Acordul D11 la Mandolin — Diagramă și Taburi în Acordajul Modal D

Răspuns scurt: D11 este un acord D dom11 cu notele D, F♯, A, C, E, G. În acordajul Modal D există 288 poziții. Vedeți diagramele de mai jos.

Cunoscut și ca: D dom11

Acorduri de PianInstrumenteAcordaje

Search chord by name:

 

OR

Search chord by notes:

Piano Companion
Piano CompanionFree

Want all chords at your fingertips? Get our free app with 10,000+ chords and scales — trusted by millions of musicians. Look up any chord instantly, anywhere.

Get It Free
ChordIQ
ChordIQFree

Ready to actually learn these chords? Train your ear, master the staff, and build real skills with interactive games — for guitar, ukulele, bass and more.

Get It Free

Cum se cântă D11 la Mandolin

D11, Ddom11

Note: D, F♯, A, C, E, G

x,7,5,0,3,0,4,0 (x43.1.2.)
x,7,5,0,0,3,4,0 (x43..12.)
x,7,4,0,3,0,5,0 (x42.1.3.)
x,7,4,0,0,3,5,0 (x42..13.)
x,x,4,0,0,3,2,5 (xx3..214)
x,x,2,0,3,0,5,4 (xx1.2.43)
x,x,5,0,3,0,2,4 (xx4.2.13)
x,x,2,0,0,3,5,4 (xx1..243)
x,x,4,0,0,3,5,2 (xx3..241)
x,x,4,0,3,0,5,2 (xx3.2.41)
x,x,5,0,0,3,4,2 (xx4..231)
x,x,2,0,3,0,4,5 (xx1.2.34)
x,x,5,0,0,3,2,4 (xx4..213)
x,x,5,0,3,0,4,2 (xx4.2.31)
x,x,4,0,3,0,2,5 (xx3.2.14)
x,x,2,0,0,3,4,5 (xx1..234)
x,7,0,0,0,3,4,5 (x4...123)
x,7,4,0,3,0,0,5 (x42.1..3)
x,7,0,0,3,0,4,5 (x4..1.23)
x,7,0,0,0,3,5,4 (x4...132)
x,7,0,0,3,0,5,4 (x4..1.32)
x,7,5,0,3,0,0,4 (x43.1..2)
x,7,5,0,0,3,0,4 (x43..1.2)
x,7,4,0,0,3,0,5 (x42..1.3)
7,9,10,0,10,0,0,x (123.4..x)
10,9,10,0,7,0,0,x (324.1..x)
7,10,10,0,9,0,0,x (134.2..x)
9,7,10,0,10,0,0,x (213.4..x)
9,10,10,0,7,0,0,x (234.1..x)
10,7,10,0,9,0,0,x (314.2..x)
7,9,10,0,10,0,x,0 (123.4.x.)
9,7,10,0,10,0,x,0 (213.4.x.)
7,10,10,0,9,0,x,0 (134.2.x.)
10,7,10,0,9,0,x,0 (314.2.x.)
9,10,10,0,7,0,x,0 (234.1.x.)
10,9,10,0,7,0,x,0 (324.1.x.)
0,7,10,0,9,10,0,x (.13.24.x)
9,7,10,0,0,10,x,0 (213..4x.)
9,10,10,0,0,7,0,x (234..1.x)
0,10,10,0,9,7,0,x (.34.21.x)
0,9,10,0,10,7,0,x (.23.41.x)
