Mim9 accordo per chitarra — schema e tablatura in accordatura Irish

Risposta breve: Mim9 è un accordo Mi min9 con le note Mi, Sol, Si, Re, Fa♯. In accordatura Irish ci sono 228 posizioni. Vedi i diagrammi sotto.

Conosciuto anche come: Mi-9, Mi min9

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Come suonare Mim9 su Mandolin

Mim9, Mi-9, Mimin9

Note: Mi, Sol, Si, Re, Fa♯

x,x,5,2,2,5,2,4 (xx311412)
x,x,2,2,2,5,5,4 (xx111342)
x,x,5,2,2,5,4,2 (xx311421)
x,x,4,2,5,2,5,2 (xx213141)
x,x,2,2,2,5,4,5 (xx111324)
x,x,2,2,5,2,5,4 (xx113142)
x,x,2,2,5,2,4,5 (xx113124)
x,x,4,2,2,5,5,2 (xx211341)
x,x,4,2,5,2,2,5 (xx213114)
x,x,5,2,5,2,2,4 (xx314112)
x,x,5,2,5,2,4,2 (xx314121)
x,x,4,2,2,5,2,5 (xx211314)
x,x,x,2,5,2,5,4 (xxx13142)
x,x,x,2,5,2,4,5 (xxx13124)
x,x,x,2,2,5,4,5 (xxx11324)
x,x,x,2,2,5,5,4 (xxx11342)
x,x,5,2,5,2,4,x (xx31412x)
x,x,5,2,2,5,4,x (xx31142x)
x,x,4,2,5,2,5,x (xx21314x)
x,x,4,2,2,5,5,x (xx21134x)
x,x,5,2,2,x,4,0 (xx412x3.)
x,x,4,2,x,2,5,0 (xx31x24.)
x,x,4,2,2,x,5,0 (xx312x4.)
x,x,5,2,x,2,4,0 (xx41x23.)
x,x,5,2,5,2,x,4 (xx3141x2)
x,x,5,2,2,5,x,4 (xx3114x2)
x,x,4,2,5,2,x,5 (xx2131x4)
x,x,4,2,2,5,x,5 (xx2113x4)
x,9,9,5,5,9,5,x (x231141x)
x,9,9,5,9,5,5,x (x231411x)
x,9,5,5,9,5,9,x (x211314x)
x,9,5,5,5,9,9,x (x211134x)
x,x,4,2,x,2,0,5 (xx31x2.4)
x,x,0,2,2,x,4,5 (xx.12x34)
x,x,4,2,2,x,0,5 (xx312x.4)
x,x,0,2,2,x,5,4 (xx.12x43)
x,x,0,2,x,2,5,4 (xx.1x243)
x,x,0,2,x,2,4,5 (xx.1x234)
x,x,5,2,x,2,0,4 (xx41x2.3)
x,x,5,2,2,x,0,4 (xx412x.3)
x,9,9,5,9,5,x,5 (x23141x1)
x,9,5,5,5,9,x,9 (x21113x4)
x,9,9,5,5,9,x,5 (x23114x1)
x,9,x,5,5,9,9,5 (x2x11341)
x,9,x,5,9,5,5,9 (x2x13114)
x,9,5,5,9,5,x,9 (x21131x4)
x,9,x,5,9,5,9,5 (x2x13141)
x,9,x,5,5,9,5,9 (x2x11314)
0,9,9,9,9,x,x,0 (.1234xx.)
0,9,9,9,9,x,0,x (.1234x.x)
0,9,9,9,x,9,x,0 (.123x4x.)
0,9,9,9,x,9,0,x (.123x4.x)
0,x,2,2,2,x,4,0 (.x123x4.)
0,x,4,2,x,2,2,0 (.x41x23.)
0,x,4,2,2,x,2,0 (.x412x3.)
0,x,2,2,x,2,4,0 (.x12x34.)
0,9,0,9,x,9,9,x (.1.2x34x)
0,9,9,x,10,9,x,0 (.12x43x.)
0,9,0,9,9,x,9,x (.1.23x4x)
0,9,9,x,9,10,0,x (.12x34.x)
0,9,x,9,x,9,9,0 (.1x2x34.)
0,9,9,x,10,9,0,x (.12x43.x)
0,9,9,x,9,10,x,0 (.12x34x.)
0,9,x,9,9,x,9,0 (.1x23x4.)
0,9,9,x,9,7,x,0 (.23x41x.)
0,9,9,x,9,7,0,x (.23x41.x)
0,9,9,x,7,9,x,0 (.23x14x.)
