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... sounds consonant (and has been the foundation of western music for several hundred years), and we measure the string lengths required for this triad. We find (demo) that the string lengths have ratios 6:5:4 for the sequence CEG. ...
... sounds consonant (and has been the foundation of western music for several hundred years), and we measure the string lengths required for this triad. We find (demo) that the string lengths have ratios 6:5:4 for the sequence CEG. ...
Lecture notes
... Type String is different from primitive types int and double. String is a class type. We explain what this means later, after we have explained what a class is. Each value of type String is a sequence of characters. We write a value by enclosing the sequence of characters within double quotes ". You ...
... Type String is different from primitive types int and double. String is a class type. We explain what this means later, after we have explained what a class is. Each value of type String is a sequence of characters. We write a value by enclosing the sequence of characters within double quotes ". You ...
Strähle construction
Strähle's construction is a geometric method for determining the lengths for a series of vibrating strings with uniform diameters and tensions to sound pitches in a specific rational tempered musical tuning. It was first published in the 1743 Proceedings of the Royal Swedish Academy of Sciences by Swedish master organ maker Daniel Stråhle (1700–1746). The Academy's secretary Jacob Faggot appended a miscalculated set of pitches to the article, and these figures were reproduced by Friedrich Wilhelm Marpurg in Versuch über die musikalische Temperatur in 1776. Several German textbooks published about 1800 reported that the mistake was first identified by Christlieb Benedikt Funk in 1779, but the construction itself appears to have received little notice until the middle of the twentieth century when tuning theorist J. Murray Barbour presented it as a good method for approximating equal temperament and similar exponentials of small roots, and generalized its underlying mathematical principles.It has become known as a device for building fretted musical instruments through articles by mathematicians Ian Stewart and Isaac Jacob Schoenberg, and is praised by them as a unique and remarkably elegant solution developed by an unschooled craftsman.The name ""Strähle"" used in recent English language works appears to be due to a transcription error in Marpurg's text, where the old-fashioned diacritic raised ""e"" was substituted for the raised ring.