GM7 Guitar Akkord — Diagram és Tabulatúra Drop B (7-String) Hangolásban

Rövid válasz: GM7 egy G maj7 akkord a G, H, D, Fis hangokkal. Drop B (7-String) hangolásban 245 pozíció van. Lásd az alábbi diagramokat.

Más néven: GMa7, Gj7, GΔ7, GΔ, G maj7

Zongora AkkordokHangszerekHangolások

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Hogyan játssza GM7 hangszeren Guitar

GM7, GMa7, Gj7, GΔ7, GΔ, Gmaj7

Hangok: G, H, D, Fis

x,x,7,7,0,6,8 (xx23.14)
x,x,7,10,0,10,8 (xx13.42)
x,x,7,7,0,10,8 (xx12.43)
0,8,7,7,0,6,x (.423.1x)
7,8,0,7,0,6,x (24.3.1x)
7,8,0,7,0,x,8 (13.2.x4)
0,8,7,7,0,x,8 (.312.x4)
0,8,7,x,0,6,8 (.32x.14)
0,x,7,7,0,6,8 (.x23.14)
7,8,0,x,0,6,8 (23.x.14)
7,x,0,7,0,6,8 (2x.3.14)
0,8,7,x,0,6,5 (.43x.21)
0,5,7,7,0,x,8 (.123.x4)
0,8,7,7,0,x,5 (.423.x1)
0,5,7,x,0,6,8 (.13x.24)
7,5,0,x,0,6,8 (31.x.24)
7,5,0,7,0,x,8 (21.3.x4)
7,8,0,x,0,6,5 (34.x.21)
7,8,0,7,0,x,5 (24.3.x1)
7,8,0,10,0,10,x (12.3.4x)
x,5,7,x,7,6,5 (x13x421)
7,8,0,7,0,10,x (13.2.4x)
0,8,7,10,0,10,x (.213.4x)
0,8,7,7,0,10,x (.312.4x)
7,8,0,10,0,6,x (23.4.1x)
0,8,7,10,0,6,x (.324.1x)
x,8,7,7,0,6,x (x423.1x)
0,x,7,7,0,10,8 (.x12.43)
0,8,7,x,0,10,8 (.21x.43)
0,x,7,10,0,10,8 (.x13.42)
7,8,0,x,0,10,8 (12.x.43)
7,8,0,10,0,x,8 (12.4.x3)
7,x,0,7,0,10,8 (1x.2.43)
0,8,7,10,0,x,8 (.214.x3)
7,x,0,10,0,10,8 (1x.3.42)
7,x,0,10,0,6,8 (2x.4.13)
x,8,7,7,0,x,8 (x312.x4)
0,x,7,10,0,6,8 (.x24.13)
x,x,7,7,7,6,x (xx2341x)
x,8,7,x,0,6,5 (x43x.21)
x,5,7,7,0,x,8 (x123.x4)
x,8,7,7,0,x,5 (x423.x1)
x,5,7,x,0,6,8 (x13x.24)
x,8,7,10,0,10,x (x213.4x)
x,8,7,7,0,10,x (x312.4x)
x,x,7,7,0,x,8 (xx12.x3)
x,x,7,x,7,6,5 (xx3x421)
x,8,7,x,0,10,8 (x21x.43)
x,x,7,10,0,10,x (xx12.3x)
x,x,7,3,7,x,5 (xx314x2)
x,x,7,7,x,6,8 (xx23x14)
x,x,7,x,4,6,8 (xx3x124)
x,x,7,x,0,10,8 (xx1x.32)
0,8,7,7,0,x,x (.312.xx)
7,8,0,7,0,x,x (13.2.xx)
7,8,8,7,0,x,x (1342.xx)
8,8,7,7,0,x,x (3412.xx)
7,8,7,7,0,x,x (1423.xx)
7,5,3,3,7,x,x (32114xx)
3,5,7,3,4,x,x (13412xx)
3,5,7,7,0,x,x (1234.xx)
7,5,3,3,4,x,x (43112xx)
3,5,7,3,7,x,x (12314xx)
3,5,7,3,0,x,x (1342.xx)
7,5,3,3,0,x,x (4312.xx)
7,5,3,7,0,x,x (3214.xx)
7,8,0,10,0,x,x (12.3.xx)
0,8,7,10,0,x,x (.213.xx)
7,5,0,3,7,x,x (32.14xx)
