Resonance

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This article is about resonance in physics. For other senses of this term, see resonance (disambiguation).

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Increase of amplitude as damping decreases and frequency approaches resonance frequency

In physics, resonance is the tendency of a system to oscillate at maximum amplitude at certain frequencies, known as the system's resonance frequencies (or resonant frequencies). At these frequencies, even small periodic driving forces can produce large amplitude vibrations, because the system stores vibrational energy. When damping is small, the resonance frequency is approximately equal to the natural frequency of the system, which is the frequency of free vibrations. Resonant phenomena occur with all type of vibrations or waves; mechanical (acoustic), electromagnetic, and quantum wave functions. Resonant systems can be used to generate vibrations of a specific frequency, or pick out specific frequencies from a complex vibration containing many frequencies.

1 Examples
2 Theory
3 Resonators
4 Old Tacoma Narrows bridge failure
5 Resonances in quantum mechanics
6 String resonance in music instruments
7 See also
8 References
9 External links

Examples

One familiar example is a playground swing, which acts as a pendulum. Pushing a person in a swing in time with the natural interval of the swing (its resonance frequency) will make the swing go higher and higher (maximum amplitude), while attempts to push the swing at a faster or slower tempo will result in smaller arcs. This is because the energy of the person pushing the swing is maximized when the pushes are at the resonance frequency, while some of this energy is canceled out by the inertial energy of the swing when they are not.

Resonance occurs widely in nature, and is exploited in many man-made devices. Many sounds we hear, such as when hard objects of metal, glass, or wood are struck, are caused by brief resonant vibrations in the object. Light and other short wavelength electromagnetic radiation is produced by resonance on an atomic scale, such as electrons in atoms. Other examples are:

acoustic resonances of musical instruments and our vocal cords
the oscillations of the balance wheel in a mechanical watch
the tidal resonance of the Bay of Fundy
orbital resonance as exemplified by some moons of the solar system's gas giants
the resonance of the basilar membrane in the cochlea of the ear, which enables people to distinguish different frequencies or tones in the sounds they hear.
electrical resonance of tuned circuits in radios that allow individual stations to be picked up
creation of coherent light by optical resonance in a laser cavity
the shattering of crystal glasses when exposed to a musical tone of the right pitch (its resonance frequency).

Theory

For a linear oscillator with a resonance frequency Ω, the intensity of oscillations I when the system is driven with a driving frequency ω is given by:

Failed to parse (Missing texvc executable; please see math/README to configure.): I(\omega) \propto \frac{\frac{\Gamma}{2}}{(\omega - \Omega)^2 + \left( \frac{\Gamma}{2} \right)^2 }.

The intensity is defined as the square of the amplitude of the oscillations. This is a Lorentzian function, and this response is found in many physical situations involving resonant systems. Γ is a parameter dependent on the damping of the oscillator, and is known as the linewidth of the resonance. Heavily damped oscillators tend to have broad linewidths, and respond to a wider range of driving frequencies around the resonance frequency. The linewidth is inversely proportional to the Q factor, which is a measure of the sharpness of the resonance.

Resonators

A physical system can have as many resonance frequencies as it has degrees of freedom. Systems with one degree of freedom, such as a mass on a spring, pendulums, balance wheels, and LC tuned circuits have one resonance frequency. Systems with two degrees of freedom, such as coupled pendulums and resonant transformers can have two resonance frequencies. Extended objects that experience resonance due to vibrations inside them are called resonators, such as organ pipes, vibrating strings, quartz crystals, microwave cavities, and laser rods. Since these can be viewed as being made of millions of coupled moving parts (such as atoms), they can have millions of resonance frequencies. The vibrations inside them travel as waves, at an approximately constant velocity, bouncing back and forth between the sides of the resonator. If the distance between the sides is Failed to parse (Missing texvc executable; please see math/README to configure.): d\, , the length of a round trip is Failed to parse (Missing texvc executable; please see math/README to configure.): 2d\, . In order to resonate, the phase of a sinusoidal wave after a round trip has to be equal to the initial phase, so the waves will reinforce. So the condition for resonance in a resonator is that the round trip distance, Failed to parse (Missing texvc executable; please see math/README to configure.): 2d\, , be equal to an integral number of wavelengths of the wave:

Failed to parse (Missing texvc executable; please see math/README to configure.): 2d = N\lambda,\qquad\qquad N \in \{1,2,3...\}

If the velocity of a wave is Failed to parse (Missing texvc executable; please see math/README to configure.): v\, , the frequency is Failed to parse (Missing texvc executable; please see math/README to configure.): f = v / \lambda\,

so the resonant frequencies are:

Failed to parse (Missing texvc executable; please see math/README to configure.): f = \frac{Nv}{2d}\qquad\qquad N \in \{1,2,3...\}

So the resonance frequencies of resonators, called normal modes, are equally spaced multiples of a lowest frequency called the fundamental frequency. The multiples are often called overtones. There may be several such series of resonant frequencies, corresponding to different modes of vibration.

Old Tacoma Narrows bridge failure

Main article: Tacoma Narrows Bridge

The collapse of the Old Tacoma Narrows Bridge, nicknamed Galloping Gertie, in 1940 is sometimes characterized in physics textbooks as a classical example of resonance. This description is misleading, however. The catastrophic vibrations that destroyed the bridge were not due to simple mechanical resonance, but to a more complicated oscillation between the bridge and winds passing through it, known as aeroelastic flutter. Robert H. Scanlan, father of the field of bridge aerodynamics, wrote an article about this misunderstanding^[1].

Resonances in quantum mechanics

In quantum mechanics and quantum field theory resonances may appear in similar circumstances to classical physics. However, they can also be thought of as unstable particles, with the formula above still valid if the Failed to parse (Missing texvc executable; please see math/README to configure.): \Gamma

is the decay rate and Failed to parse (Missing texvc executable; please see math/README to configure.): \Omega
replaced by the particle's mass M. In that case, the formula just comes from the particle's propagator, with its mass replaced by the complex number Failed to parse (Missing texvc executable; please see math/README to configure.): M+i\Gamma

. The formula is further related to the particle's decay rate by the optical theorem.

^{This short section requires expansion.}

String resonance in music instruments

Main article: String resonance (music)

String resonance occurs on string instruments. Strings or parts of strings may resonate at their fundamental or overtone frequencies when other strings are sounded. For example, an A string at 440 Hz will cause an E string at 330 Hz to resonate, because they share an overtone of 1320 Hz (the third overtone of A and fourth overtone of E).

References

^ K. Billah and R. Scanlan (1991), Resonance, Tacoma Narrows Bridge Failure, and Undergraduate Physics Textbooks, American Journal of Physics, 59(2), 118--124 (PDF)