Disb5 Guitar-sointu — Kaavio ja Tabit Open E flat-virityksessä

Lyhyt vastaus: Disb5 on Dis b5-sointu nuoteilla Dis, Fis♯, A. Open E flat-virityksessä on 413 asemaa. Katso kaaviot alla.

Tunnetaan myös nimellä: DisMb5, DisΔ-5

PianosoinnutSoittimetViritykset

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Kuinka soittaa Disb5 soittimella Guitar

Disb5, DisMb5, DisΔ-5

Nuotit: Dis, Fis♯, A

0,5,6,0,5,0 (.13.2.)
6,5,0,0,5,0 (31..2.)
0,5,4,2,5,0 (.3214.)
0,5,0,0,5,6 (.1..23)
6,5,6,0,5,0 (314.2.)
4,5,0,2,5,0 (23.14.)
6,5,4,0,5,0 (421.3.)
4,5,6,0,5,0 (124.3.)
6,5,0,0,5,6 (31..24)
0,11,0,0,11,0 (.1..2.)
0,5,6,0,5,6 (.13.24)
0,5,0,2,5,4 (.3.142)
4,5,0,0,5,6 (12..34)
0,5,4,0,5,6 (.21.34)
6,5,0,0,5,4 (42..31)
x,5,6,0,5,0 (x13.2.)
0,5,6,0,5,4 (.24.31)
6,9,0,0,9,0 (12..3.)
0,9,0,0,11,0 (.1..2.)
0,11,0,0,9,0 (.2..1.)
0,9,6,0,9,0 (.21.3.)
0,9,6,0,5,0 (.32.1.)
6,9,0,0,5,0 (23..1.)
6,5,0,0,9,0 (21..3.)
0,5,6,0,9,0 (.12.3.)
x,5,4,2,5,0 (x3214.)
x,5,0,0,5,6 (x1..23)
0,9,0,0,9,6 (.2..31)
x,x,6,0,5,0 (xx2.1.)
6,9,6,0,9,0 (132.4.)
0,9,6,8,9,0 (.3124.)
6,9,0,8,9,0 (13.24.)
0,9,0,8,11,0 (.2.13.)
6,9,0,8,5,0 (24.31.)
0,5,6,8,9,0 (.1234.)
0,9,0,0,5,6 (.3..12)
0,9,6,8,5,0 (.4231.)
6,5,6,0,9,0 (213.4.)
6,9,6,0,5,0 (243.1.)
0,11,0,8,9,0 (.3.12.)
0,5,0,0,9,6 (.1..32)
6,5,0,8,9,0 (21.34.)
x,11,0,0,11,0 (x1..2.)
x,5,0,2,5,4 (x3.142)
0,9,6,0,9,6 (.31.42)
0,9,0,8,9,6 (.3.241)
x,x,4,2,5,0 (xx213.)
6,9,0,0,9,6 (13..42)
x,x,0,0,5,6 (xx..12)
x,11,0,0,9,0 (x2..1.)
6,9,0,0,5,6 (24..13)
x,9,6,0,9,0 (x21.3.)
0,9,6,0,5,6 (.42.13)
0,9,0,8,5,6 (.4.312)
x,9,0,0,11,0 (x1..2.)
0,5,6,0,9,6 (.12.43)
6,5,0,0,9,6 (21..43)
0,5,0,8,9,6 (.1.342)
x,9,6,0,5,0 (x32.1.)
x,5,6,0,9,0 (x12.3.)
x,x,0,0,11,0 (xx..1.)
x,x,0,2,5,4 (xx.132)
x,9,0,0,9,6 (x2..31)
x,9,6,8,9,0 (x3124.)
x,5,0,0,9,6 (x1..32)
x,9,0,0,5,6 (x3..12)
x,9,0,8,11,0 (x2.13.)
x,5,6,8,9,0 (x1234.)
x,x,6,0,9,0 (xx1.2.)
x,9,6,8,5,0 (x4231.)
x,11,0,8,9,0 (x3.12.)
x,9,0,8,9,6 (x3.241)
x,x,6,8,9,0 (xx123.)
x,x,0,0,9,6 (xx..21)
x,9,0,8,5,6 (x4.312)
x,5,0,8,9,6 (x1.342)
x,x,x,0,11,0 (xxx.1.)
x,x,0,8,9,6 (xx.231)
6,5,0,0,x,0 (21..x.)
0,5,6,0,x,0 (.12.x.)
6,5,6,0,x,0 (213.x.)
0,11,0,0,x,0 (.1..x.)
4,5,6,0,x,0 (123.x.)
6,5,4,0,x,0 (321.x.)
6,9,0,0,x,0 (12..x.)
0,x,6,0,5,0 (.x2.1.)
0,5,4,2,x,0 (.321x.)
6,x,0,0,5,0 (2x..1.)
4,5,0,2,x,0 (23.1x.)