0,5,7,3,7,x,x (.2314xx)
7,x,3,3,4,6,x (4x1123x)
3,x,7,3,4,6,x (1x4123x)
0,8,7,x,0,6,x (.32x.1x)
7,8,0,x,0,6,x (23.x.1x)
7,5,3,3,x,6,x (4211x3x)
3,5,7,3,x,6,x (1241x3x)
0,x,7,7,7,6,x (.x2341x)
x,8,7,7,0,x,x (x312.xx)
7,x,0,7,7,6,x (2x.341x)
0,5,7,x,7,6,x (.13x42x)
7,5,x,x,7,6,5 (31xx421)
7,5,0,x,7,6,x (31.x42x)
7,8,0,x,0,x,8 (12.x.x3)
0,8,7,x,0,x,8 (.21x.x3)
7,x,0,7,0,x,8 (1x.2.x3)
0,x,7,7,0,x,8 (.x12.x3)
3,x,7,7,0,6,x (1x34.2x)
0,8,7,x,7,6,x (.42x31x)
3,x,7,3,x,6,5 (1x41x32)
7,x,3,3,x,6,5 (4x11x32)
3,x,7,3,7,x,5 (1x314x2)
0,x,7,3,7,6,x (.x3142x)
7,8,0,x,7,6,x (24.x31x)
7,x,0,3,7,6,x (3x.142x)
7,x,3,7,0,6,x (3x14.2x)
7,x,3,3,7,x,5 (3x114x2)
3,x,7,3,4,x,5 (1x412x3)
7,x,3,3,4,x,5 (4x112x3)
7,8,x,7,0,6,x (24x3.1x)
3,5,7,x,0,6,x (124x.3x)
7,5,3,x,0,6,x (421x.3x)
0,8,7,7,x,6,x (.423x1x)
7,x,0,x,0,6,8 (2x.x.13)
7,8,0,7,x,6,x (24.3x1x)
0,x,7,x,0,6,8 (.x2x.13)
3,5,7,3,x,x,5 (1241xx3)
7,5,3,3,x,x,5 (4211xx3)
0,x,7,x,7,6,5 (.x3x421)
7,x,0,x,7,6,5 (3x.x421)
7,5,0,x,0,x,8 (21.x.x3)
7,8,0,x,0,x,5 (23.x.x1)
0,5,7,x,0,x,8 (.12x.x3)
0,8,7,x,0,x,5 (.32x.x1)
7,8,0,x,4,6,x (34.x12x)
7,8,x,7,0,x,8 (13x2.x4)
0,8,7,x,4,6,x (.43x12x)
7,x,7,7,0,x,8 (1x23.x4)
8,x,7,7,0,x,8 (3x12.x4)
7,8,0,x,0,10,x (12.x.3x)
7,x,8,7,0,x,8 (1x32.x4)
0,8,7,x,0,10,x (.21x.3x)
7,x,0,10,0,10,x (1x.2.3x)
0,x,7,10,0,10,x (.x12.3x)
3,x,7,x,0,6,5 (1x4x.32)
7,x,x,7,0,6,8 (2xx3.14)
3,x,7,3,0,x,5 (1x42.x3)
7,x,3,3,0,x,5 (4x12.x3)
7,x,0,3,7,x,5 (3x.14x2)
0,x,7,3,7,x,5 (.x314x2)
0,8,7,x,x,6,8 (.32xx14)
7,x,0,7,x,6,8 (2x.3x14)
7,5,3,x,0,x,5 (421x.x3)
7,x,3,x,0,6,5 (4x1x.32)
3,x,7,7,0,x,5 (1x34.x2)
7,x,3,7,0,x,5 (3x14.x2)
7,x,0,10,0,6,x (2x.3.1x)
0,x,7,10,0,6,x (.x23.1x)
3,5,7,x,0,x,5 (124x.x3)
0,x,7,7,x,6,8 (.x23x14)
0,x,7,x,7,6,8 (.x2x314)
7,x,0,x,7,6,8 (2x.x314)
7,8,0,x,x,6,8 (23.xx14)
7,8,7,x,0,x,5 (243x.x1)
7,5,0,x,x,6,8 (31.xx24)
7,8,0,x,x,6,5 (34.xx21)
7,8,x,7,0,x,5 (24x3.x1)
8,8,7,x,0,x,5 (342x.x1)
0,8,7,x,x,6,5 (.43xx21)
7,5,x,x,0,6,8 (31xx.24)
x,5,7,3,7,x,x (x2314xx)
7,5,7,x,0,x,8 (213x.x4)
8,5,7,x,0,x,8 (312x.x4)
0,5,7,x,x,6,8 (.13xx24)
7,5,8,x,0,x,8 (213x.x4)
7,8,8,x,0,x,5 (234x.x1)
7,5,x,7,0,x,8 (21x3.x4)
7,8,x,x,0,6,5 (34xx.21)
x,5,7,x,7,6,x (x13x42x)
