22. (a) Solve the classical wave equation governing the vibrations of a stretched string, for a string fixed at both its ends. Thereby show that the functions describing the possible shapes assumed by the string are essentially the same as the eigenfunctions for an infinite square well potential. (b) Also show that the possible frequencies of vibration of the string are essentially different from the frequencies of the wave functions for the potential.
22. (a) Solve the classical wave equation governing the vibrations of a stretched string, for a string fixed at both its ends. Thereby show that the functions describing the possible shapes assumed by the string are essentially the same as the eigenfunctions for an infinite square well potential. (b) Also show that the possible frequencies of vibration of the string are essentially different from the frequencies of the wave functions for the potential.
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Transcribed Image Text:22. (a) Solve the classical wave equation governing the vibrations of a stretched string, for
a string fixed at both its ends. Thereby show that the functions describing the possible
shapes assumed by the string are essentially the same as the eigenfunctions for an infinite
square well potential. (b) Also show that the possible frequencies of vibration of the string
are essentially different from the frequencies of the wave functions for the potential.
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