x,5,6,0,x,0 (x12.x.)
0,9,6,0,x,0 (.21.x.)
0,5,6,0,5,x (.13.2x)
4,5,4,2,x,0 (2431x.)
6,5,0,0,5,x (31..2x)
6,5,x,0,5,0 (31x.2.)
6,x,6,0,5,0 (2x3.1.)
0,x,4,2,5,0 (.x213.)
0,5,0,0,x,6 (.1..x2)
4,x,0,2,5,0 (2x.13.)
0,x,0,0,5,6 (.x..12)
6,x,4,0,5,0 (3x1.2.)
x,x,6,0,x,0 (xx1.x.)
4,x,6,0,5,0 (1x3.2.)
x,11,0,0,x,0 (x1..x.)
6,9,6,0,x,0 (132.x.)
6,5,4,2,x,0 (4321x.)
0,5,0,2,x,4 (.3.1x2)
4,x,4,2,5,0 (2x314.)
4,5,6,2,x,0 (2341x.)
4,5,x,2,5,0 (23x14.)
0,x,6,0,5,6 (.x2.13)
0,5,4,2,5,x (.3214x)
0,x,0,0,11,0 (.x..1.)
6,x,0,0,5,6 (2x..13)
4,5,0,2,5,x (23.14x)
0,5,6,0,x,6 (.12.x3)
0,5,x,0,5,6 (.1x.23)
6,5,0,0,x,6 (21..x3)
0,x,0,2,5,4 (.x.132)
0,5,4,0,x,6 (.21.x3)
6,5,0,0,x,4 (32..x1)
4,x,0,0,5,6 (1x..23)
6,5,4,x,5,0 (421x3.)
0,x,6,0,5,4 (.x3.21)
4,5,6,x,5,0 (124x3.)
x,5,4,2,x,0 (x321x.)
0,5,6,0,x,4 (.23.x1)
4,5,0,0,x,6 (12..x3)
6,x,0,0,5,4 (3x..21)
0,x,4,0,5,6 (.x1.23)
0,9,6,8,x,0 (.312x.)
x,x,4,2,x,0 (xx21x.)
6,x,0,0,9,0 (1x..2.)
6,9,0,8,x,0 (13.2x.)
0,x,6,0,9,0 (.x1.2.)
x,9,6,0,x,0 (x21.x.)
4,x,0,2,5,4 (2x.143)
0,x,4,2,5,4 (.x2143)
6,x,4,2,5,0 (4x213.)
0,5,x,2,5,4 (.3x142)
4,x,6,2,5,0 (2x413.)
4,5,0,2,x,4 (24.1x3)
0,5,4,2,x,4 (.421x3)
0,11,0,0,11,x (.1..2x)
0,11,x,0,11,0 (.1x.2.)
4,5,6,8,x,0 (1234x.)
6,5,4,8,x,0 (3214x.)
0,5,4,x,5,6 (.21x34)
6,5,0,x,5,4 (42.x31)
0,5,6,x,5,4 (.24x31)
4,5,0,x,5,6 (12.x34)
x,5,0,0,x,6 (x1..x2)
0,9,6,x,9,0 (.21x3.)
0,x,0,0,9,6 (.x..21)
6,9,6,8,x,0 (1423x.)
0,9,0,0,11,x (.1..2x)
0,9,x,0,11,0 (.1x.2.)
6,9,0,0,9,x (12..3x)
0,9,0,x,11,0 (.1.x2.)
6,x,0,8,9,0 (1x.23.)
0,11,x,0,9,0 (.2x.1.)
0,11,0,0,9,x (.2..1x)
6,9,x,0,9,0 (12x.3.)
0,x,6,8,9,0 (.x123.)
6,9,0,x,9,0 (12.x3.)
6,x,6,0,9,0 (1x2.3.)
0,9,0,0,x,6 (.2..x1)
0,11,0,x,9,0 (.2.x1.)
0,9,6,0,9,x (.21.3x)
0,x,6,2,5,4 (.x4132)
4,5,0,2,x,6 (23.1x4)
6,5,0,x,9,0 (21.x3.)
0,9,6,0,5,x (.32.1x)
6,9,x,0,5,0 (23x.1.)
0,x,4,2,5,6 (.x2134)
0,9,6,x,5,0 (.32x1.)
0,5,6,x,9,0 (.12x3.)
6,9,0,x,5,0 (23.x1.)
6,x,0,2,5,4 (4x.132)
6,5,x,0,9,0 (21x.3.)
6,5,0,2,x,4 (43.1x2)
4,x,0,2,5,6 (2x.134)
6,5,0,0,9,x (21..3x)
0,5,4,2,x,6 (.321x4)
0,5,6,2,x,4 (.341x2)
0,5,6,0,9,x (.12.3x)
6,9,0,0,5,x (23..1x)
4,x,6,8,5,0 (1x342.)
x,x,0,0,x,6 (xx..x1)
x,5,0,2,x,4 (x3.1x2)
6,x,4,8,5,0 (3x142.)
0,9,6,8,9,x (.3124x)
6,9,x,8,9,0 (13x24.)
6,9,0,8,9,x (13.24x)
6,9,0,0,x,6 (13..x2)
0,9,6,0,x,6 (.31.x2)
0,x,0,8,9,6 (.x.231)