10,7,10,0,0,9,0,x (314..2.x)
7,10,10,0,0,9,0,x (134..2.x)
0,10,10,0,7,9,0,x (.34.12.x)
0,7,10,0,10,9,0,x (.13.42.x)
9,7,10,0,0,10,0,x (213..4.x)
7,9,10,0,0,10,0,x (123..4.x)
0,9,10,0,7,10,0,x (.23.14.x)
10,9,10,0,0,7,0,x (324..1.x)
10,9,10,0,0,7,x,0 (324..1x.)
9,10,10,0,0,7,x,0 (234..1x.)
0,10,10,0,9,7,x,0 (.34.21x.)
0,9,10,0,10,7,x,0 (.23.41x.)
10,7,10,0,0,9,x,0 (314..2x.)
7,10,10,0,0,9,x,0 (134..2x.)
0,10,10,0,7,9,x,0 (.34.12x.)
0,7,10,0,10,9,x,0 (.13.42x.)
7,9,10,0,0,10,x,0 (123..4x.)
0,9,10,0,7,10,x,0 (.23.14x.)
0,7,10,0,9,10,x,0 (.13.24x.)
0,x,4,0,7,3,5,0 (.x2.413.)
3,x,4,0,0,7,5,0 (1x2..43.)
3,7,4,0,x,0,5,0 (142.x.3.)
0,x,4,0,3,7,5,0 (.x2.143.)
3,7,5,0,0,x,4,0 (143..x2.)
0,7,5,0,3,x,4,0 (.43.1x2.)
3,7,5,0,x,0,4,0 (143.x.2.)
7,x,5,0,3,0,4,0 (4x3.1.2.)
7,x,4,0,0,3,5,0 (4x2..13.)
3,x,5,0,7,0,4,0 (1x3.4.2.)
0,7,5,0,x,3,4,0 (.43.x12.)
7,x,5,0,0,3,4,0 (4x3..12.)
0,7,4,0,x,3,5,0 (.42.x13.)
0,x,5,0,7,3,4,0 (.x3.412.)
3,x,5,0,0,7,4,0 (1x3..42.)
0,x,5,0,3,7,4,0 (.x3.142.)
3,7,4,0,0,x,5,0 (142..x3.)
0,7,4,0,3,x,5,0 (.42.1x3.)
3,x,4,0,7,0,5,0 (1x2.4.3.)
7,x,4,0,3,0,5,0 (4x2.1.3.)
0,10,x,0,7,9,10,0 (.3x.124.)
0,10,0,0,9,7,10,x (.3..214x)
10,7,0,0,0,9,10,x (31...24x)
10,9,0,0,7,0,10,x (32..1.4x)
7,10,0,0,0,9,10,x (13...24x)
9,10,0,0,7,0,10,x (23..1.4x)
10,7,0,0,9,0,10,x (31..2.4x)
7,10,0,0,9,0,10,x (13..2.4x)
10,9,x,0,7,0,10,0 (32x.1.4.)
9,10,x,0,7,0,10,0 (23x.1.4.)
10,7,x,0,9,0,10,0 (31x.2.4.)
7,10,x,0,9,0,10,0 (13x.2.4.)
9,7,x,0,10,0,10,0 (21x.3.4.)
7,9,x,0,10,0,10,0 (12x.3.4.)
10,9,x,0,0,7,10,0 (32x..14.)
9,10,x,0,0,7,10,0 (23x..14.)
0,10,x,0,9,7,10,0 (.3x.214.)
0,9,x,0,10,7,10,0 (.2x.314.)
10,7,x,0,0,9,10,0 (31x..24.)
7,10,x,0,0,9,10,0 (13x..24.)
0,9,0,0,10,7,10,x (.2..314x)
0,7,x,0,10,9,10,0 (.1x.324.)
9,7,x,0,0,10,10,0 (21x..34.)
7,9,x,0,0,10,10,0 (12x..34.)
0,9,x,0,7,10,10,0 (.2x.134.)
0,7,x,0,9,10,10,0 (.1x.234.)
0,10,0,0,7,9,10,x (.3..124x)
9,7,0,0,10,0,10,x (21..3.4x)
7,9,0,0,10,0,10,x (12..3.4x)
