DØ Mandolin Akord — Diagram a Taby v Ladění Modal D

Krátká odpověď: DØ je D min7dim5 akord s notami D, F, A♭, C. V ladění Modal D existuje 216 pozic. Viz diagramy níže.

Známý také jako: DØ7, Dø, Dø7, Dm7b5, Dm7°5, D−7b5, D−7°5, D min7dim5, D min7b5

Klavírní AkordyNástrojeLadění

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Jak hrát DØ na Mandolin

DØ, DØ7, Dø, Dø7, Dm7b5, Dm7°5, D−7b5, D−7°5, Dmin7dim5, Dmin7b5

Noty: D, F, A♭, C

x,x,x,0,11,8,10,0 (xxx.312.)
x,x,x,0,8,11,10,0 (xxx.132.)
x,x,x,0,3,5,6,3 (xxx.1342)
x,x,x,0,5,3,6,3 (xxx.3142)
x,x,x,0,5,3,3,6 (xxx.3124)
x,x,x,0,3,5,3,6 (xxx.1324)
x,x,x,x,11,8,10,0 (xxxx312.)
x,x,x,x,8,11,10,0 (xxxx132.)
x,x,x,0,11,8,0,10 (xxx.31.2)
x,x,x,0,8,11,0,10 (xxx.13.2)
x,x,x,x,8,11,0,10 (xxxx13.2)
x,x,x,x,11,8,0,10 (xxxx31.2)
x,5,6,3,5,3,3,x (x241311x)
x,5,3,3,3,5,6,x (x211134x)
x,5,3,3,5,3,6,x (x211314x)
x,5,6,3,3,5,3,x (x241131x)
x,5,x,3,3,5,3,6 (x2x11314)
x,5,3,3,5,3,x,6 (x21131x4)
x,5,x,3,3,5,6,3 (x2x11341)
x,5,6,3,3,5,x,3 (x24113x1)
x,5,3,3,3,5,x,6 (x21113x4)
x,5,x,3,5,3,6,3 (x2x13141)
x,5,x,3,5,3,3,6 (x2x13114)
x,5,6,3,5,3,x,3 (x24131x1)
x,x,10,0,8,11,x,0 (xx2.13x.)
x,x,10,0,11,8,0,x (xx2.31.x)
x,x,10,0,11,8,x,0 (xx2.31x.)
x,x,10,0,8,11,0,x (xx2.13.x)
x,8,10,0,8,11,x,0 (x13.24x.)
x,x,3,0,3,5,6,x (xx1.234x)
x,x,6,0,5,3,3,x (xx4.312x)
x,x,3,0,5,3,6,x (xx1.324x)
x,x,6,0,3,5,3,x (xx4.132x)
x,8,10,0,8,11,0,x (x13.24.x)
x,8,10,0,11,8,0,x (x13.42.x)
x,8,10,0,11,8,x,0 (x13.42x.)
x,x,0,0,8,11,10,x (xx..132x)
x,x,0,0,11,8,10,x (xx..312x)
x,x,3,0,3,5,x,6 (xx1.23x4)
x,8,0,0,8,11,10,x (x1..243x)
x,x,6,0,3,5,x,3 (xx4.13x2)
x,8,x,0,11,8,10,0 (x1x.423.)
x,x,3,0,5,3,x,6 (xx1.32x4)
x,x,6,0,5,3,x,3 (xx4.31x2)
x,8,0,0,11,8,10,x (x1..423x)
x,8,x,0,8,11,10,0 (x1x.243.)
x,x,0,0,8,11,x,10 (xx..13x2)
x,x,0,0,11,8,x,10 (xx..31x2)
x,8,x,0,8,11,0,10 (x1x.24.3)
x,8,x,0,11,8,0,10 (x1x.42.3)
x,8,0,0,11,8,x,10 (x1..42x3)
x,8,0,0,8,11,x,10 (x1..24x3)
3,5,3,3,x,5,6,x (1211x34x)
5,5,3,3,x,3,6,x (2311x14x)
5,5,3,3,3,x,6,x (23111x4x)
3,5,6,3,x,5,3,x (1241x31x)
5,5,6,3,x,3,3,x (2341x11x)
3,5,6,3,5,x,3,x (12413x1x)
5,5,6,3,3,x,3,x (23411x1x)
3,5,3,3,5,x,6,x (12113x4x)
x,5,3,x,3,5,6,x (x21x134x)
x,5,3,x,5,3,6,x (x21x314x)
