Akord As+M7b9 na Mandolin — Diagram i Tabulatura w Stroju Modal D

Krótka odpowiedź: As+M7b9 to akord As +M7b9 z nutami As, C, E, G, B♭. W stroju Modal D jest 366 pozycji. Zobacz diagramy poniżej.

Znany również jako: As+Δb9, AsM7♯5b9, AsM7+5b9, AsΔ♯5b9, AsΔ+5b9

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Jak grać As+M7b9 na Mandolin

As+M7b9, As+Δb9, AsM7♯5b9, AsM7+5b9, AsΔ♯5b9, AsΔ+5b9

Nuty: As, C, E, G, B♭

7,11,7,7,7,10,7,10 (14111213)
10,11,7,7,7,7,7,10 (24111113)
7,11,10,7,7,10,7,7 (14211311)
7,11,7,7,7,10,10,7 (14111231)
7,11,7,10,10,7,7,7 (14123111)
7,11,7,7,10,7,10,7 (14112131)
7,11,10,7,10,7,7,7 (14213111)
7,11,7,7,10,7,7,10 (14112113)
10,11,7,10,7,7,7,7 (24131111)
10,11,10,7,7,7,7,7 (24311111)
10,11,7,7,7,7,10,7 (24111131)
7,11,7,10,7,10,7,7 (14121311)
x,11,7,7,10,7,10,7 (x4112131)
x,11,7,7,7,10,7,10 (x4111213)
x,11,7,10,7,10,7,7 (x4121311)
x,11,10,7,10,7,7,7 (x4213111)
x,11,10,7,7,10,7,7 (x4211311)
x,11,7,7,7,10,10,7 (x4111231)
x,11,7,10,10,7,7,7 (x4123111)
x,11,7,7,10,7,7,10 (x4112113)
x,x,x,6,3,0,2,5 (xxx42.13)
x,x,x,6,3,0,5,2 (xxx42.31)
x,x,x,6,0,3,5,2 (xxx4.231)
x,x,x,6,0,3,2,5 (xxx4.213)
7,11,7,7,7,10,10,x (1411123x)
10,11,7,7,7,7,10,x (2411113x)
7,11,7,10,7,10,7,x (1412131x)
7,11,10,7,7,10,7,x (1421131x)
7,11,7,10,10,7,7,x (1412311x)
7,11,10,7,10,7,7,x (1421311x)
10,11,7,10,7,7,7,x (2413111x)
7,11,7,7,10,7,10,x (1411213x)
10,11,10,7,7,7,7,x (2431111x)
7,11,7,7,x,10,10,7 (1411x231)
10,11,7,x,7,7,7,10 (241x1113)
7,11,x,7,7,10,7,10 (14x11213)
7,11,10,x,7,10,7,7 (142x1311)
7,11,7,10,x,10,7,7 (1412x311)
7,11,10,7,x,10,7,7 (1421x311)
7,11,7,x,7,10,7,10 (141x1213)
7,11,x,10,10,7,7,7 (14x23111)
7,11,10,x,10,7,7,7 (142x3111)
10,11,x,10,7,7,7,7 (24x31111)
10,11,10,x,7,7,7,7 (243x1111)
10,11,7,10,x,7,7,7 (2413x111)
10,11,10,7,x,7,7,7 (2431x111)
7,11,7,10,10,x,7,7 (14123x11)
7,11,10,7,10,x,7,7 (14213x11)
10,11,7,10,7,x,7,7 (24131x11)
10,11,10,7,7,x,7,7 (24311x11)
7,11,7,10,7,10,x,7 (141213x1)
7,11,10,7,7,10,x,7 (142113x1)
10,11,7,7,x,7,7,10 (2411x113)
7,11,x,10,7,10,7,7 (14x21311)
7,11,7,10,10,7,x,7 (141231x1)
7,11,10,7,10,7,x,7 (142131x1)
10,11,7,10,7,7,x,7 (241311x1)
10,11,10,7,7,7,x,7 (243111x1)
7,11,7,7,x,10,7,10 (1411x213)
10,11,7,7,7,x,10,7 (24111x31)
7,11,7,7,10,x,7,10 (14112x13)