7,8,7,x,0,10,x (132x.4x)
7,8,x,7,0,10,x (13x2.4x)
8,x,7,10,0,10,x (2x13.4x)
0,x,7,x,4,6,8 (.x3x124)
7,x,0,x,4,6,8 (3x.x124)
7,8,8,x,0,10,x (123x.4x)
0,x,7,x,0,10,8 (.x1x.32)
7,8,x,10,0,10,x (12x3.4x)
7,x,8,10,0,10,x (1x23.4x)
0,x,7,10,0,x,8 (.x13.x2)
7,x,0,10,0,x,8 (1x.3.x2)
7,x,7,10,0,10,x (1x23.4x)
8,8,7,x,0,10,x (231x.4x)
7,x,0,x,0,10,8 (1x.x.32)
0,8,7,10,x,6,x (.324x1x)
7,x,0,10,7,6,x (2x.431x)
0,x,7,10,7,6,x (.x2431x)
7,8,0,10,x,6,x (23.4x1x)
x,8,7,7,x,6,x (x423x1x)
7,x,7,x,0,10,8 (1x2x.43)
7,8,x,x,0,10,8 (12xx.43)
x,5,7,x,0,x,8 (x12x.x3)
x,8,7,x,0,x,5 (x32x.x1)
7,x,x,10,0,10,8 (1xx3.42)
8,x,7,x,0,10,8 (2x1x.43)
7,x,8,x,0,10,8 (1x2x.43)
7,x,x,7,0,10,8 (1xx2.43)
7,x,0,10,x,6,8 (2x.4x13)
x,8,7,x,4,6,x (x43x12x)
x,8,7,x,0,10,x (x21x.3x)
0,x,7,10,x,6,8 (.x24x13)
x,8,7,x,x,6,5 (x43xx21)
x,5,7,x,x,6,8 (x13xx24)
7,8,0,x,0,x,x (12.x.xx)
0,8,7,x,0,x,x (.21x.xx)
7,5,3,x,0,x,x (321x.xx)
3,5,7,3,x,x,x (1231xxx)
7,5,3,3,x,x,x (3211xxx)
3,5,7,x,0,x,x (123x.xx)
7,8,x,7,0,x,x (13x2.xx)
3,x,7,7,0,x,x (1x23.xx)
7,x,3,7,0,x,x (2x13.xx)
7,x,3,3,4,x,x (3x112xx)
3,x,7,3,4,x,x (1x312xx)
7,x,0,10,0,x,x (1x.2.xx)
0,x,7,10,0,x,x (.x12.xx)
7,x,0,x,7,6,x (2x.x31x)
0,x,7,3,7,x,x (.x213xx)
0,x,7,x,7,6,x (.x2x31x)
7,x,0,3,7,x,x (2x.13xx)
0,x,7,x,0,x,8 (.x1x.x2)
7,x,0,x,0,x,8 (1x.x.x2)
0,8,7,x,x,6,x (.32xx1x)
7,x,3,3,x,x,5 (3x11xx2)
7,5,x,3,7,x,x (32x14xx)
7,8,0,x,x,6,x (23.xx1x)
7,x,x,7,7,6,x (2xx341x)
3,x,7,3,x,x,5 (1x31xx2)
7,5,x,x,7,6,x (31xx42x)
7,x,x,7,0,x,8 (1xx2.x3)
7,5,3,x,x,6,x (421xx3x)
3,5,7,x,x,6,x (124xx3x)
7,x,3,x,0,x,5 (3x1x.x2)
7,x,0,x,x,6,8 (2x.xx13)
7,8,x,7,x,6,x (24x3x1x)
7,x,3,7,x,6,x (3x14x2x)
3,x,7,7,x,6,x (1x34x2x)
3,x,7,x,4,6,x (1x4x23x)
3,x,7,x,0,x,5 (1x3x.x2)
0,x,7,x,x,6,8 (.x2xx13)
7,x,3,x,4,6,x (4x1x23x)
7,x,x,x,7,6,5 (3xxx421)
7,5,x,x,0,x,8 (21xx.x3)
7,8,x,x,0,x,5 (23xx.x1)
7,8,x,x,4,6,x (34xx12x)
7,8,x,x,0,10,x (12xx.3x)
7,x,x,10,0,10,x (1xx2.3x)
7,x,x,7,x,6,8 (2xx3x14)
7,x,3,x,x,6,5 (4x1xx32)
0,x,7,10,x,6,x (.x23x1x)
3,x,7,x,x,6,5 (1x4xx32)
7,x,0,10,x,6,x (2x.3x1x)
7,x,x,3,7,x,5 (3xx14x2)
7,5,x,x,x,6,8 (31xxx24)
7,8,x,x,x,6,5 (34xxx21)
7,x,x,x,0,10,8 (1xxx.32)
7,x,x,x,4,6,8 (3xxx124)

