كورد Fbm9 على 7-String Guitar — مخطط وتابات بدوزان Drop B

إجابة مختصرة: Fbm9 هو كورد Fb min9 بالنوتات F♭, A♭♭, C♭, E♭♭, G♭. بدوزان Drop B هناك 256 وضعيات. انظر المخططات أدناه.

يُعرف أيضاً بـ: Fb-9, Fb min9

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كيف تعزف Fbm9 على 7-String Guitar

Fbm9, Fb-9, Fbmin9

نوتات: F♭, A♭♭, C♭, E♭♭, G♭

x,x,0,0,6,6,0 (xx..12.)
x,x,3,3,3,3,0 (xx1234.)
x,5,5,0,6,6,0 (x12.34.)
x,8,0,0,8,6,0 (x2..31.)
7,8,0,0,8,6,0 (23..41.)
8,8,0,0,8,6,0 (23..41.)
0,8,8,0,8,6,0 (.23.41.)
0,8,7,0,8,6,0 (.32.41.)
x,x,0,3,6,3,0 (xx.132.)
x,x,3,0,3,6,0 (xx1.23.)
x,5,7,0,6,6,0 (x14.23.)
x,0,5,0,6,6,5 (x.1.342)
x,0,0,0,8,6,8 (x...213)
0,0,7,0,8,6,8 (..2.314)
8,0,0,0,8,6,8 (2...314)
7,0,0,0,8,6,8 (2...314)
0,0,8,0,8,6,8 (..2.314)
x,0,7,0,6,6,5 (x.4.231)
x,5,8,0,6,6,0 (x14.23.)
x,8,8,0,10,10,0 (x12.34.)
x,8,8,0,8,10,0 (x12.34.)
x,10,0,0,6,6,0 (x3..12.)
x,8,0,0,10,6,0 (x2..31.)
0,10,8,0,6,6,0 (.43.12.)
8,8,0,0,10,6,0 (23..41.)
7,10,0,0,6,6,0 (34..12.)
x,x,7,0,6,6,5 (xx4.231)
0,10,7,0,6,6,0 (.43.12.)
8,10,0,0,6,6,0 (34..12.)
0,8,8,0,10,6,0 (.23.41.)
x,x,8,0,6,10,0 (xx2.13.)
x,0,8,0,10,10,8 (x.1.342)
x,x,7,3,6,3,5 (xx41312)
x,0,8,0,8,10,8 (x.1.243)
x,0,8,0,6,6,5 (x.4.231)
x,x,3,0,3,5,1 (xx2.341)
x,0,0,0,6,6,10 (x...123)
x,10,8,0,6,10,0 (x32.14.)
x,0,0,0,10,6,8 (x...312)
0,0,8,0,10,6,8 (..2.413)
x,x,8,0,6,5,5 (xx4.312)
x,x,8,0,10,10,8 (xx1.342)
0,0,8,0,6,6,10 (..3.124)
x,8,7,0,11,10,0 (x21.43.)
7,0,0,0,6,6,10 (3...124)
8,0,0,0,6,6,10 (3...124)
0,0,7,0,6,6,10 (..3.124)
8,0,0,0,10,6,8 (2...413)
x,x,0,0,10,6,8 (xx..312)
x,8,0,0,10,6,10 (x2..314)
x,0,8,0,6,10,10 (x.2.134)
x,10,0,0,10,6,8 (x3..412)
x,0,7,0,11,10,8 (x.1.432)
x,x,7,0,11,10,8 (xx1.432)
0,8,8,0,8,x,0 (.12.3x.)
8,8,0,0,8,x,0 (12..3x.)
x,0,0,0,6,6,x (x...12x)
x,1,3,0,3,x,0 (x12.3x.)
5,x,0,0,6,6,0 (1x..23.)
x,0,3,3,3,3,x (x.1234x)
0,0,5,0,6,6,x (..1.23x)
0,x,5,0,6,6,0 (.x1.23.)
5,0,0,0,6,6,x (1...23x)
7,0,0,0,6,6,x (3...12x)
7,x,0,0,6,6,0 (3x..12.)
0,x,7,0,6,6,0 (.x3.12.)
0,0,7,0,6,6,x (..3.12x)
8,8,0,0,10,x,0 (12..3x.)
0,8,8,0,10,x,0 (.12.3x.)
5,5,x,0,6,6,0 (12x.34.)
0,0,8,0,8,x,8 (..1.2x3)
8,0,0,0,8,x,8 (1...2x3)
0,8,x,0,8,6,0 (.2x.31.)
8,x,0,0,6,6,0 (3x..12.)
x,1,3,x,3,3,0 (x12x34.)
x,0,3,0,3,x,1 (x.2.3x1)
