wave

Mathematical description

designation	symbol	Relationships
amplitude	${\ displaystyle \ mathbf {A} _ {0}}$	${\ displaystyle \ mathbf {A} _ {0} \ perp \ mathbf {k}}$ Transverse wave ${\ displaystyle \ mathbf {A} _ {0} \ | \ mathbf {k}}$ Longitudinal wave
Wave vector	${\ displaystyle \ mathbf {k}}$	Direction of propagation
Circular wavenumber	${\ displaystyle k \,}$	${\ displaystyle k = | \ mathbf {k} |}$
wavelength	${\ displaystyle \ mathbf {\ lambda}}$	${\ displaystyle \ mathbf {\ lambda} = 2 \ mathbf {\ pi} / k}$
Angular frequency	${\ displaystyle \ mathbf {\ omega}}$	${\ displaystyle \ mathbf {\ omega} \ left (\ mathbf {k} \ right)}$ Dispersion relation
frequency	${\ displaystyle f \,}$	${\ displaystyle f = \ mathbf {\ omega} / 2 \ mathbf {\ pi}}$
Phase velocity	${\ displaystyle c \,}$	${\ displaystyle c = \ mathbf {\ omega} / k = \ mathbf {\ lambda} f}$
Group speed	${\ displaystyle v_ {G} \,}$	${\ displaystyle v_ {G} = d \ mathbf {\ omega} / dk}$
phase	${\ displaystyle \ varphi}$	${\ displaystyle \ varphi = \ mathbf {k} \ cdot \ mathbf {r} - \ omega t}$

Several quantities are necessary for the mathematical description of waves. These include amplitude, phase and propagation or phase velocity. The adjacent table provides an overview of the sizes that are necessary for a complete description.

Wave function

amplitude

phase

Phase-shifted sinusoidal oscillations of the same frequency

Sinus waves of different frequencies

The phase of a wave indicates in which section within a period the wave is at a reference point in time and location. So it determines how big the deflection is. In the example of a plane wave is the phase at the time at the location . The phase therefore depends on the two parameters wave vector and angular frequency . ${\ displaystyle \ varphi = \ mathbf {k} \ cdot \ mathbf {r} - \ omega t}$${\ displaystyle t \,}$${\ displaystyle \ mathbf {r}}$${\ displaystyle \ mathbf {k}}$${\ displaystyle \ omega}$

Examples

The mathematical formulation for a harmonic (also: homogeneous, monochromatic) plane wave in three-dimensional space is in complex notation :

${\ displaystyle \ mathbf {A} (\ mathbf {r}, t) = \ operatorname {Re} \ left (\ mathbf {A} _ {0} e ^ {i \ left (\ mathbf {k} \ cdot \ mathbf {r} - \ omega t \ right)} \ right) = \ operatorname {Re} (\ mathbf {A} _ {0}) \ cos (\ mathbf {k} \ cdot \ mathbf {r} - \ omega t) - \ operatorname {Im} (\ mathbf {A} _ {0}) \ sin (\ mathbf {k} \ cdot \ mathbf {r} - \ omega t).}$

A spherical wave can be described with the following equation:

${\ displaystyle \ mathbf {A} (r, t) = \ operatorname {Re} \ left ({\ frac {\ mathbf {A} _ {0}} {r}} e ^ {i (kr- \ omega t )} \ right) = {\ frac {\ operatorname {Re} (\ mathbf {A} _ {0})} {r}} \ cos (kr- \ omega t) - {\ frac {\ operatorname {Im} (\ mathbf {A} _ {0})} {r}} \ sin (kr- \ omega t).}$

Generation of waves

Concentric wave rings made of a pure sine of decreasing amplitude towards the outside (3D)

Propagation of a wave

Sources for waves can be pulse-shaped excitations, vibrations or periodic oscillations. Periodic mechanical and electromagnetic waves can be generated by periodic vibrations. A simple example is a swinging pendulum: On such a pendulum there is, for example, a pen under which a sheet of paper is pulled at a constant speed. The pen attached to the pendulum now describes a sinusoidal wave on the strip of paper, which is the medium of propagation. In this example, the wavelength depends on the speed at which the paper strip is moved. The amplitude of the wave is determined by the maximum swing of the pendulum.

Superposition of waves

Interference between two waves

A standing wave

Beat

Gaussian wave packet

Waves occurring in nature are rarely pure monochromatic waves, but rather a superposition of many waves of different wavelengths. The superposition is done by the superposition principle , which mathematically means that all wave functions of the individual waves are added. The proportions of the wavelengths are called the spectrum . Examples:

Various effects can occur:

• Interference - If waves are superimposed, this can lead to a structural reinforcement , but also to a partial or even total cancellation of the wave (if both wavelengths and frequencies are the same and the waves oscillate exactly in opposite directions). This phenomenon plays a role in everyday life, for example in the case of unwanted multi-path reception - waves from a transmitter arrive at one location on different paths and can sometimes cancel one another there.
• Standing wave - When two opposing waves of the same frequency and amplitude are superimposed , standing waves are formed. These do not spread, but form spatially constant oscillation patterns: At the so-called movement arteries they oscillate with doubled amplitude and the original frequency, at the movement nodes in between the amplitude is zero at all times. This phenomenon is a special case of interference. It occurs in particular in front of a reflective wall or between two suitably matched walls which together form a resonator .
• Beat - A superposition of two waves of neighboring frequencies leads to a beat. The amplitude of such a wave increases and decreases periodically - the closer the frequencies are to each other, the slower this process occurs (in time). This effect is used, for example, when tuning musical instruments - the beat frequency is adjusted too close to zero. The beats of the Leslie loudspeaker are also typical . People find its slow beats pleasant.
• Wave packet - The superposition of waves with all frequencies from a frequency band creates a wave packet. Here the envelope of the wave shows only a single mountain, in front of and behind this the amplitude is negligible. Since the phase velocity of a wave in waveguides and dispersive media is frequency-dependent, wave packets dissolve with increasing time. When transmitting messages using waves, the resulting broadening of wave packets must be taken into account.

literature

Web links

Commons : Waves  - collection of images, videos and audio files