B7b13 Mandolin-akkoord — Diagram en Tabs in Modal D-stemming

Kort antwoord: B7b13 is een B 7b13-akkoord met de noten B, D♯, F♯, A, G. In Modal D-stemming zijn er 276 posities. Zie de diagrammen hieronder.

Ook bekend als: B7-13

Piano-akkoordenInstrumentenStemmingen

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Hoe speel je B7b13 op Mandolin

B7b13, B7-13

Noten: B, D♯, F♯, A, G

0,2,4,1,0,0,5,x (.231..4x)
0,2,5,4,0,0,1,x (.243..1x)
0,2,4,5,0,0,1,x (.234..1x)
0,2,5,1,0,0,4,x (.241..3x)
0,2,1,5,0,0,4,x (.214..3x)
0,2,1,4,0,0,5,x (.213..4x)
0,2,1,x,0,0,5,4 (.21x..43)
0,2,1,4,0,0,x,5 (.213..x4)
0,2,4,x,0,0,5,1 (.23x..41)
0,2,x,5,0,0,4,1 (.2x4..31)
0,2,4,5,0,0,x,1 (.234..x1)
0,2,5,4,0,0,x,1 (.243..x1)
0,2,x,1,0,0,4,5 (.2x1..34)
0,2,1,x,0,0,4,5 (.21x..34)
0,2,5,1,0,0,x,4 (.241..x3)
0,2,x,1,0,0,5,4 (.2x1..43)
0,2,x,5,0,0,1,4 (.2x4..13)
0,2,1,5,0,0,x,4 (.214..x3)
0,2,5,x,0,0,1,4 (.24x..13)
0,2,4,1,0,0,x,5 (.231..x4)
0,2,x,4,0,0,1,5 (.2x3..14)
0,2,4,x,0,0,1,5 (.23x..14)
0,2,5,x,0,0,4,1 (.24x..31)
0,2,x,4,0,0,5,1 (.2x3..41)
x,2,4,1,0,0,5,x (x231..4x)
x,2,4,5,0,0,1,x (x234..1x)
x,2,1,5,0,0,4,x (x214..3x)
x,2,1,4,0,0,5,x (x213..4x)
x,2,5,4,0,0,1,x (x243..1x)
x,2,5,1,0,0,4,x (x241..3x)
x,2,x,5,0,0,4,1 (x2x4..31)
x,2,x,1,0,0,5,4 (x2x1..43)
x,2,5,x,0,0,4,1 (x24x..31)
x,2,1,5,0,0,x,4 (x214..x3)
x,2,x,5,0,0,1,4 (x2x4..13)
x,2,1,x,0,0,4,5 (x21x..34)
x,2,x,1,0,0,4,5 (x2x1..34)
x,2,5,x,0,0,1,4 (x24x..13)
x,2,4,5,0,0,x,1 (x234..x1)
x,2,4,1,0,0,x,5 (x231..x4)
x,2,4,x,0,0,5,1 (x23x..41)
x,2,x,4,0,0,1,5 (x2x3..14)
x,2,5,4,0,0,x,1 (x243..x1)
x,2,5,1,0,0,x,4 (x241..x3)
x,2,1,x,0,0,5,4 (x21x..43)
x,2,4,x,0,0,1,5 (x23x..14)
x,2,1,4,0,0,x,5 (x213..x4)
x,2,x,4,0,0,5,1 (x2x3..41)
6,2,5,4,0,0,x,x (4132..xx)
6,2,4,5,0,0,x,x (4123..xx)
0,2,5,4,6,0,x,x (.1324.xx)
0,2,4,5,6,0,x,x (.1234.xx)
0,2,4,5,0,6,x,x (.123.4xx)
0,2,5,4,0,6,x,x (.132.4xx)
0,2,1,5,x,0,4,x (.214x.3x)
0,2,5,1,x,0,4,x (.241x.3x)
0,2,1,5,0,x,4,x (.214.x3x)
0,2,4,1,x,0,5,x (.231x.4x)
0,2,4,5,x,0,1,x (.234x.1x)
0,2,5,4,x,0,1,x (.243x.1x)
0,2,4,5,0,x,1,x (.234.x1x)
0,2,5,4,0,x,1,x (.243.x1x)
0,2,4,1,0,x,5,x (.231.x4x)
0,2,1,4,x,0,5,x (.213x.4x)
0,2,1,4,0,x,5,x (.213.x4x)
0,2,5,1,0,x,4,x (.241.x3x)
0,2,4,x,6,0,5,x (.12x4.3x)
