Si7b9 accord de guitare — schéma et tablature en accordage Modal D

Réponse courte : Si7b9 est un accord Si 7b9 avec les notes Si, Ré♯, Fa♯, La, Do. En accordage Modal D, il y a 132 positions. Voir les diagrammes ci-dessous.

Accords de pianoInstrumentsAccordages

Search chord by name:

 

OR

Search chord by notes:

Piano Companion
Piano CompanionFree

Want all chords at your fingertips? Get our free app with 10,000+ chords and scales — trusted by millions of musicians. Look up any chord instantly, anywhere.

Get It Free
ChordIQ
ChordIQFree

Ready to actually learn these chords? Train your ear, master the staff, and build real skills with interactive games — for guitar, ukulele, bass and more.

Get It Free

Comment jouer Si7b9 au Mandolin

Si7b9

Notes: Si, Ré♯, Fa♯, La, Do

3,2,1,4,0,0,x,x (3214..xx)
3,2,4,1,0,0,x,x (3241..xx)
0,2,4,1,3,0,x,x (.2413.xx)
0,2,1,4,3,0,x,x (.2143.xx)
0,2,4,1,0,3,x,x (.241.3xx)
0,2,1,4,0,3,x,x (.214.3xx)
0,2,x,1,3,0,4,x (.2x13.4x)
0,2,1,x,0,3,4,x (.21x.34x)
0,2,4,x,3,0,1,x (.24x3.1x)
0,2,x,1,0,3,4,x (.2x1.34x)
3,2,4,x,0,0,1,x (324x..1x)
0,2,1,x,3,0,4,x (.21x3.4x)
3,2,x,1,0,0,4,x (32x1..4x)
3,2,1,x,0,0,4,x (321x..4x)
0,2,x,4,0,3,1,x (.2x4.31x)
0,2,4,x,0,3,1,x (.24x.31x)
0,2,x,4,3,0,1,x (.2x43.1x)
3,2,x,4,0,0,1,x (32x4..1x)
x,2,1,4,3,0,x,x (x2143.xx)
x,2,4,1,3,0,x,x (x2413.xx)
0,2,x,x,3,0,1,4 (.2xx3.14)
0,2,4,x,0,3,x,1 (.24x.3x1)
0,2,x,4,3,0,x,1 (.2x43.x1)
0,2,x,1,3,0,x,4 (.2x13.x4)
0,2,4,x,3,0,x,1 (.24x3.x1)
3,2,x,4,0,0,x,1 (32x4..x1)
3,2,4,x,0,0,x,1 (324x..x1)
3,2,x,x,0,0,1,4 (32xx..14)
0,2,x,1,0,3,x,4 (.2x1.3x4)
0,2,1,x,3,0,x,4 (.21x3.x4)
0,2,1,x,0,3,x,4 (.21x.3x4)
0,2,x,x,0,3,1,4 (.2xx.314)
3,2,x,1,0,0,x,4 (32x1..x4)
3,2,1,x,0,0,x,4 (321x..x4)
0,2,x,x,0,3,4,1 (.2xx.341)
0,2,x,x,3,0,4,1 (.2xx3.41)
3,2,x,x,0,0,4,1 (32xx..41)
0,2,x,4,0,3,x,1 (.2x4.3x1)
x,2,1,4,0,3,x,x (x214.3xx)
x,2,4,1,0,3,x,x (x241.3xx)
x,2,4,x,3,0,1,x (x24x3.1x)
x,2,x,1,3,0,4,x (x2x13.4x)
x,2,4,x,0,3,1,x (x24x.31x)
x,2,1,x,3,0,4,x (x21x3.4x)
x,2,x,4,0,3,1,x (x2x4.31x)
x,2,1,x,0,3,4,x (x21x.34x)
x,2,x,1,0,3,4,x (x2x1.34x)
x,2,x,4,3,0,1,x (x2x43.1x)
x,2,x,1,0,3,x,4 (x2x1.3x4)
x,2,x,x,0,3,4,1 (x2xx.341)
x,2,x,1,3,0,x,4 (x2x13.x4)
x,2,x,4,0,3,x,1 (x2x4.3x1)
x,2,4,x,0,3,x,1 (x24x.3x1)
x,2,1,x,0,3,x,4 (x21x.3x4)
x,2,1,x,3,0,x,4 (x21x3.x4)
x,2,x,4,3,0,x,1 (x2x43.x1)
x,2,x,x,3,0,1,4 (x2xx3.14)
x,2,4,x,3,0,x,1 (x24x3.x1)
x,2,x,x,0,3,1,4 (x2xx.314)
x,2,x,x,3,0,4,1 (x2xx3.41)
3,2,4,1,x,0,x,x (3241x.xx)
3,2,4,1,0,x,x,x (3241.xxx)
3,2,1,4,0,x,x,x (3214.xxx)
3,2,1,4,x,0,x,x (3214x.xx)
0,2,4,1,3,x,x,x (.2413xxx)
0,2,1,4,3,x,x,x (.2143xxx)
0,2,4,1,x,3,x,x (.241x3xx)
0,2,1,4,x,3,x,x (.214x3xx)