6,9,6,x,9,0 (132x4.)
6,x,6,8,9,0 (1x234.)
0,9,0,x,9,6 (.2.x31)
0,9,x,0,9,6 (.2x.31)
0,9,0,8,x,6 (.3.2x1)
x,x,0,2,x,4 (xx.1x2)
6,x,0,0,9,6 (1x..32)
0,x,6,0,9,6 (.x1.32)
0,9,0,x,5,6 (.3.x12)
6,5,0,8,9,x (21.34x)
x,9,6,8,x,0 (x312x.)
0,9,x,8,11,0 (.2x13.)
6,9,6,x,5,0 (243x1.)
0,9,0,8,11,x (.2.13x)
0,9,x,0,5,6 (.3x.12)
0,5,0,x,9,6 (.1.x32)
6,9,x,8,5,0 (24x31.)
0,5,x,0,9,6 (.1x.32)
0,9,6,8,5,x (.4231x)
6,9,0,8,5,x (24.31x)
0,5,6,8,9,x (.1234x)
6,5,x,8,9,0 (21x34.)
6,5,6,x,9,0 (213x4.)
0,11,0,8,9,x (.3.12x)
0,11,x,8,9,0 (.3x12.)
0,5,4,8,x,6 (.214x3)
0,x,6,8,5,4 (.x3421)
x,11,0,0,11,x (x1..2x)
4,x,0,8,5,6 (1x.423)
0,5,6,8,x,4 (.234x1)
0,x,4,8,5,6 (.x1423)
6,5,0,8,x,4 (32.4x1)
6,x,0,8,5,4 (3x.421)
4,5,0,8,x,6 (12.4x3)
x,11,x,0,11,0 (x1x.2.)
0,9,6,x,9,6 (.31x42)
6,9,0,8,x,6 (14.3x2)
6,9,0,x,9,6 (13.x42)
6,x,0,8,9,6 (1x.342)
0,9,x,8,9,6 (.3x241)
0,x,6,8,9,6 (.x1342)
0,9,6,8,x,6 (.413x2)
x,9,x,0,11,0 (x1x.2.)
6,9,0,x,5,6 (24.x13)
0,9,6,x,5,6 (.42x13)
x,9,0,0,11,x (x1..2x)
x,9,0,0,x,6 (x2..x1)
x,11,0,0,9,x (x2..1x)
0,9,x,8,5,6 (.4x312)
6,5,0,x,9,6 (21.x43)
x,11,x,0,9,0 (x2x.1.)
x,9,0,x,11,0 (x1.x2.)
0,5,6,x,9,6 (.12x43)
x,11,0,x,9,0 (x2.x1.)
0,5,x,8,9,6 (.1x342)
x,9,6,x,9,0 (x21x3.)
x,9,6,x,5,0 (x32x1.)
x,5,6,x,9,0 (x12x3.)
x,x,0,0,11,x (xx..1x)
x,9,0,8,x,6 (x3.2x1)
x,9,0,x,9,6 (x2.x31)
x,11,0,8,9,x (x3.12x)
x,9,0,8,11,x (x2.13x)
x,5,0,x,9,6 (x1.x32)
x,9,0,x,5,6 (x3.x12)
x,9,x,8,11,0 (x2x13.)
x,11,x,8,9,0 (x3x12.)
x,x,6,x,9,0 (xx1x2.)
x,x,0,x,9,6 (xx.x21)
6,x,0,0,x,0 (1x..x.)
0,x,6,0,x,0 (.x1.x.)
6,5,x,0,x,0 (21x.x.)
6,5,0,0,x,x (21..xx)
6,x,6,0,x,0 (1x2.x.)
0,5,6,0,x,x (.12.xx)
4,x,0,2,x,0 (2x.1x.)
0,x,4,2,x,0 (.x21x.)
4,x,6,0,x,0 (1x2.x.)
6,x,4,0,x,0 (2x1.x.)
0,11,0,0,x,x (.1..xx)
4,x,4,2,x,0 (2x31x.)
0,11,x,0,x,0 (.1x.x.)
4,5,6,x,x,0 (123xx.)
6,5,4,x,x,0 (321xx.)
0,x,0,0,x,6 (.x..x1)
6,9,0,0,x,x (12..xx)
6,9,x,0,x,0 (12x.x.)
6,9,0,x,x,0 (12.xx.)
6,x,x,0,5,0 (2xx.1.)
0,x,6,0,5,x (.x2.1x)
6,x,0,0,5,x (2x..1x)
0,x,0,2,x,4 (.x.1x2)
4,5,0,2,x,x (23.1xx)
0,5,4,2,x,x (.321xx)
4,5,x,2,x,0 (23x1x.)
0,x,6,0,x,6 (.x1.x2)
6,x,0,0,x,6 (1x..x2)
0,9,6,x,x,0 (.21xx.)
0,9,6,0,x,x (.21.xx)
0,x,x,0,5,6 (.xx.12)
0,x,4,2,5,x (.x213x)
4,x,0,2,x,4 (2x.1x3)
4,x,x,2,5,0 (2xx13.)
0,x,4,2,x,4 (.x21x3)
6,x,4,2,x,0 (3x21x.)
4,x,6,2,x,0 (2x31x.)
0,5,x,0,x,6 (.1x.x2)
4,x,0,2,5,x (2x.13x)
