Emaj7b5 Guitar-akkoord — Diagram en Tabs in Drop A 7 String-stemming

Kort antwoord: Emaj7b5 is een E maj7b5-akkoord met de noten E, G♯, B♭, D♯. In Drop A 7 String-stemming zijn er 386 posities. Zie de diagrammen hieronder.

Ook bekend als: EM7b5, EMa7b5, Ej7b5, EΔ7b5, EΔb5

Zoek je Emaj7b5 (Standard Stemming)?

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Hoe speel je Emaj7b5 op Guitar

EM7b5, EMa7b5, Ej7b5, EΔ7b5, EΔb5, Emaj7b5

Noten: E, G♯, B♭, D♯

x,0,1,2,1,4,0 (x.1324.)
x,0,6,6,3,4,0 (x.3412.)
x,0,6,6,3,5,0 (x.3412.)
x,x,1,2,1,4,4 (xx12134)
x,0,7,6,3,4,0 (x.4312.)
x,x,1,2,1,4,0 (xx1324.)
x,0,7,8,8,9,0 (x.1234.)
x,0,6,8,8,9,0 (x.1234.)
x,0,6,8,9,9,0 (x.1234.)
x,x,6,6,3,4,0 (xx3412.)
x,x,6,6,3,5,0 (xx3412.)
x,0,11,8,8,9,0 (x.4123.)
x,x,7,6,3,4,0 (xx4312.)
x,0,11,8,8,11,0 (x.3124.)
x,x,x,6,3,4,0 (xxx312.)
x,x,x,2,3,4,4 (xxx1234)
x,x,7,8,8,9,0 (xx1234.)
x,x,6,8,9,9,0 (xx1234.)
x,x,6,8,8,9,0 (xx1234.)
x,x,x,8,8,9,0 (xxx123.)
x,x,11,8,8,11,0 (xx3124.)
x,x,11,8,8,9,0 (xx4123.)
1,4,1,2,1,4,x (131214x)
1,x,1,2,1,4,4 (1x12134)
1,0,x,2,1,4,0 (1.x324.)
1,0,1,x,1,4,0 (1.2x34.)
6,0,6,6,3,x,0 (2.341x.)
x,0,1,x,1,4,0 (x.1x23.)
6,0,7,6,3,x,0 (2.431x.)
6,0,x,6,3,4,0 (3.x412.)
x,4,1,2,1,4,x (x31214x)
6,0,x,6,3,5,0 (3.x412.)
7,0,6,6,3,x,0 (4.231x.)
x,0,6,6,3,x,0 (x.231x.)
x,4,x,2,3,4,0 (x3x124.)
7,0,x,6,3,4,0 (4.x312.)
x,4,1,x,1,4,0 (x31x24.)
x,4,1,x,3,4,0 (x31x24.)
x,0,1,2,1,4,x (x.1324x)
x,4,1,2,x,4,0 (x312x4.)
x,0,x,6,3,4,0 (x.x312.)
x,4,6,6,3,x,0 (x2341x.)
x,6,6,6,3,x,0 (x2341x.)
x,x,1,2,1,4,x (xx1213x)
7,0,x,8,8,9,0 (1.x234.)
x,6,6,6,x,5,0 (x234x1.)
x,4,6,2,3,x,0 (x3412x.)
x,0,x,2,3,4,4 (x.x1234)
6,0,6,8,x,9,0 (1.23x4.)
x,6,6,6,x,4,0 (x234x1.)
x,0,1,x,1,4,4 (x.1x234)
x,0,1,2,x,4,4 (x.12x34)
6,0,x,8,9,9,0 (1.x234.)
6,0,7,8,x,9,0 (1.23x4.)
6,0,x,8,8,9,0 (1.x234.)
7,0,6,8,x,9,0 (2.13x4.)
x,0,1,x,3,4,4 (x.1x234)
x,4,6,x,3,4,0 (x24x13.)
11,0,11,8,8,x,0 (3.412x.)
x,4,6,x,3,5,0 (x24x13.)
x,6,x,6,3,4,0 (x3x412.)
x,4,x,6,3,4,0 (x2x413.)
x,x,1,x,1,4,0 (xx1x23.)
