Fbm11b5b9 Mandolin Akoru — Irish Akortunda Diyagram ve Tablar

Kısa cevap: Fbm11b5b9, F♭, A♭♭, C♭♭, E♭♭, G♭♭, B♭♭ notalarını içeren bir Fb m11b5b9 akorudur. Irish akortunda 216 pozisyon vardır. Aşağıdaki diyagramlara bakın.

Diğer adıyla: Fbm11°5b9, Fb−11b5b9, Fb−11°5b9

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Nasıl çalınır Fbm11b5b9 üzerinde Mandolin

Fbm11b5b9, Fbm11°5b9, Fb−11b5b9, Fb−11°5b9

Notalar: F♭, A♭♭, C♭♭, E♭♭, G♭♭, B♭♭

x,x,5,2,1,0,3,0 (xx421.3.)
x,x,3,2,0,1,5,0 (xx32.14.)
x,x,5,2,0,1,3,0 (xx42.13.)
x,x,3,2,1,0,5,0 (xx321.4.)
x,x,5,2,1,0,0,3 (xx421..3)
x,x,0,2,0,1,3,5 (xx.2.134)
x,x,0,2,1,0,3,5 (xx.21.34)
x,x,5,2,0,1,0,3 (xx42.1.3)
x,x,3,2,0,1,0,5 (xx32.1.4)
x,x,3,2,1,0,0,5 (xx321..4)
x,x,0,2,0,1,5,3 (xx.2.143)
x,x,0,2,1,0,5,3 (xx.21.43)
0,9,8,8,8,0,x,0 (.4123.x.)
0,9,8,8,8,0,0,x (.4123..x)
0,9,7,8,8,0,0,x (.4123..x)
0,x,2,2,0,1,3,0 (.x23.14.)
0,x,2,2,1,0,3,0 (.x231.4.)
0,9,7,8,8,0,x,0 (.4123.x.)
0,x,3,2,1,0,2,0 (.x421.3.)
0,x,3,2,0,1,2,0 (.x42.13.)
0,9,8,8,0,8,0,x (.412.3.x)
0,9,8,8,0,8,x,0 (.412.3x.)
0,x,3,2,1,0,0,2 (.x421..3)
0,x,0,2,1,0,2,3 (.x.21.34)
0,9,7,8,0,8,0,x (.412.3.x)
0,x,0,2,0,1,2,3 (.x.2.134)
0,x,2,2,1,0,0,3 (.x231..4)
0,x,0,2,0,1,3,2 (.x.2.143)
0,x,0,2,1,0,3,2 (.x.21.43)
0,x,2,2,0,1,0,3 (.x23.1.4)
0,9,7,8,0,8,x,0 (.412.3x.)
0,x,3,2,0,1,0,2 (.x42.1.3)
0,9,5,8,8,0,0,x (.4123..x)
0,9,5,8,8,0,x,0 (.4123.x.)
0,9,0,8,0,8,8,x (.4.1.23x)
0,9,x,8,0,8,8,0 (.4x1.23.)
0,9,0,8,8,0,8,x (.4.12.3x)
0,9,x,8,8,0,8,0 (.4x12.3.)
0,x,3,2,0,1,5,0 (.x32.14.)
0,9,7,x,0,8,8,0 (.41x.23.)
0,9,8,x,0,8,7,0 (.42x.31.)
x,9,8,5,8,0,0,x (x4213..x)
0,9,x,8,0,8,7,0 (.4x2.31.)
0,x,5,2,1,0,3,0 (.x421.3.)
x,9,5,8,8,0,0,x (x4123..x)
0,9,7,x,8,0,8,0 (.41x2.3.)
0,9,0,8,8,0,7,x (.4.23.1x)
0,x,5,2,0,1,3,0 (.x42.13.)
0,9,0,8,0,8,7,x (.4.2.31x)
0,9,x,8,8,0,7,0 (.4x23.1.)
x,9,8,5,8,0,x,0 (x4213.x.)
0,x,3,2,1,0,5,0 (.x321.4.)
x,9,5,8,8,0,x,0 (x4123.x.)
0,9,8,x,8,0,7,0 (.42x3.1.)
0,9,5,8,0,8,x,0 (.412.3x.)
0,9,x,8,0,8,0,8 (.4x1.2.3)
0,9,5,8,0,8,0,x (.412.3.x)
0,9,0,8,8,0,x,8 (.4.12.x3)
0,9,0,8,0,8,x,8 (.4.1.2x3)
0,9,x,8,8,0,0,8 (.4x12..3)
0,x,3,2,1,0,0,5 (.x321..4)