7,11,7,7,10,x,10,7 (14112x31)
10,11,7,7,x,7,10,7 (2411x131)
10,11,7,7,7,x,7,10 (24111x13)
10,11,7,x,7,7,10,7 (241x1131)
10,11,x,7,7,7,10,7 (24x11131)
7,11,7,x,10,7,10,7 (141x2131)
7,11,x,7,10,7,10,7 (14x12131)
7,11,x,7,10,7,7,10 (14x12113)
7,11,7,7,7,10,x,10 (141112x3)
7,11,7,x,7,10,10,7 (141x1231)
7,11,x,7,7,10,10,7 (14x11231)
10,11,7,7,7,7,x,10 (241111x3)
7,11,7,7,10,7,x,10 (141121x3)
7,11,7,x,10,7,7,10 (141x2113)
10,11,x,7,7,7,7,10 (24x11113)
x,x,5,6,0,3,2,x (xx34.21x)
x,11,7,7,7,10,10,x (x411123x)
x,11,7,10,10,7,7,x (x412311x)
x,x,5,6,3,0,2,x (xx342.1x)
x,11,7,7,10,7,10,x (x411213x)
x,11,10,7,10,7,7,x (x421311x)
x,11,10,7,7,10,7,x (x421131x)
x,x,2,6,3,0,5,x (xx142.3x)
x,11,7,10,7,10,7,x (x412131x)
x,x,2,6,0,3,5,x (xx14.23x)
x,11,x,10,7,10,7,7 (x4x21311)
x,11,x,7,10,7,7,10 (x4x12113)
x,11,7,x,7,10,7,10 (x41x1213)
x,11,x,7,7,10,10,7 (x4x11231)
x,11,7,10,7,10,x,7 (x41213x1)
x,11,7,x,7,10,10,7 (x41x1231)
x,11,10,x,10,7,7,7 (x42x3111)
x,11,10,7,7,10,x,7 (x42113x1)
x,11,7,7,7,10,x,10 (x41112x3)
x,11,10,x,7,10,7,7 (x42x1311)
x,11,x,7,7,10,7,10 (x4x11213)
x,11,7,10,10,7,x,7 (x41231x1)
x,11,10,7,10,7,x,7 (x42131x1)
x,11,7,x,10,7,7,10 (x41x2113)
x,11,x,10,10,7,7,7 (x4x23111)
x,11,7,7,10,7,x,10 (x41121x3)
x,x,2,6,0,3,x,5 (xx14.2x3)
x,x,2,6,3,0,x,5 (xx142.x3)
x,11,7,x,10,7,10,7 (x41x2131)
x,11,x,7,10,7,10,7 (x4x12131)
x,x,5,6,0,3,x,2 (xx34.2x1)
x,x,5,6,3,0,x,2 (xx342.x1)
0,x,2,6,0,3,5,x (.x14.23x)
3,x,2,6,0,0,5,x (2x14..3x)
0,x,5,6,0,3,2,x (.x34.21x)
0,x,5,6,3,0,2,x (.x342.1x)
3,x,5,6,0,0,2,x (2x34..1x)
0,x,2,6,3,0,5,x (.x142.3x)
3,x,x,6,0,0,5,2 (2xx4..31)
0,x,5,6,0,3,x,2 (.x34.2x1)
0,x,2,6,0,3,x,5 (.x14.2x3)
0,x,5,6,3,0,x,2 (.x342.x1)
0,x,x,6,0,3,2,5 (.xx4.213)
3,x,5,6,0,0,x,2 (2x34..x1)
0,x,2,6,3,0,x,5 (.x142.x3)
3,x,2,6,0,0,x,5 (2x14..x3)
0,x,x,6,3,0,2,5 (.xx42.13)
3,x,x,6,0,0,2,5 (2xx4..13)
0,x,x,6,0,3,5,2 (.xx4.231)
0,x,x,6,3,0,5,2 (.xx42.31)
7,11,10,7,10,7,x,x (142131xx)
7,11,10,7,7,10,x,x (142113xx)
7,11,7,10,7,10,x,x (141213xx)
7,11,7,10,10,7,x,x (141231xx)
10,11,7,10,7,7,x,x (241311xx)
10,11,10,7,7,7,x,x (243111xx)
7,11,7,x,7,10,10,x (141x123x)
7,11,10,x,10,7,7,x (142x311x)
7,11,x,10,10,7,7,x (14x2311x)
7,11,x,7,7,10,10,x (14x1123x)
7,11,10,7,x,10,7,x (1421x31x)
7,11,7,10,x,10,7,x (1412x31x)