10,9,0,0,0,7,10,x (32...14x)
9,10,0,0,0,7,10,x (23...14x)
0,7,0,0,9,10,10,x (.1..234x)
0,9,0,0,7,10,10,x (.2..134x)
7,9,0,0,0,10,10,x (12...34x)
9,7,0,0,0,10,10,x (21...34x)
0,7,0,0,10,9,10,x (.1..324x)
x,7,5,0,3,0,4,x (x43.1.2x)
x,7,5,0,0,3,4,x (x43..12x)
x,7,4,0,0,3,5,x (x42..13x)
x,7,4,0,3,0,5,x (x42.1.3x)
7,x,4,0,0,3,0,5 (4x2..1.3)
0,7,4,0,x,3,0,5 (.42.x1.3)
3,x,4,0,7,0,0,5 (1x2.4..3)
0,7,0,0,x,3,4,5 (.4..x123)
0,x,4,0,3,7,0,5 (.x2.14.3)
0,x,0,0,7,3,4,5 (.x..4123)
7,x,4,0,3,0,0,5 (4x2.1..3)
3,7,4,0,x,0,0,5 (142.x..3)
0,7,4,0,3,x,0,5 (.42.1x.3)
3,x,4,0,0,7,0,5 (1x2..4.3)
3,7,4,0,0,x,0,5 (142..x.3)
0,x,4,0,7,3,0,5 (.x2.41.3)
0,x,0,0,3,7,5,4 (.x..1432)
3,x,0,0,0,7,5,4 (1x...432)
0,x,0,0,7,3,5,4 (.x..4132)
3,x,0,0,7,0,4,5 (1x..4.23)
3,7,5,0,0,x,0,4 (143..x.2)
7,x,0,0,0,3,5,4 (4x...132)
0,7,0,0,x,3,5,4 (.4..x132)
3,x,0,0,7,0,5,4 (1x..4.32)
0,x,0,0,3,7,4,5 (.x..1423)
7,x,0,0,3,0,4,5 (4x..1.23)
7,x,0,0,3,0,5,4 (4x..1.32)
3,7,0,0,x,0,5,4 (14..x.32)
3,7,0,0,x,0,4,5 (14..x.23)
0,7,5,0,3,x,0,4 (.43.1x.2)
3,7,5,0,x,0,0,4 (143.x..2)
7,x,5,0,3,0,0,4 (4x3.1..2)
0,7,0,0,3,x,4,5 (.4..1x23)
3,x,5,0,7,0,0,4 (1x3.4..2)
0,7,5,0,x,3,0,4 (.43.x1.2)
7,x,5,0,0,3,0,4 (4x3..1.2)
3,7,0,0,0,x,4,5 (14...x23)
0,x,5,0,7,3,0,4 (.x3.41.2)
3,x,5,0,0,7,0,4 (1x3..4.2)
0,x,5,0,3,7,0,4 (.x3.14.2)
0,7,0,0,3,x,5,4 (.4..1x32)
3,7,0,0,0,x,5,4 (14...x32)
3,x,0,0,0,7,4,5 (1x...423)
7,x,0,0,0,3,4,5 (4x...123)
0,7,0,0,9,10,x,10 (.1..23x4)
0,7,x,0,9,10,0,10 (.1x.23.4)
7,9,x,0,0,10,0,10 (12x..3.4)
9,7,x,0,0,10,0,10 (21x..3.4)
0,7,x,0,10,9,0,10 (.1x.32.4)
0,10,x,0,7,9,0,10 (.3x.12.4)
10,9,0,0,7,0,x,10 (32..1.x4)
7,10,x,0,0,9,0,10 (13x..2.4)
10,7,x,0,0,9,0,10 (31x..2.4)
9,10,0,0,7,0,x,10 (23..1.x4)
0,9,x,0,10,7,0,10 (.2x.31.4)
0,10,x,0,9,7,0,10 (.3x.21.4)
9,10,x,0,0,7,0,10 (23x..1.4)
10,9,x,0,0,7,0,10 (32x..1.4)
7,9,x,0,10,0,0,10 (12x.3..4)
10,7,0,0,9,0,x,10 (31..2.x4)
9,7,x,0,10,0,0,10 (21x.3..4)
7,10,0,0,9,0,x,10 (13..2.x4)
7,10,x,0,9,0,0,10 (13x.2..4)