0,9,0,x,0,8,8,7 (.4.x.231)
0,9,0,x,8,0,8,7 (.4.x2.31)
0,x,0,2,0,1,5,3 (.x.2.143)
0,9,x,8,0,8,0,7 (.4x2.3.1)
0,x,0,2,1,0,5,3 (.x.21.43)
0,9,8,x,0,8,0,7 (.42x.3.1)
0,9,x,8,8,0,0,7 (.4x23..1)
0,9,8,x,8,0,0,7 (.42x3..1)
0,9,0,8,0,8,x,7 (.4.2.3x1)
0,9,0,8,8,0,x,7 (.4.23.x1)
0,9,7,x,0,8,0,8 (.41x.2.3)
0,x,0,2,0,1,3,5 (.x.2.134)
x,9,8,5,0,8,0,x (x421.3.x)
0,x,5,2,0,1,0,3 (.x42.1.3)
x,9,5,8,0,8,0,x (x412.3.x)
0,x,0,2,1,0,3,5 (.x.21.34)
0,x,5,2,1,0,0,3 (.x421..3)
x,9,8,5,0,8,x,0 (x421.3x.)
x,9,5,8,0,8,x,0 (x412.3x.)
0,9,0,x,0,8,7,8 (.4.x.213)
0,9,7,x,8,0,0,8 (.41x2..3)
0,x,3,2,0,1,0,5 (.x32.1.4)
0,9,0,x,8,0,7,8 (.4.x2.13)
0,9,8,x,0,8,5,0 (.42x.31.)
0,9,x,8,8,0,5,0 (.4x23.1.)
0,9,x,8,0,8,5,0 (.4x2.31.)
0,9,5,x,8,0,8,0 (.41x2.3.)
0,9,8,x,8,0,5,0 (.42x3.1.)
0,9,5,x,0,8,8,0 (.41x.23.)
0,9,0,8,0,8,5,x (.4.2.31x)
0,9,0,8,8,0,5,x (.4.23.1x)
x,9,x,5,0,8,8,0 (x4x1.23.)
x,9,0,5,0,8,8,x (x4.1.23x)
x,9,x,8,0,8,5,0 (x4x2.31.)
x,9,x,5,8,0,8,0 (x4x12.3.)
x,9,8,x,8,0,5,0 (x42x3.1.)
x,9,0,5,8,0,8,x (x4.12.3x)
x,9,5,x,0,8,8,0 (x41x.23.)
x,9,x,8,8,0,5,0 (x4x23.1.)
x,9,8,x,0,8,5,0 (x42x.31.)
x,9,0,8,8,0,5,x (x4.23.1x)
x,9,5,x,8,0,8,0 (x41x2.3.)
x,9,0,8,0,8,5,x (x4.2.31x)
0,9,5,x,0,8,0,8 (.41x.2.3)
0,9,0,x,0,8,5,8 (.4.x.213)
0,9,0,x,8,0,8,5 (.4.x2.31)
0,9,5,x,8,0,0,8 (.41x2..3)
0,9,x,8,0,8,0,5 (.4x2.3.1)
0,9,8,x,0,8,0,5 (.42x.3.1)
0,9,0,x,0,8,8,5 (.4.x.231)
0,9,x,8,8,0,0,5 (.4x23..1)
0,9,8,x,8,0,0,5 (.42x3..1)
0,9,0,x,8,0,5,8 (.4.x2.13)
0,9,0,8,0,8,x,5 (.4.2.3x1)
0,9,0,8,8,0,x,5 (.4.23.x1)
x,9,8,x,0,8,0,5 (x42x.3.1)
x,9,0,x,8,0,8,5 (x4.x2.31)
x,9,x,5,0,8,0,8 (x4x1.2.3)
x,9,0,5,8,0,x,8 (x4.12.x3)
x,9,x,8,0,8,0,5 (x4x2.3.1)
x,9,0,x,8,0,5,8 (x4.x2.13)
x,9,5,x,0,8,0,8 (x41x.2.3)
x,9,x,5,8,0,0,8 (x4x12..3)
x,9,x,8,8,0,0,5 (x4x23..1)
x,9,0,x,0,8,5,8 (x4.x.213)
x,9,8,x,8,0,0,5 (x42x3..1)
x,9,5,x,8,0,0,8 (x41x2..3)
x,9,0,5,0,8,x,8 (x4.1.2x3)
x,9,0,8,0,8,x,5 (x4.2.3x1)
x,9,0,x,0,8,8,5 (x4.x.231)
x,9,0,8,8,0,x,5 (x4.23.x1)
0,x,3,2,1,0,x,0 (.x321.x.)
0,x,3,2,1,0,0,x (.x321..x)
0,x,3,2,0,1,0,x (.x32.1.x)
0,x,3,2,0,1,x,0 (.x32.1x.)
0,9,8,x,8,0,0,x (.31x2..x)
0,9,8,x,8,0,x,0 (.31x2.x.)
0,x,x,2,1,0,3,0 (.xx21.3.)