0,9,9,x,7,9,0,x (.23x14.x)
0,9,5,9,9,x,x,0 (.2134xx.)
0,x,4,2,2,x,0,2 (.x412x.3)
x,9,9,x,9,10,x,0 (x12x34x.)
0,x,0,2,x,2,2,4 (.x.1x234)
0,x,0,2,2,x,2,4 (.x.12x34)
0,x,0,2,2,x,4,2 (.x.12x43)
0,x,2,2,x,2,0,4 (.x12x3.4)
0,9,5,9,9,x,0,x (.2134x.x)
0,x,2,2,2,x,0,4 (.x123x.4)
0,x,5,2,2,x,4,0 (.x412x3.)
0,x,0,2,x,2,4,2 (.x.1x243)
0,x,4,2,x,2,0,2 (.x41x2.3)
x,9,9,x,9,10,0,x (x12x34.x)
0,x,5,2,x,2,4,0 (.x41x23.)
x,9,9,x,10,9,0,x (x12x43.x)
0,x,4,2,2,x,5,0 (.x312x4.)
0,x,4,2,x,2,5,0 (.x31x24.)
x,9,9,x,10,9,x,0 (x12x43x.)
0,9,x,x,9,10,9,0 (.1xx243.)
0,9,0,x,9,10,9,x (.1.x243x)
0,9,x,9,9,x,0,9 (.1x23x.4)
0,9,x,9,x,9,0,9 (.1x2x3.4)
0,9,0,9,x,9,x,9 (.1.2x3x4)
0,9,0,x,10,9,9,x (.1.x423x)
0,9,0,9,9,x,x,9 (.1.23xx4)
0,9,x,x,10,9,9,0 (.1xx423.)
0,9,x,x,7,9,9,0 (.2xx134.)
x,9,5,9,9,x,0,x (x2134x.x)
0,9,0,x,9,7,9,x (.2.x314x)
0,9,x,x,9,7,9,0 (.2xx314.)
x,9,5,9,9,x,x,0 (x2134xx.)
x,9,9,5,9,x,x,0 (x2314xx.)
x,9,9,5,9,x,0,x (x2314x.x)
0,9,0,x,7,9,9,x (.2.x134x)
0,x,0,2,2,x,4,5 (.x.12x34)
0,9,5,9,x,9,0,x (.213x4.x)
x,9,0,x,9,10,9,x (x1.x243x)
0,x,4,2,x,2,0,5 (.x31x2.4)
0,x,4,2,2,x,0,5 (.x312x.4)
x,9,x,x,10,9,9,0 (x1xx423.)
0,x,0,2,x,2,4,5 (.x.1x234)
x,9,0,x,10,9,9,x (x1.x423x)
0,x,5,2,x,2,0,4 (.x41x2.3)
0,x,5,2,2,x,0,4 (.x412x.3)
0,x,0,2,x,2,5,4 (.x.1x243)
x,9,x,x,9,10,9,0 (x1xx243.)
0,x,0,2,2,x,5,4 (.x.12x43)
0,9,5,9,x,9,x,0 (.213x4x.)
0,9,0,x,9,10,x,9 (.1.x24x3)
0,9,0,x,10,9,x,9 (.1.x42x3)
0,9,x,x,10,9,0,9 (.1xx42.3)
0,9,x,x,9,10,0,9 (.1xx24.3)
x,9,5,x,9,5,9,x (x21x314x)
x,9,9,5,x,9,0,x (x231x4.x)
x,9,9,x,9,5,5,x (x23x411x)
x,9,5,9,x,9,x,0 (x213x4x.)
x,9,9,5,x,9,x,0 (x231x4x.)
0,9,0,x,9,7,x,9 (.2.x31x4)
0,9,x,x,7,9,0,9 (.2xx13.4)
x,9,9,x,5,9,5,x (x23x141x)
0,9,x,x,9,7,0,9 (.2xx31.4)
x,9,5,9,x,9,0,x (x213x4.x)
0,9,0,x,7,9,x,9 (.2.x13x4)
x,9,5,x,5,9,9,x (x21x134x)
0,9,0,9,x,9,5,x (.2.3x41x)
0,9,9,x,9,x,5,0 (.23x4x1.)
x,9,0,x,10,9,x,9 (x1.x42x3)
x,9,x,x,10,9,0,9 (x1xx42.3)
x,9,x,x,9,10,0,9 (x1xx24.3)
0,9,5,x,x,9,9,0 (.21xx34.)
x,9,0,x,9,10,x,9 (x1.x24x3)
0,9,5,x,9,x,9,0 (.21x3x4.)
0,9,x,9,9,x,5,0 (.2x34x1.)
0,9,x,9,x,9,5,0 (.2x3x41.)
0,9,0,9,9,x,5,x (.2.34x1x)
0,9,9,x,x,9,5,0 (.23xx41.)
x,9,x,x,9,5,5,9 (x2xx3114)
x,9,9,x,5,9,x,5 (x23x14x1)
x,9,x,5,x,9,9,0 (x2x1x34.)
x,9,0,9,x,9,5,x (x2.3x41x)