8,8,10,0,11,x,0,x (123.4x.x)
x,5,6,x,5,3,3,x (x24x311x)
8,8,10,0,11,x,x,0 (123.4xx.)
11,8,10,0,8,x,x,0 (413.2xx.)
x,5,6,x,3,5,3,x (x24x131x)
11,8,10,0,8,x,0,x (413.2x.x)
3,5,x,3,5,x,3,6 (12x13x14)
3,5,6,3,5,x,x,3 (12413xx1)
5,5,3,3,x,3,x,6 (2311x1x4)
3,5,3,3,5,x,x,6 (12113xx4)
5,5,3,3,3,x,x,6 (23111xx4)
5,5,x,3,3,x,3,6 (23x11x14)
3,5,x,3,x,5,6,3 (12x1x341)
5,5,x,3,x,3,6,3 (23x1x141)
3,5,3,3,x,5,x,6 (1211x3x4)
3,5,x,3,5,x,6,3 (12x13x41)
5,5,x,3,3,x,6,3 (23x11x41)
5,5,x,3,x,3,3,6 (23x1x114)
3,5,6,3,x,5,x,3 (1241x3x1)
5,5,6,3,x,3,x,3 (2341x1x1)
3,5,x,3,x,5,3,6 (12x1x314)
5,5,6,3,3,x,x,3 (23411xx1)
11,8,10,0,x,8,0,x (413.x2.x)
8,8,10,0,x,11,x,0 (123.x4x.)
x,5,3,x,5,3,x,6 (x21x31x4)
x,5,x,x,3,5,6,3 (x2xx1341)
x,5,6,x,3,5,x,3 (x24x13x1)
x,5,3,x,3,5,x,6 (x21x13x4)
x,5,x,x,5,3,3,6 (x2xx3114)
x,5,6,x,5,3,x,3 (x24x31x1)
8,8,10,0,x,11,0,x (123.x4.x)
x,5,x,x,3,5,3,6 (x2xx1314)
x,5,x,x,5,3,6,3 (x2xx3141)
11,8,10,0,x,8,x,0 (413.x2x.)
x,x,10,x,11,8,0,x (xx2x31.x)
x,x,10,x,8,11,x,0 (xx2x13x.)
x,x,10,x,11,8,x,0 (xx2x31x.)
x,x,10,x,8,11,0,x (xx2x13.x)
8,8,0,0,x,11,10,x (12..x43x)
11,8,0,0,8,x,10,x (41..2x3x)
8,8,0,0,11,x,10,x (12..4x3x)
8,8,x,0,x,11,10,0 (12x.x43.)
11,8,x,0,x,8,10,0 (41x.x23.)
11,8,0,0,x,8,10,x (41..x23x)
8,8,x,0,11,x,10,0 (12x.4x3.)
11,8,x,0,8,x,10,0 (41x.2x3.)
x,x,0,x,11,8,10,x (xx.x312x)
x,x,0,x,8,11,10,x (xx.x132x)
11,8,x,0,8,x,0,10 (41x.2x.3)
8,8,0,0,x,11,x,10 (12..x4x3)
8,8,x,0,x,11,0,10 (12x.x4.3)
8,8,0,0,11,x,x,10 (12..4xx3)
8,8,x,0,11,x,0,10 (12x.4x.3)
11,8,0,0,8,x,x,10 (41..2xx3)
11,8,0,0,x,8,x,10 (41..x2x3)
11,8,x,0,x,8,0,10 (41x.x2.3)
x,x,0,x,11,8,x,10 (xx.x31x2)
x,x,0,x,8,11,x,10 (xx.x13x2)
8,x,10,0,11,x,x,0 (1x2.3xx.)
8,x,10,0,11,x,0,x (1x2.3x.x)
11,x,10,0,8,x,0,x (3x2.1x.x)
11,x,10,0,8,x,x,0 (3x2.1xx.)
3,5,6,x,x,5,3,x (124xx31x)
5,5,3,x,3,x,6,x (231x1x4x)
5,5,3,x,x,3,6,x (231xx14x)
5,5,6,x,3,x,3,x (234x1x1x)
3,5,6,x,5,x,3,x (124x3x1x)
5,5,6,x,x,3,3,x (234xx11x)
3,5,3,x,x,5,6,x (121xx34x)
3,5,3,x,5,x,6,x (121x3x4x)
8,x,10,0,x,11,x,0 (1x2.x3x.)
11,x,10,0,x,8,0,x (3x2.x1.x)
8,x,10,0,x,11,0,x (1x2.x3.x)
11,x,10,0,x,8,x,0 (3x2.x1x.)
3,x,6,0,x,5,3,x (1x4.x32x)
3,5,6,x,x,5,x,3 (124xx3x1)
3,5,x,x,x,5,6,3 (12xxx341)
