The displacement of a particle for a wave at the point x = 0 is given by ` y = cos^(2) pi t sin 4 pi t ` . Find out the number of harmonic waves that are superposed . What are their frequencies ?

The displacement of a particle in S.H.M. varies according to the relation x= 4 (cos pi t +sin pi t ) . The amplitude of the particle is

The displacement of a particle in a periodic motion is given by y = 4 cos^2 (t/2) sin(1000t) . This displacement may be considered as the result of superposition of n no. of independent harmonic oscillations. Here n is

Displacement of a particle, in periodic motion, is represented by y = 4 cos^(2) ((t)/(2)) sin (1000t). If the equation is the superposition of n number of simple harmonic motion then n becomes

The displacement of a particle at the position x = 0 in a medium due to two different progressive waves are y_(1) = sin 4 pi t and y_(2) = sin 2 pi t , respectively. How many times would the particle come to test in every second ?