0,2,x,5,0,6,4,x (.1x3.42x)
0,2,x,4,6,0,5,x (.1x24.3x)
0,2,5,x,0,6,4,x (.13x.42x)
0,2,4,x,0,6,5,x (.12x.43x)
0,2,x,4,0,6,5,x (.1x2.43x)
0,2,x,5,6,0,4,x (.1x34.2x)
0,2,5,x,6,0,4,x (.13x4.2x)
6,2,4,x,0,0,5,x (412x..3x)
6,2,5,x,0,0,4,x (413x..2x)
6,2,x,4,0,0,5,x (41x2..3x)
6,2,x,5,0,0,4,x (41x3..2x)
0,2,x,4,0,x,1,5 (.2x3.x14)
0,2,4,5,x,0,x,1 (.234x.x1)
0,2,1,x,x,0,4,5 (.21xx.34)
0,2,1,4,0,x,x,5 (.213.xx4)
0,2,4,x,0,x,1,5 (.23x.x14)
0,2,x,5,0,x,1,4 (.2x4.x13)
0,2,x,1,0,x,4,5 (.2x1.x34)
0,2,5,4,0,x,x,1 (.243.xx1)
0,2,4,5,0,x,x,1 (.234.xx1)
0,2,x,4,x,0,1,5 (.2x3x.14)
0,2,5,4,x,0,x,1 (.243x.x1)
0,2,5,x,0,x,1,4 (.24x.x13)
0,2,4,x,x,0,1,5 (.23xx.14)
0,2,1,4,x,0,x,5 (.213x.x4)
0,2,x,1,0,x,5,4 (.2x1.x43)
0,2,4,1,0,x,x,5 (.231.xx4)
0,2,1,5,x,0,x,4 (.214x.x3)
0,2,5,x,0,x,4,1 (.24x.x31)
0,2,5,1,x,0,x,4 (.241x.x3)
0,2,x,5,0,x,4,1 (.2x4.x31)
0,2,1,x,0,x,4,5 (.21x.x34)
0,2,5,x,x,0,4,1 (.24xx.31)
0,2,1,x,0,x,5,4 (.21x.x43)
0,2,x,5,x,0,4,1 (.2x4x.31)
0,2,4,1,x,0,x,5 (.231x.x4)
x,2,4,5,6,0,x,x (x1234.xx)
0,2,x,5,x,0,1,4 (.2x4x.13)
0,2,x,1,x,0,4,5 (.2x1x.34)
0,2,1,5,0,x,x,4 (.214.xx3)
0,2,4,x,0,x,5,1 (.23x.x41)
0,2,5,1,0,x,x,4 (.241.xx3)
0,2,x,4,0,x,5,1 (.2x3.x41)
0,2,4,x,x,0,5,1 (.23xx.41)
x,2,5,4,6,0,x,x (x1324.xx)
0,2,x,4,x,0,5,1 (.2x3x.41)
0,2,x,1,x,0,5,4 (.2x1x.43)
0,2,1,x,x,0,5,4 (.21xx.43)
0,2,5,x,x,0,1,4 (.24xx.13)
0,2,x,5,6,0,x,4 (.1x34.x2)
6,2,5,x,0,0,x,4 (413x..x2)
6,2,x,x,0,0,4,5 (41xx..23)
0,2,5,x,6,0,x,4 (.13x4.x2)
0,2,x,x,0,6,4,5 (.1xx.423)
0,2,4,x,0,6,x,5 (.12x.4x3)
6,2,4,x,0,0,x,5 (412x..x3)
0,2,4,x,6,0,x,5 (.12x4.x3)
0,2,x,4,0,6,x,5 (.1x2.4x3)
0,2,5,x,0,6,x,4 (.13x.4x2)
6,2,x,4,0,0,x,5 (41x2..x3)
0,2,x,4,6,0,x,5 (.1x24.x3)
0,2,x,5,0,6,x,4 (.1x3.4x2)
6,2,x,x,0,0,5,4 (41xx..32)
6,2,x,5,0,0,x,4 (41x3..x2)
0,2,x,x,6,0,4,5 (.1xx4.23)
0,2,x,x,0,6,5,4 (.1xx.432)
0,2,x,x,6,0,5,4 (.1xx4.32)
x,2,5,4,0,6,x,x (x132.4xx)
x,2,4,5,0,6,x,x (x123.4xx)
x,2,5,4,0,x,1,x (x243.x1x)
x,2,4,5,0,x,1,x (x234.x1x)
x,2,5,4,x,0,1,x (x243x.1x)
x,2,4,5,x,0,1,x (x234x.1x)
x,2,5,1,0,x,4,x (x241.x3x)
x,2,1,5,0,x,4,x (x214.x3x)
x,2,1,4,x,0,5,x (x213x.4x)
x,2,4,1,x,0,5,x (x231x.4x)
x,2,1,4,0,x,5,x (x213.x4x)
x,2,4,1,0,x,5,x (x231.x4x)
x,2,1,5,x,0,4,x (x214x.3x)
x,2,5,1,x,0,4,x (x241x.3x)