x,6,6,6,8,x,0 (x1234x.)
x,6,7,6,8,x,0 (x1324x.)
x,0,6,6,3,5,x (x.3412x)
x,0,6,6,3,4,x (x.3412x)
11,0,7,8,8,x,0 (4.123x.)
x,0,x,8,8,9,0 (x.x123.)
x,0,6,6,x,5,6 (x.23x14)
x,x,6,6,3,x,0 (xx231x.)
7,0,11,8,8,x,0 (1.423x.)
x,4,7,8,8,x,0 (x1234x.)
x,6,7,6,x,4,0 (x243x1.)
x,4,6,8,8,x,0 (x1234x.)
x,0,6,6,x,4,6 (x.23x14)
x,4,7,x,3,4,0 (x24x13.)
x,0,6,6,3,x,4 (x.341x2)
11,0,11,x,8,11,0 (2.3x14.)
x,0,6,x,3,5,4 (x.4x132)
x,0,6,6,3,x,6 (x.231x4)
x,0,x,6,3,4,6 (x.x3124)
x,6,6,6,9,x,0 (x1234x.)
x,0,6,8,x,9,0 (x.12x3.)
x,0,7,6,3,4,x (x.4312x)
11,0,x,8,8,9,0 (4.x123.)
x,0,6,x,3,4,4 (x.4x123)
x,0,x,6,3,4,4 (x.x4123)
11,0,x,8,8,11,0 (3.x124.)
x,0,11,8,8,x,0 (x.312x.)
11,0,7,x,8,11,0 (3.1x24.)
7,0,11,x,8,11,0 (1.3x24.)
x,0,6,2,3,x,4 (x.412x3)
x,6,x,6,8,5,0 (x2x341.)
x,4,7,8,x,4,0 (x134x2.)
x,4,6,8,x,5,0 (x134x2.)
x,0,7,8,8,9,x (x.1234x)
x,0,7,6,x,4,6 (x.42x13)
x,6,x,6,8,4,0 (x2x341.)
x,4,x,8,8,5,0 (x1x342.)
x,4,x,8,8,4,0 (x1x342.)
x,4,6,8,x,4,0 (x134x2.)
x,0,7,6,8,x,6 (x.314x2)
x,x,1,2,x,4,4 (xx12x34)
x,0,6,6,8,x,6 (x.124x3)
x,6,6,x,9,9,0 (x12x34.)
x,0,6,8,8,9,x (x.1234x)
x,6,6,x,8,9,0 (x12x34.)
x,6,x,6,8,9,0 (x1x234.)
x,6,6,8,x,9,0 (x123x4.)
x,0,6,8,9,9,x (x.1234x)
x,6,6,6,x,9,0 (x123x4.)
x,6,7,x,8,9,0 (x12x34.)
x,0,7,x,3,4,4 (x.4x123)
x,6,x,8,8,9,0 (x1x234.)
x,11,11,8,9,x,0 (x3412x.)
x,11,11,8,8,x,0 (x3412x.)
x,0,x,6,8,5,6 (x.x2413)
x,0,11,x,8,11,0 (x.2x13.)
x,0,x,6,8,4,6 (x.x2413)
x,0,x,8,8,5,4 (x.x3421)
x,0,6,8,8,x,4 (x.234x1)
x,0,6,8,x,4,4 (x.34x12)
x,0,7,8,x,4,4 (x.34x12)
x,0,6,8,x,5,4 (x.34x21)
x,0,7,8,8,x,4 (x.234x1)
x,0,x,8,8,4,4 (x.x3412)
x,0,6,x,8,9,6 (x.1x342)
x,0,6,8,x,9,6 (x.13x42)
x,0,6,6,x,9,6 (x.12x43)
x,0,7,x,8,9,6 (x.2x341)
x,0,x,6,8,9,6 (x.x1342)
x,0,6,6,9,x,6 (x.124x3)
x,0,x,8,8,9,6 (x.x2341)
x,0,6,x,9,9,6 (x.1x342)
x,11,11,x,9,11,0 (x23x14.)
x,0,11,8,8,11,x (x.3124x)
x,11,11,x,8,11,0 (x23x14.)
x,x,6,8,x,9,0 (xx12x3.)
x,11,x,8,9,9,0 (x4x123.)
x,11,11,8,x,11,0 (x231x4.)
x,11,11,8,x,9,0 (x341x2.)
x,11,x,8,8,9,0 (x4x123.)
x,0,11,8,8,9,x (x.4123x)
