Acordul EbM7b5 la Guitar — Diagramă și Taburi în Acordajul Open E flat

Răspuns scurt: EbM7b5 este un acord Eb maj7b5 cu notele E♭, G, B♭♭, D. În acordajul Open E flat există 410 poziții. Vedeți diagramele de mai jos.

Cunoscut și ca: EbMa7b5, Ebj7b5, EbΔ7b5, EbΔb5, Eb maj7b5

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Cum se cântă EbM7b5 la Guitar

EbM7b5, EbMa7b5, Ebj7b5, EbΔ7b5, EbΔb5, Ebmaj7b5

Note: E♭, G, B♭♭, D

4,4,0,2,4,0 (23.14.)
0,4,4,2,4,0 (.2314.)
0,4,6,0,4,0 (.13.2.)
6,4,0,0,4,0 (31..2.)
0,5,6,0,4,0 (.23.1.)
6,5,0,0,4,0 (32..1.)
6,4,0,0,5,0 (31..2.)
0,4,6,0,5,0 (.13.2.)
0,5,4,2,4,0 (.4213.)
0,4,0,2,4,4 (.2.134)
4,5,0,2,4,0 (24.13.)
4,4,0,2,5,0 (23.14.)
0,4,4,2,5,0 (.2314.)
0,4,0,0,4,6 (.1..23)
0,4,0,0,5,6 (.1..23)
4,4,6,0,4,0 (124.3.)
6,5,4,0,4,0 (431.2.)
4,5,6,0,4,0 (134.2.)
6,4,4,0,5,0 (412.3.)
6,4,4,0,4,0 (412.3.)
4,4,6,0,5,0 (124.3.)
0,5,0,0,4,6 (.2..13)
6,4,6,0,5,0 (314.2.)
6,5,6,0,4,0 (324.1.)
6,4,6,0,4,0 (314.2.)
0,5,0,2,4,4 (.4.123)
0,4,0,2,5,4 (.2.143)
6,5,0,0,4,4 (43..12)
0,4,6,0,4,4 (.14.23)
0,5,6,0,4,4 (.34.12)
4,5,0,0,4,6 (13..24)
0,5,4,0,4,6 (.31.24)
6,4,0,0,4,6 (31..24)
6,4,0,0,5,4 (41..32)
0,4,6,0,5,4 (.14.32)
6,5,0,0,4,6 (32..14)
0,4,4,0,4,6 (.12.34)
0,4,6,0,5,6 (.13.24)
0,4,4,0,5,6 (.12.34)
6,4,0,0,5,6 (31..24)
4,4,0,0,5,6 (12..34)
x,4,4,2,4,0 (x2314.)
6,4,0,0,4,4 (41..23)
4,4,0,0,4,6 (12..34)
0,4,6,0,4,6 (.13.24)
0,5,6,0,4,6 (.23.14)
x,4,6,0,4,0 (x13.2.)
x,5,6,0,4,0 (x23.1.)
x,4,6,0,5,0 (x13.2.)
0,11,11,0,11,0 (.12.3.)
11,11,0,0,11,0 (12..3.)
x,4,0,2,4,4 (x2.134)
x,5,4,2,4,0 (x4213.)
x,4,4,2,5,0 (x2314.)
x,4,0,0,5,6 (x1..23)
6,9,0,7,9,0 (13.24.)
x,5,0,0,4,6 (x2..13)
0,9,11,0,11,0 (.12.3.)
0,11,11,0,9,0 (.23.1.)
11,11,0,0,9,0 (23..1.)
0,9,6,7,9,0 (.3124.)
x,4,0,0,4,6 (x1..23)
11,9,0,0,11,0 (21..3.)
x,x,4,2,4,0 (xx213.)
6,5,0,7,9,0 (21.34.)
0,5,6,7,9,0 (.1234.)
0,9,6,7,5,0 (.4231.)
0,11,0,0,11,11 (.1..23)
x,x,6,0,4,0 (xx2.1.)
11,11,11,0,11,0 (123.4.)
6,9,0,7,5,0 (24.31.)
0,9,0,7,11,0 (.2.13.)
x,5,0,2,4,4 (x4.123)
0,11,0,7,9,0 (.3.12.)
x,4,0,2,5,4 (x2.143)
11,9,11,0,11,0 (213.4.)
11,11,11,0,9,0 (234.1.)
0,11,0,0,9,11 (.2..13)
x,x,0,2,4,4 (xx.123)
0,9,0,0,11,11 (.1..23)
0,9,0,7,9,6 (.3.241)
x,x,0,0,4,6 (xx..12)
11,11,0,0,11,11 (12..34)
0,11,11,8,9,0 (.3412.)
0,9,11,8,11,0 (.2314.)
0,9,0,7,5,6 (.4.312)
0,11,11,0,11,11 (.12.34)
11,9,0,8,11,0 (32.14.)