x,2,x,4,6,0,5,x (x1x24.3x)
x,2,x,4,0,6,5,x (x1x2.43x)
x,2,x,5,0,6,4,x (x1x3.42x)
x,2,5,x,0,6,4,x (x13x.42x)
x,2,x,5,6,0,4,x (x1x34.2x)
x,2,5,x,6,0,4,x (x13x4.2x)
x,2,4,x,6,0,5,x (x12x4.3x)
x,2,4,x,0,6,5,x (x12x.43x)
x,2,x,4,x,0,1,5 (x2x3x.14)
x,2,x,4,x,0,5,1 (x2x3x.41)
x,2,5,1,0,x,x,4 (x241.xx3)
x,2,x,5,x,0,4,1 (x2x4x.31)
x,2,x,4,0,x,1,5 (x2x3.x14)
x,2,5,x,x,0,4,1 (x24xx.31)
x,2,x,1,x,0,4,5 (x2x1x.34)
x,2,5,1,x,0,x,4 (x241x.x3)
x,2,x,1,x,0,5,4 (x2x1x.43)
x,2,x,5,0,x,4,1 (x2x4.x31)
x,2,4,x,x,0,1,5 (x23xx.14)
x,2,5,x,0,x,4,1 (x24x.x31)
x,2,5,x,0,x,1,4 (x24x.x13)
x,2,4,x,x,0,5,1 (x23xx.41)
x,2,x,5,0,x,1,4 (x2x4.x13)
x,2,1,5,x,0,x,4 (x214x.x3)
x,2,5,x,x,0,1,4 (x24xx.13)
x,2,x,4,0,x,5,1 (x2x3.x41)
x,2,x,5,x,0,1,4 (x2x4x.13)
x,2,4,x,0,x,5,1 (x23x.x41)
x,2,4,5,x,0,x,1 (x234x.x1)
x,2,1,x,0,x,4,5 (x21x.x34)
x,2,5,4,x,0,x,1 (x243x.x1)
x,2,4,5,0,x,x,1 (x234.xx1)
x,2,1,4,x,0,x,5 (x213x.x4)
x,2,5,4,0,x,x,1 (x243.xx1)
x,2,4,1,x,0,x,5 (x231x.x4)
x,2,1,x,0,x,5,4 (x21x.x43)
x,2,x,1,0,x,4,5 (x2x1.x34)
x,2,x,1,0,x,5,4 (x2x1.x43)
x,2,4,x,0,x,1,5 (x23x.x14)
x,2,1,x,x,0,4,5 (x21xx.34)
x,2,1,4,0,x,x,5 (x213.xx4)
x,2,1,x,x,0,5,4 (x21xx.43)
x,2,1,5,0,x,x,4 (x214.xx3)
x,2,4,1,0,x,x,5 (x231.xx4)
x,2,x,5,0,6,x,4 (x1x3.4x2)
x,2,x,5,6,0,x,4 (x1x34.x2)
x,2,5,x,6,0,x,4 (x13x4.x2)
x,2,x,x,0,6,4,5 (x1xx.423)
x,2,x,4,0,6,x,5 (x1x2.4x3)
x,2,5,x,0,6,x,4 (x13x.4x2)
x,2,x,x,6,0,5,4 (x1xx4.32)
x,2,4,x,0,6,x,5 (x12x.4x3)
x,2,x,4,6,0,x,5 (x1x24.x3)
x,2,x,x,0,6,5,4 (x1xx.432)
x,2,x,x,6,0,4,5 (x1xx4.23)
x,2,4,x,6,0,x,5 (x12x4.x3)
6,2,5,4,x,0,x,x (4132x.xx)
6,2,4,5,x,0,x,x (4123x.xx)
6,2,4,5,0,x,x,x (4123.xxx)
6,2,5,4,0,x,x,x (4132.xxx)
0,2,4,5,6,x,x,x (.1234xxx)
0,2,5,4,6,x,x,x (.1324xxx)
0,2,5,4,x,6,x,x (.132x4xx)
0,2,4,5,x,6,x,x (.123x4xx)
0,2,4,5,x,x,1,x (.234xx1x)
0,2,1,4,x,x,5,x (.213xx4x)
0,2,5,1,x,x,4,x (.241xx3x)
0,2,1,5,x,x,4,x (.214xx3x)
0,2,5,4,x,x,1,x (.243xx1x)
0,2,4,1,x,x,5,x (.231xx4x)
6,2,5,x,x,0,4,x (413xx.2x)
0,2,5,x,6,x,4,x (.13x4x2x)
0,2,x,5,6,x,4,x (.1x34x2x)
6,2,4,x,0,x,5,x (412x.x3x)
6,2,x,5,x,0,4,x (41x3x.2x)
0,2,5,x,x,6,4,x (.13xx42x)
0,2,x,5,x,6,4,x (.1x3x42x)
6,2,5,x,0,x,4,x (413x.x2x)
6,2,x,5,0,x,4,x (41x3.x2x)
0,2,x,4,x,6,5,x (.1x2x43x)
0,2,4,x,x,6,5,x (.12xx43x)
