Acordul Ab+7b9 la Mandolin — Diagramă și Taburi în Acordajul Modal D

Răspuns scurt: Ab+7b9 este un acord Ab +7b9 cu notele A♭, C, E, G♭, B♭♭. În acordajul Modal D există 366 poziții. Vedeți diagramele de mai jos.

Cunoscut și ca: Ab7♯5b9, Ab7+5b9

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Cum se cântă Ab+7b9 la Mandolin

Ab+7b9, Ab7♯5b9, Ab7+5b9

Note: A♭, C, E, G♭, B♭♭

7,11,7,7,7,9,7,10 (14111213)
9,11,7,7,7,7,7,10 (24111113)
7,11,10,7,7,9,7,7 (14311211)
7,11,7,7,7,9,10,7 (14111231)
7,11,7,10,9,7,7,7 (14132111)
7,11,7,7,9,7,10,7 (14112131)
7,11,10,7,9,7,7,7 (14312111)
7,11,7,7,9,7,7,10 (14112113)
9,11,7,10,7,7,7,7 (24131111)
9,11,10,7,7,7,7,7 (24311111)
9,11,7,7,7,7,10,7 (24111131)
7,11,7,10,7,9,7,7 (14131211)
x,11,7,7,9,7,10,7 (x4112131)
x,11,7,7,7,9,7,10 (x4111213)
x,11,7,10,7,9,7,7 (x4131211)
x,11,10,7,9,7,7,7 (x4312111)
x,11,10,7,7,9,7,7 (x4311211)
x,11,7,7,7,9,10,7 (x4111231)
x,11,7,10,9,7,7,7 (x4132111)
x,11,7,7,9,7,7,10 (x4112113)
x,x,x,6,3,0,2,4 (xxx42.13)
x,x,x,6,3,0,4,2 (xxx42.31)
x,x,x,6,0,3,4,2 (xxx4.231)
x,x,x,6,0,3,2,4 (xxx4.213)
7,11,7,7,7,9,10,x (1411123x)
9,11,7,7,7,7,10,x (2411113x)
7,11,7,10,7,9,7,x (1413121x)
7,11,10,7,7,9,7,x (1431121x)
7,11,7,10,9,7,7,x (1413211x)
7,11,10,7,9,7,7,x (1431211x)
9,11,7,10,7,7,7,x (2413111x)
7,11,7,7,9,7,10,x (1411213x)
9,11,10,7,7,7,7,x (2431111x)
7,11,7,7,x,9,10,7 (1411x231)
9,11,7,x,7,7,7,10 (241x1113)
7,11,x,7,7,9,7,10 (14x11213)
7,11,10,x,7,9,7,7 (143x1211)
7,11,7,10,x,9,7,7 (1413x211)
7,11,10,7,x,9,7,7 (1431x211)
7,11,7,x,7,9,7,10 (141x1213)
7,11,x,10,9,7,7,7 (14x32111)
7,11,10,x,9,7,7,7 (143x2111)
9,11,x,10,7,7,7,7 (24x31111)
9,11,10,x,7,7,7,7 (243x1111)
9,11,7,10,x,7,7,7 (2413x111)
9,11,10,7,x,7,7,7 (2431x111)
7,11,7,10,9,x,7,7 (14132x11)
7,11,10,7,9,x,7,7 (14312x11)
9,11,7,10,7,x,7,7 (24131x11)
9,11,10,7,7,x,7,7 (24311x11)
7,11,7,10,7,9,x,7 (141312x1)
7,11,10,7,7,9,x,7 (143112x1)
9,11,7,7,x,7,7,10 (2411x113)
7,11,x,10,7,9,7,7 (14x31211)
7,11,7,10,9,7,x,7 (141321x1)
7,11,10,7,9,7,x,7 (143121x1)
9,11,7,10,7,7,x,7 (241311x1)
9,11,10,7,7,7,x,7 (243111x1)
7,11,7,7,x,9,7,10 (1411x213)
9,11,7,7,7,x,10,7 (24111x31)
7,11,7,7,9,x,7,10 (14112x13)
7,11,7,7,9,x,10,7 (14112x31)