10,7,x,0,9,0,0,10 (31x.2..4)
9,10,x,0,7,0,0,10 (23x.1..4)
10,9,x,0,7,0,0,10 (32x.1..4)
0,9,x,0,7,10,0,10 (.2x.13.4)
0,9,0,0,7,10,x,10 (.2..13x4)
7,9,0,0,0,10,x,10 (12...3x4)
9,7,0,0,0,10,x,10 (21...3x4)
0,7,0,0,10,9,x,10 (.1..32x4)
0,10,0,0,7,9,x,10 (.3..12x4)
7,10,0,0,0,9,x,10 (13...2x4)
9,7,0,0,10,0,x,10 (21..3.x4)
10,7,0,0,0,9,x,10 (31...2x4)
0,9,0,0,10,7,x,10 (.2..31x4)
0,10,0,0,9,7,x,10 (.3..21x4)
7,9,0,0,10,0,x,10 (12..3.x4)
9,10,0,0,0,7,x,10 (23...1x4)
10,9,0,0,0,7,x,10 (32...1x4)
x,7,4,0,0,3,x,5 (x42..1x3)
x,7,4,0,3,0,x,5 (x42.1.x3)
x,7,5,0,3,0,x,4 (x43.1.x2)
x,7,x,0,0,3,5,4 (x4x..132)
x,7,5,0,0,3,x,4 (x43..1x2)
x,7,x,0,3,0,5,4 (x4x.1.32)
x,7,x,0,0,3,4,5 (x4x..123)
x,7,x,0,3,0,4,5 (x4x.1.23)
0,x,4,0,x,3,5,2 (.x3.x241)
3,x,4,0,x,0,5,2 (2x3.x.41)
0,x,4,0,3,x,5,2 (.x3.2x41)
3,x,4,0,0,x,5,2 (2x3..x41)
0,x,5,0,x,3,4,2 (.x4.x231)
3,x,5,0,x,0,4,2 (2x4.x.31)
0,x,5,0,3,x,4,2 (.x4.2x31)
3,x,5,0,0,x,4,2 (2x4..x31)
3,x,2,0,x,0,5,4 (2x1.x.43)
0,x,5,0,x,3,2,4 (.x4.x213)
3,x,5,0,0,x,2,4 (2x4..x13)
0,x,2,0,3,x,5,4 (.x1.2x43)
3,x,4,0,0,x,2,5 (2x3..x14)
0,x,4,0,3,x,2,5 (.x3.2x14)
3,x,4,0,x,0,2,5 (2x3.x.14)
0,x,2,0,x,3,5,4 (.x1.x243)
0,x,4,0,x,3,2,5 (.x3.x214)
0,x,5,0,3,x,2,4 (.x4.2x13)
0,x,2,0,x,3,4,5 (.x1.x234)
3,x,2,0,0,x,5,4 (2x1..x43)
3,x,5,0,x,0,2,4 (2x4.x.13)
3,x,2,0,x,0,4,5 (2x1.x.34)
0,x,2,0,3,x,4,5 (.x1.2x34)
3,x,2,0,0,x,4,5 (2x1..x34)
3,7,4,0,x,0,5,x (142.x.3x)
0,7,4,0,3,x,5,x (.42.1x3x)
0,x,4,0,3,7,5,x (.x2.143x)
3,x,4,0,0,7,5,x (1x2..43x)
7,x,4,0,3,0,5,x (4x2.1.3x)
3,7,4,0,0,x,5,x (142..x3x)
0,x,5,0,3,7,4,x (.x3.142x)
3,x,5,0,0,7,4,x (1x3..42x)
0,x,4,0,7,3,5,x (.x2.413x)
0,x,5,0,7,3,4,x (.x3.412x)
7,x,4,0,0,3,5,x (4x2..13x)
7,x,5,0,0,3,4,x (4x3..12x)
0,7,4,0,x,3,5,x (.42.x13x)
3,7,5,0,0,x,4,x (143..x2x)
3,x,4,0,7,0,5,x (1x2.4.3x)
0,7,5,0,x,3,4,x (.43.x12x)
3,x,5,0,7,0,4,x (1x3.4.2x)
7,x,5,0,3,0,4,x (4x3.1.2x)
0,7,5,0,3,x,4,x (.43.1x2x)
3,7,5,0,x,0,4,x (143.x.2x)
0,x,x,0,3,7,5,4 (.xx.1432)
3,x,x,0,0,7,4,5 (1xx..423)