x,x,11,8,8,x,0 (xx312x.)
x,11,7,8,x,9,0 (x412x3.)
x,x,6,2,3,x,4 (xx412x3)
x,0,11,x,9,11,11 (x.2x134)
x,0,11,8,x,9,11 (x.31x24)
x,0,11,8,9,x,11 (x.312x4)
x,0,11,x,8,11,11 (x.2x134)
x,0,11,8,x,11,11 (x.21x34)
x,0,x,8,9,9,11 (x.x1234)
x,0,11,8,8,x,11 (x.312x4)
x,0,x,8,8,9,11 (x.x1234)
x,x,11,x,8,11,0 (xx2x13.)
x,0,7,8,x,9,11 (x.12x34)
1,x,1,2,1,4,x (1x1213x)
6,6,6,6,x,x,0 (1234xx.)
1,4,x,2,1,4,x (13x214x)
1,4,1,2,x,4,x (1312x4x)
1,0,x,x,1,4,0 (1.xx23.)
7,6,6,6,x,x,0 (4123xx.)
6,6,7,6,x,x,0 (1243xx.)
6,0,x,6,3,x,0 (2.x31x.)
x,6,6,6,x,x,0 (x123xx.)
1,4,1,x,x,4,0 (132xx4.)
1,4,x,x,3,4,0 (13xx24.)
1,0,1,x,1,4,x (1.2x34x)
1,0,x,2,1,4,x (1.x324x)
1,4,x,x,1,4,0 (13xx24.)
1,x,x,2,1,4,4 (1xx2134)
1,x,x,2,1,4,0 (1xx324.)
1,x,1,2,x,4,4 (1x12x34)
1,x,1,x,1,4,0 (1x2x34.)
1,4,x,2,x,4,0 (13x2x4.)
6,6,x,6,3,x,0 (23x41x.)
6,4,6,x,3,x,0 (324x1x.)
6,0,6,6,3,x,x (2.341xx)
6,x,6,6,3,x,0 (2x341x.)
6,4,x,6,3,x,0 (32x41x.)
x,4,x,x,3,4,0 (x2xx13.)
6,6,x,6,x,5,0 (23x4x1.)
6,4,x,2,3,x,0 (43x12x.)
6,4,6,8,x,x,0 (2134xx.)
6,4,7,8,x,x,0 (2134xx.)
7,4,6,8,x,x,0 (3124xx.)
1,0,1,x,x,4,4 (1.2xx34)
1,0,x,x,1,4,4 (1.xx234)
1,0,x,2,x,4,4 (1.x2x34)
1,0,x,x,3,4,4 (1.xx234)
6,6,x,6,x,4,0 (23x4x1.)
6,0,x,6,3,5,x (3.x412x)
6,6,x,6,8,x,0 (12x34x.)
7,6,x,6,8,x,0 (31x24x.)
6,0,7,6,3,x,x (2.431xx)
7,x,6,6,3,x,0 (4x231x.)
6,x,7,6,3,x,0 (2x431x.)
6,4,x,x,3,5,0 (42xx13.)
7,4,6,x,3,x,0 (423x1x.)
6,0,x,6,3,4,x (3.x412x)
6,4,x,x,3,4,0 (42xx13.)
6,x,x,6,3,5,0 (3xx412.)
x,4,1,x,x,4,0 (x21xx3.)
x,0,1,x,1,4,x (x.1x23x)
7,0,6,6,3,x,x (4.231xx)
6,0,6,6,x,x,6 (1.23xx4)
6,x,x,6,3,4,0 (3xx412.)
6,4,7,x,3,x,0 (324x1x.)
x,0,6,6,3,x,x (x.231xx)
x,0,x,x,3,4,4 (x.xx123)
x,4,6,x,3,x,0 (x23x1x.)
6,0,x,6,x,5,6 (2.x3x14)
7,6,x,6,x,4,0 (42x3x1.)
x,4,x,2,3,4,x (x3x124x)
7,4,x,8,8,x,0 (21x34x.)
6,4,x,8,8,x,0 (21x34x.)
6,0,x,6,x,4,6 (2.x3x14)
7,4,x,x,3,4,0 (42xx13.)
7,x,x,6,3,4,0 (4xx312.)
x,4,6,8,x,x,0 (x123xx.)
x,6,x,6,x,4,0 (x2x3x1.)
6,0,7,6,x,x,6 (1.42xx3)
6,0,x,8,x,9,0 (1.x2x3.)
x,0,1,x,x,4,4 (x.1xx23)
7,0,6,6,x,x,6 (4.12xx3)