9,11,7,7,x,7,10,7 (2411x131)
9,11,7,7,7,x,7,10 (24111x13)
9,11,7,x,7,7,10,7 (241x1131)
9,11,x,7,7,7,10,7 (24x11131)
7,11,7,x,9,7,10,7 (141x2131)
7,11,x,7,9,7,10,7 (14x12131)
7,11,x,7,9,7,7,10 (14x12113)
7,11,7,7,7,9,x,10 (141112x3)
7,11,7,x,7,9,10,7 (141x1231)
7,11,x,7,7,9,10,7 (14x11231)
9,11,7,7,7,7,x,10 (241111x3)
7,11,7,7,9,7,x,10 (141121x3)
7,11,7,x,9,7,7,10 (141x2113)
9,11,x,7,7,7,7,10 (24x11113)
x,x,4,6,0,3,2,x (xx34.21x)
x,11,7,7,7,9,10,x (x411123x)
x,11,7,10,9,7,7,x (x413211x)
x,x,4,6,3,0,2,x (xx342.1x)
x,11,7,7,9,7,10,x (x411213x)
x,11,10,7,9,7,7,x (x431211x)
x,11,10,7,7,9,7,x (x431121x)
x,x,2,6,3,0,4,x (xx142.3x)
x,11,7,10,7,9,7,x (x413121x)
x,x,2,6,0,3,4,x (xx14.23x)
x,11,x,10,7,9,7,7 (x4x31211)
x,11,x,7,9,7,7,10 (x4x12113)
x,11,7,x,7,9,7,10 (x41x1213)
x,11,x,7,7,9,10,7 (x4x11231)
x,11,7,10,7,9,x,7 (x41312x1)
x,11,7,x,7,9,10,7 (x41x1231)
x,11,10,x,9,7,7,7 (x43x2111)
x,11,10,7,7,9,x,7 (x43112x1)
x,11,7,7,7,9,x,10 (x41112x3)
x,11,10,x,7,9,7,7 (x43x1211)
x,11,x,7,7,9,7,10 (x4x11213)
x,11,7,10,9,7,x,7 (x41321x1)
x,11,10,7,9,7,x,7 (x43121x1)
x,11,7,x,9,7,7,10 (x41x2113)
x,11,x,10,9,7,7,7 (x4x32111)
x,11,7,7,9,7,x,10 (x41121x3)
x,x,2,6,0,3,x,4 (xx14.2x3)
x,x,2,6,3,0,x,4 (xx142.x3)
x,11,7,x,9,7,10,7 (x41x2131)
x,11,x,7,9,7,10,7 (x4x12131)
x,x,4,6,0,3,x,2 (xx34.2x1)
x,x,4,6,3,0,x,2 (xx342.x1)
0,x,2,6,0,3,4,x (.x14.23x)
3,x,2,6,0,0,4,x (2x14..3x)
0,x,4,6,0,3,2,x (.x34.21x)
0,x,4,6,3,0,2,x (.x342.1x)
3,x,4,6,0,0,2,x (2x34..1x)
0,x,2,6,3,0,4,x (.x142.3x)
3,x,x,6,0,0,4,2 (2xx4..31)
0,x,4,6,0,3,x,2 (.x34.2x1)
0,x,2,6,0,3,x,4 (.x14.2x3)
0,x,4,6,3,0,x,2 (.x342.x1)
0,x,x,6,0,3,2,4 (.xx4.213)
3,x,4,6,0,0,x,2 (2x34..x1)
0,x,2,6,3,0,x,4 (.x142.x3)
3,x,2,6,0,0,x,4 (2x14..x3)
0,x,x,6,3,0,2,4 (.xx42.13)
3,x,x,6,0,0,2,4 (2xx4..13)
0,x,x,6,0,3,4,2 (.xx4.231)
0,x,x,6,3,0,4,2 (.xx42.31)
7,11,10,7,9,7,x,x (143121xx)
7,11,10,7,7,9,x,x (143112xx)
7,11,7,10,7,9,x,x (141312xx)
7,11,7,10,9,7,x,x (141321xx)
9,11,7,10,7,7,x,x (241311xx)
9,11,10,7,7,7,x,x (243111xx)
7,11,7,x,7,9,10,x (141x123x)
7,11,10,x,9,7,7,x (143x211x)
7,11,x,10,9,7,7,x (14x3211x)
7,11,x,7,7,9,10,x (14x1123x)
7,11,10,7,x,9,7,x (1431x21x)
7,11,7,10,x,9,7,x (1413x21x)