8,0,0,0,6,6,x (3...12x)
0,0,8,0,6,6,x (..3.12x)
0,x,8,0,6,6,0 (.x3.12.)
x,5,8,0,6,x,0 (x13.2x.)
3,1,5,0,3,x,0 (214.3x.)
5,1,3,0,3,x,0 (412.3x.)
x,8,0,0,11,x,0 (x1..2x.)
x,0,0,3,6,3,x (x..132x)
x,0,3,0,3,6,x (x.1.23x)
8,5,7,0,6,x,0 (413.2x.)
7,5,8,0,6,x,0 (314.2x.)
7,5,x,0,6,6,0 (41x.23.)
5,5,8,0,6,x,0 (124.3x.)
5,0,x,0,6,6,5 (1.x.342)
8,5,5,0,6,x,0 (412.3x.)
8,10,0,0,6,x,0 (23..1x.)
5,0,0,3,6,3,x (3..142x)
0,0,x,0,8,6,8 (..x.213)
5,x,3,0,3,6,0 (3x1.24.)
5,0,3,0,3,6,x (3.1.24x)
3,x,5,0,3,6,0 (1x3.24.)
7,8,0,0,8,6,x (23..41x)
3,0,5,0,3,6,x (1.3.24x)
0,10,8,0,6,x,0 (.32.1x.)
0,0,5,3,6,3,x (..3142x)
0,8,7,0,8,6,x (.32.41x)
5,x,0,3,6,3,0 (3x.142.)
x,0,3,x,3,3,1 (x.2x341)
0,x,5,3,6,3,0 (.x3142.)
x,5,7,0,6,6,x (x14.23x)
0,8,7,0,11,x,0 (.21.3x.)
7,8,0,0,11,x,0 (12..3x.)
x,8,8,0,x,10,0 (x12.x3.)
0,0,8,0,10,x,8 (..1.3x2)
7,0,x,0,6,6,5 (4.x.231)
8,5,x,0,6,6,0 (41x.23.)
8,0,0,0,10,x,8 (1...3x2)
0,8,8,0,8,5,x (.23.41x)
8,8,0,0,8,5,x (23..41x)
x,5,7,3,6,3,x (x24131x)
8,8,x,0,8,10,0 (12x.34.)
8,8,x,0,10,10,0 (12x.34.)
7,0,3,0,3,6,x (4.1.23x)
0,8,x,0,10,6,0 (.2x.31.)
0,x,7,3,6,3,0 (.x4132.)
7,x,0,0,8,6,8 (2x..314)
7,0,0,3,6,3,x (4..132x)
0,x,7,0,8,6,8 (.x2.314)
7,x,0,3,6,3,0 (4x.132.)
x,1,3,0,3,5,x (x12.34x)
0,0,7,3,6,3,x (..4132x)
0,10,x,0,6,6,0 (.3x.12.)
3,0,7,0,3,6,x (1.4.23x)
3,x,7,0,3,6,0 (1x4.23.)
7,x,3,0,3,6,0 (4x1.23.)
5,0,3,0,3,x,1 (4.2.3x1)
x,0,8,0,6,x,5 (x.3.2x1)
3,0,5,0,3,x,1 (2.4.3x1)
x,0,0,0,11,x,8 (x...2x1)
8,8,7,0,x,10,0 (231.x4.)
x,8,8,0,10,10,x (x12.34x)
x,0,8,0,x,10,8 (x.1.x32)
7,8,8,0,x,10,0 (123.x4.)
x,5,8,0,6,5,x (x14.32x)
8,0,7,0,6,x,5 (4.3.2x1)
8,x,0,0,8,5,8 (2x..314)
0,10,8,0,10,x,8 (.31.4x2)
8,0,x,0,8,10,8 (1.x.243)
x,8,0,0,10,6,x (x2..31x)
8,10,0,0,10,x,8 (13..4x2)
8,0,5,0,6,x,5 (4.1.3x2)
8,8,0,0,10,x,10 (12..3x4)
8,0,x,0,10,10,8 (1.x.342)
5,0,8,0,6,x,5 (1.4.3x2)
7,0,8,0,6,x,5 (3.4.2x1)
0,x,8,0,8,5,8 (.x2.314)
x,0,8,0,6,10,x (x.2.13x)
0,8,8,0,10,x,10 (.12.3x4)
8,0,x,0,6,6,5 (4.x.231)
8,8,0,0,10,6,x (23..41x)
8,10,x,0,6,10,0 (23x.14.)
0,10,7,0,6,6,x (.43.12x)
8,0,0,0,6,x,10 (2...1x3)
8,0,7,0,6,10,x (3.2.14x)
7,x,8,0,6,10,0 (2x3.14.)
0,0,x,0,10,6,8 (..x.312)
0,0,x,0,6,6,10 (..x.123)
7,0,8,0,6,10,x (2.3.14x)
0,0,8,0,6,x,10 (..2.1x3)
8,x,7,0,6,10,0 (3x2.14.)