3,5,x,x,5,x,3,6 (12xx3x14)
5,x,3,0,3,x,6,x (3x1.2x4x)
3,5,x,x,x,5,3,6 (12xxx314)
5,5,6,x,3,x,x,3 (234x1xx1)
3,5,6,x,5,x,x,3 (124x3xx1)
5,5,3,x,3,x,x,6 (231x1xx4)
5,x,6,0,3,x,3,x (3x4.1x2x)
5,5,x,x,3,x,6,3 (23xx1x41)
3,5,3,x,5,x,x,6 (121x3xx4)
5,5,x,x,3,x,3,6 (23xx1x14)
3,x,3,0,5,x,6,x (1x2.3x4x)
5,5,3,x,x,3,x,6 (231xx1x4)
5,5,6,x,x,3,x,3 (234xx1x1)
3,5,x,x,5,x,6,3 (12xx3x41)
5,5,x,x,x,3,3,6 (23xxx114)
3,x,3,0,x,5,6,x (1x2.x34x)
5,5,x,x,x,3,6,3 (23xxx141)
3,5,3,x,x,5,x,6 (121xx3x4)
5,x,6,0,x,3,3,x (3x4.x12x)
3,x,6,0,5,x,3,x (1x4.3x2x)
5,x,3,0,x,3,6,x (3x1.x24x)
11,x,x,0,8,x,10,0 (3xx.1x2.)
8,x,x,0,x,11,10,0 (1xx.x32.)
11,x,0,0,8,x,10,x (3x..1x2x)
11,x,x,0,x,8,10,0 (3xx.x12.)
8,x,0,0,11,x,10,x (1x..3x2x)
11,x,0,0,x,8,10,x (3x..x12x)
8,x,0,0,x,11,10,x (1x..x32x)
8,x,x,0,11,x,10,0 (1xx.3x2.)
3,x,x,0,5,x,6,3 (1xx.3x42)
5,x,x,0,x,3,3,6 (3xx.x124)
5,x,x,0,3,x,6,3 (3xx.1x42)
3,x,6,0,x,5,x,3 (1x4.x3x2)
5,x,6,0,x,3,x,3 (3x4.x1x2)
3,x,6,0,5,x,x,3 (1x4.3xx2)
5,x,6,0,3,x,x,3 (3x4.1xx2)
3,x,x,0,x,5,3,6 (1xx.x324)
3,x,3,0,x,5,x,6 (1x2.x3x4)
3,x,3,0,5,x,x,6 (1x2.3xx4)
5,x,x,0,3,x,3,6 (3xx.1x24)
5,x,3,0,3,x,x,6 (3x1.2xx4)
3,x,x,0,x,5,6,3 (1xx.x342)
3,x,x,0,5,x,3,6 (1xx.3x24)
5,x,x,0,x,3,6,3 (3xx.x142)
5,x,3,0,x,3,x,6 (3x1.x2x4)
8,x,0,0,11,x,x,10 (1x..3xx2)
11,x,0,0,x,8,x,10 (3x..x1x2)
8,x,x,0,x,11,0,10 (1xx.x3.2)
11,x,x,0,x,8,0,10 (3xx.x1.2)
8,x,x,0,11,x,0,10 (1xx.3x.2)
11,x,x,0,8,x,0,10 (3xx.1x.2)
11,x,0,0,8,x,x,10 (3x..1xx2)
8,x,0,0,x,11,x,10 (1x..x3x2)
8,x,10,x,11,x,0,x (1x2x3x.x)
11,x,10,x,8,x,0,x (3x2x1x.x)
8,x,10,x,11,x,x,0 (1x2x3xx.)
11,x,10,x,8,x,x,0 (3x2x1xx.)
11,x,10,x,x,8,0,x (3x2xx1.x)
8,x,10,x,x,11,x,0 (1x2xx3x.)
11,x,10,x,x,8,x,0 (3x2xx1x.)
8,x,10,x,x,11,0,x (1x2xx3.x)
11,x,0,x,x,8,10,x (3x.xx12x)
11,x,x,x,8,x,10,0 (3xxx1x2.)
8,x,x,x,11,x,10,0 (1xxx3x2.)
8,x,0,x,11,x,10,x (1x.x3x2x)
8,x,x,x,x,11,10,0 (1xxxx32.)
11,x,0,x,8,x,10,x (3x.x1x2x)
11,x,x,x,x,8,10,0 (3xxxx12.)
8,x,0,x,x,11,10,x (1x.xx32x)
11,x,x,x,x,8,0,10 (3xxxx1.2)
8,x,x,x,11,x,0,10 (1xxx3x.2)
8,x,x,x,x,11,0,10 (1xxxx3.2)
8,x,0,x,11,x,x,10 (1x.x3xx2)
8,x,0,x,x,11,x,10 (1x.xx3x2)
11,x,x,x,8,x,0,10 (3xxx1x.2)
11,x,0,x,x,8,x,10 (3x.xx1x2)
11,x,0,x,8,x,x,10 (3x.x1xx2)