7,11,10,x,7,9,7,x (143x121x)
9,11,7,10,x,7,7,x (2413x11x)
7,11,x,10,7,9,7,x (14x3121x)
7,11,7,x,9,7,10,x (141x213x)
7,11,x,7,9,7,10,x (14x1213x)
7,11,7,7,x,9,10,x (1411x23x)
9,11,7,7,7,x,10,x (24111x3x)
7,11,7,7,9,x,10,x (14112x3x)
9,11,x,7,7,7,10,x (24x1113x)
9,11,10,7,7,x,7,x (24311x1x)
7,11,10,7,9,x,7,x (14312x1x)
7,11,7,10,9,x,7,x (14132x1x)
9,11,7,x,7,7,10,x (241x113x)
9,11,10,x,7,7,7,x (243x111x)
9,11,x,10,7,7,7,x (24x3111x)
9,11,10,7,x,7,7,x (2431x11x)
9,11,7,10,7,x,7,x (24131x1x)
9,11,7,7,x,7,10,x (2411x13x)
9,11,7,x,7,7,x,10 (241x11x3)
9,11,7,x,7,x,10,7 (241x1x31)
9,11,x,7,7,7,x,10 (24x111x3)
9,11,7,x,7,x,7,10 (241x1x13)
7,11,x,x,9,7,10,7 (14xx2131)
9,11,x,x,7,7,7,10 (24xx1113)
9,11,7,7,x,7,x,10 (2411x1x3)
7,11,x,10,x,9,7,7 (14x3x211)
7,11,7,x,x,9,7,10 (141xx213)
9,11,x,7,7,x,7,10 (24x11x13)
7,11,7,x,9,7,x,10 (141x21x3)
7,11,10,x,x,9,7,7 (143xx211)
7,11,7,x,x,9,10,7 (141xx231)
9,11,x,x,7,7,10,7 (24xx1131)
7,11,7,x,9,x,7,10 (141x2x13)
9,11,x,7,x,7,10,7 (24x1x131)
9,11,7,x,x,7,10,7 (241xx131)
7,11,x,7,9,x,7,10 (14x12x13)
7,11,x,7,9,7,x,10 (14x121x3)
7,11,x,x,9,7,7,10 (14xx2113)
7,11,x,x,7,9,7,10 (14xx1213)
7,11,x,7,9,x,10,7 (14x12x31)
7,11,x,7,x,9,7,10 (14x1x213)
7,11,x,7,7,9,x,10 (14x112x3)
9,11,10,7,7,x,x,7 (24311xx1)
7,11,7,x,9,x,10,7 (141x2x31)
9,11,7,10,7,x,x,7 (24131xx1)
7,11,x,7,x,9,10,7 (14x1x231)
7,11,10,7,9,x,x,7 (14312xx1)
9,11,x,7,7,x,10,7 (24x11x31)
7,11,7,10,9,x,x,7 (14132xx1)
7,11,7,7,9,x,x,10 (14112xx3)
9,11,10,7,x,7,x,7 (2431x1x1)
7,11,7,7,x,9,x,10 (1411x2x3)
9,11,7,10,x,7,x,7 (2413x1x1)
9,11,10,x,7,7,x,7 (243x11x1)
9,11,7,x,x,7,7,10 (241xx113)
9,11,x,10,7,7,x,7 (24x311x1)
9,11,7,7,7,x,x,10 (24111xx3)
9,11,x,10,x,7,7,7 (24x3x111)
7,11,10,x,9,7,x,7 (143x21x1)
9,11,10,x,x,7,7,7 (243xx111)
9,11,x,7,x,7,7,10 (24x1x113)
7,11,7,x,7,9,x,10 (141x12x3)
7,11,x,10,9,7,x,7 (14x321x1)
7,11,x,10,9,x,7,7 (14x32x11)
7,11,10,x,9,x,7,7 (143x2x11)
9,11,x,10,7,x,7,7 (24x31x11)
7,11,10,7,x,9,x,7 (1431x2x1)
9,11,10,x,7,x,7,7 (243x1x11)
7,11,7,10,x,9,x,7 (1413x2x1)
7,11,x,10,7,9,x,7 (14x312x1)
7,11,10,x,7,9,x,7 (143x12x1)
7,11,x,x,7,9,10,7 (14xx1231)
x,11,10,7,7,9,x,x (x43112xx)
x,11,7,10,7,9,x,x (x41312xx)
x,11,7,10,9,7,x,x (x41321xx)