6,0,x,x,3,5,4 (4.xx132)
6,0,x,6,3,x,4 (3.x41x2)
7,0,x,6,3,4,x (4.x312x)
x,4,1,2,x,4,x (x312x4x)
6,0,x,6,3,x,6 (2.x31x4)
6,0,x,x,3,4,4 (4.xx123)
6,0,6,x,3,x,4 (3.4x1x2)
6,6,x,6,9,x,0 (12x34x.)
11,0,x,8,8,x,0 (3.x12x.)
x,0,x,6,3,4,x (x.x312x)
6,0,x,2,3,x,4 (4.x12x3)
x,0,6,6,x,x,6 (x.12xx3)
x,6,x,6,8,x,0 (x1x23x.)
11,11,11,8,x,x,0 (2341xx.)
7,x,x,8,8,9,0 (1xx234.)
7,11,11,8,x,x,0 (1342xx.)
7,0,x,8,8,9,x (1.x234x)
x,4,6,2,3,x,x (x3412xx)
7,0,x,6,x,4,6 (4.x2x13)
11,11,7,8,x,x,0 (3412xx.)
6,4,x,8,x,4,0 (31x4x2.)
7,4,x,8,x,4,0 (31x4x2.)
6,4,x,8,x,5,0 (31x4x2.)
6,x,x,8,9,9,0 (1xx234.)
6,0,7,8,x,9,x (1.23x4x)
6,6,x,8,x,9,0 (12x3x4.)
7,x,6,8,x,9,0 (2x13x4.)
6,0,x,8,8,9,x (1.x234x)
6,x,x,8,8,9,0 (1xx234.)
6,0,x,8,9,9,x (1.x234x)
x,4,x,8,8,x,0 (x1x23x.)
6,x,6,8,x,9,0 (1x23x4.)
7,0,x,6,8,x,6 (3.x14x2)
7,0,x,x,3,4,4 (4.xx123)
6,0,x,6,8,x,6 (1.x24x3)
x,0,x,6,x,4,6 (x.x2x13)
6,6,6,x,x,9,0 (123xx4.)
7,6,6,x,x,9,0 (312xx4.)
6,x,7,8,x,9,0 (1x23x4.)
6,6,7,x,x,9,0 (123xx4.)
7,0,6,x,3,x,4 (4.3x1x2)
6,0,7,x,3,x,4 (3.4x1x2)
6,6,x,6,x,9,0 (12x3x4.)
6,0,6,8,x,9,x (1.23x4x)
7,0,6,8,x,9,x (2.13x4x)
6,6,x,x,8,9,0 (12xx34.)
6,6,x,x,9,9,0 (12xx34.)
7,6,x,x,8,9,0 (21xx34.)
11,11,x,8,9,x,0 (34x12x.)
11,x,11,8,8,x,0 (3x412x.)
11,11,x,8,8,x,0 (34x12x.)
11,11,11,x,x,11,0 (123xx4.)
x,0,6,x,3,x,4 (x.3x1x2)
11,0,x,x,8,11,0 (2.xx13.)
11,0,11,8,8,x,x (3.412xx)
6,0,7,8,x,x,4 (2.34xx1)
6,0,x,8,x,4,4 (3.x4x12)
7,0,11,8,8,x,x (1.423xx)
11,0,7,8,8,x,x (4.123xx)
6,0,6,8,x,x,4 (2.34xx1)
x,11,11,8,x,x,0 (x231xx.)
7,0,6,8,x,x,4 (3.24xx1)
7,0,x,8,x,4,4 (3.x4x12)
7,0,x,8,8,x,4 (2.x34x1)
6,0,x,8,x,5,4 (3.x4x21)
11,x,7,8,8,x,0 (4x123x.)
x,0,x,8,8,9,x (x.x123x)
7,x,11,8,8,x,0 (1x423x.)
6,0,x,8,8,x,4 (2.x34x1)
6,0,x,x,9,9,6 (1.xx342)
11,11,x,x,9,11,0 (23xx14.)
7,0,6,x,x,9,6 (3.1xx42)
6,0,7,x,x,9,6 (1.3xx42)
7,0,x,x,8,9,6 (2.xx341)
6,0,x,6,9,x,6 (1.x24x3)
6,0,x,x,8,9,6 (1.xx342)
6,0,x,8,x,9,6 (1.x3x42)
6,0,6,x,x,9,6 (1.2xx43)
x,4,x,8,x,4,0 (x1x3x2.)
6,0,x,6,x,9,6 (1.x2x43)
11,x,x,8,8,9,0 (4xx123.)