7,10,0,0,6,6,x (34..12x)
0,8,8,0,10,6,x (.23.41x)
7,8,x,0,11,10,0 (12x.43.)
x,5,8,0,x,5,8 (x13.x24)
0,0,7,0,11,x,8 (..1.3x2)
x,8,8,0,x,5,5 (x34.x12)
8,0,7,0,x,10,8 (2.1.x43)
7,0,0,0,11,x,8 (1...3x2)
7,0,8,0,x,10,8 (1.2.x43)
x,8,7,0,11,10,x (x21.43x)
0,8,x,0,10,6,10 (.2x.314)
0,x,7,0,6,6,10 (.x3.124)
8,x,0,0,10,6,8 (2x..413)
7,x,0,0,6,6,10 (3x..124)
0,10,x,0,10,6,8 (.3x.412)
0,x,8,0,10,6,8 (.x2.413)
8,0,x,0,6,10,10 (2.x.134)
7,8,0,0,11,x,10 (12..4x3)
7,10,0,0,11,x,8 (13..4x2)
0,10,7,0,11,x,8 (.31.4x2)
7,0,x,0,11,10,8 (1.x.432)
0,8,7,0,11,x,10 (.21.4x3)
8,8,0,0,x,x,0 (12..xx.)
0,8,8,0,x,x,0 (.12.xx.)
0,x,x,0,6,6,0 (.xx.12.)
0,0,x,0,6,6,x (..x.12x)
3,1,x,0,3,x,0 (21x.3x.)
0,x,8,0,6,x,0 (.x2.1x.)
0,0,8,0,6,x,x (..2.1xx)
8,0,0,0,6,x,x (2...1xx)
3,0,x,3,3,3,x (1.x234x)
8,x,0,0,6,x,0 (2x..1x.)
3,x,x,3,3,3,0 (1xx234.)
0,0,8,0,x,x,8 (..1.xx2)
8,0,0,0,x,x,8 (1...xx2)
3,0,x,0,3,x,1 (2.x.3x1)
3,1,x,x,3,3,0 (21xx34.)
8,5,x,0,6,x,0 (31x.2x.)
0,8,x,0,11,x,0 (.1x.2x.)
8,8,0,0,10,x,x (12..3xx)
0,8,8,0,10,x,x (.12.3xx)
3,0,x,0,3,6,x (1.x.23x)
3,x,x,0,3,6,0 (1xx.23.)
0,x,x,3,6,3,0 (.xx132.)
0,0,x,3,6,3,x (..x132x)
3,0,x,x,3,3,1 (2.xx341)
8,5,7,0,6,x,x (413.2xx)
0,8,8,0,x,5,x (.23.x1x)
8,8,0,0,x,5,x (23..x1x)
8,8,x,0,x,10,0 (12x.x3.)
7,5,8,0,6,x,x (314.2xx)
7,5,x,0,6,6,x (41x.23x)
7,5,x,3,6,3,x (42x131x)
3,1,x,0,3,5,x (21x.34x)
7,8,0,0,11,x,x (12..3xx)
0,8,7,0,11,x,x (.21.3xx)
0,x,8,0,x,5,8 (.x2.x13)
0,x,8,0,10,x,8 (.x1.3x2)
8,0,x,0,x,10,8 (1.x.x32)
8,0,x,0,6,x,5 (3.x.2x1)
8,x,0,0,x,5,8 (2x..x13)
7,x,x,0,6,6,5 (4xx.231)
8,5,x,0,6,5,x (41x.32x)
8,x,0,0,10,x,8 (1x..3x2)
8,8,x,0,10,10,x (12x.34x)
0,0,x,0,11,x,8 (..x.2x1)
7,x,x,3,6,3,5 (4xx1312)
8,x,x,0,6,10,0 (2xx.13.)
0,8,x,0,10,6,x (.2x.31x)
8,0,x,0,6,10,x (2.x.13x)
7,8,8,0,x,10,x (123.x4x)
8,8,7,0,x,10,x (231.x4x)
3,x,x,0,3,5,1 (2xx.341)
8,x,x,0,6,5,5 (4xx.312)
8,8,7,0,x,x,5 (342.xx1)
8,5,x,0,x,5,8 (31x.x24)
7,8,8,0,x,x,5 (234.xx1)
8,x,7,0,6,x,5 (4x3.2x1)
7,5,8,0,x,x,8 (213.xx4)
8,5,7,0,x,x,8 (312.xx4)
8,x,x,0,10,10,8 (1xx.342)
8,8,x,0,x,5,5 (34x.x12)
7,x,8,0,6,x,5 (3x4.2x1)
0,x,x,0,10,6,8 (.xx.312)
7,x,0,0,11,x,8 (1x..3x2)
0,x,7,0,11,x,8 (.x1.3x2)
8,x,7,0,x,10,8 (2x1.x43)
7,x,8,0,x,10,8 (1x2.x43)
7,8,x,0,11,10,x (12x.43x)
7,x,x,0,11,10,8 (1xx.432)

