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Published byJerome Joseph Modified over 9 years ago
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CH. 21 Musical Sounds
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Musical Tones have three main characteristics 1)Pitch 2) Loudness 3)Quality
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Pitch-Relates to frequency. In musical sounds, the sound wave is composed of many different frequencies, so the pitch refers to the lowest frequency component.
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Slow Vibrations = Low Frequency. Fast Vibrations = High Frequency. Ex: Concert A = 440 vibrations per second.
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Intensity: Depends on the Amplitude. Intensity is proportional to the square of the amplitude. In symbols: I A 2
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Intensity is measured in units of Watts/m 2. (i.e. power per unit area)
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Another closely related quantity is the intensity level, or sound level. Sound level is measured in decibels. (dB)
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The decibel scale is based on the log function. # dB =10 log(I/I o ) where I o = some reference intensity, such as the threshold of human hearing - (I o = 10 -12 Watts/ m 2 )
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Examples: Source of Intensity Sound SoundLevel Jet airplane10 2 140 Disco Music10 -1 110 Busy street traffic10 -5 70 Whisper10 -10 20
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Loudness: Physiological sensation of sound detection. The ear senses some frequencies better than others. Ex: A 3500Hz sound at 80 dB sounds about twice as loud as a 125-Hz sound at 80dB.
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Quality: A piano and a clarinet can both play the note “middle C”, but we can distinguish between them. Why? - Because the quality of the sound is different. The quality is also called the “Timbre”. The number and relative loudness of the partial tones determines the “Quality” of the sound.
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Musical sounds are composed of the superposition of many tones which differ in frequency. The various tones are called partial tones. The partial tone with the lowest frequency is called the fundamental frequency.
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Fundamental or 1st harmonic 2nd harmonic 3rd harmonic NODE Antinode
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L L = /2 L = L Fundamental or 1st harmonic 2nd harmonic
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Finding the n th harmonic (2L/2) f 2 = (2L) f 1 f 2 = 2f 1 ------> f n = nf 1 L = n /2 -----> n = 2L/n where (n = 1,2,3,4,…) v = 1 f 1 v = 2 f 2 2 f 2 = 1 f 1
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Musical Instruments Scale&Octave The tone an octave above has twice the frequency as the original tone. Scale: A succession of notes of frequencies that are in simple ratios to one another. Octave: The eighth full tone (or 12th successive note in a scale) above or below a given tone.
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12345678 12345 Whole Tones Half Tones
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We can decompose a given waveform into its individual partials by Fourier Analysis. Musical sounds are composed of a fundamental plus various partials or overtones.
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Joseph Fourier, in 1822, discovered that a complicated periodic wave could be constructed by simple sinusoidal waves, and likewise deconstructed into simple sinusoidal waves.
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The decomposition of a complicated waveform into simpler sinusoidal waveforms is known as Fourier Analysis The construction of a complicated waveform from simpler sinusoidal waveforms is known as Fourier Synthesis.
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Example of Fourier Synthesis
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COMPACT DISC Digital Audio Howstuffworks "How Analog-Digital Recording Works"
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t1t2t3 Analogue Signal Digital Signal
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End of Chapter 20
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