6,2,x,4,x,0,5,x (41x2x.3x)
6,2,4,x,x,0,5,x (412xx.3x)
0,2,x,4,6,x,5,x (.1x24x3x)
0,2,4,x,6,x,5,x (.12x4x3x)
6,2,x,4,0,x,5,x (41x2.x3x)
0,2,5,4,x,x,x,1 (.243xxx1)
0,2,x,4,x,x,5,1 (.2x3xx41)
0,2,4,x,x,x,5,1 (.23xxx41)
0,2,x,5,x,x,4,1 (.2x4xx31)
0,2,5,x,x,x,4,1 (.24xxx31)
0,2,4,x,x,x,1,5 (.23xxx14)
0,2,x,4,x,x,1,5 (.2x3xx14)
0,2,4,5,x,x,x,1 (.234xxx1)
0,2,1,4,x,x,x,5 (.213xxx4)
0,2,1,x,x,x,5,4 (.21xxx43)
0,2,x,5,x,x,1,4 (.2x4xx13)
0,2,5,x,x,x,1,4 (.24xxx13)
0,2,4,1,x,x,x,5 (.231xxx4)
0,2,x,1,x,x,4,5 (.2x1xx34)
0,2,1,5,x,x,x,4 (.214xxx3)
0,2,1,x,x,x,4,5 (.21xxx34)
0,2,x,1,x,x,5,4 (.2x1xx43)
0,2,5,1,x,x,x,4 (.241xxx3)
6,2,4,x,0,x,x,5 (412x.xx3)
0,2,4,x,x,6,x,5 (.12xx4x3)
6,2,5,x,0,x,x,4 (413x.xx2)
6,2,x,x,0,x,4,5 (41xx.x23)
6,2,x,5,0,x,x,4 (41x3.xx2)
0,2,5,x,6,x,x,4 (.13x4xx2)
0,2,x,5,6,x,x,4 (.1x34xx2)
6,2,5,x,x,0,x,4 (413xx.x2)
0,2,x,x,6,x,4,5 (.1xx4x23)
6,2,x,x,x,0,4,5 (41xxx.23)
6,2,x,5,x,0,x,4 (41x3x.x2)
0,2,x,4,x,6,x,5 (.1x2x4x3)
0,2,x,5,x,6,x,4 (.1x3x4x2)
6,2,x,4,x,0,x,5 (41x2x.x3)
6,2,x,x,0,x,5,4 (41xx.x32)
6,2,4,x,x,0,x,5 (412xx.x3)
0,2,x,4,6,x,x,5 (.1x24xx3)
0,2,4,x,6,x,x,5 (.12x4xx3)
0,2,x,x,6,x,5,4 (.1xx4x32)
6,2,x,x,x,0,5,4 (41xxx.32)
6,2,x,4,0,x,x,5 (41x2.xx3)
0,2,x,x,x,6,4,5 (.1xxx423)
0,2,x,x,x,6,5,4 (.1xxx432)
0,2,5,x,x,6,x,4 (.13xx4x2)

Snel Overzicht

  • Het B7b13-akkoord bevat de noten: B, D♯, F♯, A, G
  • In Modal D-stemming zijn er 276 posities beschikbaar
  • Ook geschreven als: B7-13
  • Elk diagram toont de vingerposities op de Mandolin-hals

Veelgestelde Vragen

Wat is het B7b13-akkoord op Mandolin?

B7b13 is een B 7b13-akkoord. Het bevat de noten B, D♯, F♯, A, G. Op Mandolin in Modal D-stemming zijn er 276 manieren om te spelen.

Hoe speel je B7b13 op Mandolin?

Om B7b13 te spelen op in Modal D-stemming, gebruik een van de 276 posities hierboven.

Welke noten zitten in het B7b13-akkoord?

Het B7b13-akkoord bevat de noten: B, D♯, F♯, A, G.

Op hoeveel manieren kun je B7b13 spelen op Mandolin?

In Modal D-stemming zijn er 276 posities voor B7b13. Elke positie gebruikt een andere plek op de hals: B, D♯, F♯, A, G.

Welke andere namen heeft B7b13?

B7b13 staat ook bekend als B7-13. Dit zijn verschillende notaties voor hetzelfde akkoord: B, D♯, F♯, A, G.