6,x,0,0,x,4 (2x..x1)
0,x,6,0,x,4 (.x2.x1)
x,11,0,0,x,x (x1..xx)
4,x,6,x,5,0 (1x3x2.)
4,x,0,0,x,6 (1x..x2)
6,x,4,x,5,0 (3x1x2.)
0,x,4,0,x,6 (.x1.x2)
x,11,x,0,x,0 (x1x.x.)
6,9,6,x,x,0 (132xx.)
0,x,0,0,11,x (.x..1x)
0,x,x,2,5,4 (.xx132)
0,x,x,0,11,0 (.xx.1.)
0,5,x,2,x,4 (.3x1x2)
0,5,6,x,x,4 (.23xx1)
4,5,0,x,x,6 (12.xx3)
4,x,6,8,x,0 (1x23x.)
6,x,4,8,x,0 (2x13x.)
0,x,6,x,5,4 (.x3x21)
6,5,0,x,x,4 (32.xx1)
0,x,4,x,5,6 (.x1x23)
4,x,0,x,5,6 (1x.x23)
6,x,0,x,5,4 (3x.x21)
0,5,4,x,x,6 (.21xx3)
6,x,0,x,9,0 (1x.x2.)
6,9,x,8,x,0 (13x2x.)
0,x,6,x,9,0 (.x1x2.)
6,x,0,0,9,x (1x..2x)
6,x,x,0,9,0 (1xx.2.)
0,9,6,8,x,x (.312xx)
6,9,0,8,x,x (13.2xx)
0,x,6,0,9,x (.x1.2x)
x,9,6,x,x,0 (x21xx.)
0,x,4,2,x,6 (.x21x3)
6,x,0,2,x,4 (3x.1x2)
0,x,6,2,x,4 (.x31x2)
0,11,x,0,11,x (.1x.2x)
4,x,0,2,x,6 (2x.1x3)
0,11,0,x,9,x (.2.x1x)
0,11,x,x,9,0 (.2xx1.)
6,9,x,x,9,0 (12xx3.)
6,x,6,x,9,0 (1x2x3.)
0,x,x,0,9,6 (.xx.21)
6,9,0,x,9,x (12.x3x)
0,x,0,x,9,6 (.x.x21)
6,x,x,8,9,0 (1xx23.)
0,9,6,x,9,x (.21x3x)
0,9,x,0,x,6 (.2x.x1)
0,9,x,0,11,x (.1x.2x)
0,9,0,x,x,6 (.2.xx1)
0,9,0,x,11,x (.1.x2x)
0,11,x,0,9,x (.2x.1x)
0,9,x,x,11,0 (.1xx2.)
0,x,6,8,9,x (.x123x)
6,x,0,8,9,x (1x.23x)
6,5,0,x,9,x (21.x3x)
6,9,x,x,5,0 (23xx1.)
6,9,0,x,5,x (23.x1x)
0,9,6,x,5,x (.32x1x)
0,5,6,x,9,x (.12x3x)
6,5,x,x,9,0 (21xx3.)
0,x,4,8,x,6 (.x13x2)
6,x,0,8,x,4 (2x.3x1)
4,x,0,8,x,6 (1x.3x2)
0,x,6,8,x,4 (.x23x1)
0,9,x,8,x,6 (.3x2x1)
0,9,x,x,9,6 (.2xx31)
0,9,6,x,x,6 (.31xx2)
6,9,0,x,x,6 (13.xx2)
0,x,6,x,9,6 (.x1x32)
0,x,x,8,9,6 (.xx231)
6,x,0,x,9,6 (1x.x32)
0,11,x,8,9,x (.3x12x)
0,9,x,8,11,x (.2x13x)
0,5,x,x,9,6 (.1xx32)
0,9,x,x,5,6 (.3xx12)
x,11,0,x,9,x (x2.x1x)
x,11,x,x,9,0 (x2xx1.)
x,9,0,x,11,x (x1.x2x)
x,9,0,x,x,6 (x2.xx1)
x,9,x,x,11,0 (x1xx2.)
x,9,x,8,11,x (x2x13x)
x,11,x,8,9,x (x3x12x)
6,x,x,0,x,0 (1xx.x.)
6,x,0,0,x,x (1x..xx)
0,x,6,0,x,x (.x1.xx)
0,x,4,2,x,x (.x21xx)
4,x,x,2,x,0 (2xx1x.)
4,x,0,2,x,x (2x.1xx)
4,x,6,x,x,0 (1x2xx.)
6,x,4,x,x,0 (2x1xx.)
0,11,x,0,x,x (.1x.xx)
6,9,x,x,x,0 (12xxx.)
0,x,x,0,x,6 (.xx.x1)
6,9,0,x,x,x (12.xxx)
0,x,x,2,x,4 (.xx1x2)
0,9,6,x,x,x (.21xxx)
4,x,0,x,x,6 (1x.xx2)
0,x,4,x,x,6 (.x1xx2)
0,x,6,x,x,4 (.x2xx1)
6,x,0,x,x,4 (2x.xx1)
0,x,x,0,11,x (.xx.1x)
0,x,6,x,9,x (.x1x2x)
6,x,0,x,9,x (1x.x2x)
6,x,x,x,9,0 (1xxx2.)
0,11,x,x,9,x (.2xx1x)
0,9,x,x,x,6 (.2xxx1)
0,x,x,x,9,6 (.xxx21)
0,9,x,x,11,x (.1xx2x)