0,5,0,7,9,6 (.1.342)
11,11,0,8,9,0 (34.12.)
0,9,11,7,11,0 (.2314.)
0,11,11,7,9,0 (.3412.)
11,9,0,7,11,0 (32.14.)
11,11,0,7,9,0 (34.12.)
x,11,11,0,11,0 (x12.3.)
11,9,0,0,11,11 (21..34)
0,11,11,0,9,11 (.23.14)
0,9,11,0,11,11 (.12.34)
11,11,0,0,9,11 (23..14)
x,9,6,7,9,0 (x3124.)
x,9,11,0,11,0 (x12.3.)
0,9,0,8,11,11 (.2.134)
0,11,0,8,9,11 (.3.124)
x,11,11,0,9,0 (x23.1.)
0,9,0,7,11,11 (.2.134)
0,11,0,7,9,11 (.3.124)
x,11,0,0,11,11 (x1..23)
x,5,6,7,9,0 (x1234.)
x,9,6,7,5,0 (x4231.)
x,11,0,7,9,0 (x3.12.)
x,9,0,7,11,0 (x2.13.)
x,x,11,0,11,0 (xx1.2.)
x,9,0,7,9,6 (x3.241)
x,11,0,0,9,11 (x2..13)
x,9,0,0,11,11 (x1..23)
x,9,11,8,11,0 (x2314.)
x,5,0,7,9,6 (x1.342)
x,9,0,7,5,6 (x4.312)
x,x,6,7,9,0 (xx123.)
x,11,11,8,9,0 (x3412.)
x,x,0,0,11,11 (xx..12)
x,11,11,7,9,0 (x3412.)
x,9,11,7,11,0 (x2314.)
x,x,0,7,9,6 (xx.231)
x,9,0,8,11,11 (x2.134)
x,11,0,8,9,11 (x3.124)
x,9,0,7,11,11 (x2.134)
x,11,0,7,9,11 (x3.124)
6,4,0,0,x,0 (21..x.)
0,4,6,0,x,0 (.12.x.)
4,4,0,2,x,0 (23.1x.)
0,4,4,2,x,0 (.231x.)
6,4,6,0,x,0 (213.x.)
6,4,4,0,x,0 (312.x.)
4,4,6,0,x,0 (123.x.)
4,4,4,2,x,0 (2341x.)
4,x,0,2,4,0 (2x.13.)
0,x,4,2,4,0 (.x213.)
11,11,0,0,x,0 (12..x.)
0,x,6,0,4,0 (.x2.1.)
6,x,0,0,4,0 (2x..1.)
x,4,6,0,x,0 (x12.x.)
0,x,0,2,4,4 (.x.123)
0,4,0,2,x,4 (.2.1x3)
4,4,0,2,4,x (23.14x)
0,11,11,0,x,0 (.12.x.)
0,4,4,2,4,x (.2314x)
4,4,x,2,4,0 (23x14.)
4,x,4,2,4,0 (2x314.)
0,5,6,0,4,x (.23.1x)
6,x,4,0,4,0 (3x1.2.)
6,x,6,0,4,0 (2x3.1.)
6,5,x,0,4,0 (32x.1.)
6,4,0,0,4,x (31..2x)
6,4,0,0,5,x (31..2x)
0,4,0,0,x,6 (.1..x2)
0,x,0,0,4,6 (.x..12)
6,4,x,0,4,0 (31x.2.)
4,x,6,0,4,0 (1x3.2.)
0,4,6,0,5,x (.13.2x)
x,4,4,2,x,0 (x231x.)
6,4,x,0,5,0 (31x.2.)
6,5,0,0,4,x (32..1x)
0,4,6,0,4,x (.13.2x)
4,4,0,2,5,x (23.14x)
0,4,4,2,5,x (.2314x)
6,4,4,2,x,0 (4231x.)
4,4,6,2,x,0 (2341x.)
4,4,x,2,5,0 (23x14.)
4,5,x,2,4,0 (24x13.)
0,x,4,2,4,4 (.x2134)
11,11,11,0,x,0 (123.x.)
0,5,4,2,4,x (.4213x)
4,5,0,2,4,x (24.13x)
0,4,x,2,4,4 (.2x134)
4,x,0,2,4,4 (2x.134)
4,4,0,2,x,4 (23.1x4)
0,4,4,2,x,4 (.231x4)
0,4,6,0,x,6 (.12.x3)
4,5,6,x,4,0 (134x2.)
0,x,4,0,4,6 (.x1.23)
4,4,6,x,4,0 (124x3.)
6,4,4,7,x,0 (3124x.)
6,5,4,7,x,0 (3214x.)
4,4,6,7,x,0 (1234x.)
4,5,6,7,x,0 (1234x.)
4,4,0,0,x,6 (12..x3)
6,4,0,0,x,6 (21..x3)
0,4,x,0,4,6 (.1x.23)
0,x,6,0,4,6 (.x2.13)
4,4,6,x,5,0 (124x3.)
6,4,4,x,5,0 (412x3.)
4,x,0,0,4,6 (1x..23)
6,x,0,0,4,4 (3x..12)
0,5,x,0,4,6 (.2x.13)
0,4,x,0,5,6 (.1x.23)
