In a quiet forest, you can sometimes hear a single leaf fall to the ground. After settling into bed, you may hear your blood pulsing through your ears. But when a passing motorist has his stereo turned up, you cannot even hear what the person next to you in your car is saying. We are all very familiar with the loudness of sounds and aware that they are related to how energetically the source is vibrating. In cartoons depicting a screaming person (or an animal making a loud noise), the cartoonist often shows an open mouth with a vibrating uvula, the hanging tissue at the back of the mouth, to suggest a loud sound coming from the throat Figure 2. High noise exposure is hazardous to hearing, and it is common for musicians to have hearing losses that are sufficiently severe that they interfere with the musicians’ abilities to perform. The relevant physical quantity is sound intensity, a concept that is valid for all sounds whether or not they are in the audible range.
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Intensity is defined to be the power per unit area carried by a wave. Power is the rate at which energy is transferred by the wave. In equation form, intensity I is [latex]I=frac{P}{A}[/latex], where P is the power through an area A. The SI unit for I is W/m2. The intensity of a sound wave is related to its amplitude squared by the following relationship:
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[latex]displaystyle{I}=frac{left(Delta{p}right)^2}{2rho{v}_{text{w}}}[/latex].
Here Δp is the pressure variation or pressure amplitude (half the difference between the maximum and minimum pressure in the sound wave) in units of pascals (Pa) or N/m2. (We are using a lower case p for pressure to distinguish it from power, denoted by P above.) The energy (as kinetic energy [latex]frac{mv^2}{2}[/latex]) of an oscillating element of air due to a traveling sound wave is proportional to its amplitude squared. In this equation, ρ is the density of the material in which the sound wave travels, in units of kg/m3, and vw is the speed of sound in the medium, in units of m/s. The pressure variation is proportional to the amplitude of the oscillation, and so I varies as (Δp)2 (Figure 2). This relationship is consistent with the fact that the sound wave is produced by some vibration; the greater its pressure amplitude, the more the air is compressed in the sound it creates.
Sound intensity levels are quoted in decibels (dB) much more often than sound intensities in watts per meter squared. Decibels are the unit of choice in the scientific literature as well as in the popular media. The reasons for this choice of units are related to how we perceive sounds. How our ears perceive sound can be more accurately described by the logarithm of the intensity rather than directly to the intensity. The sound intensity level β in decibels of a sound having an intensity I in watts per meter squared is defined to be [latex]betaleft(text{dB}right)=10log_{10}left(frac{I}{I_0}right)[/latex], where I0 = 10−12 W/m2 is a reference intensity. In particular, I0 is the lowest or threshold intensity of sound a person with normal hearing can perceive at a frequency of 1000 Hz. Sound intensity level is not the same as intensity. Because β is defined in terms of a ratio, it is a unitless quantity telling you the level of the sound relative to a fixed standard (10−12 W/m2, in this case). The units of decibels (dB) are used to indicate this ratio is multiplied by 10 in its definition. The bel, upon which the decibel is based, is named for Alexander Graham Bell, the inventor of the telephone.
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Table 1. Sound Intensity Levels and Intensities Sound intensity level β (dB) Intensity I(W/m2) Example/effect 0 1 × 10-12 Threshold of hearing at 1000 Hz 10 1 × 10-11 Rustle of leaves 20 1 × 10-10 Whisper at 1 m distance 30 1 × 10-9 Quiet home 40 1 × 10-8 Average home 50 1 × 10-7 Average office, soft music 60 1 × 10-6 Normal conversation 70 1 × 10-5 Noisy office, busy traffic 80 1 × 10-4 Loud radio, classroom lecture 90 1 × 10-3 Inside a heavy truck; damage from prolonged exposure[1] 100 1 × 10-2 Noisy factory, siren at 30 m; damage from 8 h per day exposure 110 1 × 10-1 Damage from 30 min per day exposure 120 1 Loud rock concert, pneumatic chipper at 2 m; threshold of pain 140 1 × 102 Jet airplane at 30 m; severe pain, damage in seconds 160 1 × 104 Bursting of eardrums
The decibel level of a sound having the threshold intensity of 10−12 W/m2 is β = 0 dB, because log101 = 0. That is, the threshold of hearing is 0 decibels. Table 1 gives levels in decibels and intensities in watts per meter squared for some familiar sounds.
One of the more striking things about the intensities in Table 1 is that the intensity in watts per meter squared is quite small for most sounds. The ear is sensitive to as little as a trillionth of a watt per meter squared—even more impressive when you realize that the area of the eardrum is only about 1 cm2, so that only 10-16 W falls on it at the threshold of hearing! Air molecules in a sound wave of this intensity vibrate over a distance of less than one molecular diameter, and the gauge pressures involved are less than 10-9 atm.
Another impressive feature of the sounds in Table 1 is their numerical range. Sound intensity varies by a factor of 1012 from threshold to a sound that causes damage in seconds. You are unaware of this tremendous range in sound intensity because how your ears respond can be described approximately as the logarithm of intensity. Thus, sound intensity levels in decibels fit your experience better than intensities in watts per meter squared. The decibel scale is also easier to relate to because most people are more accustomed to dealing with numbers such as 0, 53, or 120 than numbers such as 1.00 × 10-11.
One more observation readily verified by examining Table 1 or using [latex]I=frac{left(Delta{p}right)^2}{2rho{v}_{text{w}}}[/latex] is that each factor of 10 in intensity corresponds to 10 dB. For example, a 90 dB sound compared with a 60 dB sound is 30 dB greater, or three factors of 10 (that is, 103 times) as intense. Another example is that if one sound is 107 as intense as another, it is 70 dB higher. See Table 2.
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Table 2. Ratios of Intensities and Corresponding Differences in Sound Intensity Levels [latex]frac{I_2}{I_1}[/latex] β2 – β1 2.0 3.0 dB 5.0 7.0 dB 10.0 10.0 dB
It should be noted at this point that there is another decibel scale in use, called the sound pressure level, based on the ratio of the pressure amplitude to a reference pressure. This scale is used particularly in applications where sound travels in water. It is beyond the scope of most introductory texts to treat this scale because it is not commonly used for sounds in air, but it is important to note that very different decibel levels may be encountered when sound pressure levels are quoted. For example, ocean noise pollution produced by ships may be as great as 200 dB expressed in the sound pressure level, where the more familiar sound intensity level we use here would be something under 140 dB for the same sound.
Section Summary
- Intensity is the same for a sound wave as was defined for all waves; it is [latex]I=frac{P}{A}[/latex], where P is the power crossing area A. The SI unit for I is watts per meter squared. The intensity of a sound wave is also related to the pressure amplitude Δp, [latex]I=frac{{left(Delta pright)}^{2}}{2{rho{v}}_{w}}[/latex], where ρ is the density of the medium in which the sound wave travels and vw is the speed of sound in the medium.
- Sound intensity level in units of decibels (dB) is [latex]beta left(text{dB}right)=text{10}log_{10}left(frac{I}{{I}_{0}}right)[/latex], where I0 = 10-12 W/m2 is the threshold intensity of hearing.
Glossary
intensity: the power per unit area carried by a wave
sound intensity level: a unitless quantity telling you the level of the sound relative to a fixed standard
sound pressure level: the ratio of the pressure amplitude to a reference pressure
Source: https://en.congthucvatly.com
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