x,9,0,5,x,9,9,x (x2.1x34x)
x,9,x,9,9,x,5,0 (x2x34x1.)
x,9,0,5,9,x,9,x (x2.13x4x)
x,9,5,x,9,5,x,9 (x21x31x4)
x,9,5,x,9,x,9,0 (x21x3x4.)
x,9,x,x,5,9,5,9 (x2xx1314)
x,9,5,x,5,9,x,9 (x21x13x4)
x,9,x,x,5,9,9,5 (x2xx1341)
x,9,9,x,9,5,x,5 (x23x41x1)
x,9,0,9,9,x,5,x (x2.34x1x)
x,9,x,9,x,9,5,0 (x2x3x41.)
x,9,x,x,9,5,9,5 (x2xx3141)
x,9,5,x,x,9,9,0 (x21xx34.)
x,9,9,x,x,9,5,0 (x23xx41.)
x,9,9,x,9,x,5,0 (x23x4x1.)
x,9,x,5,9,x,9,0 (x2x13x4.)
0,9,9,x,9,x,0,5 (.23x4x.1)
0,9,x,9,x,9,0,5 (.2x3x4.1)
0,9,0,x,x,9,5,9 (.2.xx314)
0,9,5,x,x,9,0,9 (.21xx3.4)
0,9,0,x,x,9,9,5 (.2.xx341)
0,9,0,9,x,9,x,5 (.2.3x4x1)
0,9,x,9,9,x,0,5 (.2x34x.1)
0,9,0,9,9,x,x,5 (.2.34xx1)
0,9,0,x,9,x,9,5 (.2.x3x41)
0,9,5,x,9,x,0,9 (.21x3x.4)
0,9,0,x,9,x,5,9 (.2.x3x14)
0,9,9,x,x,9,0,5 (.23xx4.1)
x,9,0,5,9,x,x,9 (x2.13xx4)
x,9,0,x,9,x,9,5 (x2.x3x41)
x,9,0,x,9,x,5,9 (x2.x3x14)
x,9,0,x,x,9,9,5 (x2.xx341)
x,9,x,5,x,9,0,9 (x2x1x3.4)
x,9,x,9,x,9,0,5 (x2x3x4.1)
x,9,5,x,x,9,0,9 (x21xx3.4)
x,9,x,5,9,x,0,9 (x2x13x.4)
x,9,0,x,x,9,5,9 (x2.xx314)
x,9,9,x,x,9,0,5 (x23xx4.1)
x,9,5,x,9,x,0,9 (x21x3x.4)
x,9,x,9,9,x,0,5 (x2x34x.1)
x,9,9,x,9,x,0,5 (x23x4x.1)
x,9,0,9,9,x,x,5 (x2.34xx1)
x,9,0,5,x,9,x,9 (x2.1x3x4)
x,9,0,9,x,9,x,5 (x2.3x4x1)
0,x,4,2,2,x,0,x (.x312x.x)
0,x,4,2,2,x,x,0 (.x312xx.)
0,9,9,x,9,x,x,0 (.12x3xx.)
0,9,9,x,9,x,0,x (.12x3x.x)
0,x,4,2,x,2,0,x (.x31x2.x)
0,x,4,2,x,2,x,0 (.x31x2x.)
0,9,9,x,x,9,0,x (.12xx3.x)
0,9,9,x,x,9,x,0 (.12xx3x.)
0,x,x,2,2,x,4,0 (.xx12x3.)
0,x,x,2,x,2,4,0 (.xx1x23.)
0,x,0,2,2,x,4,x (.x.12x3x)
0,x,0,2,x,2,4,x (.x.1x23x)
0,9,x,x,9,x,9,0 (.1xx2x3.)
0,9,x,x,x,9,9,0 (.1xxx23.)
0,9,0,x,x,9,9,x (.1.xx23x)
0,9,0,x,9,x,9,x (.1.x2x3x)
0,x,0,2,x,2,x,4 (.x.1x2x3)
0,x,0,2,2,x,x,4 (.x.12xx3)
0,x,x,2,2,x,0,4 (.xx12x.3)
0,x,x,2,x,2,0,4 (.xx1x2.3)
0,9,0,x,x,9,x,9 (.1.xx2x3)
0,9,x,x,9,x,0,9 (.1xx2x.3)
0,9,x,x,x,9,0,9 (.1xxx2.3)
11,9,9,x,10,x,0,x (412x3x.x)
0,9,0,x,9,x,x,9 (.1.x2xx3)
11,9,9,x,10,x,x,0 (412x3xx.)
11,9,9,x,x,10,x,0 (412xx3x.)
11,9,9,x,x,10,0,x (412xx3.x)
11,9,x,x,x,10,9,0 (41xxx32.)
11,9,x,x,10,x,9,0 (41xx3x2.)
11,9,0,x,x,10,9,x (41.xx32x)
11,9,0,x,10,x,9,x (41.x3x2x)
11,9,x,x,x,10,0,9 (41xxx3.2)
11,9,x,x,10,x,0,9 (41xx3x.2)
11,9,0,x,x,10,x,9 (41.xx3x2)
11,9,0,x,10,x,x,9 (41.x3xx2)