6,4,0,0,x,4 (31..x2)
0,4,6,0,x,4 (.13.x2)
6,x,0,0,4,6 (2x..13)
6,4,4,x,4,0 (412x3.)
0,4,4,0,x,6 (.12.x3)
0,x,6,0,4,4 (.x3.12)
6,5,4,x,4,0 (431x2.)
6,9,0,7,x,0 (13.2x.)
0,9,6,7,x,0 (.312x.)
6,x,4,2,4,0 (4x213.)
0,5,x,2,4,4 (.4x123)
4,x,6,2,4,0 (2x413.)
0,x,11,0,11,0 (.x1.2.)
11,x,0,0,11,0 (1x..2.)
0,4,x,2,5,4 (.2x143)
6,5,0,x,4,4 (43.x12)
6,4,4,8,x,0 (3124x.)
4,4,6,8,x,0 (1234x.)
0,4,4,x,4,6 (.12x34)
4,x,6,7,5,0 (1x342.)
0,5,4,x,4,6 (.31x24)
x,4,0,2,x,4 (x2.1x3)
6,x,4,7,5,0 (3x142.)
x,11,11,0,x,0 (x12.x.)
0,4,6,x,5,4 (.14x32)
6,4,0,x,5,4 (41.x32)
0,5,6,x,4,4 (.34x12)
0,4,6,x,4,4 (.14x23)
4,4,0,x,4,6 (12.x34)
4,4,0,x,5,6 (12.x34)
4,x,6,7,4,0 (1x342.)
6,x,4,7,4,0 (3x142.)
4,5,0,x,4,6 (13.x24)
0,4,4,x,5,6 (.12x34)
6,4,0,x,4,4 (41.x23)
6,9,6,7,x,0 (1423x.)
x,4,0,0,x,6 (x1..x2)
0,x,6,7,9,0 (.x123.)
6,x,0,7,9,0 (1x.23.)
11,11,x,0,11,0 (12x.3.)
11,x,11,0,11,0 (1x2.3.)
11,11,0,0,11,x (12..3x)
0,11,0,0,x,11 (.1..x2)
6,x,0,2,4,4 (4x.123)
0,x,4,2,4,6 (.x2134)
0,4,4,2,x,6 (.231x4)
0,x,6,2,4,4 (.x4123)
4,4,0,2,x,6 (23.1x4)
4,x,0,2,4,6 (2x.134)
0,x,0,0,11,11 (.x..12)
6,4,0,2,x,4 (42.1x3)
0,11,11,0,11,x (.12.3x)
0,4,6,2,x,4 (.241x3)
6,x,0,7,5,4 (3x.421)
6,x,4,8,4,0 (3x142.)
6,5,0,7,x,4 (32.4x1)
6,4,0,7,x,4 (31.4x2)
0,x,4,7,5,6 (.x1423)
4,x,0,7,5,6 (1x.423)
4,x,6,8,4,0 (1x342.)
6,x,0,7,4,4 (3x.412)
0,x,6,7,4,4 (.x3412)
0,4,6,7,x,4 (.134x2)
0,x,6,7,5,4 (.x3421)
0,5,6,7,x,4 (.234x1)
0,5,4,7,x,6 (.214x3)
0,x,4,7,4,6 (.x1423)
4,x,0,7,4,6 (1x.423)
4,4,0,7,x,6 (12.4x3)
4,5,0,7,x,6 (12.4x3)
0,4,4,7,x,6 (.124x3)
0,9,11,0,11,x (.12.3x)
11,9,0,x,11,0 (21.x3.)
11,11,x,0,9,0 (23x.1.)
0,9,6,7,9,x (.3124x)
11,11,0,x,9,0 (23.x1.)
11,9,0,0,11,x (21..3x)
6,x,6,7,9,0 (1x234.)
6,9,x,7,9,0 (13x24.)
0,11,11,x,9,0 (.23x1.)
6,9,0,7,9,x (13.24x)
0,x,0,7,9,6 (.x.231)
11,9,x,0,11,0 (21x.3.)
0,11,11,0,9,x (.23.1x)
0,9,11,x,11,0 (.12x3.)
0,9,0,7,x,6 (.3.2x1)
11,11,0,0,9,x (23..1x)
x,9,6,7,x,0 (x312x.)
11,11,0,0,x,11 (12..x3)
0,11,11,0,x,11 (.12.x3)
0,9,6,7,5,x (.4231x)
11,x,0,0,11,11 (1x..23)
6,9,0,7,5,x (24.31x)
6,5,x,7,9,0 (21x34.)
0,5,6,7,9,x (.1234x)
6,5,0,7,9,x (21.34x)
6,9,x,7,5,0 (24x31.)
0,x,11,0,11,11 (.x1.23)
0,11,x,0,11,11 (.1x.23)
0,4,4,8,x,6 (.124x3)
4,4,0,8,x,6 (12.4x3)
0,11,0,7,9,x (.3.12x)
6,4,0,8,x,4 (31.4x2)
0,9,x,7,11,0 (.2x13.)
0,x,4,8,4,6 (.x1423)
0,11,x,7,9,0 (.3x12.)
4,x,0,8,4,6 (1x.423)
6,x,0,8,4,4 (3x.412)
