Suite géométrique
8 pièces pour duos de violons
Eight duos make up Suite géométrique (Geometric Suite), in which one of the violins is always in open strings or in the first position in order to create, from the beginning of instrumental learning, a strong rhythmic, emotional and harmonic relationship between two voices, between the teacher and his student, between students of different levels, in order to generate a musical object that brings together an entire class.
Read moreDetails
| Instrument family | Violin |
| Catalog classifications | 2 violins |
| Instrument nomenclature | 2 violons |
| Total duration | 00:12:50 |
| Publisher | Éditions Billaudot |
| Collection management | COMENTALE Guy |
| Cotage | GB10461 |
| Total number of pages | 16 |
| Languages | French, English |
| Cycle / Level | Easy (cycle 1), Moderately difficult (cycle 2) |
| Target audience | Adults, Children, Young people |
| Musical style | Contemporary |
| Directory type | Original work(s) |
| Copyright year | 2024 |
| EAN code | 9790043104612 |
| Audios | Without |
| EDU complements | Without |
Description
Suite géométrique (A geometric sequence) is understood as the relationship established between things—and their interpreters—and not as a description of the things themselves. Everyone is free to start from the axiom that every variable has a probability of being on an orbit parallel to an affine plane exhibiting a distortion of a symplectic geometry. Yes, indeed… It's a possibility.
Eight duos make up Suite géométrique, in which one of the violins is always in open strings or in the first position in order to create, from the beginning of instrumental learning, a strong rhythmic, emotional and harmonic relationship between two voices, between the teacher and his student, between students of different levels, in order to generate a musical object that brings together an entire class.
| 1. Variable (2 mn 30 s) |
| 2. Distorsion (1 mn 30 s) |
| 3. Parallèle (55 s) |
| 4. Probabilité (1 mn 40 s) |
| 5. Symplectique (1 mn 05 s) |
| 6. Affine (55 s) |
| 7. Orbite (1 mn 15 s) |
| 8. Axiome (1 mn 25 s) |