Riepilogo

  • L'accordo Mim9 contiene le note: Mi, Sol, Si, Re, Fa♯
  • In accordatura Irish ci sono 228 posizioni disponibili
  • Scritto anche come: Mi-9, Mi min9
  • Ogni diagramma mostra la posizione delle dita sulla tastiera della Mandolin

Domande frequenti

Cos'è l'accordo Mim9 alla Mandolin?

Mim9 è un accordo Mi min9. Contiene le note Mi, Sol, Si, Re, Fa♯. Alla Mandolin in accordatura Irish, ci sono 228 modi per suonare questo accordo.

Come si suona Mim9 alla Mandolin?

Per suonare Mim9 in accordatura Irish, usa una delle 228 posizioni sopra. Ogni diagramma mostra la posizione delle dita sulla tastiera.

Quali note contiene l'accordo Mim9?

L'accordo Mim9 contiene le note: Mi, Sol, Si, Re, Fa♯.

Quante posizioni ci sono per Mim9?

In accordatura Irish ci sono 228 posizioni per l'accordo Mim9. Ciascuna usa una posizione diversa sulla tastiera con le stesse note: Mi, Sol, Si, Re, Fa♯.

Quali altri nomi ha Mim9?

Mim9 è anche conosciuto come Mi-9, Mi min9. Sono notazioni diverse per lo stesso accordo: Mi, Sol, Si, Re, Fa♯.