0,x,x,2,0,1,3,0 (.xx2.13.)
0,x,0,2,0,1,3,x (.x.2.13x)
0,x,0,2,1,0,3,x (.x.21.3x)
0,9,8,x,0,8,0,x (.31x.2.x)
0,9,8,x,0,8,x,0 (.31x.2x.)
0,9,7,8,8,x,x,0 (.4123xx.)
0,9,8,7,8,x,x,0 (.4213xx.)
0,x,x,2,0,1,0,3 (.xx2.1.3)
0,9,8,7,8,x,0,x (.4213x.x)
0,9,7,8,8,x,0,x (.4123x.x)
0,x,0,2,1,0,x,3 (.x.21.x3)
0,x,0,2,0,1,x,3 (.x.2.1x3)
0,x,x,2,1,0,0,3 (.xx21..3)
0,9,x,x,8,0,8,0 (.3xx1.2.)
0,9,0,x,8,0,8,x (.3.x1.2x)
10,9,8,x,10,0,0,x (321x4..x)
0,9,x,x,0,8,8,0 (.3xx.12.)
10,9,8,x,10,0,x,0 (321x4.x.)
0,9,0,x,0,8,8,x (.3.x.12x)
0,9,7,8,x,8,0,x (.412x3.x)
0,9,8,7,x,8,x,0 (.421x3x.)
0,9,7,8,x,8,x,0 (.412x3x.)
0,9,8,7,x,8,0,x (.421x3.x)
3,x,5,2,0,x,3,0 (2x41.x3.)
0,9,x,x,0,8,0,8 (.3xx.1.2)
0,9,0,x,0,8,x,8 (.3.x.1x2)
0,9,x,x,8,0,0,8 (.3xx1..2)
0,9,0,x,8,0,x,8 (.3.x1.x2)
10,9,8,x,0,10,x,0 (321x.4x.)
10,9,8,x,0,10,0,x (321x.4.x)
3,x,3,2,x,0,5,0 (2x31x.4.)
3,x,3,2,0,x,5,0 (2x31.x4.)
3,x,5,2,x,0,3,0 (2x41x.3.)
0,9,7,x,x,8,8,0 (.41xx23.)
0,9,8,x,8,x,7,0 (.42x3x1.)
0,9,x,8,8,x,7,0 (.4x23x1.)
0,9,8,x,x,8,7,0 (.42xx31.)
0,9,0,8,8,x,7,x (.4.23x1x)
0,9,x,8,x,8,7,0 (.4x2x31.)
0,9,0,7,x,8,8,x (.4.1x23x)
0,9,7,x,8,x,8,0 (.41x2x3.)
0,9,0,8,x,8,7,x (.4.2x31x)
0,9,x,7,x,8,8,0 (.4x1x23.)
0,9,0,7,8,x,8,x (.4.12x3x)
0,9,x,7,8,x,8,0 (.4x12x3.)
10,9,0,x,10,0,8,x (32.x4.1x)
10,9,x,x,0,10,8,0 (32xx.41.)
3,x,5,2,0,x,0,3 (2x41.x.3)
3,x,0,2,x,0,3,5 (2x.1x.34)
10,9,x,x,10,0,8,0 (32xx4.1.)
3,x,0,2,0,x,3,5 (2x.1.x34)
10,9,0,x,0,10,8,x (32.x.41x)
3,x,0,2,x,0,5,3 (2x.1x.43)
3,x,5,2,x,0,0,3 (2x41x..3)
3,x,3,2,0,x,0,5 (2x31.x.4)
3,x,3,2,x,0,0,5 (2x31x..4)
3,x,0,2,0,x,5,3 (2x.1.x43)
0,9,0,x,8,x,8,7 (.4.x2x31)
0,9,8,x,x,8,0,7 (.42xx3.1)
0,9,0,7,x,8,x,8 (.4.1x2x3)
0,9,7,x,x,8,0,8 (.41xx2.3)
0,9,x,7,x,8,0,8 (.4x1x2.3)
0,9,0,8,8,x,x,7 (.4.23xx1)
0,9,0,x,x,8,8,7 (.4.xx231)
0,9,8,x,8,x,0,7 (.42x3x.1)
0,9,0,x,x,8,7,8 (.4.xx213)
0,9,7,x,8,x,0,8 (.41x2x.3)
0,9,x,7,8,x,0,8 (.4x12x.3)
0,9,0,x,8,x,7,8 (.4.x2x13)
0,9,0,7,8,x,x,8 (.4.12xx3)
0,9,0,8,x,8,x,7 (.4.2x3x1)
0,9,x,8,x,8,0,7 (.4x2x3.1)
0,9,x,8,8,x,0,7 (.4x23x.1)
10,9,x,x,0,10,0,8 (32xx.4.1)
10,9,x,x,10,0,0,8 (32xx4..1)
10,9,0,x,0,10,x,8 (32.x.4x1)
10,9,0,x,10,0,x,8 (32.x4.x1)