x,11,10,7,9,7,x,x (x43121xx)
x,11,7,x,7,9,10,x (x41x123x)
x,11,x,10,7,9,7,x (x4x3121x)
x,11,10,x,9,7,7,x (x43x211x)
x,11,x,7,9,7,10,x (x4x1213x)
x,11,x,7,7,9,10,x (x4x1123x)
x,11,x,10,9,7,7,x (x4x3211x)
x,11,10,x,7,9,7,x (x43x121x)
x,11,7,x,9,7,10,x (x41x213x)
x,11,x,x,7,9,7,10 (x4xx1213)
x,11,x,10,9,7,x,7 (x4x321x1)
x,11,7,x,9,7,x,10 (x41x21x3)
x,11,10,x,9,7,x,7 (x43x21x1)
x,11,x,x,9,7,7,10 (x4xx2113)
x,11,x,7,7,9,x,10 (x4x112x3)
x,11,10,x,7,9,x,7 (x43x12x1)
x,11,x,10,7,9,x,7 (x4x312x1)
x,11,x,x,9,7,10,7 (x4xx2131)
x,11,x,7,9,7,x,10 (x4x121x3)
x,11,7,x,7,9,x,10 (x41x12x3)
x,11,x,x,7,9,10,7 (x4xx1231)
7,x,4,6,3,0,x,x (4x231.xx)
3,x,4,6,7,0,x,x (1x234.xx)
0,x,4,6,3,7,x,x (.x2314xx)
3,x,4,6,0,7,x,x (1x23.4xx)
7,x,4,6,0,3,x,x (4x23.1xx)
0,x,4,6,7,3,x,x (.x2341xx)
3,x,4,6,x,0,2,x (2x34x.1x)
0,x,4,6,3,x,2,x (.x342x1x)
3,x,4,6,0,x,2,x (2x34.x1x)
0,x,2,6,x,3,4,x (.x14x23x)
0,x,4,6,x,3,2,x (.x34x21x)
0,x,2,6,3,x,4,x (.x142x3x)
3,x,2,6,0,x,4,x (2x14.x3x)
3,x,2,6,x,0,4,x (2x14x.3x)
7,11,7,10,9,x,x,x (14132xxx)
9,11,10,7,7,x,x,x (24311xxx)
7,11,10,7,9,x,x,x (14312xxx)
9,11,7,10,7,x,x,x (24131xxx)
9,x,10,6,7,0,x,x (3x412.xx)
7,x,x,6,3,0,4,x (4xx31.2x)
3,x,x,6,7,0,4,x (1xx34.2x)
7,x,x,6,0,3,4,x (4xx3.12x)
0,x,x,6,7,3,4,x (.xx3412x)
3,x,x,6,0,7,4,x (1xx3.42x)
0,x,x,6,3,7,4,x (.xx3142x)
7,x,10,6,9,0,x,x (2x413.xx)
0,x,x,6,x,3,4,2 (.xx4x231)
3,x,x,6,x,0,4,2 (2xx4x.31)
3,x,x,6,0,x,4,2 (2xx4.x31)
0,x,4,6,x,3,x,2 (.x34x2x1)
3,x,4,6,x,0,x,2 (2x34x.x1)
0,x,4,6,3,x,x,2 (.x342xx1)
3,x,x,6,x,0,2,4 (2xx4x.13)
3,x,x,6,0,x,2,4 (2xx4.x13)
0,x,x,6,3,x,2,4 (.xx42x13)
0,x,2,6,x,3,x,4 (.x14x2x3)
3,x,2,6,x,0,x,4 (2x14x.x3)
0,x,2,6,3,x,x,4 (.x142xx3)
0,x,x,6,3,x,4,2 (.xx42x31)
3,x,2,6,0,x,x,4 (2x14.xx3)
0,x,x,6,x,3,2,4 (.xx4x213)
3,x,4,6,0,x,x,2 (2x34.xx1)
7,11,7,10,x,9,x,x (1413x2xx)
9,11,10,7,x,7,x,x (2431x1xx)
9,11,7,10,x,7,x,x (2413x1xx)
7,11,x,10,9,0,x,x (14x32.xx)
7,11,10,7,x,9,x,x (1431x2xx)
7,11,10,x,9,0,x,x (143x2.xx)
9,11,x,10,7,0,x,x (24x31.xx)
9,11,10,x,7,0,x,x (243x1.xx)
3,x,x,6,7,0,x,4 (1xx34.x2)
7,x,x,6,3,0,x,4 (4xx31.x2)
9,x,10,6,0,7,x,x (3x41.2xx)
0,x,x,6,3,7,x,4 (.xx314x2)
3,x,x,6,0,7,x,4 (1xx3.4x2)
0,x,x,6,7,3,x,4 (.xx341x2)
7,x,x,6,0,3,x,4 (4xx3.1x2)
