Isaac Newton's Microtonal Approach to Just Intonation

IF 0.6 0 MUSIC Empirical Musicology Review Pub Date : 2021-06-28 DOI:10.18061/emr.v15i3-4.7647
D. Muzzulini
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引用次数: 1

Abstract

In 1665 Isaac Newton wrote a notebook in which he collected materials for a musical treatise which was never completed. He investigated ways of approximately representing just intonation scales by dividing the octave into many equally sized intervals. Strictly speaking, equal divisions of the octave are incompatible with just intonation, and just intonation intervals are audibly different from the intervals played on a modern equally tempered modern piano. By increasing the number of parts of an equal division, just intonation can be approximated arbitrarily well. Scales with more than 60 microtonal steps per octave, however, never gained wide acceptance in music theory or practice. Newton divided the octave into 612 equal parts so that he could represent the syntonic chromatic scale very accurately and he studied several equal divisions of the octave with fewer parts. His approximation problem is looked at in three ways: (1) A reconstruction of how he determined the many EDO-representations listed in the notebook is given. (2) Using computer programs Newton's tuning problem is solved "empirically" through calculating and evaluating the related approximations comprehensively. (3) The findings from the computer-assisted analysis are used to develop a more general geometric approach to the approximation problem.
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艾萨克·牛顿的微调性语调方法
1665年,艾萨克·牛顿写了一本笔记本,为一篇从未完成的音乐论文收集材料。他研究了通过将八度音阶划分为许多大小相等的音程来近似表示语调音阶的方法。严格地说,八度音阶的等分与纯音准是不相容的,纯音准音程在听觉上与现代同等音色的现代钢琴上演奏的音程不同。通过增加等分的部分数量,可以很好地任意近似语调。然而,每八度音阶超过60个微音步的音阶从未在音乐理论或实践中得到广泛接受。牛顿把八度音阶分成612个等份,这样他就可以非常准确地表示同音音阶,他还研究了几个等份的八度音阶。从三个方面来看他的近似问题:(1)给出了他如何确定笔记本中列出的许多EDO表示的重建。(2) 利用计算机程序,通过综合计算和评估相关近似值,“凭经验”解决了牛顿调谐问题。(3) 计算机辅助分析的结果被用来开发一种更通用的近似问题的几何方法。
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