Hızlı Özet

  • Fbm11b5b9 akoru şu notaları içerir: F♭, A♭♭, C♭♭, E♭♭, G♭♭, B♭♭
  • Irish akortunda 216 pozisyon mevcuttur
  • Şu şekilde de yazılır: Fbm11°5b9, Fb−11b5b9, Fb−11°5b9
  • Her diyagram Mandolin klavyesindeki parmak pozisyonlarını gösterir

Sık Sorulan Sorular

Mandolin'da Fbm11b5b9 akoru nedir?

Fbm11b5b9 bir Fb m11b5b9 akorudur. F♭, A♭♭, C♭♭, E♭♭, G♭♭, B♭♭ notalarını içerir. Irish akortunda Mandolin'da 216 çalma yolu vardır.

Mandolin'da Fbm11b5b9 nasıl çalınır?

Irish akortunda 'da Fbm11b5b9 çalmak için yukarıda gösterilen 216 pozisyondan birini kullanın.

Fbm11b5b9 akorunda hangi notalar var?

Fbm11b5b9 akoru şu notaları içerir: F♭, A♭♭, C♭♭, E♭♭, G♭♭, B♭♭.

Mandolin'da Fbm11b5b9 kaç şekilde çalınabilir?

Irish akortunda Fbm11b5b9 için 216 pozisyon vardır. Her pozisyon klavyede farklı bir yer kullanır: F♭, A♭♭, C♭♭, E♭♭, G♭♭, B♭♭.

Fbm11b5b9'in diğer adları nelerdir?

Fbm11b5b9 ayrıca Fbm11°5b9, Fb−11b5b9, Fb−11°5b9 olarak da bilinir. Bunlar aynı akorun farklı gösterimleridir: F♭, A♭♭, C♭♭, E♭♭, G♭♭, B♭♭.