi not: G, B♭, D, F♯, A♭.

Berapa banyak cara memainkan GmM7b9 di Mandolin?

Dalam penyetelan Modal D ada 294 posisi untuk GmM7b9. Setiap posisi menggunakan tempat berbeda di fretboard: G, B♭, D, F♯, A♭.

Apa nama lain untuk GmM7b9?

GmM7b9 juga dikenal sebagai Gm#7b9, G-M7b9, G−Δ7b9, G−Δb9. Ini adalah notasi berbeda untuk kunci yang sama: G, B♭, D, F♯, A♭.