Gyors Összefoglaló

  • A GM7 akkord a következő hangokat tartalmazza: G, H, D, Fis
  • Drop B (7-String) hangolásban 245 pozíció áll rendelkezésre
  • Írják még így is: GMa7, Gj7, GΔ7, GΔ, G maj7
  • Minden diagram a Guitar fogólapján mutatja az ujjpozíciókat

Gyakran Ismételt Kérdések

Mi az a GM7 akkord Guitar hangszeren?

GM7 egy G maj7 akkord. A G, H, D, Fis hangokat tartalmazza. Guitar hangszeren Drop B (7-String) hangolásban 245 módon játszható.

Hogyan játssza a GM7 akkordot Guitar hangszeren?

A GM7 hangszeren Drop B (7-String) hangolásban való játszásához használja a fent bemutatott 245 pozíció egyikét.

Milyen hangok vannak a GM7 akkordban?

A GM7 akkord a következő hangokat tartalmazza: G, H, D, Fis.

Hányféleképpen játszható a GM7 Guitar hangszeren?

Drop B (7-String) hangolásban 245 pozíció van a GM7 akkordhoz. Mindegyik más helyet használ a fogólapon: G, H, D, Fis.

Milyen más nevei vannak a GM7 akkordnak?

GM7 más néven GMa7, Gj7, GΔ7, GΔ, G maj7. Ezek ugyanannak az akkordnak különböző jelölései: G, H, D, Fis.