0,x,6,8,4,4 (.x3412)
0,4,6,8,x,4 (.134x2)
0,9,0,7,11,x (.2.13x)
0,9,0,x,11,11 (.1.x23)
0,9,x,0,11,11 (.1x.23)
0,11,0,x,9,11 (.2.x13)
11,9,11,x,11,0 (213x4.)
0,9,6,7,x,6 (.413x2)
0,9,x,7,9,6 (.3x241)
6,x,0,7,9,6 (1x.342)
0,x,6,7,9,6 (.x1342)
6,9,0,7,x,6 (14.3x2)
11,11,11,x,9,0 (234x1.)
0,11,x,0,9,11 (.2x.13)
0,11,11,8,9,x (.3412x)
11,11,0,8,9,x (34.12x)
0,9,x,7,5,6 (.4x312)
11,9,x,8,11,0 (32x14.)
11,11,x,8,9,0 (34x12.)
11,9,0,8,11,x (32.14x)
0,5,x,7,9,6 (.1x342)
0,9,11,8,11,x (.2314x)
0,9,11,7,11,x (.2314x)
11,9,0,7,11,x (32.14x)
11,11,x,7,9,0 (34x12.)
0,11,11,7,9,x (.3412x)
11,11,0,7,9,x (34.12x)
11,9,x,7,11,0 (32x14.)
x,11,0,0,x,11 (x1..x2)
0,9,11,x,11,11 (.12x34)
11,9,0,x,11,11 (21.x34)
11,11,0,x,9,11 (23.x14)
0,11,11,x,9,11 (.23x14)
x,9,11,x,11,0 (x12x3.)
0,11,x,8,9,11 (.3x124)
0,9,x,8,11,11 (.2x134)
x,11,11,x,9,0 (x23x1.)
x,9,0,7,x,6 (x3.2x1)
0,9,x,7,11,11 (.2x134)
0,11,x,7,9,11 (.3x124)
x,9,0,7,11,x (x2.13x)
x,11,0,7,9,x (x3.12x)
x,11,x,7,9,0 (x3x12.)
x,9,x,7,11,0 (x2x13.)
x,9,0,x,11,11 (x1.x23)
x,11,0,x,9,11 (x2.x13)
6,4,x,0,x,0 (21x.x.)
6,4,0,0,x,x (21..xx)
0,4,6,0,x,x (.12.xx)
0,4,4,2,x,x (.231xx)
4,4,0,2,x,x (23.1xx)
4,4,x,2,x,0 (23x1x.)
4,4,6,x,x,0 (123xx.)
6,4,4,x,x,0 (312xx.)
11,11,0,0,x,x (12..xx)
11,11,x,0,x,0 (12x.x.)
0,x,4,2,4,x (.x213x)
4,x,0,2,4,x (2x.13x)
4,x,x,2,4,0 (2xx13.)
6,x,x,0,4,0 (2xx.1.)
6,x,0,0,4,x (2x..1x)
0,x,6,0,4,x (.x2.1x)
0,x,x,2,4,4 (.xx123)
0,11,11,0,x,x (.12.xx)
0,4,x,2,x,4 (.2x1x3)
4,x,6,x,4,0 (1x3x2.)
6,x,4,x,4,0 (3x1x2.)
0,x,x,0,4,6 (.xx.12)
0,4,x,0,x,6 (.1x.x2)
6,x,4,7,x,0 (2x13x.)
4,x,6,7,x,0 (1x23x.)
4,x,0,x,4,6 (1x.x23)
6,x,0,x,4,4 (3x.x12)
0,x,4,x,4,6 (.x1x23)
0,4,6,x,x,4 (.13xx2)
6,4,0,x,x,4 (31.xx2)
4,4,0,x,x,6 (12.xx3)
0,4,4,x,x,6 (.12xx3)
0,x,6,x,4,4 (.x3x12)
6,9,x,7,x,0 (13x2x.)
6,9,0,7,x,x (13.2xx)
0,9,6,7,x,x (.312xx)
11,x,x,0,11,0 (1xx.2.)
11,x,0,0,11,x (1x..2x)
0,x,11,0,11,x (.x1.2x)
6,x,0,7,x,4 (2x.3x1)
0,x,4,7,x,6 (.x13x2)
0,x,6,7,x,4 (.x23x1)
4,x,0,7,x,6 (1x.3x2)
6,x,x,7,9,0 (1xx23.)
6,x,0,7,9,x (1x.23x)
0,x,6,7,9,x (.x123x)
0,11,x,0,x,11 (.1x.x2)
0,x,x,0,11,11 (.xx.12)
11,9,0,x,11,x (21.x3x)
0,x,x,7,9,6 (.xx231)
11,11,0,x,9,x (23.x1x)
11,9,x,x,11,0 (21xx3.)
0,9,x,7,x,6 (.3x2x1)
0,9,11,x,11,x (.12x3x)
11,11,x,x,9,0 (23xx1.)
0,11,11,x,9,x (.23x1x)
0,11,x,7,9,x (.3x12x)
0,9,x,7,11,x (.2x13x)
0,11,x,x,9,11 (.2xx13)
0,9,x,x,11,11 (.1xx23)