0,x,10,6,9,7,x,x (.x4132xx)
7,x,10,6,0,9,x,x (2x41.3xx)
0,x,10,6,7,9,x,x (.x4123xx)
9,11,7,x,x,7,10,x (241xx13x)
0,11,10,x,9,7,x,x (.43x21xx)
9,11,10,x,0,7,x,x (243x.1xx)
9,11,x,10,0,7,x,x (24x3.1xx)
9,11,7,x,7,x,10,x (241x1x3x)
7,11,x,10,x,9,7,x (14x3x21x)
7,11,10,x,x,9,7,x (143xx21x)
9,11,x,10,x,7,7,x (24x3x11x)
9,11,10,x,x,7,7,x (243xx11x)
7,11,x,10,9,x,7,x (14x32x1x)
7,11,10,x,9,x,7,x (143x2x1x)
9,11,x,10,7,x,7,x (24x31x1x)
9,11,10,x,7,x,7,x (243x1x1x)
9,11,x,7,x,7,10,x (24x1x13x)
7,11,x,7,x,9,10,x (14x1x23x)
7,11,7,x,x,9,10,x (141xx23x)
0,11,x,10,9,7,x,x (.4x321xx)
7,11,10,x,0,9,x,x (143x.2xx)
7,11,x,7,9,x,10,x (14x12x3x)
0,11,x,10,7,9,x,x (.4x312xx)
7,11,7,x,9,x,10,x (141x2x3x)
0,11,10,x,7,9,x,x (.43x12xx)
7,11,x,10,0,9,x,x (14x3.2xx)
9,11,x,7,7,x,10,x (24x11x3x)
9,x,x,6,7,0,10,x (3xx12.4x)
7,x,x,6,9,0,10,x (2xx13.4x)
9,x,x,6,0,7,10,x (3xx1.24x)
0,x,x,6,9,7,10,x (.xx1324x)
7,x,x,6,0,9,10,x (2xx1.34x)
0,x,x,6,7,9,10,x (.xx1234x)
7,11,x,10,x,9,x,7 (14x3x2x1)
7,11,x,x,x,9,7,10 (14xxx213)
9,11,x,x,7,x,10,7 (24xx1x31)
9,11,7,x,x,7,x,10 (241xx1x3)
9,11,x,7,x,7,x,10 (24x1x1x3)
9,11,10,x,x,7,x,7 (243xx1x1)
9,11,x,x,7,x,7,10 (24xx1x13)
7,11,x,10,9,x,x,7 (14x32xx1)
0,11,x,x,7,9,10,x (.4xx123x)
9,11,x,x,0,7,10,x (24xx.13x)
7,11,x,x,9,x,7,10 (14xx2x13)
7,11,10,x,9,x,x,7 (143x2xx1)
7,11,x,x,0,9,10,x (14xx.23x)
7,11,10,x,x,9,x,7 (143xx2x1)
9,11,x,x,x,7,7,10 (24xxx113)
7,11,x,x,9,x,10,7 (14xx2x31)
7,11,x,x,9,0,10,x (14xx2.3x)
9,11,x,10,7,x,x,7 (24x31xx1)
9,11,7,x,7,x,x,10 (241x1xx3)
9,11,x,x,7,0,10,x (24xx1.3x)
9,11,x,7,7,x,x,10 (24x11xx3)
7,11,x,x,x,9,10,7 (14xxx231)
7,11,7,x,x,9,x,10 (141xx2x3)
7,11,x,7,x,9,x,10 (14x1x2x3)
7,11,7,x,9,x,x,10 (141x2xx3)
7,11,x,7,9,x,x,10 (14x12xx3)
0,11,x,x,9,7,10,x (.4xx213x)
9,11,10,x,7,x,x,7 (243x1xx1)
9,11,x,10,x,7,x,7 (24x3x1x1)
9,11,x,x,x,7,10,7 (24xxx131)
0,x,x,6,7,9,x,10 (.xx123x4)
7,x,x,6,0,9,x,10 (2xx1.3x4)
0,x,x,6,9,7,x,10 (.xx132x4)
9,x,x,6,0,7,x,10 (3xx1.2x4)
7,x,x,6,9,0,x,10 (2xx13.x4)
9,x,x,6,7,0,x,10 (3xx12.x4)
0,11,x,x,7,9,x,10 (.4xx12x3)
0,11,x,x,9,7,x,10 (.4xx21x3)
7,11,x,x,9,0,x,10 (14xx2.x3)
7,11,x,x,0,9,x,10 (14xx.2x3)
9,11,x,x,7,0,x,10 (24xx1.x3)
9,11,x,x,0,7,x,10 (24xx.1x3)

