Assertion : Speed of wave = frac{text{wavelen | vedclass

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(A) The wavelength $(\lambda)$ is defined as the distance between two nearest particles in the same phase. The time period $(T)$ is the time taken by

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If both Assertion and Reason are correct and the Reason is a correct explanation of the Assertion.

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(A) The wavelength $(\lambda)$ is defined as the distance between two nearest particles in the same phase. The time period $(T)$ is the time taken by the wave to travel a distance equal to one wavelength. By definition,the speed of a wave $(v)$ is the distance traveled per unit time. Therefore,$v = \frac{\lambda}{T}$,which is $	ext{Speed of wave} = \frac{	ext{wavelength}}{	ext{time period}}$. Since the reason correctly defines wavelength and provides the basis for the relationship in the assertion,the reason is the correct explanation of the assertion.

$Assertion :$ Speed of wave $= \frac{\text{wavelength}}{\text{time period}}$
$Reason :$ Wavelength is the distance between two nearest particles in phase.

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$Assertion :$ Speed of wave $= \frac{\text{wavelength}}{\text{time period}}$$Reason :$ Wavelength is the distance between two nearest particles in phase.