Rychlý Přehled

  • Akord DØ obsahuje noty: D, F, A♭, C
  • V ladění Modal D je k dispozici 216 pozic
  • Zapisuje se také jako: DØ7, Dø, Dø7, Dm7b5, Dm7°5, D−7b5, D−7°5, D min7dim5, D min7b5
  • Každý diagram ukazuje pozice prstů na hmatníku Mandolin

Často Kladené Otázky

Co je akord DØ na Mandolin?

DØ je D min7dim5 akord. Obsahuje noty D, F, A♭, C. Na Mandolin v ladění Modal D existuje 216 způsobů hry.

Jak hrát DØ na Mandolin?

Pro zahrání DØ na v ladění Modal D použijte jednu z 216 pozic zobrazených výše.

Jaké noty obsahuje akord DØ?

Akord DØ obsahuje noty: D, F, A♭, C.

Kolika způsoby lze hrát DØ na Mandolin?

V ladění Modal D existuje 216 pozic pro DØ. Každá využívá jiné místo na hmatníku: D, F, A♭, C.

Jaké jsou další názvy pro DØ?

DØ je také známý jako DØ7, Dø, Dø7, Dm7b5, Dm7°5, D−7b5, D−7°5, D min7dim5, D min7b5. Jedná se o různé zápisy stejného akordu: D, F, A♭, C.