7,11,10,x,7,10,7,x (142x131x)
10,11,7,10,x,7,7,x (2413x11x)
7,11,x,10,7,10,7,x (14x2131x)
7,11,7,x,10,7,10,x (141x213x)
7,11,x,7,10,7,10,x (14x1213x)
7,11,7,7,x,10,10,x (1411x23x)
10,11,7,7,7,x,10,x (24111x3x)
7,11,7,7,10,x,10,x (14112x3x)
10,11,x,7,7,7,10,x (24x1113x)
10,11,10,7,7,x,7,x (24311x1x)
7,11,10,7,10,x,7,x (14213x1x)
7,11,7,10,10,x,7,x (14123x1x)
10,11,7,x,7,7,10,x (241x113x)
10,11,10,x,7,7,7,x (243x111x)
10,11,x,10,7,7,7,x (24x3111x)
10,11,10,7,x,7,7,x (2431x11x)
10,11,7,10,7,x,7,x (24131x1x)
10,11,7,7,x,7,10,x (2411x13x)
10,11,7,x,7,7,x,10 (241x11x3)
10,11,7,x,7,x,10,7 (241x1x31)
10,11,x,7,7,7,x,10 (24x111x3)
10,11,7,x,7,x,7,10 (241x1x13)
7,11,x,x,10,7,10,7 (14xx2131)
10,11,x,x,7,7,7,10 (24xx1113)
10,11,7,7,x,7,x,10 (2411x1x3)
7,11,x,10,x,10,7,7 (14x2x311)
7,11,7,x,x,10,7,10 (141xx213)
10,11,x,7,7,x,7,10 (24x11x13)
7,11,7,x,10,7,x,10 (141x21x3)
7,11,10,x,x,10,7,7 (142xx311)
7,11,7,x,x,10,10,7 (141xx231)
10,11,x,x,7,7,10,7 (24xx1131)
7,11,7,x,10,x,7,10 (141x2x13)
10,11,x,7,x,7,10,7 (24x1x131)
10,11,7,x,x,7,10,7 (241xx131)
7,11,x,7,10,x,7,10 (14x12x13)
7,11,x,7,10,7,x,10 (14x121x3)
7,11,x,x,10,7,7,10 (14xx2113)
7,11,x,x,7,10,7,10 (14xx1213)
7,11,x,7,10,x,10,7 (14x12x31)
7,11,x,7,x,10,7,10 (14x1x213)
7,11,x,7,7,10,x,10 (14x112x3)
10,11,10,7,7,x,x,7 (24311xx1)
7,11,7,x,10,x,10,7 (141x2x31)
10,11,7,10,7,x,x,7 (24131xx1)
7,11,x,7,x,10,10,7 (14x1x231)
7,11,10,7,10,x,x,7 (14213xx1)
10,11,x,7,7,x,10,7 (24x11x31)
7,11,7,10,10,x,x,7 (14123xx1)
7,11,7,7,10,x,x,10 (14112xx3)
10,11,10,7,x,7,x,7 (2431x1x1)
7,11,7,7,x,10,x,10 (1411x2x3)
10,11,7,10,x,7,x,7 (2413x1x1)
10,11,10,x,7,7,x,7 (243x11x1)
10,11,7,x,x,7,7,10 (241xx113)
10,11,x,10,7,7,x,7 (24x311x1)
10,11,7,7,7,x,x,10 (24111xx3)
10,11,x,10,x,7,7,7 (24x3x111)
7,11,10,x,10,7,x,7 (142x31x1)
10,11,10,x,x,7,7,7 (243xx111)
10,11,x,7,x,7,7,10 (24x1x113)
7,11,7,x,7,10,x,10 (141x12x3)
7,11,x,10,10,7,x,7 (14x231x1)
7,11,x,10,10,x,7,7 (14x23x11)
7,11,10,x,10,x,7,7 (142x3x11)
10,11,x,10,7,x,7,7 (24x31x11)
7,11,10,7,x,10,x,7 (1421x3x1)
10,11,10,x,7,x,7,7 (243x1x11)
7,11,7,10,x,10,x,7 (1412x3x1)
7,11,x,10,7,10,x,7 (14x213x1)
7,11,10,x,7,10,x,7 (142x13x1)
7,11,x,x,7,10,10,7 (14xx1231)
x,11,10,7,7,10,x,x (x42113xx)
x,11,7,10,7,10,x,x (x41213xx)
