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- Creators: Micklich, Albie
- Member of: Theses and Dissertations
- Member of: Barrett, The Honors College Thesis/Creative Project Collection
- Resource Type: Text
- Status: Published
Improvisation, or extemporization, has always played an important role in all
genres of music across the globe. In Western art music alone, improvisation has been used in many settings throughout history, such as composition, public extemporization, and ornamenting existing notated music. Why is it then, that improvisation is not an important part in the education of the Western Art Music tradition?
Introducing improvisation to music education develops a more well-rounded musical ability, a firmer understanding of musical concepts, and a clearer insight to the composition of music. To examine this issue, I discuss a number of scientific explorations into the use of improvisation. First, new technology in the study of the brain gives insight into how the brain functions during improvisation. Adding to this evidence, I contextualize the use of improvisation into four scientifically developed educational scenarios based on how humans most effectively learn information and skills. To conclude, the discussion then shifts to simple exercises designed to assist musicians and teachers of any skill level in utilizing improvisation in practicing, lessons, and performance.
To prevent students of music from reaffirming a continuously narrowing viewpoint of music’s creation, cultural implications, and performance, educational systems should make an effort to teach more than just the preparation of increasingly complex scores. Improvisation is not only a solid foundation for understanding the roots of western music’s own musical traditions, but also a gateway to understanding the musical traditions of the world.
This thesis is a supplement textbook designed with ASU’s MAT 370, or more generally, a course in introductory real analysis (IRA). With research in the realms of mathematics textbook creation and IRA pedagogy, this supplement aims to provide students or interested readers an additional presentation of the materials. Topics discussed include the real number system, some topology of the real line, sequences of real numbers, continuity, differentiation, integration, and the Fundamental Theorem of Calculus. Special emphasis was placed on worked examples of proven results and exercises with hints at the end of every chapter. In this respect, this supplement aims to be both versatile and self-contained for the different mathematics skill levels of readers.