0,x,x,0,3,7,4,5 (.xx.1423)
7,x,x,0,0,3,4,5 (4xx..123)
3,7,x,0,0,x,4,5 (14x..x23)
0,7,x,0,x,3,4,5 (.4x.x123)
3,x,x,0,7,0,4,5 (1xx.4.23)
7,x,x,0,3,0,4,5 (4xx.1.23)
0,7,x,0,3,x,4,5 (.4x.1x23)
3,7,x,0,x,0,4,5 (14x.x.23)
3,x,4,0,0,7,x,5 (1x2..4x3)
0,x,4,0,7,3,x,5 (.x2.41x3)
7,x,4,0,0,3,x,5 (4x2..1x3)
0,7,4,0,x,3,x,5 (.42.x1x3)
3,x,4,0,7,0,x,5 (1x2.4.x3)
7,x,4,0,3,0,x,5 (4x2.1.x3)
3,7,4,0,x,0,x,5 (142.x.x3)
0,7,4,0,3,x,x,5 (.42.1xx3)
3,7,4,0,0,x,x,5 (142..xx3)
3,7,5,0,0,x,x,4 (143..xx2)
0,x,x,0,7,3,4,5 (.xx.4123)
0,7,5,0,3,x,x,4 (.43.1xx2)
3,x,x,0,0,7,5,4 (1xx..432)
3,7,5,0,x,0,x,4 (143.x.x2)
0,x,x,0,7,3,5,4 (.xx.4132)
7,x,5,0,3,0,x,4 (4x3.1.x2)
3,x,5,0,7,0,x,4 (1x3.4.x2)
7,x,x,0,0,3,5,4 (4xx..132)
0,7,5,0,x,3,x,4 (.43.x1x2)
0,7,x,0,x,3,5,4 (.4x.x132)
7,x,5,0,0,3,x,4 (4x3..1x2)
3,x,x,0,7,0,5,4 (1xx.4.32)
0,x,5,0,7,3,x,4 (.x3.41x2)
3,x,5,0,0,7,x,4 (1x3..4x2)
7,x,x,0,3,0,5,4 (4xx.1.32)
0,x,5,0,3,7,x,4 (.x3.14x2)
3,7,x,0,x,0,5,4 (14x.x.32)
0,7,x,0,3,x,5,4 (.4x.1x32)
3,7,x,0,0,x,5,4 (14x..x32)
0,x,4,0,3,7,x,5 (.x2.14x3)

Rezumat Rapid

  • Acordul D11 conține notele: D, F♯, A, C, E, G
  • În acordajul Modal D sunt disponibile 288 poziții
  • Se scrie și: D dom11
  • Fiecare diagramă arată pozițiile degetelor pe griful Mandolin

Întrebări Frecvente

Ce este acordul D11 la Mandolin?

D11 este un acord D dom11. Conține notele D, F♯, A, C, E, G. La Mandolin în acordajul Modal D există 288 moduri de a cânta.

Cum se cântă D11 la Mandolin?

Pentru a cânta D11 la în acordajul Modal D, utilizați una din cele 288 poziții afișate mai sus.

Ce note conține acordul D11?

Acordul D11 conține notele: D, F♯, A, C, E, G.

În câte moduri se poate cânta D11 la Mandolin?

În acordajul Modal D există 288 poziții pentru D11. Fiecare poziție utilizează un loc diferit pe grif: D, F♯, A, C, E, G.

Ce alte denumiri are D11?

D11 este cunoscut și ca D dom11. Acestea sunt notații diferite pentru același acord: D, F♯, A, C, E, G.