x,11,7,10,10,7,x,x (x41231xx)
x,11,10,7,10,7,x,x (x42131xx)
x,11,7,x,7,10,10,x (x41x123x)
x,11,x,10,7,10,7,x (x4x2131x)
x,11,10,x,10,7,7,x (x42x311x)
x,11,x,7,10,7,10,x (x4x1213x)
x,11,x,7,7,10,10,x (x4x1123x)
x,11,x,10,10,7,7,x (x4x2311x)
x,11,10,x,7,10,7,x (x42x131x)
x,11,7,x,10,7,10,x (x41x213x)
x,11,x,x,7,10,7,10 (x4xx1213)
x,11,x,10,10,7,x,7 (x4x231x1)
x,11,7,x,10,7,x,10 (x41x21x3)
x,11,10,x,10,7,x,7 (x42x31x1)
x,11,x,x,10,7,7,10 (x4xx2113)
x,11,x,7,7,10,x,10 (x4x112x3)
x,11,10,x,7,10,x,7 (x42x13x1)
x,11,x,10,7,10,x,7 (x4x213x1)
x,11,x,x,10,7,10,7 (x4xx2131)
x,11,x,7,10,7,x,10 (x4x121x3)
x,11,7,x,7,10,x,10 (x41x12x3)
x,11,x,x,7,10,10,7 (x4xx1231)
7,x,5,6,3,0,x,x (4x231.xx)
3,x,5,6,7,0,x,x (1x234.xx)
0,x,5,6,3,7,x,x (.x2314xx)
3,x,5,6,0,7,x,x (1x23.4xx)
7,x,5,6,0,3,x,x (4x23.1xx)
0,x,5,6,7,3,x,x (.x2341xx)
3,x,5,6,x,0,2,x (2x34x.1x)
0,x,5,6,3,x,2,x (.x342x1x)
3,x,5,6,0,x,2,x (2x34.x1x)
0,x,2,6,x,3,5,x (.x14x23x)
0,x,5,6,x,3,2,x (.x34x21x)
0,x,2,6,3,x,5,x (.x142x3x)
3,x,2,6,0,x,5,x (2x14.x3x)
3,x,2,6,x,0,5,x (2x14x.3x)
7,11,7,10,10,x,x,x (14123xxx)
10,11,10,7,7,x,x,x (24311xxx)
7,11,10,7,10,x,x,x (14213xxx)
10,11,7,10,7,x,x,x (24131xxx)
10,x,10,6,7,0,x,x (3x412.xx)
7,x,x,6,3,0,5,x (4xx31.2x)
3,x,x,6,7,0,5,x (1xx34.2x)
7,x,x,6,0,3,5,x (4xx3.12x)
0,x,x,6,7,3,5,x (.xx3412x)
3,x,x,6,0,7,5,x (1xx3.42x)
0,x,x,6,3,7,5,x (.xx3142x)
7,x,10,6,10,0,x,x (2x314.xx)
0,x,x,6,x,3,5,2 (.xx4x231)
3,x,x,6,x,0,5,2 (2xx4x.31)
3,x,x,6,0,x,5,2 (2xx4.x31)
0,x,5,6,x,3,x,2 (.x34x2x1)
3,x,5,6,x,0,x,2 (2x34x.x1)
0,x,5,6,3,x,x,2 (.x342xx1)
3,x,x,6,x,0,2,5 (2xx4x.13)
3,x,x,6,0,x,2,5 (2xx4.x13)
0,x,x,6,3,x,2,5 (.xx42x13)
0,x,2,6,x,3,x,5 (.x14x2x3)
3,x,2,6,x,0,x,5 (2x14x.x3)
0,x,2,6,3,x,x,5 (.x142xx3)
0,x,x,6,3,x,5,2 (.xx42x31)
3,x,2,6,0,x,x,5 (2x14.xx3)
0,x,x,6,x,3,2,5 (.xx4x213)
3,x,5,6,0,x,x,2 (2x34.xx1)
7,11,7,10,x,10,x,x (1412x3xx)
10,11,10,7,x,7,x,x (2431x1xx)
10,11,7,10,x,7,x,x (2413x1xx)
7,11,x,10,10,0,x,x (14x23.xx)
7,11,10,7,x,10,x,x (1421x3xx)
7,11,10,x,10,0,x,x (142x3.xx)
10,11,x,10,7,0,x,x (24x31.xx)
10,11,10,x,7,0,x,x (243x1.xx)
3,x,x,6,7,0,x,5 (1xx34.x2)
7,x,x,6,3,0,x,5 (4xx31.x2)
10,x,10,6,0,7,x,x (3x41.2xx)
0,x,x,6,3,7,x,5 (.xx314x2)
3,x,x,6,0,7,x,5 (1xx3.4x2)
0,x,x,6,7,3,x,5 (.xx341x2)
7,x,x,6,0,3,x,5 (4xx3.1x2)