Rezumat Rapid

  • Acordul EbM7b5 conține notele: E♭, G, B♭♭, D
  • În acordajul Open E flat sunt disponibile 410 poziții
  • Se scrie și: EbMa7b5, Ebj7b5, EbΔ7b5, EbΔb5, Eb maj7b5
  • Fiecare diagramă arată pozițiile degetelor pe griful Guitar

Întrebări Frecvente

Ce este acordul EbM7b5 la Guitar?

EbM7b5 este un acord Eb maj7b5. Conține notele E♭, G, B♭♭, D. La Guitar în acordajul Open E flat există 410 moduri de a cânta.

Cum se cântă EbM7b5 la Guitar?

Pentru a cânta EbM7b5 la în acordajul Open E flat, utilizați una din cele 410 poziții afișate mai sus.

Ce note conține acordul EbM7b5?

Acordul EbM7b5 conține notele: E♭, G, B♭♭, D.

În câte moduri se poate cânta EbM7b5 la Guitar?

În acordajul Open E flat există 410 poziții pentru EbM7b5. Fiecare poziție utilizează un loc diferit pe grif: E♭, G, B♭♭, D.

Ce alte denumiri are EbM7b5?

EbM7b5 este cunoscut și ca EbMa7b5, Ebj7b5, EbΔ7b5, EbΔb5, Eb maj7b5. Acestea sunt notații diferite pentru același acord: E♭, G, B♭♭, D.