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| A '''wave''' is a disturbance that propagates through [[spacetime|space and time]], usually with transference of [[energy]]. A [[mechanical]] wave is a wave that propagates or travels through a [[medium]] due to the restoring [[force]]s it produces upon deformation. There also exist waves capable of traveling through a [[vacuum]], including electromagnetic radiation and probably[1] gravitational radiation. Waves travel and transfer energy from one point to another, often with no permanent displacement of the particles of the medium (that is, with little or no associated [[mass]] transport); they consist instead of oscillations or vibrations around almost fixed locations. | | A '''wave''' is a disturbance that propagates through [[spacetime|space and time]], usually with transference of [[energy]]. A [[mechanical]] wave is a wave that propagates or travels through a [[medium]] due to the restoring [[force]]s it produces upon deformation. There also exist waves capable of traveling through a [[vacuum]], including electromagnetic radiation and probably[1] gravitational radiation. Waves travel and transfer energy from one point to another, often with no permanent displacement of the particles of the medium (that is, with little or no associated [[mass]] transport); they consist instead of oscillations or vibrations around almost fixed locations. |
− | <center>For lessons on the [[topic]] of '''''Waves''''', follow [http://nordan.daynal.org/wiki/index.php?title=Category:Waves '''''this link'''''].</center> | + | <center>For lessons on the [[topic]] of '''''Waves''''', follow [https://nordan.daynal.org/wiki/index.php?title=Category:Waves '''''this link'''''].</center> |
| ==Definitions== | | ==Definitions== |
| Agreeing on a single, all-encompassing definition for the term wave is non-trivial. A [[vibration]] can be defined as a back-and-forth motion around a reference [[value]]. However, a vibration is not necessarily a wave. Defining the necessary and sufficient characteristics that qualify a [[phenomenon]] to be called a wave is, at least, flexible. | | Agreeing on a single, all-encompassing definition for the term wave is non-trivial. A [[vibration]] can be defined as a back-and-forth motion around a reference [[value]]. However, a vibration is not necessarily a wave. Defining the necessary and sufficient characteristics that qualify a [[phenomenon]] to be called a wave is, at least, flexible. |
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| '''2''' = Crest<br /> | | '''2''' = Crest<br /> |
| '''3''' = Trough]] | | '''3''' = Trough]] |
− | Periodic waves are characterized by crests (highs) and troughs (lows), and may usually be categorized as either longitudinal or transverse. [http://en.wikipedia.org/wiki/Transverse_wave Transverse waves] are those with vibrations perpendicular to the direction of the propagation of the wave; examples include waves on a string, and electromagnetic waves. [http://en.wikipedia.org/wiki/Longitudinal_wave Longitudinal waves] are those with vibrations parallel to the direction of the propagation of the wave; examples include most sound waves. | + | Periodic waves are characterized by crests (highs) and troughs (lows), and may usually be categorized as either longitudinal or transverse. [https://en.wikipedia.org/wiki/Transverse_wave Transverse waves] are those with vibrations perpendicular to the direction of the propagation of the wave; examples include waves on a string, and electromagnetic waves. [https://en.wikipedia.org/wiki/Longitudinal_wave Longitudinal waves] are those with vibrations parallel to the direction of the propagation of the wave; examples include most sound waves. |
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| When an object bobs up and down on a ripple in a pond, it experiences an orbital trajectory because ripples are not simple transverse sinusoidal waves. | | When an object bobs up and down on a ripple in a pond, it experiences an orbital trajectory because ripples are not simple transverse sinusoidal waves. |
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| * French, A.P. (1971). Vibrations and Waves (M.I.T. Introductory physics series). Nelson Thornes. ISBN 0-393-09936-9. OCLC 163810889. | | * French, A.P. (1971). Vibrations and Waves (M.I.T. Introductory physics series). Nelson Thornes. ISBN 0-393-09936-9. OCLC 163810889. |
| * Hall, D. E. (1980), Musical Acoustics: An Introduction, Belmont, California: Wadsworth Publishing Company, ISBN 0534007589 . | | * Hall, D. E. (1980), Musical Acoustics: An Introduction, Belmont, California: Wadsworth Publishing Company, ISBN 0534007589 . |
− | * Hunt, F. V. (1992) [1966], Origins in Acoustics, New York: Acoustical Society of America Press, http://asa.aip.org/publications.html#pub17 . | + | * Hunt, F. V. (1992) [1966], Origins in Acoustics, New York: Acoustical Society of America Press, https://asa.aip.org/publications.html#pub17 . |
| * Ostrovsky, L. A.; Potapov, A. S. (1999), Modulated Waves, Theory and Applications, Baltimore: The Johns Hopkins University Press, ISBN 0801858704 . | | * Ostrovsky, L. A.; Potapov, A. S. (1999), Modulated Waves, Theory and Applications, Baltimore: The Johns Hopkins University Press, ISBN 0801858704 . |
| * Vassilakis, P.N. (2001). Perceptual and Physical Properties of Amplitude Fluctuation and their Musical Significance. Doctoral Dissertation. University of California, Los Angeles. | | * Vassilakis, P.N. (2001). Perceptual and Physical Properties of Amplitude Fluctuation and their Musical Significance. Doctoral Dissertation. University of California, Los Angeles. |