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It is highly probable that the Greek initiates gained their knowledge of the philosophic and therapeutic aspects of music from the Egyptians, who, in turn, considered Hermes the founder of the art. According to one legend, this god constructed the first lyre by stretching strings across the concavity of a turtle shell. Both Isis and Osiris were patrons of music and poetry. Plato, in describing the antiquity of these arts among the Egyptians, declared that songs and poetry had existed in Egypt for at least ten thousand years, and that these were of such an exalted and inspiring nature that only gods or godlike men could have composed them. In the Mysteries the lyre was regarded as the secret symbol of the human constitution, the body of the instrument representing the physical form, the strings the nerves, and the musician the spirit. Playing upon the nerves, the spirit thus created the harmonies of normal functioning, which, however, became discords if the nature of man were defiled.
While the early Chinese, Hindus, Persians, Egyptians, Israelites, and Greeks employed both vocal and instrumental music in their religious ceremonials, also to complement their poetry and drama, it remained for Pythagoras to raise the art to its true dignity by demonstrating its mathematical foundation. Although it is said that he himself was not a musician, Pythagoras is now generally credited with the discovery of the diatonic scale. Having first learned the divine theory of music from the priests of the various Mysteries into which he had been accepted, Pythagoras pondered for several years upon the laws governing consonance and dissonance. How he actually solved the problem is unknown, but the following explanation has been invented.
One day while meditating upon the problem of harmony, Pythagoras chanced to pass a brazier's shop where workmen were pounding out a piece of metal upon an anvil. By noting the variances in pitch between the sounds made by large hammers and those made by smaller implements, and carefully estimating the harmonies and discords resulting from combinations of these sounds, he gained his first clue to the musical intervals of the diatonic scale. He entered the shop, and after carefully examining the tools and making mental note of their weights, returned to his own house and constructed an arm of wood so that it: extended out from the wall of his room. At regular intervals along this arm he attached four cords, all of like composition, size, and weight. To the first of these he attached a twelve-pound weight, to the second a nine-pound weight, to the third an eight-pound weight, and to the fourth a six-pound weight. These different weights corresponded to the sizes of the braziers' hammers.
Pythagoras thereupon discovered that the first and fourth strings when sounded together produced the harmonic interval of the octave, for doubling the weight had the same effect as halving the string. The tension of the first string being twice that of the fourth string, their ratio was said to be 2:1, or duple. By similar experimentation he ascertained that the first and third string produced the harmony of the diapente, or the interval of the fifth. The tension of the first string being half again as much as that of the third string, their ratio was said to be 3:2, or sesquialter. Likewise the second and fourth strings, having the same ratio as the first and third strings, yielded a diapente harmony. Continuing his investigation, Pythagoras discovered that the first and second strings produced the harmony of the diatessaron, or the interval of the third; and the tension of the first string being a third greater than that of the second string, their ratio was said to be 4:3, or sesquitercian. The third and fourth strings, having the same ratio as the first and second strings, produced another harmony of the diatessaron. According to Iamblichus, the second and third strings had the ratio of 8:9, or epogdoan.
The key to harmonic ratios is hidden in the famous Pythagorean tetractys, or pyramid of dots. The tetractys is made up of the first four numbers--1, 2, 3, and 4--which in their proportions reveal the intervals of the octave, the diapente, and the diatessaron. While the law of harmonic intervals as set forth above is true, it has been subsequently proved that hammers striking metal in the manner
What else can I help you with?
Who founded music?
no one but it has given by saraswathi
Where can someone learn music theory for dummies?
To learn music theory, there are step by step instructions in many music books. Alternatively a good music teacher should be able to explain music theory.
When was Academy of Ancient Music created?
Academy of Ancient Music was created in 1726.
What did The Beatles contribute?
Their music, I guess
Where can one do a practice test for music theory?
One can do a practice test for music theory on the 'My Music Theory' website. One can take the tests online or download them to do on other devices. They have six grades of lessons.
When was music theory first developed and how has it evolved over time?
Music theory was first developed in ancient Greece around 500 BCE by Pythagoras. Over time, it has evolved through contributions from various cultures and scholars, leading to the establishment of standardized systems for understanding and analyzing music. Today, music theory continues to adapt and expand as new genres and technologies shape the way we create and appreciate music.
Did Pythagoras invent the greek music scale?
Pythagoras was a Greek mathematician who had several inventions. Pythagoras created the Pythagorean scale, a music scale that was commonly used throughout Greece.
What did Pythagoras discover about music?
he played the lyre
What is Pythagoras famous for in music?
He's a beast
What are the key elements of RB music theory and how do they contribute to the unique sound and style of RB music?
The key elements of RB music theory include soulful melodies, syncopated rhythms, use of extended chords, and emotional lyrics. These elements contribute to the unique sound and style of RB music by creating a smooth and groovy feel, allowing for expressive vocal performances, and blending elements of jazz, blues, and gospel music.
What is the significance of the step in music theory and how does it contribute to the overall composition of a musical piece?
In music theory, a step is the distance between two notes. It is significant because it helps create melodies and harmonies in a musical piece. Steps contribute to the overall composition by providing movement and direction in the music, creating tension and resolution, and adding variety and interest to the melody.
What is the significance of the dominant note in music theory and how does it contribute to the overall composition of a piece?
The dominant note in music theory is important because it creates tension and leads to resolution in a piece of music. It contributes to the overall composition by adding a sense of movement and direction, enhancing the emotional impact of the music.
What factors contribute to the quality of a chord in music theory?
The quality of a chord in music theory is influenced by factors such as the types of intervals between the notes, the arrangement of the notes within the chord, and the overall harmony created by the combination of notes.
What other M word did Pythagoras study?
music
What impact has Pythagoras had on the modern world?
Pythagoras was an advanced Greek mathematician for his time. His impact was his discovering the numerical ratios of intervals in the music scales along with his theorem that the square on the hypotenuse of a right angled triangle is equal to the sum of the squares of the other two sides. Amazing for ancient times.
What is the significance of a four note chord in music theory and how does it contribute to the overall harmony of a piece?
A four-note chord in music theory is called a seventh chord and it adds richness and complexity to the harmony of a piece. It contributes by creating tension and resolution, adding color and depth to the music.
What is the significance of harmonic intervals in music theory and how do they contribute to the overall sound and structure of a musical composition?
Harmonic intervals in music theory are important because they create the foundation for the harmony and structure of a musical composition. They contribute to the overall sound by creating tension and resolution, adding depth and richness to the music. Different intervals can evoke different emotions and moods, shaping the overall feel of the piece.