Rezumat Rapid

  • Acordul Ab+7b9 conține notele: A♭, C, E, G♭, B♭♭
  • În acordajul Modal D sunt disponibile 366 poziții
  • Se scrie și: Ab7♯5b9, Ab7+5b9
  • Fiecare diagramă arată pozițiile degetelor pe griful Mandolin

Întrebări Frecvente

Ce este acordul Ab+7b9 la Mandolin?

Ab+7b9 este un acord Ab +7b9. Conține notele A♭, C, E, G♭, B♭♭. La Mandolin în acordajul Modal D există 366 moduri de a cânta.

Cum se cântă Ab+7b9 la Mandolin?

Pentru a cânta Ab+7b9 la în acordajul Modal D, utilizați una din cele 366 poziții afișate mai sus.

Ce note conține acordul Ab+7b9?

Acordul Ab+7b9 conține notele: A♭, C, E, G♭, B♭♭.

În câte moduri se poate cânta Ab+7b9 la Mandolin?

În acordajul Modal D există 366 poziții pentru Ab+7b9. Fiecare poziție utilizează un loc diferit pe grif: A♭, C, E, G♭, B♭♭.

Ce alte denumiri are Ab+7b9?

Ab+7b9 este cunoscut și ca Ab7♯5b9, Ab7+5b9. Acestea sunt notații diferite pentru același acord: A♭, C, E, G♭, B♭♭.