0,x,10,6,10,7,x,x (.x3142xx)
7,x,10,6,0,10,x,x (2x31.4xx)
0,x,10,6,7,10,x,x (.x3124xx)
10,11,7,x,x,7,10,x (241xx13x)
0,11,10,x,10,7,x,x (.42x31xx)
10,11,10,x,0,7,x,x (243x.1xx)
10,11,x,10,0,7,x,x (24x3.1xx)
10,11,7,x,7,x,10,x (241x1x3x)
7,11,x,10,x,10,7,x (14x2x31x)
7,11,10,x,x,10,7,x (142xx31x)
10,11,x,10,x,7,7,x (24x3x11x)
10,11,10,x,x,7,7,x (243xx11x)
7,11,x,10,10,x,7,x (14x23x1x)
7,11,10,x,10,x,7,x (142x3x1x)
10,11,x,10,7,x,7,x (24x31x1x)
10,11,10,x,7,x,7,x (243x1x1x)
10,11,x,7,x,7,10,x (24x1x13x)
7,11,x,7,x,10,10,x (14x1x23x)
7,11,7,x,x,10,10,x (141xx23x)
0,11,x,10,10,7,x,x (.4x231xx)
7,11,10,x,0,10,x,x (142x.3xx)
7,11,x,7,10,x,10,x (14x12x3x)
0,11,x,10,7,10,x,x (.4x213xx)
7,11,7,x,10,x,10,x (141x2x3x)
0,11,10,x,7,10,x,x (.42x13xx)
7,11,x,10,0,10,x,x (14x2.3xx)
10,11,x,7,7,x,10,x (24x11x3x)
10,x,x,6,7,0,10,x (3xx12.4x)
7,x,x,6,10,0,10,x (2xx13.4x)
10,x,x,6,0,7,10,x (3xx1.24x)
0,x,x,6,10,7,10,x (.xx1324x)
7,x,x,6,0,10,10,x (2xx1.34x)
0,x,x,6,7,10,10,x (.xx1234x)
7,11,x,10,x,10,x,7 (14x2x3x1)
7,11,x,x,x,10,7,10 (14xxx213)
10,11,x,x,7,x,10,7 (24xx1x31)
10,11,7,x,x,7,x,10 (241xx1x3)
10,11,x,7,x,7,x,10 (24x1x1x3)
10,11,10,x,x,7,x,7 (243xx1x1)
10,11,x,x,7,x,7,10 (24xx1x13)
7,11,x,10,10,x,x,7 (14x23xx1)
0,11,x,x,7,10,10,x (.4xx123x)
10,11,x,x,0,7,10,x (24xx.13x)
7,11,x,x,10,x,7,10 (14xx2x13)
7,11,10,x,10,x,x,7 (142x3xx1)
7,11,x,x,0,10,10,x (14xx.23x)
7,11,10,x,x,10,x,7 (142xx3x1)
10,11,x,x,x,7,7,10 (24xxx113)
7,11,x,x,10,x,10,7 (14xx2x31)
7,11,x,x,10,0,10,x (14xx2.3x)
10,11,x,10,7,x,x,7 (24x31xx1)
10,11,7,x,7,x,x,10 (241x1xx3)
10,11,x,x,7,0,10,x (24xx1.3x)
10,11,x,7,7,x,x,10 (24x11xx3)
7,11,x,x,x,10,10,7 (14xxx231)
7,11,7,x,x,10,x,10 (141xx2x3)
7,11,x,7,x,10,x,10 (14x1x2x3)
7,11,7,x,10,x,x,10 (141x2xx3)
7,11,x,7,10,x,x,10 (14x12xx3)
0,11,x,x,10,7,10,x (.4xx213x)
10,11,10,x,7,x,x,7 (243x1xx1)
10,11,x,10,x,7,x,7 (24x3x1x1)
10,11,x,x,x,7,10,7 (24xxx131)
0,x,x,6,7,10,x,10 (.xx123x4)
7,x,x,6,0,10,x,10 (2xx1.3x4)
0,x,x,6,10,7,x,10 (.xx132x4)
10,x,x,6,0,7,x,10 (3xx1.2x4)
7,x,x,6,10,0,x,10 (2xx13.x4)
10,x,x,6,7,0,x,10 (3xx12.x4)
0,11,x,x,7,10,x,10 (.4xx12x3)
0,11,x,x,10,7,x,10 (.4xx21x3)
7,11,x,x,10,0,x,10 (14xx2.x3)
7,11,x,x,0,10,x,10 (14xx.2x3)
10,11,x,x,7,0,x,10 (24xx1.x3)
10,11,x,x,0,7,x,10 (24xx.1x3)

