Equation of a plane wave is given by `4 sin .(pi)/(4)[2t+(x)/(8)]`. The phase difference at any given instant of two particles 16 cm apart is

y = 4 sin (pi)/(2) (2t + (x)/(8)) find A, lambda & phase difference of same particle at time intervals of 0.4 sec & phase difference at any given instant of two particles 12 cm apart.

A travelling wave in a string is represented by y=3 sin ((pi)/(2)t - (pi)/(4) x) . The phase difference between two particles separated by a distance 4 cm is ( Take x and y in cm and t in seconds )

The equation of a plane progressive wave is given by, y= 3sin pi (( t)/( 0.02) -(x)/( 20)) .The frequency of the wave is

The equation of a progressive wave is given by, y = 3 sin pi ((t)/(0.02) - (x)/(20)) m . Then the frequency of the wave is

When a wave travels in a medium displacement of a particle is given by y(x,t) =0.03sin pi (2t-0.01x) where y and x are in metres and in seconds,The phase difference at a given instant of time between two paticles 25 m apart in the medium is

The equation of a wave is y=4 sin[(pi)/(2)(2t+(1)/(8)x)] where y and x are in centimeres and t is in seconds.

Equation of a progressive wave is given by, y=4sin[pi((t)/(5)-(x)/(9))+(pi)/(6)] where x and y are in metre. Then :

The equation of a progressive wave is y = 0.4 sin 2pi [(t)/(0.02) - (x)/(60)] , where x is in cm. Thenn the phase difference between two points separated by 6 cm at any instant is