ملخص سريع

  • كورد Fbm9 يحتوي على النوتات: F♭, A♭♭, C♭, E♭♭, G♭
  • بدوزان Drop B هناك 256 وضعيات متاحة
  • يُكتب أيضاً: Fb-9, Fb min9
  • كل مخطط يوضح مواضع الأصابع على عنق 7-String Guitar

الأسئلة الشائعة

ما هو كورد Fbm9 على 7-String Guitar؟

Fbm9 هو كورد Fb min9. يحتوي على النوتات F♭, A♭♭, C♭, E♭♭, G♭. على 7-String Guitar بدوزان Drop B هناك 256 طرق للعزف.

كيف تعزف Fbm9 على 7-String Guitar؟

لعزف Fbm9 على بدوزان Drop B، استخدم إحدى الوضعيات الـ 256 الموضحة أعلاه.

ما هي نوتات كورد Fbm9؟

كورد Fbm9 يحتوي على النوتات: F♭, A♭♭, C♭, E♭♭, G♭.

كم عدد طرق عزف Fbm9 على 7-String Guitar؟

بدوزان Drop B هناك 256 وضعية لكورد Fbm9. كل وضعية تستخدم موضعاً مختلفاً على عنق الآلة بنفس النوتات: F♭, A♭♭, C♭, E♭♭, G♭.

ما هي الأسماء الأخرى لـ Fbm9؟

Fbm9 يُعرف أيضاً بـ Fb-9, Fb min9. هذه تسميات مختلفة لنفس الكورد: F♭, A♭♭, C♭, E♭♭, G♭.