Krótkie Podsumowanie

  • Akord As+M7b9 zawiera nuty: As, C, E, G, B♭
  • W stroju Modal D dostępnych jest 366 pozycji
  • Zapisywany również jako: As+Δb9, AsM7♯5b9, AsM7+5b9, AsΔ♯5b9, AsΔ+5b9
  • Każdy diagram pokazuje pozycje palców na gryfie Mandolin

Najczęściej Zadawane Pytania

Czym jest akord As+M7b9 na Mandolin?

As+M7b9 to akord As +M7b9. Zawiera nuty As, C, E, G, B♭. Na Mandolin w stroju Modal D jest 366 sposobów grania.

Jak grać As+M7b9 na Mandolin?

Aby zagrać As+M7b9 na w stroju Modal D, użyj jednej z 366 pozycji pokazanych powyżej.

Jakie nuty zawiera akord As+M7b9?

Akord As+M7b9 zawiera nuty: As, C, E, G, B♭.

Na ile sposobów można zagrać As+M7b9 na Mandolin?

W stroju Modal D jest 366 pozycji dla As+M7b9. Każda wykorzystuje inne miejsce na gryfie z tymi samymi nutami: As, C, E, G, B♭.

Jakie są inne nazwy As+M7b9?

As+M7b9 jest również znany jako As+Δb9, AsM7♯5b9, AsM7+5b9, AsΔ♯5b9, AsΔ+5b9. To różne zapisy tego samego akordu: As, C, E, G, B♭.