Check by the method of dimensions, the formula ` upsilo = (1)/(lambda)sqrt((K)/(d)),` where `upsilon` is velocity of longitudinal waves, `lambdas` is wavelength of wave, K is coefficient of volume elasticity and d is density of the medium.

Check the dimensional consistency of the relation upsilon = (1)/(I) sqrt((P)/(rho)) where I is length, upsilon is velocity, P is pressure and rho is density,

Derive the folowing relation by the method of dimensions v=sqrt(E/rho) E=coefficient of elasticity, rho =density of medium.

Check by the method of dimensions, whether the folllowing relation are dimensionally correct or not. (i) upsilon = sqrt(P//rho) , where upsilon is velocity. P is prerssure and rho is density. (ii) v= 2pisqrt((I)/(g)), where I is length, g is acceleration due to gravity and v is frequency.

If a wave of wavelength lambda is travelling in a medium with velocity V, then its frequency is

The frequencies and velocities of two waves are equal. If wavelengths of the two waves are lambda_1 and lambda_2 respectively, then.

A sine wave has an amplitude A and wavelength lambda . Let V be the wave velocity and v be the maximum velocity of a particle in the medium. Then

A sine wave has an amplitude A and wavelength lambda . Let V be the wave velocity and v be the maximum velocity of a particle in the medium. Then

A sine wave has an amplitude A and wavelength lambda . Let V be the wave velocity and v be the maximum velocity of a particle in the medium. Then