11,11,x,8,x,11,0 (23x1x4.)
11,x,11,x,8,11,0 (2x3x14.)
11,0,x,8,8,9,x (4.x123x)
11,0,x,8,8,11,x (3.x124x)
11,0,11,x,x,11,11 (1.2xx34)
11,11,x,x,8,11,0 (23xx14.)
x,6,6,x,x,9,0 (x12xx3.)
x,0,6,8,x,9,x (x.12x3x)
11,0,11,x,8,11,x (2.3x14x)
x,6,x,x,8,9,0 (x1xx23.)
11,x,x,8,8,11,0 (3xx124.)
11,11,x,8,x,9,0 (34x1x2.)
x,0,x,6,8,x,6 (x.x13x2)
11,x,7,x,8,11,0 (3x1x24.)
11,0,7,x,8,11,x (3.1x24x)
7,11,x,8,x,9,0 (14x2x3.)
11,11,7,x,x,11,0 (231xx4.)
x,11,11,x,x,11,0 (x12xx3.)
7,11,11,x,x,11,0 (123xx4.)
x,4,6,2,x,x,6 (x231xx4)
7,x,11,x,8,11,0 (1x3x24.)
x,6,6,2,x,x,4 (x341xx2)
x,6,x,2,x,4,4 (x4x1x23)
7,0,11,x,8,11,x (1.3x24x)
x,0,11,8,8,x,x (x.312xx)
x,4,x,2,x,4,6 (x2x1x34)
11,0,x,x,9,11,11 (2.xx134)
x,0,6,8,x,x,4 (x.23xx1)
x,0,x,8,8,x,4 (x.x23x1)
x,0,x,8,x,4,4 (x.x3x12)
11,0,x,8,x,11,11 (2.x1x34)
x,0,6,x,x,9,6 (x.1xx32)
11,0,x,8,x,9,11 (3.x1x24)
11,0,x,x,8,11,11 (2.xx134)
11,0,x,8,9,x,11 (3.x12x4)
x,0,x,x,8,9,6 (x.xx231)
11,0,x,8,8,x,11 (3.x12x4)
11,0,11,8,x,x,11 (2.31xx4)
7,0,x,8,x,9,11 (1.x2x34)
x,0,11,x,8,11,x (x.2x13x)
x,11,x,8,x,9,0 (x3x1x2.)
7,0,11,x,x,11,11 (1.2xx34)
x,0,11,x,x,11,11 (x.1xx23)
11,0,7,x,x,11,11 (2.1xx34)
11,0,7,8,x,x,11 (3.12xx4)
7,0,11,8,x,x,11 (1.32xx4)
x,0,x,8,x,9,11 (x.x1x23)
x,0,11,8,x,x,11 (x.21xx3)
6,6,x,6,x,x,0 (12x3xx.)
1,x,x,2,1,4,x (1xx213x)
1,0,x,x,1,4,x (1.xx23x)
1,x,x,x,1,4,0 (1xxx23.)
1,4,x,x,x,4,0 (12xxx3.)
6,0,x,6,3,x,x (2.x31xx)
6,4,x,x,3,x,0 (32xx1x.)
6,x,x,6,3,x,0 (2xx31x.)
1,0,x,x,x,4,4 (1.xxx23)
6,4,x,8,x,x,0 (21x3xx.)
1,4,x,2,x,4,x (13x2x4x)
6,0,x,6,x,x,6 (1.x2xx3)
6,4,x,2,3,x,x (43x12xx)
1,x,x,2,x,4,4 (1xx2x34)
6,0,x,x,3,x,4 (3.xx1x2)
11,11,x,8,x,x,0 (23x1xx.)
6,6,x,x,x,9,0 (12xxx3.)
6,x,x,8,x,9,0 (1xx2x3.)
6,0,x,8,x,9,x (1.x2x3x)
6,6,x,2,x,x,4 (34x1xx2)
11,x,x,8,8,x,0 (3xx12x.)
6,x,x,2,3,x,4 (4xx12x3)
11,11,x,x,x,11,0 (12xxx3.)
6,4,x,2,x,x,6 (32x1xx4)
11,0,x,8,8,x,x (3.x12xx)
6,0,x,8,x,x,4 (2.x3xx1)
6,0,x,x,x,9,6 (1.xxx32)
11,0,x,x,x,11,11 (1.xxx23)
11,0,x,x,8,11,x (2.xx13x)
11,x,x,x,8,11,0 (2xxx13.)
11,0,x,8,x,x,11 (2.x1xx3)