6,2,4,x,3,0,x,x (413x2.xx)
6,2,x,4,3,0,x,x (41x32.xx)
3,2,4,x,6,0,x,x (213x4.xx)
3,2,x,4,6,0,x,x (21x34.xx)
3,2,4,x,x,0,1,x (324xx.1x)
3,2,x,1,0,x,4,x (32x1.x4x)
0,2,x,4,3,x,1,x (.2x43x1x)
0,2,x,4,x,3,1,x (.2x4x31x)
3,2,x,4,x,0,1,x (32x4x.1x)
3,2,4,x,0,x,1,x (324x.x1x)
0,2,1,x,3,x,4,x (.21x3x4x)
3,2,x,4,0,x,1,x (32x4.x1x)
0,2,1,x,x,3,4,x (.21xx34x)
0,2,4,x,x,3,1,x (.24xx31x)
3,2,1,x,x,0,4,x (321xx.4x)
0,2,4,x,3,x,1,x (.24x3x1x)
0,2,x,1,3,x,4,x (.2x13x4x)
0,2,x,1,x,3,4,x (.2x1x34x)
3,2,1,x,0,x,4,x (321x.x4x)
3,2,x,1,x,0,4,x (32x1x.4x)
6,2,4,x,0,3,x,x (413x.2xx)
6,2,x,4,0,3,x,x (41x3.2xx)
0,2,x,4,3,6,x,x (.1x324xx)
0,2,4,x,6,3,x,x (.13x42xx)
0,2,4,x,3,6,x,x (.13x24xx)
0,2,x,4,6,3,x,x (.1x342xx)
3,2,4,x,0,6,x,x (213x.4xx)
3,2,x,4,0,6,x,x (21x3.4xx)
0,2,x,x,x,3,4,1 (.2xxx341)
0,2,4,x,x,3,x,1 (.24xx3x1)
3,2,4,x,x,0,x,1 (324xx.x1)
3,2,1,x,0,x,x,4 (321x.xx4)
3,2,x,1,0,x,x,4 (32x1.xx4)
0,2,1,x,3,x,x,4 (.21x3xx4)
0,2,x,1,3,x,x,4 (.2x13xx4)
3,2,1,x,x,0,x,4 (321xx.x4)
3,2,x,1,x,0,x,4 (32x1x.x4)
3,2,x,4,x,0,x,1 (32x4x.x1)
0,2,x,4,x,3,x,1 (.2x4x3x1)
3,2,x,x,x,0,1,4 (32xxx.14)
0,2,x,x,x,3,1,4 (.2xxx314)
3,2,4,x,0,x,x,1 (324x.xx1)
3,2,x,x,0,x,4,1 (32xx.x41)
0,2,x,x,3,x,4,1 (.2xx3x41)
0,2,x,x,3,x,1,4 (.2xx3x14)
0,2,1,x,x,3,x,4 (.21xx3x4)
0,2,x,1,x,3,x,4 (.2x1x3x4)
3,2,x,x,0,x,1,4 (32xx.x14)
3,2,x,x,x,0,4,1 (32xxx.41)
3,2,x,4,0,x,x,1 (32x4.xx1)
0,2,4,x,3,x,x,1 (.24x3xx1)
0,2,x,4,3,x,x,1 (.2x43xx1)
6,2,x,x,3,0,4,x (41xx2.3x)
6,2,x,x,0,3,4,x (41xx.23x)
3,2,x,x,6,0,4,x (21xx4.3x)
0,2,x,x,6,3,4,x (.1xx423x)
3,2,x,x,0,6,4,x (21xx.43x)
0,2,x,x,3,6,4,x (.1xx243x)
3,2,x,x,0,6,x,4 (21xx.4x3)
6,2,x,x,3,0,x,4 (41xx2.x3)
3,2,x,x,6,0,x,4 (21xx4.x3)
6,2,x,x,0,3,x,4 (41xx.2x3)
0,2,x,x,3,6,x,4 (.1xx24x3)
0,2,x,x,6,3,x,4 (.1xx42x3)

Résumé

  • L'accord Si7b9 contient les notes : Si, Ré♯, Fa♯, La, Do
  • En accordage Modal D, il y a 132 positions disponibles
  • Chaque diagramme montre la position des doigts sur le manche de la Mandolin

Questions fréquentes

Qu'est-ce que l'accord Si7b9 à la Mandolin ?

Si7b9 est un accord Si 7b9. Il contient les notes Si, Ré♯, Fa♯, La, Do. À la Mandolin en accordage Modal D, il y a 132 façons de jouer cet accord.

Comment jouer Si7b9 à la Mandolin ?

Pour jouer Si7b9 en accordage Modal D, utilisez l'une des 132 positions ci-dessus. Chaque diagramme montre la position des doigts sur le manche.

Quelles notes composent l'accord Si7b9 ?

L'accord Si7b9 contient les notes : Si, Ré♯, Fa♯, La, Do.

Combien de positions existe-t-il pour Si7b9 ?

En accordage Modal D, il y a 132 positions pour l'accord Si7b9. Chacune utilise une position différente sur le manche avec les mêmes notes : Si, Ré♯, Fa♯, La, Do.