Pikayhteenveto

  • Disb5-sointu sisältää nuotit: Dis, Fis♯, A
  • Open E flat-virityksessä on 413 asemaa käytettävissä
  • Kirjoitetaan myös: DisMb5, DisΔ-5
  • Jokainen kaavio näyttää sormien asennot Guitar:n otelaudalla

Usein Kysytyt Kysymykset

Mikä on Disb5-sointu Guitar:lla?

Disb5 on Dis b5-sointu. Se sisältää nuotit Dis, Fis♯, A. Guitar:lla Open E flat-virityksessä on 413 tapaa soittaa.

Kuinka soittaa Disb5 Guitar:lla?

Soittaaksesi Disb5 :lla Open E flat-virityksessä, käytä yhtä yllä näytetyistä 413 asemasta.

Mitä nuotteja Disb5-sointu sisältää?

Disb5-sointu sisältää nuotit: Dis, Fis♯, A.

Kuinka monella tavalla Disb5 voidaan soittaa Guitar:lla?

Open E flat-virityksessä on 413 asemaa soinnulle Disb5. Jokainen asema käyttää eri kohtaa otelaudalla: Dis, Fis♯, A.

Millä muilla nimillä Disb5 tunnetaan?

Disb5 tunnetaan myös nimellä DisMb5, DisΔ-5. Nämä ovat eri merkintätapoja samalle soinnulle: Dis, Fis♯, A.