Snel Overzicht

  • Het Emaj7b5-akkoord bevat de noten: E, G♯, B♭, D♯
  • In Drop A 7 String-stemming zijn er 386 posities beschikbaar
  • Ook geschreven als: EM7b5, EMa7b5, Ej7b5, EΔ7b5, EΔb5
  • Elk diagram toont de vingerposities op de Guitar-hals

Veelgestelde Vragen

Wat is het Emaj7b5-akkoord op Guitar?

Emaj7b5 is een E maj7b5-akkoord. Het bevat de noten E, G♯, B♭, D♯. Op Guitar in Drop A 7 String-stemming zijn er 386 manieren om te spelen.

Hoe speel je Emaj7b5 op Guitar?

Om Emaj7b5 te spelen op in Drop A 7 String-stemming, gebruik een van de 386 posities hierboven.

Welke noten zitten in het Emaj7b5-akkoord?

Het Emaj7b5-akkoord bevat de noten: E, G♯, B♭, D♯.

Op hoeveel manieren kun je Emaj7b5 spelen op Guitar?

In Drop A 7 String-stemming zijn er 386 posities voor Emaj7b5. Elke positie gebruikt een andere plek op de hals: E, G♯, B♭, D♯.

Welke andere namen heeft Emaj7b5?

Emaj7b5 staat ook bekend als EM7b5, EMa7b5, Ej7b5, EΔ7b5, EΔb5. Dit zijn verschillende notaties voor hetzelfde akkoord: E, G♯, B♭, D♯.